[
  {
    "path": ".gitattributes",
    "content": "# Auto detect text files and perform LF normalization\n* text=auto\n"
  },
  {
    "path": "LICENSE",
    "content": "MIT License\n\nCopyright (c) 2023 Perp-Neg\n\nPermission is hereby granted, free of charge, to any person obtaining a copy\nof this software and associated documentation files (the \"Software\"), to deal\nin the Software without restriction, including without limitation the rights\nto use, copy, modify, merge, publish, distribute, sublicense, and/or sell\ncopies of the Software, and to permit persons to whom the Software is\nfurnished to do so, subject to the following conditions:\n\nThe above copyright notice and this permission notice shall be included in all\ncopies or substantial portions of the Software.\n\nTHE SOFTWARE IS PROVIDED \"AS IS\", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR\nIMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY,\nFITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE\nAUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER\nLIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM,\nOUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE\nSOFTWARE.\n"
  },
  {
    "path": "README.md",
    "content": "\n### [Project Page](https://perp-neg.github.io/) | [Paper](https://arxiv.org/abs/2304.04968) | [Huggingface][huggingface-demo]\n[![][huggingface]][huggingface-demo]\n\n\n[huggingface]: <https://img.shields.io/badge/%F0%9F%A4%97%20Hugging%20Face-Spaces-blue>\n[huggingface-demo]: <https://huggingface.co/spaces/rezaarmand/Perp-Neg>\n\n![Video Demo](assets/output.gif)\n\n\n# Perp-Neg Stable Diffusion\n\nThis is the repository for using Perp-Neg sampling with Stable Diffusion model, as presented in [Re-imagine the Negative Prompt Algorithm: Transform 2D Diffusion into 3D, alleviate Janus problem and Beyond.](https://Perp-Neg.github.io).\n\n\n\n## Running code\n\n\n**Run compositional ebm with diffusion model**\n```\npython scripts/image_sample_stable_diffusion.py --prompt=\"a boy wearing sunglasses|sunglasses with black frame\" --weights=\"1|-1.5\" --pipeline='cebm' --num_images=1\n```\n\n**Run PerpNeg**\n```\npython scripts/image_sample_stable_diffusion.py --prompt=\"a boy wearing sunglasses|sunglasses with black frame\" --weights=\"1|-1.5\" --pipeline='perpneg' --num_images=1\n```\n\n**Run PerpNeg-rotation**\n```\npython scripts/image_sample_stable_diffusion.py --prompt=\"a photo of lion, front view | a photo of lion, side view\" --weights=\"1|-1.5|-1.5\" --pipeline='rotation_perpneg' --num_images=1\n```\n**PerpNeg-Stable DreamFusion**\n\nplease use the scripts in \nstable-dreamfusion/scripts/run_if2_perpneg.sh to run the Stable DreamFusion + PerpNeg to avoid the Janus problem.\n\n\nThis code is manily based on [Stable-DreamFusion](https://github.com/ashawkey/stable-dreamfusion) \n\nIf you find it useful for your work, please cite:\n```\n@article{armandpour2023re,\n  title={Re-imagine the Negative Prompt Algorithm: Transform 2D Diffusion into 3D, alleviate Janus problem and Beyond},\n  author={Armandpour, Mohammadreza and Zheng, Huangjie and Sadeghian, Ali and Sadeghian, Amir and Zhou, Mingyuan},\n  journal={arXiv preprint arXiv:2304.04968},\n  year={2023}\n}\n```\n"
  },
  {
    "path": "notebooks/demo.ipynb",
    "content": "{\n \"cells\": [\n  {\n   \"cell_type\": \"code\",\n   \"execution_count\": 1,\n   \"metadata\": {\n    \"colab\": {\n     \"base_uri\": \"https://localhost:8080/\",\n     \"height\": 301,\n     \"referenced_widgets\": [\n      \"ffaa1a5508fd423ba90aa435e1e900b6\",\n      \"6256a498f2524ac2aad4716164da874a\",\n      \"be79104a922c4b918cea7528aa213fbb\",\n      \"6146c7ee93ca4a61bb978eea839adba7\",\n      \"64cc7cdcffee4cd5889b0c464dd68acb\",\n      \"315aab75bc724665bc2e79b8af1114e8\",\n      \"a0a3f02145b84953a040c50d72b07b63\",\n      \"1a68aa400e8c4217ad0847d84921f862\",\n      \"3154df922df642f7bdf454e4e8d15d79\",\n      \"d2be532bb1e44a14a94538eafa1fc556\",\n      \"38fb08268ca34f46b6646f963fdffc5b\",\n      \"4360519a8e7c4bcc8e6a81037cc50561\",\n      \"df7e6f661c7742e1a692938e9c946704\",\n      \"02e1e306949d4a18b2aa3d0973e8f2fa\"\n     ]\n    },\n    \"id\": \"ZtIStDEBnoz9\",\n    \"outputId\": \"f86bd33b-649e-4241-a8fb-18dc88bfb4ca\",\n    \"pycharm\": {\n     \"name\": \"#%%\\n\"\n    },\n    \"scrolled\": true\n   },\n   \"outputs\": [\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"Token is valid.\\n\",\n      \"\\u001b[1m\\u001b[31mCannot authenticate through git-credential as no helper is defined on your machine.\\n\",\n      \"You might have to re-authenticate when pushing to the Hugging Face Hub.\\n\",\n      \"Run the following command in your terminal in case you want to set the 'store' credential helper as default.\\n\",\n      \"\\n\",\n      \"git config --global credential.helper store\\n\",\n      \"\\n\",\n      \"Read https://git-scm.com/book/en/v2/Git-Tools-Credential-Storage for more details.\\u001b[0m\\n\",\n      \"Token has not been saved to git credential helper.\\n\",\n      \"Your token has been saved to /home/hjzheng/.cache/huggingface/token\\n\",\n      \"Login successful\\n\"\n     ]\n    }\n   ],\n   \"source\": [\n    \"from huggingface_hub import notebook_login\\n\",\n    \"notebook_login()\"\n   ]\n  },\n  {\n   \"cell_type\": \"code\",\n   \"execution_count\": 3,\n   \"metadata\": {},\n   \"outputs\": [\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"Obtaining file:///data/hjzheng/perpneg-diffusion\\n\",\n      \"  Preparing metadata (setup.py) ... \\u001b[?25ldone\\n\",\n      \"\\u001b[?25hRequirement already satisfied: Pillow in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (9.2.0)\\n\",\n      \"Requirement already satisfied: attrs in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (21.4.0)\\n\",\n      \"Requirement already satisfied: torch in /home/hjzheng/.local/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (2.0.0)\\n\",\n      \"Requirement already satisfied: filelock in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (3.6.0)\\n\",\n      \"Requirement already satisfied: requests in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (2.28.1)\\n\",\n      \"Requirement already satisfied: tqdm in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (4.64.1)\\n\",\n      \"Requirement already satisfied: ftfy in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (6.1.1)\\n\",\n      \"Requirement already satisfied: regex in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (2022.7.9)\\n\",\n      \"Requirement already satisfied: numpy in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (1.21.5)\\n\",\n      \"Requirement already satisfied: blobfile in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (2.0.0)\\n\",\n      \"Requirement already satisfied: torchvision in /home/hjzheng/.local/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (0.15.1)\\n\",\n      \"Requirement already satisfied: diffuser in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (0.0.1)\\n\",\n      \"Requirement already satisfied: transformers in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from perpneg-diffusion==2.0) (4.25.1)\\n\",\n      \"Requirement already satisfied: urllib3~=1.25 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from blobfile->perpneg-diffusion==2.0) (1.26.11)\\n\",\n      \"Requirement already satisfied: pycryptodomex~=3.8 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from blobfile->perpneg-diffusion==2.0) (3.16.0)\\n\",\n      \"Requirement already satisfied: lxml~=4.9 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from blobfile->perpneg-diffusion==2.0) (4.9.1)\\n\",\n      \"Requirement already satisfied: wcwidth>=0.2.5 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from ftfy->perpneg-diffusion==2.0) (0.2.5)\\n\",\n      \"Requirement already satisfied: charset-normalizer<3,>=2 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from requests->perpneg-diffusion==2.0) (2.0.4)\\n\",\n      \"Requirement already satisfied: idna<4,>=2.5 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from requests->perpneg-diffusion==2.0) (3.3)\\n\",\n      \"Requirement already satisfied: certifi>=2017.4.17 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from requests->perpneg-diffusion==2.0) (2022.9.14)\\n\",\n      \"Requirement already satisfied: nvidia-cublas-cu11==11.10.3.66 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (11.10.3.66)\\n\",\n      \"Requirement already satisfied: networkx in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (2.8.4)\\n\",\n      \"Requirement already satisfied: nvidia-cusolver-cu11==11.4.0.1 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (11.4.0.1)\\n\",\n      \"Requirement already satisfied: nvidia-nccl-cu11==2.14.3 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (2.14.3)\\n\",\n      \"Requirement already satisfied: sympy in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (1.10.1)\\n\",\n      \"Requirement already satisfied: nvidia-cuda-runtime-cu11==11.7.99 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (11.7.99)\\n\",\n      \"Requirement already satisfied: triton==2.0.0 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (2.0.0)\\n\",\n      \"Requirement already satisfied: nvidia-curand-cu11==10.2.10.91 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (10.2.10.91)\\n\",\n      \"Requirement already satisfied: nvidia-cusparse-cu11==11.7.4.91 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (11.7.4.91)\\n\",\n      \"Requirement already satisfied: nvidia-cuda-cupti-cu11==11.7.101 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (11.7.101)\\n\",\n      \"Requirement already satisfied: jinja2 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (2.11.3)\\n\",\n      \"Requirement already satisfied: nvidia-cudnn-cu11==8.5.0.96 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (8.5.0.96)\\n\",\n      \"Requirement already satisfied: typing-extensions in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (4.3.0)\\n\",\n      \"Requirement already satisfied: nvidia-cuda-nvrtc-cu11==11.7.99 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (11.7.99)\\n\",\n      \"Requirement already satisfied: nvidia-cufft-cu11==10.9.0.58 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (10.9.0.58)\\n\",\n      \"Requirement already satisfied: nvidia-nvtx-cu11==11.7.91 in /home/hjzheng/.local/lib/python3.9/site-packages (from torch->perpneg-diffusion==2.0) (11.7.91)\\n\",\n      \"Requirement already satisfied: setuptools in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from nvidia-cublas-cu11==11.10.3.66->torch->perpneg-diffusion==2.0) (63.4.1)\\n\",\n      \"Requirement already satisfied: wheel in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from nvidia-cublas-cu11==11.10.3.66->torch->perpneg-diffusion==2.0) (0.37.1)\\n\",\n      \"Requirement already satisfied: cmake in /home/hjzheng/.local/lib/python3.9/site-packages (from triton==2.0.0->torch->perpneg-diffusion==2.0) (3.26.1)\\n\",\n      \"Requirement already satisfied: lit in /home/hjzheng/.local/lib/python3.9/site-packages (from triton==2.0.0->torch->perpneg-diffusion==2.0) (16.0.0)\\n\",\n      \"Requirement already satisfied: tokenizers!=0.11.3,<0.14,>=0.11.1 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from transformers->perpneg-diffusion==2.0) (0.13.2)\\n\",\n      \"Requirement already satisfied: huggingface-hub<1.0,>=0.10.0 in /home/hjzheng/.local/lib/python3.9/site-packages (from transformers->perpneg-diffusion==2.0) (0.13.4)\\n\",\n      \"Requirement already satisfied: packaging>=20.0 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from transformers->perpneg-diffusion==2.0) (21.3)\\n\",\n      \"Requirement already satisfied: pyyaml>=5.1 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from transformers->perpneg-diffusion==2.0) (6.0)\\n\",\n      \"Requirement already satisfied: pyparsing!=3.0.5,>=2.0.2 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from packaging>=20.0->transformers->perpneg-diffusion==2.0) (3.0.9)\\n\",\n      \"Requirement already satisfied: MarkupSafe>=0.23 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from jinja2->torch->perpneg-diffusion==2.0) (2.0.1)\\n\",\n      \"Requirement already satisfied: mpmath>=0.19 in /home/hjzheng/anaconda3/lib/python3.9/site-packages (from sympy->torch->perpneg-diffusion==2.0) (1.2.1)\\n\",\n      \"Installing collected packages: perpneg-diffusion\\n\",\n      \"  Attempting uninstall: perpneg-diffusion\\n\",\n      \"    Found existing installation: perpneg-diffusion 2.0\\n\",\n      \"    Uninstalling perpneg-diffusion-2.0:\\n\",\n      \"      Successfully uninstalled perpneg-diffusion-2.0\\n\",\n      \"  Running setup.py develop for perpneg-diffusion\\n\",\n      \"Successfully installed perpneg-diffusion-2.0\\n\"\n     ]\n    }\n   ],\n   \"source\": [\n    \"!pip install git+https://github.com/Perp-Neg/Perp-Neg-stablediffusion.git\\n\",\n    \"!pip install diffusers\"\n   ]\n  },\n  {\n   \"cell_type\": \"markdown\",\n   \"metadata\": {\n    \"id\": \"vGySZS39FcY9\",\n    \"pycharm\": {\n     \"name\": \"#%% md\\n\"\n    }\n   },\n   \"source\": [\n    \"# **Perp-Neg using pretrained Stable-Diffusion 1v-4**\"\n   ]\n  },\n  {\n   \"cell_type\": \"code\",\n   \"execution_count\": 1,\n   \"metadata\": {\n    \"colab\": {\n     \"base_uri\": \"https://localhost:8080/\",\n     \"height\": 579,\n     \"referenced_widgets\": [\n      \"7a15fac547de426682b10aab3ee8ab28\",\n      \"f0386c3b5c3b4bbc91baa3a300241bdc\",\n      \"0b29c9cf11a14cfc91b3ed25834b3db8\",\n      \"f1f2d0ab1787476aab96fbb78176f4b0\",\n      \"ea2170f36d9a4fabb8d3570d190f3406\",\n      \"d374aac4cc4141088044e2c663baa146\",\n      \"3b43d183fa31402cb33ed6733dac0f8e\",\n      \"622b9e3567984a57811d1fb68dca3c8c\",\n      \"8fc8e833967e4948a3dec4714b1e432a\",\n      \"c529baa978e94cbfaee08055fc5d5012\",\n      \"808b869f427b4628bb1790165c00c64a\",\n      \"daa47040dd41460f95a470fc7f2edd9b\",\n      \"832b523eaeab4c79b02f54f79faaecc0\",\n      \"3b68375fba4e4fd4b1349bae894995c1\",\n      \"0e39cd0b31774ed3b97081b767e1d348\",\n      \"ac3ed15108484e398f0c842e7f3f001f\",\n      \"ce0062fb965b40868061eedc16b54a5c\",\n      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\"9e242fbc45cd40a2bfb5131a6310a75e\",\n      \"babe5c904c47478fbdfc1b2dfa100e69\",\n      \"e7c244e63c144b00812a87b9ed1ec0f8\",\n      \"73840385d3544d9c9f4bddebe63e143c\",\n      \"ec7311e77dd145eaacb05fc4a9132900\",\n      \"908c09b9c3834ad9980557a8665708d8\",\n      \"0a737abc8dbc4fd692d038bc15ae04f7\",\n      \"6d0eae6bcfa545408011ec1c2e3256d2\",\n      \"a20493f67fdd4d509cb4a205695a0b64\",\n      \"8d0c37c3a4004293b7f402d02156bdf3\",\n      \"8f4421503d80478482de92fc345abb05\",\n      \"2c1ac055fbf341d68bbb075d6dede5c6\",\n      \"a4e0981f8cf741ceb58652d5e43a323a\",\n      \"66f2c5b960d14c5daafc0d5240ec1215\",\n      \"cff3083a76e34a2db0cb78de06bd2243\",\n      \"aa80a5d8c85e4209b38c0d7b20bd4a19\"\n     ]\n    },\n    \"id\": \"8fNLZCu5Fic_\",\n    \"outputId\": \"a2049c35-8cc7-4314-a337-cd2afb00bfe2\",\n    \"pycharm\": {\n     \"name\": \"#%%\\n\"\n    }\n   },\n   \"outputs\": [\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"cuda\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"32a75109602c441abe015ba38cf202aa\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"Fetching 20 files:   0%|          | 0/20 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stderr\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"The config attributes {'scaling_factor': 0.18215} were passed to AutoencoderKL, but are not expected and will be ignored. Please verify your config.json configuration file.\\n\"\n     ]\n    }\n   ],\n   \"source\": [\n    \"import torch\\n\",\n    \"import torch as th\\n\",\n    \"from IPython.display import display\\n\",\n    \"import os\\n\",\n    \"from PIL import Image\\n\",\n    \"from torch import autocast\\n\",\n    \"from perpneg_diffusion.perpneg_stable_diffusion.pipeline_composable_stable_diffusion import ComposableStableDiffusionPipeline\\n\",\n    \"\\n\",\n    \"has_cuda = torch.cuda.is_available()\\n\",\n    \"device = torch.device('cpu' if not has_cuda else 'cuda')\\n\",\n    \"print(device)\\n\",\n    \"\\n\",\n    \"# initialize stable diffusion model\\n\",\n    \"pipe = ComposableStableDiffusionPipeline.from_pretrained(\\n\",\n    \"    \\\"CompVis/stable-diffusion-v1-4\\\",\\n\",\n    \"    use_auth_token=True\\n\",\n    \").to(device)\"\n   ]\n  },\n  {\n   \"cell_type\": \"code\",\n   \"execution_count\": 2,\n   \"metadata\": {},\n   \"outputs\": [\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"cuda:1\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"b7ee5636b60241d6abffdf9c614eadf6\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"Fetching 20 files:   0%|          | 0/20 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stderr\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"The config attributes {'scaling_factor': 0.18215} were passed to AutoencoderKL, but are not expected and will be ignored. Please verify your config.json configuration file.\\n\"\n     ]\n    }\n   ],\n   \"source\": [\n    \"from perpneg_diffusion.perpneg_stable_diffusion.pipeline_perpneg_stable_diffusion import PerpStableDiffusionPipeline\\n\",\n    \"\\n\",\n    \"\\n\",\n    \"has_cuda = torch.cuda.is_available()\\n\",\n    \"device2 = torch.device('cpu' if not has_cuda else 'cuda:1')\\n\",\n    \"print(device2)\\n\",\n    \"\\n\",\n    \"# initialize stable diffusion model\\n\",\n    \"pipe_perpneg = PerpStableDiffusionPipeline.from_pretrained(\\n\",\n    \"    \\\"CompVis/stable-diffusion-v1-4\\\",\\n\",\n    \"    use_auth_token=True\\n\",\n    \").to(device2)\"\n   ]\n  },\n  {\n   \"cell_type\": \"code\",\n   \"execution_count\": 3,\n   \"metadata\": {\n    \"scrolled\": false\n   },\n   \"outputs\": [\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"4079990b03804fa1b696bbbc42db8656\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"[False]\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"image/png\": 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\",\n      \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"composing ['an armchair in the shape of an avocado', 'cushion in the armchair']...\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"f2e2e70bd0b4422eb3cd6d8a6dff4ddc\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"[False]\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"image/png\": 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\",\n      \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"composing ['an armchair in the shape of an avocado', 'cushion in the armchair']...\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"31231bebba524111aced3b9504668ef3\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"data\": {\n      \"image/png\": 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\",\n      \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    }\n   ],\n   \"source\": [\n    \"# Sampling parameters\\n\",\n    \"#@markdown Here is an example of composing sentences using <b>Negation operator (NOT).</b> \\\\\\n\",\n    \"#@markdown <b>Negative weights should be assigned to the textes you wish to negate.</b> \\\\\\n\",\n    \"#@markdown `prompt`: when composing  multiple sentences, using `|` as the delimiter.\\\\\\n\",\n    \"#@markdown `weight`: weight indicates the weight importance of sentence when composing, also using `|` as the delimiter.\\n\",\n    \"prompt = \\\"an armchair in the shape of an avocado | cushion in the armchair\\\" #@param{type: 'string'}\\n\",\n    \"weights = \\\"1 | -0.3\\\" #@param{type: 'string'}\\n\",\n    \"scale = 7.5 #@param{type: 'number'}\\n\",\n    \"steps = 50 #@param{type: 'number'}\\n\",\n    \"seed = 145 #@param{type: 'number'}\\n\",\n    \"\\n\",\n    \"# positive prompt only\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image = pipe(\\\"an armchair in the shape of an avocado\\\", guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=\\\"1\\\")[\\\"images\\\"][0]\\n\",\n    \"    display(image)\\n\",\n    \"\\n\",\n    \"# composing prompts with CEBM\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image = pipe(prompt, guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=weights)[\\\"images\\\"][0]\\n\",\n    \"    display(image)\\n\",\n    \"    \\n\",\n    \"# fusing prompts with perpneg\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image_perpneg = pipe_perpneg(prompt, guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=weights)[\\\"images\\\"][0]\\n\",\n    \"    display(image_perpneg)\"\n   ]\n  },\n  {\n   \"cell_type\": \"code\",\n   \"execution_count\": 4,\n   \"metadata\": {\n    \"scrolled\": false\n   },\n   \"outputs\": [\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"4324d67021194c94917a9bb831f50f3e\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"[False]\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"image/png\": 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\",\n      \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"composing ['A boy wearing sunglasses', 'a pair of sunglasses with white frame']...\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"307a8d1b35354dfa852a782fb1919846\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"[False]\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"image/png\": 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\",\n      \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"composing ['A boy wearing sunglasses', 'a pair of sunglasses with white frame']...\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"c875171e64ed498b98d6a2f0b02f94aa\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"data\": {\n      \"image/png\": 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\",\n      \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    }\n   ],\n   \"source\": [\n    \"# Sampling parameters\\n\",\n    \"#@markdown Here is an example of composing sentences using <b>Negation operator (NOT).</b> \\\\\\n\",\n    \"#@markdown <b>Negative weights should be assigned to the textes you wish to negate.</b> \\\\\\n\",\n    \"#@markdown `prompt`: when composing  multiple sentences, using `|` as the delimiter.\\\\\\n\",\n    \"#@markdown `weight`: weight indicates the weight importance of sentence when composing, also using `|` as the delimiter.\\n\",\n    \"prompt = \\\"A boy wearing sunglasses | a pair of sunglasses with white frame\\\" #@param{type: 'string'}\\n\",\n    \"weights = \\\"1 | -0.35\\\" #@param{type: 'string'}\\n\",\n    \"scale = 11 #@param{type: 'number'}\\n\",\n    \"steps = 50 #@param{type: 'number'}\\n\",\n    \"seed = 200 #@param{type: 'number'}\\n\",\n    \"\\n\",\n    \"# positive prompt only\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image = pipe(\\\"A boy wearing sunglasses\\\", guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=\\\"1\\\")[\\\"images\\\"][0]\\n\",\n    \"    display(image)\\n\",\n    \"\\n\",\n    \"# composing prompts with CEBM\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image = pipe(prompt, guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=weights)[\\\"images\\\"][0]\\n\",\n    \"    display(image)\\n\",\n    \"    \\n\",\n    \"# fusing prompts with perpneg\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image_perpneg = pipe_perpneg(prompt, guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=weights)[\\\"images\\\"][0]\\n\",\n    \"    display(image_perpneg)\"\n   ]\n  },\n  {\n   \"cell_type\": \"code\",\n   \"execution_count\": 5,\n   \"metadata\": {\n    \"scrolled\": false\n   },\n   \"outputs\": [\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"45a37250e89948ce8e6db806df7b2667\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"[False]\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"image/png\": 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     \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"composing ['A painting of a cute corgi wearing a crown', 'a crown with red ruby decoration']...\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"98d14fed51ce4cb29eac55104371d487\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"[False]\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"image/png\": 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     \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"composing ['A painting of a cute corgi wearing a crown', 'a crown with red ruby decoration']...\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"d3c31f37ff6344bd92731d057cc2d3b2\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"data\": {\n      \"image/png\": 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\",\n      \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    }\n   ],\n   \"source\": [\n    \"# Sampling parameters\\n\",\n    \"#@markdown Here is an example of composing sentences using <b>Negation operator (NOT).</b> \\\\\\n\",\n    \"#@markdown <b>Negative weights should be assigned to the textes you wish to negate.</b> \\\\\\n\",\n    \"#@markdown `prompt`: when composing  multiple sentences, using `|` as the delimiter.\\\\\\n\",\n    \"#@markdown `weight`: weight indicates the weight importance of sentence when composing, also using `|` as the delimiter.\\n\",\n    \"prompt = \\\"A painting of a cute corgi wearing a crown | a crown with red ruby decoration\\\" #| green cushion in the chair\\\" #@param{type: 'string'}\\n\",\n    \"weights = \\\"1 | -0.8\\\" #@param{type: 'string'}\\n\",\n    \"scale = 3.5 #@param{type: 'number'}\\n\",\n    \"steps = 50 #@param{type: 'number'}\\n\",\n    \"seed = 200\\n\",\n    \"\\n\",\n    \"# positive prompt only\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image = pipe(\\\"A painting of a cute corgi wearing a crown\\\", guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=\\\"1\\\")[\\\"images\\\"][0]\\n\",\n    \"    display(image)\\n\",\n    \"\\n\",\n    \"# composing prompts with CEBM\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image = pipe(prompt, guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=weights)[\\\"images\\\"][0]\\n\",\n    \"    display(image)\\n\",\n    \"    \\n\",\n    \"# fusing prompts with perpneg\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image_perpneg = pipe_perpneg(prompt, guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=weights)[\\\"images\\\"][0]\\n\",\n    \"    display(image_perpneg)\"\n   ]\n  },\n  {\n   \"cell_type\": \"code\",\n   \"execution_count\": 6,\n   \"metadata\": {\n    \"scrolled\": false\n   },\n   \"outputs\": [\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"36ba7447317b47e9b2be3ec3586deed4\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"[False]\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"image/png\": 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xYupPRjDDvp9PTd9/f57x/8zLPE4BScMcBcw65zas9fOwiV2ddmmuurlJipgjDL2mNRo+SFDOV8G50u3vzxlq7v7vTzN62zHRAmfOyF4qn0/sWD8Ov/PXrN3e3cblM6xvmjBFsVhpdEohi9FlvS6gXi6PWZRZ0W5hRRXAcmmkDs1oC2669tczIfae5Q5HVv3t19jnTWpXjNDcFUuGtSwmBZmJWG6s8mrKlfabVms06v2onI0fAZISZgwCaFKksmOru9XiLKVZKGoeAJZrNTCnJJAg3xCPtg0ws4ahYC9hCbygW5/gPi9h53FUGZR2YWvwSzczZUb+f8GYSW2sRmZqZMECkkON8tub95ubK2u/83u/f39999OMP1TaTglCK5kXSkqR5bdGIWGe0KJMZt+vr5u329ZsIbd0JFOa/e/Xqpx999HB3B8hIpjKHFEIDmSGa6UD8oC31L/FLFCHbtgFR6Bv0/XI2MyGq5ax+zYxLCS/s70VbFWNApLLwIR0wwmCeGaj+QAI494uRkqxZ7sGtG0QkWtVWAUm26iHqORSeBd42sHRHprkRqwerKlnvywqRS0cJTFm4NSkv9/dV/SIiI0p56Vvv/WTA9c2T2zevSeQYdEeGYCX4ZHFBZnPO+mitd6W8NYqpXK6CYt61iBuZOZiKSDx5590Pvv7Nly9fPrx+0WSEVatSh2bOXUgJZr5+IAueH3i1mMIEm5shMymYOxIZUU8AS5oy8oDwKbRuTre+JCUAAaNJUoq+TvTCiMWCUIAx5pBIhxnNGDkeZTDaKiIHIq59ASMl1FuEWdv8zYuXL1+8huYBm80WnwakQgnBnALa1t5/74Mnz941+PnNG2jWSnMzZdbun5Gkq7H10698+7vXV0+++PyLy+2LvFxkiZkyETBzGmPmtvn19dOnz967unn68sXnY+xxeYhkhsAwWD1Yb2x9a7HXcZipBNW3d9rWQFxam4ClAM8ozIVEgao0M82UiqOrdgRappEUgATMMuRuSzORCvqWgLL6z9rw8kS++up5MaGsQjCK9xlWlZQuuW/b3Zs3f/+/+vsPI1+9fGXs3l1zzxzV6oLIBFLuXm9KgDcjkAhkafDVYKmKQnERRidFGhIBXT159pvf/91nz97/9POff/rxT3LsIUQkrfgVmvkCoVF9iw4CaJEvUoIlOtfJWDsXc8zmCitNvkhkZIo0b1VwpSiX0iBMSDMSLqShmjuoerFiE2ky2unaoX1/iF2iqKDVszBI5uzNM5FzlmQPBQ4BHCIO2Iyli6wSA2ssHRXHKdkamMpMZBFRNBt7PQG6eUrNmBQVgLVte7Ld3L5++fLVixgXMTNR30spIR6ZszLTNPMlxCix/EhSpyhz5kGKN2PMfPnFF6Sp6DRzzCFzHGYt1iMQlFkr3EiBVdaWnSOGKICtuxJQ7nMo0lsXFHNWC0lDCWFUWURkrZiv1V96axGDmRGJ8otZLXclpqnNA7XRXJETIunNIDEnAMzIpUstuFFMdWYIcvdFQdRxucSJlBJ4XOl1hMPNEyqaWRlPnr0j4QKYNGMaBSlTmSNC+9gzZ6acZqDQ8NYxEgsxOZWiF1SKnEfDaMzMLNeBzBoC7L0368rcx+X9r3/jb/47f/tf/8u/+Oj2lWZgBN2E+gIBkuzMPGQZKorMX41mfcrilOcILBIuidJyFiAut0PGLNtbM44QfJHDkROHce9RGix5aWkA1egISlkRkxEAD0gQRVSyDAA4WAQZHqsfBDNFZvLh/uHnH3/0cD7HGJQUqq1k1igUt1y7TplQ3y/3Ut7f36G4jiywXs8oQfbuAANxff3kD//mH3Y/zX18dv8SRXvQlp8RkJIOZPbeTlsngwUDe4uxK2VmNGvc0mfEpYHm3WKOGWHNYTbnZX94GHNqTha5a8Vh25whyI1ePaR7llhYp2IqUW1m4vjDOgBLfCcPdk8GwOAw0BKkeZtzANBMc9CYMmQi5M2RCTeIUjr97vXL6H07XZONzMQlNL25kJkiYVVbq3hAdrC4ZcIqFdPIyCRkbkUbwOsgX6Ioad3MIAd67zOnQum9SEaKi4soy4QUufRG5ZJP2UwzzaxY/JJdQbkzlZRBBTML/9IOu42gmEk38/WVAaZiCV+Hu7UKsnuTZUS89+zZr/7mb378w7989fwLwCKjZO5SLcx9ZixKJGStDvLDwbVeT5WSxBIaju6GVVKtbME5J5aYlnXU5QyEVp8NLMdZ6cXQ3PeXl8uLV18oZ4zpVvuKtixAXPtn/eHR/VU1c8vMuAyyXExRJhUvwkHZzCTJNObsJJtTCaVZmzMSaG4UDLbI3wInAqRinIvRyoShF8Fj1iSYMbOc0EE3ljwCmls132ZGepEdBQhIW33rEpqNSwnSomzqH1lJBrlU9Dz2Tf0zph69uVovpKwpS5uXlkpQkH7x5suaIapMkBASAHV5ePhqRvN+fXVzuTxowt1B5IzL+WzNMwNZ7DzWpyzyLbP+AEJOAUZHSjSjk4n12MqTVpg4xNa8bXSflx3kw+3tT374o9vXt0S50iwzaQbznLNo4N67ZiSgDPO2TELFYsoA0Iwl/iw4m2sb8tHgBQjJJWeS7G0ZDAVblgcAwNrveqTiZcbeekbhM1dEzFlCcNv69c3Th7v7MS6Aoj65ylliNAckw+K7AXMYLPZxt++KoOSNkfIFqKvjFYlQ2Wc8xv7yq+ewAnPphTXpBovqT7TOmDF33b785//oH7n3+/MDYhfhJI0wIiUg5rTWUxgx3ty+3PexX87KGOedxednkD7jUnR1U5RQhta8oP64nOcYqWWZiJAXa4Z0QwpGuTEyo9zFnBnprCKXLDqJkLJISh5KaxZFiYLRSwGs/R8Zi3pzY1mkYlYtdgGtGyXB3TOi9fad3/zuf/g/+Q//7F/+4F/9iz8533619eabXR5ucyTrGDcryiLmBITMpbxV0w1XJmXHybQ004jS6I2w/f7+h//mX7L5iIkZxVd5awUylbnaViNS1SSWc0PmApViro/v5khQWarIzGzuAKKOB8wMofFx/wPmbrAqHx6WmnWAQBIby52oJKA5ZyK9+RyX18+/7KcTaakkHapjyDNnzAG22irelwM/wQVvreTGKk5lo64urdYVza15E1EWlMI3xwcumLOYp9W4CbZIKhB4eHhAjs17p4GZBaPX2iiHK7WAQelHKYlkZlbnu18uSJXrFDiw5kGSpqI1T8iWZmtKeasqAdAT5SYDveyEkNKt1Qbr/YpXPufQCLhtW6c8GRgRSnMHLRRKGnmMypQ7MxZRU9+h5MN6fDy68gLJXD64wsEqYThTM5Y66gaZyCL8lhGF9UPd3JWpWYoolwpdLVZpBbUBrVT1RSJh/bFiv1jHhJAFlep951KxQ9X0KDUl0tzKr5mFR1YbV6324ZEGCePjOVW2FsIpKvNyGTMmoNevXt7evZ4zSzKMlHunE+TW+xjTvW3blp77vvdtE5Cxl5PE6JFpSxEuME3a8saWEcLXOSu4ffNXfu2yX159+VwZhENQRHFOXh9VWCbEJdsDQu+9NT/H3K6u+tYvD+c5dzMjCp9NMBHJ3iwB82UoI2zV8bXotRr949GiTnqitWWVg4xe0yecs+hOkFHmH5JAZBq9KJJ6o17fdA4SMS6vnn9WLnACBkOKbCBhoUxbYCDvX718aD4jNMPN3ay6B4LKIJFT5mhZKBtY4x9KgplDSqve/7EJJUdWb+UjQwqgtL6CbQu0YjU4JaXW6c1HfkwEkmUkkWQySAGZ0ejWLOdEGv1xQUOAFRmIHJdLyFv3D9599p/8B//+15+98+G//Ff7nFc3V3BL78rIMd3c3alcdUFavcxytZGlOeehfqfonHM2bwTd24zMiF2JIaWMZtTMdNVXXhaZKDWh3MeF2pw5VZuMLPmHJK37nKOkEu81j2DWrPdtzoeskaWyPUbCmxlFi6hxI1gNLs1w56MQS2RKbs2MmfP1V1+9fvEckPfWrCWYMyJmRgSxnW5GKMdFM7j16kur78sytlYraiWjhYlLuJastD0ckK5Y4WWfKB20bBuOxXolEwIj88mTd7y1u/1sO0WsKuYNkfS1JFaHTGm16tXlP/bSXnWWRmWWzwNc7o+IQtKiVYMjatke6mCPnEqpBg/rr5oBWg0mRerq6vr9D77x8vbl7csXJddsrVd7EjHLI2DWlluQMpoi5wyrsmLlV0zyQMNY/1kH6NH/+foE0pSQgEVMwd4ybNR6SgkBZm6gNVdkqVj1P/VPwePx66AUivOxw77ztkBzzp0KJcwhZUbQrAmsrrwa5Edm3Fa1XH89yjFc3AXXjGLRKIv+JaxkCANR81nXNyekJzLnxQkkM9MNUCgcTNDa1tzalDLn6epqO50eHu4Vi9ZBqYxvFRstcx8IQwbcS0xAKr31b//qt/t29ecPfzIe7pFprc+MGifK1ViUpFM0tNHW1MUAMiIzMqzch3UCzX2flz0j2cCqr2Y12+Rl7iG0lJd1snPt/cwoo8zqcVIQtJ22VEaMx2OimZtbTTvh0DBK7ROFrK6ArXUay+2aSl/1tbxiabI4lpC5GzAjMycFo7tVOcWad1mPQSRa4bmisEtgiQiauTdJ7q4kkChJieVUU/kijNaMs2RRUush4zhnUO9YODAMRR4Ge8i81Y7XjJSBsuYpOddPOJS76q2zph8dHjl/9tGHf/zP/umf/Ou/vH94PnW5vx9ungrC3elYHluD1yqlcZnBat/UV2ZEJMHtdKK7jUvMoCEyyiJv1up9FIg89W3psWtexszWhsfhFs9ZLvtUJrxq0TKYH8YnIiGz1joXDHLzXBixDvfmGTOhS6a1KyVjPhCwzZGAch7DDbRHwstkNe1m19vVr37ndx/uXj3//AuM+xnz5um7f/t/+Hd/9MMPf/GTHzVzgoqAsYZPjC4lRaeXZ85rkBIyJ2GJlHINigrUarMPJkoCZBCjlpWJ5oyYRnv63jvvf/D1h3k5v9hTaWW+Jtz96JsgrZlC+pqsMavSDoDKKUjx+HxovyTDISHIq05EwqwoWqOZ25wT5qer6xFj7rtC8KM7yWWZlyTkjAsl0DMmZ0zOKjrmrb4ThHJxWnnPy6ay5B4zqwZQLOIIR+2EVoEASXtL66zpZdW4ons3ehGFZdKSVDI4BDoFzkwjeu8Qg5G5LO2rllG1T8klHZNWGl2kzOneU0EQ4tynlHRbQ+sQvVWbP8b0ZoXRoxBAHpODtXopxSGg8zgG3j6iJDnG3rZTmkHKEeadyBEXMzdvREgmYs4JQ6TmjN4cwNgvikgFYF5ADY//NxcYlRXi8V5sDOac1pyJn37yUb954taibznH3KP3LZViNQRl0llgFwThC8DNgHLsY44JN1gjgIw5B8mM7KdtJq+vb8zaw8O9MiCVQl6NECjMMp4VqF5P1qyRSiRF9y5FNYo1NuReYJ1Ig2YNMS0muv4fN5ov8AOIMLp7h4AMEAHvvZGWUaM/tXMficqiP0ATjCXh0GhJmWhs3hpAGnMmaVJY87XTUACm3FE1mScZMyYleWkZZClYVr54SDKriU3CFjemNTO2oO/RHWVZfdeH1vq7xdJgjfIUjWE1dg/S3GLys89+/vf+3n95fjif798s947mmsPwFiHNaFune+xDS5wnjNVkHyIM3a1vV9vV1ZiTbETMmW51/KJammANTTQcPUTR4pIiZcYaFajH2Lbet9OYY54v1a15d1vSFVrfzOx83t2agXNMZbob2JbfolrJMX3zHLp59+t/69/99798/vKjv/rz+eYVkq33zLEoeArJZFTradbWd6O/fvX84f527me/Onn4t771q3/4O39N4Z998mONPQPNXQyTUaq8jTrUc07rJ5rmHGZuzYuhqLHcpZ2vk6xW/YIFC+cVLVVdKuCdT05Xv/7tX//qxYvPX79xmnlb0smBGFd/RxzMxtH4lwti1Xmqjt6FjIuyW4QRUTEVCS5vMWjVEEC4fvrk3fe++fyr5xmJHFkqn3lJAcVwXM7n55cvYCSibLhjvxRpifKcoCZhcrE8dcBzKSitOcGYyxRRYP9to4WFjOv54NilKNpWstYEZK4yWydBMWSP2FmSkc5GWFI1zEU/cEPkwbNSZtXxLN+u0Chao9HUlmeMYIniYJmDq90Mwc2bd2WOmMu2Yr8ET+oNLSYLBi5tqIiK4ytt2wlAnC/lO3KZkU4rRl+Lv6qRsRPIzHPmGu+IGUqwAPxaSgc5cdAsC46weAszqrUekc+//Myt15TlHLP37dm77+3nu/Pl8uTmmZDn8/3cL486+tKfihdtTYC5kUxjRnh5xyO8eWZufXv69Clk+36JyJrGXTpWdQTrgddJXAjmcX3XQ8d2uhpjKEoIoDLKcVQsmpY6sqSqstgXIiyYnInChLXQM7O15t4JZoTKyD5CTLp3c4mRIxLNVsulCJqthlVsbM2tpQITObNUqqpWuUANzWsOuj197/2bq9Or1y/uXr1yYWuNxozj3zATFPtO3+hcE8QKwWBrGXGJFbJFtddxiIzRfFutS5nnmNVm1vTacs1Tcx/mFvvli09/UchkO3UlRtF29ZFd5n51c+PuD7g/3w9zO9z91dNnrdqyQjS3FPf7XSyZCqV/liFaLOJzPZLSmWmNVGVylFV/bdrW6Gxsyiw3GpUyKxr96sm1W2Nvse9AghkjcEgRJo4ZrdUAGiLj13/91/83/6v/5Q//8if/h09+9Pru5bas2URkprzs9kJRBsZWBM6I/eXzz+aYkXCZsX3x2U//wT/+/850moZy843NlTWRCVtmXpoZHBJnTMFMFlEWqdJ1kWnHAPNa6oKqnfetZ8xEKkICZZnp1udlvPjiS8ydZCq9bWAqUiuhwVZhqX6BxW5otc6HzvnIqfty7xYNVxM0tVpWVZA0I4ycGjCLnN/+7nf/9t/5H/3RH/3Rz3/yV2Z9XPZ22sqgpere6XPskrx1GFvryoxYnLWZZblFWF6y6t0Mmd5ahcOsSTmjyYr1XMzJcdA9Ntr1wB5BwPJ60BSZnBCLrVXaalqlOvvotn6MsdFFRSUhVC21Y4hV1LLI1xtaflwnImadSd6MBwcAHBSVlBUwUy/Y4DJzU4QVw1KdLZdaAC54bnRzgmvaljXJV05+qwIHRYieNRPeqttLkNfP3vnu9377EvOTn/woLpfW2pgXa97oUiCqprJYFix1lAf9/pZ8AjxnkCxtr7VOtytz6z0wIyYd9GoRVlu5hElVhZe5JdBa630b+6VIHq2XZ4BFROuIHGtkqNmMYNKcx0eq5v8Rp1hVuUIudRgUjwpyH/vWN0JWyVcQqRQtZQd1yYMDPRJjsMZ4AEXmIWCAlinlzEy6WS5tY3lUSJi3MlzoMCRkArTWgGyn7ZSpuQ+gyhSrFZGylg7lbk1A29rv/fbvfOPr3/w3f/mDj+7+Ncmcg62RvL6+Pl2dYs7z5UHuOSbNvG1SpGYoTYs/5CFu1AotuslotO2xyygYQSsRvzZN1vx9td/b9TUi5phj7GaMgbXDlAJzDtC89dZbJZm03lhFogByqmgyEpHpyFijPQapNS/hMo8GRI9MBQCYLCFIYe4r9oKiycwIyzlVdqlMI9CaNGOEd2+tKZXI0ujmGGa01oyPgWXWT82I1rcZw5xjv/zzf/4nH//i57GfvfahdhkI684ycqwmlp6rUjKVGWnm7q4RlzHiPH/04x985ze//+ydd17NF5CQ4WAsi3RZviNyBjvBfnq2bdv54VaxZ87Wu7ll5hHzgfqVVlNvzbw3rGllo8tlJLq5Es9ffPnl88/H5cFqgHqZULmsmMqqeQIIy5wR0Urgcj8+XJUdA4838ggM11JiHRf1X6uzgJAZ5njn5ua6N2S13jzdXCMSZNToJsmiYCseR5Y5i1Uzs6LaqRpsqJ5RQEnTplSpMRGTtqYqHnGNMh/dKeWqLKsvF8QREtZa71sKgX1eLt63o24vZ2dhhRogOCxuUrlYljp7NJ88AGpNUaFMtgDU+mZAiDHnoYUuLirXyWu1cupQnUozeAlN9UeruK9fQQJETLk5jIfyUG1LwbciSJIrNpGZWRUqIr3R3EX7+te+/o2vf/P2/vwL/9h6jstZSLdqK5EMFD2iJaxqvd9jhvHIKEzJ3asPM3OYQfRty8i7V68zJp0P93dQ1rgopeLWVuNt6zimGJmrOQcz8rFVdUdk3N6+Ib2mHzxtmR4WAaAaxzRIq1yoDNjLXGfeexsz5hyttXpKFDMSywFWozq2XPB1QJV/9JiiKnW0QGVQjiZx33cpofD1T48knExrNGdN86UyZ8U7Hm2JsWWm20Zclvfg7Q4njM5Wmn5Gom8P57uXr17MOVo/AYp9aB8Crq6vr66vMxU5Y99pxsNwInHZgJZuVYd6GQzReifM+hb7GXlAvFz/jptrQQBz78pZTo6x782bu2dzNwdyxSQAoJq3BDLjfHsr48zpZjkzUfNy1g6vfcwwazHi/u5uPXGy0oTymPOcY3prNdtFc3PLiJizpL7MiiARAWfz1mLO8+WsCJj7Gjpyc0lA6nL/ACvdb+l3RbutAzuCrkxdZrCZefv0kx//n/8v/0cQl7E3a+59joeinQnPnOUQWaCpbNQJyHovgQGaac0k58xXr14e/ndkhFLWvKYrMwLmIq9u3vHt+rvf+y3r9tGPfnj36jOvihuhyMNvUa0xQ+mt0YARUV4mt1qsKoRH3b95nTPcm7tbMz0K8jAIlXOZOVcp5jLKFzIxKCqhZAktj03t6jdz4a5YTgwTVuxhNWNw7x9//OGb8/n1q+cgxhhXfhPKmGO5+A2JbG1rHcqImJKWzs0aEMZbL0/tSrPeTak5Z0bWRtHiYMh8rE1E1KZFMTklj6GG/sgYO9VARgwBXuFOUhlxWCKAlt6hxyKfEhkz1uPgKrh4ZGfyIPTJRluJMUaMHWlUpaUsRuJx5E8qenaZNZAMTCxs9TgouFitavBbrwHKlJgzjmO9psJylb+sKAFUr5MxS/mHYOSrrz7/4dzvx64cYJI+LsM7Le2RVH3swZDLGr+IllhWLgKVGgCZcoJUyrpfXd9cLg8Rw+BQxD7W43qES8r1FI4HmDkxYw1b2PKrAQzJzFMZlwtozZv5ljVPdXjBVbhPrPwJKb337dQ1EOLY9+vTzdN33o2Zt7cvZ2ZG0B0E/JhA5dElk5Eqz2v1N+bordeBqvXtq6n45WhOMo8iWPlzxozk6nUqpumR0VgkZEthXh4yyoWWLCevOQxuFcnsQgo5Y3z0kx+5+37ZU2GAecscAOd+fkAsBpuS5E4plMkaHzUUGFywS8ZWG90Aat9rPvAYz1r1LKUKA3Jzs0b2PfYZAzlHRrPe+1YRVCRzjdVs5R8hbIyZCIoC6VTko3l64Vmzamwjogg5GLM8JaLRRJ2uro6Zm9xsa83HYztTv9iZsbJTCknImVJpjVp4GV5PMnZkGll52lY5DbmIFDqrJwNlZm7tvF8u9zsgk3k7Iq6VNAtNa02zBhusGa21gncxY1FpNShm3kDkfP38y4hwg5ExZUU3lgzTaG374INvXb/7gVv/63/w12/fvHn+6acPt1/mvrO1x1E+CZUGEo8ez6Li06HJI2dvdaS0bsCpK0KpZJbztcqJLQo71wayRKiEMhijOD1jZjza5CGhZsvr0a3mcGkBNMtYWhEsir358vmXX716jQkCvfmMS7XS1YaEliEAVRjLOT+ztbYEzqNPlDJDFKx7RSce8IEzAoI3L34RArJiGky1aW3NAdki9AGJ7jc3NzdP33nx8vnY99b6kcB20DNlNauGzAp/VB7WSvFTVuQRHz8hyoOlKUpAlPM3WTFmle5JHRFex0/GURqJyihkeQFWxOEaV3wc+q8qtPwwksoYypTD15ero1kooEejmSdIyypyGSnE69evX9+9EmhiM6bo/WDLcsW4viXWuaT3xVwtIFkgiRkZUk0VQZlzz9sQqonFnDX9fnzzzEqNL1oJi/SWkVn5cVVPzd6SX4JZSwQr1CsCuSzvwDr8srS+rLhumrnRwzEezjSzZhQqyVmFT2t+jS4eSSMV4INiz4wVmlZwZEkf6+SjO5B0p4DMnJNe53M5kQwrUKsaGdturiXt5/N6iu45A0DLeY6JjEArFU6ViHt4zqSckVmJHw8Pd4synLLN6cuDsl8exnggkCLItmx2qygbGHOidBW3ms6XUrSIgUR5+wpXrtoMUCKt3ClSipHlUO7O6kdjHu77PMxXXrGj3nqtvxoQRWbOXMBVtUezuhIanZ6Z5g0W5USvQz2VrZ9690ydH87uJsQcGTFSijmstdZ6faqarNQsuz5P19cGzBmpgNLcRcycFfpAWsTMg2STAAdp5RHKGV75d+PiMutevDszYwbNQZcy50zI4RFh7uI63pfmFFgTtm6CahAhxmRpQfTMhKgMFX0huPevfeMbH3ztWy9fvvnkpz+6e3N7d/uVFOY1gYVYEj1KH5EUMQW4W9Ev3pziCtIY01orwE1wMmtPdGsolHcwCsAxDFDPgykpRhbtWe0Nl2VmESqr5D0661EdjxVrZ2SWylYM6Yjcz26n3l3ImNObZ0SqEm9MUCLtOAOWpCkBi9mvX/voq1iyBLg2+hJcqVTkrB2BReACZBG2RJluLOfAYdSx3txpKxEsVIKC23EoZvWU/KUUARh5ZLXVisYCFoeMXkkePCIa5lxjZlqrY5UUq6/BZSgoYpGsCe1FBxkrBotu7gVjNfcJY9tKuMyMuWL8zGuACweJjSM1hwdDxBrMjiy/kgHMNVgbKcKs9YJKBmrNQWvR8VIRJussNG9mLAObEWnde289obGfc8y0aeYUrDeY5czWWubKMgZkZmVs0GJaViezUM964nzbAqDigWxhhcqRXdSMFZoocaR8U+stYNJoZmM/X9xmROZwrywclBOy8pPWwbneNctZkAtEUppRcU9rXBje7BG9HMMgCxmbV4wopoag3tvNzZOZsZ8vGdPNISrTmjWgNnNCkoGzPGG20qpyHT6CTu0UE2CkZJ1QxkiwggbqDStT9TOXUwVKMDORSWutd2RG5hp4lkoGs7IhH1BvwXkWs8GIwSDn4xmJ0uofG38ACbo30TMHlZlqzR9HPmvP1MYoo13NpMHWKADAnHWlySHcoWwXhDD2Wa9n7KOYTQDeWsV7kUazOSYKQ7iR8NKGUlkeBaxBEGG97EQFzMoa6Y9rcv378DJyaI6L+0a0inGGpnn/je/9zpdfff7m+XOm6GzmoqSYI4GKO7Vi1TNmpYHSjGucOIu5KjStCgUrULmfP/nJj372yUczwhCpuNw/UDUSmSDaEfvy2C+ukwmQssYCtI5DsTjZw0J/vDhUmKeyIlwYEVUv+ulq7vvYR0b009a2PseYI1pzkMvQtnwrh4hnhbrJWmqQmWeqYqYAFolTKTXIOQcC4d4WUEam4CDdEEdPUkVTucih1R4vQmvNcQoxKykunQTTrY2Y62yqIgzGHOaeEN1788icY1jFmWIpUnG53AkZs/cOoVRwI2L1gSrvx/FNcRD+S/Kq/VIfm8c8XVWkEoeaO8mYkRnm7saESlytVVGvDI+GqINrr8NrnbGkm5NWGTbWe2te10ONucfOVJSZV4sDQrlo6ke6NXpRQsg5StiosAPr3VnouqooUXN01fEDWo47Ph4jNVsNyM17P0XEzHRrp6urd9/54L33PtjH/vz553dvXkVclNN9q9f2yIf8crlfD7Ge7KrlC2WuwBwILNsY3ZhTWe7kkmfireGzhp9qehxuZeKNiBR638a+K3WXt6XNlP/F3FdY2AGrlvZItta8UK3V1MKImTNnHarFlBbGN284tMrH3qSqK9fUnJde6+beGuejqtGkaKK5WfqoF6AypC/gqcrCNtCsjXEhEjAp1BwRlaCdM8qYB7NWJomcktjadjqlNMdeX4xmqWzm6sg5sUJ0vO5ZqF9bUs9CmgW9Uok00NxSJQgYvbZ99WbcttPTd9/NzNvb1+Ph7K02SNa7qhymeq/1UWmHfFvW4HLgVUgQuICVEGPE0Ey5r9Oj7swBgOQsEsChzNablHNkzX0kslkLPHrmlVm3BXitGXNfsyLlkTCCdKs0fZGWOSHa1lrroKhE5Izpzf7m3/mbP//5z//ZP/lvVlDljIzMSPeVDczFH8ZbCuFQOIymmRU3ac3AppiSzGyOfbx5SaekjKDRYK33TEWk0/WoRq7mlKyoCcUBopeHpA7ZxWnWi4pHtBO1lwMypbuPOa+ub97/+tdev3wz9wtp23aVxLwMc6N78d2KMn8c2e51sriL0NQy3nHZC7RcKsqYRYYqNZE3Nzfb1fX9/X1cLgDXzPkMHNHLqoAHkc4YEyzC2I4OkBAiVZ63bp0pc18xKkLMmaHttCnSbJuZ7v3Js3eePn1yd3/35vlzZcD88Gliv1zy8lCHJlRGkMdmmTimooG39uniMBVR8GKpLW9J6Ppj827SIs4OYbr6/1Um8EgZ1btEsUf19xeDqOMULbhgbqHF12Xh60p/oYsprqDTqu81k50qkWWlStTqLL5bgipCqBjQtSULSr91X+AAFMf2XDjGsfh2jYCaexMRjNSsqUzDgqs5A7LyQy3fV3UkXNktELj6mKMqkHWdAswUMu9VHnL5a4tpBHwRdXVEWblI1rWDkmI/z6Lqe++RM8ZYexAwFMOTFZuzgsVQg0SUEDnLdLiKfWZhIV/pk1AGzVGZqavzNzNCDMUa9OtutBjz4f4e3nKGNUdiXC7mTrN28/TJfp7j4W2SGpdfbbmFYAQ9IubcK/cXRM6E4FyUH1TtvGnxwpLi6ZP3fvu3f//5i6+++Ozn83Khe4xY/FcdbcUSPt6u8WgutwOXLgKrAiakTHPLx49WaQEGh3mzm9NV267HiHG+EBiXoRrQWMLD8tHWwi/+VCucgY8YdTVXYmVnFtFRlxbUDnRrRcyt72AmpbsBlb1MdzezuQ95qkzLIhY9WH0MW2vmbY7JyciRxdGaQbaMIzX1ZGzWzAyKmYAxFcz48z/9b1+9uS+PVAp0L8XaVsd4DOhreQyRKr4xR9DMeuMcZcIMLHeL0nxr5ZPLyO6tBISM1EpbkDsTgqmevgE83GIkkVF4ubIsHgtOvdflXqho0gPvlJWNZm3rinzy5OmbNy+27fTd73//iy++uL97Q/jCaqXc0bx5RM45kTgczFNEJByoPcoKoyygg+PBO6/a9bd+5TeeXD/92ac/e33+Qgr2TpgiFi9cvgOpevEjKS/XFHS1EMualuaL9K1snHfe/+Dm+snnn/1ivz+XLgXz5uz9+oP3v/706bN9fCpa5GzWI8Ls6HUEpdxaUtZszcWB5sx1yvIgF2rJOSSVHLSWN5dbnqvac0G9Gistc0VCoB8uz4X7pCO+oMJ9H/vuQhQHG17zHYubhhQxZ441r6QQHWQqaEazut+TYERaTYwbGZGkW1euu76wRsu1zpp1qGg15MeRVQtlNdk0GDNrS2KOHYQ3V8b5/s354e7Vi89BxpwxprdWXeB6Gqr+QN7bMWGwwO9qN5ccXkygAEUGZaIyY1nMJaPX7HpGtK0do51JUBlm7t4jMlPWGixIRigRbzN/D40/I7TcDqxeP3W0vUIo50wzbr1TaTBlGGmwUEZ5W2rEKwvr0r2VOxfLP2AZMkNK4/Lg3jOTaSmYgxSpRrry4kZIi19bLJZgzEzvJ/M29tG2zSv5JhbYKf+4m6aSyzW/JlohPHn69MnTp1989UUirTnpaYoIQFzXsbJGdiDR1mLHIRUXGD+YhtWMALVFedBWLMVj388vXj1v7bSPvVKFvbXIiYV1dfzE9aMXBjzQWy35xMpsynVLVHprdMs5Ys5lt3ay/NurxOWCzZmQzOjNzdwMQHqSrSujRkAf9ayymmSdoispu158YHU7pTpBdRttnS6J1k9I/fTHH1a2uK3JTJbB9G1rbCaKaZFZwkIzJ6GivFJjJFqdHqCRsYg1I5VZHjWlVYE6ms+Ky7fkEiS5ssbYTydkxBC06Nq1BtbuBtdVUziYNwiAw9irmbrc38U4e796cnNzc7q52m5Ip6q/qtF2zghz7+1EzmoGaw+llDG9dYdV2GcdetVq5Uw6I9KsPXn27nvvf7Bf9oxJg6Ety0ud5HQY+9aLHIkcOUM1wxEBMyYP/F5VOyVVHgClb33jV371137t9d3duFwIjDHN0bYO5ItXz9+8eXl/fhgzldzHkHLrbV52b+7enFWvfVldI46bhVYrXodfuaOPVcuDhkOKXM3aYXAhmetyAm+9u6cixlit1gEdJMjMKq19vbJjnGnNh2tpacoCSYd/JnBMdRob6io38wJkWKuDDbk48ki6W5RGAtKsQwDWxW2La1l87NI2HGs+ZHWiPOIpyp7DdS8QQWlGWT2ULhVW8fJd2eJMvH4Jj+11LJWFOlAZJIv30CP6AenmvW+RodSpX9+8++z8cH85P9AXXa2Dr+ZyvpEGE7zCsUguQfTgig46dIFng2p/G0mkGyEzOjd3bf0Kznk5z30kcbq+BqUYEN1rTCexGAUrn/AxdcoqBanMDHfnKno8HkJQaOfbuxjzaMpph+WL5hnhbXvy7Jn37fJwuTzcLmxGWdlaVpoKuOYquIhgyLyfz/c//OFfvnr9ImeUHGK9NbMyHbIoyHLcGpeqjxU+eSRhVf+j5a4yHjGVK+S9Qj3NLMa4u7319pBRnWVNx9KbI1b4dKEMrVSY1XwVZZqVBklq3RoWEr23EpmrhGUdXevbSnw78a+59ggMMbNkLXAZKmIJnUCdxQlSI0bEbN7Kv6/V9+F4P1bXyBipXH43Wjudbua8SGCm87EpEeXAcZkGa0zb04utYbOmDGNPg12dJMaciAmv8XRLJigwMvKgXSFjpSrqYCeLjrSyUFdXKLTWtm3LmErFHCtgpwBC/c23f3mdDNX9mznXnfK57/tMw2V/+vSdifmDH/6FIq6urvb9ksrObq0ZlxVtHPcUgRgzahcTwNKDcBygdUmLSzDSeps5P/7kx/vlfHm4W1KlSoRwgt7bnMPcet+M7eEhWtvGvBDw1iopvepBDeHkGN57ZFpvRtzd3n71/PWpX9+1JqlvW32Yu/s3eHgj4J13vv5r3/ne5bKPcRua+/05oVbU5EGLLPhXuEOLrawNtY7bhTxROgtx9J62/vf1F5l0Z4Y1v7q+dm8x4z5eS8WB6sDaoORm0pptFh57ldUPPzbIJMiVMSG6HXxgoQ8jSsqKGbX2AW80KWPO1BRNsjHGdtXLT3G04Is8eeSbuJBlSZD1JrP2DkiSmUW4Pa5VyWzsF+udaGZrBDMVrcZTiIgEmFLfTu7c81I6oLsdK/JoOQWry8ZEOqo9v3l6c7mM8/2dOZ89ebqd+osvx9zPGVBRzKB5zZpgjhFIM58xMuS+ppp5aBtY+nDVFeY6/QVxziDp3WnWzLtvadlOV/3UE6ac5TR08+1qC80xLqSUaCBqznemWRH8Hhm5/DVeCYDMNDeZa4QkQi1iPK46LvQJAKq/7Grt9PTZu8ZXl4c3yhFZfYY/TmwVhjEc72yGyO203b25f/36tmITt+10dXNjZmPGfv8wMRJTsdRIM8cjwHxc5gDAx5E8N8u3/2CRKbbuVg7zSnKv4lk0WzWJAG3lR2amZDCROgLM6kSmUJqC07KiaA1Xp6vW/OHhYYzBZtba2jgsI3VYayg/7/oPAOQoj0eZX1c7VETegd6qpa90TxVrAVTCIvgoTtVJUNAMGnsYtY8dojUzL5+E5ZwzwpNkVohoOa8rMsq81VXEjIjQ1c3NH/x7/8HTp08+/NGPPv6rH+T5Fqn0NHczzhScyGDaWwaWNDYduLR8fyTX5KSRwNz3ZaRxL19g1oCDGZBUedoWWXgo/M4KoUiA8NaqKzlfHozcI6waPaelwTjnGHMYfc6ZqV6IxxY5ZW7KrIN98dpvcR7NGiUa59wv9/t+uShVQC0U5l54L+dUxjg/xBhVjOn0dMJa22LOfe7uvffTzJF7mrvRgwFp5Pzss589f/Hl5eEC0Jpbba/I03ba40Lr10+efee3fk9Sd3t1+/Kv/uLPY14yM3Ka9xS2ZorieWxWrJYdrYOwMjZqbS0sQAB01iXdJc0Qj0pV/X3OfceGiCC9bL8x5qPLvuYwFsRZ8sHB41YUgNZlOI/0OKg167DMRYSxWaubSeuzrGvWaKLGTOun1reHh4deMYgzaIpyYWGplMi3471a2qo564utQwHrhdbEqq+ZSkBE3041oH91cz3Hfn64NxazUhiyAtjZ3Mr/drTmEPIYqltVpfTwVBo95iymXoqIiBjFqbq3sEYzzWkwuDut0hcB9Haicc6hsSezeU9CqOSbYxyqDhzA5PBFKTT3UkYsMhvux5u2nb7/B7/127/1vQ9/8slHf/mXd69eN+N22ox+2S+7T+aKQliApdZARGnFy8Sw7I0FraxMHQUTKuBwzaEWmYGa0SSbubdm0OXh4Xx5mPueEd37IpizOuDF0wFFt65bVTIKlTgTbetY/c3UDDC3qxN4NcZF+y5ISDPzdZvRgTpxeMzJ3jpqVlMTlTvh9pi7Uq5u37rTSY9MVVipFDGrd8nl8OYjqi3qulpGMxKeqUBGZggOrqRerJ5a642tN8jKtCOORNxFmtYVcV59c9YRWcNgBXNYZ7K55xBUh8lB1q/O4IDjSwoBYL1vFOquyJgTUdZS1aLhcXge5vQSXpMwyCLCgFBcdf/Ot7/1n/3H//Gf/vd/8X+9u3z2sw9z7tasIBdV13z4oQStLqU8cQcvWRdQcJ1QZkjNMSMnAD+s4sVFr2NqMQ0rr3xxFcSRyxWoKkBI8ObvvvPBy9ev9vN57Gdvzb2ZtYjd+5W3vu8PhgV7iUptXFlo9VrM26PLlJVtBwR08vbBB9/KjBdffb7f35shYqo+pRFgsRMROedD/aRSyQxMzdS6pKx0+75t1zdPZgzNMfd9u765nB/2+5kjeut0G+PSumeqbXbanj559u63fvWbezy8eP7Fd77zva/b+y8++OYLzf18pjkr+3mFYgXI5ktBqsqUlTmPdRI8Mghablqt0lgrDrDmB5TUGPs+dx6MRuZBsmMZbrx7GiOCrS7cWnObFVfHR8po7fBV/ykesGTlD9fVCEdBSMvIXInu3/rVbz998s4XX3328ssvCfbuI/acUbC+9NmSeGKMGgQtvjzXDa1W2S2il1U2RGW4sa5JWDd6Alenq69941svX794OD8ArJiERLo1hG3bdtquHy73ocAiMg11y0I9kQWOlmciMuHmbnPMosdhfPXixcw95s5mSPnWFXVKqSZS+3b13nvvh3R392blhcwQlAmvHOr1WrWaT1uXQdUxY2buPWKfc6SisT27uf6d3/x+4/bJX/5V5nAz2glLElqJmaAiAzVrndWdHMpjiOaPw8VZV/NWiIpmIzDGsFaElj3KMDSj8/rm5v333z/vY3z1UElYBcMen5HWoytVpsgfVmutTHpvvryD93e3QMwRZna6ue7tdP/Aue915uJwkWGNmcislX7p5m3bCMxBBiu5jIRiAFRq9fxp1n07XZ/vH/aIvl3NGHPuNShc3Y+KuVg34jLmrNpUOpWQZGsd3Zijli9J9tNpkfJSbdW+nQhmRuZE1HUeXui52Kpl9FrZBQvcYln4Vp9Rg3l0WwaWhUVLn+I6Ugr0rujKjKwcMF93aaqk41W/K8tjUZyHIzvnmFHex7zs9x/+1Q/+1a9866NPfnq5vLEanl+J0DLQ2qnobS5rqSp4dN05fDB9Qh3ES7yKWB5bPLLIAIDMwBLvZWaH/2O96PUPUNvKaJyx93b1W3/t93/6ySc//+Qnpn5186SfTmNM0b/327/9a9/+9g9++G9+/pMfY9aR31BNZCwnhNVQdBapA0A5wZlipjT2s5RWUoSbd495TBcoKhabWslIlfYjII0IVP6rt0ZCY/br6361fe3p11+9fn336mW31p++c344e/eMEWP35igRZ+Spn/7WH/6d97/5tT/6o3/42ccff/rJD5++80G3zuYVv+2950xQdYF7ZTivOTeAKMvb0gNQFzaYPVqd6p0v/FgeE647SKdEq+gYmZvkoKzSallRAV4ExpjDcjXFvfdqxjOzxoWoBC0j3F1cQ1R15TWWZMB6PhlzZuYIc7Nmt7dv3vn6N/6z//Q//d53vvN/+nv/5YvnX9TZZtZ692X5Z40qEkgacw9vbdls6vaxDLduvWfidHpyc/3k/v7N5f5WqZnTvZlbzBz7RU/syTvv3V8uZKu0JCQScqvc5AxFBagpUpKRwcPKDIA1ybSeeC5NS5fLfd9OV1dXkfP27oV5B4WEt95927Hv5wuNbeukTlenZ++8SzcpY9/NXWLM4b6qIhbtXS6YVVfqz3vbFDPngDhj0mzu8yc//MGTbfvZp5/e378mc47MuAUtpGbu3gi7f7h3p3krLbNuBQfUvOHQNYtkWR0wltbfgPRefG0VHatb2ssSlDPP9w9Ja37q28Ss/Km3ZjszZh2NzeccNBIWTJIlxkaVUWCOIYQZQjjf3842BNEdEeQvnQEH+cGjkaxS6K2Bdrm/N2tzjBrhi3r95sUOK0t+1/WTm+ubJ3dv3mQGV4tCuFdRqlTTx6Jcbuiaadqa/eqv/gbcvnr+1f2bF8bm3qzZGBFj1Exja91bBXzajCMwbmFirVx1QWkrlABrmKW+V+2clQ9wLLtjFxeJpkPhc1U6SCpDOYNuJHKONUbEcihigRoUEcKYQbeigGDW2XrvM2KM8YO/+PNf/PTj+/v7ly9feAbpdYtaNY7rQa17xMqVYKog86KOa446C2la5qo7toLnlyxZr7JIeSkF1ICuylAv4nggbr50lEp9Yb58/lWM2HzbZyrx9Nk7X331vG3t13/11/7W3/hbMfX5Jz+NeTGQqsO3fu8BfgmU4TRhLMKPNM8cb149JxBzevdycHuZyohyu2IFZRR79ZjCuNYmrS3G0jnHZc6bJ0+fjalXL758dnr/t3/39z/6+Meff/rTOs5LSUqCUuvcz/cvvvT9YUbkfH2el1EA1byvNCRnKKoQkOVARxYtYlbYY3UDBNa9YziKb41MHq06+curqkYa6KzwldIVMoWCNyoFLNxNkSBbc3dvrQsZMy4RWrQBrFkt9Hpuj4aTzJTSKwKB1pqbN1e3E99t7/zh/+Bv/a//8//5P/1Xf6FxMeV4uPRtO2wUqq5Jyma+z4yUt25mOUdGEBWxpVansum999///nd/+8OffPjFfvGMOQdMxbwYzVp7eHh4uD/TaGkgfOvuPpXKnHPPc576Rj/d3d4ZiGPAZDnKD7hTs1wVvTByGhBWd/Fg7LN1A7NvVxkZmIu1B1vr3PoY4/WrFwns54eKV0hp5U5moCzRXgFwxjXrtkxuUEaqSObWTnRGjC+++Pyf/v/+0Rxz3/dGS3LOPQX37tYpwnE6dW/9yZOnY+6X83mOc63ndCMWwb4Kt4oZBUlr3qp3qpzoQkHuBlpFv1/Od8+f75KPGIogD5i/CqhC9bCi+CAzV4q01ltt+5AYWBRe0qwpYs49RsArycfMLHIu/PoIj2oImFQqZwIzk7S66akvUbWoIylmggk0zaRV4n1axS+YZ84MAcE1gYnWmyLJslhhxATqZomq2lbpR5nB5u5FCC2BqFKB87AT1FVNOYJ+XKpT8/SsYrIAt2rDLE/FOmwXJR7/9tlX6S+0VBr8yPqg0XQ46FYbDgnTaIeXoRpCK9NQb6eaNmNzGZiWe97N1/ev32QmAu1UxFoCJYVqBYmZLdM+BHcq3HtmhGK7ut6208P9AyIyJteVX0swIFeyaPHfWvNGViJlWahTCSvDkmokqo7tskU/3N/+1V/+yypn5syYr1++nmPPPf/Ff/fHv/jsp1++ep0Kupm1cZklzpOP2nyVgUWbH4cqCc4xYh9l6GytYdkZE0haq9rLuvHueJhQgsui5UVTR0SmNc+Z+8P9Rx//eMyoy9J+8dnP7h7uJKxQuBUuELR2ubv9V//6T9vp+v72Vdt6x9W+PxB0dtLBVncr1THmNUZf9b8yZY7QujX5bOtkPi73OJTvNVl5cBnV+BBWlnappkPJI9YfpDHGVGsRsXQaSJSYUqYyF5tkzV1ZSSd7xdGVUbYyhetomjFFlPuwclLNrr7929/9L/4X/7NX4/7v/1f/t48//hFS1iwzKgWSCyaS5Fw1Ss1atZZ17rqB1nMGJ1LpxJNnT58+e+fLz33Oad7NPHOat3efvfed7/3Wfjnf376KfU+JFUB12mK/hEJKxMR2FYe6EcUF10XTWqiU7oXC3AxCdwcZM6w5wW3bsJr3hHKMvY7htm1zDjOOMcc4a2XKpXv33h2cc0YMM1ivXrCoj5U7QHP3FjHJWRAtI8hG+njY4zIiJmB10uQywyBzsEEjt6trEn3r1ihozt2Itl2V4TUjV2Na8TMiKt09ZnvMPZABSmO1VjKzBMblEjFZedEC2zI95QyCiaTWrMqcQ5KxE8XS+wFLi4tIpFmZ+K1mMGRQNe9FalrNQ6/ICzsadRptjB1zjcCYu5RIsLlbm6HKx1m3xQDK3O/vx/m+nICpNO9WYUQA5oBZzElztwajxGY9MzNyzPGzTz72ynpdw/MaYyayQkWK055zZsahkwIqwROkLYuyFiguq1IJ5XgkduwwS3JN7KWWJ3YVHWHNGFeJjWVqLPK8gHP906rgXFa6RQPYYStMISKdjASp7i3zcLt2ZgaEmp619kv0UQGIOmuMbhQEY/P23rsfXF1dfzo+G/POe5tzruLL4xCofryW/wFrsHDB+kPpl5Z/NUJFjlqb81w0mHkrkfb29StvljlefvXl6zfPJeZEc2Zk27YYYykePHQJgGZxGPpI1uVKZFMkUNHrC3uz+nyiCqXgC4jo+JSLD7NF73GJ+eYaY79c7kF32ouvvnj1+rl5S6xNtLiRBKXLZd/jBflKNTx01VtmKtfUaCqIjGHeKjetZrXfgl8dS+n4mjV0r2Ueg1DxTAvWS/DKUOOq6L+MOxcTvKReENz3vbkDtLZum0vlw8O9LeeIbf3k3pQ5ImIy315HVAFBZWsAl+xfSTx7ax2mVy9f/os//dMf/fjDL778eUS6d2sY51m3bvEQ7ZVKzTL1wC33Wb+hAsIOFSql+fLFFx9/9OP7+/uaaiYMyMLCT589uer9zevXiHCnAguYZtZxX7P3++W+ZHRrykN1h1Azclh6FEyopF2ta1FqHBqxkLzHjJLJaWawiIi6M12ZYmoiK64C27btc2YGbdk0SohdWrfBEg5aWansauyVZ2xsbs7YTcqaRlZi3ZRS0NxolLde2ciZCUPEMPcaOcw6ytecpLoZjQVNAZBqZkQisx5FufdyaQAQ3ekNMAfkqgH8JOCMmt4mSYsI61staI1pzYmDaqySVXxyDWMVOxBpRwJGsZmP9kEufxEOl6YE5AjvzcDWesw9FM9unj17/2svv/rq7vZVxRwut1xElFPQvM6PZQKV6t64rElOYI7d5CBPpxOTNX8bGQiQ5c9ek+3KVElmCaLIRVU+DVnCSRW1YlEeI0J0yHOkgOX8Ma2yb0sVcDchI0jz1ut5RMjNzbw6iZUecExqLti6qmnN8thqxQzKyuCtEC4gc+2ug2mCOaopqOpp5SFCkZ709T1ZGWvrVjO05jP3+3PkHOX5KgFq7dGqqnawUVjzrea+pI2FCGo8eSmZq2UtMgFy66m01r2ZVEG5y6UVEtVI9GYqib/ASsYaVSChABx1z4FAZE29o0KKmxe/r4UL1qxwnVk1bBJUPl7KUf9e/azlOq9DAa33UDp7pQCNeTmd3v+VX//2Rz/64byPdccBYLQZs7UmQZHuZVKQDAgTaV63MAJm7m5uMUZ11SXCrttT49jzlDCxRlqxdOClBJahA5U1ctg4l1GvgkAOIsCkFdJUOmTNpj6iKC0nRDb0IsOiRtvW2aSo2Pr6Ay6X0BJgivMjxkjN+5zz//P/+q+fvfu1cc7rm3fnfl7XcOAAjocjQKQyvG0V9BF1UZIWxsgVieGXh/tPPv4RREV278qoS9+EuL99/cnHP7q7u1NMc5BdQMQYFwTCvDVXEVYAvbm3BkSdtfWx9RiERyTpzXTcSJyUQqHj0l2RsFTw6Mzqb0YGiwVjk8JgEM4PZ5i1bZuXHayLXANl/xdobsZEIrP1Dmi/7JJqBnTZd2DWKpmm9NGD7FvdFyPmnCPuJll0DiFc5kPrrZ82kHMMrYnAVK2vROtsa7Mm6MfPLPBfJqFt6/0UqRgXxbQS11TCeaL8jlRr/s4HX/vG17752Refvnn50pQZE8jjSlwQlCdirRCYteZKJSrCz1BQklYOTS25sUJsyndVscQ59z0UQNLw5Oom3snY94vujKaKMl8LXVo2FmWMoufBulOM3poZhZxj9N7nvieQoeatb/3q5joyb9+8rhmLGYtzr/3fW6uYpLVbWJMnjwmLOiB5LVk8AvdyMoAVb8lH7EBaKhsXG85lQTNUI8/HqYjy+63z5fGQPBwM1cqYjicJsrU2AJUJjLLWlFAkDr10kbhYt9RxAVsUX1/BtoC8uaCIuHv9BoRiOimlFWeiR/yxDvEqDsK60jZzSSNl6F6Okjq9DtE1I9kW+e5myrq6rTgpAga4rQk0zJEZScbi/B9rXeIQk2qVVV5vxQ2IbkuMeZx1qF2bk/SICJGQ9xZjonwBpEL0Bh5QZs3GgWBrLWbMCALvvfPeX//dv/mzH3+y5z2b4RgtN3PKzEyW9SjmPKfUvBXTuZKyfLGG7m1iKumLHNZB/APSuti+yv+a6a1DvLLwVNYGgu6ekSxPszdlhNyOFoVux0Kt1Wk4ZqOymFZfTUbE1CVXbNextP2YgV8QrlLjIgBGhpvDXSHvfabub+/NT0+unl5fXb+4u2st8Va6lgEEQ0matRWBk0k7VG0RkLG0a9oYl+kXK5LVLSlNuDGVt69f3d+9VqaUVGddKQxGDK2YvXVoCWrdrQa16lZdrZnxwtwjBmi9Oc3HnFYjV6wozwIVdW9AreMl+aASyXK1rqRnRgz5Zk+e3LC1hze3+36ujbKGIkmUCjNGB71ZRnpvmmu/aKV7ORY9tZ6dwBXbLOScgnrrdZSu9dncjm1e67DmRKr9euzR2mrK7NAdy2VGkkzpybN3P/jg66/fvHn11ecYAJFripfyGh5RZrr7s6dP2+aCaopi7kMw2KKlV+CRF9VtTq/9T9J7d+PYJ3KxKAtfokhMg3SkVwtSxKiieb7cf/HVL3IiCZovE/plJszMCS/L0kpWOfQPKJ8+e1fK/XKGrPWtOp7qIVMrdnnGBBApZ9CMqwWTm0UEWUzUko68YiK1bmzGcS+ZWeGSdZ3WKoBeSR+Cq563O+vSBa0qioMcX2PGZoblvDtKbe2JEpTogA7vCrUC36pgpNGCcvOybj2yVrmk3bpu4TC5Hg1QNxM492l2XD1T8RkZWDXeF79+/Naj8Gt1vzBKVonPqps6Kprlremizn6zBfMUCSetiYDJ4BmzFEJBtbUyQ26qMPpqSg8BZCEtrJ9XrUxR58fckwrzc91oXRkDRioiYSK7KrnTK3g5aLbdXDX3GSPm0TATFfYw30ax+8sXn//FD/6Mqxm3uY+aApF0OIK5eoW1DStWK0s4gXKOC70Bgjkt19Ddo5a7SkaBybJ/8RhEBBSKtwPD6wHXNVo1bAdTrKjTBauXEoBqugpFJeTuNIsYBR2K8CQLQ5mSB77E4+2edTCnUsySMnJcQI80OmfgfP+AsPPDg4Axw3vPmhdbyU5yd5HmZs3FGp4kacigkEjSaR4h883hNJv7mbRc9J8ZEWNKlcJ8TEEEMgowyZtJxw04giKjukKRNeVeZiTFTHnz6+snoHLmGAna6foqlPMyYg6KiYzUUnAXdXQsO6NX4I2WubPAbo6alT/0MpI1n18dWyYixiVRb9bIOoxtfTtVhJ9wcKd12wNqClwZqM1UVgVfBEBGVKGtWG8Ix7X3Bksgm0StSxvKkb6uLXLa6bpvfTt2tHlzyhb6AbIyKFpdd24vX754+fLV3e3rwoUVLHss3yX6Vb6JlclBApxlYzea5czjQD1YOR6UZ+Wu0lyKpceR+3kfly8TJER6eUPd25rZrOhAO+z76042mHdA7q6DYIpImje3AKCU5b5fHs7nzGy9E2CFY0skZkxWcEou68XbamPFtS/iS8cGMndvFVutynK3ujSlDp5lZK9bnh4bugNKrLv1Dvh+0D4C84AkOsr6qpV1ylpt6WMqqvq16ifdD7o+HxnlUk1Vnbh5ydLWvBxvda+9uUlpbMRApWfOLMPxMWhd3xmL7CFjDiw1+Wh4uD5o/css9q9OudKfIum2Yn7pShyzMwqF6joEoFJXlyyvX5rGKAxUcr8dU69abUghMEH1l0hac0Ww+/Wzd8a+nx8uM3bzXvd1nE5PvLVGCwmc1fpE3fXGCpAjiETe3d3++Ec/UJRdjd56HTY1fFg+/+IDURyIAKK1Xvc0rdNp32t8ooYDtIrKInHqEROPru7qNK1cCcAEXSLlUpRhaTHGWaZMr4T66seOvw6tUEYY6a0RlnnMDR0TIRCq9XmEepQp0ltT5JwJqwQF0psA0FMZMY2uxPnhvD+M1CiejWBvPTK5NIu1blS/GrEuIchc9LI1cy/Vy7xlTGYoZQ4rhY8GayarNw8CoiJKMlya1JL3f+kyhNVaSMRjyQaMGJRfX9+42evXL4V8+vSd3/qt33v9cPfxhz/KMarfolffv8KWAKAGdY788PKbmDuJ88O9lHMErS5lKEy/DHO1YMzbmBejse7CS61JFC9mIMtKR4MRs3D8ESReqX7IrHH1ghf0kgqipOCSVGGqQQ6CkppWQ28kYBYpcyNbbdKH892+X84P58hAirUnVcRFeYzZu0O8ffW64ut8OWmsCIujPoGwZYOvd1NX3dMKSyZWvlqttsCRnFFvLQEwhTJlRkySCJ9j99YW+s+ZkauRrQu2ccBc8ihNNGq/nJV1HwNIc0ehBwiCzvcPNMxQzjBzr1sCpuhwc4rlFtehf9SEYfWMqIt4vFOZERkVmxbZHEAoHy0Y5ApSUQQYB87X0hKOqinUQ9YKieNibldvWdwrrdYahdBj2iYykJrmLQUzVO+rhLfGYlXLsGNHQ1i0STHjkXViK2YxDm1xgzW15StB7PFS8oPSqn1lxUmQhOYIGuiOTBI5Z9n+CzdQmmMktG1bJjSjn7bmPWICzJgZsS5kLJxUSgyW1IbjsSij1rsyzWhJHQeTHpUZLEY/q/ED3LwuErm6uvn+X/vrd6/ffPLRT3Q283bRpaJwx34eRVLXMVfTszyueyQyolTiebk062a2OHJzSaV21hToQj04WhKY0WKOwgF0t5W+TMFUmbM6VjAplxWWh2quvd6zm9FsRko6bafe+vn8QGXrDnDsDxFh5jREhnUnjSgfW4megNYlmKRVKlxpS9WD2BoSTqNnIeuYGdn6dnV1PS57xpS0bVfbzc3V6WnkfPPqhXIqIme2fooZoVk/KsXH9NElYDhrfc8xlGv20s3KHsK686Mwqpk5I1CRCQfkLCI2i8Msr/YKlCx0+vjMsaiehTvWtlkBSpnLkuS+ETjf37lbZEJ899n73/rWt/D8i1VcJG/NhEjluiabBzo/0FphdqzR6+A63rp3HNbXUneErJHGmgJT4lHEAg7LeAG6ozuOTBhb61aJwrOSK+t2oCJyF/mT9UHqvmqmEhlpJN1iTkJt9RY0MwZk3ipGYY5J87i7S8kCQJaNTJluXqHzZeBzb5La6aQLNMdyoC9LD2pCvVx3aBUJkHArA1+xvZUTULQ1bVW2yAkzPw6nWjTe/TEHjOatbbaUQMWcMUNia262yOvFypeGJKQQM0IjKjDW2uLN1+1W2K42gPvYEdl7Zyo0QVw/OfW+nfddSoYy5aXJJJx+8AuRGUAYvHB06ZN0N3LOWZx3ZjZv1QFETDfL5UHkCnrEoY3VuVVVtWgfKx6TRymrJo1HOUUFdBEgLGLWoFWdmsCITDwa3rgor0fiZpFgmeZtz8m6WzVldYW06sK4Yxzp6PcfEVvJLVixnYyYIkW21rarU4y47OdVyEqWBpt7vcybp08y9XD7hhkMryCXaq7px8c7vFb2+KuBx/4R69fL3UiwURNaE4mFdpbULMqETHlzb043jsv19fXJNj559+nNO1/d3Rogc/NtzBj7uTWvA721rhqX0PLTC2y9o24AP7Z//lv3qxTMxHFXOwHQTTNCEZex2MHFedihRobZstwVLbq+K4+0hPUg63YqCUGzfro2s8t+Bnlzff2b3/v+O++88+EPf/j8y8+urq9jHyNGxhLiqm3i8roViBSUNRxnjxfIHCWtkEjZS0QT0wxzv0hJJmhPnjz7jd/4fuunL55/fv/mZRRhZe7WS9WrvNXC3CBYvpZFQBHK5p2GmJOAFk0gQNa8lCnncQMjuDwUWRMf8dh+1H8pupLlkK62S6AT9nbsvBoJHu9Iy+CRMJfy/vZ2HY29f/HlL/7ZH7/Z5x7zsvB9rnVnbgu0r1txFutImQhfXDFihJhupoxDdEER1NJyoJckZXZsfkPplwirKcWQOGeGzJ3uU4FA7366uYqMnCFNHg9BKOtQpQxUKMvytACI2I1usObOQoTlJIEkBWi995RyjsfJ2RW+6RUW5SUAna6vc8w5BtNBa9sJ1JKKdfTxrGGmFZ1Zcy4zpptnxj4K6bqgZp3OTDGjmjZDsZ11Apm3ZsoR5QFZXVWdN4DVZJIZDbakbqsDu9A+G12r+V1LrFaeKjMQfHLzzHt7/fr1vJz5uEYy6d57p/F23zNV6h9pFYl3HP7Wt2quMyNiZjutiMqp6Nu2mZ3v77v79c2T/fJw2fflF1Td8FlI+8A9OOhdiEYdlzxCKpmYqMs7udzEOCjdYwFU32zGq6ur09XNZb/sl8s4P7TWS60ou1dmQsHmJjNvQIbUn773K7/+m71fvfzq+ZsvPtcYRrNmc4QQRdhg7Z9lZD1yNRcCt3WzBdnMm815jAW487BAGTkR29X1u1//+tznyBz3dzFnMwNiNbhVBIzkI7p/rIDFa+VBMCKBrFnf1fQVnwk9NoKsthrNLUZmDj+dfLu+v7/9wQ/+LCL3PeS07fqdD94/9ZvXX30+993Z6DIqKqxn1ctlzhKK3Vv9Mrx0AoIwuVbEZOBthVo3l61DnZa173ikIjhKa1B1cIvpWdGIkrQoazRvlBKRQj9d/dbv/N6rN69//tFPHBbTv/js569uX94/3FeAHc00igL+pcZYUaJyJk2aEbRl0Ixcp+ki9WpUNMLcx9zN3MxiXEaEkU5Gxu3ti8vYX75+HXPU9W7mlppgXYbDMiOZP8KyBcXemgdYqpCZlZaYACMCoreOBVqMlraUSOXUwliL628FX4yMKFHAvBhFLM9AnXh5eKaP9VQ3o4SblSO0fF/I3Mc+xlcSkPLWata2xg7fns92EDr1/2Hh9NRcOknxPolQHlxI8dyS9Ja0wDErSejxJ5lBOJ0MbBH55J2nGXF3/2bOYc7em3d/mHdZTCp5QPqJXNRCQRSKgEsirbVORKufXuRJ5PTenSYyZpo3OALBgyaoChOLyPbWtrGP7erkvc01YpteGCIiDVIuN10uvnbbTqTNOaGJMkSN6W5mzdoGrjtiiqldvNaImq5xyFvrrUvKfWD1rbl4cIKtuQBYIivJ5Ai94sG8kma99wIkGROpmIPN68wzg9VlQGLkZDOjbact9nFJTQXsCMgppFL1eKU7VN+UpnVnjNNb7/d3b0Rt3kl4a807SawLYarSczGQddKtXPBih1hV1lqRrMiYLBIABzmotXRqVmOtXMncbVGllGb3NnhZo2Kta4wC+WXrLThd1M2c8fVvfut/+h/9R+++88Gf/Nmf/fkf/dE535iZFCKXm+SXFIhHMP7IAUEAHZg103C+O2sp+YXA156bMSpB9Wa7+u4f/O5PfvKjj3/4Q4bcuO9Z7FS1nlYdRSa02ICDVq/nhzodWaaBx3+gZVhfh2odlEsIMG8VJZ9TGXM/398JInrbtqfvPvu7f/d//LCf//gffF5fUAUdKgenkBAP2LpwDzKQGcXhMhdXvlj8+nhYe1AVFs+cQ0B688e+lo8WT6wFDoJ6nOFMHo7bAzEXxOHN9fU3vv4179vPPvoJqP18//xyx5eeY9b4Iha9dwDLR5FOOi6eWQ72QnWlKLI6mpVBtDI1jXZ1c0345XIfc6A163Z/+/qTh9tQ5KxAm5ar2a8B4RUIaG71BPRI463ds6CowUAu3adWVZRZq4YjBEBmqjtvE+ZefwRbhv5FbBHu5eDOdWHCI9bFAsqlktlj123Oyu1BliZcuKi3lpkx5xoOr06TpT7yGFPAErpKXS6QvO6tShxLubJGM9OsoiZA87JVLgH/cMofpb9C+cKNpyc3OYUx33/3PWu2//ycczhpVVErt/wgo1Zze+wfrplnZdS13co5tuut1e4p7/A6PQDWWNZMb81bz6jTbvmTa/V7jQhu7Wvf+CZpL158eX7zBitXzOhsjmQsqxAUoeZ8vFm0yBCj08UajnA71mA11t3MMiIL10juHdJ+2QkTIB3Tq0YpZsrcY0TE8GrBDKAFJqVmvkhuLhL98GIljEpZN0VezmfwnDllIOjwwmg55xx7Kq2Imngk5Ct8RgtEVQinQNp2dd1b28dAHa1jx6SRGWO/hLXWt1Psoxr6YsxqE9YNdCVYVCFzGlHjylw2lDXwWndKrPdsK4Oy5g0Uc3pr5ryc73ca6HPsrTckYowCF0bEmrcLgDMu7BZzXl1t3/3Ob/3u97/7s09/nobMqOEPo7E1VNB6mVElHbRjpujLo6Asjs4hKWJNGFQZr8oOkt6oebl8+vFHv/mb3/vud3/ny198fr59Vd9xRZLWVkaFPtX+XXYoa54IpUiv9GkcknhkVleIt4HzdtzFnZIqaXSNG2aNXFhEAsic777/wd/4G3/9v/vv//zu/k2Zc/tp0z5WjDnKtQ1Sylhtaakx8NpQKk8ql0WJXjz3+hPNfPreB5BePf/SqrRFspnRH5WNcuKvk+3t6UAcma8Eiq+p73a+u/vwh3953kddIeRbj7mvD6VjGkhyXxTa407PR6a0Nn7911jXCONgIasJrXPMW3/y7GmMeHgwNzdSMyOGVuwLkOuuMB3DIm7+FtCtX83QbG3z5nNM1u6plhXMugCXcnPrJiki6NZ7p3nMkTWq7It8Q41MC6h8UiPqGnHIrNlhqnGruZaCYCgZci1OlSGYyqTgvZMc+6Cvntp7i6gsnCWZ1AGfobrKoZJElk53HDA4ugA6tYzjIPyID8PMQWLZUlZZwjJ0HKMalsnWnj554m17/uVzSEw5TVLMOWoeQ+zbqZwfZDlslr9x+T8qlULZeYqYwdzHbCjkTNYgBhNTMzLpjcatn7RuF4OwBJbS00MC4vr05Mn1TYrNGs1i7mFhRBUCErEMcDxdXSMzZ5TtdRGf5LL9m5W1TlBEkK0agdUYiL33p8/evbt9fZmXHOO0XVfgoDkiY2ZcXd3009V+OcfdnfVuwJzzuJCWmevOC8TCWtWmFndUJNLcx7yf9LqlAG071VjZHLO5Z6KR3ixCqVzS0aLsj2aFyyNMsrlv2ykkJ+WVK2s0RgZhW+vee8REHtyOlet/zfeWInR4JknSzNfNRKwdRYFrYp8kmXUVjBIGJIy+cloy5xxmrcppziRh1oAKa4Sb170qRs8ZQN7dvv7www8dfPHFixgXRVoha7eIVfIK6S4yYjWTsewWtkpVCgp5b1av3iwjUfZGLT1zxp7nu3/9Z//t9bMPxriMsVdwinlDHk7b2hzloUvAip2gGxMNXPcC1YQ8pMJnoMEOby0pMKkVlwjRmUd6dfn53GwfO+CXh9uf/NVPPvvpz3MOrytIzYmdSR0Lt9QXUZWdu+y9Bi7S8XCOya2mWB+xALFdXTW2mDsLbZaDs1BU4cIqyf+2lWExJQeLZYA5q5EmbY/4/LNfLI2Nx3rU8TlTQvAYagVZzoqKhlzVvwKj9WhiyZqoXp9GqMAYVhwxrOY2c0EU0VplChXmktLMirXnWxFeRaC35jTjAGCNLZmhWbjEvew10roYBFmttbnECFVpKQGkaJRcaRRW0O/x5mvWZfatb6fT2Ie0YhsAHeP4FTGE6kvWJdBK9/bB+x8k+eb1m7HfjT2bd7gys0bWiuJfFqm65DutHjTNibo5S0rBdeDFY4AAqABac5eCqEDQuo+JybfFpNBneVA218P9/bvvX5F8/vxzEmO/dG80q2nfVveQG8GjHxXg657FzDRYDU0LSbd2ugLRaKb6yM0VcTCZXofV+eHe2vqsKWGx7QQQYy+24v7+doxxvr8D0LdNorJGZdfWpbG5E0zlnBkVPl6XotbT5xG8J/kxrGy9mXuSm9ybU9j38x778kLJ4HTmdtX2MZ6+995f+4Pfn3t8+NGH+8ODgWbujRURpRm1wfKw1gDKqHALo2jNc04aa6jd3MyaN08lM0IZIRpVyTk8biTGCgfOR4mBpDFV2VO5X/a5jzHDvYDaKhGpzBiLC1a6NxROEiixe+V2HR/GKc48FN3WJSlCWKllscI1qm9cNAfduCJCVWdIzmnuyIoMtcy5GFeKpAnW+oHG8erTT/+bf/D/+Ku/+PWPf/rTOUbbWmYWBC9PbnFqQpYHaTnruL5l6z3mjEwArbVF2puhLvBbHMe67qNusvjyiy9PD2dkbtvVnDMn2FRtFSqq9LEmVoOdgq9QFAArXSsVFYNeWH9xy0vpTohmmai83LXJEkTWKymSF4qvPv3ZP/yH/8/bu3uDJTVnCmO1rr8kOOOQO4qWKCph+b4POrsMuFzjsowxzLqk2zcvZ8Si8qzcJqqPwLpKSkeYRr3ex4FTQOsmBmbWNdGtXA5Rt3yQMF87MINaT95oSB3BhavsmSGW/bsYjQWz6pXKltRcwRVAZibBmLHv47KfCfrWIOWMJL3uzKgoyjojEwAVRcq7mDGj9dZ6r0Om7jUkZFZ92DJQ0C2QzZzm+2Xf6vJOBUKRl4yAH1eUVapC3eoAOBwmo7EhgZxiY/eGpnE5e2Uu1QvC0tQXK1a0D5mVy22Vh+8Pd1m3mVm6xOLGwDWAr4NkBsWon2AAzCxR98UApNGFuhUcrLFmRSa8WcI0p1Av4bgETYtSLRNUo88xz3f3+5hzDClyj4Rac9Iv+/+frD/rtS1drgOxERHfN+dauzlttje7m3lv5r2XIlkUL2W1RbIkUahSWeWS5XLVg4EqlAwI9WAb8IMBuwAD9pPf/B8KBmzAgA1LsFwqiiKpjo1IiZLY3DZvdidPu88+u1trzvl9EeGHiLlOFuowJSZPnrP3XrOJL2KMEWPM5MwDJzxIOel2s7VbcWEhB4n03lyobrZ3X3+ttV6i55Q6MKO7VRIqm1feeMOAq6vL/YtzLuX0+MSYrq6vYeH7wUIcB95ud9Pb4u69NwKIC8w170egrcylbLdH037yeD2Qw4up5qVZqz+Dg8rdnN4+2h5Nbd7dXMOsUGXy3e6GHCfHt9SoLxN6ExEwlSofvP/B//hX/v0vHj99fnFx+fSpuy1LB1NojQN3doetrnsU3ZMZNEkhIlJ1liKSojfV8EgjYjLzEvvaHq4JB74mDlXyWGXvYWUe/Fg3NlNN22cWONy7AyK1ykDCvTXt6wjuCeYSEpXMPTJzNUVkYIVCm4lrMVPvFirWqELqHVhFppQzaXRKQuT/PXrZQk6q604WFyEi1V5qhfLS2sNPfnL+6Ok8721pEhOM5DLEOqmudZAC8AETpUJOJJsLobb0Nk+IukYMEtceNTnj+oRLZBuouaqrknmtxT2TvA95hQgiwckBA3lXEtLFIsg+CIxDv4VUGQYdHB1qaN5orDV8CN1hphEDAYIEjSMy7/ZPHjyIxrXUEpuargYnKoErW1jQIPzzEFR4drggmGOoBU6mRlFzYmtERJi1t9aUzBAXkbmwhFZ7xUVFeydf01jiafOsCXT4N6ZCJVvOXBNLQY9ppwMSEegYAFAK4iin63UdbP3vL01K8phPKFuKI5e+AFqW1vulx5TAbKYs2RcGxu1RzNYmkJgoFlCRTuxw9N4CoKDsHRxMYHRt7OLuwlLrxtxrhcgwDJtp3rVlyi7A7RB74AiHq5TehmkPACIeRi6l9KV37RwD6AoRAYCQq60ICUMIDi5FTW9udu62zLMUIXBrrcT34oQOPLAVEIjUlJK+DvMxidXu3EhRdzeSCPzicCJoS5OgxLlY4l+eK3bIsY9EEiEm4SKtK2xPEXDDLkTae6TRMDg8cJI8Rb6k8SmZOadSMLg7rNZC5DAutRbrbK0rXMai2u/fe+M/+A/+Qy78u7/3+9/7g987vXXnlVde2U9tP03Lfk/mtbBH4TAlUJtVVd0Rn+pgh5PEmzuBemtM1twYyBBgyh2NFYsHeWS/E+Cbo+3xrVO/pnnaL/N+NitFmIhl+ODDj64urh59+UW4hCxTK6Wo6ceffvrJ519cXT93YXKuPCx9KVw4RDbRn0XEvWfHStnHg7KCw1Uh7EDvs6oPm3Ecj7T3Nk+upqbE4gYCeewVIvvCyiXeh0BX3WHWyAsLDzyk8GlZiITcSh3u3n91XuZlnmJZNyZ1kSzebrYODOvrTiQibWnmVmTYbDbLPHVL35hoBnNziIjD0CaqEmJhLZmxiCbFar5CTBaFEwLrDIrFRwGj9W47uA5hpk5MnppxpDWLrk1epJkj3VtdtbkBXFHLdtrPvWstpchQhqG1xTTWtWJIJCZxYjO1aaZEfA7TdcIfbuqU5jhE5AYzLlWcjIqYmZCwwBaHOxXiADgcDnLLEBt3Zw93JGZiAXVdrHfvBtIohmEQUip7m72sQkxh7S2O8NgxCP22rAxsEksRHgk39XEYmN2czLpQrlAwQFzcOlacJeIYOTOayN1LKYH1ZeLty40Wha+5siu1sK4hxrxv7ohDWtMOHsBXFieQnMqqWsb6mq6wSNbrXOBPfVl+i7Aftbwx1tQoT35ISLqJ48RlyFeqWCzcBQWdPwPUFMtiMNN0jg+IExFhYN6hxCRA753IRYoDu/2NqrWuwjEuaAzNXDiHLcrVipUA6G6xLcamFmb1nruUSPsjhN1JbNr3MCAJJeb+5gbplElEtBmPYnOoWWeKJe54fINAzrriRKpK4UqAg5EDEZGrC0tcc1uTGEy7OoVFIRL7DcV/QlRqmgZWjiJpI+Yhvoc7aqAm6ajJkahoCLM/dQgLswNqnUHdNGZl7Trtdst+KQBLHbwvzE4irr0O9enDJ6hyeXFhpkLYbo/ndg2uZj6UEjFBarG2EEpEiurpHsrboIyS0Y79Dk+rssP8RfnTUvgLgtzJUWqRIn2Zri6xzBMAkZo7tw5hFpbN0Xao465Nx8enzLxfpk9+/KPHjx+q9d3uppahUCEpPLNaX5dBEY4hsXvleR4G+5AAYL5P6iBjYhdnCWSBKR3YyVSZZMVYA+eNCs4e62mIRqcTs/UWXedmsyFi7b33Vmshltbmeb/T3lNQYyAiISGCuWGlw9b5khkoMlhRqBViGGoZ+tK091LEFdrVvA2bYRxHd9O5efiPwyGU5nAIghq2tgYwD34sXL1MFUymVsbBepeQIJj1FpJqXwUGdKAmIIj4RiJo79GJunXVLla9WamDSNG2lGHYbLYOWrrBjcCZjASoqluPcoKIIzcnOmAggemHfMEASbk1s9Sxc2fENoYxmXuPjbtwOWNQ7lonMei+dHMyoJNzARPUleAUkZZwV+UagK8SkWlP2X9gBUJDLa07TIg5InUosnHS4pDAQoRxs53nRZLUcSYIsQZPKFIjxjKdW2yVJ1BiICAC1Lpp3qBDN52wKjJAEXGYm5MQZW5P+j9nyuNa/ldugFcEPJDm3JhPAMItVQlEWdDXod/N1UxY4ttJEcAkKp0iCPH4Yb7q9pGDm6+wIbGrxfAlzFLJcgyK8Y5gZNE5q5pjaQowFeU6WhAD7lJrHJhQo7QfD/IgnlB47uIG3KLLMm+3R2Ca532ITWLVKXZS40oGYxR3Ij6+tp4HIyFWyoWpqzFzENohtAspxVCGlJS4D+PALKqqXdMKLE4Ipq4dQnDXrlKKu2nTOL2YS26pIw2/mDiqVMC6Qhytl3VjTgAG4RLqvFrJAELw9EiXImZKUt08XAXX6Z3maZmXVpgKwU0XLkyM1jqhPH306Nf/8a8S++Xljc3T9fXV2fMXR7duH53cWvYz9QYgd3GDW3CWWuAwVT5IIpAPK3M8jsyUYQK+HnYWhwBBSEKLH5YpMLq5vnG6Cfu67N24VmFz++H3/kSKdDNADDyMI7e2203X11dOMmw2p6e3j45PL1+cz7u9mRELS0mgRzVIMyRfmjtT0QgwJLbOkrxh6fNiS4tXj0WYeE0g8ZWtBaTEHnl6dB+gIffwxZVSQOh9MbhIkVrhdn72zExjhPKYPoicLYAbVc1R3/PR4TKoNmYJLte0d1Nm3oxbIjSbS6HWqNZxGIbWW6fungb3B54wqUpmsgNyE39KnKHdWNjhVIRFhLj1JWYQd+cMdvNUvaUgPaAcyU6H2ZGUIHMJYRzS2ZxdtbUF9tKjWMAW9Fn0Aaocw0rmjsRwEW0UYg6OTJm+qJSBSlVTokgmhi1LNKWuziXKKzxckgrBFLpehNSgaWC4hRnhWqjJOXtTI4ErSeEwtAjVehaxwqTOkQ5Hph6XOQ5ZNXdYoaJdEZiOGkshSnqgqwoLKE78UNznpj4Ll1qIAt9X1xWqIMMqnVz3AZKJSIqVU5GeC2/kAGWZo1yDCiw6IE2sSkPkpQ8UPbzGgm3wYMgpFMvMBBMjEXZfo5hX6g6MMJJbT7FsXIJleSniInJLnT6t+zPk2WfHBJnTTYD4TsQ0t2Vbtx9+59ub7cnDh48uz5/evn0L2i5319Nu5xoGKwpiGEsttsIOvo45Y5FhHKWU3pqMIkTqjtUENExEIkZb3WI3LRVlcVgXYWLT3gxUeOBhGMfee9PJ4eQ+jkelSGs6T3uWUoeRidUmNWdGKWNswDkgPBydnhh8f3Oty7K63kJWyUz+SvQkwObwNeKwwTft4PDyQ4hQGaFDiL2ebM7ArKbWbdhsh3GIjWXrPTyXrDd3YxVjFFV1lMKFKgYi7dbmaZ53oddjkt7a0qeP3v7p1vrl+VlfjIW4JKLsudFAcGeIhxVn5qCQqUopJNK7ChNLiiSweuRTNiFOzG4I4YdLwGs51FBq+8IvAn3eBVfAIqq6u5mtey0Dy7gsjZ3m/d7hbd67q4jUYRyGjbnN876ZwlSEweRBi7+85vmqRasnIpyT4xKAhJOEkLtIJeLWFzeQSLR40W/17mZODGRyWvpdz9Pk7qvLDZtr70uc3gQYeRxI1nssIaQfnjpLHFes2kChimAWWZYpmTqm1hQEKcMwDCLFu1nvvbWIM3e4YdXgc1owsIipxkmc4AFRaGq1q9TCUuBdmDUkQ/lKh544k47Xvs7DtASe0s846l2tu9ZEK4gK99ZbV8CC00zlWraIRoBIhVtscUfWCNgPzzhMw+xFzUqtXIbeFriyjCDStoQqNjA0mJMZiMmcRGC5a+eZBhFtF8CAAoBHNKEUJrPYYRVyqgCtuSBwDuS3L7OqNjeXKkF4xuQSnHZ0cU1b1xawCjERWSiy1lJvoDQriLkifLCC9EnLjbyqWdAMiQxoCDnW6dlXw4YgCtwDDz9YI0U5iBzaw8maDICpwyHCbqFqW2EIJji6Nqy8cEhHpdaYx7KbJPZwB3rpUgB85XTCetQn/BRnVS7d80uIj8L/Mw0azEPWAE93WhepH334bSr14vxi2W6Oj45qqdM8LSBnUg3HgHgNjaWA1mw3cyEeN8fMpbUmRUC+knbUtatqKZJ8PaVaINgL5gJ3EiGCdovOTwxlLKWwtnhAwzsvqrGDiZgkmQYqpQAON2JqrbHUzXZ47bU3xs3my4cPLp4/CwOCOKcPdFGiAemY5SEVMYK6MDGXQbWreqkFHq4a8YB4hxFyMQIWNjYlngLhStyYNQorEXv3MhRQLxEnQmC33ntzAxnVkj7gBABGBDMttQjzAnejYB1yrTmZL/hqB+AryCOlbk9PXPvu6ia+CPkqpGMhSsPDABApnhH33qMclAOpTSRxd908cjNgDuFS2NR6a8RceRjK2LXF+r4HFUNUh0EKC3HXqq3FNQ9Ribki/ArSozh3XkCB+jDBBTW16+rmGpJzMycSZyW4aVuaSxWmwOAyEgZZiqJV1hBuu2lvLXhpAphZu2YCY5YDhX5lSsorFFylg3iVIbK5y1Bc3ayxk5OiiLDsdle9L1JLQZFh7EsvtYjQMs1qnR1cB1f1/KxEDpJiZuN2dKdlacmaUGAVEv133GUnT+VdKmABD8d/SkwoOzho18ICYu1huc5OsN4T7V2BaMTXjd+JAza+KBFxQkBOTDCWGp1AUTCoFlbzvjiLkhG5MZFmtXUiVkAYIBeGagO6K7vnNkthUfdCAjHh4qKxi6rdzLkU4VId6NrVEzYFE4R7PKFdRYRZ6rghwjJNkY0XNMI4jmbW+sLuzCzCsSJiZkwMlvjcCLl8CHwo1KLQ3nSF44PAT0kkAaGLTEPg6OIDK44Lg3UhI1hnwup75jkARLsTCIPnn0++l/P7RWUmOLNQjVnDtMfGGksxVSMSimEsBIypyUtI3W11iUaeQClLSTAv4NPE1+ilrNZjRSM5ZybAurHI8enmlVfuf/ngJ59+8eD8yWM3na+fg6j11tuS1jUgIrIwxoAD7ETmSk512ICpdZ3npfelDgMX6WbdWjav4XnuCaHkVMCcajJiZwOba8AVbF1nt6ah5hACtWluvHTVwJKWeQqHWpGagKhq8tLmrS9H5fjo6Pjm8nLRKeJiTFVVVzKeTA0xiknxbC7CXoEdGvEhbg7TsG6LghVejTA31eyPTcVJUFpv3tXNo5gzlfhhqEjhIkxVzTwyH5hkPCScSOsT3C9fPPvk4x+UYbPZbtqSUzytIF/CAisA4uH5QUAYV6m55hXOoS8fDAJBSnF3oy4sMNdQWiQgRyCyboG+aZANTHAWsLETc29d3aWKG6xrmm3mzQQRuJRl2bdGxOIR6Jp+Ox4ozqHo0IqsZr+vpmqe9Sx3qEupAHrr2hTM42YkktamPu+Yj1Ai5F08kNB4DIUjQDKyz7R3KiChAvFwh+WExdx9BXjX1pCiNc03hDz10KZKQnWo737wjWU/ff7Zx31aBira+053oQQmI6piphA6Pb0VGwbTzZW7a2uBFB/0H70ttQzCAoiKhhTHoakid0q0IX5Ci6JB2fRwMAxkTNY7c+m9GwNEXbu6CUsslYI5nCbXvtQROKCHeR8n8pk3IszdDE6uUdAJ5kxSChcZfZlLKUYGbW1R7YsKoDr3Tgwi1tZJ2FRZqvbMji6lRrV1gpnO89KWziwh2Ds5OWVBAIZC0k3z0gfyJBzvp5NIZQGLDONmsyz7wPAdREWKyK3bt1T14sVz9ACkCMQkVqhSFn2LUPYETOKKEFNk78Cx0iMW6gisxZTyz6/9QY6vSRSHytDXS5gr6kHOhzkKgTxAc3dyM2YOrEeY1VytFy8OMHMpg0hpbXJFnGMar40ZlZHBxh61M9RcIYlIAGb94VbskShX4/DyP6VdKzwcdZzYyQnCRcrgrmBnltPbd99579150YuzJzfXF0MtMFHT1R8JLBzzEUeqD0h7CwssN5vmZdiMYHZCHcdI2pAaxLX1toQW09VjccF1tXhNZXOsCoYTGtzRevMevEguWISEOMhxI+qqLMJckOBeoH1svS9Kj7749PnZMwKFCYcQp1Ix9vfDdJsFoEICETcTkVqLA9Oyb6okwgCZxjpqBA2FWMwImdcGcoeCQbSf59g2AIWjj5kbSMyJVAtUu09EhasTQ7iUOrR5NlXV8Bn1m8urp/Lorfc+3B6fXl/t+rIX4Vx0ZMS2NTGF8WmeM8xhurhMS7SNxELhNhxjhVl6cAKIUFrEQJlqa1UN/LBwAVPvXUicHIYeSl31MI0rZQAF4WluncFSJA8nszbNqyKCfe1LmIk8ZQDrqOrEZJ7HBzMHfZ8jE7OwUOE8oXLZmbupO4bhKBqxYLfcTV05uBkopzEmGaiUQp6CYFDIFhOMt64kEsN0RFPATc1YUgOfFinxjBoR6Dvf/s7js2cf/+SHpRTNLQIjplIKzLUtEBnHo2Ezzvup92ZmcGMOV5T8sTTcOgm5LwZyItPuYZkfaoSU7HtOOQd+b3WkNzORWmoVETNX1TJU4dJbi8YeRHUYF8wUJm/EOOS05DEUZ3OWRwS0nM0CA2Gp7dpVl1a2m1m9t8WdtuPm6GjYDOVoM4wFUspmM46b7fb46OT0ZLPZbo+2tQybzWaz2ZZaicWJDbaf99fXV+cvXjx7cvb04eNnT57dvHixTDMPvjk+5lp83wOIc+8kYjAidHUhju0Hba3NcLO8L+7IzVtwEZaitkD9ICsABUeaVMVq5YEkJMO0Kgo75ZNJwmurj+Rd8j9kBxZVHQzBIVF17XDkJRqeJy5CAc1kLsF6lepu67irbl5KnNPu1mNzwsmOb91+7/1vPnn8+OnDL90sXXLWHj+ak6TOaDXpiM8ilLtJ5HBBPN18aGmd3KXWWsQd07QXYhKxtRsi5mWZfviDP6FSRYbt5lSEYC2SWSNaLGq/qYLZXF0YRMKlDhsTY0gdx6GOYN7vLntXSHejzea4t9bUj7dbZlqmWTvBFMSubmzZ+6R8oNB6bMbqNFOw5LmkES6tlGJgIS6lFlPTdOoPFRVp62baWo81zqEO3t17KI8k3ARppSVCWioiYAnP/lKPaTTr2qc9wauwdgtXaiic3ImYC5ja1J1I6qjq6oscGghmEiKHNZibEBe1hYDeuxBxifVkArP2mVxqKQYsrU37/dnTJ7r0UgaqZrq45stJlEFLREyxI8BOLIZOkb67Cg78IPFLiDKj5nw1iqtVhs0WRsu8B6GUWurIQr21MD4LZiDy6xxsiY/3yBgwEPO64BPfIRh0yxeHD46MtPYinnkDCV/QClrmZB4p4fn+WFdXc8a4HYi4LYulakJKqWadnJwZ3UTqAQ6OhT7PwRjuQRRGXkyChyBwCQ6NYzHCzRzMJfHlA0cRU5qpCfvZs6ePHz5kJoaQxnNjDooMYbi5+rzsry7OCeS9M3NyrbHNF50lU3Trc59hVIcaY1b+XJYURfD5lLlVvhLCrK4cycMyRPyLA5vt8cnt23C/OD9v81xEKDxsnZLvDlE5mDg24wBnj4lbLG9DeH1RYKMybI9tvxPHvk3AzenJ9p133/z2h9/62uvvvPH66yen21rr0dEwjsO4GbfjdrPdbDa11lqrDLUOQykinNecHL40nabp4mr34uLq6dOLz7949PFPPvvhxz/+yU8+fvDgQZuMhOt20KWziAxVTcPqJ+cih7sv0+JmVFY3cJjD9rvrMAcJxjie/3UnLXrviOcgROhbbMNl+cgTLzfz17p/8I9EnpphsJnjkwSTdJitDwdL9uMISjMsvdZRN4AOA5yZ1aDWiYmKhBo/fjbVzoxNGT54++vDsLl8/rwvk3ajQu5uCsmwBIY4x8bxVzjgl1DBihiYKdbQEQKrmlQaNpu2LMKipq691rH3sMGwab+7uDiTWk6Obm9PT/bXN0IiLLmXoDA3dmEpXTsLE7zI4CARES4Mfv31N463x2fnz5/17k6bcZQi7ujQcdgcH5+K0JVZ75OHVUYUB2HrPVotEBAqK03rDRHpqjkgrJE4cUeEmUClDMbWzcxMgtZiCIuJWFdyhMyJiLR3YYn0UwtrioygNWHW7mqtjgPX8urrb37wwfs//PjHDz/52OfmCOv+aB1ITYmZWNTgZbPZHNejo/3NlU47uEVsZ2j4mMUFrnD2AIMai7i7djA4GkUHmB1g61akMvj6xbnqCvCleiCXO7COpYfbnn72tGa4p5dL3HTOp9Rzbg5ekYhLGWqt89K7KoEcPQyYApFnJnPydBBDt1RZHBToSDosvnvcDmaOxy4NLKtUgydUmRO9H0ZrzzmaUryQwzfMAqFUVSu1QvLHbdMkInDX1hxGJAwmKk7uqhGEm4hiQOiIbXx85Uxgh/rB0x8S6Iyu8uGg/rL7IO9dIWxurS2f/ORHFy9eQF29jcMRKBT4ge17TMfalsk1kV+HcOFSAHeYqRqFsYyZKwXy0nt4nEQnau4ZapnpN3mVI76Tmd1JgWHYCJGJaG9lGO+++tqHH317WdoPvv8n1+fPaqm9L+7gWkuUPIvhx2hNz4BbSgdgBiUjUGyQMohBhXxsfbrZT3dP7/2ZP/sLv/JLv/RLf/G7r7965+R0c3qycVgMuCv1gpcAyctf/j/4nZO8v4622O56/uLJ+Q9/9Mk///1/9c/+yT/74Q++F3Y6yHQRh5qpciEN8354so1qCjCRVGnz1LWDKERHzMVhq8w4+mYipnEYhclUe89lDqSZoB9gklh6C7US3HLlQhi61vX1rA4cMelV4Zc4rCfLjIwzlJizg4XiwqZa6nh659711fW068yYd3uutTBr1/wmRjc3F59/+enl5bWTmXsZBuuGyFE6LNyFuJjjDWJ3jbkl/JhiAMH6lnqIPsklKXp3M9WQgxNAwrzMC8yJHeA6HJ/euX1xcRU7ybEBahbql2zSSil1qK0tpq1G0CDw6r1X33nzjePjk/uv3tuO483u+vT0ZJrnixcvtHcDNuOWSEstmbnhrKbMEaZDphrxhe4HbV48WeGp4NqdmcFh7EihpCrC6uq+NrhJ7VP8D61keTyOpRas3BdDiFm9M1OtW3dXTetQ7f3oaPvWW2/d7PePP/ukuZFTLYO7K6lahB7Xpp2G8dade+PmzjgOsjm+ePyQdBaOUoOc54mpMlcUM2fnXIAWgofXrDPY84ETEGtTCxYBMO1EIZxIHRdyqI3Bz8MvA2a1VmYxpXT9IyBXzZ3BzvBuxAj3D3fX3qadg+jk1u1aSu99Wab9/oaIRGrZbNGNVKNLCjIstMdZtcGWqo4VSIfCSdWizHGpRIze1c3NQq570ESvxruUyow4nFbBuzvIpQiTo89LzLKxl2Du2ruZcgER5YYLJT0SM3wmKHA2aY7VxQXGLBk46W69QcSsR89IUnw1ds4TlFcO0+zZk0dmzoCUEtgyDnq7wFVZyKG9h2QlVZ7EBFKsYIJDpGI9j7U1eCKgHkV5zTv2VS4UnBuxgBxgIS61WLfWJ4KQyHa7OT2+tedZiN3R5kXNxK1sapFNb3PTHk2Cr4hwFomI8CQ4q0N6aE0wqHm7ulrmi6+/cu9v/+f/2d/8G/+TDz56b3sMjwcgB5mXhT6ZfE+0PB6JfCI8nWoSGcm2BcNI4zjeuffGtz547c/86Q//4nd/+tf/yT/9rd/9nc8++/zF1U3RglJgNtZxWWYITIQppGsMyk08bh7qkXgCCZGmhrU7zGOoFClCQkXD6cVWDDsgl/SlydViKrWsXhHUF5Jg5qM911IHN+3aQ6tL7qqxPMogJwGB1/GXidhNmVhVJYWeHbR58/U3H8mzk9NbQH9x/jzS+Kx1wKXUpmrz/MMf/HGVaq2FWCO9qDgbFyd3eCCf6axEsX2KRFopZkiAGKYiJdrHOm7IbN7vLCKmHXD01kBeSviZQYhOT06+8dGHn/zo0y9vriKWqpTBiRZfuvbYG8giBhnHsXLxpd27d/d4GG4djd/+1jen1sT6xfXlMi2tLW42bgaC9L4Qk5mNm+0yTxRcakD8DGKUOty6ffvq+nq6uZaUw4wsbORkLjWEOwZ3MwVzYa7jICzde7hku7G7M1Fas8XoRJyqeF8PRyapVaSg5XUAyWY7EvGytG765ac/2V1f7eeZXHN/HsHrkpDEMw7hWjdvvv3eO2+/f72fHj56cP3szM1KqW3ZhQQCxCQyDlsnKyyFlIHKoikQfvk+hQzLgojoc0MAevG/iMDmRjA9cHpZQaM7olhrCOEPx24aaLUJ5KRhUzqU7ZSaW6mbOoxDrcK9tcYsBCInnZsFO2xOREVEM9kTEiAsIL52y6aBh0ZyWkB1qgr20B2VWokIbto1fTTTNynKxOpvAxwWvlnyhhnZqtFiEEtQA6rMAxOrd/dkQUArle9wGFMsMTkltykBMsexEO9JDApxDU0VObtTUvcWrBlcfVrmoAXWZ8hz8AJxITiZqbsLsUJNsy2Uki1MqHHS2IRSz8WlGEBkQhKqLZbSvYPAtVg3C+zVsl9yjz9pLl5Merc+zy/Onn3vT/7t3Npud8mFde4gwE3nhti2iZIoRAqE+zo5ExRGsRTL4nCXAsh4enJ1/mxW+akPvv13/qv//D/9n/71e/dGB5qvu00ReZa3O1Jr0qUtnugAD73nOmoc6Zb3HQj193pYlIHfeP3uX/3l/9E3P3znu9/9d37zd377d/75737+ky/afiEpXiCleGDmUOa09oW7w8zZDSjrc23pXu0xXsUcrmZqyma0mGrAp+sMTOZqjtAocxFT2xwdnZze2u+n/c11GGmvZCtl+o1IIXHVOO4d0TVTkEZuqt0yaiA4HKc6SEg5Aut7cX0O+LvvvV/Ef/SjH15fXmhb3E0Ka2/hXDbd7BoXtwScmZNQAEEj0I8pqOYU93rOMgbiKAiriT6TiNTeFotu0qEaMZBI/pWCki3MsG5uRu67y+umk5qaOZVaIKqtu4Ol1hoxUMw4Ojm9e/sU3YrbyenR3ePT77z/9rtv3P7y6bNX75+I6JOb3fXZs3m/Oz4+NcfV5QsIR89aN0euPV/TkOeiD7We3r499zbvd/FBYoWkDGOttfWlzwsRmaPUGqpNbQ3irTUQlVJ8bX/Js9WP8yAmYOQ3ypjG+P9bb64mRRqhDMMwblj77ubmZncVqqciJYJ5PK8zO2xZdiilDsN2c3L3/uvt6eO2hKOYqDqBTc0lKL/K5chsKsySW3vOpuZQIl49YVd/pSLkFI+br+BxZuwGyEIxufvhM0YZMtXVOTlZw2yxKSB3cJheqTunuknNep9uLvtUajSdJWSMEXGlnQLXCRjJc0E1r2BoSWJXKf4Q3MNoo3toxEqpGiLZWltbnFgk3IMlibXVt/HQTub2sieZqdZZCpf0FWFi1YWcShnGYSh1A8K034V9UDjZB6wf+GxJMjMwKA5aEO4EFuYApsDUNR6Rg43+OmfBiLmUGihJ8IfWNenHkJcLXNOqJ0BvEXIgWPOENL8CeeV5FzqGOOBC8gY28+592G5PTk/meb65ukp7TREK8CquuzqIpBRx1d5vrm+WtphZn5e4elKECGrpfsrhSfFSa+HM4lBxMpAIM9y7b8eNLcY3bcPbX/6Fn/0v/sv/7Ff+2i+d3JbFYR2Ra32wSKNklxhhykkIlCCrlIMKxWga5x2LrMduWLIAFrucxozjI/pT33jtm2/e/e6H7/1377/36//st//NH/zh84vrNu1kKFIHmIlUXZo5KBZ2kq5xUoQHaJyRAXOF9wARSSE1s3kCIXbWQMy8Ko/d3Y2Fw99AHDWW4/Oghy3KhTkoVJBpd2YSCTmjE3WzitgekhzXmLWrCLsasXDhGI2rFIe3Pj988AVA4yiljqo9jMQBD7/SAD2E2F3z34JLYxQW782ZAuICiAF96X/FrtFnhFqEsrGNJoDDizzOIc2ZJd55za0EMzcoMab55uHDB/vLa2YhKNyXZVJXgI6OjrebY4PpshyfbF977dW7t042Mupyc+/O7ffeefOjb7116+iotc3Niy10mm8dk7x5eTVdXF9Hom8RJnD3XrgY+2ItaBRiEYiZTvu9q0lmYbG5hjww7oKaMTNLodzt4LYsCy0IypI5h+nActIqjnJSNTogFuTeW+NoAZlFxNRUlbqOxyM1mFZHd1MJrRGTahiJU65Au7GgbmmZdvNud3O91966qzC6de/dKSK2hEWadvRe3MESYLVG22+ulC5ybEitoK+1EMj2PV9eDtwxWc0YXbO8UOx0ZP6Hr9pSXze/8x/ELqi4Q80B9NaNNABB5hDJw0zVNd4vuEMtULZUxhB17cEHZDGgl3QaS2ldN+NgTZspAXUY63bTL9XaQkUOTTASgLWE3OOGhuqWslbGTO3mxKytOXVi7vN855VX3njjrcvr6+nZTci6ab10Hlc5ywwQdmXJy8V8Y6UOAKz3o5NTKeXm5lrniYi1a6k1oLsQ2wlENfC4YHqj2gVatRoGh32IrSQGEYWFQpW4+IwA+UJJYkRwkmBHJKeKSCIzZj4+Pr537/7NtJ+mqS9zlWIGLmJdOcx1PJKb3EG1VOutuRUpwmTmh807d1ttTCx84g9Gb56aK3N1phQFUSk0LxcXu7/yF/783/k7/4s/+xf+9Mlt6Q7u+YGNUAgHWio3mWIWghNFMmo4ZoPWOwizUHkD6L231q9vdvvd7vp6dz3d7HeLevfeyTHIcHJ0/Nf+/J99/823fvf9b/36v/jtH33/R/PSpXQ1GDoIYeBBAW/Gqka4sCF7jqjysdhGaXkrEjYS4uSIpVcihBRCmBlkataUCLvddWtzb01NvbdSa3w+LuLmkFqGAY6l3YQct4okTbMuoDpcahFmNSVgc7S9ub4msnBlVzXrM8ifPHpAJAH9r8olorQghFRh52421MGItCsBQtJZdWkouQ1KRCLFPcP/YuIXi4IRhnVwM0QYp2cIQBqW5kWkVBZ5ZlWw8DJP58/PzCAgqiPcFdbNat1sN9uj42O13oVeffX+19/52uuv3q/M1e1rX3v1w2++8+47b8Bt3AibjcM48GZqrzx9fvng8eMXF9e3Tm8pTLuSsLaOSNNNsa4z16XNz5897SFm8WRcmVm1LYtbKB7dGGLekSyWwkOhn3uv61t4oMZTDpANc+giALSmbACVcRzHEeRtbq66u75ykHUNUEXNiNmZ0gWJKCWLEVwzz73vnjz9Yhhvvfq119317IsH2vfmVKpE59D7UmuVIiWQ2EBgMy84CEkmWGp442EmeBpUpcVI/m4ifBG7k/pjYpBzyn4SvlzPvDS0XyHo9cJQGn0Ix0abqsdkrb27CYDsGX2FcS3LtEssVrGue3ExaGQBdJZKwrQ9OmaWs2fPqoj1Bh9LLe6DtgUkq8omWbOXzTHlgRIovjBR4aSE1Ji5lGrQ49OTu3fvH22PLi4vTS38YGI8zteVuWuGPgdMAc4OQqInMid2rnzv/v3791799LPPLp8/deskEniCsWiLYdN51VyDXha2l3w8w3V1k18/wsoFslk7LG3F1wguwvtCLIATOOWbUZikLK1NN/PcFxCVktBZeD/EPaasq4Fz5Smk3uMySSnRFmS9TzFYCFHFI7oU5q4INNmN3FRtUFxfXXzw6nt/52//x3/xz//09pWhAd5XXzFGlrrDZVjvfKbPOgOx4MMMQveyag+nfXv29PmzFxdnZ88fPjv/8uHDs7Nnl1cX59fn++u9etPWRpbKw51bt998/Y1X77/23ptv/ft/9i/99umd7/3oB+cvLgGGschgK5CpvcU7r71nX9UVQiLsYWKUb7wzCzHBQ7KYJuTWLRr3gE+jzJShultb5gjSWHfoGOaqHcTj8em7H3xwc3n16ItP+zTFepp68nUWVmOeCq5w7HQnqdLn7q5EJFwKiUGtW9iOlSqubqalcABbDqga52IgOJyoe/fBGSAh98gIst4bEUe+fTyODFrTvXzVN1Fwv+ExvRbABOdyuY2L9xbVhZ0IvEwTgYk4gHjiwiJlKGAnd4Zvt5vjcTMUuXPr6I1XXrl3uvna63e//sFbxyfH7np8vD0djl+5d+/W6ZMnZ8/30zIUKUxWZZmUWArY1Tu6hyUGo9QafgRm6topnX8g4DIM2lpri1kCkbkhH8bLIDdbgQOH42AZvrLIFIHSCYqkJJBzIT9CRGI9lrm3ZmoOlFKIyM17szBVVV9938LjSITc+jI/+OTHLy4vXn3z66e3b59vBANx3QSYIUwg69rbspPtWMLNI0k9j5cmeknG6l7ijCAwIxjKLYaDKLWa+D3I19DnQHyi+iMxwby1EaH8leoaQ3tW7WBjAyRnkdAShLA6kZ91tTFa2wShgydiklKsa3wJDyYnboz78dHxOG4BDGVobQb8RIrXsbUFxGFnGCxCcvRYz+pYksyfICGD4ETjbenawMIuu/1+N31xdXERYI82k1q/EjiBKiUmCutG5KXU6DLMkSHKIAFImCqXKmB2JXePRDwSid2W4I4c2TCG0GL1E4pTFsQc6wo5viBnL9MGs9ZdCnPasnpMqcRgLiTmADd0NeI6bMbe2jxPZ2dPmqup1lLIqbtZ7+FpA9e1dwMxa+vEMpQasU0AYqUgRK7RgSD86IgpgP9w2IZgNeZScB1HOLabV37lr//lX/gLv3DntWP3/FYWUjJGa9lDpLV0yq4jm4vDYQKOGraeYGv9yZPnDx4+/OGPP/43f/j9H338g6dPzx4/efz86bOLy+fm1nqzpWEQqA1D9e5Hx5ujYXv33r3Tk9vf/PBnvvn2e7zZ/uhHPz4/P5v33bRRLaHoYhYqFEO2qTKDSjjxqs7hAsYgFRkoHCdMPfycD3biGsQZA8qpCWapdZlmyv0uV/NIYxLnrm272fzKX/mrD7989HcffWHu7K5dFVakUDxL62pCb52YRERbR8TyWGeuYBGpbGam6doZzxSzGlZZugGOWMMDN1U1lVIrV9Wl1mpLRxELyJJLpkhJMTUuNcFIetn0xXQSPuqrn5sHrUZEEmKNjKLiQCaKVFMtRUAom7Grkblp2+1vlmlfSxk39fnZ48p9EPVlOX7/LUqHaZKh3r9X2q5N85G+8aoDLy6vHz0dj09OfLfb7ac2N1CQ2KhDIWI1dZiTq3YppY4b7Y1WN3IQSMRaJ4BE3EyztWVPS+wDZkwkWBvoKCqUwXQJU+QxGOmEBDCx9q59IWYHOaNQFZZQBhqSQs++2wxueUGJWWh/fg5mWNtdX776zjdv3b9zs9+fP3ooIDE3bSSsNrNtzLWsFGK8KasG/mCSE22iO7yHq3xgIOaakA6DKENOAMDo4AOaXkrEhyXr9H/K6h88FrEjXH3ogEYHTUAc/BxF/tqBK7Y8V2nVzMUCGqW2jFePcy+lgqGqxGyMedr3bg4vg8B52u9eCps8M6SCC/QVOMk7w+wcB3xMp1Dj1UGCHS5FtOvzs6fEbL1nogR/VduX3FbXnsvruWWbCkFwCWmkuj19/Ojq4nKe50gSr3UI3x53je05R4aOhVGUI3xUnZijWYkOI1x/VgHp2iADDiqF3d26UmECrZwsMxM0WjIZj49Ojm8vaPPZ2bJXZaZaXE2hRMSSgcY5hxFWg08j4lILmAykvhou5XuO5G6c1c21s6VHd1xZIXKirosqYXRS/9N/6qP/2d/6K6++ftsAVUgJY7gEk21VyWZvC8BiCYsc7t2ohsMqdPYXZxf/5t9+/1/+mz/+3g++98Mf/eCHP/rBwy8/j7wpgjuaUPGAGRcHfNkboJcX7cJfPHzyJVP54cc/+Nrb33j7vW99+4OPPv7048++fAD1tFEQIUBYcnGUyOFSB2axviCN4CVWUsxczdW8Emnsvq0vS5yjXAo5uqtq760hUgeoeFJqThIiXIXbF59+/uLquoBarNxChYRWiUJYSzkQKdAK4wLtxkzG8hKthXmoVmuVIm1Zln1j91JLWDTE8eVO3bs5k4zHJ6ddl6XD2yJEqs0It+7cl1J215fzNAUEt2Kxwhmz7kC4GIQBUrZxHi2NwzkN70Ds6HCQwzQYPtbeuZTeOksZNoNp78usYF26uI+nt2oZdtc3T/3x6aZW9M3Ir712nwuWNn/x5NlPfvLZzd6fX+zmtty7d++V18bHZ+fz0q7npffmMOES6wxhxBQZVg4T9pUMBMyXeUEqD4OIy9ksFmdsbdDCRYtWbAFhxOvBywDMWEcf05wHjFxAaqba45lyuAXFYKytRykF1sBQpCCD4e5KHVUGc70+fy6bm+nu3W9958+dHt/6o+vr/c2jpi1OqWGsfLQtdVOQOPxLmpNF0o04vkWoy1bnHDicVhczOBQUG0wgIGEcXhc9OF2oUgRHL8GIl5+CRWh1LkTkhLmvHUEmNWA9n3ylADy2edeaYmHWE58hmjCPBKQQpWqbp2W/i/CjMDKap10UZ0bIdSR3Giw5CqwZG1hbf7fQZNoBzYyPCDfExVITFKoOgqmuZ2i6cwXO52auKkU8vcZzBLIedCXm/X6e9qGLLFKIwMytNxJiLiBvS3e41IzojflamIRZgyQ/sKBYq8uhu8p0CFvnrAius9yqBgmxWec6vPfBh2+//c4PP/7RxdnzWrhKcSYZWLsiSgVKmp5qBBiwm4eHCQW0Eec4Hd4ak/TJ8ITp1rFK1Z28pLqRmIuw9LlXt1/+5T//nZ/9mXEADCSriVJCXigEE0jCdCAGKq+MggPGxsRo0/6PvveD3/69P/jVf/Cbv/d7v/fs2ZN5ujHV0OASyNyBgTiFuh4HGxFc1mZAzf38+dmLFxdffPng3a9/e3t0+/To9m7aBVoixLE2JVxj6hzH7a2792qpFxfnV21hkBApGUmgJmlvFeBXjNWOwzhOZmHFrDG5J1aXakpOhBrl+sXZb/7Gf6uqrU1MQsxkZB6WIQ5Ja1ALtzWEG9UcLWzhaqauamau3t2Hzeb07r3tdnOzu54fT9nKlEKopA63Nk0yDCenp8TDNz/68Ozs0cMvvmjTvtSq0yS1vvL6m0Otz57IME6tLfNuh4h0Y0Ut0SFF44eUcKRolygjQvOkhPewkUiyMALyjCHauhSuIr23Wodajt2tSnnt1XuvvPLKsCnT0sehP3n2dKw8DHJ9cy2Fzy8uHz09f3J2/uXjF9d7PTt/MW5P7t2+9Vodzl9czNO05SMiaO9N+83NDQvXOlBrXp0M2nsEQqwITqT5Gb7yjBOyPV375rxbDo//06ISBBHoFAYKlMscgbN1FoHEgCGBmcS97kv3QFmTa4rxAiyi3plLAAARW+Lm41AB3589Pv/y05ubGfPkrW1GadpRZBiPvvkL333/g28XNyQySzGLUOhRnOBmzIDFR0lsB25EEqNZ3EVfJ3r3QDSi2kVfKoinPL7uOgAm9cvExIclum4dwfubS5Fk8oKWPuCkyRw7sxQpRGSqatq1C9Pha5OBhONYdqqu2l2JAphjM9PeJJO1naTwurqeiPmBrKYcSRJyPpgpZjIhEcVzycQsMetomKdbcsnx9w08FGIxVXeTkrvZSFSXAefCwXi3gD7NWdjD9TpChsdN4TK3hYqRKwUmGC4zlEttyDCmFX+jnMEIku6qMTMRe+7wRQgRSUgvKa3HhjreuXW31tG6CpEA2jsKM9U0nXcQy8rIYP3IzMHGEI11IJBZJ40bF3GMFotwgbAFX+REJE4GR1weB1ktw7S7euPVr/27v/jz9+8MqoeHNDGfWKk6sEIragdiavPC5NqXcbPxpi+eP/+33//h/+8f/eZv//bv/97v/Ivry0eAhM7ZALOGhN7haoejxCEgieQxcVZInP9u+uLsUWvt/uvvj5ujpmVuS3S3URXavF9j5fz05OT01h1Vvbk4h3nkwYG8VBEu2nvTxTP3OED/+BThEBeKJkDzTpGA0tQ9PHOp1GFp8+Xz81gPZmJyIxFrUXNDqiAOV4TLpEfWWESmmKfkGERcZSvCZdS5NXDbL2RIZDm208Xdem+zEDZH4ziefPdn/p1PH9x5+uTpfH2lLCTlaHtcWMajY3c7Pb11c3XRRMKgeh3NUym4qnFBxJSWt5RsFa+znDvcVrcconBJY3KnwtxVXRWljENllipSh7H1vlwvY5Wb3XKy3e7m9uzsIlxoHj9+9vx6VtRhPL5+/vjBw0eb8fj8/AalLMs81ipShdBY+qQiAoZIUTPq6/TBDLiqpbVLGCCFM8ra2XqOsvERXxaTl+YWFC0yh+w1XlCnRF7YxRzsEBHkWAtFCjvCETJfURgLszCrg4u7E4fNjzKLuRFEW7s5f/5Hv/NbkNKnXqs4hMUM3tr04vMvP7naFRbOQ4m4LQsXGcaNlNp6a/NMxEZpSLtqO8PyEJHxAiEYU9haubMiXHwkUhcCAk6FUqJKayuTREG4A4U3cSkVBDXbbo8dNk0TtIMQaT7JSBsojXPDtjcG4vCOI0sHm1hZCnOhzCSgWJgKbsDhGmvfsYOW9fPwGZGEFXIZDPH5kLzCOhOEjlu7SS0ixcnUW7bbTMRQNXaq43B0fGxO2rtrc0RDkSBvHDLBW7hZIHlMcKSDKBdyk1t37h4d3bq6vNzfXLV5b6amPmwG6xaseuaRxQfxtDl1RzpJUpq4+cpD5V4YAxpbQqTaiQujtLZ89umPHzz49PmLcyEmhndzdWeNYIpwPlFTihgPNyZmLmadTKyriqby21wKcdof8Mr0BiUQCWlODEM+VhCAuVk3w0cffeOdr78lFWjR9hwGSBCgMVQeDm4K4AulsPYuIHg/f/7sd3739//+P/y1X/v13/z4xx8v0x5wRgQwRXcT2zQgSFjTOOAoBMneyE0P2TxwFjLtu5sXePLp5vRVpUMZDf9kZiYm7stC4OvLi666n/bRr1lueDXhYtDYEF6fPOdIGIvaZ51LIQu37SCRAKx2EoGkAdZblWq9G4KPjxk5wehQdkTz6e5MVLhEfxp2Y25KYNUGCAvXzcZULy/PKZAi4VKrdjXv6i16wNh53F3djJujL589OntxXkSkjqo6bo9f+9pbt05PHz5+8OL52a3bt02VuSx9iZQbUNJyROthzoEBRcNssUbraq11pBGup3QyTN/cSajWodbqrvOi2pqqi8h+2T15sj8TGYfx5PRoP84kRJV289Hm9KQt7cn5zdnVzfWyqPLVfr662p+dXUl9VsZhnmaY76edgNR8WibVTkpT28cjF6pcUw23NgeRMFlA+qnAWZvbde4FgeNJTXxzBT7WKsMc/byZEkm8lSZpDbzKqAAQS2o+EKtpmTIdRDIdWqCEzqUgMtTcCdB5uZkWKkIkwjWgezafr68+/5M/+bJwiTOYRFxVahGWhK1BYFo/MIjFVfFSZkhxBklkgptzOIOnhQwSlWW4rsaG6//Lr4dVJRb2h/GxAThKqZvNxoHWtIfyiVLoCkCEg+wzVTOPbIRQFoffllmeRvFXKGL1wOtOIhEyaT0hI6bgLuL1CWIyl22IVrQnZmtx7SuRlVTBSuVESWFDbPGsx5OwO0nhqIaAEYtp5yKryWOowXLWSGYFAMO6A9n6DkPZ1HGswzwObS7L5OZeC8fM1frCwYUwi4TRHkf1zdXrvIYJSyb2ipisV7UrMZFxIfLStD8/e7pmk7l6PMIhqQlfzwQlzA2MXA6IJazQbdkur594yAicDjKuPJWZyQkkMPPQMjMRK3kBN2zL0bd/6pt3794DoPnoHGbIbPjp0PmvfyB+u45lOb95fr77V3/wR/+fv/tr/90/+rVPPvk4Lma+MR5eydmE+lr5o8oTCuOEIM6Xnv238+HFBsG0tXnURiwxYSGCc/MLOZGo9eubq93+Ztrvo0HRZk4+1tHdVL33ngcYYZX3EA5h7OBuLaTY5M4SfnMxJBmT5EKlGZgL175MZaiZ4uLk5EzkoaJmFkq3ugjnsfT1Y1UlEiJ21Wm3F+HWmrkW4fAFCyA0jjWCC2+IufXl0cPPb24u4Zinm3AwIG/H2+1bX3/7088/neebm2sQxNxKKSAyUyK4aRQrYG1K8kxPXCMeI1XNziteqzj0HVJkODraDNtp2rXWAVfr03Q9TTdm3UyHoR4dHRtTW3Ihri92fHKp3R48vnj87PnNfnGpT86ez3Mae+92OzU1VdMOSsF3vgyrg0fAaGuj4MxgIg2ZxfrMBSqNPF8jzCt9fkG+7ufbiqOAQMRlbvNQatQSFoqkWUcA8J7wEpGtVoGrEmV1l1l3VFNOai+fanfUUoVKPu0sgJuTwovRMG5Mzea5MMHUY8PU3Bnovatq1564toOI3SClxKDKpXApdTy6dffu0XZz9uzpxdMvvXViuEHdixR4N3BuiRNHkczsgWh44sg0A5E5mFHH4s7LMg8svS8OuClJspPw9fSIA4acSAw9gHCd5yzAQgFHYJ0xRYpFqto6pHlufeaxjNSdkRkSio2ZJc5pyUDdGFniZ3/JqOYNYsoYbuZIa/ZYDXewgNDn7jY10wBzaF2htHRvoXUMBBklHeMeswUzkQKFL68u5mWep6lro9iSBLdpDryAs+93T8LGcpiBR0/qSPjMQrCbnEowW2vmYrBRzhIJl8m5O1y4FDLFOluEOLBZR664HkbU7OgQQnXKvBvjlQIiCkFkTlZBIseMIiRUzE0d3HE8nrz19teHTUW64uS7Ftc9CJav7BceWguLA87a8vEPfvJrv/mbv/oP/8Enn/0IKEUEQKgNCJLStaSX7DBgxHRhuKS8hXEwWBaCOCfMbWmmHc6qMw/DodGmNEBkV2/LTMSmqq2VUpD7w05AT0eTBAWQXWS0/4GydpEafsIi1cm7hkqQbW5URR1wolpcfT/PwzD4WoeUTKIX8RiGET5JiJsQ5JoQEeo4MJGaaTezRqiliMbCkHvvGlIdZCUKOBttnrq1ZdkzWKRWKfOy99YfPfzsen81zzuRQmv7xZFeGx7yzK6KsFDicPtG1MdsnQFi0q4HLiS+hnc1J5Fycuu0SG267HfXUhhUWpu7mrBstttaq4F287S73i3LLELe+fjoYj8tDx+dn724uNntp9Zvpt2072WscHKw6mJtSTElsZQSNhshYRUupYqamTbhNQKIiCEyVNW+aiji1chRb73SOZMF0OrrcRpkmHYfQiaQOUFkakUKKJ1YY/aOs0cPGFJ0Tjl+SLiNrrwaI+KUYERQM5YStASxgJjZhAYHhCSSxYoBYDasPRSRagfI1VjoMFlHNTF3VCEpVDfD9rjWTSljlUKZQrRWITMjCSeT2JXPkpfyxUMzCgrDOTiBg0Espaj13c0N8UvNQGYDmK7wcUgmrbCcnN4i0IW98N7JTbiYkzKFHpRZnMLTld0VqTxCvoXkSHaBPFwE4ITU0nguZgaMnjMdeX6d+Ge1eUFqpewgfzpUJ2ewqnWb4hkhES4SyxE4fPEEghIYzy/nVMoQT5WBdruraboxdUpdLqJH4hykEatzBs+WKbQUkbqTxhwe+1bx1+JThw6PkIaFDoIbl4KeSVhGKTYFrQlegAX+k0RIrKxaMEPaNL1tY0iFp9Q4MptiPSPIdDcGmcLEC7MZFl/EC4zc/Pj05NXXXgu6JPEfx+EXHZrD9WjnAADRGYTWz549/6e/81v//J//088/+zSyYdYitDZsWNUZHgOme94BBxaCp0HRS5eh9f5GKdS+v7msm1uL9RqY3YoWmlspAre+NA77HQ4XTI60NzgJF9UUsYa9SpA0ieEUKmVwCWhgGMfN0uZlns06DHUzFqk+yJ17rzjw/PlTmZQidiYjBMgQGdPxMFu8MjHh5jGRQHZEPDLYIqo49+zdnRxhohVtinmch6VWdxAkBIDk1LSFz8rZs6eXFxdqfRgqC7emAEUrdHjxQyyw6l+SrIpEudWDck0hQi5xhIaMGJvtWKQAbGq1VHW1mPchbqTNpAAOXdQXvezXDBrryfX1/Oz5+dnZi+eXF/tlaUtram6uzXvv1nvYZ9A6f1hXRB1DngebcTP3WRubdZBoV4gxSvgRRP0NIiAwvlgDjWdmXTDKzThnMJGrcalO3UAGy4xyuNQBcM0givUhXxE8lkpOGS2jwWF5yCxjGFZTZB8RW2wEUzfykBbF4EDMHidRJ6ISfCyxEEtambrA46UPZB2aCTCk2gkgrjZN59dXF48fsIeZVcsqIZET727KUkAcTilUGKHl+srEntfIgHCbALXeQuWn2knI1TnXxqKasMFoPW8jb/L4+Ji43Oz3GiHYRnmMMzFxaLKYRU3h1KO3t/TjSVfqcI9w44AkEBaZIX4zN5daom0OxyuHr2tNL28PHA5SayvAQqlnyJVauAeCGVkqsGANs+7npoCtEqY49qOtjqUh6x2OrgozkRLZEcS9SM25MrdR8HKsiaq9yqh8Pf0IIVXHAcAK+I0JKWkEvOthOGcuBIdrXA4SDgE2QEyyVuFoYhgEqSXe4NZmhAcZ8oCNDiB+hnRHSpFBuvkIKswI7r2dnh7dvXdSYkkkZUNrs384d4HUehMRvF3fULVxGK6fPf/Xf/SHv/7rv/H7v//7HZ0RNUKDcnDyA4/j61xxmCWcAFdPttIPdnPRsqww2rrQVMoRD+aB35OTOawUIXYhIWdVJSaRQdWIyC2Uv2Bhkci38DjvY3SKkhKPgasd374F4u3JcV+Wm5udLnNf+ritS2uvvfXOf/Kf/q0vPn34j37z1559+jmaBrZZiD0Mc4jTFMQ9iZZucS/cWWFcRGCttwMTob1lW8JcalVqTKyrsDjAbtUekJBIITPzrt24lkLFVPuygFhKNSIptbfO60NHyK8Q4hjKEZBACCMW6wHChEkuaMX4Yh5yo1BlLn3W1pxRqGh3CCJR3eFdbSiDo5tbU26q89Jm0+ub3YvLi5v9zfU0lToGpatNgR57QswA2GwFmjNR3U0N4maJhUZNhKM3JSHtbjnPxk8bises/QQCwgENGSmF3IBjZmsKYqmFmIxaX5TViNQj7T1a5BVhAsCUZq5MEemtAaisDyeIOGDlFf+Ojo2IUCI1zC02AgGDgaW49SKlhF+hhLeceSlFzRjssUpEK2/abdgel+2RNrV57ssirHANBywSJqhrhLWApcakzWAitqDO037cYiTycN8JTRvg+XCAmUIUK4wcZGiNjou/IemBxMzLPKtOgJfCvXc4Sh2kVpHBtM/zZNaRJhwRuZqAZjg0mSfpGsCpaXc4O0jYfUV7nIgpwNfAguLeur0cj0KetfbMjhQ3UWoZ1p/czDid8aMfWnXdvk4NceimQsJisdrVQzIrgT6CWFhVhYkZ2i0h7Wwlyc24FLfYEtSX6GEIXeIw9gTAD8BAnAOaZjhk7tA1cM6juw2s0JwoIwxDwB5TTSFVZSIqNd5sZmRvwkRO7mHvTCIcmQ5RldgAJu1GIDUVsOui3u/cOzm9vYmH2yzo2K9QAXkfEIvVpn1/+eInP/749a+9tq3DP/+t3/vH/+xf/NH3vn8z7SnW7GI1R30911Y1SvYgiYnF6e35vkYzlTYgh+8c7F7wUEWKMXs3MiIizV0XiumzN9WuFD7vkYgLgnuJWAVio/iB3NUCR4vkKTV1BUlxstbm2gepddxudm0hpq6mrZ0ejX/6W9/68K13/uj7f3jz6FHvrZYCh+XnMoMVqsQeYdaB54R+ix3dnNS6eeRopRan++FJMDUC5/5ydA9OFmxEyZBLdgBcau7qcEBHsRrSHcQlHb3gwfCA3df++jCG+fqKxC8zRFQYUc65uTftqnp5deHmDo0Ny7BeBZm6QcWXpq0zs3ctQ5267ealqd3M835ZUBiFjTx3Jski+e7QlXKGCccz4eZWhsFM52l2hEF9br6zRHDKekqtMHGirjF/56EQC4khhgyzbDhAhZno5Nbp7fv3Ly4unz95AneBO4eLqgEwN80gZSRCSwBzrvzHDrB7CCuIOE1UQsnOoQdhEEfYxoqdGGX3S1xLUXUmDhI43orsHTjNS2HOtbDCRG7dvffmW2/vp+XxZ5/rzU0VdrVUuBNFsjORBShBseYnuZ3iRBEqzpxbjaFQT7PhTHMkohVBS4AoPWPychNiYXkNFPOLi3N3hBCbwWHFPGy3tZRO8NlB4dYeSHUidGTupmogxnazrbKd572a1Sqtzw74uusV09QKHCQWlkMJr1hSYOi2kshEOCw8BxAWDA+lTDNazyjq+boFFk8EoPeemHpixADlnginZpQYIZE+OELE9cm2em1d05MERL03ERHmUnjVgGoCr+vfRcoPQcxwMIuzeuJtDpAhbQzUQ5pCgKtqYaHumqvExbo6yMiZxDh1zqaqXTGUeGdCHuHoTAWkCIwSECJ2NO1DoXuv3j8+OeaDYna9GL4WbRYwYtVT27J/8Mkn/+r3/+U7T98own//v/37v/0v/sWjh08Z1QFA1Ht4FWRHRenB6iv4k8hY1Ln16kcTFz1z9GE5dcT5abFlRQQ360QlPW4JQAR0QIrkUJE26UzOCk9sd20OWNbIiNiajp6CdHd9ZWaqfSiDMWlrbW5ipe3n508fvji//OZ773772x998r3v2Ys9j2Nv3awH6Ru1WMDdmhFzqUykvYeLfim1VFFbWmtM4rIyiUREZKro6W2HFYxnplC3pRw7XkMmYjE3W8fqLDTmFESAx+kbco+XwBsMhrVTAuCr7jm+mR2e68MBQa3N1EI+z7XUA+zO8fyscIG1rrqQ8PXVzfXx/tnl9c00KyJ6Ora0DDCz7jByM9cVUF0BxXVfK4p10yUvQXpreyi2PUtWwoK+Dqprw7eWM0sinbmYq3aFENx4KEfHx2997Z2j7YuL5y+szWqGHquAcUlWk6Tclg17YS7geVqwuiyTFdUeVsqhf8l5nF2oEPH63AIIlQJlV+deREi7MwfCHw9vKAc8C5Izc+naSq1H282r91+93renX3wGsohxCKExsTOkh68LuaO7koPDudgUTMQR+5fYc+6ZhfYkzrtAPVIqsIqCokkneDTyjmROhchA2ltIBKhwHgylurn2jF93dyZhhubnI1MzWLrSGPela9k7lAvfvXv/6uri5vpaDnomrHcinrYsCqD1FAu0JdDjrA0gGJEQC5sZxXp8/OSUBRqHwguASFUTn3VXGBskzJ6IVsCJQIjULwKIGepqPQqFuxYeiJAy3N5jIix1YBHTHi+S8Fq/NLhuiEicSGoWS63Iw5rBIKOY4VpfWLwUcWMzczWObTqmMFFlZo9NGTMiWpYGERbSELcLs5CR6dKGzWgGU2ViGNRUQqjeWzgthV/xsCl3bt86ubWNfioPAI56HDU7HuDoaXRpuydPv/zDP/iDL768v99N/+Sf/dYnn3+xb/uwCzIowcPjj5IjCYWGvcRnnQ5oz1ruv9L6rvhT3HNmMo8YanRtbo4wWUqIn92FD4anRNlau4cNFDtrfog0ErK1qYtVCWEpdTDvtnRzW1QX7KkUuI2bsdSxt2Xfl9//439dpByNp0fbbbu86vPMVMyM2ElY48V2B5GqFRYSJhEjlEIMUTc1EEu0RIfeP68BYGsyeh6VWGv3+kawlBh6YW69x+ZnRCQl3Gep+fdVKxnPfRRSJg69eH7rsDVQB6clQb58BgeEOBRrsfFjGoAyDUMBc9fuqspWQOYBYDjIr6+vnz8/v7y+XPriagmKVGpNndMl0KNNitOPAdCaH5WsPsyEhZh7BKcHXpHzL3JKXnMRcoiHUxg6Idk4DqgBRFILc2+diC5enD34fOy911qaLu5s5iKFGOrm7mo9sqxNc5YPfDWDtqJTCQsVpsrcTU17kJdxK4XEwYpVQXxoYVlAKLFkaG5xWd0I4pkcs66iqCpz8e6X55dPHj3dLct+tweJWvMQ9sa2P7mIaO9q2gx1s2VnC8iZVWJs9Ni9TEobwdNCD0uQnjU1RtUcbJIjIbZupa7FNOVZYR9gEQAgVdxsmvdMQdxrkeLRe2RNd2YSHsJkPNQv1rqDCxGXMmw3N7sbArt2Ej4w8QTy3MM5vCMrHp1nPZLlj40+F0VnCmBR7VDu11PCYcwFbnEjRUodRlPFvDIlsR7DnL2quxCXWt2jPfSujWtlYfeAlTwOVKk19qJjySBBmCxpBmapuUO3XvCE4/PUlVR5qsWZABEGnNSI2KkwWiEO/pALuVrKmYTc0c1KLaCIBpFYme7dyWncHEGc1IpU71ZliM1BMFUZTVVE2Km6iPJR2d46PZG1849xK/pBBjk7u0NBUKCbzfM0X17fPD5/8pOPP/vxjz+dWmPU1WUk/qYB5isDvnZ78aFppQTyd2mlZnAQw+Xv5kgU77k7iRS3Tpw6Jwfc0jYlLOCiUnqcysGzRzZnVw8pJ8WwG3ooitGxqyJIUEBYeusgIyZUUWitm2W3/Mav/qPv/+H3H589u7m8cgaJEKQSzKDWUYpw6fPEw1AjLKktqp47roDHaJnbtrw+yfHyWQ7sGZERoNZLAI5zTMyWLa7fSxnI2r3FaxGl3A9Sbj9c+ujqDOCVn+IwpXUCFYlmz9xZ4h6SGVhS9RCBD6pKBo0UNvPOAVYaOoFEvU/73TxP8zSpNtlsYNYN5EzBpfnqY0/Rf1KY7jl5azpKgSMNn8PiMRO149wgYM21DjUdZa/98tRcMUSKyPQgcUmIfZkX7e2zmx9ABJ2YiwNkDqfcB5IQTiB6HiFiYQ44gJjAXZcwjAH5uD3ZHG33+/18fcNJlxIMX5FjGDE5mAR5QJoXd1BIJOIWFombaNaZyM0AAnNblNiU8OjZo4CY69Gm7bp1RBSNuZOHwTCT2L27r7z/zY+s48GXX+yurl17743jvI8BIOQqsS7FDrNQhse8t0oq8hlB4hKeUTu9xdtoMKI8ihng2NwjHurGgL7fE0IZ4rEEBS7WZ2eCdYCJhYTC6Vt717acPXlUhlrraH1BZjV85XbmwbTW45hLKUkgJ8pQB1ApvKJYKx6TaJ3FbBVfM5fpQERcS2UpIELjcE6ONoQILByRyGUYhjqYeZ/3cBeRImUYx9aWeZpCQ84Q9W6gcdwysZqqdXd18zjAcrUTCIoesU3eLe94dC6BTTGjdxIWKa7m5imoosLM824H4VpFzVUXqePUJhhLkRCKsEs5urXMF3CjocBYpLg1Ddw5UFRi9Oy2wv6vgCFVeHj3g28cHVeLWhAPbJ8RdvAsHiFMCl32pbp3qJMN9Qc//OzLR09vlmXcbkS5dbV4UlwRfWlkr6x1H1/5FWMnrRMHExGVWDqJokc5mHKOg0xxJKTyzjuzZBkTCTfWUMWpG4kgG8ZMSI7nxy3JAazNGSeabDBLNjDDRsP/B6VW2ch+3p89efzs4UOH9nkWSkWvEMONiN9+791pac8ePQ5itgyjlLJMkdBgvXWugQ8kh0kvL0uiPr46HUTXfjgyEwdnAiBS1JWR6UNA/C2KGxpcObxnuIilHVoyXoCn6bPSyqclkcrr0Kd+YGficDVnWadxV+dhoEBg4W7qXMiduKi7tgbCNE/7ae9uxGR9cdMybsdxnJdJtQeI5+a8nsFxsJm7MEstZp07uZtpns12oC9WQXnWqciRecn7xZ+PgyG77wQw3Yy8lqKmZmZNCxesxw8AV0ghxAZAEDsElpdurNoclKxSXJ2+LJ2LW5bEWAJNACM1KSuQGgyXuQgV5gIKl06loKtCD+vJ0XOtAJTBhYXo/fc/fPWVe08ePv3yy0+efvaZUgtWOoCwoFmF6jvvvv8f/43/6MHjZ3/v7/1d2V17GajzOG60N1U3MxEJ14gQBa6dQjasDkufjRUIl8CIRViYLSBdqKYlg8emAxERlWEYNtuAU7Uv4TwfuLaqhnkOC7m5urJSrQMxPKZ5bb6ASNI4J1jYlT1ZMUesmhS4Z3rKWuZXYogyz2G92NEDEUUQLghhzAIvMqh2Eh63GynDPO/dPcKqRITAIlWqBNJlvTc3de/LXIbKXmrd3L37yvX+urfu5nUo2hbicnx8cvf+/b60Z2dPW2t1KOE/Fg6gpkaZc5xBHERUpDilSMOd1N261lIqS9OuOguGbsrkx7fv6DSZ43izGU62vtd33n//1q3t5cXFZ188uDw7m6ad1NHLKDaB3btKER4GJoKZL84sauhuhWJKBJitqZG6qjU7ee3O62/eEwEMhUDwtr96+ODB9c3Nvft3XnvrTbgQqAxiUyMq2+14dHRcy/Di4qqZBURrBFARquZziJDS3mk9xikZjpdvxgGZRGhtX26svJwZaN0GMKDHBOcJm6pqHH7WO0tZSTwHi5nyYVsDEb8a58baJIfIBCuFk2wCEbNZtGkMs+6quutKDO7LrHMrI9da6jBAad5PJGKmMtYPvvHhydHxP/6n/+Ts8YNx2JqptsReiYnI+zwxS0rQ8jtaVrQDAMqHc+ErbQ8Ibm5sdHBxdKIIuctm0FdlZfzLIYrnv9cgY9URpLompjNkmkbsYMKhlhpiN4fG2Rt/dhjr/Vdf3RwdP338eN7t1JYiRQqDxbq6aVuagNvSTJWLmCpRiQ4GAMzVrdTqqunWYKFcV2LhNP8pUt16ZyFTDRJEpAS23bX7gS7Ku7heKMYK4iaSSFg9Z0gdYObC1b1a1yIRJG6H3svUYLEz0YNnLMOorqpah4F4PZHArt3dl2lq0xwov/gh+SV0hof885xy2NKDu1CutyDcdQyq3dxJqIiwSKVaIFSqTq23RW+f3v7ORz91NHz64NMflVrIt0zOXxEnERELqc8PHz168OBJX+bYoi61srApg6wMA4MkD3/rXUnoK8uQIKy+wESmVkqFg4vAYQF2BClONG43QqW12VU9rELIHVbLsDAtZrVUuGWQQSkkdHR0enJyfHl1dfXijEHeYtsKQgKiIsKlwMy0gdncZBUNEqeWkXLCDXF9vCH5+GIdhLPjSAkJ0ukhJiRaVwVCG8BMxL13d1hXJlqz/qIXM1cwsZmCaZp2DgpHrVIKM3qfx1JJhMI1hlkYt27fevutd168ePH8+RnFJMdMRizi6gpF7I/Es6EmJeTq1cnNTHsn5sKFDE2bYYr1lc2wZRmPN8NM/tqbb5ZhvHX/zqPPH7/5+msffPD1n/7wZ/bT1f/j//nfPP3y8dz61HTZX05tNy8zuZgSugtBu42np4DM01yYelMQIAxCLXTjGJ1vHx+9cvdWRQ6w15fPf+NX//EXX3x59vzRr/zVX7732iskLKU4mlvzxQrDVafd7uLsYu7mRNM0M8nJ6Std+ebyKdZzPMn5taQ5vkr2BA2wwkFu0HUtI4/8uO8WYhB3DadfOMdk5OpqxlLVzNA9S3mKz8yRTpABETPbIR4jHnpKDCB/5QAQ8hlyJzeYLfHvd+7fXfbLzXzRp0bELEN4t4WnFuDf+/4fvf2194Yy1HEoUpZl6eTjsDFgmvZCLKXMc+NSiCjGAj8InjyvTShPDk17QCUITI4I7l37OiCAwlJXWHuYXOUwETNfUij59NOqgUAoZFapW4CfwfqtlZMPOBLF9rLL6pMovN0cM4q7586hqrK5hWeJ11prHbbHR/NuT0ye98TavGjrlK+AIh+MPHPNjN2YBW5MSJvJUMcQilRmIiZ1JTMzk0R+wp9zHW886SLOZICMzbLAllchOoGcqPdu7lxZSGL8j2tehyJURQoR1Ey7DlxSLh8zpSoxe++cjYTJurdcRSwTWDlnvGw7Y3xlwEqp0iKyNdb8EOIfgH2QbSaWlGqm880E8z/6w3/16Wc/fPbs8fmTpwPJsD0CXLWRmpsREqx49ODLf/AP/v5+WaZ5EqneFyzWdGmqAK3QlgnH4x6AVRRIFw6bpTD8QZGCWMtWRNe/+m7bMAz37t0HydnTJ70t0Zot01TKIFzC5j7xOgvPYRDx6a1bp7dudbOry0t3VVPvncHMHOt3sbgfjFNW8xx989396sgSzhGHMkKAJ+eAw5BIqQNep2wK3YgDqXpwt3k/MXPXkKVWwNSNGdZVfY7WsJZhGLZu5ly0dW2983J5ecGRVsfF2mLmNIipzvM89znaBDUX4VT0s1u3g/V+jErWAxpkQImZRApLGUqbbtxsNvm5n//ZX/xLf/nJoyf/9//bfzNdbn/qZ3/6ax+8+/0//td/+Ht/2Hc3Tz/5l79O8sbX3/ubf/1v/q/+9v/y0dmTjz/+8Y8/fnCxuyybUQndCUq2n2hpICpDJaC1BlV2sohHd6UCW/otkp/+1jfffe3u2neqLdc//PEff/yTT148e/yLv/hndFm2pycAHG2+vnx2ebk52U43u/31xfnz88XzSSamUrfabphJzRLrdz+APyvin4JfJNafM4HDCtfCtfUl0i8IRijMBCJTh9t2u0Gt0/VeirQ2j+ORDFXNelvcjaSQUeDX63Z6NJlCiJx3cDztSZMyrVZooGjiaF3dDj/JCGLrYx0Mtjka+zzMLbIluoPAzhAQ994eP/js2dNHvftm2BQZDLTdHL399XcfP3745MEVlRqvtkiJyBZC2n4BaXyBg1IqS/WKDkV1c3ezCI/M9UkzEUlU2d26rn8WhDRIREoxyF9S69keJeoYlkm5DSDEhSJ0PbDA6L8Z1hepA1Qvzp9Py7Tf74SJWaJ3cXdnLlK094UXIWGmDiA9OZZOrta79lLEEWz4urnDsIgchJvH66OUXtaEOO6de1dVFZEgsJOu8fUlX31dQRQSZuLUa1BquZ0SCI+pwIhRpI7Dprm23aTea6nb42Ou9dV7r9+6d+fRwwfnZ2e6LGbWVCmalVDIBppKYK6Rr0kR3Bg2vfhq5OEBvHDAS+8aZ3UkopAzU1EoMav1Pjeb4DvIOL7+tTeJRYYBQrfv3GGz6Xpn2rV1EnGKbCFhcxLf38zz/NgNwgNVliq9d1sUzCIMVcO6YhkoizkJh7gTBFiMaDGupD+Gu3lO98xMplzKaIZpf9NVw67PHUxiqss0Wbdaq5mH5byakamaPXn04Pmzp916CFLVSGplg6KbucEiDwuSS5OxpbBifXRQCiM7t2g+fL2+a5cZLWNA0AeoOf9KzMwBGkYBIjdNH1BmQ3cHidRa1cyW5to5xhEuXGufm4m7azdtNzuWgu7EAhbTxdTPz59N86S9u2rI7ckzxpk8jjdjUKwLBJVCAldt2sy9cmESmBYu+3n+6KOP/s5/+V/cv/e1/+v/+f/Snz/8qZ//5f/j/+l/rdT+6//NP7n47E/qcNqWCdg/uDn7g7vDL/+5b/+ZX/hzf/Cvb50eb+/cvXP79NZ4tB1racvS9kamIlKG4qrm3Vsby+AOM+5kVVCKvPfWW+99/Y1X3n3TgW7KpOP25C//tX/vzr/6/d/4f//qsNnWYUB0V+D9bn99c/P84sXjp09ubnaL90G2i6rDDX5984RUyEEQSgvRr+L+tFZ8x1f+WW+YiVBl1r42dyAhyW3EWHkEi9TeXoCrFDnabt94750HXzzQvlhXLjUSP+Fw0yji8ZSGgILBoRJMJDNJAPbVVCBGESKsudnZn5n7xdPnICeISBm2R7q0FoqRWlRVvDq8tcUWbe4OKwO/9dabv/Irf+WP//j7v/rkIcyEc8cFnprRIGMPV2g9CPFV3VoC4fFbnCLNECQTk4UVnZG7Rf6BqQY/etAOh/15GEvQKn4j4nW4yE48QZVATiJGSSSsaF5+91Kub66XZYLBhYkl2CJPCY1eX1+Nm427WThbMA+lANTm2d2HsbpDTRUWghcuhYJZNM19yVDy5AoFCGxmZtZDYw0KtfqhrGbVF87Oz0PcFCwRkNszJnLYj/EQP222x3WoBi8sVisbcaFu7agMr7/+2nc+/OhHx8d/OP3rJ1cXtQ61QnP309fe1oWKw50ZzB65woPASTV9GrBaRnIeuyjMpN1BLOHZ5Bq6zKh35lDtTKJO7339Gz/3cz//4MGXZ0++1I1Vw+P9fHV5yUSkLiIi1eEsRGxMZOoU64LE4E4suRWGuAoWhiDRNjMzEZeSLYBZR+wwlFD9Z1MQ9tExOMtQrLfLixetLdYbIffWiEnbQmVgIgqLgvCYNotN5WWe2jInbCc0DEPooCKKsrculEkmAdh4epyFiSuSclhnXsLBqCl/Mx4/HF6bA+F1YAjWoyBXOWI2IyqHaCQQETNLxIywlBCd2tK4spMbNMuFxavn2XaAWMTdtfXrixcAQVGHMTKVs5cLaX6E5cI8JnFmkgJXcmYnUx3HbZ/3y37XpvaLf+nP/fxH3/j4408qrv6jv/E3/+v/w//2Z/70d37zN/7pX/t3f/H9V+5VqRcvLu69erI5vv2Lv/gXPvz629vK924df+db7z94+GXb+Xd/9hsfffOb3Zezs4uhlFfv3x+OCiCtK8NFWARt0tYWa0Z12J6ODMnu3xyM3vEzP/fT0/XF2c89uXXrPpfBrRMP3heDgunzn3z+8PHTi8trh6s5E5ubW19216BK4Y62gv6J/Gfj/1V8PxmfuHcEGqUebbbi0GWv6JFZBjMjZ4Jq311fb7i0RVX7eDSa6527d66ur/fXV9k7m3m8BQLVHl6qpsHxFGi4t3mKQVeBsgPlkE9HvDaK5sLEPJTqueHBTsZcrCvCT19VNSynuAwDNfbaRbirimN3c/X82Xkpw8nx7enmSobRek91Aq2Kz6jnax+THAitZpPr0WD+1RNhXSGJAYKYyDMkXZzyZfGwvz3ME3Yw08+DBDknrEygQUM97x6VhBzOxEdHR6p92U9mWrwAiOUiKQKwWX8J8RFU+/7mJkokMyOskkNM6V64bo+3N/vdstsxS/K0cKybGbBVG7laqhiMSRBAhdpB0ZR2Py937GNnINA1EqmqrXCVWsI0xVTNDCQgrpXJC4ss86RNw9WSifrcahFd5kePPx+3wzRPIVM8Ob7V57a0xbo1nYGMBswDlNP2oZTiyBq4ks8xQzlZeOtTIRYeEByAmhELkx2OPmaGFCcW93EYuupnn3/2+IuPt6WKMNw3m01ovlgKsZg3Ium9EZFwpSre+9IDPnNGPCi89mHk2kOH6g6QhRAqqIESq88cByaIwnE/a2fvWpi6GSlgKsQIORBACoe3NlOEyWXcBEkp+fmdnCyNYQxOmrNIDG4O9XwZzD20++vDvkJDgCNOI3IcPI6YaY0/pbWbDHQV4MPtyQWCFBmmI0Ikuzsd1sjjsVLVWHJAAhOkvfUexjKHja1CFM8rm2nEIEqpsRsSE4eFl5RZDBac+GR2WGagsIMK7trgast+XzbSrnUY5M7p0clIP/tT7/zv/3f/1Yff+al3v/5u27d333jtf/6f/Id6/StPnz5T9Ve/dvfozv1vfPj1W0fD9cXF19+6f3399A8+/eGPnl68cmRbWyCiuugo09FwdjY9eXbWzOaGaVmatWXeW1t0asrlqNS3337zuz//83FHhEsZNlBb9rq9dcQkQaHC++7yIjauHz18/OL8heoyoKqrx/6Yp6jjIO48oOtfKfQv/yu9BL+dAQEVwb2Toxfab5apx29KMe9wtbjd5iAZj4+tz4wy7aZPf/zJ3Kb4bkWka2dmQXG3AFRXjY87RdyKFBEppbUl9pKiKlqm7AZpJ66dKMKoQ/cdyxooXJgYZqVWmLamAR+HB4kQ0bAl2DxPVvzJky///t/7f6nDSWstUmtY5Kr23ruvXQnWZzExzWxl1gPhJdEZJxxSbLzCbsi9yMgZOoBJB9ORnLlwOE5emi0ddCtJH+RpRLTaj3cCnZ7eNtfn+lyAUofwa1EN966k8Qmr1REB7tq11KIOU4XljpdbYxnee/frD58+Puval0mGIZcIiFwYakQkYYmfPTxCtSzhLhMvflybOMNCwBJAnxPBSq0iwswiLFy4MODLMitRby3m/7FupRYq7CjzfpnmqZlWZoMNgLXls88+fnb25PjkFkFfeeVVcp4c2psXbLZH5DS3uS8tTdOIXjaCriygQr5CEZJJgQR2Yiu9GwhSBxImhXYHXKQYNDZ1iSMu1K5enD96+Pnjh5+ePXk4iBSWZerqvhlH5iLEGmF95ETovTlZ4cHd3dS6BxVyWK9IZLAwk0ionp3GzcaBZd6TOxzalVzS+zweirUprEOlKGhMIhW+ShycmAwONS1Us746hfqFhVfTfI4lA8TxZUnTZUJiVHHkq+irEDhYYGKs1E404ev7ECNA/DvnbPzyJ4/OIruDhJMC9zT3kMHpqoCz1GmEgZJGjx91nCg94tN0wBQU1H5sexOtRhdxv5k4th5jR4XiEYXHHOMpD3NCyIK81NpVHfX4+Gg7DmT+p7759Q/eeuP+q/fv3T398JvvdZXeF8PyjY/eroP4Yn3pVEQ2IjL0Pk9tf3F1df/1V747fuvsk89/59HvPPjk43ffePX01p2xELW27K9+93d/57d/61/u5iuVsc0+23yzv+au0+XFcHS77Zef/4U/81M/+6fGYWRm1TZuxzZf73a7Lx8+MF+YBdpUl3nqTb2pvri4WBZlqgbq6GJIH0V4mDshR/CoUzF6Ho6DlQpYt4xX4lePhvr6vVsbYNcWnZbtsJFx0JulO7EDwqrNSerR0bLzbsrEZ0+eUFgtl2rmLNS7UXWCwD0zOFfNIlM64rNQoQo0TeP9vDuktjbhYAJLgds4jnCbJoWHWthBTmVgVLWFhVNSEoISqKszSSSFXV6eh3nSZrMNa7ex1nmePXSO8NWwlqKQrMPAinDEpeJkA2J5MH7eeKDXlCusPzOljC7iCg5jsSBzMA608wFriu8YLVeQDYG/kXfrhWSz3TZtuZJrCo4w6/VNI6jG8qSGg70IFymxCrTK0D0+G7Hv234cipTSex5avccVQL7gCO7iIPOjAyCGwxEDrLsEMfD46iWZzSKIwQF4hX8dk6NUCuBLCjddQPUbH36jyuYnP/7RxfNzQhtqbfNi6G2Z29K0+7g5Oj7a3Fxd31xfaddhO5Rx03uHimIe64bXmAHVTpQb2BQLhl9ZY40WhAmlFAn7HjOoBQQZ3gmmakUELBDW3j7/5JPHjx9Ol5dkBmbTpt7jW1I8Emw5/xnXWqBInt3W+xq+xOLWzQ0k0WxEN02lDkfbo6Zq2ptq7HkBoaY5aGzIw64wHSYcsSdCsSXiiChIEAm7rebElHtxmSHgRrG/5wcPFqdY1o3GrHdE+gSHXtPW2SVsQ3JydT64yORzsT6C5ESegkI6GAnkuxSogyMOixW8CbFw4kUEMAmRuDt7yEsUL5dy0gAhzrLUSvEKa1DkbsSF47IZYZj2alAmjm14D3kSIywJiJilOKFwyY/DzCytTZuNvHL/5Bvvfm17NOS2P9u837W+DMOGGLwtLIZCu6vr/W6p41g3cvve7Vu3bt26c+9v/q0jnZYnD7+8fHFx5/a9Ar97+9Wl8Y//+PN/+P/9jYvl6uT2beHSuEutJ6enNu3wYn/x9Pm3/9S32MAOZ4qt7RcvblRtWhqvuzbQ3lsr47BvNi16c7M3knXrJbtJzxtAa/hIz2pPms7pFDCfp/4sDmY4AZVwPPL9Y6nL8PiyTBNvh8KlXiM5oVI5yjkcXX2IMPHeuQjUWSRiHUWKhyEAPHxIgt41ZJAehU4xXXSFyIObicnQIyeV2M219Vrrnbv3lnmapsmDuitFu6rvEepjIRC5muW+jQMB8QrMlcS6MnNrs9kyHB27G+cTHC53fDgYfdWsvqRNKMmKeA94XTAMIUOs9mTuG9a6TsmrJMeQYp74frESx+tNodzNPKCnGShLmUkBOLT1WVtX7da7x2KYiIjEVtcK7eY7F3WfBExiqbMEC3Mp3WxZli8++UTde1+SvA1HzK/QduvnWGcRIiQobRGMsXYMecgdzgDAWYqZmWusLbs35C46gQgc7yh670ub7t659Qs/97PE47OzZ9eXL+DCpQoxeCyycbPWltba/mYHxjzvmak1OEup9fhIahXrvS0LMwmzDMPm+KjWerOb2ryQG1H238G5OsEMBXBmdnWL1A0mhxKTdZC5iZnq6e27bri+udhdP2/7pW5EWODYbqqrwxQhGyDAYqffCWKwsBwIzpYIITgz9Dz6DQ5WUiZRa1V42G51v8ulvhgHKZ/m7MkzXy4GZKEQfUl0AwxYwPSElZn13HkKjj4iLtxfAu0kjNhuQnQo5IgUPRAi3DG7FI6pNmR5YLUuXFhYradkJNujtQEAUYRnRS8VP0+amgUPGx/PLZZ3VmrN1ihUU4st+EhbdNLombIjTN975lSlA+QSi3XOvbVYHHv19a8x16ePHy37a464pTD6NwstM4K1gxNRt26tk1QinnZ771315o2vvfPRR98sZdjfXI9HQzSvw2ZbS5mnmwc/+rH1fvvenePjk1deuw2Img9CurgMPG6O33z33Ydfft5mffH8/Giod+69cXx8cry5DWC62b/y2mssQy14/c03Tu/defH0Wd/Nu/PzItp7G8cRKxM5bjabzfHx5kR1cVUimOv50zOuw37fL653z58/Z6lrj5+dBR/Un3AkCRx9xCETIf5btHjRkBCgcfIL+oaVtnLvaNzdFHKN+HTA3Q3kcToFXQUqxCSFiAiVAdJ1Az2bQ6xOUDCiyJmCmVu2rGTm8C61uBuE2NjEyMO8z+JcJmDa3yx9ISJiZ9T48a13xPlM7GQvS1iufEvMwgyhwgBMFcTWltY0lNXM4qbZq+Q0tCrXDl/N1yuEVJUkxrZe89XyzNem7aUT4erqFe1ZOJB7dDHxR2KAzcPSyUO7w5mT6aoiYtauL150VQKkFNMwEUCL8L+X5Fu4mWnkrHpodkkMHti19k6E3lpf5pAMZYKhh7VDvmXpQRBaPoooJKxTe4SCOREhTu4ormkeleepuapq8iOhYE84LVhlL1KXNrHw+++88yu/9Oc/f/j8V3/depu2220Za1cnZnZe+tInBYOLhbFDkUiE5c3x8VDLNE/XFxdMjQlqOo7j1772ztHJ8ZcPH509egjhXO8CunWYhwdH6b0LDwpTbeYEhxQWEYOCpC1WmGCoRQbmaVZhUDdFF5EYBHtvcWWTXxaSUryHqXLs39L6gYkLu3KOCdkmMNylSABHlkZALsJEQqttwtp7cBpwwK13C6Bjhc7D1SR7DgogNyHNoBnSDz7P+vTgDE4gHkJTzYfVnaRQZD9TnO0UjI+EdXbXWCWLH4DitCE4XNeCHt3EOv3mip97WKxm2eawYgeFhjr9P4m098NXcPdSpbkdfLnJUmwQFzA/G1HwiEEhmaswGKgim3FEb0yuZACcXEoNKIRKGNR5b4rwL3KrXLX1q/MXb755/7vf/fl7d15xdVVo68JS66aOFfCuevn8xQ//5Af37t9574MPbl3snPnq+orcVe320dGjB8++/yffP9qe3Dm9dfv0fu+7q6ubu5uT26fb7fEwXNCr9+8JCp2W07tbZjPfddjVxfX1bseSm/bxqYaxvv3OW+998PVp2YMNJGWocJyfXTx7cv704vLhkzOuG6IwX3P/SgbpQe6Jtd6/rI7/A3oAcEYhggD3T7avnIx7t/sn46NnvEzLneNbRWrXFlc+CRhI4Ro6PIPHXkWoPC1muHKIwQmLkeJwVaMqzKTmvLbTQSSadve0yFnRBDY3EC296dWlu3FolEHuVKuIFC7S5qVrqNo5p2NK8F3V3JTLAWTn6B26teitXk5EtBLmKyeQnUqM4TmH8opNpeQhzqFcjrV14Y7SdAwrvIbsh/LA9eh40i0/3pp8OzLUO4qxGlHUCpr2+1iTdmIRThbLoa7kRJKzRfCaiSSFZRyhsEjJPGFmYZiThGlTHOpEwuuWTrbJwfuuriCgdexPlgLmJhLmYaADJ5DdZEpLgbQ4o/gGcHcvpcYy5rDZyCB1I/OkhSN1prWFIWQgb80MQX6c3DnZzbvr80sCzG0cjzZH23m3mx2xkjpuR+1qZiJ8fXUx7Xfz/hquYSkA8x671EQgRF4bmapIIRp6b3UY6zB0XcayNVPb79xovrnqheFUininviwgZ4dnbD0nsAIjuEHMrLC8pIMA66raSGjAEAC4sFCkhWgHSyD+NzdX2ruFqYS6FMqHByt6FTlCruh5IDOFmigeUUcuCiAk1ek/n+1gKo0FkjBBsKKrQJ+ZQTWMXLhwLdXgrTXtDfCuFpNMGaoDbJzh2uuBE5Eg7sZJdaCrgTz4ykR+KF/a1TKPwBDkiEMEKkJqJAQjg4vk2RkKJw9UgUAiq3cSRW5BvFymRkxu2eD3pT97/CXJ0FsnSvbLHcI1yEzv4cCRMtvwYYlprtZBF33ztdfef/fN7bGoNnadpzYMYxm2AAHzMk8AueDp02ciRT5/NM8zk5RtdfV/8+XTZ88vPv3JT77z7W+98sbr47g9f36uqkI0SNkcbXbT9dmjR1fzXo4GEz9//nxTpNnR9U0vvgmyPeiQeVqI69tff+87T55Bg0SfASsy3Fydo9vzp9ePHjx854MPNsN2nifDAbSNomMv/3WdB2h9o79yDBBBHOZwdb13+/hkUwbR8fZ4Z18jbvv2ydGj588RK/skXEYHQY2ouJlGwxvFPec/J6T7XvzDtcY9NddSBhnKNM2unQRMDCMzcyZaCyazMIu5hg6SmcO/HQwnNnWHFy6llHACSW52rcdSmMx83S3yAxqZH94oPrDpS8w/tQ2UPHC60kfVogQq3SNlBy+XIlNbmAeCu69RnnHqRjVnEo8BI7hjJs+mCy9/eMfanyXH5pl9iFIG7xaMHXMO6NbWiSdb7/XQi70Pd3cjJym11GIZ9wp3JwmDHqi1cK/KzKOYSdiREvp0d4/DzBGLzRzK7HiGEoCiPLRWujsqk+TWQwyKsHXp1cldFa1PI+qXD778h//4N2+Wpc9tc3wKtd46hTbJDcCwKd/8xvvPz8+/f3HpgfG5E3Nflt31NQjEqLXGIz7d7B7td6DQDYe5I4FcOD4kaddaubi7q0Go95mYpRY1Hep4dHza2gSQtsXgtiymbt0BCJU0Qg7AjUGM3nqaPvbOpagZLMhWcSeqQ60w72bq6450oFAiJRTArTef4uqqVDFVh66idSeEZUTkFbEnXYGM6aJYsowXJimbl6zSgab1VVWRr3zYVgfKnvfK2UhkHMc6jDCQT5Nqt4b/P1P/9XTblt2HYSPNtdbe+0vnO/nm0DlekMiNSAESCEKkSnJJKupBVrlcdvnNT37zs/8Hl8u0VUWXKYMiizQFwoQogEjdQHcjdcBt3HzPPflLO6015xxj+GHM9V3godHh3HPOt/dac47xi4RIxCxgCB4CcHHXCBRkovm1ar+RqbIwAKgpQgCjfj3mReVeaHDA3ZovF4EsiSBxmSYSxuiNwoDvOPJJ2psTtHrUBDbksTnmkdhdicjMduMefAQDSYLQMjYcrXoJMBMMIFHcYHEbaqkFCZCGRC+88uKrr74MAG5QS9nuNienN7sF1pzPP/r4408+WF9enRwdg1lK0okcnayYOxJ24ovLS9mieyHzlIZqalZr3jv4YrFkhfXl7uOPH+zzvjtYjD4yipKsVsd3Xn399IV7Tp+qUDhxKdOw6O/dvyMdlLoTlJrr6uCw5kf3b9+uxS7PLt/8DA6rxeV00SRTiDDTqZ/O9w20nY/8eR5GIIcWVc+EC+hOjxbHie7dPhx3+WBIYNZ3qZN2DCAkkdT3vXSpTMWj7K8dYBjnIiFCIwkNGpyn1LBBF+bVatn1Q87PtAK4AQkJafGwyQI2b1KDBwkjvdUiYi5OWndiQvc8jd6SLij2UUBk5tQlcDAz1BJQ06cicGjiHAKIjq5WMhUzTXucgzKDNtr+LaKrwd4ILYB+HtHiE45SjHgniHCeW9jcAwFiEgBXs4jNizc6hm4AiGN0tgQHrBQIGGJThXuEiNF80mMkyc+K3/gp5tkemp3Yrjup5qV/PtQDB3IgU42/8yyZBJgLjyKfMlZMml95bEAZtPBAb/PffCRd/5Jwjc8fTBOVIjBCLbv99snjR//+d3+XWfabUVhyzUk6NbNahcWx7taXH37wITBzSpFYUEu5Or8CV0m9aWYAV3PTlDozU9XoZmDisHoiBqqCjEyCblW6frGd9uxupoQ0jXt1o+UhJ2FejtOkdbJawcxslsbH5RZTQBQ1IiCRIyKwdKxe81Q5UfhJiZEpmZlW9DCOQ4uZQ4xzxyKl0WpFJBaew2MjlYxIBBvEBD6vnOhzKfOnxpT5RZ/pmpl+vZbluGtsBHPwfQgFXUPI7GosycGrqk0jhPKMiZ1rUUxhWAM1jYRC9GYL8qaSjpffzSqxBEgknYA3lClUEnExmqubtzuIud1PbhGuSUm6rmeRUmna7zwsx0RRZtte0bZlzkjsfKAZGBKZOqCTpxATYRRdgmNr6CYnjBfY48WzqPvAYXkgBF7z4dHq9q3b3CKTdVgkouWwGgBcp/zx+x/u6t7dhDl1i066frmQLoEjOIyb7eHRwfmTp7v1upY8TqWU/eby3DO8+PIbx4uTnpc9ybhXANhdbguWhHJ678XPfuZLTPTq6y+JSICqbk7IknpkevnNz4Bup8ur2i+HQU5Ojw8Wi9TJ8dHRNO26QQ5Ww9MzhAAWAH1OQveAGucjyufJFNtBG9MFuFcAB9PDRXfvuL9zmm4cSOmIPjIC61ISEiICBUBKqVsd3lBixILMYHHMuGM75T+FT4CQnBoujNC4oIAIgIkxuZvh9TXR7qXZRBtSNqRZ89OmlsAczMFVMcKHkeJtRARvdkpvJITC9WkU51XUujleS/rbYOTzGT8/UvE5UcjpYP7LtCsCEZA8ks6vt4tYwJv/HcysOerNoemnhBK7WmhUYh2PezIOS8cWZ3ndIA1tkIveDW+dMSGvbtrDdmNGtwTO13tYkOOjEyS1qjo3qFxfcnGoBS8dXtQGVs141LwlxksM1/Omg7uLRMevmiteixSCJ/70Uw928NOBNFoVtBZAEu5N4eLsnEiQutT13HV5Gr0qObipmW7yuHn3h4jM/UCU4mt0y6oG7hyOCXNCjjOEkSPMEBAI2SAE8kYi7mAOwiL7XUYkBDo8OnHi/XY/btfS9Zurc0WsOrXvP4ST7vPBD4DUHtdg1gEk9auj4ySy3lzVEg5TJwaW5A7RswzgXo2Eiag1zwRG64ZIFoIEa6/k/L34/Biiu8WPSUDXkb7zEQbz36w9MNcaMwBAc0QKIMBdTY0IQS2qI9HRUN1BmJHITMdRHZQIQQEZASklNPRaJtU8I5BCoZpQA3CtFlth1YoiksSrzs1SFIDPvFu6g0fORFzLR8dHTLLdjXU/Glrqu+XyYLU6NPerzZXmSCEPQkrdAYjcFALwJIrevzaNeVyVkfqZwI2IDWq8exSygyhiIJIkAWK6m6KRMAKKSCdQdA9Ujw4PUi/xu1Yz6XszRy1apqMbB33ms1przmaqqrVYrRM5AlotFVzHkh1sLPlqc4let5tMuDf3o+PFl7785c10td3tLrYbtWmdtxcXF0i8ff745snNe3fuMaUZPQYkFEqAQJLKhFeXV8cnjIdLs/3JreMPPvxgdTQwd2mxHBZLDPUQRPQp2t8ywcz/+ukg69AykQDMQREYARbgr906fOFGunvc12mdawoWT1KXJDEwgDDSYnnYd6vJETynTjRb8/Q6Ov4tGcx8MQN4jIERHmcAeRwjxQ8BQ93mZkRYzSGCILj9s9HP4LNUDIGsnUDobswclrLZ/2DM4tAICUDXqvE7h18LoU3cDcGgT7dih6aYCLg08mHbpxaO/fbIAUb3JMxvWQgaYL5KOIR/c4ROY0CIItOUQpkOzBz6mBj5BcibyyzcxG1QQwezllrf5veQFAFEGHU7Uq8/cYRZme+I5LMuQ1UhINhrIgjbAwaAs9AI562nDY0+q6oxksCIfb6IhUlEWAiRRh0j0kZD/OLAxNROIo+NHIndvRHbpkBEzkhJkgxdV3Jh5pKLgqupJAEnrxnRmYSJKxRHwmp9SgDgqqpWa43rq5ojM83TD3yqBAB1xUjsJ0IWV3dAJ5BaVDh10n/t63/XQL/3wx8a+M3bd/Nuu758rkXRlQJIMwNrRqWG4nEU1DO15CJYrA7u3Xvhgw/fr9MzZjKvgdlU1TGPXiuLEDcxQ3yc3rhPR3JGCbLU0RpqHxETzACOrq22fWYDYniLf+Nm8XT6TBo0DBEDl2MHAG2XSkgDrBUbhVe7/aUaXKqxXSMCkoUd0eKjgID7JZyCGCo9N+AQBRAnlsVixamDcZ/HMRBDdyCmeZ7D6BiuZqCwXB6wdLFATFoQbLla3bx17/TmzTyNBr5dr2vOVc0NumHBTGq1moIBMDXEdX7gHQGi5z0YAofw9wmjI1gtjaBqyiZGIrBqgAKE/ZD3uzrtQf3i7PGX3vjsW299+fBgCaoOwEkSd627jezm3TtPHz1EYDdTquZSS0YmQCbilFANTQlZHKCOo2rZjdNiVXPeL4/7n/ypr7/06ivTuH//o3e2++ebaY99On96fvXo4rg/0mLC18O7uwMDajV3cEU3uro4lz51y3552OecmeDW3Vvf//4PNutdYhl1mpn2+S1uZ/DMFM2HxHxAhweYHGyJ9OqNG2/cu/H5Fw9PVuA6ZcfdbsoAhweromquBGTowLjdX47VatE0SIWWuzXDI9fSj+iiCiM8uEWguyFSKeq1QizpDFajXYPJP11ZHa5fZnLXqNNo5C61E7nN4TT/dAjmCuCaS1xdHpg6UsgNrse4OCf9GhFrm3STGINbEANtZgmhwSyPnyWXCOac2CNzRAi8YVPtN2sk2DXNMv8fYFUN8iBSaYUZkVTr3A8YP1KQ4QGKxX4QwQYtY60dCNzoCCJqmI41gyciuBsHbh2GH6aQglxz0aHJQAhZoEdRUHtq2hTSNpvIBUAmIqrV4r0mpGqt2C7+dvErmwigfYkcp0wMXIAIwIxMIgDsQLWGiYKACJlPD1YkcnV5VlytFmI5PLqR+m673eZxGwewe2xQYU3iaE2O1I3An71BEoAAFY1bx6eig0hCUgEwdV8dHeayPzy5cXR0xIxDvxxk2G92++kqeM44Kx2MoHkf2hTVVujoFPdhsbh76+6Tp88v+byWwh0xUylF1RBQHdgBiGyO3wv+cR7jPyVg5lmDrmd8IiZgd4hZxgEUjIiiX6H9ZVp+OQVadI3MYHMQN4IrvlprdRbBi84MXaiYkURIVRGuk7zUIb44R2SP7T4CLXxOBA4QyqHrUupSKDeISEtuvwtgqFSjFcfdCcycqurl+XlDJ9yrWS7l2bNH690VAu43m3hLOXUxRwiLgZlZ9AtZsDztVG+XUowd6tESR0kYgcwUkMzCUwpuVmt112oVFNCxS70gmOf9encw9H/vV3/hZ3/6xwDqVCyRYA+gjqmDnJfLVcdps93rhx8hoqREJMRMiImTdKlUS9wxc98NKfVOjg7DMPTL1ZTHG6cHb335M1//oh8sho8+/uyzzZPnz873Bj/8/jt//OC7fZduHJ9Cy075W5CFhrNhWB2dPH36uNtsb969e3i4uP/CzS988bUf/uDWex984IaLIY3bfSQgehNmtHPC/lYXzIxvQDthG3ptNw8PXr61fOXm8vWXTiBvnp5vKix3YwGAxXLY7idoUOeKZXCCMu3Rk6mjAzJw0PoATVAfPXcehBUiYtSoMSESqUYHA6hpgPrQQmTaLhffEoRqAAABzXQGK3zeXbAVj2LLmMRYDDwyeh1bdOc8f9h1fHtbiWIA/xTSaO8jtNOfmoqOGJs2Mt5dBjAkIgupDCIgmMaNYmYgFIOXX5v5kckBraoLYLw4qrHio7fDvTl4ACJXLg6KWJmDdoT2qpFFZV1DbgKYjmgdcwRGvAbMmFonILahMoJ/ZrCK26AQGfjtI/0U9oniqfaaR20dEas5IhBz1VrLXAgbVxwRAqiCW4suNjdzT8yO6BEmghQnvUfgldmkYLUCgZkthuHo6Eatec+p+KimnDruUnSolVrRkVhMzc0lJRbpF52q7vf7SD30hu628cAdU+qEpdZaq4I7uIK5dAlMfbtZv/2DvxxWKzUQp8vnT6fdTmvhFk6I7nFqhGLQiSm6CJs2XY0pMZO7H54cHh0dPfzY8rRfplVkoHb90PXDfrtF86EfSh4DFoRGAgTNTkRsWs0acwPhaAfQWp15jlNAYvJqLIyhryAMXB3aqxNzDoB7e9vbA+zxZ7ibqwYyw0xm3opZjKopMTVHOUn8CkSseTJzIGFGVa21SmJOnRV3U4/sVoCAYbRazgWg5DyZOQIJzk7UFswNACAi8bBVraDV4nSThE55mqZpT1eEKOAgIoi02e66rvPAC2KpIWZi94h/8BnIbUxVC627RiQJ3ayqxiyKgFH8oGaqtU9LHSesdblcuMKTq+nLX/vSP/yN/+SF+7e2l2fD6ihP+fknT6/OL196+SVC4I72+4n6BGkQrKnvCTiylogjaMhrMHAESJyEuevJfdEvNleXBnB8vCSCjv30hixWx8cM68Kbe1fHHdy9dfrCvXuxk3tjGANAQHfFxAc3jgxsu1kf1zwcLA8PVj/zs1/ZnJ395j97dLnPr770Qn2v7ssUW/+M+3ugKt5A/zZXRElAvLJqugC+d3P1+v2TOzf65RL3Dt1ysX06XZxd9CjSy7jeZFdO3fLkpnMapwrESToDxSA23RpZCA2LC2N+SAzjxgmgPt5ON1C18KBDcyAhM6mGWxKakzGm3nn5jo/D1BA5/kSS5HNuIafWNFebhvn6KPNZhQ4zOhpXxtxI3M5bCCWQX8OWDkhoreHsOjluXs2RUr/oF0MZp2kazSp82v/oGOxHTKohZnWz3OTc6MFVsLuVUoipPb6xnDRtJYbmoZEh7VZ38KiEoiDKQ+MHbhHSh4RorFEoG3HCMfi1KTFGRsDZJQrNtwDzZQWzAL3xCVErcn1xMpMHEmvgiG4Wr+QcCR2/JSEAMXn1PnVdn8ytTGAAGKWvQqEab+oxQAAUYa11s7moVWuZOLGZuPm0W++jRZXFiiIgc+JEktJytTi5capuFxfnm6tLreamwEJELOLmBHh4cjwsh+1ud3VxiWpaqySSvpcy4fbq3GBar593/YFwl8cpT3tzlyShRwyWP/bKeY+IscUDchVhSWJWqvvLr7748MmD3ZkiuM1po710sIyySWMW96KqYASCSVJo5YkIQcxyKPbnLxsRUGsFAAR2RI4Uu9A7YrS7O3F7aJCiOA68acPaMBM5hcTsjtdklc76vOCP29VxPUsRmFUwCqqgWy4OVquz8/O824G7looQqq+5FCqsH2bjfoeIVhUxfCUAGJ0zHiz8nCNBRIha1CH1nVBXVbvU1VpMzdyJjBCrq2pNKUXaLZu5WpKOo8sFWjX533pY29SM7sDkZi0KooHg4GZMDDP1Gd14nBKAgvk47U6OFr/wcz9zvFw+ffTw5vExgHzy4OP/z2/+87NPHv3i3/u5oVtmzf1AB8uhWyzqNKGIqRIgCxHB0ImaupqqTtPE6MthQPcqjOjTuCnmNW9efuOVabveXp25smeH4j7RmPHw1unJ6fH1Auvukcze3ngHZjm+cVxKfvjxw6PlcHn27OMHDz7/xv23vviV3/r3vzOV/St3br3/9Hw3bREsuKG5U7J9APFJzYicszsDLolvrviF08Xp6bAafFxvibvVanj2/Qfn57uD1fFiOJymC6uYVgOm5ERaHKLLIiYLcCQMBPFaww7egs8c3WcqtkHWjo4gob+aIyuoxcBp218JPaJp//ZfHdFMqRXvepg/zIAJ46kwB0BGjLWnedfiCY8RuJ2hGOjX7LaZcZtmPw6ZI1J8eEQE6KrOLCRkVQ3MAZnh6Ojozr27Z2fnTx89RCXkORUBUMM0xQLuwQICgquZATHCp2gtuCkSuVsLZ7YWsAazxj6cRvEfmw8/0BkzwybJbwsNQvCOEQJiEC9BCPZb7Le7UxsrwdysfHoPzGdGEAVtY5jvy7CmADM3PzC00av5gmfuMW4d8FBvGTExCYARqaqCo6TkSESgajFQCyfiQOj84uJMq0IzZgkS5pxD9koOlBLMUhYH6IZBUhIHoUTEJB3M/6elIAsJEmFi6aRHgJTEENw1ihSUAdAQ1b1UVQfU+HRSSlo0CpwBgFjcNXaqCBgJQjkYoVrq5eXZ2dmzG8enN2/e3V1dmCq6oYKWvC+5W3St6YsJKiCSmWFl7FiEarVA5RHRw5UHjs4wcxoG5l6JJCb0qhqxfPGPEElzo2uE1wUMaUziEAlZ6O611jimkZGJZ0QbZlIo9rUgvkJoYQG/lFJOT2/funP7arufdltiCVAi/A8kHFCWVkUmU40niRCZWdXADYkYwcAI4pVCsxq0HRFQAALE1aq6YYzSQLUWIgJCboir1zw5GAETEXiUfkbMQLuG2jGH7dUgpr4fiLjWnM0jOjBISOJE6FqKGXapkx53m+fjbvOf/vov/fIv/eIf/t7vHp+s/vF/848R8Pzs/Hf+p9/54P0f/s27P7xxcvTug3d+8q2/+0u//Esv3HlhFKleajZhMlMXRiEWMreSSx4zE4qw5kroWut2Oz59fvHSvTtePQmsDg7Xl2sR2J9dPX3weDf6/Vdf6vtFHHY4X2RgQEQGEEXmIHx0fLS9uDx/en51sX7nB+88fvz45MbRS3deevejDx/ucye96zBZRnOANmRhwCzgTQHcahwsER92cnPRv3h78cJxf0AlIeYrXJ6cInYPn+/21V+4eVPNpkkRUzcsum5J3EMxoMDg3J3UCwIwMpIjkIKGIyVyBxEF50vHNQRgcRYjOkRC4XzQxBnWOl0j6P0a83ZzcydijuffjVO/OFjuNvs6ZRKyAH4CaEduWVc4q+IIZ14EARwZETD6NRvDjIQ06/RncwmRqNZYPKVLhFSRTEsES/T9YuhXjueq6uFn5gREOqfkN9awGXXBwZkYZ5bS3AgpisBC0ALgLcgt7qkA8GEOwSKg5kWC+SfFmf1ipvlCjbxFM4AagEEjqrEJyq9bmjyK2Rry3C7LBivNGVqhrY0fkJNgDKnxPzWSYpYGxX/tSME0RiqTe63VPHzX4NWNoGVXz8a5KIGfxjFMIWUamSX4Da8GjG6AEJc8qbuZ1Wly7HfrTclTLqVMGQCCDEYH8+qO6OYGm8urWnU/7qKpOxANMYNIopSUSi7I7q5ZqyGA+ZgrukmXAEitKRStWpd6B+gWvYiE3LRMewP0kT786D0rpdRdNbWq3PfSJS2l1uoQPFHTFcWOR0SmOmkNRDtkTAoV553YGgLfntQ4pNUqNYGWE1Foa1X/1n4PVK0QAKJdm9qZuelAEUOgAAAY3xOFKCKeNnIAFiKW9sepMSGR5/0kxEQ8jWM8UoBA0hgpVXMDV2MRAmyV0y0Og01V3YmAkZhFa9ZileJ/5v04IUBKfdWqqqFFQzRHUjVGcgctBQAhZKjkUIO7CtBydtHAbGmINwYaXoSAEN5sxGaGVjet3HXVKyKM+003LHPe3bt3+7/77/7XHz0++3/+0//h1//+ryKQl1qLLlYH+339n3/rPzhrx9tXbt8VpGG1dHdU4D48Cu5g1TTyxXLNpVRgUnAAJY9kQP3wR+93CG+8/lLqO1fKEzz65Mm77z/86PEHb7x+5/Nff6PvWOcR5npdi9uZ2EPcgkyXF5fPHj8xktXB0e5HHxTzz7zxxuUuf/jsgdIk1N0+ubndb8b9tviEgOCtvQSAGPlgsSx5rxWX/eJkmV66tbp/KqdLPuiNJt1OPtzon5+VJ883hOn2/dNMAzBxlwCTU5qqZa0srLUwMjCKsbu5a/C+CAjC4K7mRO1paVhUzC3QTsA4X9qVXcHQQwk9Hz0QIDkyujkEogKt0gcJlovVycnptH/kourqNaQQRCHXgXBlakt+tqbgC1VOMG1xglGjLtrGHMynz/hRfG7CwpSI0QBVKyVGplyms+fP91drQjRsFlyEiJJsBb8ErKA4exQQkYQDhIy72N2IxVXVtaXTm4Ubl4AAMGoTaFbnG/h1SkN8VN6wHTQ1SR0TFTXVAlpjWoraYg8///UrE4phb3U4caRAWwMMHK3VHCMgSkrCPKu9za6hufkftkgbhnmdIgR0Es4lY61Bd8dVV2p2ACcEAmZhZDV1g6Ef1NTUkwzM1EJoXGfvASLg3BlPiRkAtrudj+7q1OKhOEL9HLBlUrkq6HSZ0aEpYuLHUTUNFRpSNwzuaE5pcbgaupzrbnMp4ajuxMcyHB7WmoFosVoSQrWa84hMQ+oLMohwSohyfOPmfbD1xdXZ02epH5ar1dX5czcr0zQDg2ECJAY0s+oeICRiu4HjjCLEeZcCNetIupRMraj2wxIRaymm5ugRBUXC6LOIzVGQhYPl1laLBijcxc2EHgssoCMJwqwYMTVqxyUCADJZqabGhJeX57vd1rQSCwKlLlnVuegNPWqJwdwh+AxwNUA1XSxW0qXddq3jhCkZmI4ji0gi7hfHpzes1s1mPY3bMuWu71cHq5R6YETAPI61FNXqUM3MAbqUIojY57jjCNtwAJzDnqApL8hVwUWD7VUjZnT18AQgl5whkEtAQrl8/nSxPPjH/81/fXTQ/ff/l3/y/bf/+j/7L/+hA6DwV9/64v/u//C//c1/due7v//NZ5ePv/FTv/wTf+cbp8e3mUAYp2IIHjHkZaru47ibzNQiUFfEDRAsEfWLgRRuHh3Vbf743Q8c/Pzpk2dnF+ePzrYj/Z2f/uW792791E/+1LzDNBT601EQsMnpAIggkTx79PT87BIIj2/cOnvyDCq/fPeFq810Np6PNm629JmXX7KiHz96vJ6mCgUawEyroTs66OoEteaU5GDR3VwNt1fp3o3VjSX4NtMgRgc/eP9Hj862Bzdv3H/xhe+99/hyu6fUp+WSpKd+4aQ575MkQOSEmo2Z0bD1pKMTxasYOIxi4wRhNmsFUhSKkYYkzmx+CLkCvnc3RwJTA2gp1+gW4XFWwVwvry4DQiFHaB1wKfWp5lyqolsMzW3ODyw+CBKbi1wAgChwQrMKSBj9i+7d0M/idzdwFsE2xELqpOu6cbvZr6/GMaNDcHtmFuw3EjILMxtgAlQrJU/g4NTYEuQ2QoM1BWhKfezh6k5MCRlwJquhiThmNCwQzfk9IO6ZqykgdH1/eHRjv9/ttutr6rjVdGNbsNWbsgDA0ebYCWym5uBSZ64YiSngrxhhVbVoRURiBjfXJjtsam3AEDsypCjyjYQgVeuIrQUW0Bw1xCJJzaoqOiJQks7QtBQmQYjkg3j+I24EwN3AmLhLnalpLQDAiQjZIn45FhQDZCBmmGkdqI5ExAzs5lVqqYCcUpdSUqtqMKwOP/elL77x2qsfP3n2F9/+1tXz53kcidKNm7cRfDfBwcHR3bt3qtuzp0+26ytEpZRu3rntgPspa1F2XHYrkW65WCTiWpUaPs5MqKqtItochDAYaXOQmHLczSjkvp9S0CbEiJGu1Yh+6RLUxo816NCMKRmC1crMQOxo6B4gSXw5asHsglYNJg4BtCphVGmiCAeDqrWGdYAkEdZadbNeAwACMwCm1KVOxUy1TFMtJZZrJopdD0FDojMsFsOwqFZJ0mKJRMmsIkVgIt44Pf7a17/eJXn73fc++eCDra2TdJKEmFmIgCBpnSZsriEXkeaSm3HHODccI9gzntUotGESQmZwyCWDxidAhGSgqkrhC6/WDwkcpmkjHf7yz//Cz/38N/7lv/y3f/on315Id3p8HOln/dD/zM/99LivAj1Q/aVf/snPvflGv+jGfc6lLPoOlEPGXg2rqqmbuboRJydGIVfvhtT3nRY8PDk5e/5k//2rSasDvPzm62985Wt77W6+dP/uvVtHhydxXsYiE5MXgrsi0nwhIKLh0HdWcbPJV+vx8mr39HxdsjnB/Xt3po/LRX2+n7ZP15cv3b7/peXx1fPL55vnOU/bOmYYUWm3q8kBzLyaTmq5Oz24cefm/eVK1rypjj985/G3/+J9B3vjpZeJurOLS0RcHCwWQ5fV0WJEIUOwWsyAiRNTtVq1zElWDREw8HiMwbyBK962Yb/GjXHO/1FtYnlr4RJETJEhA4bYTsYgc4lpt9mEsYabe1wRqe8GF6g7VbMk0hhp5BCQErUEHHPHgOPNQ39BcUAikXAT/5kRkmpVNU5dVSVAgwZvmhoCTFPWWmLNBAcgVq+ziAbU6jAs+66fpklLRYJg9ZhJpAMHAlCo5j4sV0lkP46mlbQSIovEs8tMCBQbebh9g6hQN2zpH16mySKYEsC1AnhwM/E1SBJTY2acfVhIcyFJg3kCm7gWCkBj3K3lXcaQamZxghORCDWtz6e2I2jCPGJ3jAGbWcyt6xgQQjliceOax82ESIRsVptaP7Yxcg+FezwyEHZbnLcoUm27h3BHBKbtFwdnjiyAGDuNm4EjdQwIGAwuuCAzeufC3CU0LGM5PDr5O299/Uuff/OdDz75+L0Ptpu15po4Bc6jXiXxwcHBdprMlUXG7Sid991BJdyff0wGb7/9gwxaaxkOloll2o+1KCHFOEPEDobXWdkIgI1H88Cr4qGMkx0JAFgShwlcTWshQDCb9hPEGRYmQyQwU60Qwk6vraA4AmMj8dQUIHL75uj++EQx3DAR8jenVofGBsybwhlqroSIiViYWJxo6IY8TaUU1RrCNCc0d/NwqHM0kanXXDMiyGJBSGWyvJ+iwhTRDo+OPvPGa6PDs8dP9tt1mfbTZEQchgkHLCUjI0uSblBVLZMDOFCzMs65Me6z7MkdmwENRaTWQk6GSOSMDARoxCxqgOjCgk4kamg//vW3/vf/m//27ffe/Vf/9re264uXPv/Z45ungTGZQ79IP/7jX03dMqF/+Stvrlb0+MGj3bQTpo7EkNQqmGmtxeqUx1LLvk7EPKRUy5TX69Mbt0H4+frJg08eZd1zOl0dnLz25S9+6Wtf5NTl6subRwwC4K7tm3CD66ii2f5aYl0XahKRKwABAABJREFUkRu3b7z+5uvnzzYPNvniYn213hjJWMtksDq5vX62R9DnZ+f7/XhjsXzlxp03X7g3TZvt/uqTi8spj1Vtv98i0BYMNvDCUT8qPN9MmwxnZ/njx0/+7M8/fHB28eorb375i1989/x8v9tSkuVyBYZqnhbA5BIxkIBWtWO0amYInIjIqoZ1kYGcHUDAIn48+Hm8zpqNBLgWkBlAR5Pru7dRfWaOHR1QpCVWmpv0HZhrVQjrKQMyoUGthSl1fSfmSVKtpZSitQZcTswiybSYAcSIhBpxAOZRegURRZkkubm6dd3Q3hItVcGtBjJV8mREXq1ZINpkHp5zc6sFHAA01VIx+C13IGHiLoR8FsgJIbivDlbL5QFeXe42GxYLAUjcTcQcAXYcJN9cpzErfWcRp5MbjLtdyTk8PabK2EnXkbBWbUXZGu7IRoPHyT7LjK41A0GdQwslddBSW8Q2uGvYs6FpktzmvQRJJC4Q+9szGZI3upFQcFaDhBrAmJGx+UgcHYUAjYhbyZM33mLu9QjFCgTB6QhOkc6EmhXQkCmCEiKhyM1CB+iAwgI2nw8ppTw5q+WcHZ1YVPWvvvf9jz5+cLneVC2r1bH1yiLTNG42F5K4WH787HGtOk37JIwHh0i42ay341a17PPuw48/TH2HgA5WcglBfVvktZFb7g7c1F0EjhTimLlvKwyL4KaKAMRSq4Kgm4bVG4kFyRG0thCruIIRAcwIoLpJC4KyiO2iJB7RNw0hbxyOeWA+oSkIwsaQiEUCcjE1dOMkhBxPjKlVzV2HJU+BCMVujihxtUhKwlLUOKG5j2POeS9d0lpzVfcKCA5m4JfnT7///T8nxP1mB+7MMk1bFDS1Uu1TA3pxT9QNg2cwjQzq9ijEZAc+yx2xeVpa9rw1RZAIA3owKrOSTpmTpF7HXa35pXt3/4t/9I+msv+X/+Jf/81f//WNOzdffO2N23demCXFSIi37p783De+WkpZDF3O2Rxyzt3ykBOxISkUU7VactZqZcrb9WbKGdEXqb8a89X5xXYc/8MffXO3sS999Uuvf/a1O3fvfeatL1FaADjpzJcgxGwIGJ7McFG3kqOQNlupxpg6uXl6CHWseTeNOwdDRvDEna58+dLtN0vZrnfnOefHu10p+8/cf+UzL7149+Tz66vd08dnU87PL59vtvvL9YUwPH68+f3tjxK5mpVxnxbCw/Kn3vrxn/uV/6h69//7zvfX233fd1OuAGrkWkusVGDGCJgo1GvE8Norrx6fHv/19/867/aIEBR2REfHoOOuMNtf4/SYBT9N0myqnATJoTpyxM5cy9UBQ+cDHtWG8eGEqEi1NjiayDNEzq5qiYWxHwYihhl6MiTE1p4T3K+pBlVeDYgAEVWtakEiRnZwrVrN0FyEHLANs5+KbdsWOhfLxLvl5r7fbTOT26zSQSLCrl+M485q5pTcPYkQYh2z5uJWARyIrNZYAcOPigTuFPl6/qngId5mDr7c1WrJWkpgS6rG0kysxBwCaDCAv/XAzQ4AMDMknLlCpDnSI85ddfVZ0ooEMd7Fb9dwWAfk4FVmgSmgmoXss2nzgx2pFYgh5NkkWjXmUG8hwRRmBHBCIVONhkQiboYkIBJyp1oyE6V+QHSHDBw9u0jMrmqtMoRmwIBMDTTuOBUS5gLugfqxmT1/9vj8/EnqWR0E+8Ojw/t3X6rgH334zjRuzMv28mJzcQYEtVrXybJfIfF2f7Xb7YfFsDo8FuRS87TfI3hRM9MgdJv11h2woWuA1ALl4i2JT5bJ4pEyZ+YQC4EDU/LEdSrujsJJ+urVgyMmQKcWA0dYtCyWB6uDg+1mM2037QtAtTYl02zbQARCBgcLDn7OtUUmMTMArzkTEXLzfMU0oA5Vq2oDmhAp9QOogTsxm+rq4GhYLrab7X63IULVEoXUbm5erVrkW6HhbrP94N2/2W03Oft2faUl94ueWEyVVeP+QyJHFWJJKZesHokCTd82K/21nfQQdSNsqqYWbeKAwIIEGN2QVQulJGlAVwAz1L6jv/8rv/jZz7z+3/8//q/f+fY3Pdv9e7dPDo/BhGLfBMg5d6k7Pl3sNtuS9/vNJaBVVQt4DcxNgzdDRBbUkqdpc3y4vHl0PCxXlvWP//KP33/v/Vzl5/7er33hC1+4ce/03isvUBrcTR3UQEtN7EVL33WAYmBzaeas0IrL20JUYeCwXPS3bhyLKtbC4NXVrfSCaAbedX3fL4Zq425zeXG5+d74NqBvxttH3cHduy8P3YIwj7t1QqQEaOPl/iqJHx2sUupevHeaDk66o5t75N/6d9/6+MHDKWcCLjZ10pO4aUYH9dLeRkJz0JIx0fHRyVtf+8q777y32647IELSaoAwJ7A1Sy0ARgwnIGBkRTZXPDJxNwwIOE0TAQCTluJzVA6Ed8w9Hl0CdGLmFNNjLrpYLYkol8xGrqVacaA0dIIJEUopIbPxoqE9a0EpoQ9rnjUKB5WpIQ/L4wMw2m0uS8mSWEiIUdUQPvXktjBaaIecWeWQUQBQKLk9TGJOzO1WMyMkC4Tb3NC26yt3n6bJ3UyVAOLiBwQ1ZWRm0VrNjEVmEQR6lPTG0N6skfMhHT+pm5rGuhEpaTD7Tt0NMM6blvJGFFE0wVQihrA8FrVSqVlhm7Qp/gXn1D9EakEdTW6LLExh0jVjTqEAAwAkVtU0dAJULcqZAUxJEjCBEyI7eDWf0xDivjEnNLch9Sc3bhSztBuZ6d69+0R4eXm5vjob97uW6Eohh0ckDMAgmG+H1kMiLExDcnSHCg5IXKYxZzPr3IF7YYTVamHOB4cH2/VlGVW11FIjXcOQgMHNTJ2ZRbrlsAKEfLnTktHdzFkEmFUVCUqpyOgGxAyIqsWcWETdVGtA8A6greuEggOMJuzj05uEcHZ2XqYpLImE4UkBBDRTEjZVR5eOD1ar2zdvnxE/z1PNY0pDfLiuVkCTCAnHhuFONAcLETNFh7eIo5dSIm7nmmaK1Ac3k1Ya06Q/xAEWuZkTU9d3eN2NZ0aIEnQ+euQBEHOsNVZ9GqennzwEZC05zmvExiHFAotuyCi9rBYrrZr3E6JzkhbC7aBmzDGkAM0kcDyg0VtGKAhkYEAIZsTs6iiupRQAg/qFz37hH/z6r/35X3z3j771J7ur9eHh8bguXb88Ojrw6I0lXA4dc1LzyOFerhbjfne0OhhY+kRqdVJnd0lScq1Vt9NE7quTo8VyyKrvvvejP/ven7/66uvf+IW//8YXv1iyKQ8FCabSEB5JoXBiEsBwYs+yDHVvoklgRgQmlOlqp27kdHhwOAgzuZWMzInJFdyy1YmlP1yuvPZc/bLsd7n81YfvvfvwUSfpaDi80R8tej5Icnp6enS4unF482b3akecuiUwHd48eHJ2sf7k4TsfPfzg0UdIfOP0JnT9WBCAwHXa7ICQU4jQuJYW+ZSQPvnog6PDAytKzIwcX1Ogz/ap7MfBNYbN9t/FGhchWcyErtUisNjBW3x9JOBa+2QiDSLkXmkxgFmpeSGLL3/567vd/kc/+n6tBawioVWzqi5Ui6pV91BLNzDDTGdpDQACENWsTOgI5n5488av/cf/0eNn53/0B79X9xvGxIimNmcUNUA9Ql+QglU2FkFiALdaiRibSuD6jjB3rjVby/5BTmxq434X/tnWDmB6zVfHKyQsDkbB2TbMKwL7MfpnCKDFRwAiEkCTHkZLkqlqlD4SzWc0QOsCoeYqgxi9Y+RoVQAh4GWWWdY6sxAz9IPtCmqsPSDWWkQ6FlZTc2MSdTcN9hGIkCXdunu3k/7Z2fO633vNU9GOpSWSskRuo7mlJMxSa815DwDIkvreHG7euAmnaF4PDg60GMMVEQnRzEgQBXAS4SJhiLPwVxAzCGIalnc228feVDEqfd8hI0Epala3u+277/51NxzksbAw9L3mjC0UicCs5J07A+FydXB8coLg++0ujwU8tE3uiOoKAKEfCP9NuE/C69d1HTjaaDOzGSdMS/tHAFUl4YOjw+Ww3O7HkrOqqe7iyEidmGm8Ou6R50X7/ebxMy/TBERI4jq7PMDnjc6sfcFmDuQR0UpozZZCUeWHqlXbCuUO3kAJwmgkm2NUrAIgUmSa++bqklhUKyCbW8cpglwwlHNEQKgW1EJChbFmTsyEZqyluIWJv6GH7SQ3V1ckQmIAjdxrd3eEjhkJ3K2UiiwtepSQHN0cgYM+iRWakYiSm8ZFNG2v3njz9f/Vf/5flGnz2//Tv33y6NHBcimpf/rgEbEcHx3PZxOaoYECeho61+KJU0p96oTiBmVCzObM1Pf9fjvl9ZqMDg4P+uXynbfffvejj3/xG7/0d77xi6+8+Qb1i/0+37h7E5lNPU9ZkrAIghFz6BFNnRirmpYa3UE1a2JwwDLVadqvz65WQ//s/PJisxm1GmJ3sCqKBNoJkfdUMoDbNKkjAPf9gWt+dnUluHc34sc90+nyMHFaPF4eHx2KeJ8IvCo4Gp2c3jg4OpxqffrkMhe8cXqzPzoaJ1WbCqBut0iOLsiYmA2Q0AkJRfb7fS3Td769mdQTdeqEEMM0RKZAqB7wWnsGM5GPQMAWvL7auB/NHFxZOq21IdWGyORYm/IRHRlUjVTztHcHJEbmzX673e8cAMAQGFUR0HLJ1UKvjABA7try1c0UMHQaQfy6dMIkgAiuQz+88eabN26tv/nNPwRicCy5ILcA/WuljCOKhGunybxNa+RPI7gweYTrtyDIIPbVzSXqqSI4Wt3mA7pBLwBmisQAyCxmSshELfemDUuRjh0lsOAEAgRgAWwgeOT6N3IxJdGqzeIcqXLgkVoxI3I+27PBPbrGmkUCcdamNRktYVg+HOI6cXNkFBQF6FCQIhzOICKQsSWLOboBDEP/5pufYe62u3E97pE49UP4Tg1JpCeCUqZSct8NQOCACVz61A8L5lTrOO63i8VBmfKz8fF+u9lud1ULsyTkKU9hAwKSKCnxtow11hDcxNzH6dxMa6lGSKDUJ3UVTICWx9HRt5srrQ/NTAQh/vJEDWDSmKsBKa2ODlbLw1rzOO1KmZJI1w1l2seOpK4U/1RQLbNUWrp+tTwspeaSTQ3NU99jU9SDuyNHh4RdnZ/boXk1IiIhrUYINptnIkOFBRCxlprrtN3tIFJSiZhJazF1JCbAKGsiQogN1yFafxCgWmUWYkJs8eXu2sQ2odhzxdlPgABqlSQRkZtrVcFERNM0IeRY2LlLNgP1c88XRpwKMnbSEQDUipEJAc3yHnejOWLi0BhX13G/N1UR0mpea9TRxasAAEAiQk193Go8PqW2gnkMTTGYhRy41t3qYPjVX/i5L33htX/2//6nf/5Xf+la1XxzcenGfZd6DrYEAzzVqpIEk1nicZvdakDMQI4GkmTc7SNPq4x5c7mdxnqwPLlajz967723fuJnf/6Xf+Ho1s2UBpTeXHQ07kWnKtIzU60KBARGzoSklfYVx9EuzzcnJ0eHiw5s2u/z5dXle+8+uLy6ODhcHg/9tN386P0Pn11stmNOiyWo+TQWUwJcdJ0hkZCZrxYCfAzk6+362eXZ5fpq0jqpb2sFQHLETwDBJYHWmg2WQC/de/0LX/5SNyy7Azyh5cocKR0Mqet26nS53uw1T1q8OgE4EwAEbiwcznZMyJNNTe0HTkgRLI+zXL0RYuRtKJtTjZk4pLqBKZvW+EIxlkJXBwgpQ8iemYkkgbupolHW8f133nYArSVF+BWYsACAaeBLLcwZG3PaPAfeSgYoRNgGkEQAcbtZ/7t/97vFzWphYY6CvFgl3ZkofLbYerNiDicnVnMwdaYIv4oH2x1m+zGoGjGFqrLh7cQi6NHCRR4NOQDNQle1Bggetx8KxsaCDXCP95TNYv4Jtg+DmdPqKIQIZk0LG57Nxsq2ScuZ2QF4rrAMtX8E4TTbQKN6r4mH2aQSgdZIjaN1YGZwqKDDYukAWqvmDMwsEs0ow9CP2zHXXS1T+KNTlyiWEq3U4WIxTOMezFI3aJnMTEROTm+e3jg9v7p8/uiTPI5dfzWNOxQu+6nkykLqrqAQt1OjjAEQQswC5ISM1ZFJUKDEQdkLmSFwaGVzjgIE0GkCQLca6njNGskuEExM0UijW6yGxXIAVdMKIbYFrKWCk1l1i1AdqkWRgJgYxF2B5ODkxu3bd9br7T6PrqNICn4sPvmI5iAWc726ONtcXZkjE6NDl3pAL6YBWsZ2E3w6IDBKlA4jEIu4m6QOyI5ObyTpd7vNfnMVyHVi8Yb/z8oT8Ko1dEBxejIyJQb1UhWRWKRkdVWAtqBZifjWhOBRIWDFWGKZ9FIrUwRdV3AI+NKaykWNyAFKrUgkKblaM+yoR6BcqepmoLZZXxEnYgFHs4rQUqrCrW5mZpWZXY2EgQg8IOZQNVDViP5GJnQFqFW9fvWLb/3DX/+1t9/+3u/90R/sri6HtHR3RE6pE8dE8xvW5k8A93G/H7e73XZbrJaSnSCoGgA0BzO7vNpcnF8+OTt79uz8S0nW0/Tyy2/+7M/91J07dy52exBYLhJV/9YffuuTJ89LsR/7ibfu3b8riRYHAwMi4uXevvmtj99576x6fXz17he/8PrXvvzmnTS40998fPH7f/LDJ4/ev3t6fNwPhwf9oydnTy8ugbtSlJgFBRKyuAnG+RIiORQq7iktOC367uD88nnOkzt2iw4May2uGlZpACjAyEdaF2WsbJS6BKUalIPhkMh2peacvKKObsUkiaMAY62FiD2JmyEmB+hkcCKrikwppf24C+0ZYQugDNlMU/g0rUesCcacAq81s4ZSQpMhNrEaEYAhOLGwsEeolSshWVUPIGT+c5qZgmbhG7NfZ+sDxCkcf3rAmOCOZsUypa6U6Qff/zNEKqW0X4acUkqd5HFqcpx4OsDdPC2WN+/ddfdnTx7u11NHDDgXojapGpgBssfaoRpBL04+Z/TEqQ4Yioy2frt7rQrRfhzykXYaW/s3bdAOlxwTArRZLRAvRDLVEKSbQsTFRBIRsahZL4k71qqmaq6mSswUTrVg7+eEQphxu5CVWBMWorvOKIKLJPWapH/19deXi4OPHnx49vgRglk1EiHEcbt9//0f5Vzyfh+izFD2sKRcdoQBjKswOyggmNa+G26d3rx79856sy7TCGo1Z9WKwmjQxMJxGc8fJQTiHyA/xMXHSsWsSs1FVYlImDUUlG19MwTgPmlRB0/dAMG/R+qGWRzQSPM3gT7mcRx3uUzM1KekVdUMyZEgpWFYDGPOaju3isgsXNRT1y0Xw62bt1j6i7OnPk7zYhVETnviAVEoEVOQQpH0YFaRowV9jna1+ZYDZGYEMTIEaHuo8MHh8pWXX132q4ePHzypedrtiJk5makZVDWRCFPBqopqpAoQWWwIgMAgsfcCkDA4yLAcum4sJU8jFQ1pNwAwEAoSQEx/XeokpZynAIIiNW9GGAFdHSKiFqxqvIUBLoFHcw4gCyKp15j2zRRC7OcAzKmTqmaWXUMrx96cMzC3g3EQWqbGhl0aKub9/urkxsGv/NIvUoI/+ONvffjuh27IqXeA1Enq+j4JEtn1QuEA5gqad2Pe782N3BOTCAe0WoqawbAYCDZPnj45O3v2+puvv/r6Z19+7cU7N+/cvfPi8yfPzi4vX/rca3nKF2fn3/7ut7/1ze8SDPv9/jf+0d/vF0e1VDf6+MHVH3zr7f/xX/zR02drIniye/fVL77+y5c/+7UXXn7p9p0n6/WPPnn0vW/+2emqf+HWKYuO26vdvkjfeSno1guRuRsqYgZVdWfMrmUcpzyBpAjdY04iVg1y0XYwEYFjU/JQZwGZ1FzKlphEZNzXvZ8zCntlqF1CkaUBd2k5GSioQ0XAomqqtRolWa4Oasnr6WqQZQDgcwMBWjNnYfOvznBHO66xwaHQcjGv0QkIoQtxyKHDBtjE6QE1CQswuZszgmmtdU4S+lSoHohGxFrHb24AqoqEFBnjhOYaA1niHh20FDHAlBq2LKTgwGS1pJQYyB2rZgdfHix/7Ctfq+Df/k4pux0iuns1JWTwFo4dPyxJazKISb3dfy3k02ceFiMqwcwl7jnzhsRc35zzz9fA7vZjBjJEYO0rRoNqlQCNUM3AVVI34xEuIsxMyNLLNE1WFeKDdWcSn3/LAKUgkpaa7hVbjJg1jw4hmEEt2cFTx4TsYKDa/OEAZsGWlcvzCzcjB05CwkhUq2qekqRaci45WKL9diPCKTES7rebi/M07UfhxChJJJsjCjIgmVYNh3cos8wtfG3ocaerUFdrcXd0kOViMaFaqVqK9L3VGlU7Xj32RCSoRblFHwf25Y6O7oQETMTJ1GvJm8tSa3EEdmAWRA+BgQMcrg5efOXli4vzp48f13FEx9mUHcogUFMzA5FqFWtAF0xRietIRGqmmonEXAP0KJoT9FFTcy0Djpt6ViIDIJjFiqpaKyLnMplaKS0xAwyc3IEcQWSuqnCft2/2SBj3wEwIk0DMOH3v5ic3bp6e3txst8+fPdqvzc2pxZY7EQOYUzSTAAsJRpm4I7HV6u1Ujc/VJSWM3tMwB3FoKiK0qwZymlIPpmru5kQkXZfLdHh84+btW1eXl+dnz9Rj1VU35DiXwzEcGjZi8GAlwdVyHn/qJ375a1/78u//h9/75rf+cLdeL5ZDNc1jBhbm/mC5ZJ5PDjN3D4GWsBAgVCPArh+QQGsmDw6Fy6i52OOzy8PT05//tV/72pe//MLL97u0WJ+fPXz45OTu8eb8Yrfb/eid97/353/227/9/yUcXnrl3rj95dPbN93r9nL3b/7V7/6/fvNf/9Wffwcdb9y+W9L07T/4KO+ffu/W3b/71k/cv3NS3B4+fLJBHC/O+w4IQLhzr6GtBwRm9nZlk4E64Zjzdr/JmnPR/bTZjDnnLUAiTl6KQwUwA55nT0gyVC1nF487YSRfLoZqpe94zJnEiGwYZNUN02RjHqHuyvYSiZk6JGVJldlc0ZmZp2ySusbWaoASDSIPqR8CtpgzaoLXOGpiMosBiwBaI565pBRHeRB67u4MzbACiIQiUsyGYUXk436rqhQ5M20ljgxnNNNqHqBLI7CwUzcmBoJaMwnXmiUNXT8shn7a7fZa3NDcDk8OUzdst+syqqli18UbiEaMICz7aayhUGcJiJKYiaTFd8WAwhLqypDacMsCAgSOBGWY44xnwZurxVLPyC185dOPjMINBIjNFhpctHn85kKMap667vDo0MzXV+dW3CH69yQuWLWKhtVcVZHEa0FExjCL6ey59/n/BztwPTZj5NtFGBExRAR3zuN777wNaKWoV2f+1N1CJKbVHaOQdQ6cx1JySkkRtZaWRRG5ckJ53D95+ODq8mK3H0P/5eExrgHSRIJyJMCCO3FIC8g9mBWU+Lt5dmSSTrpCY420VXUkihYDgJg13REj+0ndkDk2sYblYfsJkcME5LUUZqaUiBA5QfjMwbrUHQ4rO7TLi8txsyZKnXBiBsZc9o8efbLZbGPCRCRmjis+csJDqYXtRi1RqwLgTCSMxSP/tWXyYeP9Z3VYbKYpsZIaTDV/+OH7833Qan49mhzcAYKJckRiSkxgYbo0o8iYQPNaAdHVuOskkQh3klbLg93iYNzs3N1UQ3QGrsTghg6aIo/ceUJy14AcXQ2AIBoAHaMMhJoVKPIl3Juj0B3czJi4WJMJSpdUizAeLBefe/0zT86e5Wnc5ilkZ8hCyODmaBZNZwjgME2jMwJSzpt7d27/g1/5ld3+6rd++3cefPiQKQHQlKd+sRh3BdD7fihTBQc3IJqHUaLUkVeLpL8IhgEjbzgq7rbj+dnldrN94/Nf+PznP//65z8HCfM2P3t61h0dPH1y+Z1v/vZHDz8SXpw9vyqb/RquPv7wPfDMCFnt8ePnf/xHf/SHv/9vAK4S9YttvXX37jsf//BP/v17f0790w+f/MZv/Ocn3Q0ozoNktbov7Hhw2JVJ0RSEJICRBjTMrWks/cFR3u4ciu1zEgIl5B6YCGqp2a0SRsqNCNLRwdGwWCISAh+ulkRgWhCxI5vKRETLjhVttN3l2WOrdSzZHLqDE6xd6g+l68ZaHfnq6jLSwlXVLLIwQ1dlSM0o7PMhgoF1t/G8aaMxJv+mSTEEtKokLCmpqaqqukG1eg0nefUKAH3fEWPNebQRGQEieAUo1G7AgNChhA0HzFA4j9nBABgAieLcA0xYaykFXatVU7cupaFfdF2/3a1VKxHmnJnF3Tglctrtdz/4wfclpTLtiIiFao5s+VlJDegUiE0gPaHYDHIyIiIQohuwOXADdGlRptgANCeM1vAYUsKTMSPzBPPcUpmFiAGVAZYnJ1/8whdKsR+984PzJ4/dIUXKOqC5a61FKzE7OAEjhi6dHB00lEsw2zJiJbYZ/cJ2BSJGvy00gSyYlWK1DZEYSkO4pu9AwpPtADOtEmSPg1WNJCU3bxXKpZqqm+ZSmxPEPefJfEbtYnoIMA5CCHQNqqFHIwKCVWcWZpM3P/uF7//wr4sVy65BbwZDahYIA87LGGKU7rTQM7dQwGMb82uAEikUD5E9HOFFjJ16eXb+bJomB0UiSaEFg1rybrMZtzs111IQkEWCBTM1jerakFh7y0bBpnBCinzHoPJnd8y8PzeYzsyIxczCb1am0mQXBkyUuCWbWxRpGlBbS5zDp+vRJ+gWBmNtt5GrozABX16elTwRyjSNSBwndnhzQhQa+4tWLaXEIUrMbsbMsRlYUNJRDxkRYIbmjZOIa1ikC7d9VUtdzyxVc5mmlJKZlpI326vNZo3YyrPj8TWrgRU31EDStD3v+gUDVsvF6y/+ws9/9Utv/uY//+c/+Ovvg+XVckk9uwFyBz51Hee8l4ZJuqkzNwef1przlEsRcBp6ESnjWIvWUteb3X63f/b8WR7t1Tc+89pnPguJwXU3TSbC0j9598M/+9PvvvPRez/+1k+89dUvnxwuvvudt09P7g+LJQt4LhfPnzx/+hHAVYLaEXq9fPDhJzbWvNZNLd+pv4NjvnHr/t2bdzcXz2Nm15p3uz1BYXdXixhlADAjA3WkopVZeiI86bXo6fFpLbVkBSAkd9WiJddM2IkMIjL0crAY+i714d4hBFAHaAWTbljN0MZptz4/uzx/XKsCIZAoIHG/un16dHT34cWjnKeuS+5O0WjkhAwtZL75+AK7aJNOvF44Hyvxfrd3uHGPGJ2DiRK4BdgtLNQ07e21cnNH3++3RBgVFw1IDd1FnLTgTAIMbs4sjm5AlAwNqhuCcycofDysiOjq6rLsd+hqTaHN7przZOqU4qJAtZgVzA3KND5/PgklICQSAJfUR6FLaGrCu2mBZQmhIgQQFP8jUYoiuZzBgWnutPCZgGgxh43Jjo+PkAgjMzisWNjMbhop4pWAqubDw9XnPvuFzXb78cP3z3AuoQRnFtOm7HCPqgGL1rxI3J01Qg0GhxYcELnXTjNP5u6tfaAl+lFL7Y5bj9kxZLtBJziGVRUa1oHzOR7qI7cIsZcmN20JEsgeV3SDZII1Ct47HtgWCAEAgGbuAMzUTK+IiOy1AqF8/PAjIWVhcNNqZBQZQtgUmD7TCO7Y2u6BGBHRWst8omTgLD146MFMayHmSDRk6brFcjfupoejmpaa++VA3tjCvh/G3Y6YzVxYENFUmUNWAsgY6cpRtgDgLQcrPkx0D4DjelEIMV2bMMAdJHWNBGt+E1YtxFGe7NC+vMhGBSRUN69GiWN2aKt4Wy3ITYk4AjAiFmva7bVUFrGqXZciEMIB3EDn0EMhQcQpZ2ie/9BaeGRLUYun/TTQ31rsB6q5uaauOzw6yfvdVCYEODg45JQury5YjJgNdL/fvv2jH9Zapt1WmImYOWkpxTQUGoxpGichQuoJGdg2m7P79+/9g//4P7m4PP/mn357c3E59F2Zauo7RyXQYbnYbXfjfuq6FINViGajwMhqLSVrVRJEFjBAwHGcxjGPOT9+9OTBgweLRffSS6/0Qx8/FPeSq++36ylX7Rdf/OqP/cZ/9Y9Q5OP3H7z2lY/v3b/TH64coI5lsiwpJzAGB7BxuiplVHOhBJyePH7nT7+pX/36Tx8fL8e8ZiEoWBXHUlJCRWcIxS8QkaIjI1TnCCQD6iRVyl3HQmkqWUsE0Ht1q7UCynJYDv0gDH3qkJBMt9stGBIjCVfLQApqx4dHB8vDp1frxw8fjnUbb0xHy6ob9Irgm82FRc9JwBeOrtYIOnVEb0HUHtKShmg7NOPSNczQ9OLMptHtHaJ2brieOzZ9Y9OEgru5FTMDz1OOiGUDgNluFkkSVQ0p3K6OUdfijiwHB8dWYb/faKnmsJB06/bdlISYLp8/BXNQ565DpvV644imNUkHCK5OSEwEiAZeSx4Wi9Qls4pJxv2eiTHSHshaQUWIfoAYCZjUq5sBgpkJd6nrS60tlSXajYgBDUMLiQwO7ooNs2ue3fZ+6ezhjYPLHRDcUMGQoOTp4ScPrra7vJuEBA3MlFjiM4x4H2KOknAkCVI9sFlTh5ZGhfOlAzM7H9X0HuRdkK1MjEyqju4RiAANqzZ38FrdrHVMfkowxKXSTidCjCB0aBoVkCTogTJZVSUGQnZq68hsBcKQRQUnGp8AOLEIM7ubFXUDM5DLR09c2LICE0nES4UkNrS3c8RdA9raOUyRngwzX+TQmura8sVhs2NJgFhL6VMfEkZ0QGFH01xZkpl20hWtAkRAjjZrIiIMmJJQO9QD4ok+r2vFxPzYY3MQUJuW3D1KLxHcVE0pomUBiImYHQ3UHaLU2twMGN2RiKlj5gRaW/06xNNjpkASPeOCwuSutSCxA7oCc5dLJkosZOa1lPgORQQA1My0YjSpWfOBhtMkeuGjlTAGgQAskMi1IrBwGscdAcWHTEL9ohvKsCs559x1KY95v9sTsVskZQATKaLWKqlLSQxRAISSDIKmeRx3m6tf/a/+yzc/+8o/+6f/5Pvf+ysB7vuOIOX9RH0HDqZYJ7hxejdJuibUonrMaqm5lFoiiAsdSrGr7Q6IxpzHqTx5dvbg4ftf/9pPv/jii8joatvd9vL8ymuyCheb/JPf+Madu3dee+NNWQxvfP7Nb/w9Wy6Xh4crAEg83Lx147XXXztaHl/unrNxnvJUM6dOmFLizXZ0LCA5IXdi1SZyr6A5uzMLkaOyOSCBGomYuZMTCUT/RgSlGxKBoAMpEwFSAqwIRNizD+zEkMR2mw0hdQJ1mjABC6GZWVku+sWwGIbVDZO7t+6cnT8bYQJAg5qwG/fr9fphR7eAEgiDJNDa8LP2gkaYSyQHtKMq5IU0E5qzosXRARGs2kxpceTkatH4VQQIbYpwRzCrDpgasWld6omwYjWrMHeroYOqgVZwYyYAL1mdaHFwdO/Fl0zxycNPLp8/rWPGxZIA+75fHhxcnT8HN0cmRzerprWqgzOLpKRQSLgFHDKu0srNEJjQi9Y0dAzUQLB5vkHkcDlIktgLkBlC72Q67vdGGCHqzcViHoXDCFHc1V5zbKUJEE79kHfGjBgIgQgjmKqiIwA9f/z4m/vf1+rb3c4NmBMBTLkw+dz3FSHb3L6d1q4wZ1xAE6A2ZQQ4AlRVYmrnEYE7MLT3AwKnQhKk2Hk4cc3ZWrSAQQMs3NutDI0XQWrQxrW8CjzESHODW4wPyEw1TBEOSD4/DziT1CSCEOMbt15YR+SOCU0MXKsikiQ2Q1OL9D5HJ8JqhggUFYlBeDeZXMMpZ/zdXVv7aSSNROs6csrThCxmiJQYxK3WUoiEAL2qY2ygqRU5VwvTCDYpPAAnNDAwcgxSABFjPQjQJFq/4v3B+ayaUUAgJEUHV4s5q0WvACEp1HZrpJQI1cDcwNSdCQCl81rdNUTWAUI1jS8iqEVxs6oSMAKkTkqdXFUrRd8DEiYeJKUobSAWRig5R5smGETIV3yQgOjteLBEEpYNYR6G5TAsxmncrK+uK1YkdYik7sQcCjbN2cnb2Ktacgk6Ovzv3HXGrjl3/UBM55tn9+7d+c/+019/9uThv/+93798dsWU8qhKyZE5dQK0mTb3Xn7xzr2bJAjgcbsjopnmMU/7XLL2q04AitZa67jLiIjO6+dXz54+n8bx1c+8euel+4Bg5IBwcX758OnmzdffvH/vlWGA+6/eGw6WXYcAIoeCIrGtalErtliujm/dWX94aSy1TsQJ1J1cXTvuUsdapmiJL0XR2QhrydWICBjZXM2dWcwblshIIgKRJuecEpkZtSNVhZKBI4NaEe5cx2mcyp4lcS/oZv0i7cYdI6OrIDGTellvLtzgsO8PF4dlbwpaVZGUiVwrISFz1Zg7PRBoiONi3vh9XvznPbOVBFxfuO0hbvAyhg+g1kqx7IN7VUoMBqoN48XAGREkdaS+XC6JZZr207ibamFmITZzbpZ1ATcHI5biTuAIlLoOEUmYAFOX9rstIZpqSqloYQx6y8OeG+CPFUMiRLJqgECSFsvVfrfdba8Q0cwZyFrmgkdxN0bPh7kk1jDEh2PRXbil1vRJALHkHCa40ENghF8FmB5uCXCa81Cw2VwcQrQS1goHRGIhJLSiU57y8wmBXI2Ywat52H68mVsdEOdcOQAg96ot1TW6VNWRW/sXYjtt1ZwpMlpazpq71eqAgETMlFJXcmkLPyIQuXoUyAeQBe18C+LF3T2cnhh9T1Fe0gKSo4+43VcRRBa+z6YqIQpTSOiDETCwLYyEFFeiVhYtuSggAVMEoIUFeaahYsA3QGjPakMjG9IHzSIUtxKCaoBUKMzMiGBuXdclkjxNtSqCh6ihlkIOwEBAcdE5IvncTO0WRZsUghYwdALGeZMJmntWSkZ+dOwnTSoXretEiNDqn4JWCdGFmVlRZRJiQoLjk5PjGzfHcTw/f7ZfbwjAaoGwsANAA2RbOnEEUpFErhGCg6vTwNM4gpOZuisTJ0nhdmdm08qIqoVEgljjljoSLwIieQPZQKk55T2UcU4gnbCmGGyGbhjHfc5ZTZmIALRWIGQWmtFDiNoPbBdiAF1h/YkrCOr0cz/xM59788X/+//tn7z7/vuYYOgWagpAQKJqe6uOcOeFuy+8cqcfuD2dBijo6LUWJ0hJFn2PwUuou3sec57yfjc9/ORhLnbz1n0RVjUn7FeLl15/cXf1ier05S99BlJdrQYWNsvuUGtFgDzlh+89evdH7//gvfcfP71YHt/oV6eqpiWzY0qdWS0lL4bDTnjcbwUF3RWc0B29aoXK6qrq4qQAiTsirqU4sEUPoxtHF49w8UzeMP1sU5hhwU0ts1DfoVsV8JInNxDmoRc3JcBeRItu8hUCCnX9Mr3+6mvd2bPHzx5VG9GV0zAsVkmGnKLsTVr7irdFNv4kIgh209o4HCfONYUX4f1t0Q0JY1gBSChJImRVJWz5cbPr1YGAmIFJzRAha07cYAAMLUhgnpHabxYp/4BAiLv9/uzsKSBvdmsAk5RyLgab9eZCI6cv0GjhmJMYOQQtbZiBChGNDZ5LiXm5qJIDUNSxBR2A8WRGfXyEWvf9opaiqs27zsiSDo6O1RRxu6uVCEWS2afrAzUcxtkQmVpIs3rbAMw96qTMIggosFkDZxAKij3FAB8kJ8bZgE4+G+wbtRBfBbqrRSg3guGcsRxFMkQQWngIE38A/BgtDuhmyGEN8SlnNmmfRiSMtUDu1kFvFhUjEGmPQC2Jy9rf1UMRQwSI3Hp9ACJfBxFbPXgY4oK1NavmFezg4LDrOprGMk3ubqWmRSeEXtwSsFU1VK2z/AbnO6ehOhDlHk3wBC13Kfh7b8cZIzuTRJKDmaqZ9F31WrSWUvpOHFpLXDVL0rXGV6RQ47QrD8hMiRmZvYYuqsFQcwpT25Lb8BRFBw7ggEQzK0CqjUzFlimEEGN2iEyZHTyl1PfDcujBPYlkJmQqU26ZiOYY+qi4odTBEYXibxMRQOBQpuwzPxVONKtAjGZWSiZGU/RiTh5FSbPAo5kiIfZ8Bwi9c6DtxEhYp2lt4OBJBIlEuv24M5+aLnBWCgaxHHkskfcWOc/EVGrVAm6wlL5nvLg8u3V641d/4eefPnr07e/8WdmNiQd1zNVZwNRIQYgdqeT8wgv3CEG1jasROhuTEXeJWZhhrLlYjcl0u9vvxny5WWv2Lg3AYEWDnDs5Xn39Zz5DRgioYEWLaUUHdfc6bTfbTz5+9OF7H3/84dkHH3wyZUvS3Ti5U+v+CrPWMZY5QRmGJRGVPKHEyWNEDEgMju5ErG5FHTjlCiVnBgA0BjatiG5OAlQNDAQoOnidkwyJcbaMgFZOwqnLUxEkFK5VRRgYOk6lulcj9CS8HFbLo8OqdOPpc6/10dlHteSVHC5XhwUdVBF4Pq8Ag2lEArIZsWxvE8wYQJxFM4UFEeM1uwLacIetB7pFtDrhHC3nZggESFAtapY8uVatLZSyOQ1CvgdmQWu2PR6I+mF48ZWXx31+/vQJAJjXabIy7RGBJIEqEaFh0HsYmhgE81mBF+AEgJmXcV9No9qXmDXW6FafSy2JJqQ+7iwS2zmq+nxkI0LAVgBOzPHTA0ALe7gOAEaIvm6Lpdw1/h4O1ghLQNWWrhViNoh331pbJTXPQfQDorbugLiUSURCRWZWzaPhieNlrapkDcPAuQDHPa708FqDUYyJrqZatbYYYMX5a29apSaXgWgtjhyi9oM40lwMGisjNckrX4uo5s6JJq8NZWZUqaE5pdQlTg7CQt5+METijgBQkDmhmDsjVlU3N1eKSTweHAMAC+3wjP7EWoPg7bM21xZSBYSMpjVPEzA60snNW6vFwaOHD/zqkligSYxUWCyU9UwG1vioNhUDU+qXC2HZbDaoRERgodSaDSPmzQ6ONO8mQPO70SJo55ja9uQjAEZ2NESsEiBU42fPnlxcnDnYlKtVZeTUDRYZlGjg1uxdaDPeNN9GsXS4luLuSiwO1nU9gNdcTNHcBDGeGBZy0+ZRQLzOyA0aeyaBmuXHzaspIxetU8mEzaDU90tC0qox/ajW69Qrj9VPDRxaiSw4cSLCMBy7q2bbr59/9cd//K2vf/Xf/pt/9cO3/9qdFodDrZ3lkoC4G8CLqo37PTHWcYIYPhyY2KFqrYzNCtAPHYDZLvxHLol1Krvtend2tThYcp8gvHVENVfquUsC4FW9qvaDJBpayWoZTPHo9PaL3rkdPH3+fHO2X8niuftqtXLL+z1POZdcjg5OUr9IfW9VKeHQ97nsEQ3Rotm71prVtrvRkB2g1gkRtNZIvwdX6UBYGBnauSGHB4eJEiBFwAYyMXeG1klfx1I9Qseo6xZuSj2bjiH5YKCGIDMeHy/v3Lq5ydvEfPPWi/3B8vGzq8JCw2ETjYB5W/X8eqgEaOFX14qQkOjFN3qtbwnVcpO9Abha8dzU0gChDAUA9bhg2AmZGSySnR1qcXUFZxImKTUjMSdEjTvCRRIQV1MKbActJcllVIWu41qzVesldf0y4AFTzTUjYjUDBZGE5iRobtUUnVjCddguPUCX1DXv6KzZD0OCu+daePY3YEtLFEAoJW/XRky5KuFcjIPEgtgUNhFBHWqdeA81urbNjWWuXGt4WiPIEWb7cJhawaXBuxiKu3YVITkCIyMGrgZmYAAkJJKQMGtNaeil2487tSLCBubmTHNafxOzwnxYu7uhesiT1J0AEJoJL3g/d4jcGlC1pr7BBmrNcj4mvhaOEYJjExJjeP6JI7s3igcIoOs7QySSruumcV8AipV2gDMCmGjV6FSpqpHGzNjCVxnZwGfBFQCCq7UMekR0j97aGLhdFZnnzBwM1ArA7t2/98Kde+v11bTdMTIwmQVdxw4wLBZEvN9vay1BZ7gCuIvIarHq+sVUSt5VJDatJAwwH79tN8HrMHxCbBAdIfi1aTuwpVaJ4Hi9bgMFNVRK1Rxze/NboiIlIqo5u7uIYMzkDXeFa8F7vJPuAKAA4tHgE2M4orlHNr7VgtRGjJigibjN/vP7EL87EccogQQhGYamfGtkULFKTBzRKkTaNKquXqFRCQhG5sqEyAiuEBpTAALcbc4Z/Rs/9dME+s0//e6zR8/NWA2mWpBFVdnbLMcs0zidPz2DmdmvtbCgJKmJJDG4tI/BWgGDmTq6o28vN9qnUkqZlCR+KMvZxu307NnletzevXvz9u0jAFCH3Wa/3Yxa9Pjoxs2TW8fD0Qcfv/vwow8Plh0rTrn0aaFqpr46POiXK2QiTgDOQmA0TTVaYRVKNU4irjjmst6caS0GJdrOTcGsIqIkJsZaM3MnwqvuaByzpI7RJUkvAyfvOzo4WHXDyqd9nUrfpaHrUtejW9XCzMCOpiQowmY2jntCOD46eNVe6FO/unFnX3mxGHe7kbSSJK0FCdwiQspDvxFDZttk7dpg5GFcnV9yJyRVa1m+jR8ENw8zjIPXMKZAexiLKV736SFEZqdaAXAnrlaAgIWRwEp1jwssOQIjmE6PPvm4Vgs1NsSZbUDEptWYwsFezfrFUrq02a6hWhCbGA5Uc0ZXMyFBN0Lq+uRuwmyGquazvyVyksFdJHVdV7XWUtydhePY0VpzzpF9RMRAFuMREHoNbpzMwcCZ4hSKilyEBge3T/fTmidEaMUHDaC/ho09/NgtOmbuWQJExiZNnSPkMHJvUIXoxddeYZCPPv5wjAcUgDgiA2DWJ85t4MzgrhglbsF6tr4fn/VbbUYlIkRj8siqc3AP0WCElTG2OAqjgHjbFTfjvEzzz4op8bBcHR0ebnf73XZXiqlrrUWEERnMSy7MKA4YZcS11rCE4MwY23VuNbQ0DmDwIKUcIzMn/hMiEaGZm2dVDG0lgUiX7t668+LLL//ZX/xFuykIFosVCe+2u9T3h8fHSFTNIhrJzT3uL7Su7/thAIBqjmosAtg6UWFeOc2MiCPnHjGE+jwvUz4LtLzlIsTWHS8KNmLA0QgYkWN6SsuEKaWun/b7DNa2suvumCYSCz9iiHQN5wU9SvUax2cO7ozs6qEFQ3ZrAoYZTIHGqEeWZpAaTfUdGKcjIAinBiq612kEAApFWrxF19rS2IjVTC1wQ3aKMiQzE0mpo/XF9vat29/46Z94529+9P5H75tp36+QBLE6oqohiRCRiOZCxP3hIbQ/oMmNq6r06fjG8f5q7a55t9daYe4orabO6J09evz0ow8ffv3vluVJBwCMWA3GUbdjvXX71o3j1bQdHzw6+/DDhw8+fnR5eXV8tHzh7r2j45O8n54/f2ZC1BElmnJOQsvlwbBcgjMTubtWlUWfWEwKMwd2xsBMTJx0zDnn7f6CERyLhA7NRgAnYDdTh1KKVh1Hq72ud1dCiVBEaNGvWBxQX77/0nYc99NYapWxLBdD2u0I/OBgMfSLvW7UwRwq1JqncRzX200HfHpyvEi9ou/qOG3WXb8ABA+DFlGANTCnrUTWaXzXBhYGqFgMG1kH0XsVTnF00gYLBTzI7Ahz2NmcMG7OwARopQBL0EDEHIC4dMnc45FgEkmiUBnJvLohCdY8PXv8CDF55DYSmRZ1Y+6IuPlyAEjSS6+98dZXv/LN7/zJx++/R4YsDAwJOvKqVRkCZkncsXtF46oVA/uBSC2P9F4HxNR1q8ODcRy11AD6bNaZ+DwmAwASEXKMQ3E9mnuYx1JKDpBtAkNCcrZ4XWe6AMIzDAbNQuQRCDwXCWITNDYiMxCOdoZojLatXUCEEEseganruy9+5SvLYfno7Ml+fcVDb2Yt4gVmjwK0ITHWvlbw0hDV+PIAKbBbx6YFdSdy9SAtm8yngUGxuTSY2V3dCIgEm0KUGYnJVa2oak3chQtEVU1rVgOEICFDXUCIhCgG4FkxkSSOlsj49A2sbacx6AUb/Sn1ErcowKwOigrC+KuaViRyBGJYX1w+7p5N42Rm4JaoC5+0dDIsFklEaywEBAYpdaZatDigutZa3YxnWWcDeQKkczcwwqab4sSm6g7gLswaiRzQ1GBxxzpw1LAAYgT3edAlRKEnMLNS643jk8Xq8MxMN5eOSSiImggAgvaGMlst8YBCXEBgYUls9q9o1GYEhLj20QPegeDeQlvjqkBg5hySOAAmYOlKzY3wj7hHVWRyBM2VIobPACNKMpbtuM4c3YCJgMlAKYKSQKYpa6kmjFhefunFN1598X/4zrfOn10iihlESzJyHNRkaDFFEQsBmgZvEsES4BWY2FiRuezzbrsPrK1M45SnYhU6kcPVg4/+5qPHj0LgrNpERMc3FzfvHxJgrbWO7C5V4fnZ5dtvf3B59vT09u0bp0ebzeVf/OV3Cfq6dxmS73cydEzAkgzBijpAopRYwKHVLgFRJOkgg1GpVksFKOrAADlP7XEGNNdc4zYncwWAcdqFnTBOiq7rGVHdjMARS56AGA0E+WAYln3qF/eFhZD2+3HRd0lELUtCdpMEPcpyuVQejCc550kLpMjZJ5iHzcb8ACHqteCHKJwu7T5oNBsCMHiN6SVmWfBYu6GJx6JvlEgsMkgAHLSaowMSeTX1Kiypk9R13aKrCvtxHyUwAM5MbuZOppU5EbGrVZ2QkCmZay65SykEzQDo6Kq64HT39PTle/cf3X/14Qcfpk5A1ZyYyM09GmfNQjrhqrVWd5eUqA2s6A7NwoSI4CUXdGBhd9NSkSl+fmJiYiCfAXpH4lpK+4QAtVbpusgiBcCQppg50TU5CrMbYBYWfgpZuCNi+2djAGv+uAa9NUvdDOSYanFzEOkclFkXxC/fuzd0/YYJVGn+g2D2bwRE7/apzwvc4dNfBjPxE8r74NkalE5tiwOdJ9dAtmtVYkJk1Rpx9NY4h+aAahcGoJvv1uv9dothjMdWrxLGs3CTAKoQk7kxCnW9l2phg8ZZ9ucRg23QTNVxU2K7mJG8ZW0wAFC46cxS15tVdyhTefvt77/7wfvb9RUQMYsWHT0jMbHUnK+urGodd3twYBEAQGS3Cgq7zXaHY63GqQMAUxMiDaoz/nyLYSIwdojDV2K+biZpa1fArF9CaJlbCAgE6hoFLUGwODgzn5ycdP3y/OI5ERNAI2XBDYCI45top64F/IAG1kKEIFpXmuC6zS0iblZLbvSMY9wBUcPE4Wdzd3dm8ShwB4t2NmLyqkGLETEIzApojeiUEIy3iydOB3OtlTtpsKYrc+qZa96T+4+99da02X33z/582o/d0CN143bHQ2dg3PcxmlYz1brbrZ88eRo7auxlFD5tr+Nuu9/tri6vvJRemNyZQWspeSol+9DdOr1x887txbJHwDpltdwvhri61JXRFwdyvz8+Pupfunv65gsv/M+/8x/+4Hd//+z86XZ39fjs4Zuf+9zAq0E6uHlkRVPXOVRsay4xCKOgk5m7orXWJ25pwu6qBsDMhNFQFnJbkAhUBmjgOyGr17gJIiqlVs6m4Pbgo48NSsABwklrYYTXXnhF79xOKVnOQzeAtq5mdDg4XOo09YvFyek9Xhyk86utwkdn5xlIgapCexYY0dzBEIA4BR7iBkjIIk3r4xCxMG4BsXp7YpkBjEkAowuMHZAkRTIKWqjbqnqNFRHVYqoicndDwuOTm0YIZ883FxemlYkRkDi5KhO5qyogcGrRh44OvSRzd1PpEjCU4uYOZh+89/Zut37y/HxYLrVULbWWCZCMgJC61KuplaqaTaOAN8Kv4s31aBiKSTLnqZYScTzkolrBHaPeaBYphc4miXijRFsuBjODai01HGYI8Y81QToAIkXMG0QsYtsqotGl4bgOUU4A7ayOvdpncjbC1UL95HFVa3UwK/Dd7/7Js4tzdOCuiwBKN6gaABwiMgczHLqWNkzHRwszxwNBz8VRMNcqgMWJQyHERKBZkIQgwsRitSIxIaq3WktQB+FAvSUlNGsDuntgUyJirlajE9ccIJYBCYFU13WeMJdqkRcbrv+oSjALeY27ty0pYjgMQg7FRG2fbW2fGDMOi7j7er329cZyFREEUDBQDX36ZFBrXhys3D0l0VpqzcQiXeq6/vDweJz26K61cBLmEFBCOLgQMJK7qhWhpA0nB4sEnTbzNWVF3Ig4W8ZjUkBAtOYeVI8WQ1kMS+Y0TZPWGlneporhfA5H3XUOYfA2gdwhhXIfWv1mAyGb5CK+A2LTGh7FGKmo1RgIWEXzJLJcrgBhnKbo5p72e7OWPJq6TkRyLlpKSIFjY4TZcg4tWMwNAZgM3bSiERDWqaSeyrRfrIYf++pXHzx+9OCTR1NRwc4ciRM5CREwgTokUXVjOL84v1pvqgEzEFHVGjKPWsr6avP44aPt5Xo19LJautow9IRUpmm63Eq1H/vK1+7evSWJTWvRmroUIhVwNFVwIwMzXQzy4ou3bp2s7t45ODrq/8W//q2PH3xQYPfhw0+OV0e3T17oaRh5B4iGxMSMwJx6Tg5eSnZDM4jbn2LfAbBaY8IhJ40hABiAjk7uMstuu0bhMo7u7vG8BjcJBgD9sDo8WF2tr8bdRQyPDlBqdVB1mHQCQu4k5URLBHMGBsJEVJlHK9Vhvbsq66vh8PTO3VuX1Z6tCxIlJkImpMTopkVr7GtRpRVAEEUWf8i7Izky9jcKLD2WAzZwQhahWmskiUaZACM6sIFJPziAlgqqnlo3LSCxcC0FWJg49gym8AQYIappVMMDuvQDmhMnLVuzAsSpX3A/oLtCJtVq9uzZs+fnZ2ooXWclt0Y/q4wJsVWeOSHE0eaASICzRRtb4laMUWaq0dkCAIgQcTPxLocXFVtOnIioKgJ5E7ICgiNS1UKSuq7TYmp5pigDytdG/pkjBSpASOxauRMELKUE3MpEjmjaDtvYBwjBNYQ66AGTYXTP8pTL+++/9/Tps1IMAikyaD0i81nv13hVvKp2zT/GEjIfSHEReawXAnFsuLnRPNwRtZI7Q0YHdwIiCZklYehsmxSTAFucHyICSycAbfNyBWFWUyARxnAmi1dN3dAPfXewMLdpu2njczTNzQVpgEgkzYTbTv/oqkZApARBwYYsT00BMEQ+UDxqhsK1wV1PyGZqaiKEmNBRmM3czUj4+mdIiUsmEYYmxYxKeyBmtyD0uZoyS9C8FjK19vm3hQipCegaXgU+23Abtg0ObopEahaJKBfnz/f7fZ7G+LqAkDjSaIkAiIWYaykxcVFiMG+RbXHiY6N1EMhQ3dWKNVkXJ3Jv0eXeKAkHZZE6TQwU6bup7/I4uhsxl5Ljdum6FDKRUjKLMHGYycBBm4CKeA7+Y6LwGSKAqYYp42JzceeVu599883/5X/5d08eP2GSbtGPGWtVYrZmZ7HI57DlwjSivzQJmHkSQTDNeXd5tbla766u9vsd1sJu/dAP3eLw4GDoBi0Zq9976f6tuzeBwJS6PoV2S73JqZFIhMVFxdTK4mjxhePFsLpxdPPev/jn/+Mf/skfTevdOvtycUgIQtx88wZJhJlF2N2qu4MqaJPpNeGgljJVKwikppFBj5hu3X3t7t0X7r/8wl9999v9aulVD49uPn/+5Mnj9zSPELg50L27L3396z/+l3/xJ+++Mx0sF8QESKXW3W7bCVO3UIdSCwuDeg1EoHolUHRKfUp9KSV1y+Pjg7wRdLBSZNkTy5SLE2AcFKZWnYVCq2buFKePRWkwMXFt6ceGxG41TovAWUTE2xLr4Ki1qhondnKW4bNf+PytW6fvvPPuk08+Aa0AXEulBON+NDh3gymP4A4KBmjzIQXEoJWZEAm11FI1lyROYIBYpl2p05AGQuy6TnMFMDSv6m6aJFkNSZwAEJhrziHj9lDkA7ekFZ7DVgOxBA+3IzBfizsbNg/tyAkdvZmTWqUK4G6KhIBIjmYae6BIt1gup322XOM5a34p4ngJAyR0dzMj9n6x6BeDmfoerBROiVtHGJkpuBu4XEcMScK2c8c0HKACW63b9YZQOAk4FFeiUDlGL4zBNdbTEOyZIcaGqzg0oUfwENf/taQUNTUO6ObEmLgrdfKZhXQw1QrokgQZ0YLuQVcFBGFBAtUKYJAdidycU7dYLgGx1OwhJCgKjCKdAHrJ0wKWfdeXcXJVIjaLGqy4YBABoSk+DQCDe7MaRQlAREGwIHDT7RtAqZg6Fgk9e7HKnAgb24lILEm4c3DVGueUu3MntRSYypPHD0U6j/OCJJoUm/6+AWwuwt0woHvVatUQwvrRQL7rjx8+pVcDCgrWNLB4JE7ERGCmPm5307g3czcFj+qZcIQ1dhauJ3qmGErdQaO9PViVa9FRqJRn4iTaHN0jUQeRoV8uF/1QVLVm06qmZRo1/PK1xIFukoIbznkS6cxcUopJ6hrJ9Gt4ERo0RYJgVKeMgmYG6ipYa37h/ouHBwdv/+idq4s1OEW8N4mogjs4Q2TMR8rMya2b3SCSCBrZYKp1/fx8ff7s8uz59nJdtU7qq2HoO1GzFDU16g6Yuu7WrdvxMROw1WKmTEjiimCEu23ZbLagvq+5Ezo8XHz2xz/3hS985sufefP/+H/6P7/z7p+B2fnZo+OTm/0wuLkQCXBCDhZRTbUURwXwCqpq2TOWEEwpExiSeSUmq8bc3759HySdP3s2LBZudnx8ev/e61POz54Pmq8CXGaTGyc3Vl2vtd44vnF4cvjo4YPUdcMw6GSnN04W3WpYrNxsyjmo3d00SpKUGBMLpdSlpSz6bnF8cIBpseg/STJGBRuZa6kADqxAwAnAzKsBYyR+x8qo5qyukRmNEGEJTTATFA1xEGAhRjBHNxCJAtfcd/1qWL768utl1MuzC5326IB9QiK1ut8VUw0BvjEHXQBmFh3EnJBEpwnEax6PTlYv3rstSc7Xu6fPzgmx73sU2lxsTKMCDxOYm2skVjqSMDODQS6juQVWMIectXeuIT/UqM+GwsScHAHGDhFqHTxB6noi0FDU1egxDlSf0ICQTNUJXasg0WJR61RLjkyiFutGBC6hpwIEJGMiSSwiCJKnbKQIiA7MUq3E2Bg9zGpOjfYEq59ObcTkjtGtFgdSHLsQ3tX5bpuP/JbriA1SaaABzngKMROT1wrgtVYRCdZQTYObQyQtWUS4745OjgH88upiXG9CN+gYbpZAPlsSWRigTKuSkzCjhF6vTFMrcXEnIQQTVUWiKU9XF+elaiRgxElnTdw/e0h8DqlqOYWA0c/NZO7afl9AJjFQM47AZ0RzQw6HujmCazuOY6IPyyIJIyIY1KrgrmZWR01aq0Z3HhHV2giiQFTBWjQQCYMiMM1/xbZNegP/AtiLLb/N5rGICbO3KNwKwSebay4QVS6hziVWM0e7joMwA+LgeBs+xkTmECNb/NlI6PFLAyBCYm5xiTjLk4kYhVxLKfEnWq3mdQywpR8SIVc1M4sKU9PJzVu3GoFVdwrFbSwA5NjGSURA9JCBMFMvAnUS4Tdefa3k/MmDB6Xmvjua3SjkkTYV3pFYiYEXq8Pb9++StAxZRGQELbpbj1dnV08fPxWR4dbp0A+pS3m9nf7/TP3Zr2bZdSeIrWHvfc75hjvFkBk5j0wyKSY1kJRKVZK7qtSDgYZhuLvrybABNwwbhuF3++9oA37pB78Y6IbthguGC9XdVdUlVakktQaKFJnzwMwYb0Tc4ZvOsPdayw9rn5uMhyQzM/LGvd93vr3X+o3jlEJqYiejTH1P6rUnigQxsYqWAlrglx9/8fGnH/3d3/zy/NlDNrYIuS9vvv3uT37nJ7//B7/3O3///f/D/+l//X/+v3zU9wcdbJHHnFMTGjBAMw4Y/YYyKyBFMpEn04hozkMmCqUUMy2WGUlNAXSxXiqMV5cX02Gb84hE3XLJUZfdogkpAwFgoqREKvnBg88Ph+t9v9nsn5WSx2m37E6PT45KHo+Wq7OTMx12vU5SdD9mNA1FVEPQkLq2iSmkGBNJLm3TnK6Pvr5/XlRjsyA0IK1YrqnjGOjxEOjuRfV50Lk1ACMgIHDRyGxeRARUtSKFvYWYgFK0KlWjUqZPPvrFg4e/GoqCb5BTCW1CQJGiebKiSMgxMpNmxw6JCJijqTKjiTHml+6dff+77/y9H/8wF/of/uwvrs+faSbNGTUSgiJIKaqIgTyj2FVsTIFDVCusTEoz2k3AjsAjVTWd57iwgdzwpD5i+hlTKQ//gLH/zGYegs0er4OC4ku+d/ZBsZwnAEIkjgkBRDxjB93CZN5exRRjYg5lKkSTqplaCBHU7yMhZubgd5SpktfXqqrVbj4QBaq7t2dF19Y2H5P9o+03gl9U6BUxvkuYnww+fvoRUWkBA0Q2As8s8X5N11hiYBOJKYmUrmvefPOt1MSPP/3ksNmBQnXnMhEjE6v4M+aYMHKMoho4+EIso6iImaIxCCCSMQZC5pg0y9j3eoNeuSJt5qbnJaaKcZzAuKFJ6v9V9ScXgQ1my6vD1AJIwd9hB5EMwGZBpwPk5NQBg4oYYAwBDMwNdVVao8gMYIzst6iCORyUp+L1AWAglRStKqXZnvvr+4AZ6E3ArC+GVX9rBoRMEWuFer1WzeVGAEikInUBp5sw0mrmF1XXwgLM8kwfAuo4B86QIxgzA4DmfBCZ8qBSqN5MiEQopS4kYIaATDAHIhKRkbeyiIJX6qDn3qBBEfHZEAAIMHIsIv60TTJ2XXrtrTefXjx/+vyyZIsJGBmscG3UJDDFG6ey5JhCDJ4EBKpK4N1aElPwFCtuQtumbtkaQs4TIsYYF0drMPnlhx//uz/5y9Pj2ye3V/V1DvCrT578N//1v/nTf/PPLrffnD/8+v6DBwDIkRTSi/fu/sv/9r/7oz//x91y9Td//fPu+Hh72GMph80+UlyfrpyQSik6RGFoKlZEzCRQBCNTGoYeKYMbrVyKbQhAKmW1Pm5Wi2++vOwPu5zHlLpusfKYT4AIUCgkUL26vthuL7uujaHZ7rfTOA3j9ZDHKGHqB1UoWYZ+6vveUGMMRJwoBMZFG9vlKqRIzIzUUNiJJKLY4jhNlqIr/Gs2kVOsHgBn9QnEepN7clidHLXqHRDUfs1gBL6GumceCbQIIqc2TsOwmza73RUCIXCIRJEMyQ8SEKMEIOq9JgYgRRAYBAOxSS4mZNOrL5588N6b33371e+9ei8P8heEgazPeTj0GLSUQoFBvELXW2oqzxZjCMzDNJkK1Bh/wpn6RLz5GPowbIhUveX1sKknw6/JDP24MDX1f1opRs9BrQ4AVBQDGMbBTyT/XVadFSgiyE7iugADAbRoyX1BQPD8fQSn1pDJWW4gChS8xsAQGcmtVVLPGb+tGZzF8aHThy+q5qBKN978QAgIhnPvvKO1rvx0YMp/dw33YYSClUMED4DKSDCN/fmTB6v1MUqVewCjGbAXFCAAgdaAEB9DadktmWKxUsbJAFTUEz8RwIuhAnIANWIueeQYiFkUHMSvCop57AdA3x3QgCj4m+FpgjanhhIFr+sSlEo6e0qqt4y6DAfAVBwAFXV/HyCSgrqcnYDNLIYgqkoQOXjCLdX2TgMEQyAjFSkmdY71oLfanjqf+wDOtvknx/zaAKx/xfrTOUnlsczV0Yye1gJi1Zhe77lKY4K7IqGiPr54mIjVIQXRiQuqqUxqoP6uU2RCJiA1lbEvpRCAucgHwFRDiPUbJ/emgSGIuHfakNn3ZTXwtltQQCAFYSbJWQ1BPYJcHWEUnUoui9Xq3bff+Ob+r663Gw4ppqZYDZMEFQTS4qnhPofS6mjVpIAwF2wQItBivcxDf3JyPPUHZIqxxUDEIS0XjVnXtIvUHB+ffPjRZ//l//W/vLy6/qP/6B+d3jobpgwi23479uef/OxnDx991i3SnaOznQzDOBTtry6ffv7Fp3/+Z3/qzQsZxMA4Nk3bLBer5WoJBuMwMpOaODcmACrEHAA4l37K2ao4ICJFgmBQHAbORQIzcTo+OusW62ePHss0bq+vxqHc2Mj9ud5sL9jwg9/8yffeeffh04snTx9/9eknF1eXh+1OZLjaXhzGQ1HJZmCwSG3k2ERcLJrUReIAwKAQ2nS0PmqJuvQIx4FTUplUUdGQAzIokgMOYEAz3wiekcbocDDPOhyaP3uOtQKb/271vdlQi5oaBETAEKKBqip4mICZgXqwlVbp8fyR8K4uioEbNDGbREbW8tK923/4kw9ePWuun3/5+UebFI5l6lWyWEA1HUeDKgj2KU5FKp6DqFKKD61EWgrW/ACsagWftrDCCDM8WGlRrIYsQx+bnM/xJIxKYyMS1/vS7wcic5csEiDmaeIQfbWelxLzecgBNjVnumv6Wo1KAEPmWehpZsUz8BkJEcUECVR83ecsuab0I4RA4CSEqYGjvgDoyg6sSLXfFohV9o80Z/n7D20qxY8VdC2zB+OYIgAFcr9YDagQYaOh3z/4+isOoYi5RBaISFw15ApHvAGi85RjCk3biaqN4nY2CszEUmO3hQgCzJwzpwj+XVfEx2dBV1LW0RDdal3pVQ+hYdHi/i0m9gwzBZcig6iimhKC4WxWAt+P/PFk76o1AY/38AAGEDAoJZsKxbQ+Xu+221JARYkIGcWF+UyooOLhIeztdrORBqrez6q1vj6Ac/SHvy2EqGJVGCQeM6KE6OIBX3u8InimEay+x1XHUENQJBfHByumAiCl6rcdsgE1r71204SZGQEhK3l3oYNSvmTV9UqKYsSmaUVLP4wAIKKqQkwUApgRMlZEVUzVTIoYM4cUDUDEpKgpcGBDG6fh7urs7PTki08+GocBgLNaMc2mASwEr8IAK8YxgQETLhaLk+OTeUdDVSDk1LXE3LUdx+gtJDG1bZsAsRQzu+i3hxdeef13/+Dv333pjZN7r/zFX/zs7Phsv9nud4fhMB6v2v/8f/+//eLTz3/6V3/++acfXZbrRbtYdt2q7fp27MdBZ4WtmeY8cDg7Pj4+PTnTIlvcEamJYanPOwhQCGXM41AOw4BgBOyxuArqz5yBiuac5dbp7WdPHqwWC6agU15167zfONUGAKIlNs1wOBDibn/1/PrSzFbd8d07rxaBJ88uAGC7udpstmwy5RxjGKdJSDx+xxCNVAAXXacmArJcLu7cPmsX7fWz82Z1YiGM+RD5lIwMMYSEhFYEkQCJDA2Va9xhfZD8oXXEAMgADJkMDNWIyaygE1JVAxUkZ0AIFARFsziyLFi18RWlFAXEUgpSMARGMgXVEpsIwHdOV/+TH//w++++9uDTv/vp3/7VrZOz4ztvH6YxhLBanhbDPBUnIRxsLSJeGWUAyFRy1ik7TM8pgRoYzrYjp6jqOImAfgj7aV99kLWSA2EWdQP4HTIzJOhDiH/eax6XQ8lATG5Z9a8OBGbFI2ypXlZ+31Scjd26rk6eIeIMGN6k/qKaas5qRkCmmich5timMpVxHIhvFjWowC+44x5nlhCQUIrWHpM6pWL9jOtNFLDdtBawc5yOZqCTQ+SBSMyBPLyjSM5eEBtxxrUgm6iCol8kKoqEbdet1msi6rf7/tDHFInIgBXMB24TAYVAhKpgnjDhnkOoKio/jWuqqhgQu64SzNSEIVBAAy8PMDZgDEwopTCHk9sni6673my2l9eggoCiEiggI6maVE0pgHqalGN1boMnYiATEUMgs74fioorPVSc6ENAEBDfj0J1yLj0yhQUb2S2VYTlg4XNilzHOgjB3F3okmOoGxnMTpMaIeX+fAM3NoHLTx2QcRtRCCQqZhoD+8Xj0zogxKZNMeRc4ADoil5xzB7U7SJIeEOxgMxEEyChqpaSgYMDC0xBMqqKFKVwEyUIBkAMaAymRChFDAlDQDPwb5LMpBwfnzSJHz19nLXErqWYZJwAydBNcYTGYKSqYKKgbRu6NtXXUMFMlaDkLFqG3BvKVISZCKhMsr3abba7q+vtk+dPvvv9d/7JP/lPX/7Ou3kQzfr8fLPb9+tVd/l0++TpkycPtpQX+RASHX/02UdCOU/50XbXS29QAIg9OskATXLpi4w5D8yh65rDYY/AarkUAe94KFMW2e62/bhvQte23SSCntMO1Ythqvv99fbL7fnTJ/v9VQxtPhy223G9PmsWi/0BEEIRRZVpGkH1w4/+9sGDL4FYgPMwFfcJgAHzNI4ts5SS89QEEU5ZbZzGXd+H1EJgjswjXeyvOkIkOD5aPXj8sFElsTadATI6eQmIhgQM6vnIgKFC5jDr7HwztaokcEFbNYygT5FUy9MRULWoaXAEw+oaKqAuODBVMAZgZEY0BdMizAlTa5OmRQd0OFusfv833/sP/+DHj7/55sOPP/z6s6+nl7TX5f56mkSnYWyWR01op3GoKjaXrLjghTAQmZpHKHrKC6DN0/+vgTvzZv5tx0d99uszj1Vnoebrqc3/tYFDezemfKj0qgK75t6fUiAmcmbR2BzERgDwcmAHrcwXa6Iq3atfHmfxJ5KZO9gKAjIzApha07ZHR+vD/oC++oC5Id/jvepp5mfMnMYbAjkg4O+azglmfnDPL4lXjJGxn0TqAc5IwUw9bMbVmIGSSIZqJkIDKLkQB28ZQaLqNXe/s5iIjNOU8xRiAHO7noUYENnTkwA1GLJHh/r+NYNXWK13Po+gH8U1jXX+4y3n4uAYIIcQpYhnWcUGX753783X3/zsy68+3X1kOfu+ViP93MNan3an1X3nA5hDVQHQEJiCqJZ+K8VS01g9pcFFRJ52TYBTyUyIzAYAReqmMevjQ3CDX82GncFFfydujlpwS3HNvq4MtSKje7fUdBanAXiha5UXy42Kw3uaENB7M5AwprBcLtqmO/TDOA5IhEDeCw+1GQMrleL3ms08AIARBt8Z0QgwxCSlqJcDYV26SylQm9SoqPgsKCIG6pK+XCZkMFNCOzk+AoXLq03O6qJRZDYrxRQoUE27DQRgWsykXTRtE2CGH7yoWbPud0N/mMapEFhqm344HHb7/e5wGKYHjx61q+YHv/3+3ddfBcDYBmjtbrt+iU+A+N5bt98bX/z5X3/VnoTTF5ZvfvflH13+3tX24vnFs4eP73/z8Ffb7cX2sBMrYBaYi8r5xZOr/ebunRdfefH1o+VRapuhH0Wk5MJMkEJ/2A/jYRwPJY9ts0ixEZ1oYEIWUz9MmVkyTCUTxrOzF/M4Rmpik5arrh92AIyoORcFEzED2VxvttcHBFIwAGGsviEtxY3fClpyJkoUrJgVKWQKRdquVQAh2m63o8D+sAUtbRsBlJAZgzCrqgvqfHaHm+ff3+YaxesmDzQPIfQd3cBng1lLA8BMQB6T5XnlAKRmIIhEZgjGooaBXXhYSvE0BdE45UNDIrk3QRj1zp30wZsv/4MffPeFo+VPv/r8wVcPLy7H07sIgOM0lkkkZiklhhbqmERzRgxbjdFHJgZg/1TAzXiM9duGaofXm42G6mfLZl6A6qNWhdpVOVPX+SogutnkHU1ApArpuE2Vq9+3Fun4HUFAEKjqXpnBo+apEgbgn25Aqz+RXwNIajElLYrVYAhNjGfHJ6Aw9jstTkTQLEwiU0MkJxncVkr+qiACoOeZgqghmSmRu63YkbkbgAXm64gInSOxOr96oJGaF2R6cAtCSNFjBhXN3b2V/mWWUva7rb++gUhuIpIc8FD1lzCoGnM9uaxC8HUJrw5KJ1PRt8+67Hioh6qKKAWMTQTDYiZFwaxw3l5fXl4d7/cbMAVyyJL9+BSVma0GM3MtEGK9V2qxjaEWwYDEKNk5EwDDXHKMKXiqOJkvcoxU8TXTKhKAGtED5jlvYFhLA2bOFmZuCdShYmYFDSmZmxTcVUHMHETEjEBNVTgEQGSIruf2P8TfJo+/J0LmNI6jKbhqV6QYSExpsVgiYn/YlzKBekcQmzMKKnZDUyOI1kuWiEUyIeecAUEVMAAGYuBJMxgyh6btQFVtiKll5jGPaMDE2X38Uy4wmenZ0cnYHy6eP89ZQstugTUE5oBApGQIJoaRFIA5dF3nkbY335UjdFrsMI5Df7h1dpsibw+H/a4HsCGP3cnJb3/3rd/4wW/FpgPw0HgDZgUwLQSmqK9/5/b5xfnp6b17r59dX2wuN5tnz5/+CH54ud3+6usvf/nRLx/c//ri6kIFFAoYjP32m68P2+vN6698Z71ax5AMJ0NB5iLjUMZ+2A/jNSIgmZEClDk6RD1+o+Th+fPz0CzOTu8gsa0tUbdYrmQYIBcAU8sInJrlpFDEvoWJQQFALAMwgCZu2mapMpZSsihMBZkxELEX8gkGFJV+PyDRNGYd4Gh1fLzaX1xfd+sWrBDwXE9hohKQzKXu/mmbM3D8nPP1zslWb4ZUNQ4MRCoKs4IEFE2JiANXv6KAU2WiouNUuDi4yWTIDAAhRlp1ablqgSgfpkjy3qsv/vg33vvge+8+/PLjLz/65fMnl/1k+yHvh4zcAe7b2ABAyaMCBA4cAhOYFSAUKTkXHz4Qxcu53HR9A4oa3iQbVoSzEgN+zdVYz0p9w7fEse8980Z0k+U+O8nq+jzrjfwBZSQkNFJXx/u4ieriEQB12SWbunnU3b0o3sbkbB8j6LdGHRExMinFFI7Xp/vDoKKmEFIsnp3syayoN0qOIjUk26rkz68JcmyBqAZKGwAHsopU12cA6wBvCKou/fA7H8DR83kKvPkiOq+H5rZGQpxLutS8LB4x8LcZSerPmxiSBWSs56/NSnmr/HOVu1Q+mQxqLCbTjHx5Tquh0/EREM0k52EYv/76y/Mnj7IUUUAfu8EQ0Wl093PXt9ynIcS6r1au339sVLEYGwJULQYWAhGCiiGAFxSOWsgdEICoQgFMABkNEVQqs3rzLtS2Bof+PAGkAm4OLDoj5Z9EZuqaBolLkb5kU0AP22HXK4NzA6oqKik1KTUAEFP01aaIlpx3260BiuRFtzg7PpvKOE3jNI0mUrWcjls6/ldDF3yPUDMUMQNSkLTomHivWxVTFtctGXN9TxEQIYa4PllvNvvxsCu5eCZEk+I4DIHp7PTkervbbHZmmEvhZBgYVUWVmBQRmTlEIEDhmJq2W4YYq+/FzFtfHC/K42RIsW3GqQz7oaiIlnEst85O33z77dsvvuTaPjVF8UwrVVUVHQ49M/zmb7932B1Q8NGD890nlxcXT59dPhNDCvbKy6+wIgj142GcUMEABgC5un6+XD5eLJeLEBGRkPt+zFKGcRjzZFBAGYBCDDjWZ7VWg6kY6PX26Vl8aTioIhIRtrjfaj70OU/OE6TQptCs7xztN5tpOIQYVTQyqog/miB6cnqSWt5t8tj3RSR1S45MkWiGnTlQUWm6Zdd0HOPZ3aPTO7cQU7bPh2lUJaKAQBQj3NSwWHX816l/jn+9QYIcxSEmyULECFyK+L455YkJQSV6nAOClaKm/aGPTeCAadGszo6O16vlcnG8XrdN08QQU9OEGHy0Mjlsh2j57jH9we/+6Cjiv/7oo19986gQAIfdYTzaDyadGuk0BYoq6gUuhJRSGPpSSnaoxwy0FD9D6wl/Q2jNYzXMoKofrhXAd0xWPMuoCnlmnqCOxJVFgF9bAqwG98A8NROicSUQVCsB7pJM8rg9jwNGMqKi4nOnQx/qZAXW3RuR0GN2RA2RAruwPkR27hQRU5NCTDJNZNC0nWh2cxUwgiGzd8NokeLyV9es+ulHRIZgpQCSI8mVHgFDINWaEujXADPNMgyo9LLWS89mbU79d66DVwNERnIRltkcjMeIhlp1UH58qIek2+ywrddMpUjrEOTQm3sN/MSuqjUXWyFR5Oi3CpNnSwEo5GHKw4TMTIlCgPmO9R+sZovOl77vJvwtbo/osq2q/kJk19kgowUOWTICxiYWsfXxSdO2eRh2u2sQfxzMdUkUgnn6G8xXIzkjDzprEW5oHLM5/smkwl/mMW0mfm5wDcSbdVvzqMgYiZ1HjbEJsTFT5Ig2IdDhsGcOpiqNipaSixQB9Ko18dXeW2Vm/gFq+jciGsQQRNQAb9154ez26eeffdZvd2DAjDXhPfgPJxxSalsTQwSPHVYVQmQKYBpDuHv79rOnzzfXV6rStVygyifq/MS1JdFx2Jja9eqoa5qa+uHJGQCM2DQhBm5CU3LebfdDP0IIQz/sDofF8mh5fErk8ZNqzqB5u5moqoipZDFUANvtNkSw6NpF2467/Ve/+urq6rKXESCmJhmH1dGdXHC7fS6yB5Dt9eXl6nkIgQMBtvu+Hw7jNE4lTwSJQ1TVoR80i2m94+s5BKDj4dnjLwkJOfj8QdaASpbRoDDGsQytLL/33d8iw+1mo9Ok/okymEo+7PZt5NPjYzQoUzZVMwwxdYslsTkXg8QhNuvV8dnt201sMYSj09PbooJptPzp57+ScUqro3zIFASJ0DCmaKIioqCzHgjAe9PBDHQ+j9wMZIAkqiE2Hv8SkVDQE791GoEwcjg9u3Xnu7defPHs9t2To9P1yfHRyXJ5tFyt2iYGZkQMjAr7aQS0lmOeyq8++XjJum7Dz//2rz/54tPLwzWGSEl3hymPxUw5UEHMKiESAauK5OmQx2LZ4wQ8M0Gc1JzP6JpZCa6fM5uzS/wc8znfKpjl5YZQC0/AAzAqEuLnvQMUplpVNXOG2kwsO3VIoJ7n4/EZXAVD82KVUkIiVzT4IGsKnsNZ72AAAHS7nCuSmDlQMHA1Pe73u344GGC3WjKF2HV5yt1isd9v8piBFKxKRIHcXgNgRsTeaMLsfIAX+Ljs3G8zq+SIVyT6c4DoEUfIoOJyVQS3W9Gccq3eo4AU2Fy0jlCxaKqtaOCZ1ipIiF4eQISVKdXgN4QTFYCAOhvzbpY3mP8WbjYFAjOsQqs6BdcazqJglmKTJzJUNELzFgHyVCbHpkWEqmm2rh2G3t44v1f1MfER3kSKwyxEDIQM5ANp2zZvvP3GD9757tePn/zdL362e/5MzTi4i9sBU5qFoQBgBOjOEcL5zq37pcvGFcTtf0REqjr2Y7WezdfezFA5QAYCwiHEGA2sSAEi6x0u8lBsCJz8OczTcHn5vIiWPBGgJzoVrSVrjus5IVjhYXP4SgGNCSLDq/de3lxef7PdoFGeJgjulQlAiEaiMg5DHrBoRsRAjMks6zQNueRVSmenZxcXl/1hJAzErErABMbOFkGNZ1dRUMnM7Wq1jCn4ng1gyMgYUpdWi3bRNv1+m6dpu9kEChnxerM59P3x7bunZ7exznKMse6P4M+iaYwhMpci8STqMAzbPiYOxByDioxjP43jmPeGoWvXy6OTFBdor+z6q4cPv9rud4+ePADAo8UxMR/6fX/Yj2PvExGlUIrkPLoflZHFJtd1VZTBVMAIAgKJFISdVUWKO29ttey6QMt2efdkjWrFVNVKzmJw9fw5MXRN0/f7aRoQoFt2KiBZ0SyDBo5EoW3a5XLNHEoWNBi2e0M6adtXbr14eX69zbnkkZnc6MoxqYErxBAB2OoHDyv4QYCIzESGIEU4Ri0KrltVIg5gSIGGYYiRj44Wr73x6rtvvfbOm6+/9MqdF++cHB1362W3aFMXUkohIvrRowqTFGbqmogQnzx4/OBv/5w6vjp/9uWXv/rq/vlhxEPORnwY8vOrHbUBTLNqSi1RKFJmV5NoVu/SrZwaEhhQYJgLdG/8MDCjck7fVSlcRfbrUeN+Aqci/WbwK8KBEd8HkBk8lOvmlMB60RCCqXlOpYpQjdkhRJRJODBzFFctCihUGsxIEechGAHByBMnDRCNKaAREcXU5mlqmjbnLCJgNuXctc3x0Wq72WjJCN6vEhyqJUS5qf6F4PC2eMEZB0MwEQ5Bitawh8p63oAifv95xKnVNuR6AJKLVACB3E5Y1ZloRPUV1uKQvr8a9cXCmemuoXie2AROcHn64K/9LrjhZ2aGBupFDfbtK+tLgBlUl3YICM5sKBEhsUJtLgY/41wy5gIWR/QqUVQFcP6G01xn4RpeA1MzKVohCytgWkpBhNQ0t89un92+/fjiglAVQFVDqJ6sSibfwKVYl5k6gFTBT/3XVhVEddF0vkWtIDABEqNbENzcW28p7woCVFARybmo6vTtkoQAEGMEBEMqkqXfmXkVLKm37wCSC1NthgDViH27NVV1OSmC7a6vnj17WnJhZp9Q0MCsSDZXT5nIsM/AlNqGiVUBQJAgUBgPEAIfr48e3b8/DQMYDweBjkX84xjMzJTAjGMi1gzIqW2aZeCAogZWc1F95CBTEyC7urw21RSa3bB/8OCxGfzGb/9ofXLk60K919URb1UfEP1zyRgIluvFfncgUzMtY5/LpFaapkktIca2XZaSIenLL7/Wtm/dPrv92ad/d7h+9kRKOXtpsVyL5JwPJQ9AEkNLyByZETmQgxtQaStQqE4RAFDJPmtWCyp4EKy5xXh/fS1755M7NZ1KCRxSak1ERC8POzQZx3HKw7JNIsN+DwyampjBQqIhlat4vd1u1Dynk9VgGHQs/dnJse0P1+OoIqFhtXopgqlnF7tw2g8NDfMESAiBCAmIiYMGccKKAyvofhpXi/aNN1763jtvfvD+O+995/XXX37hxTtnq2UTGInr0k6/ho+DALG1KVUbl5Qvvvzso1/8j7//+7/31Vef/d0vfvnF5/f34ygQkHkqcrXdLnCRmlbAKRbQ7KCgM2QVcgGPXjRAJiJy4TcAOU8LACYwN2fMQiC7gfvRff4OIfg/RUQThYoBmS+qAGAKFKpdixCAyaw20pgCB2JiNfHzRKWQx0QxNW2rwGd3754cHz9+8nhzcRGYAYUpialMk6t3QnQ/BWspzKGaH8FExpiao+PjcehLzj4PikrfD4fDXkREpGkaA2D1OEpDQ1APKVCKQVVj04YQSsklTwamWpgZEWfF0Oz9nh2MnucAjFjt/XVNQEffKxXuUFnNT2KmWsM5A2gzt1KnbfNmVycOFAAtELLWK0S//c0zNlcXlQrjzb9wJuOrxFVc0+m26WqVRgMkEMH6bfiIQPNQML/zddyp7g5Dq+e2evTJt9+J52M4lk8eso8kIA8ffL3d7J89fzL2PTPGkJDn8cCvFK1tW1V9W5z5QQTE4FOXgqeSkFsLTErxb5o5EAf052AezGf00fdSVKkLQeTgYKiJiCoHMiAvhVfzh5ysKuJcKeFVAmTgXkoUDxSqI5OvaggAxcpuv/3y80/HYUTEOENbqphzpnCzJwMCiTh4JaoaDIkBQGNs1ovVdr8rNTCEmYNoEYDIDE7doTkBwmQE1jSxqotBTYAYVGV7uXn65OnucNhe7/KUY5MOh91ud9juN/defvnWC7djSmXMFNgJLxVDRk/SM1REUhIQUzX0SJZIqqN3iKqoYkbmJkTVghiawBHxZL3kV+7td5cf755e7s5zmbr1qeTstjiRQsRugymStRQ1JWCB8ddWV51Pwplprb9cYhfbtm2aLqUYU5BpHMfeIUFE7Pd7KQVRm6bRXEbLi8WSiMwyQFClcZgIIUuf87TfbaKbwohERMSGvmikmAINKpqBKKaUpagqAUJRM6RgQIDGrqEnAoexkIN4qx0xIIcQpBQDGYb9YrV4592Xvv/umz/6wXs/fP+d119+8eR40USePzAGhl4PrjdQC3pJnBEAGMpkD7+6/2d/8idnZ7dfuHPvw7/7+PGTp8/OL7rTE/VnHe3Q79LiBCBQoCKgqMjkgxm5MqXC+t52jAAkNbD+RjBi9SauST9oN+zwzJ0Ash8OOHcauDDGHE4BF80CEfMcul6Dvt064Ep/fwl9TGYWFSZ2OhQBi0mM/N477/zeDz/4f//zf767fB4QzbW0KkRcsoTI5NXzTvQBI6DkgZhiikdHp8v1qkgOISxXK4phPPTTOIz9YGA+9VZVCIACGSkDqamJWmBEPTm5/dKLL11cXzw7Px/7vbkKyMwfQWJAQIUbsQ9UBsRBGyZEcn2UmtOmerNDmcsXAW+WqF/TbvjAjzrP92YgYsyedg8VQKiHpV/ZBjpvAmZzRXKNV8bK3FTCRFxai8RIIEXIMaeqe/VmThMTQjY0L4rUOuxXktlq4JxVOAhnYN6/J6KqEmJUg+DbECAjqsHUl/vffEPxYRnzOIyMhBTAlDCIZESkEJAopQaQSp5MVaTUV5Zp1uYCAKhpJEb2VOsKHCGyu4IR0XOgvz02kHFWLPiy5h0OZiBmIRAFX4+hlKJuhEYCECCYI/Z897KYEhOXkvHbOFPwSyoEVoWAaEW319dqoCKxbaSUUowYOURDE6/3IwQpBcTUvzUUlaCMam3bHa+Pxn7KUlKbIDZWTWlVMS9m5OWSWaZxBNTg+coIUAyqWVq2l5fnj589fXL+7PzJqlt77mCIfHp2+94rr946OUED9s4e19JFNAAtMkcrAgOJGpjJlLUImHZdSwSMwMSqYlI0aECJMUSWfvdsWsej1fL07DTGZpzG/bAZ84AU0DimJmnTpCbGtqqM0Yh0tVzmwn7si5qJIfthgf5YE2IxZcSYmhjD0WJ9uj5jYjJeLBamtchlmkrJBVTELKUghgCsZqQ+/1oIWIoUHVExjzr0FvuY2pYDm2EM8ez0KC0WgwZerfr7jzf7QykDx1YZLRes/dVk5tkozCkAQmTGEJzBsKyAqEUK2DSOR8eL11598b13X//N99/94Duvf+e1V86OV0301H9PWDMXvfkmeoOz+3wmUkLgGNMI+WcffnSY+n/0H/0HL5/c+fBvP5xGAQqTt2RQRIBp6oexb7qzqWqrtAZ8uhIH0cyj+FNIbKZ5nNQMFczzgmfWt1qwELF2r1TxBcwgD81Hfz0FGNnbVeffwMwcQr3RKwbr+heoMZSIDrwgo5oQInMAxIBsKqCmWcZx+MVXX26210iYi1ROMURFCwxEgAymmtqm7VpTm8bJLMUYF8vF2dnZ7du397ttDOzwTkjpcNiHmCRL4KCu/DFCwsABQHORFCN3JKCQsW2bkEjFzNVpQAZQsgAReZ8IkyPpiIgCVcZYZ1kPnTGrrecA6NEFVodr8w9xXR0NqhDV74Qb5ZXvZ0xInsNhEIgYXEOpAjdnrytRbt66+c0zNUTHApz6sspc+m2kENrUNqmfxsksxACAqgLqedu+wwHCXNvpTBew890+uPgPbfW7qMVu4N53ZvPPr6qKpaYxg5JL7vsYQnBnlxbXzyECgoFqiCEEDiFlgmmYxENAa5XgzKD7I2gg4vCF/x06cg2ANmNwUB/rGh0B1XDgQXIqM/PoV7evfn6pmEERYcKKdznmZUJEMURmRqKci/8eN4MiEiIDSgxJRb0rgxBLzgiYYjy6dUpETy+eTsNkpVBKNr9HiFjGMTgsSNo0SVSfPXtmxZpFOwmE0JbxUC/6OiyQmqKKBRymfP/R08Pe1qsAbAFNNR82h2fnj6+uLx88eLjdXKUXm5N4rEiBZL1aHy/X4PJqCtNYuxjrM+SitbpLqkiRqajZYrF48cU7zy+uv/7V2Xq13u33CGKGVsRIKSphKWXI/X7o90O/q/4isCIjijJFwiY1Tds1IaRx3OcsKYUmBW4btQaNkIMpGFDTBEDgGCrZaqYmKpJibJtmvVjFEM1wmgpKkVJijNOUpUCRkktJqWEKkxYPNfHxy4BEC4I6LmwAZhYDWsndInHTrFdH66OTdrEahPl69+x6v5uymQLVsGHPjoFQsyjQTUWGCtA2LSIA4aSDgSLIyenxnbuvvf3GvQ/ef+cH33nzrZfu3lovG+9b11o+hYialQix5v772mM3NDJhsCy7/f7zL7782V/9+Vtvv/7Bb/0w5LxcdUC0PD6+2B9St0BgIpw0juNApUeiXApwjCl5tEttKPRZjjRwdKmElWI+VfkxPiMGetNVdROYbz48oiegmarUe9cTduppRYQcIhM7mSglu7kZZ6DDnyr0zaTyA/XsNAAIWBlO048/+ruPP8bDYU9gWSSlmEJEZlMhpFwyIVPAJjWJAjBZUUye3CVdm5DIQMDlRcShibEoGHiYkBVVBQXxKnlRQ4K2a1999bWnF083l5fXlxd9f9jv9yKlLlHEIZjHszrw44ddFd2AVWeyw2GzFtR3ORVvusAKIXo2kZnPslU963jbt8hOLZL2BcLBI+8f8ILBet86/A8+02Jtd4MKNWFFGsBMfcujxEyEamYgx8cnL7/88v1HD6+fP4tNo2qmDKJNapBxmiY074wGlfpWeaUXABABmhdkycxXYIXu0QFFfwWqtV20uNgnhYRgxpTHKcZYMycQVcUkxyYigjvNDYxj0KIAYFIvJD/sXfrt4AvOIBExuf/cai+FL6/zfjIjDA43SW3OAWJPnyIDQKbIjamWXPwRBTQREScJCL0oBhBEix8FM91e5yNCVBVADOxtUKqlIBMSvPTyq+uj4+HDn4+H0XMTQ4gKguZ2f4yBAa1ICZGePH387OIZIEqRXBQaACIQICYMTGogxe/dlLqx7//Z/++fn7bdD99/52zZvnbv7tHJYrvbF6Ax5/1hmCYNMQlBniaxElNjpK6IrHJ1v+PQ61cNwFQFtCh65ziv16vrvDk9PXnhxbPFuiVUZqJCRaXIIHnS0qy69t4rL7z2yisPHp5fP3t6yDsAAwh+wRqIakZIbVwYG2VuInNAAgqRgbhNy7ZbNKnNRVLLPtMAe7YaqoqphpgWXcdIWHQYRkaLsWGgokVBs+qURQyKmhSZpkmKMnMTAyETWpGsOYMhGcYYQgiLtmuWi7ZpQ9utjo+W6zUxt7QowEeLi8fnTwGp4ZShKARiw5CAwRPagNhUGQIhyjSYGra8PFrevXt2786tt16/9/abL7/10q23X33pbLmM5EOgAJia4Dw2eckogdTkGY8vVgUoqhiIIfGj+w//m//P//Pq6cM/+Id/r207QL195+TseLXqmsvrHYClGAzIGMyK5h02y8gMTJ7nm2KDKu6VlaIUODSNA/4uBQSHHaz2t8DNB6YivPMIJAAAnBKAR8wrO/rppCfWadjAcXWTklXEalst+jlYgQlEMyWmGnQjNQ9VclaDlJiJ9tutWAGlwJRSREQFwyI+aEVkQ0xtCpF9vm6aFkohxDY1i66xPOZhMABiwhhVjVOQ4uH5YFQzbgCslAKEoCYiRJZSUtF+GrPkMgqQIaAaMJJrUmoPgKrnkrpuMQQ2MfM8/BgBQK34QFeRfzQk9iTT+YRHg1+jhiv4bo7Q1NOLUEzR0FRCCKFCTjUdE2sYh+KvTeH1qDJwQ4fP7oBIVpTQi0D9LMMmBZsdmFo81rjrkIoqILB3O1QmmDzSZzYA1kg0A/FNjPwH8qISAjAHTUyyUCBRAwWqQZlW22Jj9M3XZa/IAcFyzgCYp5xFEMzjRHxtFFG3jYCB9y8yk+a5DgGJqG5q6IW/N6KFX//LzUY2/4//OO5EdjFtfYLrXeFLsds9EBCnnKFkKQUDE6DviHPVjJhbNpACB7OqFyqqDJb7vr39wnp1fJWeogKB+p2iIuSxpgRZcgjctsuPPvliu9lNWbouMbHqRGYEQN5aD57npBQjM+QsX3zy2X/xX/zfXn3txR+++93f/uH7777x6vHJen1y6+T2Zn10vGiaYmV/vRWBqRQSI+J2sXT5AgeqlRwGoEZAZkYARfN02F5f7hjbzfXu809/9eT84Ye/+OVHn3y43W28AhCzFZ2KFALy+W6/3xbNp8e31lfPtvtL524NVCGPRYEsHkLbLLq0mKZJ8oQRkDiE2CRuUorEkw5jP1EIRMzIaNbEpEpqBVFFM2IAldWybTmOw26cRIpkzcM0FYMpT6rCREUmQ0tNaJrGMIBpQLBAIYTIHGLDiIEpAjLgomm6GEnEihbsuxiPFot10wy52HQIIUJgZDYKQgohhphitxyvL6cxT32/XC9PT1cvv/7Su++9/tYrd9965aWX75y+ePtk3cTokm2bVRQI6NKXFNAUCFVFcsnTNOwzgIYYmsgKJbVLw7Dfbv71v/xX/+5P//h3fvODW2dnJDoOIxHdvnUqw4cyjs1y4dQgA2kpU98zxpDa4oI6Rc3imVrEkQM2TQpIwzRZkVnq72sW1XHpZt2+oY2xLtSE5JyZ1dDoygg6mkF+wJXiIRMenkIV85lHXKxzrwVvryYEAxHigEQChWpVQeAYxkMPhIHRxcq1QxgxcuLULFbLNqbDMIyHA4cYKfrkul4tz85Opn5IKcQYYmowxmnKJU8+MxKCCAKaAnjWLxKJYMnl0YMnbv5HJEKODbnBwFQlZ8JqikJmIsylkImXShqY1MpFx2xIzUouYMaBmRFBoKpisdpqYX6N5nPJ7w8Dt1gZEoJHBiMjG4AEQ0KvD1Oqqh+sF4Gf9UwkqlZ1n7+Gm5Ax1+hLN4Uxh6vLy+vt1XAYRLTkzBy75appm3Eah/1BpYiYqRIxGIYQZpym8gLo+DEBqOtSK0JfjYSqPpmj/2B+bSmIinmeJiEwmWpABgJ0vE1slAERRdR1k0RxZv+sckf1iTN/DbUIAZiot6urmnpo3EyIWL1XK99WNxigum6ZqYppNS46m0sAKurPsUFVO4NCKcW1b6oWFEQUCNFpNKh2ITVxK5xDp+aMipTPvvjout8qWOza6dCDGloWFRHwhiMyQuCGu6dPHv/pn/+b6+trREaKHFKpwyGBm/mcPhJQMilIcaGlXO73h08+/+KLr3760d/eOT757R/+8Ccf/CCl9WtvvvX88mlLcPH8SkXGbG3XADEYzj+15/9RxfPUqnJNrfR53OftZvPgm/MPP/z40eP7n3/+2W4/nJ7dlnIxDBsItAjrpkkU0ziMz5483l4+fXxx8fDpUy3K0MANx2WqKr1c53FYLY6Xy5PQxJZbJCEENCSOTDTpgChTLozAqqDWxgB5ioS5mIEA4EH6YLxMTSTKhkx0mPJkuYBMkjNkBhzLfsiHGgsMOk4joUWGwLFrWwb3riAhDn0PaMvlQodBihCHIvlgkNACw7Q7MLdEqAKcIjCJGceoIeQskJoU09mt47fefO2dN15+/7uvv/vGvRdO1i/dPY3OBVoNonFhvVqxokiETCqCIFJ0HMbddjcctiVrIELDk+N1s2pDSLmUr7766q/+6q8fP7j/2v/8P3711de1TI/vf7O5vBQqzNIl7vu9QK0+FQPcYxOaGGNAklwokrlkSQGZENm1JVI0F4kxmAIw0cyH+g1QgV389nyBOfHBYQDwJEdAqP1LiET1ORJzzA7Qm2w903fmkH1A89PuhhD2dCAEAgohqhpYccm/md3kdxqAmISQmAkJl8tVYh6nUbSQEVFS0NVyfXJycnpytAVYrZZEpEoY2YqkwA6/KSCniLODX03Fu5sANptrZCyThuiV7qFI4RBVC1RtlhkAETIFIUPDFIICSCnz3E6MXCMQfSx2Rt3Ig+OYg2rx12M+Gmsfma9bAKhiDA4x+qvuRiZzZ62zZVg1k2BuRRGT2sXory/WzH2nHNCAkRGDoQJqCFGL7PY7ANNibm6ihkoeyKubcxYRlfqNEoZfVyl54rxb0hw58UPWqjLO9xQDBGQSMSICFbNAgIQsUoyc3nM1ahWPkhEyaykVmncwX4tjYb7lqJvCCcCsFI+pQ0AwtSIKN2pcc+kZ6M0BVFktJ7XmNOkqmDLwgxpqc2t94HDe3zxr2qVYBsEzPgG4InomKn4hEbHvmISIxEWKITSpydMIIiVPd1+4ZwLPxkc594qmIkDkL5YBptjw6ujy2fnT80dQIDbLXMwiqtQ8EPWLE1iKWghIKAAUImNkIiLqx8PHnz342/7jX372+UcffvLWKy+9cu/uyekLm8unfbamCYSw2x+ePHny4MuvX33t5e54LeNk6pWf/rJ7ABqlprM1FAklGzNonsqYpzHLlMdS0GCxWBhY5OCZw8fHq7OTs6uri+vtxkCNjJk4sFcUFMkAgsBFxt3hWhUWi6OwXFpRY3AQfBhG1WkqJcZIyCHwMrVlysxMBgxoRCCZsqRIaKUUJXRTpOUxixVANSnYtP0wFBmb1JiWaTJVCCEFCAHIBLJmKWPTxNQ0RBgoNCEtUsspIfGQrRFbNPH27dPJnC1S4uimP2ZOTUuBUYEo3rt3+ztvvfz+O6/9xrtvvHbv7O7JuuMwk/Ue1ktmprnUrBkORsgAJYsYbJ9vnj57/vzpE5GxXbSnp7dSSNv9Ji7aPIxPn1/+9K9/8Rd/85eL2L7y6iur05PNk2+eXz3f7C9u3Tq+9/LdUe38+Wboiz+9RggqOLQUEzYBPTELa7qE22WmqYiQp5fXidTHJERzxTd6jv+8IlcN4Axb4IxTzZbMGfeFQKyGxepY5fJ0ZCK1G1GXIapPvbM2HWqAXoWRVEtR9TPB+T3zzBYA76pNsUkppaaVkidTRGqbhpC7RWcpHa9XR8suIKTIyyaZqgqoWRsYm0SA0yQEUFSQ55ZNQ0ZkjkQoeSKkEBUITKxMIwCAF6LdKBwZCUEkgyl5iDJR0yQRmaaJOLjAHcHY8/D9PEIDqoA81KsUnLAEt4HNVk+rMjyzmasCMFUMkQNCZXJn74bngAIgxhBlZr0Qwbt8DczJmUrPYo0AVHVDHQGY+908oXiEqUxSTEQLAgQKBqhFhYSskhKuLmCO5nYdRD86Sg0XdAElFCnL9bpJzTjlsT+UnK2o7zbMTjj73EDeq+j3IXncDc7R755R4MVaRB4aNRVJbUCkaZwQgKvOUk0FXIlbtx60WiTw7RiK3lczG1zMnOwiQ/froYl6WxtUN7GZmuEc6eeBf+B4FwGoX1f+HBOziCKSf7KmMqlaik0xMcQYGjA87A9kHqqqyEjIAqYiJoBtAkTkWNQO233bLhaLxVCCB5OQCdTOHgQDTNG/u+B2G6JJtCCmZgU6UrZH55v/9tm/PV6s3vvOm++9+w7lfrVqn282IFRy/9O/+RsCkGn67g+/z8TPnz45XF5LLm3TQVBkiswu9+r7PgRYLLhbxSx9f9jtdrt+dxgzUEMcWKgwwWK5XnRdauJUyubycjf0RSXGiMDcBM2KhpOO4HCj5N3+Mo9TyaXt2mXomrZBAEKdyuRWTGZStWmcGLAUicFr6sA3NDItZaQQ1ZQoIpOoOc4bQiIgKcXU/Mij4AI37Q89IZQURDIAimQxa5qG2cMCgYGKKAIywNGiffHs1tCXZ1cbAKCUNAZj4hgQgTkenaxef+HOb//grd9455XX7569fu/OIjADqKljUDdYo6ERmHnzLHmdLGkph3H45v7Dh/d/9fjRo9u3jl9avdqmjhgCc7dIh83h5z/7+X//L//FZx99/t733r51ciaSt8MBYHzjtVcMSQYk+uWYv7m82kzWE7KQhMZkGvM4Jk4UkqKpFTdXSu2UNxP11xgBZkeS48+VKsb5sK8wAxhg/Vy73MGnKV/4zfMvQqAYQARFa1WLS0LNGyENFM2p7jlAGeby1noL+XHnmdJERKAFEPHG/crESGyq3WKx7Jaq5eLyWQrpaH0UQ+i6JROsF93Z8dEihRFk2QS0VIpNU7YYUBQjoMIkAGzeyKR1Cq8qd0BUNeJgAGIFnZEW9/iiStXRmIK4ZhTQNDeLjjmIKTGaSs41JggJVU1EOMwBrEVcLe40uJ9TbjHxV7bi67MXz7XlWEdRDd8+Uk6B+r6GGpt2uVz1/WEaBo+oUZrHdaiH26y3IXWEHnHO2CMkoEDiKgrNHpMKNcVb3XRsIgYuzatIPDKJCoISNyEGG8diXsllYho4LBeLtmnFdkNviMAhmJiqEgczDSGkmIwA8zQcMiBymAMu5mXRzMs2wbkADzhtmrhcrRDoulxLLioSUkAhgQI6S9ZmMsvq9PLt6T9r3KrFzvdVZqpSKvAriparhZmNw1imydSIfR8hUyX3P1TiFMx0jldEU/FoB6OwXC4BMGsZdwciFCn9sC/D2A+9SGEiRIoRUFUMRA0ByiQhOn+gWtQzQ1U0i6ApEfveNCtxFTxVCgHA0P98RlMmbig107R/cn118dOffvbNF6/dvZOaNPXTInUBpt32sl00916488b+zaZZLrquv9o8fPD1xcX28cP7FKFpYggNIPbTIEpDPzx68vji8vL6sNkPQxExYpECwQhDSJyaSAGnaRpyHsdxyAMjlyLMhAWIuEkda1DNWdAVxlmHw7BVszZ2ZEFL3vV7NIktqGQmAqQ8WexaBMhSIjH6tEFkKmSmkv1kQmYARGCmuGiTmuZxAnUGO6raNJVEhqgEOI1jII5NBDBDVSiH8WBX0E99u1jEmAwJqWlSu1p0bWoMGEJQQoyshtkshXD77tl7r7/y+z/4zgfvvfrmi2fLFCOS2TxqqYkpESOioWExMVAtxBFEQbHodNjsn15vPv3ok6dPHq9Wze07L774wkuLri1aVuuWAl5cXv7Jn/zZn/zZXzzbb1433e4ncCml5DfffvPWrZeKds8u+/uPLvsh574AYuCkYnkYOGXqkEOYEIrTncRoaGCMYYZ7QH8N9J/tQYoVGbf6jKs4AKuuBwRHdsnAK1CsgpNgpWRzFJyZmUoRnSVPtWS2FooY1a2BwYQCmoKIYMWOHWQnVAyMZsqMOo/BPukisKoi0qpdEvGyW0Tmpk0N09FqebRcJMbE2IVQKIdAkRCKFpvEMCIJgphxABXVXByLMnBiTas9yLWqDjkDIJKhm4IV55vS3Q9gaCpZVcQbI9CHbDDVUrPOASAEVsc9/PiGb8mXug9VLU1N7qnXolV4xtQQvBBmPqIQ1KRCY03TrI9Piuo4DIgsmkGK35nEDKqi4tpLNWSPSTAj5llgBJXl8S+vWv9UqJtfDbUn8pvHRIoZyOx583fPIHjymioqIMD1xcU1YyneZxTQCEADkSeMxhiQ0URcD2dWa24NXNFZV8tqU0I0EwMz0ZhSDFENYkwIaKoEJCYO1d+c9n4R+cgyzzOAvgMR1vIvgJkiUKhqTv9EYJXqe8wbgIk/IsrEVV0FAACMlXRRg0AcGGLTTNN0fHrrxZdeSiE9u7q4fPJE8tS1zVSG/TRoERknJPejg3vJY4i+IztqmYcJFYsqRjYgUyVkNfWQQib2TCgDRQY1wBBrRjRHNVFhIORmHVqRcnh+sb26vNBsq3bVcUw8TVP/99v13Rdfgmy7/WOI6c7L905u33n66PFyvfjVl59//vnn33x1/+GDJ9fbLcfQHS2laD+V/f4wFRnGkSis10cUSGVCgBBTDM2+P1xvrgsUBARDLVlKYZSYEmIIcQGgoGMeejMpMMogYHJoOAZu2th1CysZFCIGL2AvquM0pZjAcMhTFxPFEBjz2IOBFRDVEIPX/uRSurBChGEaVI2JPPXBJLOKmibmGLnk0jQBCHPJQw+GIGDDNIQ+dYflYtGl1HYrXnbNaIQSy0DdWYupw6YlgAJy+4U7P/jeuz/53us/effNl28fr5oApliTat3uCujWWlB/boGMqtCAwKwM5bDdPfjqVw+++Rpseum777z+2usnJ6d5Gtqu6ZYrBLu+uPj444++/OIrAEXm/W5fsgWIEBahOXrn/dur2y93zfHD883l9V975ICoiWYoB4qH5fqMkUCyKQgRgt9/xOyxiGxkIGK1E88b/GqyAjGpiJmpKnN0cs/hVocJZwiHtSY6ACCKFPdnprZFABzHUkpRq6c/1KgJvwP8N/v46aXBBCgiIUYFRSngnCZ6WFqVcacmdW0HquN4mMZ8vF4tF8tIFJi7FJeL7mjR3T5ep4DatGXZRYCpQM4FG5N+0iwFgEEjsSKpFvSeEEBmNlBnI9BARdR9Ey45BJPqZPP5WmdwzDwlQlVxbi3x06YyjnOqNhGLFERA9IBYMKm9uVBPIZ/9PVHqJmEGzAWnahAw2BzPOd8W5KY9Vc15qjoVgMDszJ4B+OQeKDRNBwh5GtXcx+LhSlgX63raMwfQGo1TI//NvDT4BjFXIxRVZuSQTKRoxlIQOMSgYoYaUtQipRSQ+irgnHqqZr6VA3rwmJVSkJhqmCqAGWItzvTtEmoLJ1JgLYqEwzh5SJOZIlEp4mpUmi/USo9U+acCICga3PCR5npZYmbim8QIvImFIJuG3hQEdN7+boyU4NJyNUUiAyUkMTWY+RjJXbc4WR+/+tIrq24ZUtg+OycIZ7dOn5w/GcdBi3vusPbc+S+zaZpIAKAhDgYoMpVpQmrEXPNjXo0EyDX/jmBO2AVidDBOVNSQUwNmIZJCATNhBcyierWfrqfttL/8+//e73/vgx++/d77lg/by83q9Fbomvb4+OjW6evvvNFvfvz0/PEvP/zwz//tv/vzv/6r+/cf6MWzqZiYGrIUzVMGFAy7RqOvkd1i1baL55f73b6figBggclFWc4icQjMVKvBEuRxcHChH/dyKTnLrdNbbZuIQts0HAwJpQgHEMu5mHeXGkKMMTIRIhOXUhCRYhQFfwNSaMbcT9Pob5PTSIFBA0YmUylFXJunHj1ECByAg5gQGDMvl4vjo9PF4gjblXG+c+d4p3mMWAxkHLhZ3D45+eH73/kHv/Pe91++/doLJ23wqHU0EE/2J0KLCKqgtf0NvVcUUFURyEyuL64f33/08S8/fvTo4ffef+eFF+4en54iWrEMo/Z7CkxffP7l9fUVgAHEZhG7xSI2UQ2HKVxvp8vN46/vP/z0s/uXV7thLEXFP0GAINZTvyvD2HTLgKTkfCwhgte2Q3GOagYhsBKb/hwSh0AsDpS7EyCwiriD1AEgVTVxHy8ZoUcZKwBqRoxedQuIBhA4Qg0uqycdVi8yllwCkxcUsM+gtXoMxTyaTYnZ1UYM0KQ2xaSmgGYKgcJqsVouF4ExArZtvHV6fOt4fbJekAoeLTVPTUz7wzgOo5WSu2bMOZpOisxIwJgCkYooEgVmMcFAYlK7g23+aM7ns6/aoLO4UgGJmdgQiRQJVYuJcQhAoOJcGhByLVgAUFHmCuTQLL2rPEotR5hHWPSsaUAEFfMmruBKgplkMfQsJrU89leXWnKpqXU1dtJxJCBEDsEdKKoKRMSsXoLg7uQaLODiyLrf+bvhEzl4u8Cs6AWEkGKTGquHKxgKAEkWBWHmKiujYB6Riq7hBxNgl0hBbYdXNWI2KR4hZdVuA3YTIsWoasxBTYmIIudxGsfB852ZmZCLZJ+jb8D9ugUQgdUENwOdyzBwtjIagkkRVeHARB6F6Sl4oZQipgRUe4c5VDDUu5Hn1xfNVbhWcg6J1AQx3Ltza7Foh8Ph4vz8endVpkk1X11dcUiiiojEjApFtRZWoiEyGyKTmTIHplCmvYyH2KxiYFQAVfZH0EFcJDOgSGIKzA7pgZlYERFA4MACIAYFCDkgNRohJbJ+u6LmD/6D//AP/9E/aJddf31ou1XbLQFZ1ThQWHXrRVreOrp19/aLt++99fZ3fvrTn3325Vefff75uO+5SzGwJVQ0maYCktqWQ7NeHy9Wx2rP9vudKoQQ1MgMY2gYUogphkjMnCCUXBKHEPv+AFYMdMy762sJjGCny9UypmhFtEgMcd/vFW2f94GIgJoYY2oAJFAKxIhUxtJ74s80TuNgQP3U7w6bqUwGXKSoFN+fwIyIVMSARHTKZcqFG+WmWSyXhJhSXHaLJrVtiiqZNa9W6eV7pznCo6vr7ThO/XT37PRHv/m9f/i7H/zWWy/d6WIbGFUNFYlUFdWnOEMTNbWipmIqnBIxGapNWQFLludPnn3yyYd/89M/ixCPj05vnZ2lJorkpmuvLp4RMDEvj45vv3ibQRN2p6cvvPbaa/vr/b/6F3/8yeefEdGvPv/6r37+s2++erI5bAtkR8AUDFSZWIft4focGHm5Yg4iZqAYGTy3BzzFBWduAhDRwylFlRgUzBBDiFozmtD3Tp//pYpSKkXnojz/eYFAQab+AERaZ1rQWrCKhFwTNcVEIXBEn0MrlI3E5DEwqDWEGgGlFDWIIcQUm0W76Lqjo3VACkhnx+vVckEEKGXVNXfvnB0vm+Nl08Z4HZDB9vtDG4Y+RTCbxlxWiygSc8kKY87DlBNRNihaBBWQFEHEhz00RFN1vaJ55AwhGBlooKCmhhqIBMwd61onVz9XDJlBTFQ8ZUBE1EEX0BjijTrlxrh787c+k3slA4j36TIwmJVgpkjhZrWoLAGxmkLOVgTrwe3DO/p/r2AElktWUzUjs3rj+ldwqYz+2mVXlzzwWwGJ5lFGCFxjD8y8PD6Wksf+wLE5uXVycXG1v9oQGIbagYVEOOeDgIsvI4bARbxkBj13ODZJwcQLfr0MQz3VGcCAiSn4EwdFlRSQSHMBcH8QiIrfEFQtBfUS9TEZ3DsG5tcfERExICpZ2y6kaNGMoL4mufInhBhSkoI6DhSwri8KZubJiWhE/G1ehwOX3ETHhZh5kpxLvv/wm/NH91Ut52maDkUKUgixqfny5PgAqMdSIIuYPw8pJkIqYLnfhsUpVajRVAuHaGAKwe9qkyohgApQ1fteEVTqEsgxCtoogLHDQKjl1Xu3X3315eVqmacJiI9u3w5dB6BahImBwEwJ4Pho9e5bb6DpsB0RQ38YHz5+3OcJiJDQVIwsiy54lZquW6ynSZ9fPq8hHwhMRBARA6jlYSycQ+QAHGNI3DAQCAxjD1jAssB0tXteSo78Spti07RgEiKraJ970Tzse4rt+mg95FJkJIBAzESro/XV5qof++vtRq1cbi8O/a4/DESATEWKq0Da1IhISpyaxhRLKWTWpSgGVkSmzDFC0VKKqW13WxBLU0nHt8+Ojw7Mm3E8f/6gWx//4P3X/vHfe//3vvf6rS4lU7pRh8y1zzWXXAVNvX4brMqB7ObUlDLk8cuvfvXFZ5//1g9/vF6vOQQizKKitjo9ZUWF0C6X291WwDByP0z//T/74/5Q/s2f/vMH9+8/e3p1cfFsryMAeJ0LABbL/uk1QLDpsH9aEJcc2vWRK83AAWt/SgQoMLFXM5kLH1zyoCKmikQxBgMSExXF2jcF84xlQK6ZRkAE9xy4OAJMRUQ0xhhDVNXikd8OSSj6IeoGegTSYhSZnVmozibyRhkmKrmEpiGzECITtU27Xi2PVkcl50SUYmDCRRsabo6Xi1Ubb52sb58eqZSAyqrBFIqgydQ1OWcIIRaJkwxFzGAaJqutGZbLhMg2F1sC1e8HFKQogAYOaioqzIG5Nnyav7musXeloh+eRAhYqCbBObFeMXNXNM3hBfBrkqA5bqceweqOAE8bVTOAgExzDCEYADM7dSnOIZqblsnAQL1Rwa9YKSVX6VC9eYiI1SrFPmdB0fxNgCko1TQFNTAEVzg6UiIqoiIlG7OirddHv/WTH3/4i48+2/zCCmhRlzI5t45VKeXiMe9EVwMTv66sBiV5IiLRPJeUKk1w3UdNqRczAMbAMaa2QbM85SITE/sLyp7LreIB1Det1gYGTqECpCblPKWme/GVl3dXV9eXl3lUFY3emcwBEMY8gCgyiYjHJBiagAGSmTIRACgoGXnOBiLXTc1IpWyuNrvrDTAd9h6ADAQsRZEErSZIESIymRNBVI3N7ilB5pjSNEge93E8xKaBolIKRQLRKvyqtBQiqjNJqISESKZSq3DMRA0xMAfqt1MMITNrGdZnLzQxWjFKSBiJIwCqyHTYFyYrkqdBxsOwO1w/v7j/6P6mvxzy4eTWyeX2qr/MpkqRWVRUKrdnKMP0q0cPHj74us87AkZhZALEFKNIBhEDEEGdSJWbpo0ptnEx5MVh2E0DFB2HYUemF9dseGu9Plouun7sDWnRHYOmg9AwDNvdRkC7pomRi+QsRjEowlQmM5um8XrzTETHPK6XCyIMMZUiCFZUQgxGhMxidhh7wKpI7ve5TH0Kcdl1i7Y10DyJZZ3K1To0zer4bLU4OV7x/fzdd175gx+//6PvvHGnSxHMRBVdwljXeAOvFiqAhmpmhQCQ60rrGLIUGQ+H3X775Mn502fPj9enTWybrkNmmQoFbtpl27RQYLPfXl9eAMiUh5//zU8fff719dX2/PzBBBmBGiCABDABMIBgPfrrFMdkZdyPcNGsTnB1zIAiAkQVlwYwch8IGIEVR1nIVDF4zAVokYIAyEhUKQ2XTrMH3OiNdn3+4X1HqDWHJMbk0c2AwB5gfvNCAUIIzAZgCBTEvMoZ508rApiJCViMkcDFOKgGgcPx6iQEJtPVom0it4EWMXSR10046bqjru0Sm4AF7hm7wNI1UjIcLRGB47ifpsCFMkjh3MRxmkzMTJhr/A1WKBhqyL+fiOSNnuTgq3rGG5qaeDC193kggKkoVS/vPNObopkA1n9oBrP2v/KcQP7wuNYb0N8pvzjUtEuda2ODzZF6N4AJICAhE2MVNJmp+qtcIx90lg4hgaGhiClW2eVNZim6vsobGMw8AEx9XyOmGoPHnuAKWgyJ9vsdIJbSm+Y7q/Xm5Ze+/vTTSUbkgCpOqvskjnWM9hfDAXiPbyMVUVG/d9CoCuIrK14tV1jBSajhPCpIvOgWCLiVDWZ3ShcMTsF7Mqu5ot3nGlVVhICM3s0LGgjefPUVffmVn//8Z1fn5xw4xWRoy9VRDGGzu95vNl4NWt+tmcaYJUaKXhBoXiLrXhUKiVXLNPTqeRQARBRjKLlwTA70e9Ms1UIbvzxcl4Euv2V0EB8kj2XYNOtTj6QDQFPlkCzUpcqrktUckCUyAJ1HPEOXBQdjAm4b1owiajmnFI6WK6bAISJWket46B9/9c12s5nGMoyTyqgiz87PP/r0k5//3S+ePb8aRYoIMgMoIwAENaUQiAMRXVw8e/LsST/sq3bbFBSRUbUQqgXwZZPQCIxQGSkgLsOCmDYqMipYHqbhYnMhZiGms9NbADiVgYCO18dMTGmTRaaxR9PAqyzFTA7DwUwRDQLsrq+LCaAxUlFIkQFBTCJSf+jbtl2tj8axHA799WYD7IoTZIIuRWjbiKTTGEAWy0UWE4Fpv+EQEzcNyHtvvPKHv//Bb7//1p3TZTBAFZjNS+BZyAgmZmI6FbtRoREAMzhBLxkM8jReXV4+u7h6eP5sGnLq0nK9DE1EotQ0HCJz1EmfP7r6xc8/e3L+1F/ni+fX54/PDQRAO1j/vd/7vTfeffXLL7/+5YefPn3+xCXkiuKeA1NTNESTaT/sLrrlCXeL4OcEoFGsmA74k+zuUwBzrbUHeCKxgwNSVN0lWCdTIgDXY1TtBs4+AA9NdF08MyCRmpjJfPJrlWaoMgWHVV19CwaMNVWFiP2jRGwq3vELHCKCtW3HRId+t4TlqmtX7WLRcCJoGFumo1V3ctylgIHdpWwxYLeIClq0gT7nEifJWVEbVrQphbFENSWVgGwIBpizVEutGTN5CryY8px2b0QhhDyOFDzIkhTEzEIIgLXGDAzMathnjMlUKm4OdVzwEwq9tMoryOor6DzMrB/wYZiCmnIgsBCshkqAy1NcMGQ1rnsWiUPFC9QXKkewY/Rs+nGcmDCEaKpaH+I6NvgnGUzVqowXkZgYCEGBmGIMqgJmTWoCk5Q85cm0bDeXf/fJR4f9BESKNEt5yAvSEGaZF5EnqTsERdXN5jRmDauqz9KsTCZvjgBwdRmoMVEpJYSwWKyIaJzGcRhBDImkqAuIrWgRCTEQETOWUpgZRMAbLUVLkSh57PuU2sCBmIjCOA7NolOw2CbbeRo+gpkUAVCkQEQmhkjMnEvBGbk0NUUxU1ENNdy55KmEGL2aoJgpQKzRGvPJAwjOGEIF4xCxqEySE1DTrTk2Uoapv17msYnNJFi0UGwEBBEUuOZQuGpKwAI5JWPoncmQYgtgollGYY5NE0Snoto27aptYgyAToMagpUpXz+/evzk/Pz86fPz58gWEPKUN1fXm+vdV199BUTjWDBwk1pAJizMkWPTtMsY0+Xu6vryaZ8PCGwGasjGqqBayIkUDohAhCEkR28QtUvdYrWMbXt1eX7YbdR0mobrq6uj9dF+OESi2KVpnJoUT5sTPuAw7HPOqhKYFm3DHAsoESxXq6vNtmvWMhYlTW0XOIbUVtu9ipqJ5O32SkV3Q5/LlLBFUlRNqVksFimltmtEyvXVZrfrV6vFYnHcNAtgwJZfvfviS2/96A9/9DtvvvBiC+DhNQigqq4RgVoNp6ZFRdDrr8nj1QTMTEXGUcRM5dCPT58+f/bkKQg1saWQYoylZDULgGS4udz903/6z/+r//r/9dWXD4mCC+MITYxuN2f/2T/5T//z/83/6s4Lp4++fvxP/7//4v/+//ivHl/cFxDnKH0dnAtO8rR/vr9aH6XXmkVXvCADa0thPTigJhJXGgmptlM5zFyfcY85m12WiCZS0Ubygrxvy7OgesqtRpy6ooUQjUTE7R1OiItmAJj99krMjo+ZejSJEpiJy4hKDFHLOA2UA0KKwy4nLafdyapNR4t01LV3To9OjpfLZdN2jUzFv1YIJKr9SKYZQZkgEvRltFIYNRII4yIFMcsqIrX0C8DUlLzLltDUCMxEkIDM0PODXYqJVOaD3ebQMFc3oQJxFC1OsPvL6sQ4oQHyTaG671E+TLom1bdJNDAF4JqMpoBhPh8BwIDN8TtQqvKfukjUcwmhxhsQY2pSE1MuIlK8/cDf8SrGMkTXXRMhkkkGBWZGZA8vEhMQMfA5E4G8jMuY2BDGMX/4yw9RQUpmAjDhwGYzvmUABEyhhqSKePapA4g0y8pc56M3/42iWa1gdXDSi91V1MM4SymBSLISYSBWAxBzrZkAxMCEGGIAAmYWLaIWQsXHyCiX8vHHHy7a5XDYhxgZWQRVddjvx/5QSvanvg7pUDkZQiLkGtgHAIhzCDoBQHAmGQEUAjO4y1vEihBSHkdAmlsZKsPlKJXncYkWDgFNI8WJI4co5VDyIQ9XTbo3qttSyNCZanXvp5nVbHar3IJ/kMjEP4sRI0UEw0WbZNSx61LsmpT86jIVU4OA3bJ99/vff+n1158/e/bo8cMnj59sri6f7bfXQ2+BF+vjcRq1n0yASwnBlQISKC6WR4fD8Oj80eXlJQIEDgBEwI6h+rqDTAAUYowhuIDHaieVkdm660COVWXot4Y6lO3l9bO261554TUmKDmDQWrDSVhf6tQPeRh7JlguupjSuN/2uTRd2zbNbh8gkkmm2JghEqppNY8QisqQx8NhbwopNcuu4UBk0DYNBx6LSD9k0ScXz5umPT07W6/G5dFJd3baRfj+d1774Ld+8+3XX17Eapb1/Y+qktdAtZZdiagWrjuvmSoUMFQtOY+DAeUpe1zJlKcUm8M4IbEZ5KkHRo6MgR89Pv8f/uR//MUvPhTRkJKUImJqxoB/9D/79/53/8f/5fe//12Y8lL0N15/6f033t5vt9f5Cucz3GqyGyKiTPt+d744Po1NEhMkxlCjCIhuSmjUwGZ/1izIrliR5zRgSlGrhsrDxglMK56MOMv8aXZWmlsKpFbigk/KzEwI6F0w7tFzJMUMCUOI9aNOzhUwNxERETA1McYEpky4WnbrZbtO7dnR8ux4sV6k43W7apvj48Vq3XXLFGOEJgJavw85M0eiAAallEnGHqQEtIAW0bpEAGygUykhxWkqZOyBzGIAXgKFyB7upopmIbJIJiR2bWjOsU2oKKAKiCUzMbho0ivRHVUXwwBWF/06NWK1ACHT7H5w/kPVkAHBu4JFVYtwSIgW0Ey1ANYe5JnureP6jJR4xrS7fIOIqpiJFdJcitfUVUqayAviGbDqltWJSHDUAtGIyNPy0IOPERy7RwAKiEagqADDZo9QQ4EAKtBTdZm+bSIJVMzv1zVH9dLDeg9grTSoRLQjUYYOMdZXnYhKHq8vnocYRQshlVKfMzBTsRosUq8epMg6GTMYQJkmJE5NJ5KvL692tClqMQSOkWIchp6ISp7QFQuAZuLGEF+s6vUO377eikp+AVTlkd8NxEzE6NSMl91nyYQBEIADe6SHFFfI+jXnKWyImFXaxWqxvjUdtmbTsD2Pi+O2XQ5ZvCxZCwApop/2CGbAN9+fmRZA1KIQoUnLJqbYpDz0R+sWJt7nruliDMGLjkUFgVAhdm2KzfpscXb3KDW4ubj44tmzzz/55OuHj548eYZMMcWQGlGfZ/3IAFTMOedpvLq6nqYJgA2IKJh6QxAjiqlKgZCQkUOIiRMTai6IBLlYwLZrbbkeynQYDgEYIG9213weunZ9dnTUtgsmMitEuFgss5QyjNNhmlZDs2hTaqd8mIqdnN7eHob9busfgkXXRAooxdekJjZSioGFwF27CJRC4nEYVaRIyUUOklU1MhJQ08aLq2eLxWqxOvrBT37vpVdf/N53f+O1V++tmoQq3oV7g50amGlxns6faULgwGQIZkVMLQOhDKPmgsTTlLUUP/aQiRokpv1uJyWvjpYGfP74+b/9kz/965/95Sj7JjZMqKBEpGLvvPP2/+I/+Z++8eprKsO03w6H82XKr9679fjZPTzHUUZjdOWIFkE0I7Uylv6635y365OYEhJPUsAwhkAhqBQEVEOrBeiI6KQygoKqD6kWUzSrhVnOEBAQ1JS3eYWti4S//DWuGMyQmAiYKIXkCHWKiavXm/2ZFyme/waVVTBAI0YvqyEKMVDbpNSkVUp375ydLBcv3D45atOtk9Xp8apNvGjier1oujY0ESggWAe6PizzNC2apo+pbZq+H9EsAKw6LxHQIZchl0OeFKAY5GI5i5iUXIqIFjFV5KqyMTUVTU1S1VKKT4ZMulqtiMPu0A/9nonBR1XDkJgAiMLsbiJT8XOkAsrg4dXgGZ0u6gYDre3zEGJQU1B1CRATBVVlYk+gtFnt6CC5v+Q2JwQ5heG4XuBQSs45+6e3DqwC7q4gIt9HXCdnqhWUYfZS45DC0a1bZydnSLTZbq6ePi15QgSiYL42Ec2EgXpulIiDXHSjyKxbSc0FrCibuwQBXfpEhmYFoHrw5vm62h5ucvMcUIRSikip/fBct8y6y6pbBIzMpHiEUxW6IREzGQIQajaz4tdh0WJi4H4QCfP75Dpap12rxQdY/Q73P+3XmvbQVFTN1ICQKfhYj0Q4a5AAPWUhGKNfwX7+Q9W9sS/GBbQJoVms4mKVDxf9bkPt4/XZmw3HAlB08ksVAYnYs/nq1lnpHiBADmyiKkVjGA47UiDFGoEdsW2T39OcEioZqIkiaCkaGE/Wi3ffePmoo9sny19++umX6+b55fX1VU9gRiTuiEcgYmDabA/DsO/LqLOOy/kPf9FQ1c13OtUNiow5tcGzVEVMdBwGAlh0qyZu8tgLYJkm2l5db666rlu2jcgAqoG5TWyrpYxjGct2u6cQTk5vI/Lw7BqBmpi2qmaFEI6Wp4E1j/tl2zWB+6EXFSZYLI6XR+spl2EY9sNht93lIgo4SQlt8nq6w27DiMfrxQ9++3fuvHDrnbfeeOPt1xZd69MJEhqiFvWUT1DRKXtWMhKqFCQCRhMz05InM1VGnSb0IzVnK1rGMvbjcrlcrpbjOAzDYGqPHjwH23z88Uf/+k/+9ItPPgaYpgzB5rpBoHv3Xnrpzr3Qtvt+ZyZT7leL+NrLL55fPN+X8XJ7rURqRoLZJjAv9hHNw/bqPK3P1rdepJAUJMQk5uQVIvKMAIG5DA5qhbgXhUdmMy1FoIiP+TUR2R/zOR/YP3izpLGmpQQMogqMQORtX03TACKG4CO/51EnDP6VObBPxxyqYpsDNyGu16tFk5oY2hRO14s7J0evvHh2vOoSwaLhJnLXcGQkMmDyOrnYtuuTo5JFlYZ+BKOAcZGWh3EqqmMugrgf83Z/6KQd1aZSpmySrGjJpeSp5GmqDyyCihCzqZoBxyZPoxQdxymmGGNkDkSDD7IUQs4SItt82LlW01R9+9dKtSpxEP+yLldxH6qnLKMAsqpSZMseJYKGEJhYimIISPXgtxrtjABQzxqr4a2EpKBoTuF67aAgQqBgyAAZjUSLgQn4v0IGdvZV1DsTlCGEFO7cufv9736/SfGbh/d/vttupwMYasEbfsMQ1FO9EIEBFb5NMvITGL+tJ4Vvdf6VZJ95JCRG9xs6PuYbw3z8m/8qgsQoUghJXBUTwk1vi4fG+o3jhmUrNhvzDPzKlOKRreRvsJmIgBij0z6eUFR8uXVizRGbumL4PkhejIegUPdeJ9YB0FCkeNyKeti5KhKLSqIQmogUcsnzhOUmGmMOLqghwwIltKtmcZz7LZhOu4uyvB2XZ4AIJfrjwoGcnVMiJ6djjB7JLepNUyRj7ifxu+G5XEnOw2YTmoSBZ5BRVQ0Dg/mjFwjs+NbperV47dUXX33p1TfeeOPTT7/85Muvvvj8mwePHm12+2EcS5kMlGOQHu2w3+9349AbAJhDYA6lFjMVKX5NgkIuhymHgHHRrSI3TdOBIQHKNClaE9PZ7TvXl5dlGtRykXJ9uDzqj5ddakIKCZoU+v1gyU6OTjab3X63a9skq9J0y7bN17vHRbKBTpZNLecSA0kWjMW1Z8RhvVp1XXfI0+X24mq7m6ay3Q+iElMiRCk2TZkiZzWF8sbb3/nDf/xHP/7R777z9nfWqwWagUlVgJgykSGiFhUxUa1Yh4OotZhJisvlikwmeRJRRRr7abvbXW83m93wwvpYRU1p0a2eX1z93d/+/P7XT86fPPn80y8YCSwGZDIp4JntGKiJYbU4Opku9yG1r7z3LsXm6/Ph66fnj662Q87ZcCqTFMEQCQIwAWKeep32w/X5yemdtklmUvJoEIo/RR6iUacU85XXPxm1GJ0QjCTXiEbmQEBSKX2aE0JvoA0AUI/VAgeYPM1S1dSIcJzUZdqGCCreVqlggZlDIHY5H0kZESEyr9dra5o0Bsn9yGEggPHQMV0+52G7aQK1kdartqyW09Cvjo66tnWtLQKFJsUmAiiAEWNKMbu3LWcBIKQkisT9fn+Y8jjlcSpFVdB8sMxjRkSXRTle4jQvTJNq8VpIKaWUMuWc8wR157FADG5fQFQTzyCgwE4auaURa4YSmkJMwQSKFlCJsVGo8z0hWRGtme1BJAcAZI5qVoM/FciluLU/DyqbbOYaIa9m8LTJKtgDUFVAV6Ri1y0oRBGZhl5F0VQUVBSZKbBlEFUQefjg/jTlRdNs95si4hguARZnvtAdiAYGJmLokbBOV8xzqcHMUM00hZOotbPAqW2rFXRVjepf1CU889Rxs0EgAAAz3YDoVefsHj8CIlbR2b5nziwh1jhrJORaA4n+QUUPp9XZ0D8vK3V7IUSb5bIORuHcwYBgUDU/dV3we+tGJyeeDUDsg5Ioo0Xm7F9b/YLEWg9GKGIxhLRctMPpsL0s07aMh37zKMSWQ1NU2FCBVX3uZyYwwEAcgQFAff4E88YJ5qAA01T0kKUUwrA/jBijmLp2FrXGgSACJAazZtXCInSrdHy8un129NLx2enRyVGzWHTtg4ePnjy/vL7eCZYYgg37wzhO06SgiNEcSTZUUyzFsJo2HQoTm0SIiMcytWm5MIuhaYhjbCbJzOHo6FSkbK68zGW6vHi2XpzcPjltFqmUoeQpBiqKJ8fHpnQ5TdvdAfHp0dmtGJMU2PeHSQcDO4z788tHd/T2yXpleTgceiy2Xp+k1BwOw5PLi+fXz4dcmBOEGDQycNMEQ9NSurZrU/vGq2/8x//Zf/KTn/z4ze+8vT45Yo/O8QhxvdHzqYmaK45FrWKFdUwwVS1ZSynT5Mj2YXeYFK6uNo+fPr//6Px6u+3W3dXllapllYcPHv/xv/jvLq/2//jf/6Ojk5PQtn/6Z/+aABgDgQiUAM2US4wdcmyaZQtKqyH8yrjRW7eOl8s2XSeZJkYuCIEJTDgk8Ok9j7urJ/urO023TMQlT8Y1Ipr8YZ0jDObDp2axqFYpDiADKM7AbIXAq33JH/xqwIHaklQDzMD9z2RIWIqw7xoOrahmp4sNhDmIuDVB3NiPCEFE8zhAT4ygiyYYUQ683+/Py9g2MaIuu4R2xkiqslgtwBSRfdIuOeeci2jJZcp5GqdDP1xvd30uYjBOMpkOU55EdofD9fbgIrdcxADUm3pUqfirgqpGRFIKE+WSiSiEWKRstlsKNUMJmE0MmQkJ2IE4AANm9mA48swxUxHlwMgUQ2zbFgAPhwOYigoAxSYaQNd1U55sHMV9WAAhchBzMZIPVTcNYF5Eho7Oeig0IoKogRZxpAKIuUIboKIaQlodn6yWq37Mz84fmWa/Viil+hSjMpGIXTx7dnX5LDgCD5xi8EJzUOAQ3bdh4KmanuVUR+KqaDK/dXDG9itkfoOtm2M9Np/+7lnAOT6E0KzeDUiodbVwFzERzud17dQGz0P1L6aiPue7+MGqMtlPPP9Cjg5J17SANI2Ds77IBN/us1AfbvL9mGxOk/BHnBAB1bt1b8LnZkTUx0FDBQoBDco4eToSIQMDMRXJrjJV01IBYjSD7uisTMPm8dcq/bi7iGnRHd1bpEVxasgISlGPU1ckDgGTQDYVcws0IQVSRSlKFDQrApQxj2POgoxkaAwEqbpfoIgN/XDYXV9cDPv9MBzyOB02+8Oh75r25Xv3JhEAy2Z5kjGPMskkeRoHBAgYgRiBDQhMiRzZJCAMTAZWVEBUtKhqLqXkSTTHsJB20S261LSBSAmX7VqWdp2zQRmH/nrzbLM5Delk3B9AJmRgDtlwsVzsD11/2E+H54rh0I/FiogyBgAYp2y2XabFKq3ZDDSvj49CitvD4cnTJ+dXl4oWYsQQE9U8+GEYj0+OXn7pxZOz07OzO7/z49/54IPf/s573z+7dYZmItn12oBgohTIRAHEpAAIgJL5TOtXMpiBiUiRPOU8TTHFksvhMBSgq83m0cPHX3z91e6wb7qugD6/vG4fPP7ok4+eXz//3hvv/+Hf/8PHj57+8R//pYFlm9AiEiUgNd1cb/q9AkC/HZ49f/js8Uf/6k/+9moP5+NuV3pF2+42RMmIiIyATCWkhRnpeK3D4en9j2Nq2vWttusmBRFlru2ALk0zg4phIvsMyuz4PiIZIjEGd+qaQfUmAfmI+i0N5vR3XYkRDJhCVcwyqQgQOqFNITGSmZhaICYORKhFQ4yB25Jzt2iXi0UT2nHsyzCksF4uOmMeRXDUcZoSYwixH0tXpBEdx6mdBg6motMw7q+3F8+vdvvDfhyvd/3u0I+5TMX6sUy5bPthFNsd+gkxKwigGpJRiCHnoiZqQsgVP2YC1TKVCuADgoGIilgpmQoTE3GE2uLr8nlCUm9sFBECdtSjhnISqmjggMhETIEaacdprKKMIm3XAXJqm6lkDuz4ahARQwqxqVOlAROpgagAuJ/VEEiycUDvD0FEZCRyLyCAqYEhk4c/SZ5KEfDoahZQJY5QA0UNkThEMhUpBGSKoIIcRATrooWIqCJWWWRHSwAMqJqSQZweqhM9zlbimakwJ8CdH657o9ZQh9lHgQBGtaHRwUpR8BsQ0EXPFXkBuJncnb9Cd015/DUC3ETR1qKEClMxMXMIMYqUMo6qRhQMTE3riDJ/rj1BxbTm/3iyrl8OCLVFAOc4O9d3zfEWPmWBaMmjzG8Mign4jQIICDEGJJRpUqOU0vLoVhnH/dWTMg3b54/NwuL05RCbYqpF1DTEAAAhkEoZ1JBBCbxpz4s0tBQzLFMJSBERAu53/eXlJcKraOFwvemvNofDZnt5nXN+9uTp5ebq0ZPzzXZz6A/T2Jexn6asSJLLOExFpGu6brGAEfdDb2YxNCI3whi38hEChBDAH3pFDhwRzJJoEZFSctF86K8pDAYTkK7isaoi8GqxVIFp6GUvCvny8unF8a2j45PYdDJY24Qi2Qt/QogUGlDLxQ7DOI7FX0BmNkRROfRbvn1y1B4Nu02IYcjD883zi/21MZoBBp6GMcZGpqzFXnzh9j/89//QoKTYvP3e27/xwQfv/8b37r50t9YfQZVvEYAFBjBUMStWioF6ZmTFi00BzIpIKWXKZZzUVETHcTTVi4vrxw+fffbFF0+ePAwxcki7Tf/1N/evNs+uri+++/4H/+BHv/vy62ey2x91nUFRMICUQqMgWvTZ1cUvPvz0d374nZ/9+d/87U//8rOvPnl0vjkoPr/YXjy/vL66mqYD0AE5BoiArSlyxNQumWF/eD7tN08fffVC6po2ERIgqUH1LVVa7tv4L0TiQFbECWG3d1RTvX8I57QC0nro+77rnzJwO8+88ru8Q1VdaegZ9SqCc6O2QM3RVtPYJgRkonEYAY+RsD8MkUCKAJACTaNCADLVFPaH8eTIctZhyiUXK6JWhu1uOAzb3WG/77eH/nq7v97sD/00ZDkM01T0MOb9mIepFORhnHaHfpICHIwQib2ZBE1V1PWvIsYUkNBpUWIWVVNjjqLeQEtqYqq+j/txhx5g7ED4XHJA9TJ0ThiL5P4gzKGIIhhRcIWB+B4kEoipjWM/UCRP+NEyjW4tISQ/ZwhJVJxTdr2jA8qkCExiivXltRqJaYjIImVzvdnv9+BoCUCIjZm6SkxFPaBI1WJoQiITUMmuXUVGN8F5EijMxhA1T5UwdWUi3ijNyME4r4WEGeDHecx3e1yFIxUrkGxWHWG1qgX//1T9+a9v15Unhq1h73O+w53vmx9niuIgSqSmUpeqpKpKd7m77XSXG0l34nRgwEEC+AcD/jn/iGFkBhwDCYxuOO5GbMPV1TWpparSQEklkuJMvsc33fE7nnP23mut/LD2uVQKJYmiHt+7937P2Xutz2hgZN7Mgh6naa62UwD0emr0mFZTzxdy/SaNDEIVPflI78c/VzkqiIwNM2bglxA4vObzjHed+nPssdNU81H8PvFhnH1fAVMjZiCGkr9Q+6p9EcCH49aCNTCPAJlIJMfYlFyUIEzmO4e3VWy7eCxp6BdPOMRm53oMTJFFQFUjk5HXNns/dxVkeBCfebxgQAALiM3OztBtPnz/w+dvH4OWe+++98mHH6yXiw8//WS56h88erS43Dx8eLLaroG0aAEtRXQymXCApmkRSATUjCdtBC3bImpqChCgEIUQAnsSDgAwASgJAiC2MQI1nkZVSh6GnlA1D1tVNcPAuzt783aSS97d2TMl5GazPLEM55fn+7vHh/vT0DSOuACYmQAGQKImDENSwaHPKQ1IJBVg1dRnM9vbPWqbZtVvPj97cnqxWHddO50QcCmiUlICRt6bzV7+6ssvvPLCZrE+vnvr61//+quvvXZ87QYCQM3cVtdH1PHC1KSUnEtKWENyXJ2tpmpachpSNwxDnySbHwwAuejjBw8//ujTjz79ZN1vprN4enb2wYefIOEzz918/bVXbxwd3bl9M+dBpbQtAzBAMQJRERBTG7bdT3/6N1FWf/mDv/j5r3657XrlcLFZD5t+03VSigPxVnqziUVEiNCnOJ+FuFc0D5vLbnm+Xpy2OwdNjLkIMRgTgIGY0RhJYFVkgIgY2ACseGwhjXC/obt7oUrVRw/y6EIYd+uKAagRI5gvpaMsBGsvBoyrfSnCXAdKUWUiQppP58dHh303bBcXHVKel0x82Q2TSQgAOROpLTebpsGAs2Eo29UmhLRarLpu2HSpS2m12V4u16t1v96kbSqDaAFcD3mx7QxZwfqckWJooqrmIshiCEbsVlomNDOvjfe4fkTSMb3AALA2y3lKjqvYtcZBOboBVnOUPTLSj0sP7hMFhCEXoMzEIQYgVMkheHjRIEVDJAptbKdD2gY1JYxiio5MgQCM3bLs/QPKwas8EMCIPLLf87wRCHD8mCmwFlE1sYzg0TokoGbq8h4kBEUV9ZpLqNVjROSZDjRKNKvSR6tKx3fgemrbaOka+VGolsDxVxJ66wDA1SNkME7oDto4sTG6UPxsq0/RVaa/Z/d51i46HkscPKoTq9qpfll+9NeRh0BVFYwplCwGRXJ2oMrTjLD2RNRpRvxolVHgBNUM6TOR/1jMIBCr30pmjDjqBzx6wxAwhCiipqLkw5FiVVdjEfFdxhhzFggxTKbTneOSc1qfDt1Kz+/PgSY712LDghYAvRcFGEw9NMTz6QAVPKrTAJgjASDjdLb3+OT0L3/4V+vTR1a2b/3lDy6W3cX56mK9fumV17bSLvPlACI25H4QkawlF11t1+YiMURGnM12AkcDErHaL4XBzJU/wqDuUDQF5mb0J1EIFS7wrUVF1CCXBP0mxDhtJjlEUw0QZu005d3tepF0fXZxenh4dHDwFBCZlDZMgDBnQ8zDUDhiSrpedSmLgkYEcMUFsqIMKSMxIPd9v1gu+iExUy5CKkQhMt995u4f/P53Pnz/09mUlueXt27ffvWrL7/+1dcODm+gx5ND3eZ9gPC7FVQ0F/9/IsSmAp6mBGaaBUQlpZKk2/QiEttool3X33/w4KPPPvngk0+6ssVAQylnp6cvfPnpO3dufeMbbzbTZnV28vhxv9Jh93g2n01W265k8b1ZoGy33U/f+tkv3vrhvc8+Ozm/2Jnt9qrr/nJ8eQgAWNEQJPcITEgKiLk0ITTtztCttJQ09GhS9T4AzOQ3uAcMEhAQhsCIZFUhgGP6iLt+AZGQPPVBpXbKV6bMX0wC1DFOWNXLAPw3BhP1TGCkyhHURAC9MiRbTkVV2qaZzidINKSS1bZ9NsPlcitFc9/PZpOWMDWBCqx3+935tIiKWt9nxpJzWVwul5vuYrE6v1ytu/5iudkOkrL1ogVhnfKqS0icTcxg53BvtrN3dnYm6y0hilSggYmr+oP85wNoOGpNfBQA/4ZVZeQDDQEqmzp+g/VmhQrA+4VHVOk7c1kigUeuAmLJ2VsVwKsJTUoWQwgxhpI9sLvSoOhaa2dBVU09OKeIv44eYDxCFKigWrtKRYUQYxPVTLQQEQJIKXU4rd27KmARA4CagFpx4nQMflJiMoe+YRRp4vjX6KnLVTJvV4qAKsfxRQjrfWgVZSeo+wF6jCpeRXODO+6hEq8Gfk1AlYlW6J1QzQIxEYoIjAJNUvWgcyPkWrFsFcT0493MZTngie2u8wkV0fL7/krlFkJQNRFD7/5zjAjBVIsH2HIFsgCgjDcOYu0LCxxcrwVS/eJkBC6fVFQQQA/AICZSBAg8v3ZsRAsrsjnP28WW7yFC1P3JZKaIItLnwiE4GaEuiWXUImAAohQiElouFkJW6bfbn/3sZ48++fWd42Nsp9/93nfm872dnaN/9I//wf5Os+2Hyyenb//q7Xd+/Yv3Pv7go08+vvf54ydPTtfdAOjJYLpaLglIAQUEITjqQcAl90xm5H3LShRYIcaJewKYKtOMwIyNqgw5Seny0G+Wl5FD20xCJCiyvzc3tpQPLxc5l365OFvtHx7t7gyDAGkzazGgX9BDTmCU8pBSb6DiWw8iIq2HdLG8XGz2U9cvV9vtJolanESVmrV+eO3gK69/6dWvvJiLPH70eDKZPP/SS88/88L+wREBqIlKDar0jdVyNgZNBUw0F5CMZoyMI9wBZqoiKStqUd1uN2cnp4C0s78rIov1+vHp6Wf37508fDTdm6lgymlnZ/fFZ5975eWXj24cnZ0+Pjl5fPv2czdu7N25dWc+31ltNwA8LswYmna13nz20Tsb3QIApziUNGIudPV1kqGZqQyGIcboYWLEkWa7yM1kvgccqvTPDOiL2i+qCYV1EnMnc0WOocrMq33MRNHflJpMYLWiypUm48JcVXFYM+Mc2EUDUHANHQdiQnXcCXTsf/UWhZzlcrFcrNfL1XpQlWFo+8EIyyDKKSGKSiRcd10u+8Ch7wYiLCmloQxFlut+udquVt1q3a+3wzZZypoBoQmDoUVWRQOUXO7cuX3z9u0f/2wDqxVyKymbFQPDEAMzjNliSIyIIkVUa4A1gE+wfgeaKZifUVZ/gWtzTBx+IF8WagqJy+IJa1g3AZioqsMeaABGgTg23s5DgMHf6DptGFBVT5rDdxQCMxixqUBOYhjdm1pLCdAAXOClIFRNqx7vHyrbA36lFw7BQAXEBAxNixhhDRvzMdxEXG4PqFrqx+w2xAqajy3pFe7xMRBrDVE9eXEcHdwh7VBaqSpiFwc5eez0chXe1AAqwAo3W70MQVXdYFJbMOtF5BcwGn7B06F5Px958KwqUGAAl2ahire7Gfqz6wWdMK4wCIAQmxCaGALnVHJO/nW5MQ3U1ynQWiHpHwByCCEEQiwiZkhekOR0gXoEEgJ4wyWa1/2IRA4IONs70jKspEh/mTaXKjI7uDOnm7Fp1CSogWZgj69ApKg5i4hhjdNAwFJyZ0UsH8333njzjd/+zhuHzeyFp5/++t95AziMeieY7U9nNw/2b03a/TCUslj265Vs1kKc1AoCtO20SFmsFt2wNQADUWCEAkgIKir1fcYixYOAQ4gNImk1mgAzN5GYJrvz3W3fLfRsGFabzWJnd28n7kwmDSPszqayf5BLv96cL5aXm+362sEhh2ymKcmQCjNxw0OXc8nZMjFEaUxz287me4cq0m+67SCfnzyBoVwu1r7RpyEjslFgi7/3e7936+k79x88kSC3nrn+0ivPvvzyczdv3HT61EyR/WIWyQUDWlEtJW/7knsrEJtABFgrqRUUwcBy1lKyytANi8X68ZPTSTsz5qEvj5+cP3jy5Mn5GUXartYCtLvXPvv8M888ffepZ55BhMViESeTG7dvQ6f7e3ukiK4FBEWCoM3h/NaNm0998OE7AADA2zJQBVft6uOrogtHySBR2EEiM8EQJ9PddrYzme1SiEMWrUHxLCrg06ofKQRSChIZ1ahPqDMSjHJsRxgV695aZ5zqjaNxmTcf6QBH1rTG2BBziCPr4FCqz9b+pyMHVinMAZDOzy4MQRWRA3IoSAKUASmbEUQGRRqGUsyKwWrTrbdblaJA6023TbnL2mXp+pIVi2pBKqqp71MpzpeqQWijGZyeXPhzKyV7BAARBGI/1jiSaRVSqgGZXO2F6GIVGiP/rTbkOIJMoymi6mK8avYL/BkMjdD9GgJq5jEaChjIf1ghBsvFWxACAFJgH/Ur4C5utWdDbafT6Wy27frcdx4bQOMfU6dqT/TESkgToJgZ4Hx35/btm6vN5vGDBzCq7E2NQvBMKGIsIobgxQ/ECEBA1DZNKZpT7cQKjoWOJsD6A/K0EMbRQUn1vL7qEiLyI7w+yMagevUQ1caeumdWVEZEaxEBej1lTQt1D3UxFcmVnq2sfSWpcNQj+WpggP6FkWdhKJlnDzJ5xBgSVV7XGMBUZNw/wAiatuEQiGMpxScgz50XUwABvx79lgrE5GgQMROkXPoOELxc3syUpKq9qwTKDEkAGBFjlCI8beeHt81wfQ7SX5btYqtAqrO9m02ITWwtoIJlEx/MCqGhiRYABrScJXBE1MXifH9y/Pf+vb//T/7o9/Om+8VPf/E3/+7H3OCQurPz865bv/3++2+/8867b793cnI6DN2wTaWIepYhYYxNr2XWHDUTyVJEs6mNcEKpiDmYqjhLAmQpDb4vo1hgZooCSoQhhjZM2ukMEc4uct9tFouLNjZtM0k5IeBsOj/cPSqp33TbJ2eP9/cOjnZnaLBeb7appKJASIGwiFV/slFodg+vz/aOp9O59CUPl5v+oru8XG83ChJjo7nEJhrEg92DYvSlL79x/8GnhxB/53vffeXLL919+rnJZHb1KSOpqoIKMwKaWpGcSupT31sxopZDGGcPxDE9Eon61Xq76S8vLk9PLyaztBnS5XL1/gcfffbg4cV6BcyRgw35xrXrL7/0wrNPPRNj0KTtpN2Z7pjKols+ePzpannh1rkihQDVZLFZTtrZ7v7++WVHGMxU1BAYIfijbmig4tyVWY3ax3oywWS+Nz845qYtqkXFcWMFHROQsRoAEJTBPXqeA+HjOrh2xXUqCoTAiCO3Ocr6rCZiAIInvpkoVkLNx10iDNUtgahSRIWMwNNyPEaOCDyiU0VVhyHFdoYUlWgzFLCsUoY0TEIgtB0ADVyMsmjOpduuzSCn0hdZd6lLkoE1tL2ljJZAE9pQJKsUVSnq+My9e/dTHvo+M5GIMoKHGSOOp7b/EMa5FEBNUUHrHRYql+mNkn5YjWeO347V5I9jbpuNUzEZ0lihbBU+RxcyuHM49YMHbRhYGIXfrUjv6EE9KA0Ch2kzmbbTfhhUlImQSBzKrzgmeXCNp2+qmTFMppOcpW3anZ3dbjN4oJwV8UA+BENkAwHEwEHFKxatFECwpm1ibEMAkaylhBqe6TeiG+b92/Hb3SkSdVuEIzcu3amAvo87dRqudCmNK4QhEnrfuwty2Wr9EYhIhZ7Q6WDxK5SQrZYK+CjiUs1xqccaewuIQKpqUGTUNiAAgLizBXyj8W5PAhIBkYJEpJRTMlUpioje28dGXlMFqoRoSCqAVHlm/55U1RA4BBXPSa9Piy9WHoaLgASkqAQsUhxjorad719TSVsw6c9Lv1xfFLVhMj3isEOxJQICMzLNpfpWDAMFAIAIJiXnYViv4NrR3771zts//8nJZ79eL8775fLs4ny97U7OF+t1v1ptMkjtgxvZvermEMh5AFwvbQGIvlJhTW51dI+uyBkBMBM0QbKspXRbd/W3cRo5MhMhgWIITdtOZ+3uanPe91spCm6fAWhCmM931pt5P2xPzk5vHt/anc1V0/nyvBgDBkb0bnMmDAEba3f29yazndn8cO9wHwTTarpdxfV6MB4ISNQm7XT/6FiKIeJf//QtpfDP/+P/6MVnb+/tHhwfH8S2MTUpwoEpkBYlrWefSdEiadt1266kIXBQKX4BqGqtQUVUMCklDXm9Xp+cXjw6OQnNhkN4cnrxt+++9+DRk/VqWScPyXfu3Hj+xafuPHU3IAlKw82Th48ffvb4/qcPfvLXP1vnnqElrIICBOj75eXFSoUBgJkJInFEDjVDFjQNGyDvgmCzohBUBpWI3KARcxNii7HJuRBxkaI1wLLCMwQGTnraiDGYS/mAAo1UGKEa8RU7R/4vuyLEanBojap0LpkAi6rBqF+XUpsEvOpKNSK7vVFNULRqHMUIQmgZCKUUUSpZS84EAFoyYcv7qWhRU0QOsevSZtO7d6ovpdsMOasUyAopl77IoJYBhlIUyZANIbbTkoblcllyVtGmbUPknHxbYDETKbkIMzkzCtVFxOj22uKGBmcftU6wLhCHCjaYgdUtyqCSCFUmi0hANXbfcQVQl9KoKaiooQctGHM00aBeVWOlzhrOrXiYk1rKWbbroetFgQlV1HFkADCpWToes5dS4cCillJW0/Xl5XvdeijZVJGQIToHalkUtQ7L7nEydKCKiEJoQoiGQEMkq/0zddZDMnQPG6Cp591fCerN+YmKP4E/VIA0xuEBEFpxsAdNVUwAUVQqikMEaEjETqV7VS+QP05Vg+jsdyU0xo+GgJiYuQ7aWCkvh4S9Cs7qguTl0HWRRhzpZwRkZI6BWFSGfiiURKvOgWtOXHEee+RojJDATIuYQcl9BQddRVA7G/xX+nsIbDVckolqpjeaqopoM5/v8zPIcXkO0C/LsFmf9qk5pzhpp0ehnYfJDjArgiUxsmBeFgGmAqaWBmYy1o8efPSLH/zZvXff62R90OycpXXdsKqOz8VYV9hCpc1ddABmABkNFQICIwdTp6qMwDsX0NAIVM2b8QoiiRUDQBly6mNoEGwYJhxicLMSKBilXJbrRQjRDaEUYDJpj45vCJS0Wa82y67b5xhzgfVm2Uxaj7A3kCwFA89n09nhtabd4bYZ1Mgsh0Czw2Y3QWzR8nJxvrN/MNvdW11se83DxerJg9PWmlde/UoB1VIc6UBQANKiVuqZ5WOA/2iYKFs9+erE5tiviQGWnFNKRUrfp4uL5eXlZtOfm8GDB49//et3t2nLHIrknIej+cFLL7/03LPP7uzsiGZQOX90+qd/8qcfffTR2ZP1z3/+KwMIHEWzvyLMlPPm84efhCYCYC4JgI/m19rpzmp1vu26hiNjI9pbjVZmdCxdBYIvNK4SAzfwB2Q/ngDJQAl8bpFxcSX2KB4kDBBDcP2+EweIeEUOYB2MXeto5ESU1Ch2UUOP/htLX4AQxEzEZRjs76Djx4AipQJNCipiatxGNgAEkazABhY4EBIYGUVRSEWkWBbrU1quN6Koakl0O5QkVtS2fTfksk1JkJPoIMUPBCJKJaV+MDQEbmLESk2SmaCCsgJgDLGC7uZEoPmep4KA6kuT1vg8REL1kG0H/80Ffu7+BW8KAP3igAAzdb2e0wX+j42feCUfDItKCBSI/KwvzGxYBbzmqZyiQ0qQkxRhMnDF5BUwWL8acE1kCEwU/CoGgD4PkF3HQ5594aCLEZl/HmNUNdZHgsEPYPA1BT3bz92niFc3HiIAM3MIro32cw3d9Op62RqYB2rqL5qIACIH/zo8DZrMjKs4UwGUODoZDwqigmYW0PsMnKGW2vxetwfAsVWYatqfeiED+SE/zjz+lbhc1R9zl3ORERIjFTPz0hgiE5GiwJ4SagCopQAyjoeov11uxy1FOfAIzjreb+MjAOCPS2XWa1Vn3afNkACVMCAhiSrHON+/jmaby1j6hUrfdyvsFqlbEU+a+RFxwBAm7Q4giuRcklEbA3NgRWka3p1Ov/SlF3R5uXmyPjt9LIA74SCXjIFFs416tSvlAowfUd3pDKqTHdzj4t7LQBgDTQhAMSOAakYDBVOQ2mHtj7ullAua5ZJMlSgQspgoah66brMtOxpiUBUyRbO9+Y7J9Uc5nT55tL+7t7dzKJ4KqwWNCElyNi3tfGe2c7B3eAxx1olhvwUhBDIO08PjpmuG7eLo+qxtm8cPLybt/A//4X9wubpIm+XF4sKSuUjKanouE6IUGROmqnYBsRrIY4weSesQ7/ijUFMtKXWbTRpy1w/bzbBcbx4+Oev7/OTi5HKzUCsGlkWk2J2nn37q6TtHB4exiUWUYzg7u3zrrV/9mz/5c7TmbHEJQJ6mCX78qCrIycn969fvMDQCPYCp5uPDmw1yP3xecgkUBANagSq9IEdkEDx9fpQ1uWoRyN+DupzzVcIdEAI1DWEVQbgIiIm4qr1H7YPWmJqa5l6hZu/d4SKCSGaiIkSVfUQXCCkoaAgxUBBVFUXyUg0DpVxK00ZCdgsxFBX0fZQAUM3UNMYQYpMkXS5ld9ZkKavVdrXaLtZbBTKBIpgVkuhi06UiQ84egCwquXgKBooaxdDOpgBQ+kFKJghWxMxiaDwFGa3ad0UVwbQohQrx+8GHhOpJbDoOcT65jrOS480cCEeTTC0Tc0ZU1UAQ0G+FKxGKY3hOE5pYjISggQODIIgSonjYDiNWagVLzs4BkZfE8vjJOKCAAIamYgi1e1OKTy4cGADB20V0dIoZ1KxRGCFFP6hdR+/5UJREaoocmOdRoGcM1KlZDQj8JCazItmVIIiubnAVP6AB+pdkQCNiWI9GB8UQvDoG3fogOkaoiWN1oDo+LqbkM7cXKY+7GBghcQhmBqQqRoBmMio4EWz80GBk2InN9UXeoYmAYoxs5gpGZWYDI2auW6+pm1/pivp2dZDHBGi91uuCUMVFMEqR6l/7xobjwlFfLTMjL2cTRJ40O8d3eDLbXpyk7TmUTjVL7jQPpV8BAHBI7Yw4iBYzwNgIE3E7mbYx4v17H3/8wcf/63/2z/7uN77/53/6Z58++PThgyfbbtt3215BQQVKNdlV3kYAvlhQoRqenf20GoFhyRummBonvjgGUjLhYkWt+D6B7CicL25FQVWzg14MQaAkGbb9pmn3AjdZE5m1TXtwcLjZrDaLy4vluRgSEwK2TbtZbpShaKLYzHb39o+OwmSWAMHHSDZTUYQwaUVS7uJ8tqNIQxle+PJXnnrh1b/74s1PPv3wT//8T56/e/v117+KU0RUNAjMqp7josZUXwEEZAwxEhMhmYgIsGds+Yfs/ggRU+u3XbfuhyFvVv3F+fJyfXmxPE+SAG06mcEwGOr+8bW7d+7u7O0OQ6+lFILL88vHD08fnT9uaN60DTn+BKxiakYBoZRBVsTw5Wdf/ujT9zP0ueskLa4f3F5tlpfLs6JAhDI6WcATmT2ykK64WMDgSJ16F7VHC1cp3nhkETEzq5rWIVSwgCP84yyJVb3hojWqnaQMEDz4E0xVfY1gt+wDhhBzSUwcqEGwkkWroYYcozZkDkYQIsesqag38VpVkHi9OSIgQ6ChpJBoSKkfhuXKLi8vT04vkGMITc6WxRR4u+7W22EYSgHEwDmVVAoxM7FXaIgpw1WSJgFU8rK+zypi6tOuAhCT26O9f2sUuSgiAo9oO2KVj+LYr4WVTzAzU/AHuOZgG5CDtFblLEhUoyPJA3sYyAKTmoYqEwmtoVCgcTGvbEO9OsD/FBgT4ioP7LsfmAtrqAa1XwWYGEAgU/G7xw8poHrujxSqy3JMTZvYqGnfb6syAMz5Za9EqOInv4SA0O9tN0Z5mZrX5FHNa1PTYFSKEBMyqRZi8mdN1JBJPeweyRDcoQFgNfScqiYoxIAYTKWWHCCIG4YRDIyJQoyxiYCQc/Hv1NljQkYCZEQjNYVqdjAn2VSFOGiVjFIqhYmYmYhlPBntizULrjRO6pQoIKDZGNQH6rcBVIWcC2WrcGMkKsC8m5SIzMTJZyQzF56JIVKY8Dxea5tpt97dXp5K2kjeICiAAohKSdusoAZCSNahGRCH3LYpJSjp17986+v/x//8+m9/+/nnrv/FD3/yt7/69Wp9efbo8bJbLNfrzWalgGYgfopAJTpHh+eY/OGuV0OAgiCgRaADDWjRiMmIkDGEoCCKZiJWWMYdCGqs0pWETgEBtOs3y83l7u5BDBhCCEDTphEL0+n+crE4eXJqQju7e+20TblklW2/RaRmNgmTKcaJGBZQY/bXwYCs5KKG09kMIxOlAfYOn7p564Xn7jz3B7//7U8/ffr//l/+F/+P//q//j/8x//Jy197GdhQQUHqOsZO7dWTwAtAEBWJDMFURaRGdzCZmj8zhDB0qev6rutXm+3js5N1v+5Th0yEJqZDTk2gu0/fufvUHeaAaCHy6vzi8/sPPv3sUwXImhubDKlrm0kITZ8HAPDKPwacxPDm628i2Ucfv5PLdrl8zPvxaPd63623eR0U/D0nMEAzLY5aWw0HMxXHD8YzYzw9PKHAdQgO33tovJRipp4o7H4aRGQmraeJn3HeTXIFBpmrYOrLTz7gKiGVkhBQHIEvmqUAoSfBgR8XhCDgiS9+a6lYLZokYAYkJPIUCQYoAlBEhpTYbLFe91K6dYqtqMK0mQ05r7fbfkhFwYjAGIAI2REXNNRcCEmcYwnBVAlJ1XFYREQOQUyJ0d1GYF9kOVTcH7EUoTEG0ENPnQLxs3cUu+MoXfQNoSYzVBq5yiDHo42IQDn4R6YhcClCBKEUQ8S2nRjJ0HcI4L2szrUQj3YpUU+mZsdt/DYWZ6gRkZiDSlFDYgRjc1WAc/RUXS1+s/jVhzSKmNBMwXWWWtTXCY/tDsyAiJJregJ4MW0AADHT4l9ZfcD852AGfhuakql5gnEpmUJQrRGs7HmcnluDagYOKIEhExKxmhSRyWw2n++WXPq+l80KA5pqDLEeMnW0AfBZI6C7cxGNjZAq+QxYxWh+kxoAkDERYRATEzUCcv2TH9dEIqIgiEyjC9rvP5e4UhVgkFetVbRJx33qC8le3RpwXKQRkDAQMQEWyyGgv3YF1BBiCFIE2eLeDk0mcXqcumXaXpR+jZZK3pK5ZVaJmHD07EnGZE1oUkmxCZZ1/uzxd37vW5t+fe3W4fnp2eLk4vHjRw8fPnj05PFyuUilDMMgoIrBCxxU/FP0JmobQR0/TIICAhSxglBMo2kANg5x0rTIVCTl1INK0WSA6KYKAEAyU1egE7Cppr4fhv7w4LZCBikcWhDcmR9dzlebxclqtZ7NDvaPb1ycnQBRGlKcTiaTSWxmHNsuSUY1IlETMFNRgCKpYW6mU+amz12YTo7vXH/+1Rdu3DgMUJ598Ut//Sd//H/6v/2f//f/yf/2y6+8NtmbSMocEHUc5BTAe6wRw7Q1ZQDQUnLSUoqvsSCixdPeUXxYECtZUpbtputLSqWE1vFVlCKTvYOjo4Od6VyLpJKns0nThgbZKT0D25ntHu4e7h8c9Dl9/kRT1xkUJlYVAv3Siy9SwMXZ48Vyc3F2GkKIYb6zM7eVlDIAaGBWFFTkQERGnkdm5HWMSBWfAY8SHOFrrGKJ8T0FQIIQ2bTC09405vZLMHMn/qiKg1H5DypifiYZoNukEcXEDEMMWnS+s3N088YkxsVydf7ktKQhdVsKHEIbHCk1MxAFcxmSu0gxACMjQWhDbBtEJQ0hImIQxXU/bIe8HXKXFLI1TcsRtkMSAERvw2T1GkUPI/B4ZqfHmIiDSDYzBTcAoZoaAjFHiIgGqmBoqszB39vqBkPgKp4yMx3Pc6xaH4f7r6p2tTLlTqOCY7xVNuXHrGMxbr9jMZFSQqSSCwUL8/mEKRiAmIYQS06IJoLeEaxaqUqfRavcxk9/868bEZA5EqGqjN/AqMQdB32r0iKsiedWsSxD/36c2jZACsF9sOqyHBffG4J5WCqaiBKRW06Cv05+u4yYMKMDkBZqMI5Od9tAnFLOljyYlUMkJCOnkwmJpWSoN52Ar4shNiEiYEqDw50+d+DojWJGZ/bEREEdFAL1XE/wQ9eXG6zG7lr4R6F2W4thcTeZmpgQIDMRcL3endR1hZONKOBVhiJWqV2FtUbtoP+ofagm9CLXujhTRYkUgagh5pCLb6OUVTFQzooisW13mjkcHJThaNiuc78ZhrXmXkpneRjHDjPMWqSUDAUAZGd/L04CIOwc7PzhP/ze+en58mJ1+vnZxx9/+Iuf/fLdAPcsL9drUMxGXmqn4nkA9WuuWiVwfgwNiDAACAWs+hFRMUFkJSQII2Pow3VSqCw/IWqNBEGioCZD2nb9JsZJnyUNAwgiR2ZqJzvbbrnte0KeTw/P7KxPuR86jCFOp3EySVK6Itiwc1FaQwrMikBgQwg8Ed1ev339xa+8sHM0XW6Wudt849U3P/rbd//y3/5ZG+0/+8/+8xf2v0QTNlX0QBQ1UANy74gSkY7Sgkp/IUp2PZ5KLsO2T/1goP3QFZUigiFoNge6AQHEAGzvcO/mzWtH144MJaeee5tMm1de/9LLX/7S+/c+AJBrx8c3r107PDz+7P6Dy4sLHWTQZGAGWjTHFl945ql7zz1/cnZ2sboYhnUIYd42OU/yQF3eMrLfWWwMEMSzG5zYIgIwh3cYCW0koqrP16ckrLNifVMRfXMHGVlKHBd917YZj4OjD/+qWpcwcUGMGqCCigoz7Mzar7305eefe+az+w9+/OOfnj55LCIO/6qMk6LvnFC/Ele8FFUWRZy4P1RVjTm2E0BabbaX6+5yPQgwoQmZbAcxFiSpmwjIiK1Ul7cKYRApiL5esIAbP6o2w8T/PrpXSEQ8+4WQnAz3kE4kBGSXBRGQmjGTjf7YEfpxpMtpgvEnDePMWdF6HU8SNNWSC0WaTCclF2JggsBE3BAAln4okiEgqofkwG9scVefXE3G90ne43L8G1AVIAKUkXBGJzqgonqVOKjH4ohtjOOpkwLIzCGEIooGnqiuIuacgCMXADFEhRHRZ2pDI1JKyqLKxCamoEQcQzARNZzN58+99EIb2s8ffP7k4YOSlBkZHTjGEBs1qZEaI3dLyAiYUlrqAgxEtWkmrg0VTztxKJ4YEFJOMO7q7KJkQjM1URldZhXirwORlTKAIbdNJNrb35tM28XZ2bBZka97vt6KOFE2MiZuavOTkM1Z5fpx+7/7/+ZXVI2ICk00VYGCxoCgWksLVPPe3uGdu3cfPnx0cXpmisxQTIsJMxtjVmUOHHene7ttytNcQLJISqnTksrQWylW+qEfQDMMCqD7+9fadppT7vs8ne0eHVtAWp6cNtEmLU4aaBjagLmQiaiqKTJhpAlzI6pD6sVEwfNRWA0RGb3SMGCYtGaqplKKX45Fk5hk9ax5NgimNI4VlaGpi4VB0WG7XQ4pMzMCCpbSZWA62N+XnLbrRZf7xWKRS9n0q9hOJrPdppk1zTyZNpGMXLhmWUTFUDFSQ8iRaDusmnby9d/++pvf+PLN4/mw2cza5qWXn//u7/zBez//5V/8j3/+4ksv/P727z7/pRfb2dTMTIWArqKfzEA9i9Y056xFgUFVyJBiADMQG7p+6Iech5JL13UGFgKpSggN+UZSFAGv37jxzFN3duZz1UwcNl23F2ZvvvmNf/7P/9knH9379NMHuzvT5559xsyaCMfHh207Way46zcKhAir5eUrX35x9vf/wb3PPvvw3kcPHny+3myQJtcO9i4XK1VRUDJS0yKJJKOY74SaFcRijFnFhcL4myc6jpk+UFEvwJosTBSkFEAKIZqJlKJgpN6g4/dD/R2++Otx4zZQdNDDISWzzXJ5dnL69J07bdMwEQc2gxAaDux2HoWq93MvTj2NPYPSQHPuRUxkEkiYSlE1WG+6VZfXXRaT0LKl7c6cSilDLklFAMGjXJjM1AqAhzIjABpzaNspkfVdNwxDDIGYJRfiGoj6xeDqmQ9eVsPBLMemCU1UkZyzpx8ys0camKrnBqlIiAHBO84MDHwDc3qDrgRBUAFh55yYqZ1NQ4wq2q2WJacwDD2lAIGkCIAFYjNQN+eO8FKdQ91kp+OZbsBMjnHnksBgVEkSIoAK+Et4pfeooa9eWgnM7Fk/XmfjviAkKiKIwCFQ9ZsDOTKnOgwJDTBGFFCxPKQmtG1oEliyHpxhQBUxAFElUUWmdtLcOrp5cLB/fnHhM0fTtKYmVhAYPUDBYzcQAzMCI4GUMgxDGgZiChym8zkhrrdbL2Mj9CJfo8ohG/thjcBMxOSusqvWeABQFVULHIgQgVUUENspvfbKl7/5yms//tUvf/Xzt/rtlok4NLlkG6lcq73BcCUAUFP8YimAmiDigSFg5MY0M4qBECGQGZWcPcHVeWxC29vZe/npF4dtOntyBiIF2ABCCIhYSqEQRBKhqQAFQgqB2xagKRlQJWUxIS1DASTYPjnH9eLVV18DQmQgxH67ldxvt5dPnty/OH3Yb5ao0jJJ25QiClZUh5JjbCYxTCa7wzBIMdNkVkDRkK/IJzADiAGZ2omZ5ZIBwYufVIyHJCJoAJpKEtVSSQ7TOkpBnRxW68uHJ/cO9w5LKg0jM08ns9mcJZci6fTstEvDsF2XVCaznb294/29w3Y2Kd2WmYwQEIqKqpYihIE5lFQ2mAzohddfe+2rL73ypadvXdsdLmxvOmnbyVfffOXNr3/jxz/8wX/73/x3jx+e/ON//L/46htfo4iaFagaYsAEwdCw+vVERUSTeJW2qmrWXESllOI9Kv4MFEAgIpFshLmkkmQS4rVr1yLHOJlsu55BOFATuJnGL73w8ne+851iPzg62rl+4+jk5KxhOtzfb+MMyNRKP2yBIafuhRefev2lF+7fe+rol/Ofof7ql7/qZXvt2q3nbt3ZluHJ2cn58sLAQl1sPcPRSimuWUFFCuRLnUd3+2BqaOq4hNPEHjNfZXXUtu10MikqfT/kNDhSweRRJopM4GmKhIRYBYwI1eHlgw+ClLLZ9m/94mef3/vMCJfbLai6PL2UXKRA1av7fuLzY5WeeSViKQJW0NTCFDGkUrLAZiirzZAUh5SbEE1BUy859yWLqjMW4sJCMWSQXFzia4AcAhIM/SCiTYjIpGZIZIYqwp61ZcohgoipAZgxmUEIoYlN27aiYmqlpBp85D89AEI2Uu9MBgP34frpT/7W1FAfVO/3UPWgZjBDoMghcjPIoKIiEgA154QWRAr60+XQNVTcwhFZJjRAU68xMzAgojqXmj+Y5vZaVTHDEIKImKr69YTsRI5e3R9qrgn3zAqupdBiZhwYTNPQ+3rPCMxNYNKowSgiWaBCxoAMlstQirjbj4mLSAzByyJQjAHz0D86+fzzx5+enz8SKBWGh1IJIfhiW6UKxdf9hmpwHBWRZtK27bTLJaUUQkCgGrIjijV2A9gTmjw5BxEQidgpG1XxWE9RFZEQGiAzKTrog/v3Dg8Oiggwo9fcq44xdOQSV/d1uEdTFYD8EKe6XKOCB+mqW/iNazd3DRk1JGLnuVEVABRUU999fvJ4sVgSc1GX4JCoqBnXcgLztk/ycNMQ0OFExmYyySUXE9bYzCaTZucY9Ctfe/3geD8gQ9Out6vVxeWTBw9PT8/OzhdDSWLCTeRSOHJEHUpuoqs5dH82OZcMIADFJYZESByrUlIMDUSEIFIIzAigSCHEhilQmyxnFUOb2ARrVgeCqLhyJ3XLks2glNKfnNyznOeznUBN28RmZ8oQy+HRZthcnj/Oi74MSaXE0E4mMwayYlLU0KMo1QxEioAZGgcm1qEfjm7e/PbvfvUrrz5/vDuzbpjOGgOc785efe25P/z7/975k8u3fv6j8/PTRd/9r/I/+eqrX232p3WoAlQbwAQMJBfL1SiQc0YECByIpJSShiKiosOQ1KxpG2IWKUgj5WEgkCez/WtHR0fHh20TN6uSpUhJJOXyfPn+J+8ZlONrx9eOj3fn88vFxWw+41LEtrRE581LSQYym01mTbxx+/CV/OJ26Fanl+/8+oNlOPvyGy8e37j1yw/f/eXbb6+HjaqwFAjm4jMrxbRYKUTs6A0gKinbqF+snBVirYuof4u8rBw0tA2ZplIso/mJ5iEukczM6IrzNCLv17tCxAHcKMBBwYYh3f/8cwxMFGMT2VBFob4dSG5Bs5otqaqiEkP0DEqPdGRENe3SVvFwPfSbvt/mnEUt8CAKZjIk57mLFOOKsZoxB39RKoY1pJ4KA6hIrlLJ4i0rQEhg4KKSKtEgBlPm6El5iJxzAkLVIg4uGVWEQq+U/YiAY0+tz/cwQgJQ710btSOuMgKPRbJhSGBONBo3HHwZN1FCRArmOkf0hGoyR7Ud97Xai+ufa5UcVerVwLOZEUE9DsdcX+WBlVc4L9V8PkVCIjYRbwwmjuAFqQYmKqIAUNS8f5iZJOeAbKqlFAyBDEPTipaUu1JUzZACWjYzZGombckiZjGQkL733jumUoqCKHMwbyUSz0ZHlxx5EZgrg0wVAhMZIxUVJlbVPLjGHB1e8xkNR/uiIXk8jpkiUMVirjq+QIlQoTLYSK4NsX7o7937+Oz0CRFL6hEBgcxEVVzpBt7gTDgGpMAYfgdmihXNrF5Zq+osBPKodHOFrqGN5W5WIWazy8Vi+OD9vh8YCWMAMBG7ouYREMYGbQYgIzEoSQyAAbIoxoZFiWLAaMS37xy98qXnAzIAmMiHv3zn8vz09OLk/GLZ93mz6bttyqXGcplqJLJAViACEQq7GrviWoU4ciXWwSIgAlPwCZIoACgTuyk5EBdUjhiQAjcIGDhiQC0FgPKQVsDr8gQtKuT18gIFQnh6WmbtJIpqKhkAmjDNg6Rh8MjFotr3KU5LDNm7+xRJoFY8A0AgFktmOtufvfmtV7/x+rNfefHO3oyHbQ6BrSiHsLcz/8a3vvbZB/ceXz758IO3/9W//NeXl2f/6f/uP33ja2+E3VZLVs1a1EomRlAjBi930yIqQm00s5yyqADgZrPpNl0RJQ5eSwdSH1QDIKD5fGdvb+/o+ChEDEhDKar2737wo08+vv/Xf/PTxw8f371x/aUXX9jfm59fTiYxAhNvMgcSLQUk93k6mzJDlh6sPH3n9nx3djibzufTTT8cX5vfuXXjydnjT+e73bBFBQSIbQwYBdmK5NRznFSBByOaZ8D5qF33VhqBZAMAN/MRIIOq5pw8doWRgaw+0jaSWjTmJ1bHwBWgVFlDZtfTggkrCRERsYi4BK6qiUANCIldNqFmWTIjuTq8nbTtpFVv20lDO2ljbFKWTd/3uRhiUkNvMVOLHAGEOGbNPvYykiK77MIXC27ifL475EFEYtsG5JITesD6SIqAx9EDIiN41iNgCMG1UqLbSoX6aOcKUSKs0dDgkj4RIfYfA4KA6WjyGLlBcMW7eYgQeSWKqmrxXBkMDtQAeBaCuUnb51f0MgoFBa06y8qlu9mqnv6gqGoUsJ1OtJRiuZKlI79nCkA1SRQATEfdJrKSkWOF1RPoLPJ4r4AfgKZp8Ftu6DumEFzBjlQkc2AOTCqWiyBx4Nl8Z//4UEX6flhdXqCAJReKBD9/S8lOPYOKp+fXe9WgBhmOeLqYmaIidl0H1msuITQq4ko3DgQVE6v8ATKD+2t0RGwAkOALyyKoQ49FzNRCiGKy3a4DRTAIHNQrkV3CXBQqWwWiBZARAL3QewyArXSQEzZQ2+prSDiNdcRAUA0MdS5gCCWVVVoYMIdIglmzLz0GSqOgtmp5/XVzSpqqS6eoItJ0PmuQM8jTz9x95s51BIBSwPTu3Vtnjx99/N5Hf/2DH6WSLy4XF6slxihineSCCE00QimFOFgpohngCzJYpJh2xA1xICRDzCJByRTdjwKqFDCEGBEsNBQCGQBSIGKKhjaY5SFJKQDEIXp6jFjputV6ebE73wWAru9SX3JWJmrbnaEvzq6nfrFYNKJl79pNUYPARpgN1KwUYY5aesQc2/jqa69899tf/+Zrr9yYT8msDYyIGIOpUtO88Mqz/+R/848uhuXFycXJ+eM//Z/+8sbNu20z+8pXvmwRqKiWbDlrdpEDqCqCqgr4WSOqpQBozmlzue6Hoev7i8vz9Xbdpz6VAiDUsCkqyGw+P9w/BNXN4qLfbiQPjx49fvudX//ohz/5m5/8+Lm7z9z6ymu7+zvbbhOZmyYOA5khEzMRCDQYdvdmhCGXrVkmpqefuXH96Ls3bx2//e77Ozsz08tJxP35fLWadXkAEUL1NRoIRUStAASwalipr3+VdtWjwrWkMApDpQiHICrddmuGUqS2tjsd6oMMfDFjju4QGHmvCojU9BV3wwIBhdqYjRSYCJig1H8MxzAJgEk7AVXnKSfTSdPGnMC0qJaq8kBLqkqohkCoiIyIxKLKHMQSKioaqtX8alUmVinF9PD69RvXrj18/LBbrVGBmIoqUoghuD1AqoPOxi3erghzA2MKtQdL0bEjs9q9qFfBqoAGFkJgZPW+A6sVon58165ZZ3LNgIJqnk7n89ks57LdZAeRAjGNsguwyp4hgDcOI6LVlB8ANFcg+jdtiGjoYDT6RBaQNYL5e0I8Cns8/8BHT3ItzUjDkGv1sJomHPjw0VUd9lPJSZKalWKxbWLbtnGSSwHEnIcQw7PPPXt8fP3Tz+49vn8/gAWi6XRy4+j6wdHx45OT9eJSS2mmk7xKzKQqRbzQ2aGzWupSvzZQHAN6/BjlGJmhSOmH5I8cIwKhR4RCnbutOu4QkdCkSnNGQ4eBQo3vV3NrojOAXHcgI2IwI0St/hwIkYuiYcEROzWEGtSBDN7ADKO0odIDVdUwRpaOFmtE9LhBBEDwHhIEFC0ACAruvCZA4OBhcVbv+Uq9sSFRQBMxQwxEKGQxgFfz5CLTWfPaGy9HjL6bhElzfOf2a9nOLxdvvfWLX//y5+tNv+6GZrZDkQ3JlQ4mSByNsOuyZL9G3dJGjq+aFi3griJEMsjB0MQArGliw7FtGgOACB6cJzkPqlpUwYbNJkmfh15VSu6Z0RBALOvQpW3SYdUtNqvtth8QQi6mqiE2UhRI+6Gz5SkCTnb2NUSDkKWUil3jsN0EANP+5Ve++ve+/3e+//Wv3z4+YlEQd/SQqeYhxxAx8lN3b/zON7/9sx/+9OHpw27I/9//8U+ms53D/f07z9wuILnryYt93NyaC4j4yGpFs0gesoKlLqmHkXXdarXZdH0NCfBsKbUAcTabTZrQxkBm24uT5eXqnXc/+PFf//Tf/eCve02GxIFLHvrtEkwQNKc8ShQIQIesjx4++fzeg7vPHFtMXbftlpqz3L57M2vZbjeXF5eT3Xh0vHe2uhgWSU1zHhQCNqBGJaciOcSAAUWVma3m8tAY4Iu+AQN6pAcaIeM4dRmoZEQkIlWrWzONhtMa9FUFJZ58Vmu563/4y0bmIad+/mG9dhhRA4sIAnpaMSkiB+YgkGOMk0nr4LqpIkCMsWkaIu6GIlpLroGwlAIhis9YKiIuH4Qiiog5JR/VgTByeOnFF27eun25Wl/aiapmS0TIHCIGASkl+5BJHmqJ1fIL4AZqA4RKFDu9LFYBr/H0Dz4GARASM4FYUUD0WNwrBy2rl885lahGxESsgEWKgzjEEFRBzSgwj61PY9oSwqi+QkAPUsKaLYA1YAxAqwpVmBpV8T2PuQaOXwk0ETyv27XPntLBqgIKI7flCJMnzo14H4LlxLFJeWiayd2nn3765i1BuPfpZ6uL81Jsd2f+h3/w/d29/f/2v18//vyz0MzMIOe0XC45hGHYErFKzimLAAV3yKFIQbhCKKtD2T/m8TxFNQ0h4HjCelIHMkoRRaAYCQC9i8IFl+RdN+KjDo3CPl8/oRYSG7n5xnOwDQS8OoYd9VUpRaUJ0/3rx+vlartZgrjmwTl15Rp2fbUhee6WDwRVK+GX2hf6ibpfVVgfiYCcj2IARK64nYdpILI5xQBm6vpcj2RWAGBA9RIHQBdvRAplsJK3RwezGLy8EBTImvb288//3dnunVsv/ulf/Nlf/MVfvv/2u6WIk/xqSoH9yur7NLAMWQSqWhaR0AgsIAUCptHjCIAoSoBt0zKyFc2QTTVrSblXV6SmnFNS1WHowASAcNxBKxQH3LY7gQMihWY6j21KJZcewYoWUQGjGBvNgqCSeoqtIUiRggSiUZkUVdILzz///e/81u9+7Y3nb92ZuJxPxaOOESDGBtFEJMzab3//G3908k8utsv3f/3rzz/46F/8N//vSYz/y3/0j64f74M7aYBANLmyP2UrogC5T1Jk6HtF7bZ9ziUNZbPs+i5t1ptUMhIisqiIlABhb2eupawXl/l4BwzPz84fPHj05MnZZtsDYT8IUgTDbdepAXPQtLaSI1ITQs67Bvreex99+ZkX7j51DEgIlIakBkh488bNJ48exZuzOD0qOa63w3bTZwMtufpnAXMaWi1mqmCA5CwgAjXEQJT9J0P1ffDzqSofkUwIiRhCRXn8eQ1chcx1zjcwPyeQkVTUbfbO61qNjFOsRZTETOQCefCQHffEuBxFq1jHfelqpSggDKlDFSLSXIgYEbbbdT8kAwBmP5uyCICSgnPy41IAohpiYGIDgyTcTIl5tVoPw0AxcoxWVESYQawQEwcf+MbdCAwM1YCZGGv9XB0u3QAf2HlB36lqGjyC1WCeqrn/ghNHvxsc/UFCBlAFCKEB077b5FSMkCmAlXDlcfX9oW78NCJI7tu6yhfze5IccnP/L41qaxXFkrNbT60iEzCCGKZe7D4aeksFUsbiZwNCRGYkcEGQRydgaAB1Z3f34MaNN7/y6nff/Obp5cUfr9fb1SWaTNq4XXcPH18slxfIJEVC02w22+32088//yznXJtCPX3XRmgbGCqTgUhVEgBXMwPU/hMDk1L8QYyTlhBzyR5Az4Se8P4Ft4GIgTxqCnE8kMFFN+NjDZUa8WJn/8urPpuiGRCQAMn257um1m3XBoWIVQp5lnfF//2S8qsaxt2ptgdDjRD2H6p/FlcpEPVrAgAkthq1xF+4CaxGDFrdHQ0ATAzIvOaJDIlY0YDQRAE0d+vr+9OvffXV2Abx6AI0CFFZju8efW//20/dvnH74NYfz/7Nr997Z1v6TLIdhpIVANo47bTv+20RK1AQQAUBBSmOxBYiKFMjMICSgBhwyaDCJScAkJL7YZPSwAQ5ZxXx75HMJvPdEKY5l257aSbgs0aYzHd3prMZBKaAKRXCkpOFth1WCwOYTmaxCdtuvd6u22k3n+0TxpIGakKc7uNi3W/6u09d//73v/Wtr732wnNPTyKCiIuefZgFQI+0KkMhwONr+3/vD7/3+LP7F2fnj04ff/juJ//Ff/l/LUP/T//oj+7eup4gm8KwWUtWkdx3neSEMQx9EYO+78Rku9lutt22H/qUxRSAVAoyiBZiIsRJ207nM0B88ujx/jwCQhE7vbhYrrfNpO1TyqLcRsEiRYhj08bSD5IGLWpg1w6PwoRXi2UqwtwcHLabEFRLSmkyaZi2d5++s7t7eLpYqtDZxfLTTz/fDB3pjCIbkYoygJTCZiB6hXaOMe0UYnD5CnjmZRWKjlC1mYiGwACgIv4IAwISa+3LHFF/Hz3BM+AMiUDV6hSGv/Gbk5qBgYCRF/kR1hruapJSrCArq0rf94CYc2qbGJFUiqfFb/s+5SQCQFiqk0DVqoTX+SAChtGsXOkKwpSGX/3tL0Ns+s0GEM0ECdtJC+Y1MMKB68ipI6WHxIQOEEmua83I7iKA+21dDcVW/SJISHWwqdKHuhz5z8pfHkD/NsdWBtVcCqqFyJKFiALHAALu7AJyf6KREaH5z9HvVTAQ11RTXejA3K2uVVxlUiPs3dxVTxkETzUCQK4MsDnYD4pWjVX10K3HGhqKlOLcpaoo2tGNG3/4+3/w5eef/+D9Dz/+7MPF4ixEDjGsFqt/++d/1uV+ve4CR6IAgCFwv9kImJUSYsNMTOzHsoJXWLLjKeBfDI6JgvUuQjITEUTkyD4Kt20b27hZbdT7ihXMf8JEkYjrT8BUxEw9SmJ8vMc9F8HMikoIwUcS8dh0RDV18giZzbBIuVyer9drA0/ZUMfBPT+nHs0wep/NQSjx0D2XWoloLSX2ilSnuSuk4wTRVb9mVZvWG3qM4R0JY6djMFAANILgaBcZSAZvh2i0PPv07aP5jn9RxJhzCU2wrKIWWrjzzLXf/e03hs0ls3764P5itTLE7banyDHETd/VMD5QcHu+53i6SRrIgFQ2gGBQ61+Sz4SqiFRSERgImJs2UJjND5p2TsjNdLq/fxBiu9huP/v47dxd+msx39k5PLq2d3C4GQYTDYFTLmAiOQMSA+3tHk5nbc5pu1ru76VuszYjwpiLSul06OfNzu9+77t/7/u/+9Lzz+5NW1RTNEBjt4cUAFMIZmoUAwqY6FN3b/zRf/jvr7vuX/x3//rR40cXDx/9q//Pv7x17dr3f+d39vdnmsUMNsuVmohI3w2cExmpQT8MRWS12W6GftsPmyEvN5s+dcAgJiKFjQFwZ29vZ2eGTKvNarXdoNGmTxeL9ZDSbLYbqW/aiQhM5jvE55Nm0sZpyvlieb4pCzHZDOu92X47mwsgWGjbOAydKjChqLZNm0qaz/eu3TjeLvpPPvpsGiaXQ49u3M9ZzKgEybnkAUTjZKKiIaIAmGYDQAheBFYlAOiTe42I9hAhqzoWAjI1CLFWvWElfuscX5d2D5bHcZqslCXXv6yxXxXGNAOtSWmmnkhoRoQyZhqZycgQIBBgYA4sIiKSi3vIqvsVkZ3brC82UrVJIYK5IcH/pmwWyxCCIjUczQCAAgeRYmRQtUlXMxcSsZl57IOhz/syBr/VMMFKq9SwTFcEKbL7hMQXgFpTW2N/PX3IvQVoQIiKagpGFf1ARFS1QERXLKbb8omYiKrjxmOGEFVdhWQIgAo2ZhtAdSQbskfFqtZm+XHKBUDygA/f5BVGp4gnPRG75gjNxhyswIBIFJBQTByKWVxefnT/4bsfvffxBx9cXlxMZ9P5zp5oOT8/FzUza5oISFIECjAHBDUEJnBUmGOoaxR4OhOgi05wnKfxC0TIga9avElIBJpzqfcsOqsjUsw/PWT/+kU9MouwJrWigRFRbCIjiQOHWVWFgf2q05G1d3MMIKihFDl7cuJ4GpF3tyHh2IoLFXSqV/wIgtYtsJbnuYUSrRaB+eRf3wl/9IhGyrVSUFADtn06M65/EzzVyKB+cD6WgJpZUaAGhu3x4eHB/q4/pSrCMaCpoeY0QJHt5UpKOdzbPdzfO1tMN/02Fk+6MzXBgJJFrr7mmhJoHu+rYFa8RoqM2FTVyFREgQCayTTMpm1zGJsIADt7e7s7e0SBkUJsmBiAcimTdpq7S0fhmtgc7h8fH90cTk426XLoh65bb9YLtRKYVGE6mezv7l2uV+vtcr1a7c12N4vF5PCIAfL6creh73/vW//g97/7xqsvHe7vEXhRj2Omvu4JgWsrjZhMS5GCoC9/+en/4O9+75OPP/mzxaIfyq/f/vD/8l/9V0rh93/nt+ezti8liZVhEBUkKEUioSSRrOdn5+uuXy5Xl4tutVmtNushDQjKREXUlDiESTMlDKo4DLLa9JBovc7n56shGQCB2dB33aq/c/vu6ednO9NpPzeBsOmGxXY1aJnF6Xxnp5nOhpy6Ybh186jklIatkQJoUetTV0pC1TY2ezu7R0fHyz5ZURkGbgKjkWYbeoiBWkzbTdNODIBCrckzqGppGIFXJDI3sDhoAVdHvSuJHLUAQhStwtBxC0BDhcos+wZs4zNvHiAzzjgWeJwv/d4hAjW0q4zI6kWtoWwiIqKmB3v7e7t7qphKCTGU7H1bUFTdm25KPgerKiMjQCni0BMiIBgHdsbbeXaHQhDMM5/MFBykx3H/r4ZeqvQ42vhG1nX+C4CC0MUrYHXc81iE8bdCt4SNR1pFhCpjZKBWtBggEJFmBUMmCiK+ELGNnWRY8yUAPOKiYiP1MKycAqITCy46oUAISEzmvKJHPSNWJRZUGbV/q8h+J1iFfaqHGsDUASUFaKfTECIgcWok9+cnZz/6qx9xCH23zSn3m8wcHfQuxZcUquMAmmjBwJDFp3vvwnWSoSpc2f9YGNvNrBZmqSGSWvWmq4ipAmEIIaXB0mCepz8i61qUCc3cvoBeqRaYtSgSANSYz8AhxqBgQ5/8xEczFfU/yEzRcw3NiipHAjHRMtItVDsgHXh3RU99HOoe4I+HmoKimvjNXL8v32jqPVw75upCBgijDK6evWMGU53/68kGBqAgaubPcJGihEhNE1hyD2V4/tmnp9PJ+M9oAFAtIKVfr7bd9vTRo5PTk9Vm6dprQjMTM40hIljDnEJjUsCr4cZWNnegEKAZqgIBE0WKBADcBiRu2nY6mc/mO9O2ybkg2Wx3B9VyVgPNueuKAELX9UyIgaEYAEhJJfep7/v1enFxsVqsVuvTnLvJZEYUdMhFchFtJ5N2djAI9mmghpL2Bjbf3fv973/jH/72d15/6Uv78zkjlJJQPR4ZHYUgJlBF9ZheQwQOLEMmtte/9uX/8I/+cLFavfXTn14O3S9/+ov/V/v/bJi/+Y1vNATWsCXM2RzYT5LzkJabbd+ni7PL09Ozs8X24uKiG7p+2KoZEQSOItZiiDGa2eriYrszuTy9OH18/su33//k40+Xy0XbTNddL58/fHR6ul6nvb0DQtrm89PLk/P1uUExAFWYNbtDN/RpyCV1fYcEITYoSgxd389ms2vXrwPw9dvp2RefuXvv89PFYjOklhpVEy3dtoNSVPJ0j5rpDgOkLoU2UmBTQPY+D67rq7tlPRWPAvnZ7+OYP7daH26fNao+xKV5ZghkqOhIpX4hDRrnt8oJM4XgoWFus0JEAsJAwX+zyiUjIpErvgUBhtTFENqmvVic99tBsoYQgDnnAZEroOuFUegLgCpiIPKJ28EcAAiBVVRL9lutiYzoIyMA1+g7RDARqBF3Lq30l9Fxg3Er8qEZgHhMQDdCT8VB80ZYAFMb+4Tr6VSdwCEEIIBSeRSisZTJo5xQA4winPEfrtxvPSKp5t440+K3h7+WDi8V73z/gmxkRTUwJpaa3TRuAS7xqp8QmhV3XWnNGQXmiAACig7Ftm2fBiw5NtFAz05PAFDN2tjMd3dECgCouHBfAqFkj7CgWi8fODCbimuU/NfV1I06QNQnZhRRupp+KzUAAQAASURBVD8RoXplkYiN6irmTXJO7YoZ1Rh3zwcVNbFiCMguQaBqk2ZmEfRdwcyKZKhMmBmiibrOLcZJjDz0Q2C2GlAR6xaL3mat8EWuEo4wDnxRnTQ6Bf2qEFeAVafb1bc6viRQpa4+ivkvIBC/jsdlAStx4HsaeOGOx74TIqpIFlDV3Z3JU08/5YMX+QqYUt72ue+65Wa7WF6cX14sl6v1JuecUu/VTKYSmRAgEgbwOhSfm4iRgcCKAZAhI7haMQIRBeLAzaSJIcbYTqaznfkOAhIyRkr9kPpBfKkySSX3/eCScMYgblRR64bh5PRkvVj2XdetF/2wZTJTJQYDuVxfIKMV3dk7ju2egjVtoyBI+KUXnn3jK699+1tv3L19rKmYEWEANlAEBShgBhgAKagJKFivBIDsGhKZTPm7v/W15WJlWX72s5+uZfM3f/XTpt0Twddf/tIkhsVmSF2nUBChdElL2fb9atstLpfbYVhvNpvtqk/bXLrKZSEj6u7eQds0/XZYLtbbwx403rt/cv+zhydPThfr9eFh28MQrXl8ubz/6PEzN2+/9/77Tx6fXF6eCQwIQkBEcPLkge0fDMOgZGqaUkIVAjLBnHQ625vMd4pSM9tTilkLgjFRyZkiERITyzCIaIiT3dkhhzhrOYN7p4FjJI+QVKujFniQv1fagWsu/Fxw1ytWYQ8yVZhl5KN8qiU3kWFNDXbUFkC/eO4JIDA5HGrgCdK+ZYOAuucFwA9BrCsD2rRtrx1fE7Tl6nKz2RqQFR3doc6HuV6l1qKMpgJERAVQ8bYfzp7oh1+s+L6uqArVr8Tnen+BgdhPQh3fU6q3VGUTyYfv+oKNtZEAyMRX+gjDGgwPVQzqNjNX4aiNR3blqQwQgDw2FYlNzYyqQJE9a6YG0EDVuAOAIpCNVZai6soqQg8YKAhsBkhIyL5EjFJUND9efbL2lnpX8HpsjgpGdiJDs3KIQNYEzhny0CHAdDpNmlLKzP7BB2IyAMaafGAmzmj6auJam2poC+i8uQfbXeEeIxtabwHwT2Dcudwy7p+cWs0QqY+K28SgxuEqqKpVINNTzCvH5SEv2g+ZsGZ9+lqFBOoRgKb+sKIRIw5Dz8wVc/QWNxgd71f/uvLfYQVvENFzuOoZT1DtHOjCNIe7bCRbfN8ZN8WrlBW7stsojL/+N6NE/TYSKUaoBkTYts1QVrsHB9ePbkQKptlKByqgBUqfNqsy9OenT04vzs/OTi5XF/3QlZLFIzFCEBEGI5E5M0vMRAnQ2GKMqoJkBoxKVJ0+BEZgROycC2XNNqxT6RkZAa23kvIwDDhSsSKy3WwBSIvUoQNQDTbr9XYYVptFt1mJ2eH+dWYupRNJQNZtVyIphNl057hpZ4VMSl4P65vHR9/+9qtfeu75+XTOTEpo4onIjj6LN2mbgkXF4lgsmikWQdWmiVnK/u7O93/nm2w0mUz+5q0fX6zPfvSDH+xMp4H+5889/dS677FISn1JWXPOKW+zrLttQlytu5Oz88v1KuXeyScFNVWmZjabxRDPzk/3JtOTk9M7d25//vDxZw8+v1ivMygS7c+Pmuns9NHp2enlUzfuPD49uffgk4vNAsAAiClgoIuLy51m1gSehBhiNFQm4IjDANZEnu08fHLx8Yf3f/LzX7793ofn5+fchP3ZHLil2BTNfV9EupI3/fmwAWh3d5v5fjOZceSimEX9mUdGshpIwEBqBq4mBxnHEwdIEH2jtSplHnUSvh1CYCZCVdDsKcqMjoxDhUERarYaMXEkEhdJKAAiE/u6YWaAzjVy04gWANs/PLp5++b52VmfRIuEthEj0VLHEwAiSrmICELwt2MMuQNTqdC6jTMaemAFq4kPrxQ4cGB3+Kt7bysdIja+v86HuvayzmPGtXoB0ZR+Q6KjIy1LgVGx/jAqlObGLUd3cbTQuRPCY8wMwAIohhgwYsnJijrAUeqycfU21YvX1EAVicy1SqZIrDXcywAVDZjJPwuHF1zOC1az4SoQNCZAGCgFDiF4ZatvFbnkkrXHIZdiYCCW+qQGIcS2bU1LlmRi3ERi8kAhAKt5yoiEHp/rAlX/RMCADMTG9QfHawxgBNhsHH4R3DDin0QFdih4bpH/iBm5/k7oQBah99hq1ScDoqi6o4cRRQQ9jQMABJC41sioEgcT6XP2h8nTAb1yAEZDnH9fWoO5K1tV/8+AxgB2xxPHPaHehXj1C0f4H8etGhHhSmRRbRAOQI5/7tVy6J82oIoQBmJmYy1ikq7dur073wVkkAGGLahoTmWbtOtzt1lenJ88eXRxcb7ZrFbbdSqF0MNvYEj9Tpi8ePep2XT2wcf3Hi+X6ImqCgRkZHUigPr21ghqkZJNnS5ij9jGpm0RqeRSN0CPzkBopzPJJZmooHNjIrK4XIjo4nJRcjk42J/M9vp+028la/EfYx5SGTA2JU5hujMV5M2j9Vd+67lvvfrC83euoYp56hmAv6w+fYK/xZkokCPfVsSLyMHAiUZmvHl8+J3vvN4P2+Vm9dZbP17n7o//9I951v7h7/3h0TSWvt8uFn0/uAf8Yrnqc9r0fZfyYr2+uFx2/XZMiwxqNmuakgsQrBbrxe5GRY6u3/j88ePVpiOgo/kOUbh163jICSE/fvj4/t7Bx598+sn9zxAUAZiomcyK5D5tBLSdTCezCTH61BzifDoNAWhxvnnrrZ//+Z/8+bsffHR6uWlnuxQ5pSFaSGm7Hc63wwq0iBZbwPryETWzg1vPH9x6rt09DA53VJrNP0wKxIyMpjXq94qiQkQEEUELpl4TW3FtAEBkQxvnMEDXdtj4kHr9o/uKEA1r94BVPYZilTa7n5G8liUScoxFCjLFEGMMl5fL5XpjBqFpVY0Yh2GooA34ywFYC9mr42AEycFTwlSUkHBMQzIzFTA0LRJiBERENlBEQ67/tCmAir/WWnUjpGponutGWPNIxs3dAWxTMAjMSBgAixQTz1Lwxiln/SqHWH/AtcsEVIyJAUqYtBMKLt0FQNddeNu7jtMfIlINzvdydQBEYA9EMzXmhpoiIqWMgnIAj3vDcQD12CSqK4PfAbFxPQybWclJSlYzjk1Uk5y3pYgWplDNTFattAYkJTGFK9LS0TEHKsBATXVcB7x5Edx+QqTOiwJ6izoYVIFOpTcBPVsD2QVLvo2S+xeqxQ4YWCtHAt70Ylfbg6OWVAd0H1z8qhtndhh1omh+/BIgUErJnD7yQDfwX0YOAiHalT/GbzSfiPzzgbFRx/9u/bz96/XXDkeW4wpFqhS1X8g12wJrEsZ44dS925zfcq4ucgRmCiRDFqNhvbp56/jmtQNIqb88w7IVSShYuoyqmoeLJ6eLs4vtejts0na1rXZk5txnhXTQTr/1xldu37r16otf+bO/+sn7n3+SpBhkQzUDoMgUya9QQOKIgBwCBwwhMBGH2DYNcQghIkAeMgdidosRmpkUypIvl+f5LBUgBMhDurg8H7ohaz9v9ovgcrUiNAMqKSNXjVZJmtJwY7576+7dXoZnrh1/91vfvHNw/c6N48hgWc1lh4E9yNuk8mwYAKrGwxA9KgwAyXLxqAuTfLA/+63f+lpXBtH8q7f/dtEt/vt//a815//Z7/zBtcPd7Zl0fWdgq+V2uV71JW3W/cVm1ZU0DKkUZQqiUnIJod3d32s5NiGuLleL5fri4nyyM7+8WG36TdM0O/Pddbel/cOn7jy9Wl6+++47MqQPPnz/0dlDxhiYAahpJjYIQJnPpvv7u0oAgGHSTJopNXEo9vm9z//lv/hXy3W3Kfrcl78KH39wdnG2ujjf9j0SiWU1USi+TBpQ2i5ge/l4s8XQXJ/thcnUREWE/H2jEb2oeyl8MV/Aldmxgu3VEDR2pSCRqhB7gKM/u24quGKNCBDUNJUSgrtJxBd4M3Xdp5mNeDc1sfbOYq0/oa4f7n92P5Us3hIHBEiBGQADoblWgQDVU08JzFxJBA5G1aCLynq6+YCIiFlMIkeAKoA0ED9PfGNRLWpAQJ5krDViesQmvBcEQb0R82r0M2SuchJExBodj14UIia1d8nhLfjNdx4BQcQ4cOjT0GhT9AsCMzYNAGRTMygqTDTGnF3pRoBcR4sARjsH+/u7e+tNt1wu8tBZ7WcnrXSCElNlNhykqlsVILKZYWAtxWq2lcPMUINORGOIKoZEWjJhSO4ZDQwUDNgNDG4cB2JXG2vtRzECYCJwyZTbAJwQhjqOYDWlq1+NX+w69exG/4D87xOO/yNWUA3H38cfYc90dDPT+FvY+A9A3ezqVos+nTCT9zfFps05IZKiOOw/Xvf/fzEVI/3r17hWCad/raP/F0bK3c9xl1tU4Mj9AZUuq/TM+F0QYI3EwpEjq5QajXS+R+Sp5FSYgoEg22w+a9rJ4nz14N33jvZ3JtOGIWCBPPTnj04ePXhwdrEYNsNquV6ttiI4pCLJrfl669rRSy/ceuP1rzbTa4Th4o8vHy/OtKK8jMCIyNRgbczhEZdCq7FF1MQmxNA2LRHpREPkUeNLYGhGfUqq0vVd6tYAiIwp9QYwb3ZjOy9me3sHHAmYi6RcNqZAIYgVQp5NDprYHhztfPONV9949cU7N29PJi2C5KLsiWWiwGil9hCYCDIhgBVDAKO6I6BYycVyiQ2VhCD52v7sd779tWHoieCnP//petj8yb/9k4Pdo99685uDWl/04vLi4mxBbVitVqv1dt1vC6o6HotOJYZZO2/bdtrOjCCl/OTsFEzl/fcX21UacghMzJZl6LuXXv3yuz//5TvvvLPZdienJwUEzHM1IEmXS2YIN27e2NvbOT66bloms53l5fr09MHf/vydv/jBD5PYq2++cbPABx++/9mnn50tTypIqKNUANzSb8zRXfz+/BICEDAFKAhgyHUJNfTQ1zqlog+XFTl1sbPSWAzgUDVAFf4C0Fgd5BIbb4H74v01gxgCgvn5LGIAWpURFZE3QodnQVQpMDNJLsMwFMndVhFJixhYaCbiHKf/EcEDTolDRYScgqyMItbKPS1CtbC3Vo1qdeFiUfFMcxhvPBAtAGBG5ITluJ27m0qr281PJt9tA1VZas31MS/muiIJ0ft63FtfT6L63FjtMa/vPCJhANCcktZVSzkGH0L9yHKdU2XhwZx0EKkdLU7eHhwePnX7qZPT05T7kgcTYQ7IhGJFs1P8jnMpSA2PIEBA1WJqIsXMriIi0LwxFDgE5qBOcSA2TVNEFcAMBUFSjq25ZIkYAEhVvPmYiMG5VKhOEQAcQ+4q9WHKiFgrfhF9RDcAGU9ef9fcsutXjOHoXRyVxuMtUsXKXlNTBxyttwWOit968o6S4qqPM5RSfC2NMdab/YrZwuqzq6wNIAWq2rc6SFiFhrSCO/VLAvKX0j99h/iBxlneRjzILwa4MsvC+OeMtyOim5wrs6DG3kBo2jQgKrsHs+m8LUU/f3zv1+/9en/aHu7uq5oWOL949Mt33vvkk0+7NGAJi/Xq9HKx1ZTRVKWDcnfn1re+9+296e7du3eu3Xnhd7775Kfv/mKVVxibbuiGJIYcYn1d3aACZmiYUw3PCIFyTv4ohxABSMxKKaJFTUoRVUOKyBRiU3E+o+l0b39nt4j0Q5rt7LXTSdEMwMQBMuSskwAhxtjGbbq4vLSvfO2br7/6/OuvffnwaD93fTOLTFUeB6o1BBwMEcCtSdXQ5EJWMVPwrm01EwHVSTsx3e5PZ9/9+puWMQ/6y3d+3q02f/wn/0Pu05effxGn0+X9h5u+61b9at2t15uCuk2dQMkiQIYhTprpZDZpm3ZnZweJjODk9Lxp6PT8kYoMQx+biZkxcWyavZ3dw+NrQ+kfPnrYDVsHppGDgaaccs7P3Ljz1FO3DnYO5ru7ZUgnF2d/87Nfvv/O+59/+vD41t04m7z1k5/+7a/eXiwv+jxIrbd0gXRExDZOm2ZiRM18ttwM3E6n+9cOrj8VJxM1cnceIRlqHS/qc1aft3FprkgKgRF54Z15Ka6BlSyuaJBaMTsiL3gFMvi4rOP55lXkQEwGv/H0eymBz031XR31OegDOhAhhSpdosCmKiKqBQGIAyCYCIWmzlgeyQlAY64NB2YiwhEyEhEzTxq+ivJxSYyNSo+a90Ls4mxidnsq8sjjGhCTKgTk6pZxaEutiCAzBofZOXCAir5bRTvAj5F61wAiMaMRKohIICZvYaxfrqrUhNGRaTQzgCufowEoGDsMQUgBVWS73XRDZyKEEEJE8uh5qTnJgUPknEtOyQxMBJi9scHApJS6CHGo2nN0iKJaLaQohkCMpjY7PNrf3Tk9v9wuFnkY0ItfzHFDA0AwC4GzAHqx5UiN+kxShUjEiJ7tR/U0HvlRHLna+nQRuZTeIQVQhOAQjBvNUUWAaxyVO6NqNhzURUv92SSg8VH3g8i/rmICSXyVRQQfafwIVvmCADAwQwvEV/rlcUz28uKxtMeuNhSHffyRx9/YeCqaZl4qMKZh4+hB8A3DfyA+P9R1Ccb/QCDieTPRnCNSDLy/uzNt409/9c5bP/vF3RvXp9xqEQG79/DeOx981PUDATWh3eS8lX7Rd8ouCwy3bt39+ne++luvv9ovL0/7z1Iq7WSiIATAsWlQckH1gDD0YsdMQGrAhFpEgQtLIEESGSAamiEMUopKyaKllOIVpaaa+gEADbJJOTo4ODo4fPT40XQ2nc6mAFhyyakHJApBSiJoDo+Ph9R9ev/d7z77u8/dPn7hqVtHR3uggi7G8ERjrzepyYVmCiYKQB6I4PSvFQUTLdlKBlEtAioqJXKYts21vfkbr3xpebHa9JuPPvr1g4ePf/STHzXt5ObNO8K0Sunk/GK5XBJhX8pivRyG3kDRjIkDh2k7ZQCVgoQK0vWrrFzSkHNvoMQREKgJRUpK+fD42s7+/mqxBEACFrUmkhpYgYABkXbmu8+++NyTByePTp688+u3Hzx8crntJkdHq271g//+f1isN33unCYBCIHIhTdenwUhJlUDS5sNxsnxnbt7155qdg6yahblJobI5FIfE5VR5vkbBBUAVYmImZGHz7s6nis/yggIKnWYojFYwuqJVofaqzqML4ZcGGk/cNFRPRr9rojMYKgmaGiiSDE0gRBSSoiVtsxgimZSELCIS5kxSxknuauxq4qmEQmJDM3dDKImkh2K96HcEWBHB8xAxaXbZqZ+EpihgXjRN1wBE1ij/7Eqwf3nAGbs6gMc328Ha+rmX7MySLRUrsQAgQITMxpgUHFt33hymCMqPv+RY2TMTESiolKsCn+wFEEklHB68uRycZ6GnIYM6uGekHMBP8GtxGbWthEppZQBAGs4dR2Sq98KrvCueur40aWGIZAb0szk7jN3v/+7v/3Hf/znHywvwZADExA4wGdmoghUAaHKc4vvLoBjU6Ohqo4ZGhVyhFEHNuIo6HeG72KSBeDqLHVpFxuqAYSmQawX+BjhgQp+6Zp6XzkCI9fvr5ZRQAXyzYgD1FnEtBSrZy+ONKMDpVQF/G4DIdSCgKNCqx7i/lyNz4vvEuN/qdsVfRHKW02adUkZ2QICqJncV5AsVNlQxYXUEFRUi4glI+uHodv2n9279/GHH24ul2XbXZxcHN2+drZcPDh9zBg0ldn04HS9Xqc+A6kUVWDAdg6U0o27T330Nz+5d/rk1x98eLI4EdEEOaUMiIQcmIEL1q1f1TsSlAkZDE1RFDGroRdJEJgUkZxTvemYVTSXVIYBQAAEQCdt6PqNgU2mLRCk1Heb5TB0hsYcTTTEliIsHj/Zu3btlS+9+OKzz9y5cysSDTkToEoh5LrHXa2BXpaKgOox3FUiQaCgKikjmKogGCOjJDJAyWR67Wj362+8uhz6IQ2f3P/o0Wef/83sr1975etNiDSdF7tYLLeIeZuGIQ+EEGIwK1IEW2xCCEBp2JKFwIGYck7jO26lFI7MCZOUk4vHDJODw2uL1cqnkclk5q4aFQ1ETdNqgfuffX6xuXzv/Q/e/+DjB/cfpiTnl+cnjx8s06rFxq1cITAA1SOCEAhDbFRN8qi3n3IBLEQhBuQY1MCLXHwf1ZqZgXUhxiuNsROHyOwvhheXOrli5gnzCuRVMz4ojhbZ0RZZJzjEEdSlcXS5GmkA6lYNBhbAZXLGQIbQNBG8FtKxTmBzUQciIGFwJl9HXBgAUN1fhiDg7B+6eMQ8LoLZnxIgV1b6IQ+AKKDE5O4R5GplNq8+l/pFEoKpGKKr0qttSeFqA8MRa75q6fbgOazt8MRM45flBmMDNeaRo/AfAo59hkDVdlypzPHuQQCmQOwcIdEYF8rBEWHdbDfQASqAUWRvSRyQKXAAMCmsIiWj1thLrWdfpUP94sG6C430pM+raopEIpkQpWQE4aKHzc614+ufBEa1wDEYCiKojnCcqhIAEJOO8I6f4zX2DJEImxBVpIiJedmfPydWUZoKAJkWc7pHVcEEAoODKaOalpjNYMQiqVpWgWrDD9RQcmc2FOgqigTAIJKJuvHYpJjvgPWDRcOqwK/W7Yo5mrnPqOpc0H4TsoG6eIxEsF/o9UHxM3H0l/grNxpqcKRD6mgBSKMECWvCNNRFG8Usp6GJcWcy3Swfb7uyWK4//vTe6fn5digPPvr44aPzr33rjSzdk7MLyVpKmR+U3so2Dy6AypYJSKST0u/eONCI73326U/f+sm9e/dXQxeiqhgEQDQMDKgmxYAZ2W8FADRfqIGgimURFEMgLwsBgaIFCU3VyLVnpWYBMa3WS8QmNFHVhm7bd1232ZTS+94eOIjK+ekp2ObN1773W99+/ZWXX5g00dtuOVKtP/IkK7pKuvXUvxGHcwGFKaihKappyVbETESyV5wSQmzjROTWtf03Xn5+s1xt1ptHl/c++ujjVOzVl766Mz9AfFTMNqsNUHE7vdZTD1Q1Dd28acxEixoUz+Ap4spKzlI8HVtBTs+eMAVEjcQJLNDk+PrNi7PTLEmBJu20mcxW2/wXP/zJg5P7H39078H9+yqSUlqul0WHaZiqGpoCFCz+kBQEDjFyiO10ShTTUFIezIwibxeLnaOnEaMR+9COBqA1a8S/fhq1LPX193jTamQ118AwQU0lcCS3iF8A5kXhFZesY82oi/Dht46QFcBw0BRI1aqsyMabAQw9nwHRDNWEAFBdAajg0Y5+dtjI4aGn8NcsBA6hlOILvKr5caz1mzUnhIkYsRKfLvCoIz9UKRH5fxWs34PPaAZWFeGuoh3tPwYwZrYDIiggMbN3pQhWUMAPGVRnZIlcFoVILqYqKo44BGRiQK/x8RL2upoRmZqBV9TW9Ig6syOJlSu3Ahh5TxUzUSA1izEgeqybIkHq+5zrqU4czMxGeRxUa59dLUQVBRq5CzEh4lKKgRHwwwef//jnv1heLBBJFFgUQgQTGKfqeuGHEGPUGv4hUrQmfVY7BXn4j6lSYAQDbxlWM9JK7gNUkcEItzATEmqtemGnd0xtrFHMpRQIITArKXpvNV9Z2J2z8SPZYaYrh536tjX+fH2FdLwaQeTqAAcDqMYKH2rYHxQPWBpnf7N65dQ/umJbriLwUd7wN/Wi4/+EgEDV2eyXPHrKTX1VRkGeSn2fuj4h0MXlcth2m21ebVIzkScnJ4/LdhhKLt3JyaIvopCPwg61DVIAVUYCDJFIVDhEUC6T5qRb33v84HS4FGDNycA4k4KIFGIkBW7aUkbjKDFRMPPsFAOmEEIIgTioKmsQE01Fi+RSgDCl3m2Dfm4OQ5rtTMAoDd0wpO16nfIAqobBEIljMeDJ/CsvvfZP/6N/+tvf+vrd69f8nqXI/r6BeeqLL0fjO+tjq5/+qlbEVCAVsKIll5RNixYpks1US1ERRjPJTHL75vXXX3lpuVr/1VvDcnP+6P6nzPH551/d3z1sp08266UZ5NQZMCKE2CBCkVzMUhlijB5MiM6REJpp8B9sLs20kZRDnExD6IctoihobCfTdnIqolAI2v3dgxiazx589OHHw+cPHywul8eHR0PpNovL0LJ0BEiqwzROrx/evXv79mq1OT09WXddMWXmJoRi0LQTIMp9b2XI3Wro160cMjccqmqlyt4rxkpUlYk+11eVcT2RkRDd/ceIBETMXKQ4OF4VjsholRweRx8/uYyqGujqzUOjimV+wcb59OOyOjfnMyGCr+Nm3iZeHZ31NwEDpBhYVNEshCiqoFZUgICZzYzcK0qEYORhMOKtTWhOOTDwb0SzIJKXYolACBRiUCmCwh79b4ZACkAekgw4ypVo/JIAzDiGwIxIilC/equj9pVMkJAUAAOAeju5AiIqEEKoo/dYhFIjbf0irsH3PmeBJ9cjgoxQnI+GgQmRPbhFRYAJmQFBVEWFmExM5DdAPhf/wiguHIcCh8dGwKti2lK8IJYdeV8tln/91z9CA1LBiGgCghUdg2oJU7DoAACyoUips2wTGyBS85fTwMOC0c23gCrgQA3WPUFNVZS5+ryRWaQ4Hh8bVrOiggYUgqm6ZcFMi+h4DqjrscCo5vmpe1F+k74a5UZA49NpKgJSpyEXTVQHGSIRqYylGnBlMgSoGgAwN3/UWb/CPVUSVEkjq7Owr8EOKX6xI9SYJASHNPzWGpEiJFNlZmQyMUde+2FY91vlsFXbJ01mAjCbz9JmEPHXmqazKTVNCAzJUBWBCWEym+3u7i0vFh988uB86EsDO828QLRIuc9FkoGBiJ8ChIFCwyHGEBEJLYBLgxAYrYlOKaG/QtpEyUNB6IeVQdBcSkm+ypoBcgDDnMqQ+jR0KXcAwjFqKYYMiMzN17/+5j/69//B9/7Ot24eH4UY+2HgCgH6LlgdIghgohXU8x8soomimZaiOVkpYJJzymkwFSvFo9h9QU/rdQg0nTS7GZ66ff3F5556ePrk7ffX6+3ys88+HESuH9za2zleXC6GoTcAZgSoBBREGFLKs6nlPA0Tz8vSWhRqVmy2O2vaqFpW3Tr3/RtvfmO1Wi/PLwgghqbvxVQRwixMY4g5lXff/nWfumEYYhsfPP68G3qBBJkYcKfZeeHFLz3/3LOvvvDSnVs3P/3ok7d++faHH396ujiLTWtaTDm2QUFNm6EMViRt15pzE6KYUIhXCjU0r0wHbzJX98I6dDNijn40u2STY2jbttTUzwIGTKR1Y6jjswHWBMbKlzlrhCNC5A3eaP7xQ2UyqabhVvKuYtE+MXqfsE+oZCoecu5ycAPDdtLu7u1tNuteezLjwK7aASQT9UQzQPSEcDKQMf3NLWAO7gK4lYUMORA0bUNEaQATdzIZIhkC10EN6zDnL7qBoakaE1btuGvffWxmBMExfAFGQAdqJDfp1bliZsFGAdZviGQRRsEnIhGSFCGmokJIjgTjyMGgLziAQKBS1AjVYhPEVHJS79Niz0hjdpeaQB0A/FSpsJ3ZiD9XSAaRgJsAvhFQ9B0n96sVUSRkbhotXmeAdUFhQjAGRAAtxWdeBUN3MDtJK1bMJCcmZgoG3tbph6xrXshAPAE7hFpcK1KIyYAIg4GFEFRVisbQMjeimUMjpUBtNCL1KcyRfRUwIg87EZcl1VkWSbT4OlzRMNMxDgfGT65qjL7Qh/kHhPV5h1oT4ciq70FX5K4jQQqqNeBo/NHW5aEGHfoTAKPcrD5zZl5W/htXlPp+EThEQsS+s3uffb7abvcO9vq87YfZbD6fJysq592WA5UMM5oc7x0JhQeIAoJIgZkBdqa7L7/xjfff/ezf/OkP//bjz7ZJ7jzzbC7TOI2BZiHY4ycPFicniKqimqWZUAhBVZjGr0eKKYY4bWKkQFWk1sbYhBh4GFLgkPp+ndfjXAFEIYSWoenLpu/6nHrQ7IcLuXwC4XCy+1vf+MrX33z91vUbTQxeCuI/Nifxoa7FgKYA3q4HQPXTQlBQBSnm4p9SJOfU9zklNENGDgiIqoJIVgoVQ5GG4dr1o6fv3n1yef7o5PN+u3nw6fuXZydNs7O7d6irgnkAEAokuXAMJSUJkyGlMJlsuyHGyaSdbzfnFMi/lAB8tHddsb88Obt//7MXn3vh+Oja4dHBYnWe8rDdLsAgwiS07XqzWlwu1tuFgDAgsMmQGqZOYI6Tl7/04vPPPfvm17/y1LUbX3v91Sh2az5pSyKR8DldDltBA2YRUTHkGJFyP6TtCvIAk4lXwjvWDL9RCV5T0kcE0wnLymhRZRlFpW3b3b29LLrdbmrUpLlSB66eXAQEpECoIgYEVyem1YyxsWDGj+96eOnYP0vO4Rkyh2LZQEetiBeOubMPzMDDrpPlg8Nrd+7e/ejjT7quJ+aSBIISMrjYWpGImNkMpBR0dyLjlcfBQ2Vg7IAKsY2Bp5MpEIqpDnVSqzxJnfLqsIYjOeDFuzEEPwTEbVhIfiA7ksFXjiFwMMYPoYqdccOMGohw7LAd8bgvYjKNMSCimo4yG/OTwa4mZaiYk6ERMYcwnUza6SyLqEnORUUoRKoZaFDBDv8LqkiIv1oOTozf9ficgEPzNeAsckQK5ky1FACQrBwD85iAVj9sFi1atEqpOIC3xPmS4OsNkX+X6IsOMjoUpY5KgQtFHbqKTXR0zBN+3Ka+f3i4O9/NuawWC5XSRA4xqGrWgkQco4qUnN3dPmZ4VtrKzES9TQfNo6j9PMcRwPRLmNDU6AodGu1qgL/xSDD62Ya/iaKOH1D9bUfHOdSvYDSyuU6pTpYCVqnpL549ArSq3zZEQhYzM1IjYlAOl+eXg6TDo8Nh21tKb3zt9R//+O3F+mK12poFAg0c5zvzrlAakgFwiGaUpFBsp7Ojdx4/+NGP33r/wWf7e0c73CC088n0e3/n915+8cW//NFf/NUPf3j/8w/V24hsgjKYIQATGFNgYsuFwZrArr8iNFNtiDCGSdvu7OyuluuhT1upuzAixzABCjlLLtlMmMBD3pmwiQ1FGnL6+S8//Oab6+b1FjmoAnMcF1cw11eIoqJWGahpEWIyU2Sno8RUQItK0ZJzzrmUlLKJECNHNoRcsqGVnEqRklMMvDefXTvaO9rbX64Wi+1FGf5/VP3Zs2Rpch+I/dz9Oyci7p57ZmXta1fvaKDRaDQb4AKSQw4l0oYSJZP+KpkeZHqQnqQXjZkk05AjkjNDkAQwbDTQe1d3VXWtWbkvd78Rcc753F0P7l9kCTADuqsy7404i3/uv82Xq2HZla2trUtz2abZzno8X6/P4c5ORlTdCLI121uuz6G+Nd857U7XdQ2Ywtd1dXR6crC/6Oazs+Pje1/cYy5DNYUN45KLOLF0hWhW67RaXbigoxm5j8NkmKB+defqH/zet7/1jXdee/W1r33jrcu72zvz+W4389V5Xb15vpxGw+qLu0sdANbJiTsB1tPk5ON6Na5X27v7xFTduBQGW50QO8KSqY4H3t08RD4BYyY5TCSlUBAApu5mMI5sx7AgkRMhy66hhbhYA3/yZcq6EoYpyu7XE4tNHJoY5F7r5Gj/jDfe0swtIpA7qVkpMp/NQ9Af72WZda345EKy0s2IeZpqk8qDiDuWahrckIsTsxuZWccsXXGQqUW8nZuxNCY0YMY0QEeFjyEHnXTBQ9RazYyEyYnB3iJC48u19CUhdksPbG5ud1AhJphxxmsYJSiQQnZmFmHazBvOcIhICB2kMYcsAiY3nc1n861tKcJF1uuZVVdKxWTgzknKZG8MwCn3eydxFnAd5baHOGKcAavVzSFCwS14RrOVrlDb8xn3HIBZhDZpxJ0FUKuoaB1vKSXE/WjiEhCpea4rjMY5aPhq0vcM6rq+62lcr+Hujtn2zrtf/eo7b7724ad33vv5L7SO834W+0GZCO46VXXjIoxsOVRbfxMfMm5tdD7ZvnukPbekBwoCiijh5ZyYPFcBcaPSGvBPANIAjw0lkuOfJ78blFg7HJLqpwxjREzijuBFotNmjqjRVDkwkVNqGkmqOzNuXL988/KV11987Q//8A8/fu/Ts5PV8fkF2JzZhYbJr1y+2XXb03RaVcmNzYlYp+nJs8dPj09G+PJiPdZH43i0vZi/+forX//GO7dv7V09uPTv/s2//uzBZwB0XLuwKUnppOsZ5I6uK1bruF4DPtXw2VQwO1xKN5/vlvJ83Q0AQjHrxnG1Xi9rHcHGJIEgdv2s77thXJ9fLO98/tn56ZH0Epl9Cbo6pY43BgJVqOqkbgo1tUpmRoA5zOs06Tg62Wq9Wq1Xw7AeV4NEUkFlh6sqAC4dJpPCPfH2bHb9ysHl/YP7jx8RCsEcY62rs7Oh49nB3s1+d4tIpmk1jSORwJfj9vag4zCO6/UKzFx6tlp1xZDV6uzhk7vTeGmqNqyWn9/5bHt71wwAV6vDtGL0hrJaDVzcRWodUCJajB2+3e1873t/9IPv/8G3vv7VV199dXe/79iH5YUWu3zr2sujPTsZn50Pz06Xvjo/Xa7U3aWbbS1ovQb5OKzWF+dyg4p0dZrILKjq7PaogRCZ5ZGlblOcq1YmEeJhWGmdTHVy5azMzUETbWKcJRsnC1EmJzhAHDNsOFaRiSwiJU1hRhbvRD/r4ehKqVonhziISc0kOlSGqzpHnikzaL1e3XtwMayXIgwnfu5HdbhJ6ba2t/r5bLUczk/T5BS0dxGZTEHouOMitWrUV1MbdV1N6zTFgE/BlYYjNAFfRA+XAnOnoDcdAIyjC8x3lrkIPLKQY7sGgAhDaFvEJEAtFFfF5hLFoALAW7vI2QVaijWjkU+1THwIjqJMsVaeza2OtU6WkiPqsijXaLd5M7gRA+SmhkhToNhq1bCPNggwlcDjTC0yl91j92RCAVEqo0/gDNR0GEhkwwa5w4M3BHUibpDYXZdLJKKquxGY2AKH4WyrtU7MHVHR+L1Mfen29rZfuHrlzRdfXF2sPhBWolrHfP4gxFxrZN45ScdMTsbgUI0LFwJNOhFFxE3Ad0mHpLI8j3wAtBH6t2Mh8c8EfGkDnXkkOpulEC0xIg4458vmm4AD49/ThnCIv5I6rNS7U7i+J6sgN/JqTkYGKn0PzLp52T3YkfHS62+9+Sf/4Ic39/YXs+7R2dm4Uk9rlOpkVw6u9v18OZ24ObuxC5Ofnp8/fPKk2gRg0sFqN1g9Gw9//Dd/5VN99xtvvfzyC7devn10drgcz6UIpd0uRGPGxAYDzKzCEcE7VU2noToE4zTSMEzTGLRJErQXF8txdVbHC0DdYuMTGGxmy2FZKyt0JnJwcDDrZ6lOQYPJ8sQMyt3c3GuFm03VyT1SzxAWFtepVpvG9Xoc1uvz1TRWIZJOxmkVNH+sAq2TurlN2nfdVj/fmS9mXV9ATlw9tnBWs3p4+uDKpVevXnn5+OzBdHrMMFAdptXZ+flyuRzWK8BNQ6cfEgqsLs7O0LF06nh2+My8kIpgbhhUFWyqajrBKjEVLlYNbMyloPvK21/9wfe/82d/8sNXXn+JC2wcRIi3tqZhXRbzK9ev3Lp9dvPB44/uPVySnw+TmYSCsOvK5FXHsY6DaWWOQqZAdHoAiaecBsRp5I3JitMQRMQ59dZxqDxRNK0eLAi7m7lFTo4/b0wIzmjMcMAankYZMje3jI0zAzNa2c6CIxKtMM1mPYEmVYLPFwthWQ+DI9at+KzrJtWj42MSRBp8OGLdEZES0V+zkDCVwiIcmQEixTJcx4W5dGU+nysgpdNpHKepTlMbV4yoNBAr3/ecx5nCxhAkeYZgRmqucPhJ43KaR5R6SE+CCM7jlpOWJ58MzKXhZfGjrbWNacXyDOtPn2gjEzaYNUkwYXUKMYZO9XQ8BZOqu07M0nVzwKc6gZRZ2lgTaLmrxTtDCNcRR4BGdObOLW0JRKSxxd6IYM6SIrxNbhtPbbtXnnbuwYxnMHvLb6Xkh1NT74j4PKjWwiIiNrmjFhYWVhujWwl8X1WncWQuMDo7Ofn5L3/14NHjpydHqgriOg5SeipycOlga3txeHR4dnIKdbNJm5oL6VK2vHqlI3Kd8gQMCiIvMsURTpHDlO7gJtGldq6h1fHIBQxFMgAu0ngcEODMIQIiJ/JsWqL6N7VnnCQNRYwhOTEoNRgLMYv0ombjVAvKYn/n7HQls9lia7H/4u1X3njl7/zwux/97Belq/V0WI1rF+lE1A2mXd9tL7aOL0LCiVKYCj87Orn/4MG0XiPSlNXM9LNPfnd+dGqjSvHj5UW/tSWzzkbn5MS173ouQsxcmIWMyAhd1/Uyh3twcKOqq4uUYZw2UcMArNrq4nSczg0joAjfOFHppAhAXWW7dv32d37ve2+89lrpOtV1GkfysYebtenVgRppM2ZT9GukEccIU52maRyHaZjqVIdhmsZJmDGNZgZTLhyNp0gRNgHVce3ms76bdb2DzUfOUs6Ajnrx5Oknt154+8Wbbz3u7h6fPqnj+uT4+JyPSKmG+iGObRaPVQpVL1an8/nubDYbx+Hhg/s5r0Pc4Ww2DcSesYmETnq3yeq43S1efOnF11557eYLt7RODqo2Opg6Ji86jbxVrlzdP7i8t7u3eLY8m3Udu1wMw3q44OgKh3G8OBtXF4t+FvAszJhKDKIauH3qD7xhMbko3mMfuJlzKoKS+OIUKqhmBgJy3IaIxK0MVVaMYTkvZ49U3AxCUEMut8jiIqUQ3KyawolKVxbd/Oj8DMRd14HZx2GaRgdKYa2Wn70mIB9EQgJHhtL1prY8vVjycqwV7iIlPq0lg5ECGORmGqKuV9XJPFotILNnYqrHBg5nIYpVCHFGEgGmzSyMphSJ6u1uFO7iFv+WE6xTYxC5CJEVlhL9E2+A4SgQAfu6KaBqLI1gDAwuCLHEV3I/jdZqoNiWgKjsZLBa3VWVmblI2PqIwCmpbC18dsDEXOBhvN7oXhtDwQiNpqRBvOG6RMSF1Y0b3OHNYRBXr1mmcqZITMCJyNVchIQltFEwZxIpAcF7GL4iFLQqM2ald5DV8eJ8XK+WD+7fdUPAYyzsrkXK9mJ+7cpVr35xchYokhIY1ElhZneCuWnSD/DG9rRohxBimRo18U8utfY2HOVStUjXiGxI4tjDk/i+EJEUcYNq9XA8Q+LNiKy0RhY3wrgdKtTUR25krmwkPQt1q3EtTCwdGL1JKfNOBArhbt5tCWheStcz6bQl6M0Mbqp9V3wyMe3I+q6thAYJQIKz85PT84s1NIZXNgAVwHo9vH/nI5bZcjmeHS8n1WpONjmMmdVHcgKXyRRerCqXfiYlfBgMn8CY1B3r9VCn6h5x0Kl7GqdTxUgIYWhugADA3E1jvX37xT/7h3/2Z3/yx6++/lI0RfxcqJ2jMcxgahohxq5Vraq1VsbBgFmttdbVcrlareo0TdO4Wq5KCcqN3JVUtWrX9U5ubkOtEQgIDf0hu0tMOrErBK4Vy4ePP2B/7YUbLzn82ZO7XscKJQjlMNTQkOgkUW10d2zv7ArJydmyL31kLxLIzEnMVBkIaS91DuKqS5YtcrDFriwr0heZASAhczcZwLpY9AeXtxdbM/PazztXGs9XUr3rCrmDbFidDcvl9sFlBqpZX7psVaKZjFuViKwjAz8AUCzbQspqEPRVZrqEAq61ukTZspjpZmGkWzACABA2HQdC82gGYtKqXNJSVQqHHEhVa5260pnyeV0FJDKNU0SZKqxIF6R1DCgEDheXmoYQW7i0Nh3jOBq5m0cARlRdkRKacjhVnerFZEA/m23v7Mzm8xwirGYIUgsoiIc0bcxxg4ngaTXJVVL5ddEqXoufcSdyYYkPUFU9piGAHF0pblY8euAkGOKvZJUHpxGUnpdoSJGgIttxQy1EwoOMzhLDQkxx+JOawN3IE5+WqPvMMDU1KyJSSrxRzbDViE9320jFmIRJa5448Q0921smYkFhZs922RNQadiKA+qW+LtnREYBEbHGkoHSEaFqBdwIxBKRfsIZa0oJJcTuTXe3OiEl4SIsMk4T6nR+cialnF+cRY9ALh1vTO3mrmjqHSJh5tIx4DpNAVnFcc+FMwC9iWY3Bi963p8nypNSCs4wcDNQrOkgJ88MNURMSkEGS6dKOC+0tyi76JUd4EJsVMCz2bzCLl+6vndwcHZ2sjxd9r0QaR0HJjHorz/5sD49fHr47Bc/+Zmdny062eqoYx6RJp1+1i16IfK2mEI66aR0EDq4tLfdb4/jxT7v+Yz7sru/t70e6sP7d588fqCDLZer8/UpOZkqCOp1dKhDSMWLC3cdD8PELLN+no89+aQVRJNPy+XpNK3aw0uOMfcPI6guISfppEi5uDi/eunqf/1f/cN/+I/+9I+/+739g4VPo5sbaTShQFK+Ge9jMWyoah2nAYCE4NBiN4WBzNRcbRqnYbUGMK7H2WLOhDqZQ+eLWZ0mI6zrdLFaHZ+dPn12NE5jrZNt1BtwDp0F2Mmnurr34MOz1fH+/s26O5ycPY4Xv00kKRNgdwIzCoEYsrd1dbZYLFd3S99vFbGpqo7TNDKH9FGFiFlqHcNNWYeRtJ4eHR09fbp/ZQfecd/1pUBgPdm4tJEmWzNTKTyMVWadMPf9jHSsdapqXLopRIDMYM3OlYD0xjOCZfQEFuJfWujR4U3Ib27UHu5W31qHSxs3fwvYISHmZmIBkRMXdidVmy06VRvHKYw7zNAQjQkzg7sOYzScGKcpWsRSZBhHEImUfjZzd2lAcXwKLnGi5CSBBhCCSLoiQGyDCXk9CBEW7R7WRg22UURMTURYZNIpUDA0QDxxxyQFfXOH05zjxExMUEplJ3HE0gDYxIMl3woHC8PJyaWxgSAqwkJEYDHXAIxifUE8gF3fu6PqFK9fg4sbFJFlH95yhJFu1rxQ0ziVvutKN4blKZerIClWAwARFmIhMUESxR53mongDAK4FA8VF4yEcs1bxEXlMBR9k7TGAMgHI/vaTW5I/GvVGlukRaSaGjm6rltsF+ZhWI/Lc3cqHXfdHKk8UwKZVYDNoWpdFxEO7CVy9nysE7HUqZ6dnVyszuoU4dheCquqe+NvojUAO2CqHNHTbtJ1oW5qZz5FrAWBzNTBxJ4R4+mCj5aJEXr7bOvMs/ZMuWMPyeCyJKvgcfi4pxECyJOkPcgAcvMXg8wV6vCvf+sbv/eVt/77/+k/nT097jqZ1Gje7+7unJ2d/E9/+dP9aXz4+PFv3/vVbBh2tjsyG23tNKvuXGSxszdbbPWzGQAmqe79rNvd37t++8af/L0f3nl4972fva/Es+35S6+85GS//dV7Dx5+4bB5v+vOhOJM1cy8FimlsLmFuJqmSlyEzMyGYW1mtU4QqNmkenZ6ulxfVB3axLPZCWGAAMSlI50ArFbrIvSnf++P/8k//eEPfvD9ve0ddauqCZcxReK2q8GCa2SQwnPNUDS2VY26QgzTyWolOBNNU12v1+NUSyelExGGmUgZhmmctPRlqrperdd1UqeTi/XjZ6fDaFkzclZtqgSIeVXU4+OHq2F9+dK1WtcXq2NCPDTh1ct1gR58L5SrHp0fzcaLUgpAB3tX+jI/PHkwHR+6Ry4YAvajNN5DOh6m4eT4eL1e7tTFrO/LvIeZY3B4EcK8MOP8/PT87NzIxvU41bmb1BGx8ElEUcfpYtk5q/BIgb2yCZHld+OMonJ4ykziWYyjAE2sEy9tdHPRfBEROaWHP6qIAchNKQ4L/IICQ2efb82uXLk8DtOTp4/hEEa49pNEjMDmrstRHGrmZqbOxFS6ToQxlmoaxz2LwGP7ADZ6uU2hzqDw2NRFWtsKsCyInjAGO7lDxKXwNKzcyXSK8OgAh+HOLBtdXzK/oQL3Vr25dcmckvzn73KqIRFqQyfqZ52bqZqZla64uamzcIlIupgsIi1UpERP2c1mUYbNxNmJSJoKKcxO6TRIeQ8ILB2YxM3UlEDcld2dnWo+aRV3NRQWD8bcap7haK28O1EY2ODxUOYXStotPr+bOVxCWcMeGl2lPFEj5+P5QJQoUjIpMHW4E0spzAVwV6dZv1gsLl27tru1X5erJ4dPpnFkt64rIEDYI7/GKaYl0mSX4VCtXFhKMa2lK8SidarTxEqmTkwgBpPDdKpdV8KqE2JLFhGiMBiPY9B3UZ2zybCUSUVrE/mICUjBQYU9OA1hbqnX2Te4c4mzENJ1ztqJRKqpWrSuET/rweW3iW5Dd3ICHQISmsbR3Hb6budgdzFfmE218mqtnSiLA/zxZ/cuwXe7rb3dKxcnn89EBNSjUDcT6YRYYaUvpSsMqm4M39nbf/3NN155843X3/3KyfL86u6N+w8Or9+6uru/+MlPfrpajoRSUK5dvn1p/wqsP1ker8eT1erMp0mkK2VGhUlYSEjhZKvzZYCUqsodzHxcD8uT0/V6CSglkh4BzU5hICMiVxDGOsLoB3/8/X/2z/7pD3/ww729LZ001hoHJ4lQ91SFaoIW1Drv6MSIAFKtgWLHLWQWFur64ufublO1nfnObDZbXywJXgq72TRN02TDWNfr8ez84mK5Oj27uFgtCZ5h37556RkkQmxkbjauTg+hV/evl9KfnD1jxLYBpNvEFRCgCG1Vx8VyqNVnix1TsMyXtVYFRFSnwCFJKDoPdQAss9l6nJxlmGqdrCszZlFbW63kTFJmPfb3dwh8evLs8YO76Gaz/rKOQ9WRUAnC0vm41mmt44iucNMNPm8wotAh2N/o34NSpcZdJn6/Ubpx7n20UDuQEBPDY4FJ5C1HY+TptiPhWHMXcRGFnAqxqptXJxFiNjM188nVvS0tFtOJhLVqgBtaKzOhmrmXvosijhxNQBx4UCBXDnMUptgGmLBP2ukTQYoRTVioACYsGmNkhldqRlbyc/g/ezt393S8NigbGRcXFzQuUc62TEQIZXeAQuYA1Vq7WdfPenf3ScFWQA5nrRrZPm5glhZnJu5Wxxr1AhGnDwcyWTl0NRmYkHtOeCPxcbf5bFG6GbSCSNVKKe7e+OXEyOIqerQxZsh1TpF2HW0qaWZ90WxriwjDOLqZaRg1yIhihULG/qCdlfHLPEYoZnZtidDUlvGYO8GvXb/y7d/71uWdg/t3H6lN48mxWYQKIiL9cgylwsQk4uwEmLu4EjjWxRCFySDs0pAOHnIcAzwDsYmTI0m5EJFIRwwpNg6jCAf9FWd4RoukuZxAJCIBICV03YTPDAr/iUiReRHpREh1MvdxmIhRmJ2cpAMwmRG3yFUmztVoyat5tLUGkHPEpAhbnX75y19Nta6HSUqHWERhNlQbLyY4pJP9xV5X5kxy58FjdLPdHakkpV941dKVRV8WW7PSJv3rN2/tX7os0u/v7f/Jn/79vjs4P19evrRz/4v7u3sHP/gHf//R/UdPHj9eL20hu4vy0unFg2cXdw8P7w3rC5Ku7xalWxhCxCUwlCLzee+aprtqvlyunJBBds7YgP35usQuDa+qVMo3v/W1f/Ev/8mf/oMfbO/u1DrFLSh9gRtMvVpluBpBESGNEZQSweUw4si8cXPk/OsOgMGlFJGiWsnIrAqTFK7TVEpZjQNTGaaxWj09Ob1Yr0/Pzy9Wy2FcZwObRSMbR7BwR0Kk06Smq9Xqcb3/wu3XtrcXR8+eaB2rV7jHy7u1c+Pg8i3u5quLcWtnPt/qiWVajzDzYT1UGBWwV6swDwErOYOZTMxpsbVDLBA6Xy6fPXmyf7BHtXIBFSZjGIPLvJ9Pw2plZ71iNRzrNBJZIh7mjnpxcnRxejq/ehnuk04dd7nawTOrMvs0ahQXJVsf3QkoKPrUPcZIZG1C/fJmROJQcjG5OiIXJxUwTjxNw7PHT0OQHxqHhqDmcaPq1EkzmgXgzhZ32myqE4WLi0laIq9Huh9nSI6U4k7O5rBIpxKi2FDSklfcyGOwZ2IK121M4u5Va9samyishEQy1ZCZdx8PQ/M/N7ykgR5MzG19ZhQ3Z5B6Vwp3RasGbMNEXr2f96OuVbWA2UZlKQDgxlw8Q0VQpymiIzjQpc1k0ahCIuJ4jeBJwQBuGkkRIuLANI3LYeW5QpKyjbVazWKpRtDIrkoAcTvciNts4eFDDnSzn83n81k3DKvlctQ1ZcyeeypYI2k2yRhnYyLXEHuwwzXQInWHVlUW1qpuuLS7+803X3eUo8NnBdb1Xa0ER9isx3Fijg3GiZh4bg+GwV0rFAAZe4JNYSycFShMq8e3QYm/yYnbxazadLdgEUHYX1iI2GGeJi2KZRFChUUo+ndhq4bEwDz+jLnNF/O9g8s727sgGlerk7OjaTgBvNYx4wCz1hMiMBXm3KYkSkYhBq+YpaoZmRfuHj94dLa8ICuL7R2rNqmBFG7Gspz8hGj7vBpv02z3eDTb2l5fHD9dX8xoaT5du3bwd/7u9//ip39usVQTKFtb126+0C8W1HWXb1z+F//bf0JG5NaXIsL3Hz55773f/fm//48///lPP/vsg2H47WpcjnY+TRdqtZOZqXbViQhcupls727NZ8WtGlFh7jpxLsL9MI3r5WlaHChz8eAxGVetZkQK3L798j/9V//yH//z/+bGrduoqnWKZKhMnTAzHWFEZlSEYMRACxeSIkQdRfFncXc1dXUCa7Wp6jjVXNnBDCZzn81nRaTaRBPGcT1OdRin9VQvVsNyGEcdo1ncDPOB4xoKRX4XsTM5FESFF+vl6mB3fy7d2fnJ2flxNXP3g2uvvvzGNy/fuE391jjpbFb6vgzDMA3janlxfHg4m9wvzoTNpmFan1hdQphLgWmFjcM0jHUYptVanz15cO+Tz2/funlpd2//8kK2+tXFUodxvZ5W6/UwrAHUWrmsKqZCAhiI67R09/XZ2cXZ0fzypXhPs9kjtPz0bF85qcwoHzHxk1HEhYUeIRRqRkSR7y8oVDg2+2qt7u6c62niosXc4A6rE4mMwzrzAgRExV3dwNjAHoAyIjTAjZjbloeAI5DZfuZF2r3x1M3AibjEvgFVj33q4s87c7T4xaje4eii4OrcYrlzKSWcDKFvFSl56HHAR5HUFrXxOWoSsRDR3cbrG7h6XDf3tpFdqDAb6aSVi+hUqePl+QWDuUhhEpREnZyYCttUSdjNTNVjrQ8C59wc2G36iWjGcMQxYDA3InZXkcLMwzCuVkt148YNUCb4EQunw80T6Ie5hWujZLMcQTrEDgcXKSx1HAdPEw1FKRVySyNIEhMt2lqiFSdpBIRnjLhw6B5MNdrfi9XFZ1/cX072+d3Pz0+PmVGYSteLyFgnAptrCYLfA5J1M0VmEFHwDcm0wmBgKW7WzG0AsXsaJoqwEVWvatqJhD4MbswUzrcm/suEKVfL9TYUFrwQnRJLdgqUJhSwEDEt5rPt3R049cyr1TkxaTWW0mbJABOij8i8qHxQAw5ycSJJ4i33HUnX6TSuz9dF+jIrNWYTM3KfzWZ9X9Z1ejqsD4fp5a989fWvf+vug8f++KKgzkAi8sLVy6+/9epLL77SU7f0iYEXX3/p5VdeXmzvkMhiezHrRESYyqSr+/ce/vLnv/7Rj3/80e9+8/TJ48dPHpyszwzr9CbCKtdpGohPCs9K2bJpuxSQd10RN5915crlK1NVGyYfx1b944WJe8T5SpKDIFxu37z9d3/w91579WWJLH/zHLlyb4gnKMfspmYqLu7uZlo1IGRPRMMdXicLckirqdp6ua7jBGKdqpszqPRFmDGaw2utThjUztfj+XJYrYYptfwtNSHUeZHYzqWEwlyp31p00u1s75hODx/eM51ms3kpRYdh3m+/8srrr7391v7lF1bAMFVnKgUyjEK0Wi77vf1u66CwwaeTo2cPP/m11qHj0s9n64vTmIru3Xt4erQ+Px3vfHzn9On95Ttvv/Xy63Va7924bIb1WiFddTo+OQdgqG4hr1R3hxlRserDar26uHCtLOLmZsZFQpC86TliCn2e3kb/f7IPZOZP/ruEhiLrgoU7MTWPp9jMvAXrN34MRKVENQnvDOBo4LNx5HqWElbHEENEI5UbGYPszSx2xGZvU6uawXbCkj4UAoBSChwWbApxC3VxIhdwsPosETaD8NwaPA5HV3WXiAqOr2tpuPe8pPkUG5oNiCjyjqItNyD9EkHNCgvBVZVAtarGTyBhwlgnV531cyYuBJSuUzUSLkUAcs0MjeBjmMMloLl8PIV8CbBHsgJa481c0NYNWK2xl5k3y4/jTgVgIhGSn/c6vkV7CrKIx5khXGBm1a3YepzWq3W+jsQMsWoNQ4xQ0uzPJRL4PPvdDF4QBoydSMTNhMTdqtYHd+7/qP6oej07Ph3OLtrMQWYkUqTrYguom0FDr+uB9RK5V2tamiDhOFhTpPmEmEgkTWRFun4+G4fBIx7OXVUNljo8hP9W88u5uxmzqJmUsLQ4gaV07rGMmODhpEPk8U3DdHx8vFwuidm1DsPAnNuC6lClFFMPtw2nWS7XbyLnzwAQg3TxOE2FC4i6fg7iftZN8TTBSB1GZg7uSjcbJn7/i/vf+d7/4p/9b/73P/4vv7h88/5afT6jy9d2/v4//bO93a3ZYrGYL5arabdsv/nW27dv3551/WRWJycY1vb06Mnf/PWPfvzjv/30kw8+fP+D5dESzrdu3Lo0HhweHg/DyYDJQGouFJT8yH0PH9bn3vEuE7EIQ1bLVZ3q4bOnp2cnsSKqcYiBD0b2U3QxZGrPnh7e+eTe+tvf8JmZjgyFmTCnv6xWFqZoJ8dap0mdpTDFFoXIR4fVymLF1cZhIEBKV82q1nGaLpbLYRoLYRwG29pisLlN07RerkZgIFysx/OL9dHx2dn52TgOYKMWUp6LnbmQMzlPZhLvDrGUbnt/d1qtl8vzs4vzoa6JqcKEZYRy1y+rnusIKZNVGoyAwQzzxc5i+/Kt21t9V4fVZ797/8kXH084ZPZFv7Bx7bN+Wg537n786/evX7q6N2N/+vRQ1+/NlV+bvbrPbN6Zjmq0HusYobdUzBVNtROUAktX18s6rglWCncA4ELRBhoQyV1EoK50QVxpiMSfg0POwkj3Z8pPzB2uDIY7wbkIq2g1LgxtDaU7E1e3tBQRuVogs+ZKDTN3EIuUIqGtmMYKd2d3xLp2AMmKUMA/RYjJpqbCDjWLO1Jm3c4YpGqPKeLfSYIriukzu1Kgpo4+2QGOD1tiQKp1Es6Ut/gTxISIrYxHuR0Ibk2UE0pnJgoCmcgMIqWqqSrgIsXJ3KwUqepEbKZF60SFSESiZCKs1Nbmz1SpiwuI400IWTxyDsJmmos7FKxA5OFJKSWc1FMNyUGIIGPJMLW9Pw0yTUotIZz4aXGQixSKZCXK+FYEzVBN3ZlFBE4QNrUk5Yiq1ZTMR2XeNNcU7AWXvmczTDSNwxeffRp3WghmFSzTNIh0pUgRpq7AbBpHa2pkAvXzGRMNw6BaQypSpHMHUN2qmauqiIRWy6sXESL00nmPzAkhtgieDV9cm/jzy8d3hIoEIGjq6UJKzI0czsQwt9i9No3D6UlF7tcE86ZFQjxOnN+dmDm2lRklrNpEBME9RlgZJatMHNJbZmGomXJhDpamOgwdlwnl7qP7jx8dfu/v/snBwc3DZ8/Kzk5fvNubvfHuO2VWrl67tn/p+rPV6fWbV1568cWDS5ccBq19V6rh8eNnf/VXP/m3/+Z/eO/nP33y8NG4PLlx4+brb7zz1ttf29pZPH56+PmdTz7/7JOnj5+er85cQSRGrHXiIubdVKt00nVSujKNdXlxcXp2Vn3KlwfmJHCnVIgzII4ueKcHj+//n/7P/1cS/NN/9MOD/blIz+RQBYrXCW3zuNexjqOZwozQSy8kjIhQArOITW7u7jqN1cZpPawv1quLYb2exskihkRjlaQULqXMZrM6jOvz1enJ+bPDiydPz07PVuM0ucBaoJO3rIOYMEIWwhLrU2wYVkzU9TNmVq1W4bBJdTIfyXs2rQ5VUHCLMDPpOwJbka5suUtX5ovZYg2Y6jQMpesnVQcuxrOf/urnN66/+A//7g9+8tf/5Vc//yU7rr1yvet7Wi5Xq+HZ0dn9ew8v1iOjY4AKaUUbrJwRZbFanQheSEZsakXwzhSLD0MwrrEoyJ4r0ayJclJnExWDMso2T4KqICNiDn9oICSRXNBaWDTyOcquUIg5QzZlQtyXrutn5u71osYKYpFogODpjeLmyBIukIp0WQWvqCyRVZxtKWmgN8lyJKSNfMMpeDsCi2REo2cCAgXnkRUwM3oDmI2fT/zc/9RUsIkHUY7s/KX/QimuISdyJjZTIiqzzoCu74jJDIWLOMjNq6nBiJicpZQEkTZLjzw/Xzh/Q3ZsbiFnTFtplO5YjxIkGHMAcyQczWQSu5bB9LQhg+ImxXHtlmNvHDFkxAUxWjmkFCZOvgbEwpHF6g6DBV/SaiiZGchNXSn4ThMKlhktGw+zrhdGnaqSFRFhcSOzOtlEJGZBjBNi51hM6I7SdbPZzEw7KwYzNfLAwVyYFAxTDpgGULPSdcEFRaiqlKLTFNAaBwmWqGMDPZEPS1hRHK5qwJSYQ6hyUxLsRcSR9vg6Ta7KRYKwQnZVjaBMsWAEFMW6ak70zBpES+QtjCr/rsaaBKvDCEBIAjorTOROVlfjZNQ9XZ+/f+eL7/7JH3/7T7/bS1+6roiOWms1L+Xr3/7mH/+Dv9f9zc7f+f43v/Gtr28tFurq5l3XTcN0/+6jn/zk17/+xW9Pnpxuz3a+9vprv/8H3/n6t7/95lfe2tvbWo/TZ58/+Pnf/ubD9z58/8MPjs6enV2cOpks5kJMhZxcmFnYau1nM3IJ9h7J+jthEzMSb1WJ91YEq4vlb3/1i//j/+H/8sVHD//F/+rPbh3sXbtxMLoXcmdS0+Igd3aDV1OFuqLCXbpipqYepDEXcoVNamZqOo7rs9Oz8/Oz0/NTLlLmfZmV2APlriSQIsvDi9Pji/Oz5enZ8vDZ6XI1WL60sEZah3vOXJm7kPmmu9OjDFK/mG0N2+uLc4UCvtjdv3T51myxOxmoSHSokRUbco3Rqo+qwyTVjp4dn54cgahqPT8/lK4jklL6sa6OTo+7Tkh5Pfidzz7/+OYLv//s6bjWk5PjL+4/+NVv3nv/g98s6zKmRU1nBVFuliC4qVe4Rs9lakwEyURVIggYQh6wGycw2VytoDgbBEamau4WTBpZrk0yVXUnkeAXo6XJlwiNHEWAcwRyNQ21Dm16zNguRpAisbDQMbm7VUW+k64wZnE43LhIxOMTEOutRMTMhMtsVlR90ppZYJQip0Tnkeh9zjduGqv/st9NQIdbcjsIIukGiHcw2mXKwyHh73ht44jYtIzxvaPDYzerBiNqK5FBMEIDW1wKlwCNHLCqocgSgVrcIoqNVNb60mA/NO8hw7QFzSS7KCSMDJGxGvFPAWzHTsRgfRUBL5k7ORfJ99I3t4/zJhKIICLEZE6WZMHzfSZMokDMcrVOROFqQ+v7Qgzp7bLEgxltgsBRq8IgwnUyGKiQCGudCGDpUpFsVnWqNhGIY1ODWqDzBOq7rk5Vp0m4uGOcRrLsWUQ4gjWy8ILMvWqlYYgGWwp7uJqTHQsaI0UPAFmjMQKyjrEO7g6jTDwBWZBB5Al35W4XBpvaZKNbXBJ3j9ZDMs8yx66QmHPMVU1TAPjzsQxw5pIvtFUSKSIaELU7TBVmatJ15+PsV598+vGnd7733W8vZh2LsFsxOzu/QJHf/+7vL7Z3vvv9P3r3a6+/+e5X4pGbzDrmOq6r641bV//x//K/3pmV/d2t2zevvfHWyzdvXdndWfSFYHj1xWsvX7n208uXi3Sf3Pno0ZGcnh6TwYWrVYdz4UiZZ4GEVyCDMaKV9rYhmtNu6GwG4R6G1Wr5m1/+bHm6evjowQ+++43vfvdbfceXD3Z39noqonXgGunCZLVG3rORuTqR12mKbCLakJYOrXW9noY6XayW41Q7YRRxJu7E3cyV4OY6rOvR6cWjJ8eny+Wg01QrQE5ioRmBtjqGuFxSOiJyUOk7MwzTNC8zkTJbLIZxwnhOWFy+8cL23uVqPtQ6uopILHZ1gITVnUoRFldfrdbrYdT1CEQ7DR+NmSsY0NHr0cnhWOvW3qXD6eL+o2eT0tnZxW9/87uP7zz66S9++8kXD0ZUAgvlIsxoH+BwVYcTd1yolAKWWJXesHkQQd0oHzOlrM1hfkysfDbrhamqr4cVEsZnYo9pQE3hJvk6B/uYXW8g48+z5wLcbKsMAWciEraqlZ1NeVg7KKSdGVYWDCSRFCbmOlUiirg3SouMA6GBKMI8m81r1bqa3F2YApVAGpeRUXXYqFrZoY01yspJEWqTd6qVrPbuE7XRqNEblFNCvqWZ6JJHH20okPTi5jATIUKsZkRkasJc3EASUQ6ldfQeQcnBj5s1xjd2A7iGySwt8i1GDG0Rc2DrgFfz8O6nWQ7JAqQaNm9NAHZfPvvhuX3NW9wPM7NOSsQbKQu7m/tUa+n7fjardYq5uO1qokTDQjBGHNu01UwNIgXtowZS72ZqVqhMwxi/FwRmES7q6m4abj3k8gg1Y+ZpmrRSVRXpCJAi6lZNmRnecCoggJMQfsExTZMwJ6kYdgoJTWFzlcQECgpu3sI9He1bYG0abklG/F/P3DdCEGoFTSAcQs+YySLpTs076dAmNlM8f07TIt6eM7ReqS0XRY1ELScu1TWPnEJMHcFEnEr/4PHR3/7yvXfeeoMv7Qk7kzkwm88cduXKwQ//+A++/73vlJ4XfTEPO7Y6uO/LjWv7/+yf/HAx297Z6mbz+c7+rO8J5mR1fX7x9OGT06OL05Nn5kvndbU1ixfhqgpQP5uXIqGY6ESK8Gze933P6AzVE5vcwFzMkOhFpOvLYi7zrdm8Xw3D/Qcf/Zt//fQXP/vrt/789Rdv3X733Xd//zvv3rh50G913Lmul1Wr1lg+aqrq1eKkTkYnHl9hcqh5rRrNrTmZEYGZpXTFpmqKcZyq+2h6sVqdL8/Pzk+H9drdQUJe28oQpk0wLEJ94SFeAJVNho5qLV1PswV5/8JLr7/06tf3L98CF1AlFjipxjvMZl5dSycglE767Z2rt248fXB99egYMEKJ8snszj2MDg+P+3nf92CU9Tjt7C6++PSLv/wPf/3Jw0fvf/j+o9MngAgkKZbmJgm8AF6577f3L/WzxdDUlSFscU+1rLbHMkb/KNvRYgeGzszkNULc3CxOgObz4hCDBsMYMgx3Tz98xDfFK8UMt4I2C4TCnNjFmVhrXY011YexUClw50DUSzF3Etq8GoRcRyNdFwvit3a2uq6rpubEIiAIkZs26Cf6siAtEgdKt0hi+gQP3VLT420YhljTS5t/FKi/5/uL5yATtb4+W7boyNu3as1vCkaeg0agwsJSOgfcLaZmIen63sm1WniAG4YetzmyyfJmAMEc5McOKysROcVW3mZoaCIiZjYycRjBjTxZ76hHlJ8qSnB4LZzczIiYY/OfTJOGYtesliJd6YoEce/CPGllyaPek16J/jjzoVKVYzFoMAmY2MikIJs3c+QCGXJTJiIqzJXabFVdAbDIarUiYdPKIkkC1bx/Ihl+Qam3EXd3Iimx6A5thHcRYSYqndWaSd1m6fsMFZDBU7+KuOWe/8Hp+f0lN2xCfmBGIq7m5lyEWlKuA1IkBPDmXlVZ2sBBSA9HTGfcbkdelfC7eunSgSdEagaimGBp1jFjVuTi4tnf/uI33/nGN37wR98Eajwes64TFnXApZdEEA0eCTaGOl/0b7/zqoBUsx80V5tIOrGxnp+d/e43Hzx6dvbxR5/de/j4wZO7x8dP1zpVnSwsNeBOxK1CnbqytZironD3pYgUbtWfmIpQIRTquJt3pe+knx8c7F+cLR/fvX9qxz+79+RnP3n/tXfe/vGv3/vFb7/ygz/69quvv3T50rZY3ZnNIGIrtWmKdQIMcKG+kwgFcquwMA+Y1pQbj+uRnKZZ7a50BOr6bhrqpLxcT+er4exieb66WC4vzCY8/8D5ysMp7osjMttYhImc2HP7a1hfSrd3cBm89dLr79x+9U30OwOrO8g10K8I2GFwocKTBr9/aW+ve+XlB59fWT0qgDnS9MxEVc1g6EiYMWGOOeDK8uF7H/77P/+Lh6fHp/XMwAKQ8KTKrXendCETMNvau7p/6Zr0vU2bfZDmIJJY1OwbF2pOngSWYJsIgKqpqqb8xCASiRxEbG4NzslQzzT+UqTiwyCbrIHUSvvzixq/kplDBqIwuLYtthrdFcFJhCM4RcmAEjkNbdy2YNoo1CI2RZRLLAsCu2rG+Ccglg2vOyhxHDjg6k0iE91fxgW1YSaGv40Oqj0d3o4IysAIavBmW/oRB4Jn+aPnP6H9cS+lMHlhYq8pZEHURHr+CwCwZBviFqtJWJgDHomT23J1QP55U9P4zgxycm7Vn9AieggMITIGxZmZMTv+/PnfhHsXgUdqrwOok8bum5g0VZ1k6tBN4wS4UxCtcdBF7kycqWEqCbA7cyvaqESO+C0RIfWlPYv5M0AC8RJFMqzIzGJWWcK0FXoSdgT8007yFDVRO5fd3YRLKZ3qlCxWYKNcgFAZ1ridZkoiLCWVmuSuBtYA/TYQMHGqSxEjFMNjK1wszSpc2rPEzYMYskKOTriwWdT31CBQ6z+cPJKgKKsCYjwnoq6UsIxVC8RKmEWhYJnUJ+PP7z766a9/+/WvvnXl8i5FQnlElZgzAxGnCCMnNXfVyb0r8/wAITzVWtfD4bOndRjPzo4//Oij+188ufvw0S9++t69+w/vP3hkADGt18Osm5sZzx1uVgelwrQAvLD0/YzRGdp7D2aE3TQ2TlEpXRGu02h1Gnqe9ds3b77QCZ/g6dnF+qPf/vr+vdkH7/3kw49/+dKLt9547fW3Xnv5q++8s71YeAcyVThpjTKCdCA6ABawZm+X+x7UdD3pbJzW07ie5os5d92odrHWo/OL02E8Pj9fT0P42kBoKcBRLGC58s2ICzE5uQiDE+ycdELhxe7ezv7VfuvywfXb6Lvq1ZrWXpgVxnAnhnnHXKS4qsCn9er45Nl6eYHFTudwUB2X0MlJ3XU+393a2lmuh3FYz2ZddTx4fPijv/nJ7w7vVDhQAFaQQoDYsRo9aeTMY3Hp+guvvnnp2g0SFo3MfW2dbsM3AJZAv0Nq6XCgCVTGaSSilIZTHIRBambDG/UiF+gZNiQx5YIPCu8VcYMaNsZQYkCbrycc5QKQheyv2erbSwoqzJYpbL6pzmaln7HwsFoNBFUL5zHF2pkoqF9++73V76j+UYn5OS+RrVxeHqImyMgf4XmEIQ+FFlBL+Tvyx7aTxLOPdc+eNw+HOGyD1jbVoh7ZPxEVw8SlThNI2UlV40fGpKFuocwslGvcw7vQEKsvfYzYPwVUy6M6YavAOdzTQ5GCxCaswebrh4IqFqch1KA2aZ2mtNGG5KXr3NzdhvWQICxxIC7ZLHHGi8QMhnzEbPPoREZHG6DiIlM+YnmAbpAQeJgGzcJBThS4ppvqNFUpxVvSXPIXhOY1d8Q2KSIiMtP23zheFw/zXMRUuDPHKkrpuogF52kYNPHVHCSRfZA/x9dyLxhJEWZWV1fzfISwGS4Jrlq18VHUpFb56rTRMqanAJw2hEEeO2EkziQS9hgFXAGqo3bd9mTrX/zmg48+v3/j+je0roEITvGou9UMjvV6BCiwt9CWZQ/oABjGdcLDOw+/uH/nwaOHDx4+uDgfD58+Fba+w6yXi/W0Xq37rg8ZDpFrraWEpc2qjiHubvhJwCfRtUSuoRF3wnMQRGL9p33z3Xf++X/zz+ZOn3zyxXu/+PWP/vrHR0cPHxw/fvzF3Z1rV954961vfe2rjw5PXn/plf3t3Sv7O/2coQNMEko0hTk5RIp3kQJGbrBJrRp1GoosKWyhDV2tz5bL4+Xy5GJ5vl6Pk9oGd2uHlhPIQ3cHBxOX+B7EIiwlSG/Vbja7dPnatRdepfkueLGarKpZIXVjkczccTNTMu8gHbAcp2fPjs6ePHz6+IuTw6Ot3Wu3br05rlfPHn2yOn7kvgbQdd2Lr7x4+PTp4dnp2qYHh0/+5me/ev+zzyoSryGKJchfWiUUNQEGWVy6fO3ardvz7b3RABFySxTUwESaZ2N6o3IIoAA1idL0buYWElwgDLatS6Q8c+OHRGsZbQosNsYjslgo1/dEDfDQHQVS5REyypRSF0QTRVHwohoCDnMmoG0WCnzbDEUYsXHFw8fqzMUs0zapxRJQU0hGOYmALbOkUdMh29xR3hCepszOc6AV1nacUJ6jlBLKoJE5rw5t/nyMZE1R5THiWzxURcQchUtRVU4egomdhGqtmwJB2b3ljWoxnMiZo5UjRAA0QEx914Ew1SnuNLGAkegQh3jciJi7drK1Y52bF8ABkeRZcnkntcrPrGpxYJmrmqtOzMRU2Dkye/IEBVFabdszEj+6yeksOuqYN9zRaNSodHWsxECcdhHkEJ2YGbebwSRqudQsrh/akxQjFDOpZkRPHOnpDSMWIgMKETOraRgMiBoqGI8L54KAqPORwZQnfDuh3C21+/ASAIE7O6pu9tq0bYYb1pZjCSJvOgJHHntR79NOA8+A9sZMkcHNmMkAiWERPJk72Mcq3C1mHQb59JM7P/rxz77xzhs72yVePVUnUbM0sRQuJKyq6h2sGXyIqBSCQ2w6Go9OL373xd37H93dPdi5cevmyy+9dn46fXH3zi9+/f5nn32+WlfiEt28u03juJgtun7mpquL89nW5X6x6Pv5apyIUIoQC5PkUGcK0UlXUgszjdM4rJbdjL77B199953Xzw/PP/vk4V/8px/9xV/+1c9/+pPPH3z67PHnR4+fPPj087uffvrGG++8+cbbX337tZvXriyEFzNyVZsmr6PWqq6lFAPcMU3DOA7rcVWhRQoV5iJa1QukFDAtV6vzs7Pjk6Plaj1oZRarBtPIm46XK6IBQ7Ee+AxtNB4xcMcI2BWaLaibTYapjuyda3BpKJ0HqNKBu8Id0/rs7O4nH3x+5+Pls6futrV/5ebNN6698NLR0fHx+UlXJ10fa72YlmNdXXzw6cdPz56NpMvl6b//T3/+7MnTqPXMJUJO4BoZaNF8Buq+tX95//rtnf0rk9lgBi5M4dQBxf4Nz7clZwJGE+hysghOkX8YQg5zz8gB8mBqzeEWdic4nITizReRyFiI1btf3gaBHIdBLBGsEBExIAsfQ5DPTnCNbQMaXVHUWUK2nvA4WBlRXN2YGUSm6ulpTugHm3Mt0G64tyUvQemBMsCntWfe+sd2HVohe44BBQQYOUfPSYP4a57XqIEPyPvicbWZ4sMyOWpVhxWCk7Cas4Ek2tC4pC1YzZ5jzWFOimMo2suE7WJ0zZpVAAKLY1KYSAGx6RSrcgDONOjGQ6bhIH9D/m5sdEABd2hATsRSQBCQmSmpwYlT3R95aERwBcsGd2sXMK4vaYoBNrQF0+Zg8HyyiSIoLcc2Q4TIgSigdiSxHXeLCQhfEJw5DhVCzsLkAAl5ezA2R44wU9PeiIjBkOsgPGs0kZtWNzNN7h3taIpRlhDPX4R0WGttIt8KbmoVgLQHJfhgd4/3sHDyFonIxKgLtCGy9Xg5kcUviXAVD22N5NMx9VIM7AqC16pUcXGqf/5XP/m9b3zth9/7Zt+JNesGnOHOJXNcmIowuVF6AgFTXa1Wjx8/fP/X7//or35ysTz9wd//kx/+o+/v7O3Wk+GzTx/95ue/rcrLs+U0TFVrgOLuEdHDwmxV59szJhNSkHFgxCTMJWVlEioSA43mziizebe92HKsP/zVL1954Wo/x1feuf72V/7lP/x73/vR//yrn/7iZz/6mx9/+slvHt+9/z8/ffLRp3fvPXl6dHb21quv3ry8d+v6lb0OWz3aklio1loVpMQwr0RQm5x6LiSFQShdGaZhqPVivXr85NnR8dF6WDo2ZJUi48yRb1XGVoPcfaqaqzRcDWHJ6fqudHPqOi9FK7FIrcYoICIDVbBbbKN0G589OXx874uP3//pePKk271045U3Lt94ZWfn8tbu7rLWxcHV3e3FdPHkyb2Pq9pPf/XLvX7v2dPj0c0L37nzRfWawj/XeJyy5Q+0KpqGfvfg2otXrr+42N1fqRHHDA8KKtqR4VUpxo+R7EulEhxEYuvVs8Blm9neLGLmANy9rVFyF5bY9FXdpARPBmExc2+uzHishaWN9xk77OGTj8rL4OiXkzzyRCMQRAOyCSYvnZh6GqCMmMlyo0v8oE0L3zrxbB2/1NgnH+DZ3zfuzYmauCf+vLdzzBsI3Lq3BmBsZp3249pvzupPBDJuYjWAyEtcFg65qxkza2YFB14Wcigmel5Isw2lpj9B25vscThzrVNMfCXbZAKS9xYhxPIKN1e4a5wq0aI3vWqcVACBWTSBGZdoeHMy4ui4RUTHurmU6dEKA3VjypMFC1kue85neXi6t6sNInLrZj2RmNkwDDHQxAMXy8wCTKYNmkXuDmGO4Dy1VA3nk+QEMkISBvlp8re6kTU8CswsmWyBWlVE4jKqxScnTg9Is7kH5hXHiQdjzF3XSykMmqY6jmveDG85IaJpk8hCodqmzFx0sDmAk79IiVo8ooH3EwNtmTLISATEiuCDTc1FinbisvXg4dH/53/4j6+8dOv1V29TpMF75NZqwl9mYIHT8cmJT9OwGo/PT5an52fLs67DBx//7r2fv3fr9q3dvUuffXL/9Oj4wb0H77/329+9/8knn96ZbFjszupALlw6kV6KFCKY1n7W9/2MWEytjpPDNY6H6oELuXsYshwwp3Gatmc71fTx40e/fe+DN1598datGwDt7+++/Z1X3nr35T/77Ls/+fEP/vNf/c9/+aP//MnHH9z7+MPV2fHDx/fuvPnu1995Z13fePHSHu0vCnWgKMnBylg362dbfTfvZNVHKAhRCF4YUibHqtpyms6Xy6qVS6/VHdUzfiNMGUzOcXQhXgqSmAFgrFQ5FLoy6+YLl1KzPoJLAZHWylKIecEzITNdHT55+MF7Pz16/MV4do5u+9br33j9K1+b7++ulwPmfbczv/zCbRnX49G8n22fPLrz8Ucfd+Kr9bCaVl3XrX0C0FGpObWTI/pr5yw2Dsz2r7/0wktvXL5+m2dzGQdA3F0CvaTAGh3eQq7h0WNGw8fcwlWy6fRWcLKUObVGmTwWgaUtNU75ZqkRcFUjOBNnMnEoNTzIsygE2Y9b0x3G+xKuH5BFxCrCkBwNOtJIH5gCiTfdqpMTSWLfDa5vqH87xOjL/4SzZjWeEsHRNbQ6W7DNfO5NhBTHWjCRG360ATOcy2Hjp1DelmTZ8/Bxj7oLB1CKFDXqF1vTNFjuFQizQP4VSjNufq88ajOrj+EWMdbI6hhzXHwrM1MIa63EQuIEQkhgDFEw4jckqJH3mFniU0YgrhfhyU2nyNIL9QgiVwuesgKP1RP40vdlzkk6aXjAEVnc+d9CeglytcSJGLNutpgvjDAOYzjSCOwOoQisohYAmeSL6XMI0toPJG6dc4yBAeCksxAOF87l84neJG/P7q4OZo48QypSUujr4Y6LmpDQYHZMhJyTKB5+AojBQhq3Iz3doaxqmyMicmLzM5zRzB5ovIe3b5Y3lcOOaPEoxsjMbk4CYmI3JhIxcmfav3p5PD382c9++Rc//uqtmze3FuJV3QE1OLwaGEVkqPXx/eMPP/jw2eMn7/3i18cXJ6+/+eI7X3337a99ZWd/b3m40knvfvzFez9/9vTpw4cPHh4fn6/Xq/libmbDVNQqCXFHbQC3IEWIGFwodx+BwFa9nxWR3kzDmMFgcicwlzJN07BcHe/unJ6dn5wev/TijXE9rFZksK6T269cvnz1+6+/fOOFa9f+/D/+h7/5xd8+vXfv9OToyeOHJ+enR8vld95+y3Fjb0vmLF1fxvUEr7PZfD4fdnd2z07Pl2dLEGIXeZl17jYM48XpcH4xXKymcaoOd2PTeOatdcXe2hp46wKKFBIqpQiJQlHRLWZSCksBsZo7OzEpDFZEyjhWFpeevK4f3/38808+fPTp+8x8+fZLV66/+tY3f39rf29UH5QqfL63vbW1sOXKtnfn3eu/uLg4e/xp9XVUMq8KoHAJsVoS3AEuYtPMS9m5evn6S1evv9hv70wwjdQdZ1OTjdYATJGEmAFPHKKJwpHVyUbcbMExmAaX44VFvYXpMkXEkBI8NjUGN8ri7g4rwnAOIAjYPNnu7pFClv+hARBxJOSjb9amDnwZzae2GQ5hJkDbQUgxSUTeuBKoSWMbspDSulYVnv/zwMPip7beP/9MvuRpZWbP+h8xOFTyR3BG4BAi9mTDJNHm/8SZYht3T7iSHYCXvhSTDrHpghkUkAJcs51/vl7LPTNrAELeEy4SE6C7AuJupbCUoqruKAVKYQ40z+LtBmch14x0DTx9A8I0OhBEUPMS3B2xlJy7qA0/akpEEEQu4OZqwpOCzsMz/vEG4o7Rk8DMpk5mUuJAYNdJipCwq6paynCrwYESycjeCm+TLaS6LeHQ6HPj1gU/DkYppaPkq1U3dhV4VWImJzXdEOlMcakIBNMqUtx0k92fDzBnqx7PEUfza1arxu8M3jkKuUhQTskaMcg4n+8s7fljn2c1hjXRI1g4pow80NxizQ61R9tj6iIzhwgxqTqXYg7vxFT/3Z//xdtvvPq9b31FpBDMVXNDrOLsYvnrX/3ypz/9+dNHR6dHh+zy3d//9h/80e9fvbRvWmfc/+nf/+Ou74bl+tnTrWs39t947dX7j57du//wdx9+ulyuhUQgURMRY0komsynabJKF8NSMeXBFm1BDDQqpnAu0lEnC8hUmL3I2fHx+clJL/3WbLG9taXDgGEcRh/R9wt555uv7RzsXrt6Zfvg8o9//FePTx988duPjg+fPnh079H9u1977bV3XnnlhZuXdrdmrDAXwyTCUspsvuj7eRirDRXwql6rnp6cHh2eXixXwzDCGdy7Dfn4+Eb0G/YRIyNzZ2ESkdgwQuwQd+v7Wdd1s8W89P2qWlXAFBCvtRRa9DOB+nBx99OPP3jvr5dHjwTlys1X3vrGd2/cfHl++WCqOozLrpSA0GgGFe5m23P2ay+8fnT0xMchMB/zAGeYIBR7raNveS4bYF5cuX77jSvXXi6LLVUda80WzCw8LNZimt3DHslEbuogFxB52EM1EEdOqJg2AAkRAHE2ZlHVflbgQNXQGMfj2J6E0PFvwItWCpg5Z34jas5SYgaFjCdbn8SGgzeN9izp0OgcA3DEZunUc/kfyKjh2u3SUMNlntf0zTVr3VxiSpQnDRJQJyJk94dNi83pBHaLBQ4tIoK5SS2xOWriFoXCMaETwJ2cSci1WK3zre31enS4DmO36KnIlIEnqeFPODzbxCSCN+BOyM+dROsU5guYCdFid3fWdWfnq3G10kmJqQiDyeBQZ099c2AmGVhDmbgAd21BbgTKgQYJrOV/aklK+RzmnPQlzL81UE0P6wCrKphKXyINGVw4f4ZJmZmiVhunaapjYB8Z3NGyw+LmEXJ/b/weNYuQqzQKbj5AqHTSDJD+6jg7NuGuIXyO++IOj4bF0/zgpgC8agPRwsSSNFn7dvmoqNY6adz32LKWj6URJSaVzYenowh5yVpbwpuzF038lZOMg8gCEYu51SyuTOARcDWwG6vWnmk0bO8eFNRP7t79f/7bf3/7+tXXX76uau4aewrPjlb/6T/91b/+7/7bna35V7/57T/5u99/443Xrly+1C86d4zj6s29l4BXTp4cuusrL9+8ODk/fHYsdMcnnlamanWcTo+WHXN0psEnFJHIFl4t18N6yGcgd6SMrKmshYCJyZlc4KOpg31ajRxrK0HkJGwkBCOZsTJm+7NX370xL3+wtegO9ub/+cd/8cW9j589fHx29tf37j76/M27h986//r6zReuH+z23e7eHFWIycz7edm+tDOt1iQkfTcMK3hZT+uL9frp4bPDo+NwiqmaR0ltNaPByPF4MFECaelkYqFqVHIJRNfPuRTo5MwAF0gpPCsyFxkvlr977xeffPDz6egOSr9/8/abX/vOK+983dTNucLB4qogEiKDG5XaeTffuvXau8tRn93/eBpOp+VpFMIy2+pnW8NqadOpw0M+D6+AoD+49sJrt155Y+f6NRXJBMugr8ljd0P04a0pS91KkHhEgShFp5RSTw4FYFTMXP3oIDKzvu9jKjL4pBUAC5s6CQlT1eyGo32M8ipNbGrulK4Zy9TVtr824Sai9op9qSvd4FdAWAGdkhJogE+zOcfZuGnTsntqUBKifgQcEP8yEAhCi89xjz1AeVRQO8vcLeII3Ila6DXQICI8r5TRJSen0fgFyqOXs1wSlxdfvjlRZ4eHq6V1sw5m2uCUL0NZUXSatjiiTR2xMlcY7pNaKZ2Ag0+0Ou3t3fz2t7/xwW8/uvPZpxT+89DfaC5KCXOxAx6WjTwHQUQWrmwiUleEr2BjiWzXO6J+DIgFNU13GzCiR3+Rx6ObGiKEziTuqJm5GUVUX+ynF6qm0+oiL6c7QMLFcwEZZQshkaRmWieJJWne2IWUsZvBidncJLa118laPHew+wbn8CwSQU0tWeJAj8w9PM9uGy45e/8YLvLpQbgHgo8PcXxDnEISSQQiKkFwbTq1NvPSZsykcOVR9PL+HIeMKhQhryH5pZjjI7abLI6y54+oFDhKKcupCuxkOf7oxz/5/re/dfPGFWHrpBSScdTf/uqX/+//1/9te7H4V//qf/3u179+cHnPSzA1Nq5Hq9P5+dnp4dk0DFcuX+67jhZbfGBnl3fXy51hdWm9Pif3cTS16hEnQ8bMLDSsh8Via5rW58tTYGSUlKroyNQxFWIUh3l1WOwPJ9i8m827It1c+u3Sz+twoap96UrXQdjNx3GY1uP+tZ0//MOvzbd492Drv/z1X/76w/fOz9f3P/9oefLs/PTw7sMvvvbGa6+/+OLLL71Q3F166sp8a3fb7ALRqioJ1VGH9TjVcbm6GFYr4+pWnAZQKn/ysm8wX+KmKotNQ+QJvXvVKdbAwdxV2dERRwhv3y125os5TZ/eefDRb/5azw8h/e7BjZfe+f3tvRurafIKrVVhbiYlAoqZgdJzR6xCO9evvj7/7qVbr56ePD4/PiQnFiwW23Ucl2enRw/v+HQOrN0Jsr3YuXztxddvv/LmpVsvqFBlSFirqDXvIrlR2RA7i+OpCeGhta48+vzWKgOp2Eu+0z27QgSJBvFUqUQygJciUoq5ijuFTSdWhnhTmzg8cxrAXNy15QOCiWKXTnTrlEjI86acsvkjhwsxEVmMRdw+MUXUQb5a1sJBE+ZpS2/ijXOP5imoOhC17jVBcXpe+ik7PmTWpzGLqSYKHymnG4QAaPMFUUxRAZpY5E+HPzfgXSd4ufXim/e+uKNR3gF3FBENJzXakfYcoU/mIjbWqaZqC0QUvm4yJ3ZT8wlTfeXKtZObpw+++MJpiovmABM7jAPfZmKiFFuxuNnzjhaU0EfuH9vA33Hg5U3x56gWQCKSyUpuVSjYcqCRR9GJQ4LZ9snUzUrJYAZzd3MWcrOuFFfLc5vJmoEkPlawmRRCAkcpXekKEampat1U28JFNVaQU9Zoh4d3KjUCmQYRyHhTbLe5NagSDpd728aWT1T7/7YR7YQyzjlzpJF9Qc7Gz4Va5JAv+dG5VVA0QCj+KjEEDH9uA49c13gJmKgIXJsKlYW5M0JsHBJmKmKOrts6Oj76D3/xl19/65233rzhZAZTHT67+9Gb77z2D//sz777vT/0bu4e5IDV1Xp1frFerZbn54At5r3aMCtFyrRcHh8dP3nw6OGjxw8PT49X42o277TyZEqCIsRFSKSTwtydnJxNwxpgy+6F3T2KvrCYTxJNgU/kxdzVDMxqJN1CgWm9hql1XDoxV6YQeqtq3TmYvf3mixfD18bh/OT84pM7n49DPX705L3V6t6D+08Onz05uXh6dvHKzVvbi77f3hmmw8V8T6hjNzhq1W62MMI4jWOd1Ce1yiwEbasLOBZc0EZnC4LEgaDOoWEQBZzNbTSCmi5X6+1tJaWuUOFuNazUaVjqenny+e/e07Nj5n5xcPDud75/47W33PtpUrgwmIkKe9XaEkSosJNhtVrNun7nYHdnb0en2+N6CmVlkXJ6dnx+fNJt76zPD2G167vZ9u7BpRvXbry4f+UaL2YrGwmwoM1yvA3LJ9wjQDlYt4Qdw2PljlCNhPe/4Qvq1Ab9MImQNJ7UU05vLsxqkNiIR8wE7qRazW16FFBOYCAbtJXcLYKgkxxIKCHQoySTN1KSbJaew/Op+nN3t1BDNHdReM/yhQQysBkbNCvkEEIW6fxEsJakjecfJigH3ygysgjH3O6povVNmDs1BT1iXQJxmkcomgmh3MSYqEMagrX86m9/5P3MqnIpTFynCkEY90sRpO7W4xu3X00AO0y6MOLn4MZm1S3y42B0dPz017/78NnhqRHMWYws8jpAEhIteMAmiYw4NhxLKUwe4Y46qUetTHAcMX7kBMUZ3BEaCQTQ7gF0wUxbj0wU8hgCBAVk6harmwFwiUvuCnej3CQTobsMB7l51YpYa+QQ4Zg/uq4vpZhaP+tFiplP0ziOQ7KxINKqqvGRiRs/HA8NtenPDbD2SDX/oBCTmKpFvETMN9jwRe0E4Lx0KXeO65vnonr7goFHhhM4MsaZnSls/27IddCgQIesjVxOBJjCOPVehtADFWFxVLeqyixCwsyFuFIFqNZaofPdbRFb+fpHf/u3f/h7v//6y/9YtjrVOtbhlXde/8Z3vvn6K6+TzADXWmud1uv1xenxVG29XB0dHp2fLzEO6gM5zk5P7t97/MXdh5/fuffw8dFyta6m6qQEItJpKlSqTW7dfLEFp/V6tRwvACN03pow88mhnsJlI3K4WnWRHg6tdTmsVsPKQrtAAjOrg4W+1SBFIJWZtncXr7364nIYTkedbx08efL02ZOHdjE+uvjib1erhw/u3Xn5rW997VsvXL+2vdMNo0l66NidnPhivUbhdbX1MCqUuYCcoGigHGjzv+Y2ERuRUGEwqIv6kuGKLNsdlXE1nJ4cSb87Gc/3dhnFSc6fPXr87NHho8/H1YnwbLG7uPnqu7deexfd1nI1MkMiGx4gspwvmAQCmKl2fc/MZg4hKYvF1hYYbs5Ee1uzxf7B3tVrOo2lK10360vfzxZdJ2U2G6kyFyewCMIk1bSURknpRkbfBhhJW2icfXASFm4SteehZuRmkTrcQEueqjZXF0SKufXhCwGbV8RUzJuKGn23NQE+Wn1vUGebh9GwVaIGhEa/6Q3d4WwtNa7fcyS2oT4bgozJVeO6BcIbTbuDYJQilAZUh/wrvR5Z6SOpACngiG/i7hHDE0eEOWANXHrer8cXaFN+IBqBOEXkA7k6EZdRJ10TMcfC3o0DjZmExUwjSOb5j259cAaBiIBcFSKiFi4VlK64ldVq/dOf/bzv+zqOTsYFWp2ZySAlQu+oas1i5t76TDJ4JyV0WJYHIG162Tju8hFIUizDDt0s7H+R0Z6kgFfn9JTEF+CIhYzAubhfLJS3y/PZ8BReR/urCfKkHSyQfGZONaqQmm7qjEgIBCLvIJQNtsHgAv6Ksd24+UzAaIuX2xOFMBwYVeIvKX2R/yKCGaIeRDPl/nxaArWU9DYX5uPtFvJdOEyNN7WGqE2YES5KTmgWkOfTaFuJGDkVbIABqlbJGSAqsY878NVxPQp3i93Lw5n/d//uf/zOV7/2zW++4oy+m7/91ttd6brFXNV1WK9XK4MOahX85PHTTz786N79Bw/ufrFcLh89eqzCXsfz8+VyNVxcrC6W03w2V6tkXM1YQIJS2Cddr1dXr95arfXo9NhgQPnSVGxGpjaJSwquNGxuJFw6Keth9eD+g8cPnupX3uKut2kNh42T20RSuBSCuVDpeLEzv3XrskPNaX97/+NP7n3+2aenFyeHx49Onx2/f3z67MnJ2bJ+5bW3X33lxmJHDna2pCtnh8fS7VT1cZpIhEQMJlTMLaKz2m4Qi7c1XvQM2yIXiqQ/JoKEUoO5iPT9bFXHp/fvVO13tq+tbbVenS9PT+5//sHhnfelk8uXD+Z7O+NU9y9dX8z2tZ+pj8YqJk5h6ohnlxhMumkqYgt6pIgXyiwdJ0jXL/p+vre/B0cpwlLMDeA6ThO8qqurkhdhZ4ouP8hJS+WQU+NaLJUzcbRwfMVo46IOpasWcN9kmWXKTEIzIWgxqFlbMBMdFVIO1PDvQESTvkSzBz0nwJBAAWXyRgpHQqFuhAxEoYbxsCV/idbLRsUGISDiDSkJJoZpvuYUGXDU3vIQmjsB0lYIIDxY2eUmLJT+q/yBja4LqiBF9tlbJosRPSQH0RF/jdPKGieBExMKlZkPRl3mxnd9TyQR+clEzqSWwsEoVW7xVzmvS2jYPfZyOQwkJWKHYbw8vaizGpddzUrfqWpKmSWA6bCkipsFwBMMuxPMTV2dc+n5ZoFAsyQg4L+4ItQ2JUh842j+23EaNkPVKtKFVxZq3Ww235ovL87HaYytDpuY5ab3Ie4iwxbipFxj20yE9UtmdnqtFXBVDSzEm1GE2nkjzSeMRNGfb2UhgBMDDQ7E3CkmGCS/1eD41mIk48TkHhvtKTcCESDtIcj502MtJTVRiecFoVg57EymsS89wcp4WxAK3UybNOYCNRYS5hpmXlKFG4h7KU4Wm8+I1A3qkdptcFRTknm/tbPnn3/66f/9v/1/FP/nb7z9UulLr3MRNrfl6mR5enZ6erZ7aXe5nu59ce83P/31k8ePz05Pjh4/vv/g/se/+/zB42cVOkANFShMs4P9PSJ0pQdx33V729uLvblrLf2iXyyOLg5X49Re7YS+zJ1cVasXhTFxKeJmYGGQT3WqY/3s889+8aufffWdV2+/eCMS+ryqqwEKcmc2r9xzobLfXyqzWV+2D7Yv3bxy9+qlG188fPj06MH9e59cLM8f3/tiWK2fPnl0svrmm2++sr27b4UXB/sq4pPO5ltdXTGJVlM3Es5C4W0PCbe7Ff2kRUIXMwmDhIukNJGYpSvdclg/eXQfE087F8/ODs+PD6sOdbXCtHTaOTs+H6Y6n+/Ndg40JPyFCEXTPm7uWU3I3GyCgVgM5qDYWBIptJTTugIOoRB9mXDNhXROMxEIkahVCm9Rpm4ZAnRM5DabuVh6l4pnkej+PGIdkc8kbSYAzlO8ZeBm9eTQ4sAjBMZMzWNTQKLnrcyCN3Axt1pNRGH5svbPmRC9WDZmseMXgUdFieEu5xUOs4IjRBstfiaWN3xZaklhaE5kmwhwTSktiMhrK9jt9W1tNlljUJDGK4rMcd4YicN4YpZAQp4qTaDb9npFc5wCqA3LwOxWi3Sdu7o7l+KuTSpOhSSi8iRbE9+UEM9BLiQhiSbB3Z1ECphcEUB367ifczrM1GJxEBHSLBlU1fAdd+bIXNNpig5BTTcoXJyFOZjB1JKs/9KckockIlWNAoJEzD9VJyYxr9tbWy++8MLR0dG9B3fhmQsRX3KDsbTHBERgY0/EPr8MM5tqVGMghDBRfuGA6bTpGvJzRxmK5RzkLMwUAkpChrWRWx4PBJi2WxoGEwJ5sj3NUZM+hjwlokVPCAnkRKrPYTU4lVhjIM9nnxbD87xXEjaHM8OcSEKTyF0XvDh3nVc1q0YuzEqGkK0yE5jVRECFIKRmXIpqdTc1Ojlf/ff/9v976/rO/+7av7hy/UB1Wq1GgZxfnJ+dnsxmi+3tvU5q93L3wo3bfd/poMPq4tmz4wcPn3z04acP7z5475PffPjx7549fbwclofHTwHvpJvNZ/u7eyL7NRJqWKaJlud1WI0pA2ygISXj4qYq0gkQARpCLFLcprLoj0+O/vqnf/vtr37t2tWr83kHkLpZVXILmMRdEYlsLDuL7ddenu9083lXxMGERU8L4WeHj58dPzl99vh369WqLk8vjodJL+9u78z7ydfienWxPQxaa034kTKSrw0rgR6aAzCE9JPCXuHMXGIqZGYzSGwWqrY6fvZoqGYfTaujsn/tlTe/Wic8e3Bptt2RyEE/e+Hl13cvXzOWWtXcRDg4OzDIpLGNICkeoIKLM1IF3jafxUolACRSyQBnUHXvJGwuMFe4sJNwgWsQTDE3a07wYKZO+uhUCUSOuunE4354blJM1BQNmydSTRMBmrAvwQoYh0wznR8W21AQL3/rpTfwcVqXkMRYimIYJBQ9V5stmvJOhD3OM9/0dgBMLY5H83Q7C0VQsidUgE3Ltvl/FIiQowXtJDzWgKnEpOK6h8snFX8cHnC0xJl8dxOSwIYNlAAbTRqNwQRiaWxG5M/DHSJSvJqaUWECFWZX29hCI46NhJIMDVDAEV4ySnXwc6V43IOQ14RcvO9mUriqVrUSGzUroXH6XemrVq2qWinBNRQpzgTT4OWEySIlTSGRyu1uka6D+BvPi5dvvEutZSlSQDAYwYv0pUjVWqeJCONqdXh4eL5agQuBzF2nAAViwgI5uWcRdoSsn5ipL30OOxkkl+yIlBLjSTyFsYiDQhYbyxGew3HUz/qYJ9KQgpguDSBTjaLv7nHMhyg0gywtdrE4gkl2IMPvIrcVZkqNqAkYEG4Z6O8EIo1KPmMQoW6wspYVEp8w3g3On9nNOzdM02ihX2OmlGXED43gIbdqhcHVneBaq6vWSiLjsKyC+axfrZfPDg+vXblUCtVRdarnx8ejjq+89vpie2t/vwM0wnrc4ORvO9x4uJhOH51/9PGnv/jVe795/9d/89OffP7Zp6fnx6rTsFovwcv5tmKuU52VncePnz56eH/SATCHNIA3vZBuWquWzuBCHgpDAKhmncl6vPjtL3/5l//lv7z19utvvvMauYn3hsGrq9ciErlK5GRVTbV0Zf9g+63XbmutLHr18vz45qXHz25+/PGHp+fHF8P5R7/61aM7nz98cOf2zZev7O9v785ffOHabHd/7b4ah2FcO7yaIh5rCvEjC0PzLbM2v6IDScionQAytWrWC7OUcRxh0ziOpZvvXX/znd/7O5duXD8/H2+/SYvt+dZ8W2b9fLFN5JOBYbPSWwNGhNOvEvp80+oNVwSZ55o71ghms9zNS6bmSkTsxhBTNc1sHHcFoFoNmvB/PigOj1UMKXcTlyBE2V1zf2820qGNpraQMIAvcxdhrdbAkxjtlLyQcPRCG9gEcBYxyxWqUa+jlbIwhGZX4JvuNPnSePw5YOPEbJkggZxaw1Acnl4wS8WoecYaCplWT8ISJGE59k2dTtqZhbKrQrIkjGyvQ4LP7G4s6WsjYgIlUJ89eKs9JYaJlJG2KOVCqRUUEiZmDzI1IEUHuRBqGcY1cYF5C2kKY7S5+2QjCwcjE7fKU7du7k5FwhZr5izMIIbBNqEsHHVlqpOZl07I4erEVKuCvO86MJFxKdTNZiDUWmNiLCIVYDKgbQCWErByJnUEKO0Ws6C3ux4jR07+ySyE6CzFLJrBFwxguVwN00NLTTXUICLguFVJ/ERdjiMrJqdA/R3QWIgSQxCszUTtj2bwUfYXQr0RiKjWCjYh6kpBR1p1qtrAIWIRg1GQz+7E7OYoDLX4zGQWg66FRAqRCJP5VjEmA5JHokaYB4r0gMcmBjMTys5GhJ3FqpHHYhYn5jADGjIw1AwiBAcXIStkVURMKxFJTLtqxEV1gpmOa5CpTtxhVdfeFSp9t9h94dZLf/i977z94pVvvv3S1RvXjdNF+vDB/Xv3Hnzj976zvbWgInGmACwgFwBKAMTKtvNlf8P3Ft2bV/e7a7t7Pz+49umdT58ePzlfXzjz6dkZlkt3P18OddCzs7OKoZEm3rRTFHoSQzp5nEBSwFKrEomUbrvsHZ0+/esf/833v/u9l199adaJGdTcdUIsz0wcAuQGN+6oX5QD3n7l5etg3dufn5zv7e0url7aPVuefvzZp1/c+fzk6ORvfvSjL164t72188LNW+er147Pl5f3r6GIOTmU3KT0NhkzAn5BztqafQyRsDBLGDM5aU+Heel6KV2/2O4Pbh9cunbl1svXX3jt2kuvVLfZrkvXd7NeuEyqGo0qKVPnMHKNJ5mZiFzNQBaiyQiP51LMzFnhFA0DUyV+biosuXov8wAQoCJRdP2Rqu+GElogJhOPzjBTDU3VQhAYBZDMItIgUV60EHGAKFePRDPObvGZnEUCs0RoNUIOjjZLuW+MQpxfNd6h2HeYvTz580AwipaG0Tg5JmawmzrBhCEpScqWkyj9Ox7XgBkMj7mNm/EwnE+W2EBirSAKnUXUZCSwA0ppETX3VzDGqRVFdpBE7cygDR7R5ofWCXO85XEGUH7TqNtZJYyAWljI1I2sOFswCEQh7JN21Gr8bt7s+CUWCmjbTCmh5zwVc4plcjViJ7CQ54PlAFCkCDMx13F0oOs66YSZjTCtBia4MhmYJFYGQcRzk22LbY1riIwOgns6iRvgFwNf/C0Qhf/f2rkZA4JIiWRaGJwhLIFABhlCHk9rGMSROBAzOdQVjtj80G4o4tQIQSslE+U2qUv8Dwd5wEQtLI6EeYKaWiTfZfyREbGUfAUi9Y+1wfxumrgWC6cDwDZncI7AbmEyiOwBGKCWFnxH+JnZiRHgY3QceWE4ACWAU+kUH4zdXOtkquRUuuLEqipgh5IpkbK7qrP5bD5b7O1tH2ztHmzvXL1y9eq165f3X37x1qvXDl64tHNtb0vIp9V6vVqfHZ+NdXztlVcuXz7IKwjXqgRUt4uL87OT45Oj4+PDwy+++PzOJ589Oz5+8vDZ42fPnj07PTo+Xg2Tk5ZSVPX0/FStuplwV6daoUFXehoJ212PdsDUYKn8ZQ4Lt8GqGbNN1T79/NOf/Pxvv/dH37z14m2rhQnq7g7V6mApHTOzs/LkZqUXktnVa/vz+WJnsXW2XG7NF6cX56OO129ev3xw+b33fn18evLowRe1+r0Hn99/cvf6tWtvvPXV09Ww2NnhJ30IJiFGiSKDiU3D66vMRAwpMcpY1FghAhNJIZbtK9fevPrCq+90e5ev7l6+BqYqZJMaOxcZoQyQYNQx7iPMzeuGfgwZdsSZWbUI0aJQ6jNZjQkzSci2ljRB1dyEDIJlBBc18JpF3InKpkA5IcVXma5GMFcgaeA86JjNzV1DUiBMTBIPJMyFM4khclE4JmIK2iBSnQmSK1Sz6RffgM8JegJS+DlnGlUtUXMQk5PEOQT3Vl8YheAuVLyhqXAnYjDQNPiB7UTQGaNr7MPGUuMbl2W86HEt2SmFfcGRxLVgik2FqTFpCHIbuEEcUwXFjBKo9MYvQe2RD44noAA0fiAgDjjBmKiUcL4xSqA7TEyOIhKNrrczmAm5HBkgawnyTLH/1x0GpeeHb/5C82Svgsz36L2YnD36AQCqlYHJJ83pClANJUrIrWL/eJLD8AaSNdg0KJ3YShOcWQBtFLwdm0MgkeNPRIEfMVEpncPcY9l6nMDtBmUbn5eSNncu2ZMQLWS2FNphkw+E5yYcUO6HA0G9ekKZ0ZaQaWwAc8lmIezWKMJm2pegs6pOVVg6RtcXYepEuq44sfRcmK2aqatWFqGuuPk0jKthmqZJ1VlKFnwgFQDEzdpnnYgDpkoWXI7EoAqgEIFLnoz5kjlZ7UFVNVstHYdxKgUEX8y3ti9t7+8dXL10cO3alatX9q9cObh6ZW//YPfK/s5O1+1uzwkoMZFVnyp0UmG+dePmpUsHDCyPzy5W58NyuV6vh/V4enb2xePH9+5+9vDp46cPn929c/fw0ZOxTmdn58vlajVOdZq4L0VKrQbQOE3uSlQC+YkGJ2kPtPc/eq3A01SVlIksGunY1Tw5s3WzxcVq+fHnnxyfntzuX8EaJCzGVSc3JubIFLPJ4WGEARG2dxaL+Rxaj07OxmEt4upb21tzW09HTw/d7eTiFObHR8enZ6df3N17eHi0VfbMymJ7d726sGpSCqlEUog9TzfrUvZQNinDiNxFKmTO/Wx+7cr1/SsvTF6MBd1srWpey0xKICciZhbQAjmD3MjZOQQ+wZK5O0cGQ0DrHHtxLdUMbgw4zGEkkpFn8R416yJFnmN0PryZu3KtLrGDIiSPmEWYzSOnnJMGYDYokQTm5UDShyAmcdbGrfqXIcpweAHkNXYQJpHhCdg20D3L0ZccsnGkJZVA6U4O3+lmE3vjqtN855BW2AJbpRjQ28mR8wCyKiEJR2pyQKRtnuIsS6MoE7M3eTeAzXfI48pp83eilwEBKUeM3+nUtLPhIQnuIWedzA5OHoHDStTyxNuZVVikjUQW83dOLEym5s2slPCIpcjI1EO+hCCsPGuusLSDNX6MbzbCmKXC0sy7joM8qeNoqpPB3WpVlvDXWUfizFOtoQsO/U/j85Bru7iVZo+BqJkE49jyxpG0mLNoroLWBiiswkjpTuyhJyJyljZoUBJVeQJ6xAqSO0HyvjXhVmSIxAPBzPloRndusY7diSLlSg2KeA2iKCn6vhvHwauCgXFyKtvz2f7+wdWD/StX9q4c7G/vbi9m/awvXd9RYSr5mHtVd4ewgaz6MEzHx6eff37/0dMnz44OTy/Wy/UoJOY+62aJWdbQWbVwOfZI1st8B3dhBgtchYhhpDA3cWeOSFTrS+l2Dvb29y4d7F25fOnK5f2rVy5d3d+7erC/t7u1t7e1u+j6PvxyyWghgDIC2EpP3XwOs0XfLS/WTx58/rsPPjg6fnZ6fnJ8eHZyfPr46PCD33325MljI6zH9bgc3J1FTNPlJ9LBaRimqioshTtD5y7wsWE+HBvVqaGBrRoQAebKVsHsFNt80yXDLLP51vr06OTiZHlxHg8SEaEUqskzMbPDMg8S7uYpnBV0MwGsFBZQPyuLRb++ef2tN9/c3t17enT49PDw2fFjq35xfPrp6jez+e58vr292CPm9XLpVUhA6OEkRZzGmNOy7SWAEvnLzp2ZSfb2D3b29rv5YhysOmILpWrNHF4GkYkAqpyHB0OySjmcIxrcU1vScTGCEDGJhfHQNKFIhxM/pyJBKOThOkxK9LmfJ4uux3GDwKIVHlGs5GARIJBuEChIU2K0RU0IXUUY9XOPD0m8z55nk5VEKCR6RaR2Jr1UiIKWyWHejo08mziF8SBAkK5MJASa7z4oZdZuyiTNAYuoh1k+IwzPLeMHAhxqi1EoYmA8Ii4ibI3iZETacymhojw0DM3WQPQcu3R3mMeSWvoymYwc2+NAQvOfco4DAfExB1ZOhNiwQE1lBCJ4kVJow5RlWFxIX8052yliBpFaQkRBsAQ6n0csu1ng1G38SB4xCGNYSo1JiEvXLRYLJ1qulqNVgkgv7IJCUsTNZv2s68pYB3NzNSK2fD/JLbxxG88MsjxvALI2IARfHf/LRAixnVpq7TdPDDFI46GIHgNoFGr8DHcWEWKHs7WkkBwz0vfRDv/ojaK74FATwMAUW/0E5AzivmPCNE25CKLGZsypL1LruJj3l28cvPLS7Tdevf3S7RvXr+zv7+7sbM1mfdcJF27ewXjS3Fo6Jwzk6sNUD49Ovnjh5oPDp4+PDg9PTp8dnp6eniwv1uMwjJOqocJMvU7OUoLjJafSbATCXApJ7zCSriPHuFyVIttbWweXDrbn23u7e1eu7u/v71++sn95f+/a5b29rfne9mxepEhTMCIbzEA2nxv4QvxHPOs6I6nj+PTx4X/893/+2Wef7V3dH8ZheXbx8OHjjz/64oPffnyB84JSSgc3J3NUKb1p1XiR2nY2kRmxFJZJQWO+koTazn5u/b+3Fi5YZqdQ2TPgxkxuZtX6fsEiy+VqreF9VU9yJwJkQprCIEt2k5gY1aq5l66APHZozxeLxc5iWOtXv/L2zZs3Hz89/vzuve6z/tnJk8EGG4b1WFfr9fbiEhtL6SN+xVrZ7spMLdYcZVPq1DTzhFI688rk29vbW9s7LkI9d1wcKI4usBMmZNoKyATmAkGis8UiIZkgLKqqJhRPaaDLCTnAq0a1j34KAAUsEVm2sUE2aTiL2SBfSmaoxUTcsgeS4aQUwhHMmvUHubaFW68V/0gt1W9fAkPcESs6EopqTikCbdyUmyZ645MKhClOCHOE0YwyKWHz1+NrPj9IosdndIGRZviYOXlGW8dkQ231aqMeLDtsBzmTAu7gUJnnfWyAfXylPIrgnrMJEGQV8lSJP9BYZRDFzIONaykLYfSgzxmNOCBidnSi8DttZg0HsRdTYxHL7jmtGmbwvNVhv3ie+EJMDJh5Uy2ZA5E+GYJG5qx98WCEvCCCP0PmSPDwGU7TOMaiZwIxpOtTn2QaswYQWW2BBsUVSwhs02W0ix4hafHbUmUUNyWnk5Dw5ODkiNwPz3N6Y5hjh5Nl/KxHyrmHMdjCdp1zD4IlyJLS6gLHlpXwaLuZatr1ROLEdjWRjhmFRFgIVm0ErBM6uLT76u0333rjpddffvGl29evX93fmecKdrRvmSRV/ufNAZj7lN1sty97RW7u7S6H28v1cL5enZ6tTs4vzs+XF+v1cr1ejdM0WlUzNaeEdIuISDQs3M/6ru9LX4ipCLtjXA1dKbs7W/u727s7u3s7Owf729uL2WJeOoE8fwLR+hVvbRegcHayyDXIvtDUVxdLiFvF02eHN67f/O4f/dGVK1fhvl6Oh88OP/n47q/f++Q373/y6Mnd45NHq/XZYONU1citVkUa4MO0XL2SOtSkbEmhWteRqEyIXJHgAROLjQLi1ZzcJR4fDXCVWIiLqbmi77bdyao19UDnYpFaFb5gjwKYqIe7W63VUZm46rS3u7Ozv3Nw9cqiXyzmW9dvXL96+bDv+rOzi6FO0+kTFjZondYXdETelTJDoPxV3dVNjYz7EmkoRCEJoUgRb4vOAfjW9tZ8e752KV305ORMUgoCandIwxfIPQCLwC1id01shjJj8ExdKRxWCA1CvnQJcZC3/jebLDd3GDewPHvIiE0EWjVBXB0ScRhLTgDuCfLEkxtqRSPz6BVC5P8lENxMQ2tJSLFDpDpw7HHXjQKcN68KNuNI8rUJr6fLLHEcJLZOkbXcjtogwuNTgJ6TyfkER2VvYXMgimj66O6Df4iZIwiGhPjjRAKIkqdugDKD86fFiZXjgBkBzd9LgTLn4xaXKYGtXPCdYAxSXdqAqM0ITDm9bWjoUJNa4TBPO9xJzdrL7O5w8yKyUX04nq8XjZoZoni4CzMRqhpJhiDi+VPA1I6n7ALgqlOtsKrMRBYACTNjsViQ0OrsYpwG1Rq5dwCgIETaUNpSNjea2nfOAtmsU7kLElyEPIRRpshkKSdJti36wXbD0BbS5PgCBqdhyx1OCXR6zHNI6irYAk4ixsktYDjPq8/5+poaCwszzPoidRqIveumqwe7X3vr9W+8+9Y7b71y/frBzvZMQouTj2ve6aCANs93DoChV2ovqZl1hUvpt+bFdhdm+5PaUKf1ME2qw6SjalVzh1ZzZilCQFdYhIWYqXR9ERHpJL6dmat6Jzyf9bOudEWYQy/mHLhjO4XjVY/2Ka5c4KrRaPnmfICb2Wq13t3fuVid3nzp9rd+7xvb+/twmJOO44ur229+9Y1vfPurv/7VF598+vn77//qo8/e++zunXFcq7uaOtQ5DTAOqK2ZOuK5SKdTND6G9jI37LdhlSHmE1YzTrFpk1XAQxUN8tl8ZubpyRAiB0tpBiVTJc8dzXFv3C03DBr5zu721vbu1u68m3f95b2DvT2R/sMPPnv65OjGtSurYTmOq9WwdDfquE4DiblyKQFnSBKyAMEl1kAyh34pIsxEipurOjMvtnYWWwtoCcl+wJogJKjlaY/ieK+d2EDsbkqlizrNRO6maoC4JIZOFh50IHDbeOoCUI4eKRurvKXMKQ9H5C3mzaZEbvMElgZjk5lRrO6CIygzN+ISvXrEH8IBSNZiMJlnp8zsZA5OaguITEIwU8sMy6Jgnn0yjBLyzTcqjjnaHGkxTETqS7zs+aoziNwsQYFWagkES8MpiJtYNSgld2N6XvaSHYk3ZFOp9PkhFNIyTlSqjSJwdoa3ljWRjTi0PKcWAM4N8sKGyG4X3IHQznzpAIhiFR0rQO5UiIiYBRFmQNEJwTMGrDCrKjLZjsKTwJTUome2BjlgmaoWC7ItiQiOrS8BrEDNSxEzX54v3W1SZSIp4oDVyqWMqzUIGhEZRizkBi4Mj5WMsSrGEr2Jsza1mkm4WNxaoD0JJFLUKyygzEik5dSZI59aGJxyNxlSz2TIocKR2wxA3EiieNGEKDuhZO/9uVwHBBahJMecYFRIRIRQx3E9ci3ASzdvfu2117/xtdfefvXFa1f2thbzvK9ueYVDihB3Kz5tYlDJ9gChHYoXJw0bcTTEcrwiPOtkb2uh6nE5Wr5KikbDn0FomwYNzKFFTELFWh8RrxWawyU7lfTKp4fAc0lZvGfeCCzK+xQwBtPOzh6xbe/tXt/emi0WwT/aVHkmvfT9gi9f237rndtP7r3505/c/h//YzcMw90H95brtWJMdUMkR4aZ3J2V4AsWQFdtSGqwrz8nAhxOUPcsU9mtuccOUTXVWsHY3p7NZz0BzcxqznmO50kCUMrExWOtjFUpZdZ1Vy5fnS1mi61+GNeL7fmsn7vxay/dvHPnzqWDnfPVpWEacXK0HlaqEzHrNBk7XJm6YHgBMq8OadJAJgiIRKQ4iRRiuKKUbmd7ZzGb22AUG+UaICpCAkdmnVI8CkKFctFpahNMVZgIxUuUfXOKfbsIQXQoUaO2pOjZmt+HyVR50xBFaQ55b1Z2AqXCJtdlRFlkCn8RcZw21KJr3ZrhJSFVZ6dY8KLkIGsyBW5NN9BgXyeAC+XLG6+JSKuFkrLAfAY3rX9KcOIacysfUULbhhFAkteMRispkIizjzcue0dG7CUJKrBhDwknRIGP6MbsGuMeRMcZCpf8dETwVkq8gWDtoc7sl8A6AufKIa+Fz7UylfgQRdF+/oFiUsnGrYTDw5ko+N8sZSFrIekKsVetFGYRyxqQ3WksS8u+mNxJioSaOHEsOMV8E8x7M3CrVjQkP6e5wnAbhjUQFYikkzbD2abVpWbb49wZ1ERWBM8zH0zcwjC9zQscLismodxmFaAQPEJK08ubVc9jg137J2RgJ2I28iiQ1sIaAnqKLxVNhEdPEfI9WNx6ZkFVYtZx4N63Z/zizVtff/PVb331zTdeffHGlf3Yd+OtSiHWhCW41IYMfCnFHymJyhcnXTD5XLlZCEY5cVsDiAWuHjuoI8OERTyf6QAdPRdrR0PW7NPSnqUNjg9vsSKe6iekrRLUWCwHoPDim5bDNBaMupvPt7em9fn+pYPQMYDNzMBeV5PraNNUx6UPI9PFlUvdtcsHl/b3nx0fX6yH5JVVaaO8osgaFNVRa229UVx8zrn9SwNIg9PasBwKYlNH9VKmadzqutl8vthatEO3zd6t5003bIxInFVOa/VqXVdAtLM1F2F1m/eytTUf1uPOdn/9+uUrD/eX6+H8YrW8WE6T1erkEBFT1ToZoXQ9AkRFcSMUptxmHK8ndxIqGjPVfrbY3t6e9eLgLnTfICLj6B2jBnvjBCmnXSGJvVBRdrjtNDJ3EActy54hmfmIUXKS2S9nkSeguGeuZ3RJTOKhyET4BzbdOPJKcrbc/z+6/qzZtiRJD8PcPWKtPZ7xTpk3s3Ksuau6em5MTQwEQBMko4kmwUxGyox/TQ960YtMMoJGiaDQIA0EGt3ouRpVlZ3zzTud+exhTRHurgf3WGvfavBU5R3O3WfvWBEe7p9/Plm9l9rtJ0ClQ2/W1uTJUASgAUT9Wo8iamCcxrgfYOmQ4W/kJ+38VAlO2m+oI2FQ+BicskoMWThCd+9n1M9+BUwvU3HEi5uLILa0AthgdIPQQkdWrgXq8Xwv/MYim0V1koIpl1FoR/cGEaxsC9QpixIV9FA1agFhhYSwwE3xhNHMBAlrVFACRSQRUPY+16ZY/CwCWgkZWXmsazjwILCWcAgFywpQVRYmodEfwYAjarZ4ALNYonrh0V1QiAAxKji6CxTYqoFG3tO1jKWUoGd7glMC5lAiKlJQL/kpxYsUECAQEAbXEqos4glTAIUutjYjll5rdYmu7zBEBBayRpIYjLkEBUURsVQ9wKCKwqoMoQqBIudhHiogSSAqwzJWH7339Effe//XfuX9j957erJaVRRMVXqTJUWjPsHtLI4snsuxgQt0JK4FFYACoEDBYJ7RZnviyWFOASqjGloHREJgH2phtsfwggFjn4IDNgAKYCwttHrNUBanCoglK63cE1PCjkLU8tV8j0WFJaU0DH3q0vJ4nYfUt03XDNvbm3a/aXab+/vb6+vri4vrl6+vPvns6+vN5ZB7V0DgpqkUDKm3b5GsmgFyyQR1U3Dw5fye2ygRQQ+zIWEIaAlO81k4OVov53MDWr41omN5I4GyXw5LNhZRyCm1bSsikQgBA8BqvqqrWQwhLhepy996+9HLl+f7tklP3koD56tLBcg5oYUrmImAB6IYrLm2AqDa1BpyA+yMjk1OwOVyfXx0vF7MI2UBDGGMGHoxtfev8VIlRXtDIrCOW3afrV+2JzU6F4bFbS0RFKuMH1VqQSaGxh38ARaewT0GR5x2/FrkhJQMq029LZ3RdUcc3ARaFMDxPHgM0VERyGgAzDC7kXJvQJGmVZbPh0LaAXh3mnJ/SujXPQAnVMQOoITfC26YoiGG/9wft77UAIoeFVNE7z7txsW6CoeRVPAuQlC0W0k2KHXLrj5HUOrUVPHH7DahNduwFdjtxOJuFzIBRmBYTHoBlIoIsYoRMIiHCEqXGKRAUNeVddQL1koTFQAxYHkA6w3MAMFuEAaNMQAicy6PUISGChEPCgCxqmw4uBvfsqUA1khPUMTqv2lEKwBY0k7HkyMqAlmO2wsTxYo9C72HSN4/VQEQY/BmaDCCGixnQKjWDloxIKP64HV3skit1jlOfJqqBoyIVvONllcEqiBZBSrAvtuGWlchvPvk8e/+5g9/7Vc+evedJ8frFQGyDUrSA80LHhQv2L9spP9XSI0R0hb8ASoqrFZOOUJXp3HVRRDtpMib5pFbCjslhOJz+NM6Z244xWGK0WuBFEBYcaq+xmJJ/b1ER+xjSd+OwgPiYjn7+pOvNvvN1aur2Wx13A/tbtPsdv2Q765u7m+vN/ebi+vXX3717PXF1c3N3eXF3f1mmzljgMBRwKa8luw5wECRqFJV8Noid989NOLObiEGvYwUhBXR6kc0qI32IQGuYjw7O53PaxWxiUNEFuxGwuAZ7CgF5SIoAaBY0FgEgQLirJ6L5EBkzbUQpa7x9GhxvJxtNtV6uSSigCSBAATE8m5QlVWCeTnG6BBGYy6sObMGIAwCgESL1froaDWrIxXLi0QKjBjsNB0qoROwtmFjOTNaUktp9mu1RT6wAgC1vA4KPvb0qnLUhuwVvTJZHGk7QnWo4NnmpdehvxcoqI9Zd//ATLgRH4Z11coSTa0ToowcKCi551von8m0ozcJMKEd358ARrIAi+lWR8r2KQ5jpawRdWKJtVhDxzgu6sjofiggOXeMFlsFLF1MnV8qKL1gMjeoRb37c2jZXd+HA0fCSu3Inavg4MPWoX4w9uPF3ypsCExMtxsV9BgeAGFUgEjRkgrRjwQUIMRYz+ag2KfelI91ebTghaL1dDWDEEQFUVbLNRDkrvFwCfleqIiHLTw6CgioaCliViMLSMQsNmHHlCmoWZcSo0NryorFhZQi4QhQBm/ZHmph2SxkYYWypUGFOQ9snDlaXAsRrEuagQO3u+AxGCgXwZukmWetKp4WDyIoAYhFrU9PAJzXMwooQ6/UzWN+/8lbP/red3/zJ9/+3nfeWy/nEa0xk01CsmRqD22Mtt0RLLqEOooil0woHafA01tUlIGz19DZNomKsh2AQzF0F9ob8Y7V2aLuD5AzYAXhGZRBVVVWQCv1L0X56l3CoFx1R01qrgVOBJ2nEgqZoiJ9/frVX/3HP7u6uv3g/Y+fPHm0XNZVVdWxAqJ2SLu2v73bXl/f7Da7rumqWK8XKxEUVpW+qH0p+skywBSEGTIAw5iMWoLAxVAW9O/3zwGlFTVqYo2Y8rBaPzo/PZ/VtQqDVYYXaliNAyxRUBEhQmFhZvs2AVaR6hiNoSPri6DcDW2SHKIuVxWFQaSZRRwQIwXAqJBF2DFzEJCEFC1fQzTZVBMKCAghFOWnvD46Oj46mlcxKozKQAGRFL2bSWlHYgDR/9n1RbCu6KbnqIAjV0mOAkAdcRw4dHaUUPShU7J2u93uuCfiUmR6qKTaF7UPNOWrF4hXEvgMtarTd/YYVPw+KKrT9X4pD/V39bc59Feg2A//bFUny+0l5uZa480A45dr/CIiplm0wHDwpy8oBwEUgkdaVb3udyoGc+pEi43yt/AOP+5pma0hACgNJ1wZIwIVShiL0wMIQF6/KWrzdV1PqloZ2QTOzKw4jkYE744hGG3GCaolvCgoCgCKICAzA5KKBgqiHNBKZjBWBAg5Z7fZogAQYgzWzkWQiHSaHm9mQBGoTDtBAIvQWNqBOj1FRdwUEYynB/V4opTk2eKIgV9t691HFrl2SqpcBxcqELcsltwQAYFBUWWM+3v/O3cinOS1y0REAoL+Me5lgjNDxgBgpMoMrI29JBXILUJAaM4W859891d+5zd/8P3vfPD2w3MLNpgCFxYKSBQcvoGZ5ekq+xo8MXnqg6GqKiw5AQOEQNH7N5qVskw6KCrA0KThX2ueBKFQJ+5RWNNPRIRx9hpOmMmzMqwRNjKECG6IDmGVO+pYIKN9szyLfZR4VWLXtIzy+RdfIePxD1aPzh4/enKyXC2QwtDlS3qdhjT0CSASxZT56vpq4NRnTpJEbe4ClXcGl3+w6Rxl16Ds3qQH8OD/zq5NiwPMLISiouuT0+PTk6qqLZRC6kPirJc3iNEENk8UNWdOWZhBNVKgSPN5XddRRQMiBbJZNzll4RzruFjP63mFAUSZnOdBsqYVXi4hmSWAANUBg6IIaAyIkQmDAgMIgiDoycnJcjkLaJkchjQ9r8ZxbskWB0ANprtAwYJk4AUGpuOcQix7oeO5uf0Y/UxAp5QArOeIWxRQn88I6rWp01sUUIrFLSkBzvKJjo0RSi2+p1+UtykeMJSjVPE7WAioQ9KjYF2TcZMBHFGdubRBlUuGggWHx6eEiUP3BSOWbRylxRen/nww2pOChwAL3VD4Fs+JQnR/YfQPHK6V1RZ/y/DyG7Z2ejvLSFfvJmTaSNyYWQtE02zkNrJEShwVFwOqhBHKiAOMJYivQjEAaUqDOsHtA3cUmMDpbg0hp1Q2AwGUU86cxdq3EWAIahUC7hapi5nJYPHiTclHSwIzJmqMMdvkB8uUJevOWfw+MOVmug8UlGIwoyU2oxAREcUNlCKACBMTe/afSzaWXQsGnKC4DGrRaLPjIjhJlDvK4jVlqCjMATVAoKBBlIiHvI9EHzx8/Lu/+5Pf/I3vffDW49VygQDs8Wxrj6uqAdTVsyJ4890RuUBBsX6dBACEWYYEIHkYQICYUKICiGRNCYCtd9fkj9qwukKlIlhXeXJn0bJVbUQM+odgAIDiVNoJoWXEW1KshWGdtLLzVPGR28UQTSwBFGPjiWEq/dDHOvyTf/qPvvX03XffeRpCVGVAYIa+7a+v7y8uLy9vrp89/7ob0tXt7V2zHVJi1sSiwACEQlaQg+5gRxVUEHSaQkcJKdd1VB/kPjB43FNAQ4w270cAKYTjk9OT45MQkXOPYPwNIGJOrMCgStFycxQAOXMahpSyCIYQYoB6Nq/qKuesSkAwNG2SrAACsjo6OeqH2ayu6ko1ZeYypCgiAmsiAlUGwayshBKkJgQIYtYlBFClADnrYr44OTlZLeaziBCCxVDt2LyQSt23c4PnBV2jATACxBhfPTTbpl5GO1m0qsODovEV0YorxyD/9HajqRgRmGEIGgtNSccD0SIhCHaZxlydg+MrnMZIIBU/Qz3pQov3YsoMph+zt8WRvHKYYnlV/miABMEzaADRs2hcr4v1K3L1iQ6pJtReZN3jHICqDMUngEn8jGU6oIoULCbjt7JYo3IGaqnUOlJafkON8KNRmlWVNChIQCguk19fp048BIBlHWjrthOLiqBZlIgiIAJbfx5hNBTJYukuaD0oxRkANnoUABRijJbakXKypvp21d0JVXHGxvNDBIK7fj4dhQIgikoA9ERMBCzc8ljHKYhIIhaWsddYWAtNzg0CiDX0sf4L5TnVZRrRelOotxVymsjmPlo+LzgkwlHhY7DnV48hqaq37QrGCFtheQAl7SsNzN2Qu5PF7Nd/9KO/8zs/+cF33n/w8MzOk9UFppSOj8FI0ElIpwO0i6DOPBq8UADlvuc8DF0fQhUDSU5ExHmQNIDpaqvfo4gxKiOG4DcXisdp/iAVzx7KXS2yp+Ca34XODXbxIgHcAxjfaxJzLOCv3A+XaFclAsIDxxCO1quzByf1Yt733dA1+23z+tXF//pvfv9nn3zy4tXzu+39Z59/LYB9z5khJQMSRZ9NPjyiIoQISt6g5w2wqCPk9/31cIjClEdlXYelrmaqEEJ1dn52cnpc1zWkHhSCN/8ZkFVBiIJn4CEoCDOLWHWC4R7EaO1MERkkM0u28P7Ras0Q7/fb2Wy+XK4WR6f7fCtCSBFZESCEoisRVTtgmx2oUBKtQgjRYym6WC7OT0+XizmioLs5hUoph6F+fxz4QQHgaPxdeYk6+vB/Mb6hJJuXTbSAwBviafEwKLbeWUdHxTC54apQ+hWM9SBqH6RFTsC9ExU1Jkztd9CRt/C3LdamyJtZiRIcBSwfaEc+XnKYfsYiKm6k0M2csS7FBR9dEgANHlIBMJzjVJNlwYkbVFBHtaKCGLVcptGQHPDKpm3cUk4knf9qT0tQKg1L7AEgFKMChRUHIKNhx0/D6UDcudLJsYKSr+i3w1oFT0cqKsKxqlJKCOAz3g2DI1ibb/v5zJlT9upZL3sDVOCcMVrkCgmj+IW0bCc0vyXGKoZot0ZFYiCxJx3rR4oQkwuW00BWi2xMVgwBQJkF0JmlysdJ26xfy8wQoJGaMLtOiCAsAKgG7921EhQyVCJ+cl6d4s5giRYVu+0VlKoaMKAqsoAOOQ9SyTzS997/6Ld+8iu/9Wvfe+/dtxd1jQCcVVAIyGJhFF0eDD+7qBUvsMj1iJ1d6AUYVFAYVXI7dLsdEs3mVaQqzivIGTIrJ8kMBFmxmi0sFzKg5RCSZ4WVPbHfjU4zuty1QREJRAQCYKQJCRalMJL/LllQ7o36zSoOrY5Izql0goh56IeuUZCU+l2zaXe7q6urf/sHf/jpF5+9fPVyc3//8sWLoU1D4hDneRgEBDGUJi5lm3xJZC6OgpQUoAPof3gVYQKH4HMQD68HqsJ8tX5w/mi1WKuKclIfj4zCmoaEiDDztqugYKKbU04Dc5lKqOjl6JJVgHOXMYZZPVsuoUswq5fr9elqfb9a7Hd77rpOxeL05M1CkJRUuEIGCcKJKYScJQYg8MRozrJcrtarZQio7HVH3pCt7IvDYv912g1z0C1P2tq3kNktMzYG5U37F6J6UqeohbHBCR5QuUUipVGEGyPfXyoa0C/3xJJoERfTdeZlgmPT4hfAKKse3XJvxRtWaLFqBeQiWOPISf/69K3ySjXe+DBwMqn4cs8lGDZH/0giEC+gcHdJ1Xy8oq78CrkLP7rUiJaraG6+AlhChJYKRIOWhdafNJ83C/NLNIasR8PtPkmhUkrthSocrLFk3h+YbluOJY4jQDScToRAEEMUtvb0KNYO25cOqkCIsYoxRhHt7WW2MlVVCFU0w239fESz+1aOChUBggKhjRgIokFIOGcCUu/qartTZoP5fhgxZaZSUBGRgmFnAlG1rDl071JBNAABivfgHn0f7xeEAYMDR0JrFaIQ0EKvNjjGgvaOD0fTL4AYCJXAes/awFPIqQpBIFNURHny8Pg3fuUHv/GTH3z/ux+dnxxb93Bx1E8aEAuuH8tM/LxcO0EBtkWJFtupKjwMyhxUOeXUtu1uxyqpnx0dHUUhFZZhSG3rJFgMAkg5x3qGFCga+VM6hLOBhzG6XNwBd5TdxfdLdBAWPzRSB1arvNLIWdVR9dvjeDa3IKEVbdF8sTw7Pzo+P0WIoarWJ2dHR0eL2fp3f/t3by9vnj179ukXn/3JX/zlp59/8eKbqwzZhtOVPeNiG8fPB0ABm1Z4uEIoaX+u6JHcZdQxbQUQEIUwqKoKLJaLs/PTk6MjArR4PohaJYVyhlAJC5ROISZbHrwHFdUqVECYMiOgqdcYCABqClLX8xDXi+XJev3g5Oz2aN82Q+pTP/SesWmhLAJFBgqKIFkEVIVjVSOSsCBgrCtUnS/mR0frugqCYulZAAAlqdnFycKzYx2N4chIVh4BBVuAZ82VCAoijntWuGIDKjohewUtlTSsZoDAU83N7XbT42B6RB2uogvpRMU50ZJz5FbBnWMoA1bflLpJmUGhKs27VVFFoJIg5FfJ21V46iiUCBKWN3Vfx0OB3vzOXV6ZHBQcnUkt7vR4DXD0sPwjgIzqRtXRa54U+Ajri0+jBfSBzTM37EVl7/TAfyuqEcETfYvSN8vjuU8HNaHjRS5OjZslQhGJlTcCMppDbf6cCCNRsOacXielqlpVlWWsBIdBKBq0EIxu7ayFUzAkVvKrBCRbG05QEQohUOCcKZR0dUAvpsUC7hwySMGUXoCK3lYUA2IIgZUN0YiKsHhcGXyUFSH6cGDDSODVVCV51mRQ1BS+xd4pWC4XESmzR0VdhghIFYFINQmBKudAfHIyf/Lk/K3zhz/8/vs//tHHT0/PlvOZd2lTb0oXYpG3CXob7hxlo0hTodL9RYigosyQWVISZs6DNentuiECyHwhnK2YaBiGru0y5zCrEut8tbImBqrOZY3yhyW1WQsn5H/W8unlshVh9ThWuYEHoGKMwKl7ADQKPHqMzHSGqKRuuLvb9H168NYDDBULzBfrOlIIuD46VuZ2t3v/+XvnD8/vd/tXry4quhUvCFIWBe/UpHa5Te2pTEOfSgnYuMrRnUdAEuM2SR2WAYZAyqwECDUAzOp6NZ8v6moaZ4t+jqD2BMjg4qrMghxjSCkb/RKqikLMOSFDHoSi1tVMlQml73kRaRnpeD4/qmdHs/myqjZECUAgq/c7Fhd9jOamSmZCkFwKGwMBCBHO5/PlchYJEzjaPVA0OInTBMfR0VCBy4c4RINNiT7opKXjYoqOPFSZrqHslZ4ThWN7A8CSsOO6ZvJC3MewQIXbFRwJV3TtbCF6VfOIcFRexZqPxvfN9YBCwCnsXz4PwLuH2aONUMYB+qg+0aGqexvm7IbJc7HzNzkgixgi+JVAi3OMzm65U1qiFAiI1k7ZH2TKxHAKeNpeLaAfyv/G5Y2EgXt5AJ6/MRK5WvwqLInlk0mG0b3yVyvEupoJqaqEGKwoWGMQjOQKGQBQSa01NICV8ORS0otEQVSwuMXg2fdkrIGiD2VDRB+XZuNDWQTEkO3YLFDLfbPz8ZNUFHQEZlgYGTwZlUhJiVFVrFAZR6G1EdNuAIkQCTFQsMbUCixqhe2EoBCCKJQIM4CoiiCSshKQcEaPiQmkRIQAXIVQzaEKuDxdPDw7/sHHH3344bfee//th6dHR4sVADCAqHWNUaCAVCINRWZVAcbki5HcK4c6Kl9AABWw9hqc2/0OVQgEQYmCiqYhdW2HhMqcutS2fdv0feqxCwsWrOswW4go6XjoVoqIxfPQ6RPLzSpXBX3UDxTkVmCGX+0xfe/QGPiLy6uk1IupCksIBIptnxJL3+Rul4WE+z4j5dTfX1+13X6/3d1e31zfvEbR1Wx5dHSUthux4j3/RC2uCigQaQCoDuD/ZLomdOg3xZPyVVADOtYDy5iyxvhY1fVquZrNZ8XhML4WKcQQIlaRmUGRM4dZ9MGzhFVd7fe7erkIMSQWZcYMnIVZ57NQz+cp57jvaqJ1Va8CHdWReAjAVnQn2qFoCEtEVMno9HcJRypwSpwrROssGxWhns3ns3lV1cLJlFYIwSG5KxYddZwcYl3XUt4r1/SXlA9zNOwGQFELJTjqmzGJyPdzMvAw0h/k2AdLLTqUY1AEKE0cAO2TnTE7cB2KPbN3nDL+XNtNkogKlp5h2NFtjVMrllJSrlX55pSoZm9EIIc6VcccpwK2/efJc5Ns8ZP58Ms7kU6E4NUzfguKLXSQglDINfTvOGk2wpTij2CB6zp+zrioA4rEboVf3FH2tbhc5X2x4EnbOA+GYQRWRKiq2oCwjXKLSGKsCKkhAwBVlqRJbT4YWyUhIlrDTvJeSJaK52ZOcKzGsA8tkwpYeAxDC1grcN/HIm+oHppF8qiyc5puWhTIWuAYl4MQIEC0IAwAALOEKlJAUkBri4uBiDSAQrSxuuhWlQCCokhmy+z2p0hsLbwjUR0oBJhVIda0XFTr4/n5ydHZ0fpktX765NF7H7xzdrxazeYwgWD3VyxuZ4PrqUCWkVEpLumbGtQkVBgQgIUQJHMeutS3KJz7QdLAmVNOmTn1fQiRmUWEc276oem7ru8oEtVxJSV1IHo7Uu+TVpYy4osiOiN7W3x3/OUFFieguMYj2IYSbB9fWQwHgk9wUJbt/earz7++uXnNqe+2jSjXoVLU64uLLz/9bL/b3N7eNG3z/PXFi5cXGUKoamVRYFcIB362IoKSQCj6Qf+GKRpVh3MdBjGtIBNRAwZVRKJAFcaAvaBqqGAxnwFiqCsFRBbh7O05K+Iui+TUD1QtWJRBgAADzOYxRFK0lGN288cCVFOsqorijiiGalavT47PuuHd99oeYZ8yAzYtlqZECgrCqsqgCXAW6yrWARFBJVAFqsocQ5zPF44HtSB7k7BRk3qHB3AHbdJDBRMfnJEnwFkxiKkHVa8vg6KGfEsPXufcoIFELEgGVJ1hcm2uLnKFsFEwhwoshG+FeQWWlrivtQ0v6y5vUnJHXf86kz9B5uLeYDE4RY7B32kCzohgFI1hPrcGOE0OdPbYPk0dKpm/7LmVRdVZ/N/ZYxx9Uf98N7QlCDGZUoFRN5YLh+hh32JN/T+1gSWjkhw1qrVsAme/oZjgcujjlmExgVDsiTeriyI5hDqlRAQiUrpkCYF1JLPITCkhRWCj/Hx4usVbgiGWgKOgSGnih85vqVWiOqFd8g59JLoRiKpIMHZBKA4cAE5NneztzPCQoCoZWC9NPBUoRECPdhP6BNWAhHYjrBdVSXYyBCKZhcEsiOND1BCwqsKsmi3quF7OV/N6Na9Xq/roaH58tDw5OXn48Hy1XC3ms/ViNqtLE7eCXBQQCYI95hg2G7WSG+fpr+AYZSLAVFUy65AZVNKQUqcpg7DmlIdh6Ie26XbbfU6DEtVDn/qsoPvdrus61jzDmmIVqkhVpOCFg94e3wHHIVUwfRVuZfSMzZYXgrLkIx28fKTZ7Z8PM3HcQWAVAqQq8pC++fKbv/iTP/30r3/+3e99++HpgzCrTtZnCnJzdf3NN9/c3d7c3V33abjfbffd0A5tmzojjIsdGm8++EX10Y+HNcBjgE8nF8tF3itOwdpfScFhgQiiwlBV8Wi9inXIqaVZEBLgrKAqmarIqR+6LvVtNZuDMmKYharPQwxhvp6LSLDkQrsqZvSjxW5pfrSkWV0tZ4ykSPsm3W2Hq9tm6MXMOYDNPhIgFEnKUYEAAiBVdSSiqp7NYhiGtFos5rN6tV5hAPQ20SjCVOo9SlaojrlkZttdXRQnYdSCMJb8FfU8UrrjMY8/Nh5C0SHOPpBLeVHrXnNXCDTTTVIQR8HfI2GiWvhe1MIukFcIO5sto0o8XNWkRsfCQ1d19hhuOhxUFsfC75hj8AIVpnbIB7DGRkFAweUwAifbInXSFgtmGl1Q+0Qs+YVgSkBHUA5j0s5olt9QCFrwPxXYb0/lNgBHj+ggri6loBX8JNyUFOtrH2UACgAg1nWVE4cAKozeJRzVyohQQYrxIu8lE2OlomM0LRRiy5C0zbAHaxyk1lgHVMBYdRUjU5BiBQCi4oEHRLUZAzGOIqelhs6vvgiYKi/QQFDAP+QNwQoxYAhU4s+E6MNhAWwUuJltc3tVBGOlOUFmgVxVtKjr4+XiaD0/Wc+P1ovT9fJ4NV8vl8vF7Gi9WiwWcV7PFvOqqnEyyaCWOyvIyhSIKIBawZeWZZQ9P8Dc4x/sXpIAeNe9DDlLYmXWlIa+V0nKkod+6Ltu3/Td0PTD5n6rqhSrEEhBmKVt2iHv63pR1fN6tqhnyzibAwXHM4RagIWOahoPrrUL12itPN1YxyUerFqLvscSFzxw/sCuM6CAmCJQ4+6vr27/8k/+ZLffnZ8cY9bT03NeZE7cNAMrCNL65LRKfZf767ub7d1Nu98xZDdL4FMG1V0VBIgWnwFl9RZADtkOdxcASwWAgndu93/ybBBEDBQqevudtx88OkMi1aAQgBQDKtrU5SADNE3TD91RPSfBalaxcGbIzKzSp4ycc0qcmZOQYFXXeddQDF2f2rbrU7693Xz+9deffvHN85evX7y6uLi5bft20B6jTUk1tDfGZkU4cdKMQsS7+wGPzjjL0PexCsfHJ3W9GPokkhUkhlBGa/npGcp0xIXj7hRC/g3F47+oKUMPwdJYves6pWQNiChObIkljDjl7H0XCmPhHITbFwDPmCzXwCmPgquh8MgiHnsE81W8t53CLx+reU2TtvYOj+gpTQrF8ynq0zVKwcVFXMfNKFQRlCCsKngg4EAbeQZ1AfTFNzXBd/ptVGNGNIyg3AzC5GabCpmulp9duZY6vsgvnVOgxRMu/2zfNToER6cHSg2cmf8RrqmCdW+NgQJGb+iYFVF9aBwGz+630zTXOQRPhgJUg+FQdJw1tA6BHNR701YqFh4RvSusN+URNdYIvJq7xJotPyn4jUWYgtwq/qEhBFFmENsfGypAY1wJkWIcO/eqpfiyH7kF+hkkOsQA4aEOWle4Xh6dHC0enB0/ODs+O1mfnizXi8XRelFX9WwxC6HCUBWVOaF3sf7m4PeGoCLwmhkiFMQJNx0c48QC2SGDVbKqsmjOoKIp5ZRBJLddTp1KsoyR3Xbf7hpRapp2u2uIMKUMQWMd+7YTzvPjxerk+OjodLE6quYL71DkvhOOKylLGYUFRzyD43V0xT66MOOSCzULb3wpuDNu5LKIAqp1gVVmEc7MOI+/+/d+96Nvf/jW44cU4/Hx6fpoKUPab/ZXdzeffPL5n/zxn3z1ydcvXr68u7vbN00/9AoMEIpz7YkdgFgIelCf1qPTivzm+zEpAKiA+EXFoOaNxhAVIIRKIKe+WS+XDx4dP3x8HusIWhNCiIFAUWXoorJAPdsO6fZmf9tyoIgUhtRvd23bdW3fN8Ogyr1B+g5YdFbVbdsJwm7f3G8229321eXF1988u7i86YZ26IckYix5wSuk4pNGUEEQgVUBOWPTqLDu7u+r+SIovHr98ubi9sMP32u7NvWZQhQWiqTk+S5EZM1bRn9oDMWaPpjioUUhFCFwX8uxO4w6DsAVuesgLYmN6Kk7DK5vRwnTwtlDUYtccK+JVXEY1WXHlwY4lgDZt2DkPUb86gk2ND6Xgvf4mC7nJOo4qn4VtXZz6rp8vIqmLFEBrPOAvPECvyXoif/2T+Uxx3tRXuNXreSump/g/ed0dL6mJxzDgfYbjdZY3XSZqUOE0SIUo1QC1x4I8WALFsfXboC7EoQyLRMAIdaRtCIKATRbXvPonYEAqfftM1tChFahgN5ZhxBKS2v0vfGVE1p0Gy0B31GytYMYJRxE2A0wBTQ1jYjBBhoZ0Y/Bh7kDeF82+9HAKup2BEkLyBZv2BCs6YJrNTUqyqa0qyWdoUZUAoyz+dmqenRy9Oh8/eD8+PT4+Gi9ODpezxZViAFpTJsj8anKRoOQ+uaM/Y0OpECcXkRrvf43lKW9DF28BazkVFVylj6hCudEKpJZ0iBD6oe22Tfb3f768rYfeorzzW7fdylWtG32RBgjKFJdVScnDx48frJcHS2PVrGqAgWKlfWf9XYqODYJGZGgX1ZVVVYIgCWMZfIwQppDMGJSUXIV3vjewR8QFECUs0jO93d3geAHv/bDH37/+6enx5mHKlaAKsMwqzFSujs+Pl0ec883ry7vmi576XSwzovo72pJafYhBIBQaoDL2nAEea4ywJOHgVlRMMZgmQGWypuHalYrwHoxe/vRwwdHK+ah79ph18kgwrlNQ7Pvd7v28ubq66++ef7yOaIEwnbfpJw399vNft8N3eXlbUpD3zWq0Pd9TiQsXddTFfdtM8AAgAKpVCpUBk5s3IigjtEVW7bahQPM2ZVoFpZ90v3dvFrdXt588oufPX16TrEKVQ1lKBNbc1dwwI+uMEsSp197MzkGrorVholoK7oYAbzHrh27q8GS44/AUrZ4/JkxTXQS88J1ojJAocjt53ycuzoNIFKAusMImMyRMyI4AhMjhKj4GLYEnPCyjoT7G4JZPIJCseMIc8qLsSyZyi09eHsqG1FaYkyhldHcTe7Cm56ofWgJlJiedrtaUDaC9SMqdZcK6IOAvPu9l+SJM6FEXtJgi7QYhV1vyy1SRCv7KBFjwukJACEu6gBELBBi7R067cCp3KlC0XgItxhWY1eMpKOC8a1cTU1rgzNv7iGByxQdJKJ4jjKSNZxEr7FUDQgI6C2fAcBcfwzFaQBUER8daZd77OOAiIGIfBAYuvllQQG3RAjKuZ6F9Twer2Zn6/qt86MnD06Oj9ZHx+vZfBZi9M716nrRTs0bHyqIqAITBStYpnJ2Bz0PxytR5H+8DuOx25eF2FFtwjskBs45DaAMAJIyiHZNv91vt7v9ze39q5dXbdsDVcxCgShA22wp0nxVrZbrxWq9XB/Xi2U9W9bLVZzPKAYKEQpOm5BH8afVGob6lVFAUAElH6g9rl5xShocV/9Lds11bemDhVQe2DAQQdf1hPnJw/Plog4EoaoQQJiBBJRFJSgvZmE5r+erNQ3MmYs60TH4O8UmFRACQADgkupzsNFlRdPiQCDYOCOwHrbez0ckDf1sPlsfn1xe7/+n3/8P82Xd7Pf9rhuaIUu6bza7bbPZ7m6url5dXL549o0mblPXp15AM3QCQhAUtIJYUayrKoaIQJFqFCTm4+USaDFwanvqpQdQLx6lkpLu2krByFJ1yGdtqURtIC0ysIK0af/Jpz//X/7N6enJ0fd/+CvHJ0sKMDQDS1bVEAMzHziY5TRoVKX+/bKTqMV5+yUsqwWp+maXtvUIZoUBZWScyr+MV91lDicRUoKS5Awly8eNk4mYD7ywjRDwqa0HsmVarBD1Iyc+6nksyBKdzYHRYQAtvMvYbsDsgbGvgTyXBlDVknLxQI4cfjs55GrN02+Kk6NFOR6kSShMmh3cKJXYdllv2eaS3DBumZuL8ctvKKjhShXFacPHTy9GzDt3wsi8abkGdph26vF4NVdFsYcUntZqL1OwhmiGT0IIAMLipQqEFDCoKIhQCB488jbOE2OHhs5VwYexWXUBuOS5qHm6r5HKxtRa5JYADG4TooCIKisTIlWVeSIISDZD0bh9p7nI2zaaeeBMYskVEiPNqtnp8eLh+frR6erB8er87Hi1noeqwkAqYBPnFAAyYyQF5a7HEFUxzoLVplnPTjyIih5Amzdcz0lR4uhJw6hwhVmYAZBAlDNABmUSURUWlsx939/fbe73m+v77YtXF9fXt7t9O/RCGI5X62oZhqGT1D9ePq6r2eroeDZfLo9OlutlrCtrX2YxEhgbII2+9Xi1LQHWs5RL/yWcHgXH1/+Syi9KAtSu7IQ+/fFs+BYoKMQQjo7Xx+v10Oxz39NyoSoKopJBhYHbrsnIscaT86Ojk6O7ZpeF2FuOuGNtQjMqGCitQOAwAACHy/U/iHAgIzWZAHNO3qXRpIWha3d/3eyevfj8v/8f/p+L2VwZVKhvBlDdtx1nzskzqAjg0cnDp0/Pjo/XJ0dLVcGaZqtquZg/ePhgtV7O5rP16qii2TzOb67uKsTFakEU73f75xevfvrznz3/5pvbm5uhHwSRsFIQ5uQRMrG5vShWLQ8KymWqhQjnACiQdze3f/qH/+769ev/7B/85//kv/jP3nr7CYSU+zyrawutIaCy4ARBteC2onZMwRQXEEaqtXh1BwrNNYh3iXJzYLyPIKL38S/A4CDAUhiMg0swnt34CSXi6GCrkDrFM3EVOckbwigCgAeqdLSjE0YtVxEnF33SOWAA1F44qnHyHBIs8Gi6xgUOFdticGe0YQWAWvkXTFT/gUY9sBU0HoFbaPTAq5ZX6Kj43aDZ4WjxYXwiCarC2CvVPMnxwo47rlh+lbK1AIgQV7MKwKZZgmpw61XsCgoUG67qcF8Qo3q//oBAqKN5Vptkj+ATtSz6T6G0LkIEK5+2MAAawDFPhVDBiB6doKol8BiIx/EA7ITRU9CQzNNxQbGmMR4AFwVSQtVIUXJfRaqrcHqyenC6OjtaPjhbnxyvl/NZqCsKQRUksQMLZbR4iyQEpIBCQEDKAKTkaUuTGI6RLTuDEeyPqqjAoekGKKhwtj7+5gAoZ2VWZmFOqQeVnHnf7Ddt+/Ll1avb2+fPX9zudvt9v73dz+r64aMH9Z7qOR4tFhSq5dHq5MHp0cnxfDk3cSGiMHa2QkQZUZeJQ2mtoEWgy80/UKUHN/vwV5dnKNI63t9CGVj+GIAwU4DUdxgwD6lrmvXJsp7VIplQWUSSdl1/c7O7udtf3Gxv7/smASPkNBwctCUwSSkVQYOSCtYeLr9pc/9mdpOCKntbchTOqsyaFQCBFYCABDQ1zaa5BQCAECESBAQNEBLwIizffffd7/3wx289fuvhg0e/9hs/ePr4fL1aLGtU4X3bbrcbJXj06MHpg5P18XI+n4cQYsC7q61yoqoWhqvLzV/+5S+Gvm8326EdCHtmDaHOkgEJkRXUQgshRptpUXl1DqsqcxbNhGHoh77d7/e7m5u7YUiffv5V2/fvPX0bFsopecYFebejcj7TTox7heVKjdoSx29DyY1RD+6a2IyEkCtbpcnNL3oFC0NRPl3HMOKB5RnFqigYewcxB8jn8BSjgaBqFcuHt0wPfnBCtiMELrZtUoJFPACKpPqDjle0NNXTEmad7BYWAA+FXnTZ17H70Gi4XCeUpNeiD8Y+dzh+hP1V/T0nTDKiF3teESg2DLFUUhwEUcYjLZbeLTno4V3A8emNKVLhuJxHc47UM//c1wGyCYJWEodgaTOEouJDlJxL9j5pRKiglmdCJTQBUJqPWp6AnZen5ICiYZ5i0hXMU5gOEZAs4bR82TgLABwzQaQE/3xgvVpLPCrpWYiqmHIgXSxnJ+vF6cnq7GR5erpazev10TKEYDBcETAEYxY1ZU0JVUWJBRQwLo4oEKKXjWiZE+cSMJ0qwCECOoBQRa3iaKRUbX6IeLNREcmszJpzToNwysxN291vN5d3txc3N19/8+LZ82fbrtvtexlktVzSLZ6dHVXzORAECvP5enm0ni1mlg7Ig0AVkDSEIrsGOEZNXhT6iAoPKoXHx3kjpPcGwj64W3CgWMZ3JQRVzSlrEkCUzHd3d5zT8dGTxWoBWSQNQ9tvbu+vb27+/E//4vXV9V/++V8+e3n56vrm+vZqEFFCYVLNhXs9iJ57ZxqEXwr/TvbrAHLaeFwFVJsWkEsLIH8w8fYStJ4dnZwenR2dnJ2erU/W81hXAWNYvvfhex9/9O0PP/5ovV49efvRoyfn86oiUkmp3e5evXj1+puvgADOT2XgZtc0uz4NQxr61y9ebzZ3m8321dXVl18+++Szzz77/Kvrm9uUgZNQVZNWWZIoi2SKIYRIoYoYEZAoMKKiClJVxyAx1vVivuiapm9XqUtvv/Wto6PjF89fbm6vlvPq0eMHQxbLyzOHe4S/kx83WfOCT3XaCMcFgAebd/AqLTx/Oe2xO69PzXbdqQAWf56uwYi6DzuSedYwTitAQhW2yzzeIzdkhpHL87jincCuWYXJySgPJAcQbcJlI1mkZQpNoZP8Nyi8uZM8OJLjRca03Actxg1HE4UumlreE6fouI5ZUjrSboU30pKeZG1tqaR1eraTt2xxLguw9IE/vH+2HuOVp1OcTJF4t3g7/7isa/HNLAFgj8oCKtksQAo0RdTKLXcDYMEbNcRts6HNfND45Fh2pzwmlSNBhoMwklgrKbdg7liUZnlmFccJLQBjv1AUESDyYZY211wVRJEYQKsYlqt6OYsPT9bH69nJ8XK9mi+Wc5teKQoUKwRRHqwTF5KIDJraftf1CQXi/PgoIgaKMopQ2dhRBgqYKV+HyudQyI0sURExwqfM4VHVxCpZcxZmTllAUz802/1mu7u93Vze3n/z/NXrq+tmGJq2q6hSyFVFpw/XqoJAy+VyNp8RBEVShaqOaOWrXkUxAf9RRqAMBCwSBWWvD/R/yVyA4mC6fI9qANRLnK0WiPzeea2piM3Vms1rkXx+ejqPYTlfpLbvm3Z3d3O/27x88fL1xeWL1y9++vNPnj1/9uLl6/tt23Y9UsycwYCBIiApsq9M1ZoZAQIoAzD8p7/wzT/bUr1DJkEEUKKKQkDR5XL5wx/88Mc/+uEPv//tJ48ertfL5bI2ADSbzU9Pj49PT1bLBYNSDCLNZpvbZnv96vqrT7/85Gef/OyvfrY8O3n3gw8Wq2WI2A/ctt1us718+erq+vrlqxevb262u13bdkNmAECKqKScUbwRDoDqIBoVWVgyElXVbEgZAVUwZUGUSmEY0tA3KLrv93/2Z3/w+Zc/Xx4vvv/DHyLS7/3e340RFEFURqBkkIMQymBwdWXmufJQFKHvNBRiaDQYh96Vf2vkUVyjIBSmezIdWvIHR8YJD6NQB0I21XbbxUZQHx3hq/Oe7yO+ODhWPZTUcsHwQOMbTB7bAL0JaIpuGsHQRL7bKw6cpHFDDm9+UWROiJV99IFeha7BA01hxmV82vHziuGAcWiTA0ZQSzIsM9OggObpNLAMMPkbqXnlwP27Ftc0nsUKKGMMqECWj6/qLem1DPexlvcmR1OaApbj9X8jKOkC48m63+CZoB64cwxsgJNA1fvveElOGB0rT4sEY50MqxFAmZeiXpfhdpy86hEDoiBEisyDaq4QV4vZ0Wp5crQ4Wy9PTpfzKqyOliGQoGjiUFdAANJDFh3arKLMKh3kQZT3d82uG6rVw/n6GCm6RJCHpRFKPoG+cSA6EYxF2lQn/OGPaL2LFI1EUVYRlaw5GW5jzoo6dMN+t99tm7vb7evr+9eXN1c3dywqCgMPeRiOj0/sxq3Wq/XR8ayeOYcPFOuIECj4GWhhULAMWRpRMyICTXIjpUxYix6YXj7djREEFEglYuI+ev2gIMIAQIFEWJkBMGfZbu77oTk9OWXOcVatcfXe+++enpy99da7H3783Wdfvv7si8//5M/+4vMvv9y3jWi2gaPWsKHAf7vfhBAVgnE4B5pgQv2HF8GDrd5ZhhUEAao4XywWdV2lYTg/f/id73z7P/u7f/uHv/KdQBQD5b7LAiI59Xxzv73Z7kTy3fa2H/K+a64ur54/f/7N189ffvPqxfNXz1++Wi4Xs3mNAUMMIti2/dCl1A+dJAAJQEhBRRAsfy6IqjIruWdDGDycZ6clyireQx9AcgIV1awy7Pc7UAHRJLy7uIcLfP36VYDw23/7dx6s1kNq0I/VdIMUUT0AiM7oFLhZdmkC5zgd8uHm4lQ8WFRaoRMLRQEwtu/Bg7k9h07FL0GlN7Q6vqGmoSQ/gmP/KVepuIOjFSvvUKC+qeDJ2oxPMT2jll/Ic5B8T8qo8hIyL1bw4BMOheuXv4sWwi/7c/gOAOCG0Q3JBM1VDw3vBLN8M6Ssf4xWg07aZtq1crgGLCfP4xAMgQN2hVhFkhJ7cUNH6v2yFUlLdpQZaTroxuKkla89eMi2eEPlEDxltvQLK5utnlOjU1qrvd6ynFABAiEQWbwbxNLCrJq3HBUZ42RmjQBQNYBy7gl1NsOz0/XDs6Pj1eL4aLlczOs61LMarT2dMBAgCqrKMHDft3d3Kn2gQDBw7pquv7vdDbF6fPp2qJferRonCRqdgLJrh7I33gf1L2Fr4zKGvFHNP2QA0cySOKeknJFQcrI4e7cfdpvm7ubu8vLm6npzv2122wYQWTSnBOsVUZSsAeJivpwv5tVssTw6ni1m9WwWqgBie4WlLR+WLpY6PUV5KFQUVUPajrRGJrNAjtEFmMAMTkdr04R88AMoqEpma4AlzIw0DOnVy9dff/H52fnpydFJXc+YYD6f9bOq77i7uN7vdjfX133P8+oItWJVgljEHsttCWB8sA3fHive37iOCtM3Q/lxhy1qU3gAAARRsnbSdiGEvt9+9tlf/4tu/8d//gRTrmZx6LoQ66Zr2mbAiJLzwPnm8rLPsNs2F68vb67vd31Tgt99s+1xCwpqE4QDBMIYQl1rBNBqFgQoIHEWAFIV4wtUsvUVsEFGwIyhQkKqg/OZCogkKjmlvksqHQCLMiAAEQopQLPbDiIp5yHnnLOPKoKyZ3LQpFW933BhZAGnPssjxaFvWIIDlTkBhzGfctK2B7dg+vt/SuWWA3JohKPew5L8aS+yF099/ib1BZYWdXAZp3+ZMIoTNYU2xMMXlR4NLlmeHj9GGUCLOpUJrpcnGxGf4vSwWm5WwSHjHrq98tQbwFK+5my7whhxQESlUv38JkE37lxB+VOE4w3gYxnvbiZdA0ExQQdH5F5VjMEahWm52gCANl9lSj/yPH5Rq74kUBjLJIz5HyuIiuHy/HxbQylCk9Lc2LcccQp9QLHiXjqN4kljhAgYhGQKN5n7QAFLOmmgIJwlpVhhVVVHi+r8ePng/OjkZDmr69m8IkWbnCeSNCXQjFWUrtWcct8Nu32/2wMOypl56JvmdnO/7/jRB99eHZ3EugZhVc9edUV4QAkWy1zs+MFOoxrf434+5oLBcTwHEc4izDn5NKicM3PKue27u7vt65dXr15eXl7e3N9vhjRU1UwYNCtkGvouDd3Q0NAPSGGxmq+OVrPFPMRIRNYUCUNBSTL63gdX6QCgUfGhcZLgwwcpInTw5edXGrYaM2k5jKLqExgwaIzKmtr+9YuLf//v/+iD9761nq2Xq/rZsy/u764V9G6z+fSvv/6zP/2LT37x5b6TPqU+GfY/BI7qlJV/EUDECdvqwV35Tz0eEFozT2BxU4aJh9SoiASkXbvf7TY//9nP5/OY+wxIQ8r1rGLm1Cck4JSZteUmwnxezQOyJlmHeV3VIQKFSABRUSWuT49ipFDPWblpUtv3wzBAEAwVZ8lRUjcAKlECVvHaKEVQb50lKArEqsJKjBBVsmSWxAqSWQASURRhRCBCFq6rxbc++ODm5n69mqPYY1qTlULgTeFTRZutMHEwiEXdTj5fCR/AqDfsn+07hRop4dACVYsGdJfXEjI8pW5kCA7M8xhTMA00yqiWGD9CeUXhyA8kFEchlKKXy087ca+j5Njv/u5aOHU4UL5jrBoBLB3CLMT4Wb4/kxqeDAGMfyghBKLRYXVIbozb1EO0ZG8WjeHnQQWvG8wpxS8AJaiGJf6to0GdrOqhhzYaCywA7oC19Y/QSIhKoOKUur1v8HE0lmFT1un5SuAPM/4FCay5p7dsE0CEMN1bLyQrld2j5SUV80MtK3QMGRBQMSqIUNIWicQLusr8L0Af5o6KnBBgVutqNXt4vDhZL06OlqvVvF7UiECSAQiyAATMQ24bBYCWdciSe05DanachpR22+vrm7vd3e1dk4Z3vv39R08+WJ4/AqiKWE9mfyJBFUpewChuWjhSdwDAexhrSexWvx8snLOqMHPuE4AycxpSyty26e6uvb7eXV1tLq9ub2/vds1WMckgiAEjJR6Y875pTk8XIVKINJvXoapirCgEHZua2O+HM3SnGzGih/G1owOKE2j+T36hy4S9wlJWDFhaOiNaOqlqHhIhYcRm1/ziZz/7V//j7//oR7+ynh0dnc2/+ebLs7Mjqubzxfrpt97bdOn6vhteXXZ5YMgw7nUBM2WTEdwDCOWBSgugX/7Sw9oMAEQUy1vz7yoqMkAQxXk1Uw19n3f7lphUqYd+2S4CgQLNZ/VyXZ+cnh6vjo/P3vrWO2/P5iC5G5KI8CwgVRWJImDOgJFY5X6zu9vvXr68HDZZhUQF2JK8FDCIJGs+BhrFWzp7eE4UozVBJAAFFiabFBCoHxgAECxETAAowgCUOP/VT//0//BP/+lituAkCFE0WSaeTq3KgABlBGniZLTTFQdYdlQgflVH2+opQeXQi0Y8wPMwKngYVdoBNnVmxP+1aKfxdCfpw2LQJ303yS6ogdzi/b0Baaa3QHhDvEdhNiRu4ooTbpsSmXD0LP+myNsfjFV3BGix6fI4rrhHoSsWZOxTcLDPrkVB1aZxwxsP67v5xvOMT1fco8MNLqvX6SfwYDEF5U/91BEpFh4GEE3bo7dKHj/KJmfxwfmMLVXHclEk+5/RASWRCMZ+Hn5HLZxOgDpeXbuYigBAau+CgKBE5gc45tdSvwpAGM03FiUiYEZE0bys4/HR8cOz9dnpar1e1rOAwIACOXNOoBADSZacGmCp6qBDn3KPwwC5b3c3m81ms7u/u7p68erVN19ePnr36W/83gdHJ48pVNbb0bvXlVOCcorlKNTs65scqRjbU3CUDRYvLbssh0lFmXlIIsxDykNu+77vh6Ybri7vvnl++ezl1aur69v7225oMUiMACKLerZczJEAVWbz2WxeOeOLWCaDEyKgzY7GEWcdXvE3ROl/Q9SLjdDDv/jTWaTLBQZURTCSp2qyUiRA4cwpJQCq63rbNF989fnt5TVhmNXL87OHq9WChZWq2+u7usZHZ289feuDvuVd0wpkTxWDMA42HH8tq6QiWW/A/+LAjGvWEQqpU5yuEpGCaEuhVtC6XsuQAMOD80er+YoyKujbTx8vZvXp6fGTJ+fr5erxkwd1FZfr5dtPH83r2Ox397eboR/mdYizmQrst+2ubbucr+/umtzILjEMQMzS5cSqPafMAsxsmcugoBDsZnizIkQrflH3w0EVfIiFIAKhtcEVsSGG1mNXuP/8P/70f/of/t//6B//kydvP0a7TiIY8YBjNdEtnL2TSwWfFm0+iQocaJjxOyqgk/YZEY87AJPCGxu4eGBBJmqnfIR4IzY4/BAsQjpyze7zF51TAhUjp+z41JV7+dukf3US8pHGPSi6NoxpPWtArZfB4VviwSZMt6dciMn+TWuAQo5rAdSTqix4EUpajbshB5j8DebowAF+4xoWQ1rscIF1LlNvxEPcBUEr7jmwVSQq0RvN2TQfy04aceD0/GgTENxio9t9U/JuBRXDtIsKxjWSFYSJxz69I6ezQrYZHsEFU5+e6KQAZOmmYxh1hBaqoBpQETQGCER1RfM6nB4tz08X6/V8NqtDUOIkKqAZEVBZAViE+44iVrOIwEPXDrtd6vbNbnt1c/ny8vr11d3zz764229Ozx++/9EPn7zzIc6WCsJivo0XeBRgUxR/EYQDUdM3pNM20qqsRUHZ08+K9k/90Hcd55y6IfWp6/vtbn+72b6+uXx+cfny6vr6/i4NLVrDtwyEsa6q49PjOoSqqpCQQmX+EChSCMbyKhSU+8tY6A009IbiPJBlOLjlkwEp5s0ht2jhhhQUUETEOm3bxE/NKQNi6pOw9sNw/PDhP/uv/vf/1//mv/7udz6+v7v76vOvXt9eXd28vLy6e/H68sWzV19+8fX9dtd1HY6f5FZXxzXa52sRhfHbrsQO1D8CHtxZRE8BUgRSRQEbIxFYhBDafbNerD/69vd/52//5Hh5vL25V5Yn75yfrOcPzk6OjmYIuJxXOaWj9WK5ijIkoAxzZKLZci6im32b+n3X7pLikIaua3f7fT/0LMzCQ+5BVJiN0ofRWUYFDaCsVn9IgkTW515BkAIREJEGCQFUiHXUfRoCKkI9n7dNur66+hf/3b9YH6//d//sn1VVVTRdQbumn2hM8PAvHU/8UF2MGmU0/+WC6gFmtrcWBKuMd0VmrrzJyoh4XT6cOPJ7UYpQ3C7pWNkEjtJBPUffsiXGL3cED92C8fwnluPg0UZPZCTwR6Eoq33DiRhFD8c3ONBsb3oVOq54NBITUEbwAdRgaNiXh3ogp27fyj6T0+5Tgv/0zv6JB65AMU+j6YTRVxgf2y7xaDEKfLdvxRijbZzPFbIFW98iY92tW1Wk0k7C3cISVbRzQ9AyqfHAH6cpN9D307pCQ/F8AIof74Pc3SVUBUCf7E4YoBgjIkLCCBAJZzVVRPM6BuT1qjo9Xi0WdYgYNMvAKfcqjIRIAQOFKoBwnEcEVkl9sxv2m3a33VxfXF1dvby+fP7s9evrzavXl6uT5Uff+/H3fuN3Vk+eaBZhtuiBWqOucfvsiVRhDBMhFBVUFKhzl960AlRBxNtQKSizgrJI6oe+71PXc8o5S9t2293+6ubuenN3tbm52d41bdOnDgEwVFmYCOaL5eO3Hp0erVd1VWGFGKrZIs5mRAFBrblDEaGR0p+gxAgPDi+4b7GOEj2FBCcmxtsce1k9Gh4UFgDrygGqwAIEIiIsiJhSUkRmHoaec7c6Oo5VfH3x/NO//I//7t//yfOXFxrC3W7/1VcvXr58fXe3HbQX1+9Oh05Ec1msOWIKUGqALUH30GqMNmC8K6rgU9qCmwFVFQANgQi0z+1RPP7oh9/+9vc/euvBgwfHx7fXl5L7iDCf17M6iggCL+oYQ8xd4r6XlIIIImjmIaWh75uu6fu+E9jutrv9ftc2fUpDGqyBmiIDsBNQvvlUnHyTCTENigCSGUKg4tKpCoAoME1PRqAQCDknIhy4f/nN15/8x5/+3t/7uw8ePbZ64GkTCFHkcFPKHyY779uExYWHsRbMqefJ/TsADqgKhEGxtHXBvyFno/xNvEC5LsU7xkPLPSrqN1c6yaqO2uSN75g6fRMU+D8WOZhWNwoHWl6f94UtqQ8uXzoRvG/+zETdQ0kLHDN2islxq2uX0FselTeYTCMAoKVqi2e9H2p1LBpnbM1aeBz/IBzxwET0Tnd9PHBEVDfXJm3+JrGKoWzduPXlUVU9RdRyQEFLwrIri7FNNXgzBsfuowRgsYLj6SEgFm1iOftqrXVUAITFunqicRcIioCEQkAUqKpCDFRVoSKIAItFmAWazTBgnC2quhIeGlBSQBWVYVCQYMMGQwwxIgbt27xvc982d3fb25vb66ubq4tvnj1/dXX1zZevLjd7Bvqt3/u73//Jbz96/yOkmglJkCoan2X0UkG0lLrodCXGoJa6wvEkWFBlAbDSNwuRqghz4tz3qe/TMLRNw1kzy2bX3Gw2l3f3r25vrrbXt9vbzf6uqoksFWRIy9VqVtUVxWU9I1JVmC8Wy/Wqns0okE37RkCKdNinpYBkO74DjPDGn6bIkceOXH6l6GEVTxorjK6wsAgIDywxhECKyn1CopQzIjIPhFXTDJ999tkf/+EffO/j74aK3nnvwYsv6tuby88+/3zfD7eb/f2m2e53nQ4ESiFk5hFqHlBuWm7xGPvlNwMANMlysX/lCYsXCgAgBCAgAYBBlFUjKaSHD84/eu/tj979Vi3p7fPTtN9evHx1cno6n9WzqlKWnNJ8Oa8wDl2njIECxKrLOvS5HdJ+P/S9JIGmG+53za4d+sQ5ZU7Z7kCZQ0+hNNpyKEo2H09VxVPi1TWAE7ii3pNR1TrnsuQAARWYc0r86PGjxw8ezoM+fvtBDAQImgUjIqKXaIEKjZ7gpAVso0YMDQBljgdMkkMFjheqyC2X3+uRLAkwnZbhbLPTOmnFUR1MH+kVqNNZFT8BRlyCkzWZvmP3bvz+uJlQsmyK1CuM0y0VDgjqN7C7qyUtGN1lalTSbyA/nLS/i5Rj1gPF733ZwHffDduhCzEBScfTPoKx2KjxIxBHS47jWsD7DNve+DOU9Y3rLV1Gyz+UNBb7QBGJwXnHYpA8EdO20USQ7G8CCgFLIpOtw4EgYmmgUcRrAslljxW8sSopahYEVG/iIOolXXFhrX0UCYiIgjVpD0RAVcCqDiFiDFhHjIRVlLqKRAoqoaZAAaPXwAszI0CIcV5jqE0tcOq4abrN/bDfXV28unz98uL161cXry+ev75r24vr24vb2+/+6Eff+9Gvf+t7318dnUpWyaqEELSMMjvAKSXPFqa8CS3HOhoD9ZFMtgHMiKTMkhMQckqpH3LOibnv+2EY+nZo2+H2dnNxef3y4vLl9dX17U077CiIMCgJEkaqZ/VcUyaVptnGAA+r88V6uVwvF+tlrCLa5WS0oMUI8t68WYdS8caBHfg3lt9Y4J+556KgKswABtDNAGT7kzJSCKyQEwNy2/W77XY+jxT4/u72pz/96c3t9Y9//Vc++PCdNu1XJ0c//vVf7zL99efPh1zN6zMMV3x3LdAzZ/C2kQf3weHJiG4UIJcmEOPqR/WixYbReGYTfgWxdBNWQcBARAAUZ/W8iqjr5TzthmfPnjX7jQqeHp8dnay7rt/uNvvdrhv65WqhOfOQUJU5t3lomr5LvG+7Xd83fbrZ7u62+7YbunZIfQYMMdbCqtyDEmEUL0Sw/BUwNA8wdq8FpwcVJXiCiyQxTamIKlLHpRkM4Xx2cvb3/8E/+s2f/Opyvnjr7bcXq7VxrjipVZvphAfniwDjWNrCqYyNkdG/OekLgINqEecACgq1Wh0XtGAKYhK5gh0PvzuKovP8rqZgZHEOtF1R0KAH+lNt7IEL6QE9VGShZMOU0MZ49qVTjCcVjRMei4bVsT7uja8pxgFgcZCi5KdHOqS4Dll4HZcEULItRx7O1CdZIYKWZyjvpuURDvIfimXV4h8frhJAD6ovfEnqZASauYXi0SiAxiqG0emHkpMDAs7fEFjPZ2/Qhl5Cj2MgaNzMcRbgyNxjeTwzz9baCICQqCJQILS+vMWQgVDAGIKN8YohxIBVjNEzIIDIRqvnChRQAiriACwUKSASJAAgASUgEImIIVJYQEBCxtxz03DbDF17dfnq1cvn33z9xTcvXrx4cZW6fN/3V/d3FPDHv/WTR+8+XaxPsZpJBoXkxVTGdsDEijjZ4PltdkbirUQmS+AgGURtrq8SSs6ckoLklPOQ+rYbui4Nqdl3bdvtm+bm/u7i6vLlq1dXl1fb/a4fWiIkiin1KFBTHUN8cPYgUEjDAIFm63U9rxcr9wCKKAiBN0f3xgABdTIHB4Jr6y2jUJ3Wn1w9NeZKGay9pzXhthQmFcnMnDJbFbdCziDMnPPmfnezvd9u754+fXJ0XG93+5v7i3fefvL240d91udfvgiL1cff/+7r2/3VNj18umz2Set6t98PqbfUndFQ2cU8uMcG5/jQgXnDor0J/E2unUs29spdCqYQQBgDpdSenp2//fbjx48fNtu7QNjutzkNT58+Xc4XKtonfv7i5fXV9fHR6sH52Wq5rAn7tlXhfdM1Tdd0edv0+27YNO3N/e5+03R95iwsSKECBKIQYq05I2KgCqzzrfosO7DsWTKti1qaH6kARRARsOH1qABKGGKsEZUlIdDJydE7b731wx/8yvn5ST2vFQIAEpHF2UBkTMTAooa84dpo7UsStwcBsbD/b9CHhZcx4bFBwzTquCl2WKC6TooFXPkcJrggTNep/FbkUsef9/40vhYdwffBW2vhtRXKyMaySqdfik05BDcAh7TWAfFR9FX5Nx19AixMjts9exOd9Fx5zvF+ecXqoZyWxZVVTjQWjKxW2URFNb164G+MDkVxVsgJtWI3FdQr/FXLnDaHqZa4gcZ0Wb5NjMFqvtRSkMkabFvavrsAWN4YAUsGcJEaGHvF0zigsxykeFTZJ9WhEiIpRKKIgRQDUQxIwTpBgzVsD4Qh2BxDJKJYWWaJBC83TpAHkZS7LgQJiFUdMAcZRAMqs6oAxTBf0Hwe6wVVlUKWocmbbd9s2s399cXV5evnz77+4hc//8X97e7V603X54SQGb79/R/+4Nd/68njd1ZHp4EqJa7qGWLAEvAdbfuESK1Az7WkFhdS1XqU4fRP6M2lWYVzzirMQ5KcU5tSl4Z26Pbtdr/fd8222d9v9zfXt/c3m6HpCyGASKiZY03L5fz84cmsDn3fzxfL+Xw+X6zq+TxGAlIv9w3uUqqoavHicVx1ufIOlc20ebRQQcDaUFpLXhEQKUlF9vOqKpwHyXkY+qEfgKieL4QBEFNO+/322dfPfvHpJ2kYlovFcn0spDmnxw/eev/9d8/fOr/8Gi6vNrf3WwbIkoe+36fUpT5rKqkhB2io4Lpyj0a3YOwAgWV2BoyX6eCqI4BCKOMfFbzjk4p1XlPlAOH8/MFHH77/rbffyv2eKaScT45Pj47X9bxmkc3d/Sc//+TF628enZ5/+9sf46PHtF4AUp+6fdvumn1m6odhu93d7nbbzXbXtJwFCJEohIolKyARSRWc86cIwmpMl98aUlDLH7eKfxEmqFQRiUIdpGVABGCMlTW8CkFTj/d3t33qV6frej4TAEBGAAwQvX87mpUp+2GqCxGc3nWlMKJkJHBcPkoIACgWregw80B/H7A+cICJnRZQ79N1YG+ml1o1EhRo+8axuVIl15Mj+1p+wdIZ0BUtQJlyACVBtPQmd3Zo/DZMBqZksvjHYln4uBLvT1ZcfVv0OFHDShdG26eeUKlTelPR7IWRHJ+9jJoZ95DGdYxGsIRZfZ3uEUwexkjEwdjA33/IsnzHsgO/4773SiUbP9YhOovqK0Xv1QN+T4zvKREMgxJuTJz0sbYPWmTFr+eBa2U6CDGSRgqzEKoQIlIVA6EGhBCQyCd2EAGCIKSAiIg8dAIKIhhVc0ZNPLSaB4CMqBBgaAUA63ohIlk4hECzWRVXNJtDrERZhna43TT3N32zubu8fPHi+bOvvvziyy+fffmqbfK+6bf7NDtarJfr7/3arz9574P1+TsUFuyoUUXLBCRjwvx4TD6Lg6mlCan1ZpJC2hocUSndN1RZObMMmXNW4dT0qe/7pm937b5p9/t223VN0zVtv9/3za7p+0EBECNnVgUlwEj1vBqGtg6onE7OTk/Pzk5PjxfzOZI3s7MpyYWanGRZ3/gdofRYAbSxfp7OCcwKgsWSWT8fwwE2YAEIhHMeek6pa7v9fm+pBAgxzASJ7u62n/7ir//n/+X3v/Xu0x/+6AeSpW+7Bw8e/OgH3/vBT37c320++fO/en1z/+pq9/NffPrJL37RdNq0bdftU24RmDCw4kEKfxHb4rjDdAq/BPwnNTZdYGeC0WrAPXig6mVqCgI6m88fvf3w6btvzxfzu+21KnZNf3Z+FqpaALqmu3h9+dVXz169/Pr4e6s8ZGYZ+iyc+yEPQ+raYRBs+7Td7duu77rEObMmDEBRKWhmBlUim/IAGDzci0qinjhlV9q4G5MposAqFdWBInMOIaTBvUwkXMyWolk1scjFq9fbzf7k6EiYY6zIOjJKSSgyBVUU+QRSodz4cd9c77pQI2iB8W5H8UCG/CcOtPZooQshRABKRTNCiZZOGh8LAC5URXnVyAqgjbW0CAkWNTWakDd1tU+eh8k8ieN2X+jUu2SUpJIjh6N/f0CIl486eFT1RJ1iPw4GOsDYAudgJ0xVjlki0+osX6o45RPv5NtsBzCytoUQkqJXR9uLUwDgYKS4vc0B33OQVmT1+QCISLEOPvdGSwAa0QbRmS4ZG9fhuAGKAEIlR/lgboi9jNwQogIqjNRjRKqrWFGoqxARY6BIFAIiKjmRIghGtWTVrKwKTGZglANrzj0P+7TfSOqRtOeEoNZJoarmRBTmC6zn1XqJgCCsPICmtN9uby/7ZnP58tmLr59/8cVXL1++fPHi8sXLTcAAIc4WEUSefOuj7//k187O3p2vTx0jEYGMkfWCHdSTs00gnDAZTUJhGAFKg30REBFRyVmtFCKzcM7dkPu+77qu6/uu7fp+yLxvu33b75p+1/RDkswAQqpisXjOjGQ4UXZts99t1/NquV6fP3xwdHIWY1QRBbHhUrbtWkQTBTSYygcFH2ZQcAaY6bZ6BQFREWuSoWK/WrfqwlEqKkvO2eB/37V923BdC0DueXG0BqKLV69+8ckv/viP/mA5/wczqgFpu9t86/0P//E/+2fK8G9//w//4A//aNvLF5+//OyTLy/vuk5AhHttLVonfhfHSK9OCGyUYjubX/oa9dN4fV3ljC1qA7Agkirb2AdRYeb1w5P33nv/o29/IDywSkXx6dMnxydHVQw8pMuLi2+++mpzc/347MHbbz09P3mwnM9RMSdR0ZRkSJIA9/3Q9H3XD027G4Y+Z1YQigSEGIEEfXJomSsl2aaBEUhGJFFF83PRfHAfrYAhWP29um+ukpnmETAQwKyeN/u7P//pn/3uLz559ORhZUJr8FgljIrijd/GyzyqbcfREyVzwI24+1u2dVTNRdU61psw6sjoj+9sHLCWUGn5r8Q8YQotTjT6qEP9lEs8opgKRAzTssxQkfWwGRG54KgQ1Yc5qYW07F1GKcFDFTc5BNOeeWxgVHTjXo6kz6H1G4l/17djDKO0hzOGaXKgCrXyNzbY9fu40KmIqFhZAwyu3gnJySuzFtPzA4qNfXF3zco0NUZCox6LJ+LOCNh9R6NtPFdWx8xdG3+rUvyR0ZPREUCQ96OHSBQI6xiqEKtAMUAIFBAxKGoGQAKxIilAm+zFAIIqAKzCyllyr5iDZOl20N93u61nDeU09D2LUqhX69Pj2eMwPw7zmSATtzoId02/uev2dxevv/nqs08//fTzL79+vt02Nzf7jACoi/kcpNMUfv33fvujb3/v7OHbQJXNIXwD+gCMfhCIeP6PKlhyp9OmJl3se2fBUlV7NGGWxKrCQ5LMQ9f1Tdv1XdO0bdf1Q9+lNAjf3t3f3G22m7ZtOSUvWco5Y7SEQFTEputIGTLXj8/quj47Pz8+Pqpi7dLv3fMOxUhLc140dkENCkNJTDHRM/eFs0ouT8Rg3VVFRVlZbfimsvRNMwyDaG72zWazAQzVbL672x+dn+y2+08++eLTL754/vyiS+nk+Phnv/j0X/+v/+YH3/3Bw+OHYVUvT0/m67PZavHN82G+bh+v4nx9umv2t3dX93cvRBoFBlAdh0eBwlRfUXIZAUr+D07DeArYKRCMS+gLQBGJHK+Y/gBBIOYcMZydnT168HA1mw9DjyX3XoVZqO2am7vbpmneefrOt9771ocfffjw4QMkTG0/q+bdkFiVAYakbdf3Q2raZuhT3w+iAgQhEAuXolVFd5U97x1QEEgpiGXYEqo1WA+AQAa+xMZZazCfW0SJKmEAhUiRRVnk1auLP/7TP/7JT3796dPHQ9cRIogECgg+oMSxbtFZB1RIwYwHf/Esk4KyXWNgGUE1aUYwnTB+aypiKqjYOSEtCBkL5WL3Sg8iC+VDnI/CaUHjv8II2BGtR+YIhCfP0N/FQO3hTZgsw8gmvam5fc3wpkrTA/8HD95vRFcwRc/HJyvZqGUK8Bv7NvoaJfPWIxcKf2M1oGP/xvHZxwcdCbqClewpdbSrNPb5M2KHoHhAqp4gEmdVcKBqP2bCVsov7L1FR+UHRGStGrzjNBUWzVhiCxmTNWohQogWoSXL2wkIgKhECsoIkLkHZtaMIEhKFACycAJlUAbNkgfJPedBc5eHtm+2fb/PXb/dbBQwVKGu66peHB2fnD14PD89r04eYFUpKPe7Ybvf315vbq4uLl48f/HVF59+8emnX1zd7Pf7lBlndY0a9jmzynsffOd7v/aTh299OFuuRa0ZIKri2LfHe1SJeTzF4TJl5FdbgMVyPUv2tKX9gDILizIri+SszHkY0tB3fd+1bbPfN6nfD2nT7O92u/vN7u727v5uc3+/adpW1OZtAkKoasppGLpuc38Hq4Wk9PZbj6rFfLVeLVYrCl7dbsu0yLqnbJKiYwGLWDh2Fjt3u7mAaoXK1rkTvZuzGTllFsk8MMVIsRLOXdv2Xden/uriar9vt5uNMIjgSdtcXd3+/D/+/JtnL1oZYoxUVX/07/7Dv/r//Kvc5Kv//LJ9xZ9+/uznv7i423ffPL96ebk5On7c3WGTNDOGMFdMxCQeQinAbNIEo5hDgUtv0BflFejOuqkc8lnUpnGBSFhCCBQQElaz+sGDB289eoIsqWuVFSprRqxZcuYsKvWi+vi73/74448fPXgQQxi6hlX7JEPmlDmz7Juu7/o+pabruq4b+h5jMMTHOYkw5ywqnh0YgrAKWho/oEkWevW2omNGRBIR5hyIhK3KjpEwhCgp4xIrCgNV9WyVu/6vfvoXX3755eOnT+yIAwIzx2g1BIBIOnUzh+JXTfhGobywsDVmrgr6MbqjKNqi/Mb+CXDwpgVk/pKyOiBV3JZrQarTS6fEy6LxYXpfg57OyBcsXpitg8gtvikx0x/0sJ8x+N/eCFUf/lZMlk4LcDgxug40yaL/Pi7ezR94/tBBEmkxb/4tLV7HuFybgO2GAcCcJ/up0q1h9BQQwJrtHJBmWj4Fpq8S1afxGexJY/StxJKINqo7VGATAh9aWzKCEGzUlu99iNaWE2zUNgESYSBEtIiuWWIEFYIsKgSiLCBZlCEPygmBFQRUM6nmgYdOOCkPohk4qaSu23Hq+3bfNru+a7uu6bouxPnp6YOTJw+OTx/Ojx8u1se4OoYQVDg1ze76cnN3u7u9ev361fPnz7768tnX33zz+vVVziSsqhEUsvDAkDL+4Dd++PS9j08fPEYNCmAlNgfEHCqCdR0uTYgc7UP5P8oocYgCkrNfBLE6UNYsyiwpC+c8DEPOTdu2Tdul1LTdZttstvvtvuny0PRDn/r9bieQjSxFCoSRUAkYVPqu2wKfHR3Xi/lyOV+u1lU9BwAVwVAa84GlEnogH6kMH1YRUSJVVWVR8LotQFBmACAQsbbYNqPYOnvmLDzklKJWPOSckuS8u9+0XX97dbPd7b/68guEUM2Wlzc3t3fbzz//8uXrVwSxni+bpv/0s88/+cWns/nq//Z//3/sW/7zP/mzTz//8sVX32x5pxDudzcCNUMPkMnVTCBggQzWw/qXAN7BFXVvFMD75rxx5XG8I1NeHAIF9IwmUSFUgPmsfnh+/ujBuQqLcF3FCBhDIEThDKwR8Hi5eufpk7cens1mVRqG1PZN32537d12v2u6u323bdtepUl927eJk6gECKYSRFjZhl+yqISqtjqQsiYBAPfcRcGwEVYYUABEMRAikXIvygps9GoMAQEyZ4WwWJ40+9vXL1/9xV/+9Mc/+tXVep7aTnTiFFwBHMBeV21gRrZoMULP9Jj83wPVOP548Q1g5HxG3G+Af8Spb5oBhDfQcIHXE9k0TdYaXzGuBwot7qaqeDPu0GGB04dZkDoKAvqPjNJjG0CTMfOtmmIKv1xAr76IQwfg4Kuo8eJyaunQP26lTmMDihHA8g86mgNrS2HATVWBiKYKBDxoe1cMIhYspKowUbtlSWOAetxacCUPRMI5LuqowsCWsGQD20nF4r+Efi6i6MMaLVgbzFlVRcQQ0aBMCG6YKRACYDQPRAQElTUz50FBRRNolpxBMyATMCGzSM5JJUseOA+ck+Q+5yENLae+6/ac0+7uNuehqmle18v50dHZg5OTt04ev7U8fjg/fYAxMmDXbBKn3dXl668/3za7F8+fvXj26vnXL56/uNpuui4p1hEJZNBOVBm7vj99+53v/MqvPnz8frVYWpKIMIAyBRrD5qMYIU7CiAX5WI2dZPazLTkNnJMw85AUQDMDC7CkPvXdMAz9MAxt0+/abt8Nu117d7vZtt226Tb7fZv6MIsh52FQLz8mtkx7gMgiFCpL/Tw6O1sdHQcKqgqiaKRvyRtyVGbDSUtciDxQZbjCOuwBioAygIL1Gs0ZQYAtC4hzSiJZUhZQTsoseej3293V9c3FxcXN9XW7b0Gpv7mHGF5f3f71Z79o+qGiRUq8ud1srm8S9z/76V9evnq526Xrzb2A1UZxgJhhEAgIDAAKhn2CHmR5jpGAojQO7cH4HX3zWuLB3S1ZkHYXKIAyAQknAoixWq6PT46Pjo9WOQ0gEkKMRFUVFJQ575vddruZVeHBg9Plas6seRiGNPQp7fa7++326vr6drfvGJuUd13b9J2AKqlhaTuXnDOU8XdWn1FSBFBVxSMzCogqSpW52WSpoCHGoCiEIBnAhgMroqpkUeCBA1ZVtdzeb376F3/26W/97q/++IeIZOkpWCgSm/p8UCvqrPuYxVgEumxT+XWEyFoUc+G3Jxg5HoW6gh4ru6a3mQAwlM/U8cj8FQdnp+PblheNXoDrfA+6EoqURY509JuwHqyLbPkWHqxniixNT4dQjElZ77gov9noAFDAW3nIpHLdA5j8mmkh3jIA7UeRZGxJCDCyZAqCzvmpAoDRr0bLoRKMqBSLo+D/c0fIbQeotQBDxLFvStk6328UUIG4CKSWeRZAAUGQgNQgoRCROSAMQMZJEhIBhtLCxyCVZ7sFI4ucdlLMKozAqCI5gySQpLmXPKgMhBAr5Nzl3IFmkawiXdd2u03yruYDp54IOPVp6BCwrnG1Xq1Pjuero/XqtDo6qat1nB/RbJGHQYa+b5vNvrm9uX79zfPXly9eX1y9evHy9YuLu5vtbtsBVoJRBURAiZRVEmetf/Tbv/n+t79/fPYIEFgUEHNKdQDUYAR+0ZwTnvH8Tkv5EgZVFQZhyd7fVMSDAJIy56yZQQBYcj8MXd+1bdd3Q+oN/t/ebW53u13bXF3e3dxt7+93TdPZlQ9BEw+qRMEsLwKBcRciPJtXJ2dny9UK7Jh1BAQupi6SOhVfF7k0Ok9JrCWOqIqNHAFmToNFLxBQVVIahrZnzgrQt72wiMDubnt9efXl199sd9v72/vjo+PE/Oz5y1749eVt2/fz5RwSU4xDl7q+n4fZdtilV9ahCQBIUUBVrb2/JAVGOJwubhsZdAJoh3cRSqhxxKWH3/QrTAXE+NxoQQhIABIIBamqQDTGWM/q1WJdhVlu7zTn1WwRIaBAAOpTbja7brs9OT+d1zMEQGaD8mnIWWHft/fNbjekJLjvOhaJVRyUoZS3qAAY5e+JYKDmUVspEKIV20x0XEQVwEBIQTR7AQSyKmtpJKuiWEWkAMJVpCxJhEXgy6++/tnPf/H9730nEh7ocy1KGArzgmOGVbGxCpMqcW4E6WDYVxGckdQo2nbC+aWOyY2vp0DjQcDZ4RJOsNc1agHAOv3rdKS+uin/XMfPNPBPaGP1ZNSjUugXMANkpkaLfp48I31DWzvq9oAwHjwiIFl3Aovi+GOaKi8a3v0MLQ8ywny7Rp6DP+64qIKXg3lQ2g2jqX3Pwgf1cUeqAEiM7jACKSqyjubLrr6IjjbBrnigsqhJMdgKLF0grldzzol7EPJEdluS038e4yGwwSIICBDQs4RDJAAMASiSCiMoKpu2EU4gmYcBIImwSiZl1axpUO5Vs4B03ZCHNuVeuc85ccqsMjRNO7SrcCp6AAEAAElEQVReCSnZ8guXy2U9X1X1fH12vD45jYtVDLVgkKRd1w6bXRr67W53dX19c7e5vbm/vHj1+uXV9e39drvb3TWIEXGuYkR96IdczQgl9IOcPHn8q7/x20/e/u5stlQGAhSBQASxeHtjSdT0ZaItJswqKsJG9SizZXMrCxIqi2ZWFhmyikgWI/6bpu2Gvkt5yKlp2/v77f1ud7fdXd/c3m922/vtvmsSZyFWFAwEikSkBLGqAJUCcU7d0FXzxer4eFbPCAE8Vn8gYtNqC8IaITIXO62C4KofNauIpKRD4pSAMCDmzH3ft9sdayYKQz8AhmEYrq6uLy4uXj573vQDIjR9d7/fb7rmdrO7vrlfHh3f3N7OF+tHj98OIfDQZ7snCBXVdayZaeAW7P5oaed5kH9X+FE2S3AA70elfwAeD4+maCAExDIvQlUBg6ljCSQqqhBDJFSWFEMVYsh56LsBVTJzVVE/9JyH7f39zc1N2/XnSKnvuc+qzCwiqorDkIfMSLWSZhEb1gYUkSCE6LdcVVgIKAM6ylMU9ui0AquCMJdqG0EM1vsHRAMFAFXOAgjAZjStZgaMvJMUKgQBCpXm+v765sWLr3a77YPzk6FXq3MG9G5eUDC66Sy3PiM5LaOdcEWsRdWPzoEeoog3MLazDbb1KjI5AApautECgCfjHp6Wjr+9IbWjukYsXfEd5BOOC1UwqzkKRElZ1MKTlzBDCXa5uRldF7WShwMvxD0TLbks9qEoZQ9VAFQmF6H4+yVWDv60OlorLdNmAFRAqWB1xNKDaDoOKKyyU+0eNB81ONLhw3vM3ODeuMmENr1K0fZHx3GSzvLAGFlWjVWkABULZMmCbku9fMKdHbd5htgQAEkIIIQQUJVEgUUQQHI/gIoAxwCQhjR0nHpJAxIDsHDiPAzdXmRA0lhFGVLf75t2l1MnOaFSqIJIntUhJ0AMi8VRCKGez+t6EepFrOZxMQequr10zf1uc7dv+n27a7tht9vf3N+/fn1xd7/b3e3v7na7XQsYRFQ0MhMp9WmgEFiUYkAMrJSFPv7edz/+/g8fv/2OKnAGBSWrohwj9MaWjCrHAJj5ERYlYeZhEM5Thg34hHfJLMySmVNmzpI5paHv+6Hv99ttEm3bbte2m/1us9/f3N7d77f3u+2+2Q95EFLVLJABLalbIwWFIJJAqU/DPFeL1XK1XFIIRekBFPGjIhDeR9eabBvGtuuJCsKSknLWnJAAlDVnSSmnxEMGREEY+qEfht12L8KAAEhdt7u52VxdXr98fXl9e98OSQDy1d0uDfe73f39th0Gqquu7R699+T8/KzpU9t3Zm+EZbGcEa3qeNLytmtuFFKZckqqYoWL4gyCA8wS6MPpfv0n9D4e/KoAQQ+CB6qKpIBkCVwm2IRoQX0BBSURFIGaIjMPIpgHAN1ut5cXV7kfCGOMNQbkwdRFyEmGjoVRNOQBui4NHXMWESh5f5ZVCwBk7dTBisELQQwAogJi6E8AFIFo5IJtwCkBEMqQhTO4YvWe6n4ZUVWZLE6Qtd13Q9fHGNPQjzrfI4UqVms0+omjBpvClc7+TMyF620dC/1BD9l0pzNMVwKgdQ/RgjZwnG6Fpe/DpP5dvRyiq0OPYrTmk8FBhww4hZQVYSI7cFqJB4WwgGHTlyRa0hv9oxXe1P+TCRKH4OBPAofx5fJb0f0jtP6lNCiTNR+Rd3hFp5Qs54mMoSs1gEXzoPWO1OIYGzAfm69Ob2KxailWMABYP3GwgCZQQPFyzikjiQjjbL1ITU+IlIFVGYQQUfzBbTO9QykFBBURRAgRKABAVhWFzCzAWYVlSMxD0kHSACiaEypz6lEZNHMahDvQpIpdv0tdO6S+6/ZEKMKSpe9VEVbr9fHJaaxnIkohQghN23O/V94n5ixye3N3t9ne3tzd3NwlSUPmpu02m+buZpsSp5Z5UKwjxpgks2LPDMosSipIOF/MrQkbVLMPv/Od9z/49mw5z+zq0o+xNP9BP0ct46iMTXEnAFhUWHJWEQiApXgs52wlVJJZM6swMOch5ZSa3b5r265td32/2e02u/22bfZdu+/apmubdi+QgBSQVXLBApYmHABBRTOzaqYYlqt1PZvHGE3HTQJnyECVWRCskWARbJtEyFnVTpvBNItNTRBJwyA5c+acmEWYue3arus458yy3zVt39/d7y4vLm9u79s+NUPqh2Gzb9uU7pvtvukCIqYcMJ6ePlqdHLXDnhBWq9URHbe74dHZk5MHD198c8G7BthGLUhhVzNKtDiwghKQgpaxcmOtwshmCAKoJ70f2GvQ0vO5KB7TZypgyWciKkwYRBQRMsvQDXeb++1+K/3AAUMVBGS9XHLO+01ze309n89mM6uZV2FOOWWWfhj2bde0Q9cPQ8590w19SokhIEJAQEvbMVLCDI4ygDW5dbZCQXgqHjLDoYDCwpaJa/FwS8q2t3LvHDGoKNioOSJAZZEKYz2bWfd1CkSeyIZF105sBhQZ14nWKJDV7QpYj3znhmTSweiw1EKDUFrHuZ4uYU4t9gGpFBMZ6HX74/KIpV/hRE+MtAgc9sYfY51Gh8MYgXauQs0skKWvib2GyCyUipVg2MJH+F/+qCUSPXLsRSdrSTEAQgID1/Z0U64NoOloKGZgDC2Pb+91w6jWN9t7KNv5oOtZACRzVj0Dr3ThBPRmChPysWCr3RlRLQdK7l1gifqq9xA0TB8wWKc3W6HdshjrCAjSJ+oAUqIA7iCIm031amQFYyJAAK0cUVRZQRESAQv3kJOkQXLPQ0soSIrKKAI6DN0eUVPuU+pVJaVOc9aUB8lVIDVxYlit5/VioaB933fdsN03w5C2m92QeBhkuxvykJuc7+82m7YbhiEljnWNhE3fbTf7xKoUsY4KPDAj5iySQZKKR7sCgiqjCGJOfP722cff+fbDx48EgC3j5kDmxKf4FKfMWTVRVRCWnEEyJMlD4sSgEikSkYqIBdXVuuWoZDOTmtLQdV3Xd/um3bf93Wa7afa7/W6zb+53+zYPSZkREmd18i1Yxxury7CZsUSEICK6mC/qEGazuQ1heTPNzhCMlXQRqrqOLdNpRFjSIJJQPNGTh5T6FlTzkIQ5DZyG1PcDM6c8DL2tPF1fXe+b7vbufte0bTdkkd2uaYY+M7R937VdQKziTEFWy9l6OX//W0+hS+vF7L23n/7wxz/6sz/9+cWry7btNnebQRoBRtA6zGd1RYTDMHAaMiR2n1kAkDRQIBbXPeQlUQVCuzEeua3RDAAgAPlAInf0x7NUZWVSooCs0vXt9dXV5dX1THVex2U9o4pMSQ99t9tsVotHi9msntUILJz6vttuN023b4du17S7XdN1Q+qGvsssKqSW+is5s7CwKsA4PEdVCIqeUgG3ARMQJMDMEnNWBKJog7NtjkDJD3VVp8oqQAGE2bTbenW0PlqFGIwIEBUTyIPcSWfHPO1X1JSzlvKIouHJhmBjCUyW1xS0CQiWV44eXlYfKaqFZtJyHkWJIiAGKLQ6IIj4GMLpxJzuKGbACRJ1tH6Ydzpq2+JDlJVbCnvQUjgmKoBAgcCsoVlA2213VbRQIuPjYQk5WGMVKp9b7EcwUn+cW1nsj8udtTEfY9HlCwGsea8zN3YWVHwvxDHhngyMHhYAODej0zJdIQW3hVBssNqCFSCoFUuU7FhFDPTGRUGIzEJVBFBQ5sSsTp2J9yO0eXIEqiJJBYSTSKbKKisZCZQ75SGnXoZeNIEoAfPQsmSWBCyiw9C2Ch5FaHZb4UwBlYWQUpZ6Xi2XRzlr0+wun7/cNvt+6PfbvQJVcT6w7nbdZtPe3ux3Teo59d1QL+fr9fL09HS7b9tuaJphGJg1KIAoJMCkNj9VMkBmRtEYIgYEDD2DCCni+x9/790Pvzurl5rcNzvIgbOTAVBRtSwpQbD2zgKcIQ+SWXrmnEUkBkIFzWzSLJlFRJTF8ilVmLOqDCkNQ+q7frfb77bNtm22u6br+92u6ftEoYZQUaw4D0YeAxhSmLpyICoCVjEiYazqaj4riEvxINrnLRxYoCYTUxQVZiCAzJKZh6SaUQXByOTEQwZQTjnl3HdDGlLfdsyiCG3bt023b9rbm/vNdtv2PIhud+1m1+67th2Grk+9JE5QzaqqCpv7+5SG4+N1s9tEoLqaP3j84Mn778w+/xouh13XZ9krxG+dv/edX/32T37rBzMijfDyxc2sitcvrl9cXl68vri6vBiGPuUMwqQoAIQUQlClzPl/ewxkAZJjTGE0C064qqoQBEAkoLquJMvt3e3Xz569/fBcOd4In50c1YvZvm83u80wtKvFcjZfSGKkCNbSB6RLfTc0XW6brmm2bdsOKSsLCImASB5SGkSVWZyxB0CkYDPqPevHWAa/5yqCpMyMAc3hFJQQAygIsmj2jruKRJFCVBv6QFjFioFDpKcfvP/03ffmizn3vYjEGAIFQFKbNO5dZQDQm+iMlIUCqorlh8E4Lcv1EwBNRI1O6sYDyRhw1MIH7Lz6thfoXkIRWAgZCMGxPFhHz9E+OUh1lsVrEop5BJzOvLDfb0CfsScUGAU1MoiWLUQHMoHelx3AmghNjSLKxsDURsn/7n6EYaqDbyqMy1AlRKvs880la7gEYIgc7TuANDI8Lq7k9tkFWf1NRpeoLL2k7LtEj16ULY+cFSv0gR8QuplD9Km6CAgRbfpiVZGK9hFyyywiKDmXps+2xaK5VwQQRsylSFFS1w3tLg1byUmVFRiYVTUPXdNumJkIALgKRKQxRkSYzWcxLggQsEop9cOQOb98dbPb7Xa7/eXV5e3tbUo8q5en5+d0VCfOl7fN5fX99eWGgao61PX8rbffXs2WbepZmn037PcdizKwsOYMKmoKWBESiwhXRBggxNBlDUqiGGfx4+9//1vvf4AUOYF1uzmwr+pQRcUwGgpbC0xkEWYZsuSUhyQshEQxkJZoO4tyFmabiGiqP6eUmXNOKeW2G3bbZtd0m91uu9/3w5BSVgHOrMx2zsIFmHhnVh+cRoCIIMysGmOIZB62uokvS7fQE3ovZAtOCILqwJIS5yScRXJABVFbl4KqSM65a9qhH4Yh5ZQ5c9P12/ttVm67/vr6VoHq+er++maz2d/vd+3Qt33f9gOTVnVU4b6D7X57fnr24PH53fV1nM3Pzs9O6ifXry5ef/Nsu2sE9OTo/KP3Pvzn//X/8e/8vb/13vfeoi7VsxhClZr0zRev/uAP/+r3//X//Md//ie39zeAPSsjIrAAKEtCBQQZx/o6NwojN+vHZ22ySsk2qqgF1YsTBZmVEANV/ZAuL6+/fvZ8PV/mOuw22/Vqnji3bXd5dVHPq/lqriAiHOOcImEkINUSM+lT23a7vssJgwhwtnz/zJmZGQiR1cCFR2LAe+uWEOvYT1LFQgXW4lyYgjl7wDmrCIHarEh7LEJNwqghYGDJq9ni6btPHz9+tDo6BtIgGINVPkMIAdVam6jzEuQaY2T7R9ZmDD4WURpj8I7npyET5D9KVNip8SfKTcJRoxXiyFopex2YaesDFY4Tlp+Y8aLNdWR+JgNzEA7A6Q2goPIJ0JWhh0Q4PrxqQBXUaQaC6VzQAt8JC71jalTG4zrotG/eRSFetNghl8riLpW98dgBUaFqbV2o48MDovf8wfKawtuUrzGIM6L/0rsTnPu0Q7W6MQ+QQOHLbJoDoYjE3DeVLpBIJYNkUAbJiEiUEUTLbD9VkdyDKpEqcOYEqJIT85D6/dDtsiTNiZlTTiAiKbXtbhj6ahZX6zVEXa6WdT2bzWaskVO/vd/v981us9vsd/vN9uZ+d3d/e3e3paizWJ8/PF8t17umf/H5VxeX29dXW2UMVbVcLqpIs/WintdMvL3b3u/u2i41bceCGIOZc+s+Z+g1K7BCafwFhJRFuz49fHj24Xc/fvzWE9tLIjic7IUOk8QGC6OCSEYRyMKZJQ2SMw89Z1YWjJVyUEIFBWEZkiqjZpBsZFHinNIwpJRy7rp2SH3bD/fbzb0Njur6zCwqechiXLufIAIX31NA2FhvRbXQg5Kl4Frhnj2GXwwjoFiVKZKVdKGo5swpq2X6ixBCIDI3hZkBUUSZue/6fhjSMCAQM9/fbe4321BX+67vBq6X9bZrbu5ur25v9t0+Iw2Zm76lEKqIVV3nLuWhPz45OT89ut/c/tUnn37+7PPbuxtO6fXVawB8+/HTv/U7v/nf/Lf//O//o7+7qpc0A8rw7LNniYf/8Ed/8tOf/fyP/vxnP//FL67u7sRMYmbCAIHUQ7jjEOCiT0dIOKk1KnrH1YEigLKS8RUCIJIhgUYEYLl4fTmfzR+dnK8XVY3att1sVm03d9vd3WxWr9YrVUUKSlTVs2o2hBCqqq7CjASHvu+7tktJQhQlgWTEnyIAiat7JXAHXFjEOUVTFK64DKWqgCCL9ekkjNZGRDKLZvJ5eBVhhSoAEigoAEsC0QdvPXn//W+9/dZbVR0iInMmH6/N5eaDV0ablhHnThw4FCZ51DJaFGmhfGCyWE7SeI6NyFgRXPyAEmo/oI/cBQgWhbXKFBjLjif1PzZ8HqFrcS2c4ihqb9RpgKPqBCjpr1rILE/WLE5MybdXcXxNJYG0vKs9oh7gZ+/xhZMeLYySMSUj7kBAK3p1pgtLJ00nttDZdaf1i5Ezvs0fpjRt8UeyKHZxbLHwbAgIAVBLATSCdXMs/JuAeQKF5RotZ9k9sUYZkYd9lERVpSkD9wRJdFABIgGxwCCrqgFGUBFUAU6pGYaWh06BIQ/D0HZdK5mzcko594NwjnVYLKvTB2er9VGo4+r4mJCGPu1v7q4uLm+u729ub9umv7m7u7257dpBVE9Ojh48Pl2vV03XP3t19fzl9d22u71rI83my8X6aF3XIURdr+Yxwr7Z7XfbIeVhSMID0sxGqYoVFSgyo6VcIJIoiYF4VVESxbffffqt99+rl4uc2NNqzeNx8RMQQeSS1KVgzD6zRS8kD7kfmDkQohAIcxJQkJw5J80MIipiOYOpG9KQ85CbfdMOQ8e8S/1909xu97u22+27rk/s7JrZf1ZRDEiAkhECAZIyA5EqKGkWdXrBYYNOsmHdIhFARYWBg6ponxQBWCQnzglJEXRqoCyuDPKQu34YhiENOaWsgilz07X329369KTZD1jVu6Z7eXH54sWr+92WQZLgkIYQggJECqg4pI45L1drpKrp+7btXjz/5vr6fttsIMy//+GH//Dv/e1//t/+V7/127+FqKKsSreb7Z/91V/9/Ge/+Jf/8l9/8tlnt/vdbtcAUIwRIBChiKIihcrAtTrXO6Imx0Rv0AM6agYsREdGtXIqAAyoGRUFgQIy8O3m9osvvzo5Wrz31uM+pe327urykhOvz05ny9l8OQOSoe8Iq1k9W86Xi3kfKSpD7iUzJGEFFMzKiYW90BcLWPaUExanng3zoRYsWZx8S4ESCUIUVVQRU9fzkPyyK4QYQ4wACYFBWIUEIFL48OMPvvXO2w8enKOoBgwhEoEy49i52HfBxniOvAKO+tVUg2fZQGE2itJVzygrgQGYFFL502R/DwzKiKtxfEYMjsq1TC7VYr1dCx5wF6NqnfT7tKtlzSU+MVqB8gGjQXPvnACs2N95HLNPB9OJabIqE6lV+tEVjwTHHS2PNRkxmsImxS6M7pQZKwX1lgpYtLkblAMZ9r3C4oH4vpu7AAYER88X0F0w8sYV6k20y/kIFLasDE4ws8McZbjlvuIYuUm5HxQsp4UBMudemC0lPw89S1Kx2Fbq+71IQhDOQ982Xd/2Tdu0XaxijJGQ6nl9/ODk7Pzk0VvvzFbLJLm5395dX169urh4+fr65u72+r7tUxpSu2+rujo/P3n01qMHD0+7Pl1cXH359cU3r+8urjaiVIW4Pj2az2qBnDKvV+uTo1VK+f5us9/tUp+EWRhsGG5KLCw5IyJlQWGxqnlUkoyxIkFQ1no+e+/Dj996620CUmFF50TJRE+1MD8iKoginCFnUABlFMYskLNwVhabhCeZgVBVNGfJmYcsIpYHmlMemqEbhrYfun4YRHd9vx36bdc1fb/dN03T9d2QhPtBhj5B8EtiYxkM9gEAUAAVRECiSGSd8JzZPPiyS+5BeyuLSSzMRKA5q2RgVpYQCMAqsoeUU0pZQIbcN/t2u9+LAgr2ud/t292+adv+5v55n/J2v7++vX11cXV1dTNIhipoITWqEIkIhJt9e3z0+Hs//lE1Xy8iPX307r/dy3Vzt46nv/M7P/69v/W3/s//l//Tj37rJ5pyzkOfu2dffvnf/b/+5b/7D3/56c8/+/LzF7vhrq7mBEQxApBkFQgAQBoL9AzFco3dSwRUp572Bu2ICk4ccVsAze7bm0JBBUSKEVVSzs9fPd9tl0uK3/n4/aHj/W5/tFi+/fTpo/NHR6sjHgZNPGhGleV8vpovlvPlLM4DRhVEiKqo4iWAhQAYyY+SXgZqfdvJ/X7nc7zOSx0ABoteq3LOksROGYUViSgQWn1lruuKNfd9/+Txkw8//ujbH3+0XsxQxMAfgKHuAgpLHBXM0zBkg5P/MVH/RfePbDoCoJW2eXdxHV8+KSYAOKiWnIQSsWTkugJSFRsRoJ63Vl4+ETvFBhVv4KA2FwEm/kW1NDEEV4OOmItWNiBkkMi0r1hijOntgq117JpeOIBDe+IPpf5B9hkA3m10fKmOyUFjcOPAMoADEstkcM/AlqdYPnIi4qar/EYkudxtgFLsq6BlrAL42A9FHeOZAKBOHBeez5evCgCx396CBgxRU5ZkWY0p90PmTjhBAZJD23Z9Iyop9TmnlDqRnPOgzPvdXpWHPrHk4/lRiLBczY+O1udvvX32+DEg3V7fX1+8ev3i9etXr68urjb3u922EdF6XscQ33nnrePTo6PTNSO8vr578c3FV88ubu+7vlfA6vx0HWKFgbq+p4Bnx6vT4+NZPb+9v9zcbfddTxRVEhEAoLCkJFlAtCRUCxJTjMjMSBFDBNCssDpav/fRh+ePHgIiizccxzAmHAhYr0EVskBuEswKaCl2VojP1uOTAUIQAFJVKwcSFuac+pyVmbnr8pB46HOz7/e7Ydd0223XNH3bD+0w7HZNNwwiklJOAxsoRgMF7lKCImIgCgLsoSRA6Pt+SD3nAV1scBIRsa42Aj55eLAscIuNcB4IVTAAkKpIFmFJOXdN1/XdrmmbpkOivh26lNpuuN3snr18JYoDy8Xl9abZ3e+27dBBJGTMAIjoscrMWVRBnr777vvvvffuBx/8xR/94fb6/v5mH2H5D/7+3/kv/8t//A//yT/89g9+AAp9L7cXr//wP/zZf////f/96//x31xcb1MehtxHiIEAQ2BRAEGKpAGRCAJABqdzVGGclWTOTJkM6JmNCgoYylBzEMsV901AtSwLRUACJVCGPnPqN83u9vxotWuao2VVYTg+e/Tw4cOj46NYR8g5hgA5V/VMlbpB1ov7GGIMFVIgUBHlzEjRs8VccaIiUiDh0Ze0yzdyLwpKWtQxAQqIqhrFzn2S7GnfSDFADBhANXOKQdWKK1kePHx8fnr68PGjelarZrAQiOihenXD5ykuRYwsrnDoOo0uVcHjE4FQVPz400VbHSRFghZ/6//P1p/93LYt+YFQRIwx51zd1+1v93uf/tybt83mZp9pO8tVtpEtLCyMCoxLFJKFxF/AIy88gwSCp0KAoISghMqFVbLA5SLdVJW7tJ2ZznTmbc6555x9dvd1q5/NGCMieIgx5lr7wtG9u1l7fWvNOeYYEb/4xS8istU+6ulqF6CgVpiVsw12gVpa5UBhjLQkWTObdPQNx4bZGJeR4XnHRo5/PtBFhV8ao2bNlvlnPmAMgo5Nb7nCgqwPebd8D3D0NyjY3z5FSr+q8qGF3R/dcg5cbEuPxhvHkoTiHsZfRveDB7eFAKUDafnMPJe8/FyOusy3+NXVi1p9M6lrP9Es/RTlATUKD1bONLSdydy6trOuMWEYhq6TFAGgqavZdNZiK1B5D3XlTi7Onzx77qeT1Wpz/erV1199+ebl2+vru+16IyyKOKnrs8uzSdMszk7mizk6v9ntv3r15osXb1+/XO7bVFWT6WT66GKBBEOMQ4gAOPH+/OKimkxXm812u1ttO0BX1XXYdMy+ci4wB9aQ1Nc1EAkyi5JHUO/I+8oTukG4j8Pzh/eff/jRyekpiJQdmOs1LMGIKISgnEMBYhknO2qehCgpsqSECurzxC+xRmnW/isJCw8hhD4OIYQUhxB3Xb9Zd7tdu2/7/b7r+z7EGGK0WCFPDmNG70YdMCIACRCDiYFAVdUE5iHEvg9lz+UjqGIN30RVvCdSJVC1VBck5SgiCmKGMqYUhxCHMPRDH4a2G7bb3Wq5cb6Kibf7drPd3i43g8huv99su6ub23ZowxChQiSy5pbMUlXeWh+k0E8mzQcfvX8yOwndMLT9n/zJDyOkX/jGz/2P/9b/6Dd+49efffQcVG9urv/4X/3B/+s//zu/+4/+2U8+e3W7XzU4nZzWPtZ9CCkxokNSUifgMCmRQxUrW0XwClwOWZmjqpRx5oigiGDkAQ4nHEGQHClQJmWBrDJWRGNkUOgi79tuMa/vP3zw6N7Zo4cPF9OpJ19NJnXta18DufksEdSr5fDq7bpybwg9kuhYh0MerJGfFmspAmBrnzjm8ZkCAOps0hCU062ASA4UlQUUOTCniDb8QBB95cgDqAomhGnthMWRXj58+OTRk9l8IhKJsp7cqhm1+B2BA9AcjYbtGy05XCwG4sg44TE+PaDKwn0UU1x4C8Ajs10KAAqXlNWT2RSPRrB8aGEw8vfRaBPH30s6YrwPzbA8m8iDuin3yCy2No8KU1YC4/7LhhiDRoACzAFMY5DtKh6u+EDrFH89ricchZrjco2XeQTpoGT1IF/52Jbj4GzyV0AJghBLfcFBGXXIO5d1sCzLsZuAPPsl/2eerTwBFEB//eInDv1sPpsvTlIQck5QlJOvKAwhDn3kmMIQYoyhT5JEOcYUhkGEHaGvqJnWQxgEYHG6aKaTi/uX9Wy+2WyXX7x48fL11z/94vpq2e17iWk6n5yczhXl3uXFyeJkOp8L6rbt3r69fvHm7uZ6e7vpSOv7D85mi/nU+T7FlGToBiVw6E5PT2ez6dCH1Wq9XO9UkLwPkVMSBRKlIcY+sKCzPul5OyshkvMOEGOSITIIPXr+5N7lA0dey2bI66ZgIqocfolojBKTJgEVRwZ9BCB3gBBlFZTEqCjCPJjEkjlxEh56a/0wDCEOIXRDt+vbu9Xydrlarde7tm27PnIS5Zgic1CF3CqMEV3WfwkI0WjrFEAQCZGEdbvZD/1wtGWOgl8TABCYeCbXlrCoROVodAKLdPsu9H0Ise+Gtu/Xm+1qvb272/i6TgI3N7dtP9yuNqv1Zjf0m/1u229DDBwZCBGcWrxEJagEANWTxeyDD5+fnZx8/eLL1e31T/7k3zw6XfzNv/Hf/3f/4u9c3H8IEN68uvpHv/sP/w//0X/0wz/9bHm72nICUNTQrYMAJIgVeeeIvFcBTgN4ZQgeiXOHIm95/dEMHNm1EUjBmMTLw/FsYB4BMKmSWhJEERQtH06EgiQAbRhCiKdnZxOV508fn5+e2Uy0yvvpbFY3E+dcE4TZnZ9sps3EkRfRxKIgVNhiUVKQcTSKsjEfkrs55hyjgwLQAADBjfwKi0BiEJAEClrKutU7IlCRlIQdggKxytn5+eMnz54+fTqdziQmymlGABPOlMKkkqctGdqMPPFg47NJLrMMoeD9EU+XSPNorQtrfWQG8z9psdQlTVDUNAUGwyHzoaVfmY7hxCFnOT7gI+8FY3HtUdgH5YmDWefRIpfvK4qKclTKFR8Yp3IBo9X/WYs8WumxIuEQeWcfcnh/RuOQb/Md/1uWTY8aWJXABHLsWD7mUAV3AP4WTBWRVvk2kIODz58//vjhhhQUQEQRwN+++bqpmq6tNqsmMfi6EmZyzlcEgBwiiwx9x8y+cnXtuz5xir5yjpxwbGoaYisC9x4/uP/wgZ9Wm7vN7Wp9c7P86vMXr6/vltfLqq7OT8/vn59OppMk4ez+2Xw+F9H1enf19ubl29ur29V2H0LAqm5Oz04Xs0kU7CQNXdx1bWBuan9+uTg9OxXmzW67Wu+7fQB0iLTdt1GEKh+EWXRIUHkSwTz9FQEVnCd0xMyCyKyT2fzx42fz+akjp5wgA0RQAFRBIRUGYEVWDjbDXZgdgOZm0SoiLKwsud8GMwIU4b9wYhFNKfUh9EPfdl3g1Pb9ut2uu91qt71dLteb9X6323d9StYOx/w3ABAqjT0fAXOTGBVmm/DHgg5UtR/CdreLQywACRU0ix5yI4pE5FSEY5CUCJFN2RmjrytOaQipbbuhG1JM+7a9vV0uV5vNbrdZb+pmOoT49u3dttu3/bDc7tb73b7vAmtIXNW1iohRTcr1pIp9UEceXB+6p8+fPnrwlFBliC++/OL8xP2Vv/KX//2/+Tcu7j8C4c9//Kd/+//6n/7nf+8f/Js/+P1Zc/Ld73/nsx99NZ9Mf+O3/9Lt8urf/PgPeRhiGjjFyDEMMdl0IHBGvSGAjI2UR4B3OKFZCwXj3BgcB9xrJh8Mu9lZP8xHwxQjkg/9sN+3kdN8Np+AnpyfTidT5SSJ60lT1w157yqH3k8D+6ZCAtEUY4hpUAeF0FfJbe3QobPnp7ZgKrnlFjgs2H/sn2hJKBXOvoLtPOfGfA49IYkkQSYH5DBJjCHNn549f/b04t6lxKgsgqiqDp2VD1MBDkY7GRo/8Pclh3ts5KDgxLEucgRIx4TI4SGMaBVyWuPQSP3ojQa6x+hgTNCozbHI2PvY+o/U/6jQL66gPGZDRnhkK7PJL/oGgCKTz1+c69XeuTLAAheyrzxYZDi6IiA4NDoqVzLi9HGFbUeVFTv+1zHHoeU1LMsGWXZUgtgxpjn6+eKdMkOVvWZ+Ppjry8vaj6mDfGGAR1ddnhyCd05D3HerEINGEVCczeeTaeNrX/uq9jUiaO1FnXfEiZFlMmkUJIU+hYFAfF2f3rs4u7zkyDe3dy9fvbl+c319vb69We+23Ww+uX//8uLsfDGbIPl7J/dcU62Wu+vr25evr5d3200bALFpZk0DdTMB0rv9LkaJg7RtUFDv3KSaXJyeV85tt/v1Zte2wYaWD10/DEkEQDElHqICIitySoDqSMGpelan6EhVEMj75v6DB5eXD6eLE9t5Y5enHABKUmHVhMoQTdRnPZNRJRGhWD+dIjIAATG2VVhYYggxJVYYQkjMfYh9DG3o19t23e7X+92622+6/b7t+iGEIQI60axbhSI+ICQEUgUbvIkC4FCYc44HiUhT5K4b9m0n42BtUXD2fEWTtZ8DTSmGYFRoHPqYgqTElhpIKQyh6/rEsl7tXr+5WW3Wbdt3+65JsN12b65vEvKQeL1vt20XUgBy6iohh4rCCgacExM6UmRhBDg7Oz89Oet27X5op1P89d/8pf/wf/ofPPvmewDw4rPX/+f/zX/8n/yn/5deTz/56Jt/5nd++6Nvv//3/u4/8AC/9puf7m4/air/5Zc/+eKnn211S+AcNqgUoSdQ1oRQWYNKtbhjPKF5gx/nLPOrNGbsNCM7Gw0IWjyrqvVMUwXyUNe+74aXb69efP3y+cOLGAc3W/iqcYjVbFbXlQKZtY5J9v2w74aeU9KowGhdYK3yFk0xT6a+zxOjjUjMm41sMo8CUyayHAKW3gPMKQIgFveFAN5XiGL9pwQU1SVWZX385OnzZ8/Ozi+Ae3M340QieFdgXwI1LLYECiYvZmg0DUc/lQFssZg5DXr0wwc7mo/RgQMqNwuFpi5vKTS95lLkcoEH9gRLJvXI74w52+OopKR8RiRfPqDA7CNUrWXM1SFiGaOB0QKjHn1uvuo8FvvQY3n80THiKTcEuQnPwegfo5TxnkYXgJAL847SvSUh8Y4HGdcYcuimOZcEoyconuXoQWn5zsPqGo4CVAEvyAJ9SP12122WWxGYnpwsFrOTs7Ozs4vJ1FXkRNWrJE4xDsJJWFUVkU7OL3xdNdMJkXvz+vX19fLN2+u3V8vbt6v9vptMmsVidu/BxWw29XUVFZvKr9vh5ss3X7++ub6662NyVM9mJ5P5NMZhiKnj2O7afRtC0hQhRZ7PJtNZPZvP66YeUtzsd7tdG2MKYVDCLsQusmkQO9aQmNU7AOugICLkrMMGsFh9G9TN5OLB49OTC++cpOS8ZYGypJnQmvUqKoNV9cTBGn9yZF9XoGAoH1SQEFiQAECFUwophjD0fRKNLCHGGGOIYbfftzGut7u79Wa5Xq/3232727X7vh/ENNHknKtNOY6KRIBImsR6gwACeQIV56ucujSRL+F+u9vvWxGTHhd+0Ho7c+KUCBzHBMyIKMwpxpRS6HvyLoUQE++2u66LIfHt3eb165u7zSoljkn8wJvN7up6jRMYUti1+/VmU08qQgfoOcvXkVlVRDx6JFf5ft9W9eTh46eL2bzdrYW7b3zz47/07/2FH/yZ3wGAqxdf/x//1//L/+ff+c8+/uTT/8F/8Dd+9bs/f3Jx73Z986Pf++PI/dtXX7x8e7O8/Vp1eO/Zw9CdnZyfzhdn6669urteLlfAWGqgUEA1z3u1MRU6RsXl3KiKCHIu6LZEof20SM5fIiCgKDMrAKIjFfWTph/6V6/fvPjq/PmjC2UGTuiqej6tJw0RhsjK0g/x9Zu3L1+/fHX3er1fgWOHxMqQs4oAgC6bSQTIxeCYsaupt3MvI7RigRF9goI6QKtBEcj/U8LK15VzyBwUpaknADAMQzNbvPfRRx98+H7lKTB7cgX9GT93aL85mmOzIwf5z5hALTg/w+ExCWvY/BAbwEgLlWWHA+ovyHtsM5ptYAZLIwdRsOghW1k8VDFqiqX/FhyxO6NiMxs/LGyXfZeI2W8aLWdxLgW3y2gy34kej5LDo6Q480JykHRmUaVmd6kjV3PwhKPp1oNdPljkcZVVi0Mu6ZHx82BUQI0mHEoApIeHiVjaJuqYhj883/Ij5e0lHQ12B+YoVH1KA0gU4BDa1XoVY6q73b47GUL0VQWqddOE2A1da8RCHFJVV00zOzk7mZ7Mk8D1zdX11e3rl6+ubrY3N9vtdq8C5+eLR0/uTaqanAekyDyw3CyX17fr1bLd7HskOj0/r5xHgK4P+27YtvsuctvFdlAgD4CNd5NJU9f1YjZ1zvddu1pvN9s9K0TAlLiLCVwVATQJiwo4R85mKnnvQZ2rHAAmsQa+2MwmZw+fzU7OnJ9pFgpqGfxoEFIABNAKfYMOfewGUXXeUJoX0RSCspmgTBUKMycZ2jZyGmLo+zAMURBS4q4f2q7vUtps96v1Zrna7Dbbtm+H0KcYBRHQIwOaxEfUVS4LIhyqAiGSMzk0IhLbGHJRBIox7Pe7vm9FmJy35C8IgrV5sLb1MUoMJi3nEFOMYehDCBog9kPbhbvb5RB53/Wvrq5fXV0tlyv0DsDHtNnt2nZoQbEb2q7vOHXMTjWJIiqqCCIQuSDBqwciUQhxODk/ubx/eXJ2st0unzy9/Oi97//Vf/+v297/5//F7/7X//jv/7k/99v/8//F/+zy2dPhevvVV1//o//Pf/HjP/5XV8uWNXXtUGF9dnny4ZP3hthe3HuwmF5cL28/rzHs21U3lKzOKKmUsSFEPgJYhu8CCigJyJgyHA/9CJJUc5t2QSRyDOABvQshrbebpDxfzGazKXnyFbmqAocsKjHtd+1q01/frd4uV3ebddd1KSUtdhHIZVRobeyyNjQXVI62xqw/gAIwgCWlD+XNqDzCVkvlusoR5QIqRAfkFCQmfvL0/vvvfXB5eQ9UrJck2oA+Ecx9BLLJwWw9LC07Gj8s9rjYr5/hNLJdxoIfVelgP4v9KW8eoX9Z3PF79GCfRhN3ZKKzJR0JELEfyPPtC1NSPM5oSPFw3flusHiHcnfvWPmDjRztYn5ljG9Gd3EwpiCH3PX4RPDIYR4mNB4CksN0hEN+Jb+eMxZjBqa0ZgfbE0ct8CBLBSx6HbO7eclxpP1zQDUKHfJilQoxKQ74aKky4eGriYutcOxiDElCP6Qh6W7f73ZdiOHi/N7JyclkUofALEH2oZlNFycLXzVJ9fbmbrlef/3i1RdfvVov29W6b3dhMq3Ozk4n0yYkrSpC55Pg/m6z2rXLu9W27VOE6XQ2nc2S6HLX9t2w7+MQU2Buo/adisB06irn6to5R6en5/PFyRDCrh3adhgCo3MCMEQRQGQAIMtuOnDoyBM0lSNntAQISwIFJGrqs4ePHz577+ziAbmKQxCOzhntU/JRKkAASYAThMghhq4HUPG+qrzN/FJVVc4ku0Mkp8wphr7vA8d+GPo+DEMCdCwyDLEPaT8MXR/2u3672u72+67vQxgOJglJBQhJS9tEazpOgFAAJRI5IlBljSKiKJAkhDB0g7Kgz+UhqGrdSTmxI5TEYE1JhVOMMaahD4lT4jT0w2bbrlabLsXb2/Xrq+vru7vb67v5yYkAdX2/b7tuGDhKiANzcq5WASVwRnTYOMlykd5XKjGmWE9mjx7enzQekjx5cPln//yf97NTAL77+vP/5p/8v3/zz//m3/pb/5PLjz/g1er/9L//3765uflH//hf/Is//BOH1dOnj2vnnj18+Bu/8mv1VDf7m/uX95zWzVSTDO1+wKtq1/VBAoKTPDVey2CTgmrLsTdlYFKxAaVkSny08kcUERQqoQNlKEkIuU4Xtu22rqv7Dx5eXD5wqtWkRgJhBZWUUhrk7np59eb67es3q+VKLH+DLrF1gjLdPwAYYSySkkZhyzgftIIKoFneA+MJNX+ANh5HC09OWDnvlRWAM22p6F2t0L3/0aff+OSb07qJQz+OfjOJrGYSoFiTwrIjFPLgyBC/y/Bj8RnvcCXZUL/LSB9h2/w1ueWZvacYYxtfdYgRcEx8HCDwEUpVgMMIGCx1dDabFtEaIx4K0kZQbJd0FPf8zG2BlsnIhy8afYpqIbvy0SxGH7E4z/F2IMsqiocZOZ3jrxvX/bDwFhnZDxRjLWWRMX/d4XOwiEuPjH7xoCVKsNBoXMGxsavNBoODcxudM+S9pSrg97s9pH672SNLXdUdyd1yu9+lyWKz3u7eezYMYThdnDx6cF80dr6tJpMwyGq1ulmtrq+vr2/Wm213fbNjAUlIriZXszoBEvGJKXS82+/attvt++u3t8776WyBzq23+1XbxiQhijAOUXoBI1Onda1Aiqis8/n84uykcm59t7q5XYWYcmtMVmFAcYAEgpjLZpEIm4nPlYbkfe1EdehDM5tOT08vHj6cn907eXAfPJEjLeUw41oCC6BiUo2cQghtn4ZBWKppbS3XiQhVJSknFhUQ4pQkSd/1/TDs227ftcMQRAnJxcAhpH6IbTeEmNq23+/7IUS2Nl4OhQURRASdPxxGuyQqlaICykKVtzBA8pRYVJYhxHYInBhqFWEQARWJ0eoO1BP3wTKKnHjowtDH0Mckcd+2XdcvN7ub5Wo/hNvb1Xq7W+/2XYzSdUMfhxhYJLLJWUVU0VfM7Kqak2T/RJklEGZJgo4Sh8lscnp+Co4mE/zg+YdPPvwYAELf3q2vPv7WJ/+d/+5ff/DhR9DLD3/vX/zt/8ffCZ2s2nhvcfmd73x8/8nl1cur3/jBz/+3/1u//qMvP7u96S/un/aBb0OF08n85PKiI5aldvsE6Qi3EqBk3JYbzpt9s+3OIgrgCS0TaEGzYvYVpGzHmzSKIjGwJASU2O3nJ/Pzi1PyCAyurgxCcJRuP9ze3L386tUXX3z98tXbu+sVJ0WsCjWCiaP3FZAiMwAyS25QnKnvnxXNQMlTF5ujOUgpB5ZMwyaqqEliSjpbLJzzbb+/f//i+7/4vQ8//AAIBNgj5rhDYLQ5I17WIzM16lxUj8ickkoBzIpWPRi88YL1oP///wOuc6AxguSCU0cDfeQYDh+ZsWu29+VLtVyOvbVMiSicD5hLOOL01fpfZSP4MzHAmP/IfxyplfEyxn85JJPgcCXlsWU16DG1VO5tfMthcex2D9b/6LX802NK+h2pLFqgJrlMPPeSK/eZyR0dPV65cMhOCaBEDtlHj9orVc29dK1lnL97cysy9P2QosTATVXNJjNJoe+H/TZc36xFqPaTIFg1E5pym8Kb19dfv3pzdb1+e7Xe70JM0DQN+apqqGoqck4rFxjivt90/TBwH9NuO+x3+6qZ1c2UkW/Wu65PAjCkNCQMQ2IFIp/TXEjMQqT1Yj6fL6aTOgJvtrswRBUKHCdNFfugigrk1CkAJ/sLTidVVTsB7Ls4mdR107BAMz+dLs4WFxcXj59MFvcm80VdN4QozIgKAuhyMQmqIIhKVElpGELXpRgRUVmVBb1aptcCTee9Jk4sKcaQUh+G3X6/2myHFBEckAeBfdftd10b+iGwjQCLMXFigJwtyxN4AMBqDEAA2AjizE0pEFUi4qiyrnAijKAiEkIIMWbgKQLKqAIiHIIwK6cUQ+gHAAl9GvohxtAPoQtdN3R3d6vNrltuNrfLTUhpud22bZeEpe/3+z7EHghjtO506hxxEOcdMwMocyIUBUdEHJOiY2uyoTqfLU5PTlF5Ppt/9Ok3ABwAYIXvf/KNv/bfO5tOTnefvby+e/Wf/N/+7/fO7vE5vX86uXq9ee/Jo5MHZ88ePf93/sKfOX90b/j8x9sd/+jlj97cbb5+u7l+e7fd9jIIAFJVeXZJWTQWSGprOYJQLPndooYQliyaBshybFEEYON2kdADIiG63HcdT0/PLi4up9MFITSzBiuPqiLY98NyuX59df312zevr643+5YF0VW5oz9F5kiVt9k3oCxCEsMoxC6zC0ZLOpoKsxZGAXE56NYhgpzz3hFZzx+kuiJh2e7X6Nz3fvEXf/nnv3///kUaNg4pJ8gl1xQfsgojeM1g3PxMkQTZOwrQNRQ81nsVwzgSQzi+ZNZHiz06BGKQa6xyBIEF2ULJUxUDOSpSD9b66CrHUENASjGCqoJpakfHMF5hYY9GI5iRso7fdmTpccw8ZFkNjGmJLK20l8Y1GK06HVSZhcEBG7tUPvBnHWNmFw4Dmc2u20BuW4Yy4kCt/CB/6QgJkcZyOgsMDl+hBONjyF+WL5WOlrpkHMafMqAh6lNMu/1+3+5VUdWlQVOUpm4m0yk42Ow6ID+Zn0yWG3TU9/uXr16/frO8uVm9vd70g7UGpERUoWKFQuocROZ2PQwxMsAQJEUBBV9NJpM6xNjHoRtYBKJwZIisSdGRR3CV86zRWLGmrk4Ws1kzQXSr9SqEMKTQ9UGdQxBhBUYkj9YtgyiJ1o13vvJVBeBUm9nihCqvAM3JYnJycv/h08XFQ/JN1TQAlJgdOmtvksMrFY1RNfIwhLYNbReGQUQq7xEVCVRYWVOMquy8E9UwxJTS0A19CH0Iu67b7HZBmMgjkjB0fb8fuq7vN/vdkEJSDTExWyMqUpT89DXlqm5hRB67EhE5AAAR5731DyGkTICIqEoMMcVkLDMII4g18k9DDwjJiJ8Y2/U+pdT3Q0hhu9sGSdt9u9rub5brm9vVrm2v75b7vksskGIfOlHTCqmYyMc5cgjWQU0AQSW3IaIRdsSUkNx0PveVi9YdSJ2dX0dEWBFrv7n7j/9X/7s+tTdvdr/+6795cnFyef/sb/9nf/cv/oXfevTBc4SmaZovv7z74z96+aOfvvrq1cur1d2m3XVtL8AEnqBG8M5PQQIo41FH6AzclEbDcLB+IDaPHcmZqgrI4gERVgSviIBW/eeRARIvZrPFfD6fzYADoKKIsIY+7Fabu+Xm6m79+np5dbfctC2LsiNEpyQg1uHAtgokUZWgIKzJtJdF0oMIZLMQCh8zyhhzBlazbhxKqYICoKhzRK6qU+oI6b0P3v/VX/vlTz/92BL8jpyNrGHrFzJaLBlJD8sAYK4Ie4esKOC7iHWMa9DxZSiEhQVXoxODYiwzF1GW/vDRpQ3mwf5g8QKYfcX4Fz1y6dmcjrB43Ggyfvohe4CIR2TgASHjUWBTbKoeoiuzxkdQvqDx8o5RD3QIoA53Uah8GO8AjsL4EjvlRz+GIdlrvrPyh8AHxo/DoxdHiDj+QFmAg1N7x+uUZczR8IHgOloM85O+mlSwBgnKzCGlvtMhIlUOkUQVehbdibzs2x6J9v3w+uXV69fLXRtiADepvHeJISVRh6IMSYfEIhqGlFj6gUXRe9dUdeXcZte1Q1RgAUgi5nlJwUMmaENMKhKFKwdNVZ2dzmdNs2937X7Xx6Hre1b1oCkCs4g4R1B5FAbyOPHeN1U9nQCS91W9mF0+vB8Fhpia+XR2cjY5O0Nf+7qpDVGpGp61cJCQLHCWkCBEjmHo+xgGdN6GLhGRiEAm1pAcpZhYpW+Hvuvbrt117a5r9yHGGKq6cc4PXdi17RCHYJrLGBXUeUfJkSqgIyojPjNskdLDDMvRkVFVp6IOKbINxQMRBYU8hDBvLgFgVRaOsRuUINoAsjAM3ZASD31I1t1hvV7vtpu27/phvdqs9rvdfh9SCikhOnSOQ9BsSiyRbhtMEFTFWAZCJdPTE5GiKEvdTCbTmbG9XbdPsQfgod03M0pxe/Pl58ur1evX15vt/sHjJ5urXYPN+YdPP/3Odzd7evv7X794+erl9ZvNbffFly++fPl6G9dykMGQAAsMCIiCBI1AgHwEcx+IQhmPEYBtcpttxMpCquxyUGUZVyVVZcCEqhIFEBg0hkiA9y4u6mYS2sAhpABhCNvV5urNzesXb7/88vWLlzd3210SYRXhErE7h3nGi7ljUVFUtqd3pD83gOrzhAxQgKT2rHXsuOYIidRV1gyMlZUFCVA5dORodnL2q3/mz/3ab//Wxf17PETLOYioJZJEZTTkBwI5OyBrbvtuHRMWZaYZTSwUyXGjqWOqpEhpR7s3Whcdi7NKeGGfnM04jhQKwGE14JgMKaayOKCDO8fDEmbzhoV4y7bQqP888CX/SxbuHLm8Ei6OylQ8/nYt63F870dubxQm5WjhyDeU9Tn0hxilAaOrw0Nklat0y02Ml6SFE4TDv+THqccLcIjDyqW/66HKIsPoKo4kv/mn/L0n96YNpXiaIi/X3dV1t73unAMZwOa/7NuwWu5Xy70iDoGXq/1mEzjBZF5R3QhIiskRkkBK1pYJmUWV+iiKKKCBQzeErEpTsLlAKjkwJgDnaUgR1SVAE91f3Ds7WUzunZ1PJvXL11ebtu1CAFUkAcIhRQVFB3WN3mECIICq8ZPZlOomic7Ozk/O7p9fXu7boRaYnMyq6QRcBY6qpnHOVa4Cq5NhBRvJjQA2wz1Gttm9fZdS9Da1wXtCVECRBAoinJiHYdh3Xd8PXddvd+1qvemGkJhZ1akqp5hCCENkTimiQ7MSRM5AjDKY5HMs8VVgqywzRuLAioKqMqgTEcqTjsAhWpCRIqu1h+YkcRjallMS4NCFtmuXy/Vuu7MmSMw69MNqs72+XW67drPd7fthP8S723XQyMys6B0572WwPsTJKQGSKBCBZhm7ABAQsdjAWq8sQgSgVV03kwk5UtV2t+/6fVi93l3fTb7xtH31anV1++qrt2cXT65vP6/qxd3t7fTBRQoJ3fSPfvTV8m795cs313e3q+Vuubndp3WJyY/ieQCAIDpomSN/kLnnMNfQ9Gg3aPyzgohGVAeIRA4UwLr5ckIAByTMKTERRFFAmjQTQqcCwtLt2u1md/Xm5tWr6y9fXP3kx19/+dWb23a36/ZGCAokIofCY1UvIhZ+45DjLdeG755WBjD9qGTTA+jAITifJcZqEy4UQRRYEjm8/8A9vffgvQdPZtO644HAq6LElO3CSKVk6zxS4iU1+rN23WSyCkUum40k5mBg/IkxnzkmbuEg8x8LmbPRGT3MUaq5fFsOSfQdIwWaZ2yN1RtHqdyMYQ+8yFHSoDiqIxA9Yvkjrh/x8IVHMUAJGRAOtbVHBv0Q2eBxNuCAviEn9/O7SvFv/mAcxZglqT5uSczCVigGPad0j5zf8WPS0VdhCZHGffROEFJWrYAAKAepLPvh5/39xw/4dIGaUhfqt6uuu9psAiO1fZkIkphUt7uEAIEBnZ/Mp4LgHDIAJzQ9tgYGlMTIACIUOeNEAOmjAIJjyq5OrI8tiG0tAmEhoJgiA3jnZtPpZNJcnF40ddXFbte1Xbfr2k5VKuuAJYhIVUVNTbZNm1m9ODttJgtGnxBPLx88ePTe/OTMd92Q2NWO6gqd93XjcpdaUTV5jDAnjxV4AraRL0lZbJpHmYSOpimypgKiEmLct/v9vut7jiHu226z2W23rXX2B4UUkw3yUoQQIyuQq5CciCgzoVMWMhWq2mcqIjrDLnRQ79mHIAJY9IEAoM57kKRIiMQxCSeVJCkpR0lRmUVYlQE0hrherrb7VhA48WJx0se4Xm/fvr1d77eMuNt0+64NKSZJzCwKRD7FaBMkWaLXWlUUgBFUWZRBgZBRSE3D4kCEkUkBvKvquhbhkGQI3d3N21d1aN9c0bD54b/8w7dXyxevby7v33/dtVvAG4b9q9t/9vt/O6J7c3f38vWXV1fXAbpiEwGB4LC9bX8LqLBuCRwCSoFV1hoaDtBQCurCI1sgUKouTMJ6BM9YQdE1kmsL1HnHMYSuC8OQwtB2w+p6vbzZrtbt1e326m59t97uwnZIkdVUOU6SILKwOOcJHSAReUVSJdSYj/9BjIeYJUBc7ssukwiIAAk9Wp4H1Prx5ghPFAklpc1q/Yd/8K8+ef/Z937+O6enpyJqhYgeiEEBlSwagVJNnGOjjGxLsvNAMRxcRS5hAwBQKYrWg0ipPI5CnOKorM+3cHhPVlbBQYyvBdqXVcg43VoYHEnjR6t2qJt6x2BrsdjZ30K5jQKiyxWMee0ClrMOK9NHRUZaUuEH31Mks/aFmFOtUFwKjt9RfrMVlVLWUBZWAY5u31pNHilfj3REx2mNHJAdrPqRP4MSn40rM36NOZXcJLe4infSP+VElKv2i4t79QmHfrvXXV3tvXfNzK+3STmpCJFrGu8IwzBEANY81JJFBCCxhMAxCWjus6qggih5ED2qsJA6QkJnnW9VhEVESDTnqQRBzDUIKaPzvp7UZ6enF+engLTerEXSdtfGgScTT84zKLJWFVaNr+tKANHrZH4ymS+ayUkCqn21uHf//MGjajrlyRT6XkCN1EJygM56XKOausOG4loFCdgEJk6squjJoXd15YrnIkIhtLFe3b7bbXZ9zzHFfdv1YQghCDNI7jcrTAQE6DQqA8QhqqgoMAsieE+IZGoJVaWStrTNk00T2cgkFVByxJzQ5gyJKoCoJE5D7GMIYPCeRTmloU/DEIcQhti3XdcPy9Vms90uTuZV1ex37Xq/u76923a7PsTdtt/ut6IsYtMzSTjGGFVECQAqI0iVFYjy6Avz3DbeGlFBOIkiM8fKV6QQu0AqQ5tWN5u5o7QaIL7+kz/68evrlc7PpZn3sfpq+frm9u2bP7yJ+1g3p23fXa+uI+zKbqccBx/gIRyQJSTJ6H48BMcQM7ceHg/OUY2cAigIYkldWB9dRBJJCBVRhQ4Kr0sxDt12t99sNptuebe6env79cvrL79+fXW33Hb7hEE0gQUTIsJREcijkuRxv0SgAM76uIk19x6NQbFYCFCmvYNFVJShmxgxlDvM5SoBNZSQNvvdv/y9f82C213/S7/0vYePLlGEMRyklSqgYConIlJlNYucNSPjuISC6hHlgOoLkZNzUVgU/Yf0JxRkosVw2sqWDys56Mz/FNNm2/xdgH2wj8UljYZwLBc7PF4EKNUFRq6PH3bg/N9ZXhM8HvaQXa9Fi0cXBQfDOjqgHA8VUZS9IjkbMi4WwnhjRcGZP1vLaiuUlPZxfJH13nRY9tFNFqSgUPQ8ZWND8Qtw9M7s9LImSg5urKy2jHQZFH+PAKLgNSm5qm7qVQrr9SbaVCoOAOi92SASUXDEISliSBKZkwgRxKQpgiiqICooKwKwEyBFJLUuLqxJ1TlBydopZmTbj45ENCmJmN90i8Wkrqr5fPrwweVkPrm7u23bboix69krOqoAssbLe++9my0WIfC0roH84uwe1VNN4mfz+dm92dkFOF9TFcABahKezk881QRkXCszHy0KoqgyK0CWe7qqaaaE4Kq6qipCUBYFMCOekoQ+DCG0+zZFDn0AkcrXKpCU1RERpQQhRWEBwtANXd91fRdDSJxSSoBoaDpXzIga3h2hC45C37I7ySEgOsswosMKAGC33/R9J5xSiBza1Lf9bh+GkGLY79vNZtuFYbXe3dxcg3Pz07ht2+Vqveva9Wbb9l3XhhAHIs/MwlDVlYhIsgo3JLRJRYpmhwSVnCiSoFjhAqgFSTa1ihCHtttsd5PKd316/ea6duA7vr25+/zL289evarO+9dv//DN9ds29IHDerXehoHgyoNXZIeVEomkbJbzYSlHc7RVB8CazeZY/QPZ3ozT+lwO14FNFIFAICLCCKSkOdQCQqiJnPcOQerK1U2lEkO3361Xq9v13e3u6uruqxdvf/ry6tWbm7vtakh9omiN+VQBJAIkFAcIIgmdBwIidFgJESByjFIycZRTwVLSlFhGPCJZfzoAFlbwXGCl5joFUlBhBgAvcH395p/91/8VsFtt17/yKz949vi+8zUrg1WuKrAIWZ90M3ci9ixVj00dAIxysxHFj5ndQnvYspvxO0Kko4FGyK2sRnr9qNjsmNAoM1CO/aDhXS0u/p3agxGrlm/V499GlSuMv2KZrgUHO/wOjhj/VCB4/hotZtEqAfQgq8wwQ8olj+9VgBy8w+F28s1oeafRSnqIkGTcveWIq/leApCcwcguwX4kN75TeGdhbDXHuzyC93ZbpXYPEFBHtdXo2PL1+KsXX7V3Lfnh9nrz6uXNct2HQSUxK6EDXztAjUnVYWARhcgKziFSyhPjQQVIScQcZe7VpSBUsv1IyGLRLCJQkqzEZoEcb1INgN7T/GRROby8d3E6P0kytO1uv+/adqipUgFHVRIAgLoiP6kXJ/OqaSaLSqhS9Of3H/dJOcZ6cVrPFzSdoqtq5xuhLnTOVb6eOPLOOU+mzpa87hYyjQleBHJUVR6gMfTkJzUhiagNB7Z+jKICIPWk4pSaSQUDqCKnxMjeeSTX910Y0hBiSNx2/Xqz2/f9EAYAgVyjTzlwzBZAD4rwAw9rjX7I7DEishlHRF/7mNJuv9+ud9H6trZ9Goa+7Ychtvv97e16td2t17urm7v1ejc5bf1ye7dc363W2/2+j/0QQkgDOoeIzEKOyDtlsVEkyoI2/jXr5i0/KZiDVjYPAQqsQkjqKCXed/1u33Pd9D2/eX0zdX6mbn1z9dWrt5+9fLn94osvX74ASFU9Q4dDGEzsyJTAaTWZxRghcSEHQQ6HlLQcz4KDRpL9CDEdHfER1hUfMJobO2fJMjFIhAronCMEZURUSZNJ00zqvu3a9XZ5c3d7u3v9+ubV1fLNzep2t+25Y0o2RMhkt6BCKgIACdURQCJF9R6RkBTJAbJlD/FQ33vsxhBACb2BdGvknBEqGJDyRzXPAqDMIBCX6/Xv/d6/XLc7VvylX/jue88fTxsPCCAowFa1IiIM1m9Qc9+1HP0cQVJB222ZkCk0jR6W86B3KXZsTDAUW3pkXMYVH1knPe5IcXge5g4OMCeT2sdPE8fTAAchC5YsxxiEvPMD+bKzKToWSR67inIxMCJ51eOr0UMF8DsrBgB4PG1h7BxtOxF/Nq4wAoryCT8KVcoTzZtCAI4JpNEZW6w9Xnohv8aHc/C0SCWKKwpcLNcyfmKJLaxdle+3q5ur2123Wd22602KgiGoCsxmtfMOEIKKBI6Jk4AwJEFhjmmMAgHUaCFkBOdI0SarZJ2ptQw7CL6yzAFR1eXeIAoem6qeN5OTs5Oz+fTR5T3yuL7dDGFglm4fUdxsOgkhON8g6HQ+rSaT+eKERU8fPBmCzE7vnVw85N2efZqdnjfzU1c1oojOkfeea+eJ1PK5BA5jiEOIMcZ62hDavGwGsQ1FRL6qa1/VtmTOexATwIAyg6Ijaqo61ZPZ1E38JHJa3W0GiKDivavrmhkQIcbU7YftbrfZbja7zb7bJ46SY/pi30CRDj7ctpgNs9IMEpAAUW2iuBISVoREyECI/TDcLZfbTcdD5JCGLoYg/RB3+2HX9svN/vXV7e16s7pbY9V0fbq9vbu5W97e3QUOgaMkRSecrJwcBFQgEVlJGcCBmMxlhQqSW66r2oRJAKOpyTlKIWw32zdvXs8ns9vbu1cvtz7Gk6Z+8eVnb67efPnixY5jB+Gkmn7v0+++unnZd6+mOKNq0oYdKMR+UGBPLgEXoTaZCrOAesLcBdrSS96085aAyx0jD/8bDZUCOLM5WsqsSpzsQQgIrd0GqiaOwnIyny1mTerb3XK9uVpu193tzfLLr16+3m52sWUUICwUGBWQ7hEIFJCRkEQis4KVBTvnqkpUgEVVUFggQe4FNBotJ0IImvIFc2ln4yyUKS4QEBzAOBpQbm9fdX+wY4yvrl7+4re/93M/9+nDh/eIQBRRgTPKMZwPo1VQVcEjM1xwvp3oMh14/Mes8SwG78gNFHLluA+xod7iMHLB0cHYQXYACnrwasXbjEMij6zgUaBwcFEHGuT4LRlg58srTzxXzxbiPmdES68jPbrJETHnV7NsKi/fUYs3lBKiH/RUxQjblRxPvIcxo2AXdogV8h3SkR89eLxSUI3jcyj3ijj+/JgR0fG14txKLYh956h5MuODRMTMvprRtm3fvr7pOvBNXYHM0C0WU181McUhptRLu09DUE6OBaIAG9nP1moeiPJ8QXAoJq8AUi29yMngR+nA5UiVlEAFmYVVENx8Pj05WdS1PztZPHpweTJvVqu75epuGIZ2GAidEnhfKQuLnp2fLC7Oq3raLBbMUk9PJ6fT2eKcqhlUqXJVPZlT1YglCQVUkRwROkVEIuecokSVfhhiSCpsssW8WgjkHBCI1iCg1sjR0CgzZjysBDCdTsk5EXDg26FHRylGFqmq2jnPklhw3w/bfbtcrde73b5rQxzEQngq59DsUcENgKYLwJISKDq8o73uvWMBR6QAnPhueXf19u7qwZ0MuzS0ksKw63f7drvdvbm9u7q5fX19/eb2ZrNcRZBNu7+9vdvtN0m4H4YhDs7XwMA2MltVQ1Bhsw1GIpeTf0QOqABBpq1QbSqCFSyC6Hq9vL66HhYn6/3+zauvT6bNo3vzL15/+Xb5dsf7BA4APn7y/t/8D//6P/j7v/tP/qv1TddDIkJiDRwBIEmWOdk9c2mTMgJ5PeqfXra0vnME4Z1061hkK/kDMog2L4aoziYtO3ToQFMEACTsdrt9CmHoWXW779f7/TZ0+9RFSFiRagJWBEDNgn0FMJYWASQFdYJoM+wJ0KFzxKqOUEGMpcnaLzu2pEAEVOKV0YFB8XajuSyCIk2UR8um/e7u93/vn//0y59++ZM3v3F99wvf//bTx/cXp9O69pKSACRJjqz1FYgRDpSTDdnsixY+Iu/CbGXza/lfDgnLvMbjKzrGYFiqo7REaofma1AMExS+J3umTAuBdQCiDGoNlBRVafleHT/r6K94eLbH4Pso3hivTrMnHHVjON7bcRNVPPw8vGvhDXMTFq96vO8ATAcLADpqQaHc6KhNOHwtjoB+pC4PMlnIsfgYedFBYDo+iMJjv+PO892O/kPf/bHRFyn6m6vNMMQ+wmTqxYEkpKpyzkWWfpDlat8O0AZlcX3QBJBYI4OrrC0CAAAQCioQASCrqpKEPMMkU5w2nlGVSR2RrypVAsAJkSA2dX12fjqdTOvKP3rwYD7zQwqb7arrWhYZ+kFAZ7Np0gikJ/P50w+eN9OZoMe6afugVX1yecnsk0NBX02qajL19QSACIDQOSJRn724c4KQFBgkpphEQAA9gbAiqLIjUIeQwDkHTiWBKdyVM1onQHLoiLzz2FBMMvQhppQ49X0fUyJfS4xdSG0Y9kO/6ffbdrfvdu2+ZUNSVFgeOz4j3HonLgRVIUTICejSAUQBVB0RsyK4IYT1cvPZT79QBJeSpIFU2+0upLTcrN6+ubpZ313fLd/c3KRhYKJ9N+y32yGFtuuNgRZV4/tACVVNug65wp4UGFRFtFyzCpTUrAVEtt3MiSVV5d1+e7u8Tczbbn99e/PqZjGZP+o5bYZWcgEWn18svvHp0/PFX3S76x9/9mrdt0yLbQghRUkVSxKACEk1d27GIu604FGP2uhbnunItpTFy39M1iAbM45WhTQGzQbvBBgFHSF55xGxbgBj6Ia+7ZrThaubyemClsPAyIRdHBLYFKAoKihK4Mr0x+LB8/FCjSIalZzzNtHTE6KIRgwaoPgkzLEI5CFtR9bKfi2NLo6smE38ElAR9Z4cS2j3V1/u/tnd5nr55vMvfvqNT97/7ve++/77z5qqIgRyXu1BqnVpUElK3jnnUA10512YpdkCergGPP5LeaFg2SPTcsg6ZqsGckjrAqhlubKtl5Fm0eIG8rpBBvjjcLCRqTrgoBGwQ/ZhhS0v+8Iir3wN9sN5eleWxegYaGQrXETqxabCwQuU8AGpoGcd9xDC0VJYiJW78usoRjCSX/PpLUxSEQrDISKAHB6MviGvz6iF43LcCiKzS/8Z0qw413FNjrw6YVF/KQJhhX676vqYJpPKETJjEhLGIXDbp76Vbeu2bYyCSTVGhdohEZGAd+Zg1ChgUue93Yt1vhWwEjsi7+qmBgVOAsYPVX7aTABJkjJzM6kndXO6WMwn9WxWd/1+vbnZblcqKfRD5XxICQhV4vnZyaPnz55/8KyZn662XdcniVDPTvxskXpJzETO+bpyTeVqAAIVBHTkUkpEjshlsIgUWULixEmECb09lbxACIBqs1nAKSBxEgB1iMIiwgoKjmwfE1GMab/b2ZTHfgiMlah2Q1xv2/W+3Xb7bbtrh06xtG7VIkXT/FhK8kZBFXLnMtuTBDYUHlG5tMIqVC55FNGrtzf/+vf/+O3VsnJUe0GAFJk53d7crtfL7X673K67oeUkut8xS2INIaWUkBSJys40WQ+hiOZGWsLK5rgxm1pQEAWlg7A9r0EZsYvK0PfdcrVKSfabzb7bXN2+vXcxV+cmzXTR8S4FBLzevnnx+U9//dd/dfrX//I//W/+edivWvQ/fbXcdeFutVtvdu2QGvJs2icQEEXnLKzkxKLWDGhUpGQwNKb+FBAPXoERHMBoXbAAJGsVygoAEgFrFdYceEGMQxd6INdMp3Pxk0VgwH5gq/kS5XKeAZQBENQjic3izjYWKANrEeZkp0MzxrduFDR2eoTsio6PcLbEJZQ58m7Z4llDbkxZoKMEtN9v/uBf/csXX7/60x9/+Oa2+863lk8e3H/86N50Ute1A1BHTtFIIXFEqqqSgwEsip/i2KGAZVUs7So1M3MlPWkGK5PseasUfRWCJToyB6PlDos3yOnlssGKqGhsADF6iKO7PlqhUcJj5r/wf6USAXISRUu+AMtzKRHNaCQVDt3r4N3Q66jEocQG5XpKEuL4oSmWYKeQ9Jh/NvuOQhodmeUcB+nxDWd3WzzAmCtGQFQ5lDlC9invhDxHKY8DWaTjNePhZSMud11kQWomwJKCDlHbxN0Aux3uOw6RmGpRFQFX+2rSOO9c4/PwUygfA4I5xCQQLT22EMmBI0cOHQKQggiLota+wkTcxL7rLy/vLWbzy8tzTUM37K/efLXbbYc+oCooSeS6qmJMs2n9/OMPn33w4QcffWNQ6N5cLfu76exksjhTV4tLfTcokqvruqodehRSVkmqAqaqRkBC562zs3LbD103CAMCWrkoEmqCPLZJS9rF+vkej1QfQhhCFBbREOKQwnbf3q3Wbd91Ie0js8iuDze3y9V2t9xshhA5MYuScwCokrNBBnFw1KwgWkrSWBZ75ESUEzvFcNmao3MAGGO4u7v7o/Bvvvj6iwppNqsJsarqOIT13brr2ij9EIcoTOQwxsQ7TcoxclL0YA5AhGUsNzZ4UuJ+Lb+KjnIQLUfP+jGCyXoVlRBVuN3u7m6v9/td6vqkcrtaXq1Wlatns/lkFxkIUnf19u7v/v3f/bmPf+5XfvPPfOv7395eve4SX12tX7++fXu3e3N99dkXX9/erbZD7EOwqefgHCgIczIUBK4gYmuliIU5sSUdwTIY+28mpti1IvzKBoMJHHMkAPJVkuSQ0DdRKaoTqgBjSimI7nZDjAmcAqrlhIpWBgEcSMkLFqOSO3pDNnOAKKCWX1LnOERmUGB8h+HRI6SvhVfh0d9pPneejGG2FkUEAM55hyApxeXVV7vV9XJ5+8d/+t6Hz9779rc+ff70yZOnD89OT5rGKssSoDUiJGVlYFJS64g7EhhZypn/fFhQOdZaopYO/5itbSFUsjUrLrkYoGzJ8m4HAESno5BRrTbv2L0cPuIYFmf7axVXelgdPE5UZKR1LA8oRwg0O7JyTfk2i6Ec91JJc5Z/hxHx53gB8t/L4SirAcUL8XhvgAeofzDXo40Z2TUdf7jsHMkuFEddtI5h1gh68m96oLDK1YxQaQxw7O5EFcBDkomvdj3GyNs+bTruWNdb3XfA7G3ix2TenEwXzXzqXUNV5etaQdERAkpuUAK+qmzkliYBAVHx5MC5/Dw8CQuL9F0LCv0wBB0Q4OLy4sH9y9mkmUz8arnZ7ler1V3XdlVVh5Bi5DIbNj15/vTDTz76+JvfOzl/8PXVtfpGyeFkAa5OAiFyTOCruq7nrmrAeVJkVRIiJgdIAg6cJ+edRxASarths93F+5cNABBpMmlgThUfNEKixVyrsCSRGONgnYkCDzHs236777dttxvidtsKYBK5vVvvuna12Wx228jBYk1RRVBEFCn7rgSPNkvWREeAxh+Swji8GsfNoAKAguQ0psQcmbf7zdu36L1zznnys8kiDf0wDClEqjMMYxJBkagIKJxYolHAVgmnYC4H0XR1qGTwEMarRB1V4lSOt9F9atPRmMgBqiiv12u33YGoAA5DfPnyzSfPnp/Oz7aTPQ+6S7zdd//4n/+L+bz5H/61v/b86f37H7w/9MPp5cXF+b3ms9eY+tXdbLm8HcLQB2FU1qSBOecirNuPsUBSQH1BjcU25E5nh+ORz3G2U8c2zEa6JWHLVjlAcrt+uFu1213o+xQHPVnM59MpNZi6TV2dioCqG5EeIIBwIRvsJFJZNcy9ugwDCws6AlIFIEG2HkHmsXKLm3L8i8nF8k8ooB4AAZwCAThLJJTErioqsDiHSCBD//XnP3r14qc/Pn/4ky8//+TDT7/9nZ97/9nTB/cvZtNqUrm69uZ4UNFCTFEBUC4wNOf69SC2GZUcI9WjpVa9XPhRAlLzIKbRlGIx48XMHu0vHLt3jvPSxi+xT8cD4sbRzGnx/Cgl5jjKFB1CFCijgM000rE80oy5jCMsy3Y/5KGxZOnyfY22u1zPkbMqrx9cYPkpexMeCgXyneHxp42+Y7TXBwOveXEP/x3W+uibjj7s3dR0/tTsDg3Roap6SSIsMendNi3XoU3Y9rwPqOpc5eu6mc4mZ+fn88XpbDGbTqdV0yBijEkymYW+9o7QVc57Cn2snKt8FUMwdkgVmBkd7dt2vduw6tB3MTFHnk6byweX987PZ7Pm1auX6/Xq9u7tZr03cXkcYuUbRz5Juri89/TDDz769Lsff+Pnbu52DI6TVtPzan5G9USpStxXvvHNZDKdEI5D+DKQd2p7GBCByJk974e467phiDNWcqREJqAej51xd2YjRURFWcQ6PQhA23V9F7oQl7vdpu13IS133W7X9kNKwpvNpg3Dbt8OQxAUdNalNvtgxEOkCqqm+cmiP8zYRQxqIamiWArdORQVAU6qPHBSTlEROaUkITpHRCS432wISERq7yUpOhC1ciRVUQ5CHlQ1RbbuR8JSdl6BETJGQCgwAk+Ad3sHiyoC5+OKpEgCLIFVeiCXUjpdzIYhXb+9fnh60UwX09k0iJykxTruVsvt3/sv/+Hnn3/x3uOLeQ3o6v2+E6hXd9u31zdXd6u77U7JK1YAkJJJmlGyhhEJnAAqpKPU7hHWyewxjQ01C/eSGZjRyKJJP48ciEevKrc3y88++2Lu6t3tipzvkq+nk6qqppMHgkKApCrMNvNRISFEULb2tIBoMi5AEMunJxBNiMSMSAKO0JHDGgghDvZYEFSBYYwqinWx/hBqHE9ObpOJgkY7Yf9HVvMDpI6IVBSi3Lx+uV3ffvHjzz/78vNnj56+996TJ48ePbg8e/Dw/uliPmkmlXOGpDlrHs2o2qERFUXELAfDo1QjZfb6CFtmg04IYDkjE98Ux1HiNMDSE9PMeg4vinHFcbPh2HUn/2sO9Y7MNBQf/o70MkshM9q2BMuY4M6bQ8ewoWD28sFHUKK4tOOB9cU8HygjLbQOZBayeB3Qw2bLr0jJaxTWR3B0bPnjj7ovvaP8tL9TeTOOV58jEBx3dQ5a7GHqmPiQMQg4fLyI+hB4vRk2TPvB74Jsu7Tea0owmfjJtJnNZ4vT0wcPLqez+Ww+PT098d6nxH0/CIuvKgDra8/OofNE01nlvIiEyotA27VJpG4qYKpcLUn3230f+4oIVE9P5ieTKaGuV6vdbnN7e9XtW2VpvA8xEVVNXYXIWFfvf/r++x9/+vG3v316fvlmObRdCAzT+Sn4ShljSIQEtaubmfc1kLMu8QwopOBAVZ136M30qyoqYgLcD7zvhzOLhc2wKCI5FbYHiiqZ81DkxLFPUSUKDCF2Q9ysd+t9t9xut9ths+ru7na7rhuGYeDYdd0Q+iEEEVGXEZElg0w9nx9ylo1gGfaLGbCAEpGICqOy2JEUQWG1TqLMLEkENMWowIDEnJhNUCoOKkRgIE1JWUSFnE8QUR1R7nYiylb5gESgSoV7ldIJHtSgquEmhTxbW0U4m1cUAcgnmJQ5EaCSDzGiR1EP0HR9BxhfvHnx+MGzatL4oau5WSi1aX+zbt/+/p/MECun1aQOfQL0ygqorJrAUGgi53IOuEhCCEkRVcY+cVDofQUwYm3UTpnRP3QEgkIVQSGyADTXc0lO1XqH683m9//o33KUy9NTBL9teT9009lkpqeb7UoiODchzwAsIMAKIEDG/xMgkfMAKprIeURkSQYmEBwICqklmAhIyStzVnrne8CCOw3TucPAg2z9Leig8lBsihCBanF4FRApR1UkxBTi7dWb1Xr5xdnl+cXl++998N6zx59+45Onjx88uH/v3r1TT+gqCzdJRYyGFM0MCiBam3KgPHzayN0ycUbHHEWxXO8A1UJ3F7sFx/+YLe3BeI/hQ6ZpiomHovKFUj4zwtsxx4zj14zV0JDP1Ggaj7/ZNkF+KaczodCF44Vj8bKjUna86Ow7dKQes5/LW2wkdUaUfuQ0DnHQz6xHWb0jNA8Fzx+OAJhXLuTbOxEIQCGnbDEUMhIufjovpiI5UPHbPvSstytebVMU1yenDpzq4mSxmC1OLk7vnd+7d3mB5BaLxWQ2A0DyXPkqxkiIAuocInpV5pjAKyJJiinEyOyc83WdUmzj0O5b4yUkpeRwPp3NZk1d03q7un7zquuH7Wrftfv5fOK9c77iKKwaOXzw0Ucff+ubn37rO4+ePr9brjf77dXdGqmuprMkTlg4Moqr5zPva3C1bUtWjSQBhFHAAzpUj1g5yYtGBE03hPVudz+cTf0Ei/BcLUq0v0uh5pFUQUQSczcMu77bdW0bhrvlZrVrl+vtar2/u11t+y5wSJBCCCwsCFQ5BRnru2ycDBzGpypizvpmEGWKEsqhosklBBQURZVTigPbGEMWwSycM3GAz+mD4s6YA+bvzDaFJdn+ND2IbWUb6cViPKbkpBQgqKCAtf5UQCIUsEkw9nWa9Qk5EyAgidVcLCkrIW7brUrSNNwu176eL6p6MV1s9neEVLkJ1hK6Ya+CCXAXAEAgzMA/ODupqNr1/RBkYFZrDESuiFUqhMomItgMBDycyBH7l2Odz5ElWaTIDG3tyT5Yy9sVQYEUnCDv9+0XL17Unp4/fHJ6crnc7Pe7rauIOamgq2aAlXfE0LH0SUGsjwgioiA6dBawO4DMPKhizqgT2OQBQERBAGJMGpNCQuP6LfGrOko/ckOB7AbNRqmNhjdWQwWsosYoREWHKqpkBWCe0HtMXXfTvXj78sWbr7/6/NHjF1+/fu/9p598/OGjR5cXp+cXl6d1UyOqdzkCVYs6FdARAFozcMgy6EPASGaPcwh1pAgasXDxvArlroqRGp9UiXdK1tMsFpTkTjG0UAgMObJ4FqVrCTFgNHRmMwueFhklAiBqmYxDKKFYXMrhCg5EYb5ChcP1jD+YKxJGz1IiqHeMsR7sePnQcRFGJ3HkQbNzMuVftkM5Ey+W9UCDNJLLkBGOvNPRf2X5EWDcTkjFNSGiKPq7nWy36W6j/YD9kEJC1/iTi/nlw8uT2eL88vzi4l7T1NWkbuqGHBIgEykwoAMWSUkRkQBVnQdVYR7IY92QDBJCdKjOOSQY+nazXvWhY2ai2ntf+Wq7393evr27ve77wIkdUeO8dx4QlbUd+vPT00++83Mff+Pbn3zjO3UzX21f3213QBWQd26i6Lo0iKqva+8qX1fojUNHA9uKgARABJ6qqibvyTlQcISVd0NMXRhSFCRS4XLwEKkCZNWUVWnGhaoklhBju+3adtjv+82u2+67q7fLm+X6brnZdu1+aBklSUyJrXU+HLRegICqggU3ZCQHeW45KOR5MPYakgJkZaYAs7KCWIe6QoBq3jqmv1IByTOE8BgqoQIoi5KKKuecIYgKZRbYFU4Vjd8/2uC5N2kulbZTpISAoqgKgkqOADHPn7OMlSqgAwggwikAUBvScrWqL+6Trxens81m64BSkAQAUEHuT8wVyEfvP/7zv/QrEod/+9kXL1/dbULcD60dHFXxWHlXAVQgnLL1P+IMDPLlsBtHPqhYloM5KnaHsnE1vpAFvbcsgKLfbPcvXr/22DSzM1ZdbTer1bJrd5R7vWWdmAg6QkEESUrOjCciOucJSSQpgCMvzAgOHKiSGkVkH4GMmOfH21Xkkz1ak0xVHAUxAKOtRCCATCMgqKooEwKDik2PsFQhcwJUBwKofbv8+ov16u761Zvnr19fP3p0+ezJs6fPHl7eu3d2Mj87PaGaAASFTOlmLJSFiWaEDCkd5JXqEEtfi3Jxo5OA8ZW8rUbok+/wYPgUcsNgORjJAsfN7MEoUIBiSw21l08sK4ZYrLqh7UwBavFUxVIXXzGCgCOPZSjhiGDXg28p/5zd2AGr/8wfyiEfjfzoHlSPVgjx4H0Mz+QaHKUcv+jhQg3MINgmshnDoKXv3nGMZeuFoxOCo9cBTE9Eft3DrqPQM5Kva6wmfrY4ubx/796Dy9lk9vDJ5eLk1FXeEzEnVWtDn4CAVJmTAFvny6ryde0kgTAn4SEGzeOrVJXjEIY0hL4zBzCZVHXluq7tu3a7W3XdEJlR02RSIdEQAnqHnubV7Bvf/taHH3366Td/vq7r66vbt7c3280OXFM3DaK34QHk/WQ6dVUDhCJQVZ7IMQqJOAAkB+SIKiIiRO+cVX56XymnEJhTUsDiGknRQUpq3fDtAZKxDuYEdBiG/a5db7a3y83darNcre/u1uvtZt/uBg1CwJLyYc6CLVVBdLYhjfHJMTYAaKb1chNZLAcNkDI1AYmZU5KYhCGNO7fIjI0WJ0SbJauoqgJEXkWJnCNSBVbOMyOxwFXIc8NzZzkgVc5sYjmP1pgmb7GUYRAKCjjnKiUkVRWxcEVyEaACkHdeNSAgQEUVRE6rzbb21dnJybye8oTTfld5F5kSCIB3QADoUT94/PgHv/itze31sN/2m43vcIhtEo3c1W4yqafONf3QKwSBUOKqDOAPhOtRahJAj6rppAQEZmQ1E9TZVCCI05SAxKNnhG6Ib69v799/gkIsAEDCSSgiCQKykkg0R+vBC2VwJiCQE+kI6JkZ0Pm6AgAV4CQqKhaKEVJFziEykXplryLKSdWigdEyIR5MkxlbLCQJEmQBj2bu3gyB1UtQNl3GjKFzAEQkAvvt6suf7N6++PLi/oPLew+fPHn8/vMPnz59+PjRo7Ozk/liNjuZeGtKIyBiY/LybgMVa5xhmSlRGSt9tWjhR4B+XAR2bBwP5DiVOQRQJEaHmtyjH8U8uPtgr7EAc1AtKtLM7SOMIXX5jLwXNDuavFWzcS3Fagfaq8QSJZoYrfix1R+//CgsOESfthB4dLNaUhhadqQeBQxjgUF+UQofoMXX4CgA1Zy4NkORc3DGBJZJAuXCofyed08RnYMVwPrXb3tQH4AwSTObzucni9OLJ08fPnz0cDad3Lt/6RyxcIyJVeIQxSCkiBHljhAhA5gURQQ4MovhweQq58h1Q7/bLfu+FWZVTalnmaXEq9V6v9/EOCRhVHaeXFUJSlIBwfv3zk7Pzh5/8OTTb3z76bMPdrv99d2bm+u7theFWrTCykuKSDiZTHxdk68UiAgpN+thVa28AxFFdABesSbvicA5T2hcpjCzqHICgkPyzbymsOFszMp3FZEYwxDCdru7vVvdLre3q/W62632612/jxIZOOcCx50KR/WbRiZlQi7nhE3/kzF93kiI6Cz+FmYWGWJIzAycKb3xIWdbh0cwyP5KkJuM+hzNAxAgA4IqAVnYqASoiESgpACAJMrZoRwI4MNRsL2uRXSC6BHHclZ0hKKqquQqG0girAK5L2ZQ3na72leL6Ww21Tb0Xd/XdeOCgEMC8M7PGnpwcTpzuBPlGD3iEKN1W55gU9UTrJwIcxrkYB8NMpk9KN1WRtBW/jcSF+VsunxrylmESASCnNRXtaRWgVV1u2ufPXzv/Pze2cni+u72xYuXqok5KgkpIFt3NacCqkVIY+VEkoRzvlqt4oaIkBgFbAyRklUEAwEREXqHIFJZG0axkYcHVSiUBzHixHw7OT2DlBtKI1neyiIhBBJVkYQjPwVgMYmkJKIppN129/WXLz7/ycWX713fv3//0cPHT588fPzswbP3Hp2dzWdN7RtyRORQIKex0Gw2IFoceSzcLINifoaUHiF2RhglOMt29hhBl8eXwW5+g/2XnWGB0vnUWOw6SkwxH4os/SlOQIq1LnAYx1Nj1yElPkAodnqMuvSgx8mdQQsUH+9Ky5EZXV+5BZvTmb1AvkDRg+ireMKD0LWwsQKQWwtbfh5lfG9eUkQrHCISMBlebkw0BkowQojRMZR7BwBAH8WFgcm5i9PF5cOHl/ceXTw4f/L8aTPxoe9DaEVSDCkmDiEMbSRP5CzaFE4iIDY+kFAdISJxEu8rNiLA4lLRGNMQQkypQkJqIOlut4kx9F0LBBWhc67yHgBSFE7p3sXpo6f3m/nJh9/45nsffZxieHv99uuXr25u9yqunszAVeodeq0mTT2ZNr5RXyE5T46ARBkJhKUiQiQAV6mryDsscxVtjZCQPJh2gnILa3JOhVCRgACZNIN/m26QmIcQdrv27m51s1zfrXfrdtuGPmoSB8ql3o0cgleQnO7Nff7zWbaMjp1zFqYcwpOrnM3bQiRWSDGElEIMiWPh+uEYPOUtDeNvucGAqICqYX8FZRYkRPK1d4DgnDvsRlFExyyK1h7ViWgOLcWmSoEwG2gCBOt4lsfCiKCiABucOArng0oSUXTOO4cVaGKqqEvDzeYOCf2kvscnG/SqnACGFFgYJD158nTWTH70o89+/NXnX7x6+2a3X8fIgN7X5BoBldiHIQVN2QvioeSlEG0Z5L0DQqHMfYPx0I2eefRtyeIgTY0icAoZN1TVbDGbNvWTx/e+/OnJ/majwMqRUQjJUUXsrCaDNaGwggCIpGgQBLEih4hEQOjIGnigQ0dkC65IYsXg1uxEKyLHKUqMIgk0HrUMOtYvgYCamEDNKB2SnbZHiJzL0YCNvcsNvgnsYshbuCksksJqebPb75yrZ/OLR0+fPnny8MNPnj978ujRo/uPHz08O1tMZ7UoE6D1IsUMH9WRI2uteCBHDiTJaHgKeB537FF+dDTFNE7vPTy5onXJT1YhlyxnrzN+qhYbXBA5FM5pNPxQsmrlh4pDKFYZ0OZ9HOIMzUjN3iZHctIj21qO9IF+Gq/WzP6IuhFFYWyslNGeFrtQKNTsSRDAOOFy7Wrtm8raKSgKAJGokjsqz9DR6RXHhe9EMofOr6Kq6lkdIj16/ODx4wdPn7339PHj6WI+mVa7/a4LO2mjgHJKoY99H0UgxiDW1N9Ek4h5+jWABwRwVeXreqoqAkgYRaFtu2EYODEh+boxHmYIfd/vlXni66auLbQ0TcHp4uzxk6eLxemTDz7+6NOfW5xerLb7m7u7m9uVJCSqkWrwPoq4uplOGgeVzXtRqyqxXp0CSI4BvCcCct75qnLkCMm+hhw5JGciE3sCiOAcmHgiZ1ZAEVTYPlIRIqf9vl3tdne77fVyteuHPgyRAxvpo2Jd323uc+ZnMj1aKKAc6lnprF2teW8ENudAqpgixIRDYBbmA/DXokoer5mM9imbkXDcwKrMYqlOM3pK6BwCqnceBBApxmgeQk3oLwCAEk1LgyKCOUGdS8FMKAIgAEnHbYYHNEqIItFgv0gCBEwIqiLUhy5RQtWT6cmkauYT3ff7xpMqRlVR3nXt7/3JD0H4br26WbeBlbyHmlQg2jTmFBR4FHEfGbzRvBzyeRYnYdYBjikTi+dGV2q/GYWQEJFVIbEjQkIVWW5Wr6/e0oOH89niww+ednF7vb3NIx+dtQWhxs8BYNAhpRBDjw4dIHMiVSFxUCkqqzqqiaiuKgVAosTJWjDlJs92XYjka0TP4ICTJFRlBT2UXgNATnEgmjtBNKq4UCRoI4FL869MCtlPESCgU0AgUhbrfGhkWBq6CPu+X682r7/6av6TLx8/evTkyZMn3/jk048+ePr08cPTxXQy9Y58cUVCiKBo2qAjsViRqhQmsSxx+a+YyNGCjsmDw7uPufaxpcSRIZNsv4szLx9RrL8dQS1+XkuIBCMh/u7egeOXdBTsj+Q86qE9ho5sTb6EHHpAjjoOiKzAfqKjIobMTr3jNY7+NQP2MU7Jq4FoxbZj2EJAWlKUIkAE1nkei5zxcIV69CwsW0eoCkSoDH6xmJ2fXXz6zY/ff+/5/YePKqKu3++36+1uvduvuv1uGAIAqAoraOKu7YeQCmdhV2K0C2oSAKyqGhBBiXzlKi+q+7bd73YcI6gkZqvq5xAh4WTSzKcT71xgliEBYlNXj58/Pbs4P7948MGn33z46PkwhNdv3r54db3dD0Qzv1gIerFBjeDQE6lzVaVWvYWQVAnJZHYASoSVr5pmUjlvAkxjML3zE+eapvGVz7M7QFVRFIBQyNC5kEMkUEIgxyICOsRh3+23+91mt+lC6vohpiQiShliCCugEgLmfGzZ5gqFLMUyisTIByVCR4RAApoSs8AwcB9DkqjAI+c7bhIozF4JWse9cmA6VFUgFyghgLIgusDsEMSVJv4ioMRi3QCcgtpAR5UkwABkcWi+aIHSE0IVGEEla0UFgBySGKggo4qEKKemEEFEaqxUddPuE8usmZzO5wuc7/et866uKkBcLtd3y1VgHoQjAILzNnaGMMUOc0dPZ16wwGEpMjgBYDseBUgerrycpTHFqnlSo5YzmU8H52nHIISIhJvt5qdffLZa3pxOT548eASg7sVPb9fLYRiAhSqr0Y0iSiCEQI6YWdEaZSupaoqioM4Bgaoj553zgODBKydJrCX5KZLMfDhPnhqXfELHnFQSqLUwKmVShT1BIGFVQHSK5AtMBXRmicS8AyipMKJD8prZIAKFxIxAqs45zxosNIYUd+ubfr96/cWPf7Q4//yHP/ngg/c++fCT5+89fPbes4eP7k2nNYIIG2vOJqxmEZdlaNkTlHbnCqMi0pDQ6Cmg4PODYS+K3wKa7NdRJgeH2CF7iWKgj3B7Ns+HQK8028WSKYDDJ5Q/jhHj6J4OhDv+zFtAs9PLX5ePopnEox6vFodALmAo96/HjdmMThv7ieq4EMVo59eds3GAmqMQqy7MS4TlSGa/hKI8EmI5QzEKJUa/AAAgov6Xf/Dt99/74P69B5OTWQpxvdntd+u+H3b73a7bDV3LPKQYU4qKxFFisslWwsyq4LwnX5niUQVSUkVMrOR8U9W+rgGp64YhhN1+xykiAVa1CDvn/ZQmk6aZNClGSKyKnuDhw4fn5xeOpueXD+/dfzYEePH65edfvlhvh8QNNY1iRXVjIw+BnKtqAASiYlAz/0WOQBSByFFd1XVTe0cA1lsZKu89OY/YVJXzPhOLgGBTb1kAUBRFhJyTbNiUE3T7oW2H7b5bb3f7tosAidlqxKxRu9HRCOVKNNvqHAxC7skFoGAzyhCVkMgjOWFNqiGkIaTIzBqLKujgANR21Qh9ckEQjRzxGOeqSu5VaUBNBEVZkhKllFTTdDqbL87rZub8pGkaIHJUoSMrD7ZpmSHGFCOnmFKU3EAvJRblpKKa+0YzGOFvRkrs1FUkACJ5Xou5DnJJe4wBPckAFTqqKojcTCYJVEBW+3UAQHDmOoxjRKFiMrD409LX4bAyxey801MT8iykQjaMZ7+A4tKzUdGKp5AElASEyLumWW93P/ris5PF6cXi5IMH79+/9yA5mL6a3txcBzsIEPtho4DeVQRQ+YoAA0fIaXbO9kyUE4CvAJWcgqDabB8wqkkUkZwTYGs6i9bJPFtCFEbVHAca6reiDCg0kGW0bI4Aqt01ITpVIRBAQHKAZMPcjK8DVSIP4ACAVcWEA4qISJo0xhDbfr/bb1Y//elPfvTsxdNnz77zrW9/9/ufPHl8/+J0amSrkUiouR+wpQS0dEgdcwNwQMMHSzdioxzQGDmNiOOwWDg482yazcCNzTMOoQQe/1KA+qjyh1KS9jPCsOz9j5mS0TIfBwSHXZPhQq6Gp/LmwynPLF1hrnLbfWsNl9dB9Wiu/JFLKzdZ7iLTByCi1mrF3KVl3aHkpc3BKuJoKUrECzkhJgDAWa57LNZSBQT/l//qX4kR2+16t9vcLa+3203XdqFPMaYQu3a/B0gppcSJVcIQLPWvKAjonGeOxDZOlphN/4eqCByYE/Y9iwyBYwpEyKDeuaoi7zwBOAV0mFJC1ZiCQzq9OHv64XOFan5xeXH/CYB79fb6i69erjYtp7qZNfXsFNBB7SWFxjvyDogQnQAgyxh3GfgjR965uqqauqmcI0cCQp48eeedpERVVTe+qj2Okjca0UReJ2aWyCKaUmK2Lm+79XY/xBRFh5ASc5Ki3kcyVFKkNGjVf4XhVJR8wsz22y71jsg5RRSVMAxD5MCJNR65asAMo7QgQQUcxS3lUJXf7PznylFQQSVUcsicHBEQsErtZk8//MbjZx+e33u4WJxNZ1PnK19VRG5UUIhoTCnFZAggpRhjiDGGEFIIKdjfYgwhxmEIQwz9MHTtbsNpIKKhHyJ3VkhKgAqOxCHULLDfD6FLvvKaeD5t0Ln9chOFEyACVq5KVuVgJYzZnhzHQFqsfEZfo3Efg+0j/Ka5siOvj1ikVfhlRUABdaIKwMIowsCRcVZT3VRDjMP17fJmFVO4f3HfV9XD+w/un9/vh2G72673m/3uDtFFSeQ8gENSsup3QiuqAiIgRRWbhJ00CYsqoRIwgkEHZ9VbJp8QQiAkV9e+rkFAOKUYOA0qjCo2q3dMraJS3nQE1rAPlEQjYVVsrVpFuYIiVAguM2lmcq0RFhgZCYgCyiyMDpAwxba7bberu88/P//qxdeff/3T9589/eTj9997/uTy3sn8ZKIazdUhkrCYktghgjXczNTLYaPqOCGguLPMgWfkD5BnvCmYjpsgt1gqaL/A5TzwdoT+xWBmBKaj8S6cOxaEMPJHh4hgPGmjQR4hf2G0MLsSo4YyrT8yLKOa2oC4KaO0qFHNB+j4xZB9wjE5kw3GIX7I1ltGf1mC1oNYWDVTbgX15YKQA1Qqpr7MCzj2N6rqXVVvbm+ub18vb5fL1d16s+363kqeEscUJUkIQxSQkCLHSN4jkigTEjoxUKuitsWUGMCJsIoSJAEUFrYAXcU7mkyaqqoIEWwoo3CKHMNQ+2YymXzrm99cXD7Ybob52b1mfiHQXN8uN9tuSDSZLMDXiI6qhpWbulGPrIrWvUcY0FqcK5AN00aHVFf1pKrrpnGEogkRXNatKwF6osp5530Jk3KNP7BKEgAVZgmRQ1Kl2Kdu13b7frtpt7tuCCmxJgEueixTXx5M8yhGLjp0kz8oAAhYdzwEcN7b9k7MfRwspSB5zkmuIDhCCgXt5pwrApTZG8dbOM/cQUAbxKBqEJeIRZLEaTP/+Jvf+e73f/Gb3/nOg4dPJvOFr6q6rsmGSFkWWCGrkUVLOwxOiVNiZk5jYJBSSGkYwhCHIQ3tfru6W3JsU+Lt7Wq73KjGvh2cz4o4FK1rD8AqnIaILE3tVIOiW92sZjBPwOgcoIgoIYBYp0xVEMwZ0YPRxxxgj0i/9OIFAHAAyX5VQIO6gB7UUVWVc6IsgkjAwjb5B3E6n7lJffHg0cnJ4myxSH18+/WL7erup1+/Wm62J/OFq+qHFw8u7j14wPz69devYghpSDEIADqwJqaY4bBdqaAAghdgFSBXAQCKEJKioDEKkRkSOiT0opHt8TlCIfRI5DN/gIkl5qykQS1yWeaas6OkyGYIRKNVESOCgIA4QETnLTJEdNZkSETAqrslKlnVEQOCde8WAUJF6fv91ec/2r5589nFxaMPP/745z755ne/+42PP3nvfDFBj46qmGIeaYDZ+JZNWwIBsaYhpfUoHvlrGGU8dh9jStUsvokjslS6MHZaxFAHuGYGoNAshQQq0cZoVUv0kfsx4mj2jymiYpozsV9IKIu4RvheqtdktNu5ca7VDpltHhPWcEgOg2H5YwdwLCjN9EHGKKDZio/Wv5Q42B/LgudahzKXArJGrHx3zgPlH1VVVf/5H/3B7ep2uV9v79qu7/u267oeHUhkMImnErmKUyIA9Tb1VFQoiiqkEl2jQAJA9FWRMIMJLBWAkLB2xFDXs7qyto6mbefEgwgTQD2rHj1+MKDSkC4ePrl3/0lC//b2dr3rorjpfO6rOauq98pSTRslYEiKSESiwAqkY2d9k9aRr1zT1E1Ve0+IiOrNajozmuYDvHfO5Oy52xh50iQIKjGlFIVj7IJzFcc09GG/37ddt9vu9ruONQ+RLPGqiWQw73Urk87EqvlJBRNhAAECIZI10hMIzDHFMJj1t9rG3LhGstNGzTGh/RmyvkgPxwihbA8156FqkiJQcs6kTkkFtHr2/jd/5Td/5/u/8EvvffDe7GQhAJIYHRGSzazXohwsjEMJj7KpORwZRJQ8JzmxcAxxu92F2Mc+7Db70A0ppjgERBVlQBUBQgECZRna3hOl0LW75e3d9ZsXL6+vr/b9pu+HISoDe6oKXhEktLZ1eoy0DtjJku+u8VPynlzt6pqc83Vd1X4ymy9OzqumaWaTytdVVRN52ycKgOBU1Xvvq7quXT2t69m0mlRN0zRNw0Navrl98/LrL3/0Jy9+/MPlcunIbzZ3T588mzSzyWJ6dnq63W3I0RATxzQSEY6cwUSTJCMlQBAQxoSIRDWo2KE1G0kqKoQKDpwwgxJ7YI7o1JEj5/3EgTAlUWDhAKJIYFgGhEH4kHHRrDKAw2ReMwgknEBBxbIUVpxcthCKKluUSgCKDu1UKQFQRV41dOur7fXrty8/+9Ef/sEPf/id737zO9/9/jc//PDp+eVcSn2q6SGcd8pFCQNHmd7j9O4BiZfUvo6mVEGLpgEEsjU1g2wbIGfVAEdGvnAvFtcd+uoUCf1o+Y5A8HiIyuUUuAWZqTUjbLcAWGricmvrUbmTt2VOvypAgW9iNdX/P9UNktPROIYRAEXzVBInZRVGHXOh+rMzzJ4VRuUPjp704G9QgIDIRsZbVHa0/P6nn/9k27Z9YgkpDAOAVA0lTr526LxJl4i1kkYEEvCY1mFFEEkils9MiRWQnLPEpnWUt0dAnggQsbYnJynEFE0EkYZInibz6Wx+gnUTE50tLs4fPwM/3bSx7fuetZqfNJOFYh1jrLwnICJUVHKVlUKrCAqQKiJZdwry5Mg1tW+qpqor57JE3Xwmg/pcJ+m88yqKLoNrVEBCQRyG2O66vt2BMLBS0raN681mvdnYeK/EbKgG0YjwAngsRqR8MEtAqSqKZFS9wXYlJFRERVZllpg4JBaQ0jUdy4OHg4fJ/x2ocKM2x+d9sIWkoECICOBcrcCIFGOaTc+ePP/wV3/rt37tN3/r6fvvO0eiIKBJAVMCzUUJan1/DIXlYrE8jgXNbkrm1smRipglJYezWT1pLogQbfYZC4zi+DIaDsDKbTWG5Ag5xLbdfP3lF/92/sfb7Xq/SzVlLZfI4LCqale5BlFCL6wqiFajJyAEREAC2jSLuqkXp+f3Hz2an55PZnPf1NP5dDKZTKbTxeJ8cXJS1dV0NiOiyWRCQI4q50v23Sg5h+QIQMGhEJo9liDx47hdbd98+7v/5l//3o9/+Ic3b76+enuVNNS+rqyDtPM1EQkOxIjEomxsFpDkGIwyM45o4gJEYWzyUyZ0DlRYVQidGstMpBKZEyqCUwTnvHfYYINJhjAQh0FVRASR0GWcjagA5KAwj5mtQGVWQSSCXKtMIppn4QkrKKloaegAiKyqHBEBwIE6BY9QG9uDqLHbve265Wr54rM3L9/c/uAHP/+973/88OEZkZp0yTkSTmUWOY6m9wjyH1D0aI4MZI8zKCDD2aKIGSH9YV4NZH6jkDk4fliOIMqn5G/MUTQCHLWtOICIoyhac2ABWAJ4sIuXkonJFFPxNvkFyS3sUJHL+/TgYsxQmGIwcwNjkvZQTQdgPi+f+9ImBg9mwPIAB7rIUguoxdXm3AMYbSwFMTkkza4ot/f1y82ybUOIjIBsiUKbjUaECAzCis4TADlFT7XlMMk5QqcCIsCQVIFZGdS66udIRoQTizCQggBLUJaQoqSkqpKYCKoa66aeLRbTk8VkcX724Mn55aP5+YO+48Aa1PtJ46sp+iYk8U3lHGXENDJ/JklXQUUSIELvyIQlta/quvLOmdDOGaYmsh7mzlNTe+/cmBFUZkhJJA19v9nt9tvdfrsGjkS+gqodeNe2q81m37cDh8iBc98DVbWyhxKRUsZ0Odtj2qyx1NcqESw6cyigQ4ptG/oUWAQAy8BDQwXjrjDDr2P8mre3Fj1I2dnmg0BssDCBikkJk3I9W3znF3/lF37wa7/4y7/+/OP3QGWI0TmXTN0PZEnLnKXOjWbg8J9m8ETj1aliDvMEAayxKCJCUiICVedJRCzbqYLkCFVFxDkHoK5i8lQjzfVstlgE0d3t5nQyqyvmIV7d3O72fd/3XrSqwCQziCRIhFQ3DZFrZvO6mc4XZyf3Ls7uXd67/+DR0ycnF+ezk7Nm0szms9o755xD10waBXCVG6VAhKQIDsm0UOWkgdpoHFUWVpFm5qbN5Pzi7Pn7T5++/+z5H33y2Z/+yU//5F9vl7e33U1T15N6UvtGGVh1NpkCOOEUI4EjUQgcFZBt0LuxH2KrIYADIAF472p0TpQzwiMk55Ayxy0sbNIkQHLO+4rUo6uSq4WDpiicEJGFzW9kjgNJiz5UBYgqsRSxbSgy5EkgDCqASSGpsAEF1cxagwRFUhXFCTGRJwRFdISIIBxWX33x+6vd29evX12vfvlXfuE7H374uKocqLCoQ0IiUxKPxAsClBqc0Xrn1zPHnqtkD5ZcC7Iq8Hykd7LVPXIkmAkbHP96sPs5Bj+UUuUkSPn/AUcd+JrxMkYLPYagYygKVpugJSsDoBYrI5bBy/kgW+mEHbRy3WqzVEujjGL9tYiYUWAcPoSEdPQmQ5r50k3ZXhalgMZyc5gjmdEj4/iy3+27IQRRTMbJoGoedkEEKASq5JwHsQQpiulJEhA6ImtQTpbgyH6otJ5jZuU0hACUq8VE8nBxzIkd9M4309nJxf3zi4eXT96/uHzoZ2fN7Ewdhy44DYoe0LEQEriqshY5IwkAbI2GBNjIHUVE76tJXdW15X0tVBJjto1bcR4B0Qk2Te1chuVko7wTp2EIbdeH/vrmZrfdDn07qZtZMx9Y1u1m2+7Wu3XfdyycktizVNAywI6w5ITQhHBofwCTN2AeKFnABWBiTUlDEimZ5DGWg0NKSDMYsA/XzALlPpeH7Z9db2FNFElQVRlY09nDh9/+/g/+7O/8u9/7xV85uXehCkkJkTlHKiZWJlUll5GJlsC2QEkwgGZbHBFF8n7LuhSxPgukLFbpKJDHNlpukgAEUAWl1CcjQ58iitbzkw++8S0P9frmrXcBYry7Xt3c3m03y8Qhxl4A2jaid0Lkq2oyn81mp4vz88X87OL+/dOLi7N7l7PF6dm9i2Y2rbyPKTmilNg5CokZSRFSTOQ8iDokZlZFth2LpMrWfsP2ldh6ihXTqgOta//0/WfT08WT58+ePH321ec//OmPf9huV11I+zYiQtM0k2Y+m87D0O3bfeCIBE6dAoiKiCIoenLeqahKKiGnAnIByaCIiC4jCEEgsAiRQQQAHalEAiLXTGd1HIaEnaiqsrW8s4ZNqlbulSs5CEnY2kYAcwB0COhcxSJ5mhuCIKkSCIrqOKLIlgAxqjLY8GgEUFZyoEyEjP1m+dUf/9H6zfLFdrX6d+C3P/74iTeDBKigRGPVgvGihyJ2BGt6iEbZj/bQ0hBHYW2x3wfbpz/7upa639HymXT/6DO0WN+RhimweDT8xW/gkQvIWAyhoOnRzuPoO6RY4oP5JVVT3JPFDASkYJyfOeHcrIyUJEcCUBiuAuQUWHN4Yi7EWtgVX2jfjsYIgT1GRBkbzJWGA1Q+GTH3DaRCFamo36y3UVnRR44syiA2zxGtYhFB1CEmSIDe+tZz5IggqIQ2OwVIBUAoaQKQ3PRGhZMwiwpwLmlWEPXOgyMgaXwjCFUznZ5eTi7uzy+fzC4eQzVv5vd7cX0SVgfYIKGSAwQiVwCFUxSwLKGqQ0R06gRRK19VjiZ10/jK18bAGuWgZNUYCOicioLkqcWW7wQFFSYRDaG7XW8269XN8vZm+ebN66FrT89PZ5NFFNh2fdf3McbELKb2t/jTDivlD8uBH4KKoqjSwRnTSFASglJk7obYDcHaSEDeCgW4AOQ81eHIaP6YQ2haQECey46QRRTgCHzlJcXA0TeT7/7gl//8X/qr3//5H9QTx3EIuQzWekKhsJiKPm8YM+Vg9dElMaeKVq1n36aAVqiECEKqgOBKG3JQQKJKTH6Oh7iGEJQIEbx3av6srmMIivjgydP7Fw/6vk0pAsvQdeub9Waz4hT6bl/PpsMQyXvyzlV+Mp1P5/P5/HQ2nc3PTnztkVAAWUQVUmSH1mmZRNQ661nFk7kzQSAiq1zJKUkkyHIYQARn0iDnRMWC6T4m5/D88ryeTi8vn7z/yXeevf/511/8+OrNl+ubt+1mJV59g3VFnEwbz4xCqB4tzayi4gBzoz+sBZRURZijgPfG1ipSliWhAImCOpsNBKhBWKNQYgDva1/Xk8U8Dg6rKg6d01xOoMzWSDIPdUBU2+fkVZnIgxKoAoMjr+TAOcCoqipOs5VisMmR1vgDmEABY6YtSs9oqwXwqEN3d/Vl/7tdq9o5/Pc++uQpqQgoIYnVIZsHyHYns2Emgjnmhw7ZgYxjfobdPACjYuJ1zIAe3pfNXGHcSx65uA895AlG4mbUxhjEf/fLIIe7CLkVHqiCUu7IdnxUDz7GDii58R9LshZKHxe1hLWFniW4OIZz2YiURIExOyVUyvG35BpMOfYKmHtVYBapHjIkooBcoKSSAxX1u25gRUHrWCFqjdZVHFJ+EYRZQAAG6y2XFJLRSCJ2Pw6BmFWEkRScekfKzCzKqOQcUYxCzillw+JcQ76aTeanlw8X5xfnD9+bnT2k6fns/LJanAeRgUWQfFOhc0AIRM5TdgOIhN5GtSOgqBCh90Tk6srXvmrquvLeCpokKy8JM0A24yjmSVWZvOUlFKKkOHSb/W61Wq+Wt9dXt7c3Vzc3YQibtp9ONlXTbPfbxElE4xAAiMglznW2pR+XtdcpOMN6uRcVWdlbBVwBCWiMnFLikjkna9hWYMpo5PEQE+Bh38IIexBtfKQhSAXrCA0WYiZ89tEn3/vFX/7md75bz6cpJSYwwsERVWBdg/BwFsYNmFN3WGQVgDazrFwrCpKnguDQyidldEKqHklUrTs0jsG1OQkysRKoCLnKEiJQw2J+ycIOySM8fBaFmVNUBV97SULe2xWR94SOvOfEgCioiRnJqSoScUxISOi9w6Rs0Y2CxsSOgMgZPULkmMXAsqEttApJydW01hgDnQMEZQUiIJjNpov3Zw8eXr737PmbV59+/uMfffX5j15+8ZO2ve36tm97DoOVWGtkBjDKxDvHar3imNAyWSgSWQRFNQmqVxAlRdcoirCYHzJhvAMRrSQl8KQqEZJ3WDuHVVUREXkVttZMHAZRScKgqiyMQKAC4B2pCpJVyxOBUyVEyaJBQs0t3xQ0AiTBJBrLU0OAZCwUqNWO51tAXzkREL16/fU//gf/8Hzx4MGDe/fuzTjEJAlUyZGIEGUZs4wYvnA6o3XP5txgr23I3BY68zdakqUKY2ysxW0cYmWzpHSUuM12fbStGT4fkguCGXRDITpVs90YO6Rbcjt/iaH+0l88n+7RgcmhX5dkYG7fm4u2JDMwMA6EPbq0bD7KIHkjVqAEAgalsoK8qEWOfNV4/2ZnbBE003AIo7ZVVUFEPYumzD2jpKSoQEQAYsplcKLiwDOzcFJUkSTKqIoOCR0oMwuwyw4SFFFZkoKAgKE/VfBVBVYi65wQOO+np+cX9x+eXDw8OX8wv7g/nZ2d3rsPWLVtz4qR2ddTsv47FSISWVjMioQOHaLU4JjBOqs3TeO9r7yvXeXIKJY8RiPLYIzCQMstqlmbpqnR7JFy2rcShn7X7nftdrXdrrabzbYb0nq1UV2ezE/mZydDF4Y+gbq6nnV9ACroxcTUCsZw5RYEmLeu0f4WwRESIQE5IIwxDUMYhhBznSeZHzlCAFI8AR0rxMqJKQEAZGgAlru1Dn3ORsSwiFw+efqD3/qz3/veL08X82HohxQRnI06zhAFDx8+Ohz9md8zZCvfZX6CDN6RFo+KqA4yQWV7jkqcNZ76QwmEKCCiRxPOCyAhsQgCMcsASJWHyhNOEEBAOTF6byEqIkiKXk2CDGKN2ZAsgHfkrbW2sFgEwiKi4sgrq1gpgCiqkqnmSsudHAVoRl7GYJjGFJ0TC9wBgXB6Oqmn1eJy8ejZww8+/fjVF19cv315d/X18u2b61cvQwreObBeT0q5L4hqkkjk0RM5j97FhEgRYgRVAEb05JEQgLzp8dGavisnARvRBeIBAQQiBwqoQAjUTObemQTTEamrGiKXJHbtPgxD6FqJkZOoJhXbH+SqKKwgSpbTBwTJsQ44BFGSYnQA8gMjREBDWyJij004qaojl3h4+/Krf/JP/+nHn3z0a7/6HSCvSWwAUWkfZ51oMWN4I7wgE+nZeI78S2mXmzfcmPYVHUOA8SwUljzbwDHzOVpUyNZZDx+Xa6bN2o/Jtp9Nex2sv2b6WkfTOkqDsjtCKZZcNQ/yNTAmCiL5zeZ7RHMsak1V80VaeIKHxj6i2Q0Yoscx7s/iDwVFUSkXf0SIZbAoWOCaBT6Q+QejEVBYvZLVIoJysosua6kAygoIjtRHZmFgyUndXPQtyepZTISAqgCiNmedrBgxmwVTl6sKg3POz08v7z95fnH/0en9x9P5xcn55fzkwvtJH2OMKYp611S+skeNjszCCgvm8Yk2K9d75wC0qj153/iqaWoiUlZV60+uzt44ctR2qhFRsXb1dNI470q8qTwM/1/G/qvbkhxJE8XMDHD3LY8MrUVmhkhZmSW6uqZvXw7JJ77yiQ985G/k4qyZ4brDmTvdU62qKmVkZGToiKPVFu4OmPEBMAD7ZA0XT1ZFxNnbt284YOKzzwwG9r3r+/my7UUYTdfzweERAhtjh5NxVdWWKvCB94hIXkDCsfEUtneBsDD6yM9H6x82flGQGwQG73y37Nu+c9KDxrEqiAIQdpIoPinIRdRIUg117P8bGBkAqKzBwN0gdH1vbP3408//5ve/v3H3LiB4Qkvsvbe2Ctw8hF072e6rhAefA6jviolBZQlYgpmXSBcXe35jyBs6jqZ67SA2ovXKAeEwAAEaI8KC4JlN6FcDwBx1LcS8HsB7H0psCUCAHAuwGBP2eaH34fAYhFhLUoxTq2+jZxZWBxZBHCfsFBKFMa8ey/oSypQgigCd94AwXhuOp4O1rbWrN64cHxy8f/X67YsXL3/66XD/zenJwXx+5tl79sbYUA4ogCgWiaq6cgJoTGUtCwlzPLuNGSu1cQLivLCIMAvEnYzikYwgMfsOOkRDVBGCMQ2j833fjCebW5tXLl27cOECCC6Wy2W7PJvPj0/2z2aHR4cHi/np7PSs7U6hd0Bkoeqdx8CxIrreA0Q+AAERScJ2ZRCR0CEjCIqPOUJmEHS+I0td1/707Ps/ff3dxx/fX1sb9E4o1pxAsFOgGaVgxlKPHA4QPeaQlM3ALGIgkEibFWuub0kYaAbxavUQIeVYI0yKVliUB5KiLyBgqrlMxTPRAeT9u/FSSi5G8qgiWQoY7WqoAdF0WtCCmEoDCAUXmFyg5DginL/E+jRCKNGbikDsZRxjbog1P4xJOYMEx/MVNCsoKtkYmGkBABua3kuQMQFhIU24h6J2A9hzJ/HwcEyoMJwbK0CRE1C/HIt0wv5HDLiHjDGht+JgMh6Mppeu3dy8fG0y3V6/dHUwGE/Wt8LZGstlj9Y2lbFhcxaKqUxMSCKQMRRPuwopATQGrbWAYo2pbGUNEZI2PhSWtCs3eoGw2R8ExDOAGEtVFfpACHvft53rnRDQoKHhmKpT8Xh2OmtqY001aoYAZjQaVbZGRO04B2AEWcgkGYhJHYJAcqDu3guEOoaiw977tuvbvmM18TloRO0DHK1kIE8DiOYClIT4KPGPAKGxZGCCSBCJe7h9/+HHn//u+vU7hvBssQgfrWwt3oMwQNg3FDdCJwQVoZJavYwKgnSlIuTISip8gXjidiApS9ofYzeukByAyHKjOgUWBCC0AGxCtAaIAF6YkAjRi0cka0m8MEmIBikG16FdqSCFxmQY91imYQUHEyLBCMjCd2rSPBZRaFsIyGmMkpoIntAghsFzOPAaqDHVeG06HI7WNza2ti9cuXXn5r0Hezuv3797/e7Ny513b+enp8tu5qRHIEuVtSjeeXbGWPGIAt5W7IXFg2fwHlyHZIWdCBhbCxDHWIstQjiFSwB834uVsH0YSMiDCPvezc6OBLp6YC5e375/785kPAHGpeOzxWKxnJ+enh4c7L17+3b37dudt6/PDg+c68A7BLJVBUTEXg11CIPEVBUxi4+2J3RP8Yj1qK6bxrP0bdcvl0i+9e7s8N2PT/+0u/Pbze372LY+7CnjDPURctQqmEx5CJaz3S74Ct1MHLKdAWDEuygdlP4hacnUC4ScazzZCILtE2XWE7euWCsEtyEOjKhavUW03TGBB5BO+JVQUhl210lInggy6hb2yNZrqAOs6WmBUMGYrL8OmZUZiu4EIHSmiQg+5h2V09B4CEPAqjGMpLQCIKAeLQDFpgcUEet7zwjCQoKh6WPvAIUZxZBBYQcE7DyHNkeCyuMLAxCGzpnaERAQKdDsoZcWkkU03hOjQaqawWC6vj3ZurR+4era1tXJZGM0njbNJAA953rbNHXTSIgTBYy1SBQ1MezlEjSIlkwApNaacBa6MURh/2XcQIGKQSUtKyGKhKNb0bMQYmOrcBYYOI6duQDquh6PRkdnM+m5Xy7Aucnm+ubm5ub6xnLpGlvVVRPBpiXpPaCyS2rgFAQIiI2mTCAYZmMr76F3vu3d0nUx8RuXSUsfBGIhZ1QLEKDQvAxTJJDKEpSOIcSQXhX2nj0iiqEr129++qsvHn/22XA0YUQi8uzCgJACMRYQGqfiOUn5qpSOVvEqOagYNheOQqVQ4VDyIpqU07vp0NVNFkm8uF2eQqsDTZ+z5zCjMUryDIaCDw67v0kQyQBACLJCUE2GoDgLJuG9GH9gTJpHAKWODyIJEndEBOOTChcx4h5hZkNoCYHDYTtijVlbm07Go+0L21evXT47vXOwv//+7dvnz56/efHz29cvjvd3O14yA4uE3ejsXdrIBYhoLIJnYHaOiAmQJbAvtTFVqCvx0odyotBtG8kGUoKd68KRDCDtctn7dr4869xiUNv7H3wwXZus2+YSrDOK613X9cfHZ6eHJ6/fvnv9+vnb18+P9t+fHB327TK0UifBcGa0QRREcUyGmIQMVlVjK2PRAMJ4MhoOh52X/dlewMlVPeg6/+b168P9YxTwjomECJlDs6Bsr9XTippZlfS0SEprJOmQJIiFK4lGDQCKw4lFwwlhCQdwqPhhsalArRZEFBPgYgjSItMpan4zvRJtSuRl1NyyooZQXc86WAU3mMYf7Lc2qRZJB0PFb9PSJdF5SkAkpmf1XdCshUSkg1oBofwYBi1jSBsJYgep8BHPDAIWAIVZOB6AxYwx6jAxAIG435VEQJAJGARCMBDOH0xFUAgYTtStDBlAD0BUAZCprR00th5Wo+nahUsbF69tX7oynG4aU9X1AMh478USVdXI1oDAHgEgnKIRWFfEcJYqIYI1ZGORG1pjm4FVSfLsgMEHsCcxVI2zhABh0KECvzI0GjSDpkJh8c4v23ax6LtW2CMBuFa6hV/OXTfb3ty8ef369cuXt7cu7B+cWGN770JIjiwYnE6QKompBgGJLVLDtpwA+5HIkhAKyHLZLbu2F6/0A2oAFZqtc8LagEYjgKgmobmQGteEn4KbCBsd4uYyW1Wf/vo3v/3D3127fcs5hy2IjxExCkSjrzFyNPD6V4JppNA+4YpkCXWE+k/lKkFRXXKGoMG5RvAYY0UJueLIh6JuXst+QkRHCCmJbALbDaFyFQK9JgoSIxelw6ToaEJHNNAQOQ0+YcDwkTQVkm5BECFXZC5EwKAhA2EXn0DgaELbVbJUV001qtcurF+4dvnqnVu373/09s37V8+ev/z554Od16cn++3ypPfd/OSoqhoytqkaNIa9FzC9d73r2Pes0StUIuIQa0IriMYOTF0LYWj0jWSSDw/tULCy0gF3/Wxx8rz/cTgYUt3c/+B+vT6yaIwhGlDV0PXLl533j+ePjk9O3r3fe/782dMn371++exo/33bnYYW3NYYSzYc8+TYG2PJGAA/aIaDujaIW1vr61vbs+VyfnzkTxfOOTHoXHc2Ozk9O3WejYkImIzNUZRabBAlPJRjzO3M9DqVpBjHR6sZoYpA7I+m4Wu4mFB5JoDQSS21aSCEkC6KlhM0JoBYphhfETWwiriT+4kp6BglB06PMwWEIRoINZIQ6B/dYIcYzoJCwMgSiHoXfcq06Ue0mCNKq6L2xMEaANHd79kpoFZGaZ8khT466xweITJbiIgWDYFDFAayYXN5SGQ6z9YQA4RuXKK7sVmjI0GInQhDc6e405iIrCB5FiKDWCFVphk0o5EdjAaTjfULVze2L69vXWIhWw8ZbOjcX1ljTW3Ihk7+oDRskG8iNAiBSajIGGsqMoTGmrDzGJl9aI5AaeUiKR2XnADDKerCgoLG0mjUVNYCgnjn5nPwDOwNgGs733cEQijT0Wh7Y/PK5UtXr1ytbX10NPcMbdc519vKMHOstQopB80BhXZDKOhZDCEaE3JBgoa9dK5v+65zXVjRokABkzAUCd6QFdBgTxts5TUUSGJLBkHEmArQdcv+5o27d+5+ePf+R81wPJ+dxSZ+CIZQWChuV8PsPyR9fWEjFaqr7U4/ETSrqwBVwcDYqdNIYXz5mCLAEE5BUeZFsw8K++LzGSWJY8VtDuqi54yRdSLwY4Y6z43kqor0jJltE4CUYU/zH15U9QufDW4gRgqCoZ7b+ZifIMRQdWMQmMUSGWOG4+F4OLy4tXXt+rX7d+69f7/z9vWrnbevXr/8aX/v3f7ea9/PUca2MYDEXgilshZQOvHchdJ7QWEw1vuOjQGyxgBCRWwMGVMNJOzxY/DgBURCjQRZ8WywamftTz/+OJysb2xsTyfrzdAQUlUbYQdoKovNxmh7c3L92sX7d2/cv3f3+yfffvv1n1+/eHZysAddN5hM0KC4TliquhpPxiDi+9aIq21z8cKltY0pkp3PFiJemD33trJ1VSHwbHnmfe+ZAXxIfoU2vCGyVyoeg7+XuGRCEeNiBhUKt1EZebXtoqWkkViJdLiEOVNcBGrqY6/gVMcTS3oEEZAloW6NRxCRXXw1FY8EzyBJJAG1UAckEjuxF1+4P4cavGjJdHgpDxGcizozicmxTP4UrJRSWKVmruikohyJFGuW9EIzMaaggtWJ4Y611opIaArrXcx0e3AAFHb0hEnPCUlBVp4bBSqkGGJE6ISAxIDGGjOoq6pB29SDITXDejAerW9N1y9sbF4YDCa98wzQu34wnlRVVQ8GIMDM4bR5ESAgNKGVCaVzvCpjLZG1tTFIGEs0EIUQwkY7VfnwOpIJ6Y7QFF/IGBAR3w+qajIe140F9uw9ABMIMC9ns9pWGxvrx2dnTV1vbaxP1jauXb66ubl2djw/Ozs9nZ30fRsapJGxGmxGLkJzDbEoKG56RBQyhCTM3nHb9n3vWTgcTAgAEHvZJwsTqQ4NDiCUFAUKu5DRaOyCDyaFSI4dAIzXNu4+fHzr9od1Pejmy6AfwADAQijiEbUCKIcXqmpZaCQf91rElhp0BMWN8DxB68Sca+grKLErRWpkpWgeYsQEkuCWArAYQkQPkoGj6JlQadCQFCKrr35cIJ7zJKj4SJ8mgTqIkUZ+DoV5oCRuVJgoXUq8hW7rFAMJCJv4MBTreCQBL1Ibu7W1vrG2fvXG5Q8+uLe3s/fm9asXL35+8dOT/b337eKEfe+6DhjEojUWTG2s7WnpumXoOiPeOdcHns/2nVStbcaj8WZthsK2ZT/rjpwIWSOIiMTgK2MtmflZNzs8fvHkx+3tS+tbm8PhJWPJsUcWawECsYgyGtSjqxfWN9cuXLl4+drNv3z99dPv/nL89q1zc9c5IFPXOBpPNjbW2mU7d845x66va9OxO97f2dvdX8zPPHpEssYyu65rAUEwmD9EJBEGDr1QQOmb6HIlRQIhFoymWWEJAAQKAEQCaxF3uhX91cLVsYMoxP5cit9FCdhglEUDU00DcPy/Sl2ipSJ5DqEOQOL5jBqtqthEARQEUX4p4TgJ2x1D9sGggpCYg42ih6pOirWipJalTSXKUu2JCfQo7JAqqxAKXSlUJ/wvuoaI6wFArLUmzJfziMCIjKFXeYqWhTGysciAPgIpIQjn2SKIQDjQCgkrE/5NdWUGTTUc1YOxrUdom+nG1vrW5fF0o2pGnoHRMsJkOJ5MpsYaQWDHAkgGw34pEAhpXi+hzIMQwFqy1lpCImND0i8sMhLG50opTEjKGZiP0PFHQFB4WNthLBnyhGyIOte1y7ln1wwH6BBYKqKt7Y3N7e2t7XVDdHh8/ObN27c7O6fzU+89EAXAGXtnhP1UodhEBASIDAAikXcewTOAAPe9c84zM4JJnGaYaolNczALkAa9EEWWQ72yrm5MuYAmxkPXlN47Zrn9we2PP/ns3qNH1XCwDN39vCOicIAzJhuX7acC/oxv4tdmeuXc+2qRISqzpLtobhVSLKOyHO1w4HmV7QWAKJtY+JyUv0neRUeh/lGBURJxhYNRfTOE0hc0y5ufJj22+sIU2STOFvOxGqHqMjKL2n0Q0Ue+BthLOFcAQDwICnTeESMBDSeDyXhw8eLGzduXP3xw783Lh+93Xu+9f7u38/bNm9cHu3vsmKoaGcT3IEBojCER6Po2lIIasF171rbzoXiqsO/PwnHEtbC1NQssnRCiEbJEIO1gOBTu9nbe/fjkx+3tK9Px9NLFDfA9GhtOH2qqqneOUIyhzelwPLixvTW9eu3K7Zs3n3z37bMfvj54+6qyFYGMmsHmeJ2H/tTYw8P9drnc3d/DypwcHZ8cn83mC0MGLLm+885VhmxtJaAu9iK6RUUYOEYAPlI3YadZwYQAhSpIhfvBiSMBeU72W7SNXo5/IRIgGhvG2h1UUUUB8ZwkLgYAEj2GyjqwSFEsHz4fOFfKFTVqGKMg6eBF6zkx7P0NF0UTnN2VShWA6FYyUfSSdS9JPGgQk4Veb5IJtQzORK+OwZZOcnhA1ugYNCdqQdhYIwAWrTAbz6YGz4aZBcSHQpFI+odMNIJ2gxHG2KWVCJEw7vI1dlDVzaAaDAeTaT2c1PWoGU/X17en6xfqekBoyZihbUbj8WQyMbbysWlQpO8hKJcWUDXWIoK1VSiqCRlgAg59CAIvy/GMuFizSEFBYysCAUJhMYbAexCpKrM2GkybAYGw9+I9iOfesXPNsKkqYwxagunapBo0k8kUkQ5PTw5Oj97svn239242OwuNELwDNBDO8wACE84f9kyh951B8eLBgwE0BsF0Lc/P5p1zSFiZynuQeH4KA0A84ySWIyv4AS3GBoMASBRyACHjGzKfYUO27m02bTsfjjZu3Ll/9drNwWDQ+V6ADdqYr5AkQAmHqdlcCRoLocKI0tVEphgkaa2a8mAkI1KObwR1S1BHMU12D0W9ECie0WHENkrnizoDyxuJVQX/ucV8GK8Cohh/QyxjlzzJ6fMQAqnkAoP5VyiYZ0gRV3ISEGteNa4nyk3fwr3CVk9BZtcTIlpY21qfbk6vXr98evLh8dHR6zevf/j2h6c/Pnn39oVbLoTAGBiOh0jj+dmZF7py9crV6zeGw6bvlmfHh7PT41nbnR7v1oOheOy4tXZgzRSwqcCCr4144U7EkUUv7Lvu7Yun34w2xuNp1TSbk6EhA+CBxXM41hEAhNlXtbly8cLG1sbtazfu3/vo6+v3v/vzv7x/8XR2sCPeAfvt6ZoR17Wn3sPhwZ5nns+7zjlrq7BKIMLONbaujIkWP8gqQ6xTRoRgZSMGjp0LQu5S+2+EM+micAik0BjTAkmoLywkTWPRuHgCKXVKKtoYU7WxOZqGmRlpJzYyiBiqBAgSseMcnSjuDt+aQobgEUSxfhqxlHF2FFIFG6ncQoU3aR9kTYsATGU+ugvllCCGpwXxGu6OGlzlmCtGR6guSGxsT0eGEKxFBCOhotSDF49E4CVwlEIUWrwQhkr6sDjgQzBsLNmajKmHg2Y4qgeD0WRSNcPheG04nA5Gk+na1nR9C9gw4Gg4Go8nk/GEyPSe2bHzYXM+hiMSg84ioiW01lhjww4AYwzG3kOhnA81UglqiFHgKJRSsrpqEmDvvUUU74dDu742aQY1u56d6xdLv+w8e9vYqqoEwDkHRMPxyHtPYLqe377ZefXm3cHpycls5rQ40Rj0Ma0KBsEYCjQQA7veIRgAtFV18dLVy1dveuY3b94unj2F01NjqnB4jsouQO5bokZHUmgXVjs0Y9J95KHiM7SKDm+zD1ldQnP9zt3b9z+8fOWaqSoQx4Qs3oS9uQnwSg57RSPOAkmU7mCVfkS14DkfHN7WOEGlVlLVQXgsjLFtulW4MKp2jA4ypoptvSLsQQV1gRdHtcTqwzI6wtW7gvoQvWsaIEDaRam6CDmGVzeUwoiccEkUAAACCeqhm5g+l9RfJBz/BSjskShsDEMQM6g3B1ubF9cvXNq+evXarTs3v//u21fPn759/dJ1Uq2NyYD3vuvdvbt3/v7v/u7how/Bt4dvd1+9/Pm7J0+fPX99cnrqgM5a03dLGDIZqmEdXC/OE3Dft6GVtOvheH//xx++nW5dHE8n04/uGTLsPDFyL8YaG7bVg5AAsTREFy5MJ5MPtjc2Njc3/um/16+f8vzk2K2vD7eqE4DGVnPplotl75wepiCIxrne2AoAjSGLSGQIySOH9ouQDq0LhVVht6nEs/ZE939R2E6VkHtkzlN9aCQPI5sdYoHoyouIQP8IJluUwhHFDWrY88XRCUXBlkBCBHlAQGavaiAqIxjtbBhh8lUqg0UkiqADRo0wIdZlxkBVBSpdo6hEJVGrfXK8Gv5CTJ9CUOeFMW2bUJ0OTiVaUhgCaNuuBzQe2Qb1NAQQijitEWISh55FXOhqHY2El9iySQSMMcY2g7ppsKrrwXA4GleD4XA8qQeDuh6M1jYG9Wi6vjFduzBohp6hboYb61vD4cDWVd/2hCzABgRM6DsDxkbCx4RcgiUQMETG2oBhhYHihFLkgIhQY7NInAQGBRGEwpkBhADsLMLaeLSxNrGE7L2wF+/7vmNmU9VkiD2QsXXdnM4Xfe+XXdueLl69fvfq9Zud/YOzsxmLEaDQgQstCkM4kyZ68ZCtEHDs62Z4+ebtX//u93dvf9AMhk+e/Pjf/st/ef3s2Xw+MzW5XnzfeTW0uizJ7HCyShCLawkRY8pdYu0LqlSRRRFx3m9evPzx518+/vxXg8FgdnxiGkuE4piRDSkoSIgkIQX1AdGwJw6kDAvKMCER94WcKh5RYQZ1YRmRl6YfErOi2gUCKZ8EKvTZYyVRzvBLVSa9qV+fwGL4nqwNKibxSzVzkB4qJwrSPVCZqRglpM/I6tco4BOFiOkqAICwUQnJo0jsvyqEuLa1Pl6bbF7avH7r3o9Pf/z+m7/sv9lZzI7bdjYcrTWuBXGuW965df3uncvH7949+35jc1xf2Vw7Pu46T28Odt7u7Z51DpAdH6L3yIuuP6sIL1y8OBo182W3c7B/uvvmx7/8cXtzsL2xcf3GNWOIfSeA7FEoO7SeHQoIUjWk63cuYfMpUI/UvfnmX1C6w8Md383b2dx5ll66ZYfWQhXO2Ea0VgAsYtPUBOja1jlHiM6xJVOgAfS62gEyh33C4SUfZyzUqRWFMUVMCQiAFJwHM6sMIVLcOqsqxICo7bgBdHNxlMCIGBNwSCAZNYRQOx/HGs9S17djQjtJVMYRAJCC0MhIaIGEykxiGNPVhThl45+D2vRWAcPCbwlDxntI+YJ2cMnhs8T0mYYVtnfeeTaVJYvA4gWFBa3FMD0GEaR3HNgY4HA8VIjaAQnrqmqGo8FoVA0GVTUarE0Go1HdjJrRyFg7GAxH043xcLK+eXEwGLPnethsrK1vbKxbYzrnYnYNkUzgpQAACIAsWjQGiYhMTHAipj6qMd+JAABhb3mIH8Fz3EYtDLr5NtCOwsLA3o1qWp+OB3UNMa3B4hl6RgEyZKvaE9dNg4DdvJ23SzDN/v7hs2cvXrx+ezybgTFENvQlBvHBWca2JZ7DEalMhIYG9fD2Bw8++uTxZ19+eXnr0mg43FiftvN5v2zfvn7lWbjvBIkj4617UguDArqRJAY3ADEsIEAMbTej3MSad2Zhvnnn7kePHl6/fZMAO+ctsO+9sTY161DLlixT0TQRk2yJgvhC7FQdChSSDH52K4V/SaZaUry+YqsxfWk07QgJ/iBoXFuwOepcsq3PzxGQor6iUe+qU02uKk+DFHqE569KH86ZJVSvISmqiENKH1NCKHyrTmHohC2IXsJ+Bc/M4r0nBN7c2NjcWL9y9eLd27dfvnz18tnPL18+831H5OZd9/Tl02c/Pbl9Y/vq9csyP1ycXVyfVMdHy87ZC28n1uKL93uLZQftwvU9GkDfP/jwg88/fzydjL59+uxob7f1svvmzdd/+cvG1pXNje3peCDGet+RNZ5DJ6hIKcRsGktNdPPqNnzy0fx49+zNE9cuaTAYGZwO6pqh72YAhtB4L0SEjIIEiE6kqmpbV7EdLCIAemDxwaLF8ipRVlAQhHOXnZDFlFX8nsxV1Iowj4ShYkgAQv0l+DDdIUqIfEkSG7WNaZ9Qtq4Q75PdUikiyTmVUCXGCRDLarIxj/y7Aono4lJ0rNKZZQWS2iRaSSn7DNNUsFHFKypKCRpj8JqFt/AFkDU4qx8CMNu+ZyDLDG3XI4uLvUFCK2MARDRAPjwOI4gxoacvImEzGtX1sBlNBuPJZGNzMJw0k/FgNLT1oK6buhkOh6PJ2vp4OB0Mh8Y27GV9Y3M6mlS2CseeO2YWRgy7ygkJDBljjTEGBaqqMkCAoX8Ph/ZCEFrIxO5isbZEBCTkPCiUfGgGm9NxL8TsKsLNyXhrsmatAfYQdgkyt/OFANvaCBIY7NgdnZ6+23nPZE6W7tWrd89fv33zfmfpvWdCQ2hNyO6QF0Af4iXf96EJV1XZC9eu37z1waNPP7v3wQfbFy6goWXvLly5+Nlnn79/t3t4sDc/nYcDDhFoZX9GJBPC1CdMEjb4QkxPRQoUIO47EQJh4GW/2Lhw5cHHnz94/PF4Olwu2opsKP4hUHgPGWOrUcsiFM1YRhiYxamQm3OWFIs/IYPrKIQqwBLfitSWwic9JgGKIyz0M3rnKLS6VafETxJJYuV/QR8rKVXij/MYs/vJMExnO+moXpUY5mQq1GlEm6RMGObvKKyVtuoI9HFs1xNW0SCxAHsWCYeomM0L6xsbG9du37l/76NXL18fHu+1y9O9nVdvX7/7x3/6p5s3Lj1++OGlu3fny5b7p5N64Vgq2va+G9jJ+4OT9zvPlr7rXXdxa/Lxx7f+r/+X/5MFWBsOf/jmu5evdqRrf/zLv25uXdjc2Hz04MO6NoxGULxnx0yWjITjNEzoYdB1fjio79y8vnPn7psr107fvLiyPalp7eLGxtHpHBwi2s51IOLZhTNrANHaum6GSMQsnReiABfD1tJUA5rcLgiCJBIXQIQRSQ9YSqmlaM5EJ5w5WgNFBpLNtK6ZMOqJVNEhi2LtEtZgVKmgT5JezuKsNOQKlEimV9FHlouEUtSeF29l3jQNI0aXItmiFwQVptbckpRmxUNlCQbViHQLSPFxhENxmgRENxFY5sAfB9afOfQmJ0YRIgwHFvrQ0jJETEQiZCrbDIaDyXQwHA1Gk8n61nRjsx6ObN0MxkOydVM3o/F0MppM1jeGgxEZC0BN3Ywnowor57jv2rZ33nlAMGQAkCzpKYlkkAiMicgfAnyKXo+L7d7R1caZjJtlA00CwCzMjGTIkDCAd+PJYGtjfTQaIiE475YLN5+3i4VnX1nDHnrw7Pno8Ozlq7c7+8cecdH5N693dg8Oll3HZJBQt5owgjjXWWuc9wax9wxkhmtrd+5/9OCTT+/c/eD2/fujtbF4x0husaibtSvXrl67cfPbr78+PTwVAaoMtD60QMfQGTw9GijyDc6WYogQ/HJuAYEAXoSFhRHs7Q8+unv/g83NC4BIloDFADE7FXQJJRYJlysIU39ZGEEsBE0y7MiSe87up7eiK0vpqkJME5bP7gfUyySsg1kzAAAw4RiRcgjBGKCkSD3fFtRuxDAccmvhkNHNCg0l4xNY5PIhc0UIFvORAJQCygTZCsMRhkoYcvvCEA9UC/FpqD4UDCqGxMBt3xnvrK02Nydr09HVm1dPj88Oj453Xr988+75/mn7T//2/fpk+/btK3cePuyc++Gbb3zfX96qxvX161euvN45+jeZ/fT8hQe+eGn66eOPbl+9/PL5K+P9aFQZI/P2lE/9d3/5142Ni5cuXrh6+QIZDK3cUAXBgAEBEmTAygAxDm11/dLFzel4uL1+/crFARIT7uwc9r107/e6rkVC4MAaQ4T2CM75zvueBQEYwAImcBMyfCLxqIDQ+l85jlBp40VNPpLKEWfWjTMvEm6Fogf6YKIUoxBE069yqX/EOCP+p/5c1y4YFknQPDp1UQpLM/wRr6Txa+SXVSXTGjkLrINLOEfrPlXmAjuVrFxO7RbPoHixvFlWo4IkjX+VwC6CHwQAJAtI4otTDQ0FjsdA0eSBYzu22lq0hkxVD4fT6cZwbX00mjaj8XA0rYdDWzdVMxiMRlVVj8bTtbWN4WA0nk4rWxlbiYg1FTD00Dvve+cx7MaPLX6IrDFAVFsTTtEN+2E5llcG3RHdvh1wMSgziAAWiVEQKFS7oEAPbMgYY4ABxA+b6sLG9MLGtDYIrueu7U7P+m7hfW8MBtFl9icnJy9+fvHm7c7LV6875mUPb9+9PzmddeAMkndM6AVQwCOArSyhsKDzjgyubW3de/DZp1988fDjx9Px2mRjwiKd94hAFTGKHVTTjY3BeARk0AAAGzKxg03IyQphsZQhs0OCmviMDxxqpcKhOsYaQOm6buvytUcff3bzxl0ypp8vvbY/Cxn0GCGSBhe5rgUyas5WTwFZModSmMocQmDKHyejWEqlovskjaqAkO6bPhiviFEKFjZXw3CMUq+EavEAhXonG541OCpwhmH6dAWow3RV6dREs2npIdLDFA+t/lMRazI7K9GG0tcooMVuhkjiFiMInZaXXeusVMZONkbTtdH69salixevHN462Hn507O3k/HXw/F4e3t06cad75789Oblq9qYy9uXb9+7duN43i3357PZ0dnBtB411fDd3uE//csf//L1t/PFHCuDXrjvd17/9M2//veb165ORsON9aFDFudEQHzY2YzCwJ5ZBElGFYlIU8Ptq5dhbbi9Np3WjW1qbt0zel8ZRAD27MUhYDjMkgxZa9EYARQkIWKh3rPm21EFIOy/jQUMQdDjXi8sTF7o6qQAOcgwZyCrwoEQfXdw8kGKgztgXYK4tQ/CbtFsTCPIUnua0bMa/egvoqxo0znMi6tIJb6f5F8feFWk8s8Kxkp+BjUQSLyvGnTVqPIL8hfpbwkBpWFlpQtGX2WVQNiCoEFkJgLrI5cWR+a8EAGSYRRBtIOarKmbka0Hk+nGdGNrvLY+Gq9XTUOmtnU9GI5s1YzGo8FgvLa2PmiGg2YwGA6tqQTEAwTK3bleEA1ZAABrA5cdnIAxBilu8WcU0BobiKVHAAhpX09M0yBA8AUiFHtlIwD40NWOWVDY9wZlc228OR03TQ0obtm6xbzr2sXJzHW9n82rQbNc+vlssbu//+LFm+cvXr18994LzhbL09m8F+9FyIKxKMjaYACrqnLed25pm3r76rWPHj3+5Fe//vDhowsXL3rnBQSJbGVB2NS1iK/rqhnUTT20Te39Ujg4wcQupnwsAUDI/AY0IiLgPYTDxIggtMMkQC8s4juPQB988ODBg8dXbt1AQwxsUIA5tOgOp6FxFpAsmhmNB/sFCmIKmK9gOgGN6DVQ9SS/mMxovuy82GP5UuEypLwFnNebpBfxt+QQMj8qWjFUnKr5i5+0z19WPr0yoni79ALyylCys4GVyYyxanyXQpF7HBQpqRYKe0NL0pAVEAFx3rMwGSI0YKDzfedcXdtmXI3G6xuXJouLW9/XP7w6OHj+4tX6xsPhcH19uvXH/X3yPBxsfvhoC4y5emXr1u6l0292Ts9O//T19ztvj3968vwv3zx/t3sYGqA3TeWFn//0w5/++V8uXby6sXanNlXLPvSZFgAjFA52s4QC3HU9+LYy7re//2rAfQ19dzZfnLWNrQZ1Y8miCSe/E5IBUwfhbbveeWEhL8heGMSG8+mjccPUnCF1KC5EKHduyFYxtjYQiNu8UtOIFPyvLM3Kwodq1IL5ybEfYJG/De6BglGR5MfTKusvKXEQrSjmwLMgAc+JUjRV6R1FrVnHcn4N892LLijZ3P8Vj5LvhOeVqdCv8iNpLLGhOlHoOBh6gAvFNgpoLAnSYGCr0RCqqhmNBsPpYLg2mqxPpuvj9Y2mGYU+DoPBcDAc1tVgNJmMRuPBYFDbqm6GZJA9M4utrXfes2dmMsZWMc9MBk1l0kJw2GWrSQjUJBBopScQSBINTMqIMe8OEvYqV0Q9MxGB9+LddDq8tLm2Ph4bw+J679rlbNYul91yuVwsuO3avp/Pu4OD4+evX/308vnO8cHh2Wnb+tY55wXIWGNZWEQIwDuPCFVVCwgQNIPRlZu3PvnNrx8+/OT2/ftra2uCbAx6dmgtgLCwtSbs1BwOBlXVgFhrKgbHwrG8P3aUgrCNGDH0Dg3bzT2AxJomwbAzxbEYAltbz75z/ur12x9/+uXd+/dHo2HnPTEbss67uCXCBx1AE71JNIIAsNo1OcMPwEJqY6ZBt0Rl9K3R8AqmL7BVKeQqiwqhUdNUKe+R1Er1INvgVMusVdOp3Y9KfPjWxHSifsd5pISxxXPWiUR8lUqvMYMizRQ9oCpY6eNWVDLaiPQEZTCQyQL9AxFj67oqnrlAGNSkZwfsCXE4aIbXLjyeDg7fv/3h+ZvJ+vj2lWtbW9ema9t/+tc/Xblwc747e/bT97xYDkcjAjo5mv/DP/x/xoNh38JptxAH1BhLNTOw8Oxs97tv/3zzzodXrmxevLyNWDN2HpjA9OKJEQGB0DsG3xvuL25tfPD5g61BNTvaffbn77/Z+f5sPpvN57N2sWw9WxAgEfLeMVDX9ifzs92Dw5OzOVryCEjYhzNdBUQkFHqW5bYAkM6ARO2EIFE0gYFRSBSdiDCacMJNdt3J7Ce2EBA57uDKt1oNehOpL9reE1QWVSKKNOoqioZCTTD9WkTDma9EDSBWlCTmFZQpLQoeALRBDMYbnkNBeM76Q/l7Htf5N5M7iE8TRky26xjRGBtIPDSGxAACeMfGGiAythpNx4O1tWowqkbjtc0Lo9FaVQ+b4WQwGle2ITR1U4/Hk0EzGI7G49G4aZqqqhERCZl92CfpnSMyRgQtptoeolD7jwHLggAzxwNUospJfjRdieQTMLGHCKL7O9j70DuuMtS7DoGnw+bi+trm+lrdWO9a7jpxrV8s2rP57PTMedd33XLWtr3/6dnzJy+e//T61e7J8dFsZurGAUg4ZyqkqkGE2cSum15Y6uHo8vVbn3/55ae//s2lS1fHa1MkEt8DEgH53ouwrWwooapM1QyaphkRGiArDAA9AodzwmOmFAWFUQTCSQIUmiUHrydkKOlOTEOiTNbWPnr88QcPHqytrwshCbKQd94EGUIQQUOUgVERXAKkiowShGDyDBhb2qUKoSD0ahbL6njUNFMpeyvAI1nDko9JBRPZ5Jf56Gxt9ZKi+K1A4+cuLky85OmKV2J+hKyXGeSl+2rhCZRRw4oq589Ez7CaqvjFg8eGXsHuKAsVkTEJMbM4AUFbE4MISe977AEFq6aerl84FvPHP/3FIN64c+e3v/7bdy+f7+/v/e//8g8/PXlCTXO2WNq16dK73edvm6Zu6unZopWqmi1OTd0AMAgD8P7799/98OTR44+2L24RkYBFwt45ETBAJrRed8DeV8TXrly6dPnypKEK+uFkdHw0e79/fLLoli2HvfpCIuzZMxprLBwfH714+fr+g9PNS9vi2QMHYxyTUHHPd5yqiLTjeUoQD1qMya9iMvNZwsChZ2xpUkXzo6W1k2RAU+UPQNpqnw2K5nlWxO3cNfmF/OlVHK41Yah4NMKajFRWIEC+sPhshiL6Z6JYk/3OafQSrCQwkkgRFcc40pRyQ5DYs4RImK2tDDBaA9YEeIWCCBZtXVW1NcbWg/FofX3twsV6OBmO16abW7YaABkydVU3jR3UVTMajSeTSVMPRuPRYDgYNAPnve97EfEMAkJIYYOfDY1u40aQUDUv7NmJYOgnR2gQwvFQ8cFJvWOY0VzvHx8QQpv8IAWhSz6RgHjfVxVNmmZzPLi0vjZqjIjvl0vult3JbHZyPD+dzc5O5vN2sVi63p/Nupdv3v/04tXb9wfzvoWqbnuPxggTc28JEcAw9a5j9saS913TjK/evP3pr377+a9/fe3mdWAUEHYOQ9EUAYWyBsSePTBXRLaqq6oJbZcEJOQ7UDFKBqXKXMeFJUQwhIRkQrKmqgyKCDJZe/+jh48//eLajVsA0C+WGBIToVlpbIQVoeyK5dac2WoWNklhUEK9CpLvDU4jAZMUE8Oq9YeSSvprVjO9IueEOY8hBevFTVegTHghO7ZCyRKjFUdZ3kmkNBfnWCkJVWQCKyMu8erKUJNKF5gv6aPGT9FpJxo6fCSmXmLnaUBBDmdXk6BBCgS2rSvX9QCGrB2Pp9bSnls8e/HmwpdXPvn1r45OD5/++bv3u+///PW3zeZmSzhrl/Nu2Trk2jJSjxYIq6qmWDrGjNjNDt/8/P3znz+9cfPqeDIAY730gOhZALiyNZEl6rywNTRdmyIRMwKRrare+dPZ8uDwpHW9IAABemICYEEBZn+8t/f6+cvjk9O1C1sMCGjC9vXYAjNIZDBWqCZNADX0zUY8AXg15cFH6FIiQEidxbwYYGgjXy7PCiuDAFCcSp8Rh0ApKH+FOMxl53nAeaGzHIU7nBPalXfjdpJMJJWGWaWnMATFJ3WAucnW6hiLXNyqOK8iJNEumQAAYA2KaYhMODJUyTUyzWAwGAyruhmM1yabF9YuXBpP16vhqBmNiSpBQqTRcDwajJpqOBlPBoNh01TD0aiyFkCIiA057wHBGosQm70KhBCcBZiIdBM4IAMiGgBhYOSYRgvbAggBJKZ8YyVdZiZQz+kxiF5ExBsyIOy9Q+DpcLQ+GlzcmA6Hte97RBHXd7P5/PRkfno6Ozk9PTnd3z0+m88F7P7B7OW7vXd7e/OudeAFgCPN7hF8TAeyVMa2fYeGmmZ49dad+x89fPDJx1euX2sGQ+8kHpEQYbh4EWbHhkDAGAMs4sE5j0AiRGgIEcCKsEEOu2CQQ+PrWOkKAIIo4pEQyQSdMeFkcfHc+8vXbn308eOPHj9ev7Al3rOwDTEnReI5bZcLokuoReyxKjPmuSKJllFOtKChIE/UYCGsiJcKX0oeZZHLV0a3U+LibMGjNGP5SvnJrAQZ0he7siCoZ2qnkr5aSXfR8ZUhAK58wTmElcgxhU2oWC5hNxVlhLKgKN1cikQEaAkp5t728dsE9GhwxbyxgBkBRDz4GOxYsgxiCA3StJk0gzsn796ddoubl7a/+OLXx7uzFz+/8OPhm93Dtc2xd0trhcZjUzXGjADOGDqsbNhwD+wAQcDv7bx6+fzl4cePJtOBQfS9AIBnb9AgCogHERCuDQ0aW9fG9y2z9N6LwVb82WLpgvNlYZCwVxNQyJhuuXz58vne/t7V2zcQjBcOIhcP4AmgNAhHWKeEXtPcpIx9igUggyIAQcKVmcRAqVB6JQPqtMZZuLIYhBIuTIuRrHe+UO+d6ceoVCWhVDxCSW3hKrLIEUI0X6ugohCrFcijhlvvGdPSuPooGRBBeuucnqrjCImyAKttVZMN/fvDHHkxdV0PhpP19WYwGk7XJ9ON0fr2ZH3LNiNb1fVwZKqqqpqqqpt6MGxGw2Y4HAytNcaGYhoRERYfD8TBaOeRdBKLoYT2erGnnM9PgWGXVviD0omtQQZQOQAl0SK0QYskiIYMiwOG9fFkYzJcHzSTUUPgfd8aZL+cz4+Pj3Z3F6fH89l8uZjv7+8d7J94Mm93jl68eH1weLx0DiuDJpx47EHYIAKHtqciwNSY4XBy487de48+efTos+s3b9V13bvOUu29t8ZEYwnxBGMCCgSXscjOua4XQY4bHU04l1HAYThPgGLlD+nuUzQEISGMhCGBSAAE3vt6MLz14YcPHn169eatqrJ9sMNh+0yMMAAJtH1rlj/dexPkIJ8rndF45PpF0wKrAlbYc7V+CV2HZf6lbKZKm+JjBZMfIgsoi0fL+xZ3U5CUb0TJcEJB/erzBqkv77OS8C7pWR0HJNCJOUBCfYYysCh9gGTLkMtPAJJzjKYm5hmTJdB7klBwxSGqCed6MiAZJAEIfRlBKrJXrl0/OT7lixvXrl5+9PjBd//8z9trG4v5olucXJqOqWlO5/288ygC4oCEiFxYRCRrjHPcnZ7tvn//7t3u1WsXmmHd9R0hcuheDyKeCcWLN4gUynksARBYasZjD0wWiRkQHQqGY78Cj2UAe+iWy7OzMxGIZ1TEtzUOREAEBhMZbgQoBGqVBomLlhCrFJOqwFwrdaNvUdNXMv4qWsnGS5KXKOaAybUnT6RvqWykyoFCNpNlgrygUt5GhSzLF6oWKMkKoODil6Y/DCsDqXIy8jjyB1YcUBxkzndAdC8JK9mmqYGIKjSAtmrI1NVgUA2Gk/XN4XAymm4048l4fWsy3UBTExlbDwaj4XA0rm1dN82wGVXWWrIiPtzRMQOz844Dbx66ZlJ6/jQe1KBP9R1BzyYM2hqSCKjhEqvTjJ0Q8q4NFsFwEiygoGdXE45Hw621yebaaFSTJenO5iD94uSkW8zPTo+OD/YX7dw7Pp0vdvb3j49nR6fLnYPTveOjRduStRDqa8LRWno4e7dYkK08yHRj4/rt+5/+6vN7H358/dbtydoUiKDvBNgQxf7AHKh1NGhEWLxnJGFhz6ExCRkKeRHvGcO54bpglOB/SAoKQCTNYhzMEiJquHz92q07d2/cvDMcjb0IovHsYm0CxaIxRCx63mtLmwRcJCdYIdovQT2HL/oAKFAyJtUrFw5y6F06h9WfbLppVUtWocqKwVXNLS6TZJ8hDzwiGETtKxqQRgJ+UVokITCJDNy5ESY3FQeGyeigPly2OQLxPFuIhh2hMBgFmlz1odHoqwOKAwtytoL24reIiJdwRLJDxAbMYDIgak9OZ9tro2s3r12/c/3Jqx/PDvcuXty6fOXCbNm2i/Z0ueydE/aEsVuYAMTDcxBE+p1379+9258vu+GwQhZENoQi4sWjMMUjwExVVeK9iHeuF/amrrrOMYaScUEMp9cKhKozg4C4aOc994KxdNsJV6RHdahjVmlaXfbwDzWiuCILoEsRZBezwUyGW1cFAVL/OSj8A+R/YCY6MY9Dw4w8xLRImRXM/0/5rywjksejootYvPY/+cHCyv9yTvD8C39l2opfsz+MU4alGul1CCC2ahoCaqaj4WBgqtpUA1NVVTNqRtPRdG04Xh9NNibrm+Px1Noa0dRN0wyGzWBgTVU3TWVNmD0vSIjMLB49h0aXoQ0nWEs+lvJCsBpImE4qDrmBSDWTlEsMBWeamOqAWFkPzmQQiseFESEyOxKpiNZHg83xaDoagO9834rrfLtoT07b5aydnS6W89b1fc/v9w4PZ/OD07Pd3cP3e4fzdiFIrmcjxMYDS2i17F1PoV8F8mg0vf3hg4ePvvjkV19duXalqmovHnqHSN57a4hZomcTEIjcmkcyxrCgj6g69JBmPVxEC8owsDSAICHuSXwdSmhwIVVlWJjFr29t3/nw4YcfPt7cugggBkgM6GpzyJIxR26EMvQ5DzMKTBA5IAGJveO06CV9IroFUQWAJGsIWl503qKnj2X49v9D2OOKF9J/7sOl4iYDEL9aZIVNKm6HCMVhfZQe+pfZvPBnsDISTcKqk8NYKVh8JjkrxLjAqUo53bB8Qj2SDeN9C9MoyYkq9xwiKmMNYEiVnXUdsTvbf4k3rw0m0xs374n81+3RxpcPH/7qN7/plu4//eM/zb7+4aSdSzjsAkkCzyreoBFmlO746N37dy9mp48vXlw31gJ7GwEYAwih1AM7HFQG2bsWgNkt2m55dLA37+eCTGR778KRIUHiQjNnEbH1YG19q6pq70N7eQzSDFpZBZB5iPNyEMQjhvgrSx+QR7KoqzKZvCuGTaOiZVacsl65UDiBhwKmZ+RRtGXXFGxxcdpWmGVYAcHKgIr7RrOX3H0KJM7FClh+9rzHyoPRmcyOL/5dIJWVB0teaWXUAoh288KFwXBUDQb1cGSrBtBWTdMMJ8YO1re2RpONwXg6mW42dWPIVLaum6aqa212H11xnFmVZ4RQhmMhpn/RxJdVj4LRiaRoMOlJ7wQ0MEaAUO+e+rhH0lUkagIIIgkgIXrPHtgSEsJ0aDcmg8qIuNYC98u2Oz1dnp71i/lyPp+dzRaL5WzZHeyf7B0eHZ7N3x+fvN553/fegUeDhGgrG6CQsBhANNT3LAIbW1vX791//MWnjz/58trtm8PhwHsRcV4cktjQeC40/w8FyBCJQEJCImbwTlzvw/42ssb1DlGIouGKUCKaJ0QiDJ1aRMJRywBskTwBerx8/ca9Dz64cevOcDplZhYft0CLiIixFE6/Cwy2QCluWMpYVsJQMAB6ClD5/rlKiSRisVMapN6/q1m4QprPifWqiqhIqxhnHPA/+cmOJIUAUbdWk8KhyCN8gJJupN7BoBqqdzivu3rfTDEpflTsj6iTo3gFE7osjL5k/5VrnPKO04BStWpEViYkFBcAiEfx3lsy7EGc9517c3xwcbJx/aMP/+7v/72F9vMvHnzxySeHOwcv3uw9ffby4PSEKyRbB8RBBoFBvBCh8/5of/fFi+cH+wd37t4woaMWAnsPgX0ksIj1wGJAFcLGEJIs28ViNhcfDiUWYQB2QigihiiY+cnmheF4YqxxIR6lsKEzTzKem+6/stBR6nT5iiXGFZiRritiCwRNrRfkUIHY42vJNqclUhnKf+gAy7VPElNCh7jkpakuZFIfWNJYszsobXWhdCVGSlgo1sLq1eXMSbLxZUoiBLsroZRGwSTA9vLNO2QHpq6bwQjR2qoar683w1Fdj6brG4PBpKoGg9GYgJpg+mOyEDyHBqHE4HV2YoNmIsJQqav9/QkpwoNk4xXhRFufVlnyIlKcq1D4w5hwVaj5ETAUNvUFTtHbiiojY9tsr08nQ8PLhevZseO2A+/FOWbXtu3x8XzW+t394/e7x3sn87f7ezv7h2dt2zuPiASmbioGBudEPLJQZQ1VQDyZbn3w8ePHX3350cNPLl65Yg0xMBE5J6aqyGtMowXuggCB/QdgAAPULvvTk7PlsvPMXjyCATCh7i+dHwZKkAkBeCATJlOCn2MBx44sbV64ePPu/bsfPlzb3ECtFCUgoNgZOgQgiCp/mJ1vkqgCxov+mcCCdsbF9AKkHNe5ah9O+gVFOC2rypPVuLDacXTh0xgFNonzymBXMUywpxrPZPdWUMiqIFi+WA4pWFWQXNOkoD0PLg4FJRTCRtuj7pElz5F6ElzR2tX6p5ivxjTCOMzsiZJ6lBMMmg4SNGRD7wMkQ/Vw93juxV69ffP/9v/4vw8qe2F7fTwx5s8/TNeGhA4QSIi9AzCABOwACC2i8wTi+8Xezrudnb3ZbGEtMfiUeCBAYAYSS8ZWFfS96ztDlsCAkHgwRCJghJgZxYCE/FS0zWsXLl65dRuNAXSBDQ1Ht+qEFFMsq38kocTy/XLp0r+1EjQKnUJ7UJxfcoPJnspKCCwqMaAwU1Q4ktSvBnJ5eVNxnK4rQC5HTb6qBA76lVio3cqnU5KsyCSUs5KcnHqCFXhRpgYKxSkukwhdsgqL3bx805imHo3Ck40m0+FkMhgOm8FkOl2vqqauGjSGkAzFoxkDDU3hTEaRLPACSJr1kYgogtUIhwFFRh/BIEDcGh4DQQR9aM0Vqe+KBXOhQ0KM2yNhKgAB1SERgqeKyIKfjAY2nj3H8+Mj9D2BuN4ZYXayWPRtL7uHZ2/3Tl6+eb93fLxzcHRweNh7BoCmHlhjBT0JeO6960MTC8c8mqzdefDRo08/ffTJZxcvX7WVZRYQZpZ4EoAJG7YAkOLudgAy6NgjBt3g2dl8b/9gvpj53pEBZi/CAbBIrBwBjBU5ytlTRqLGVuJYBMiYK9ev3rn3weUrN5t6JIIGRQ+YEUKKB20UDERcquxpUxybcKkyb6nQrECwKyqqgp0+rcgsdvtSFShLb5JWQYZcmRmPwKAAzMkVlhZ0xSiUllpZkjRkSRh/JTzXwSXqXQW3MBKJgExXYnQTxffnuvOUDMB425JShlQJHhMP6kEhA8BkNLDweYUbVdVAQSEQYRMOHUMyzYDQHpydDjY3bly7Mhg0xhDz0lS8NqkHjR0OqtYDOzaWQBDQgDgUYfDGAPv25HD3/ev3J8fzi5em4F34TkuEIt55qIDC9hEE8QKCFqvG1oPBwJ52fSjaFiMh5IXoIQFg3IynozUQFPZAZIiAVZZQMcYvcjt53fPrEb6WGDlJXOHMI4eaQXNmNdM3JN+qK5+WOC1PkrLcHBRyhJelQQFEpiokfzI4p8IgS6qk0F9TWTaIfnwVV62MvLTypdXH1XcTQyn6vzzfkv+dwxERADvdvOIZq7q2VU3WTqfTqhmsr28MR5OmGQZmPZgniUcCsLDE3mSqGBgfUsJJwoAQLLQ+lCDEPp0A8VCTQvPT5BXlHbovFLWvdlwKE9pSC3s2CIJI1vS9d84NhjX2TpxrF3Pj0PAA+l5cL+yEe+ndYj7f393fPzg+Pp3v7B6+eP323c7e+9394/lp2ztAMmiMMWSQBbuuBYDKGADuOzeabty4/9Gjz7568OkXFy9essYwMztPlpjZUsiEkVAK7QEABZGMYYisf2Wr+Wx5dHLS9UtARgmpgXCUI0PYuxiMuEoSmRA+iyCCASYvBH3Xbm5cuHHn/q3b90aTses6IhvTqgzCoS9vNCzpvOtV47lqAaWIEUUrxCJ8UJuYdADzr0nlCvQNgEDasiTibL1X/KFSwPXu6dOFWCezWNhtvSumtzGLYZChUCkQrsQCTOnni5GGhyDlfDUw0IsKt5eeISG6gsnJkE33Spefz1O+yjgUz1+6ONREWLk+8UIBAPDMIGCtJRRkAKzO+m7/5OhyvWWrpm3bnvvhqBlOJnb/2AkiCkEVantERMRD7KnlFsd7L35+trdzcOHCWBC9dxbiV6CIc26xmLfLuqmsSOhX4araDocDoBMAIQBAZDTM4TxxkBBEoGsXZ7UdhMf2DAbVKub5K5cxTTlkr6rzrtYsgs3z85eYsrRaEdfoh+IUBwJQ0skOhVJopz6AleVJ8EAjDfU7RcyY3UhhwqAYACSLG1/EaBzSHQRShbGKSR4EFn8lhwKYhaaYvtJTrExQFM+UzMpv2fXtK95LXdfD8aAZDJtmWNX1eDwhstYYYGERMigMYE3MQJUKjAIAFPLtai3iYFPzfkDAdCygIBKQ/hoKeAA0CoiFlkhhiwclVKSZ+NgnNmz7tVQJCBFapMaS7+jtu/e73ez6lYs8HQ8bKyAWkUXOzua7b3YOjo52Do5e7xz8/PzVu/29N7vvjo5O+3CEJ1JVVSbvQUZDJIiuc8PR2q37Dx98/MmDTz+5cuN63dQExNyzESSswtA5QRoBBCLimOQDJBTHBozv3dnpfDY/a9sFoQAKQx/jHUQBFzG7ThqCoEEQFo2JhBlBJpON67fv3/ngg8vXb1TDIbuegS0ZYJTYRFDlNFqtAmqVupLkN6Ou/wntnqVQCmlX+StMrNrfbP9XMrW/kE01+cW7hWapL/ilqEP5kfRlsvoAyZCsQCWMBiVacw67PXT48YESlEo/+WuSJ42ohChdjfkfK3gmjbasIk0DVfeGakRW3k4ZjCKZEb6GmYUd26rpmQ+OZptr49GwsaZCamo72NreHOwctGdLJAtMJODZgUioMQAQi+T6+cvnP7968fqDj65aE84rIIPogkYSesfiASyK823fsTBZRGQQT8aGLo6u9bFDW1wD3j/YO9g/3Nq+3TsHmCB0evQV4PqLH0XGxRRADp1WGZlUSrI6bfpLpsnLBH6UR8wBa2nczw0PFU5gIftYpCaKkDeNKkq2wgy9ZoXcwQwHsBx24S6wjJPyiLJTSXXK59QK81/JzRSuN04kItq1jW32Ug+a0WTUDAYh2YuhkAECJkU9wFOKfgB5MAiIBIQYrkWNGKBQllgGgGqQQp6LUIAo1vHrY5AejouIZPTLy1kIfgwNkXd9gG7D4QhYdnffPv3xO3d8zO3d5ebW1taUpKuo6tt2djY/np29Pzx89vrN8zfvnzx7vnN8eHJ6ymiMMUiGwFR1zd4TorAwO+c6U1WjtfVb9x5++pvffPzJF9dv3qzritlHw24MiIRTYSlwsvHU6bwaHM+8A1PbbtHuHRwcHR64vje18X0foESkyOIp84AQtk1AaJPhQ7MmYxCRUbzI5SuX7z94eO/+w8l0jV3PwoaMno0XQqfYYVyPy8sGB/OqQZ7PpCTpVyjMeBboFe3S3G8RGYCiGV38nLDJEUTAQPF2pTbnEolV1A5RKX8xmvgsIbTP6pnoX9FRRfEt9iYESBFsPabrFAFm85/4n3K6cnVKmlXJ+W91udntCOh3YHzKZGryF6HOnXpidc2iSZJwy7CtL+iYZ/bCxlgW6DrfLlsee7LUNJWtwFoYDpuj2QItGaylcxja+7KeRmgQXLu38/zZs6dfHHx0+cqmZ2b2AmiM9V3fg7CAc77t+9nh0Xx2tlguvTALI5FnsXXlA2MJAIAIZCyCZ7dcHOzv9d01RURA0aYU1dtlqj75eEl30/eSF4jWcpXpVgCSXyhyxmnmoQBDAUhGhjXVSWOQZMHkCzKoUTNNRREwlFetGFq17IXpTVqRpTIZu1VnU4qNuqmVx4XCg0F6Pzum8j0poV201Mm5xHm2w+FYBMfT0Xg8CgdwRSEVRoDK2gDVOXIJsX/Aik8K3D5CSAUlusYgARQpL0NpmGm6iFKtbnAJ8XkQKMX9iR6IphJEC6aRDDkWEnGtOzg++uM//MObNz+brqsaMzs+e/GzW58021sXDMLx2ezNu72fX7/7/ufnL9/uvD7YnbfLntlaS2RQuKmMJWLidtl57xx7IDMcrd2+//DRp58//uSzm/fuDka1AKJjAUYCAxhVKU6tAKH2VQRhDv1PQMAQec8nJ/P3OzuH+4eu7QFBwh7KUKlpMJtDAQwnIEvalgMI2HvP3k83t67fvHfn7odXbtxqBk3neyMo4gEtYdhjryarLHyI+pbFTSNIUTUpNkoVMlOsWHhZaX1Mlj7GHHHsqOKPGbElOh/Km/5CmZXvy+CphIGYze6KqkGKmWX1AimuTEoSBqRAGwtLjiuwP9umqFalsS4HEacY9Ql1PMVFObOxqu3l6KKgS/FrcSZotgkRPYWSewHCCq0IdD13DYigsCeDpqkm62NbUdfORtN60SKEfoaeJBVASWgSIsv54ZMf/7K787vbd6723oWjti0ZJlOZGsC43kvfLmYL13vP3HY9MFhb9R0bY8X7gN8oFlySCJ2cHM0XxyIuIBwREgriUczxyiSUE652PT7vCi1XTKNaFi1JhtIu6cqWzGX4K/ogLRsOl2B5TRhPlq1zFvrclTo6UR9VCns58DKMSKmqXxKCpWCtvJzDeb1z5sajEVrFbOeHGovT081QhO10bR2tqQkNEMTW0GyIyNiAxMkEJllr1VEw1iWCKqzKL0IgXVP+BJM9RxEAo9MvYezhGkrymKGzCCNQPA+Oom4E3iewR4To2bOXyWRUkTk+PHny/bf//E9/3H378uFHD/d3Dt69enVysnv/zu07t93W+sarN7vf/fjs+bt3P79683Z392y2RGOAA9j3hFhVhtl1fQcIy26BgGsXL9776PHjT3798JNPb9660dTWew8iCOQ9G0KhhNAg1EAKhEamgPGEeyEyfe+sNSC0f3j09vXrg90ddvEMF4BQoQEiYIDCsReREhMAwUAlGWMYhAyiqa5cv/3Bg09u37o/aoaePQUnIijMTAUcivu9k7oX1EUCypgkt9A5hT2g/RVA34qIGCCtVM4BYCqxDK+vCrQUr2a4iyuagmpLFT8rpZBbgqdAOZvYKGs5o4Ggtz43BCV+k34EtKQFiYiFTYlPV5qOpHsaaGQ0uqIGmWgQneA8AVCiU0gTC/nRV6FV9IDRVWUUG2PxoJ8Uir4cy3zedSNvRqYejkaD4Xg0MkgVYWvBkEUn3gu6WLOFgEBgxTi/3Hn54+sXP3/66UMDyJZCyVBlLCBbWxGZvu1d1y9mi651FqwRqKlaQhfRDoOIeOHK1mKo71orZMiy4uTcnztOfeQFMc/AqtWHLAq5riab6/BG9hmQ3IooFZ1uxWW729IvJ+ZSIMduOQArM15SlGvlO+hIVDcS9tVkZ6pxiF5NdyEk8U+yHa7hgpAqZTUNOAuEYB7FirikP8/5DwAASS5DxyBgB3UNFi2ZFBRUlY0b62OuQycFYxCBKeIJ1S0JhOVp1vbdqO2eMhzLn0/6FEBOXFdVrGDZov9Q6p9FgABDsxwP3PcGbNf7f/23b/73f/iHp09/IsGFw+9+fPn+1Y9OHEMDNH71dv/Fs1ff/fT8xZu3e6dH8+WSY8cTQCBhpsqKCJFt267rHdlqc3Pr3qNPPv7ss8effXHl+vXhcAiE6B2gIEoV9lMygwgSRS8FhZ1FICTHXkQqUyHgyen85ct3r16/m58trIV20QEwS+jzHJoMeQAEg0RIgGjCEW1ehRnbZXvp+o17Hz346PGjrQuXsLLSezAgXqwh8ZxEUIU5MSwqUKI854pkFVZJ80Qh7jgHTgpoUnCTCl/zwpfmWuFG/l2tfjLgUU/SsEQlLWnGiu/4BTZK8DwnxlJOF1R9z2O87HcwfTZxQQlgUrbikN7D/NjZWao1w9hkA4onUvenOrs6eIjBWmKJz883KO8aS1hElwdAQiceJELovZu3bd+1g+Goss3m+tbaaLq1ubFzfDxoGs/k2QMZJMJwDAEIAJIh42R2cvDjkyd7b393/c6W8459RwK2Mq717J33hiyiQWGprB3U1WQyMocLQpLeh46/IkxhrxkzVfVwumZtqNLQSZZi5koRLCcyL7j+GdOdmKcaoMQwOa5M61bW9ReClZdDMspJcS9mCFFa9rxuUQAkL0iw1NEcRy+VPEIy8aDN79TdIBYLW4pjlAD9M31r8az67RE66z2S78L05frhc+oO5SyFA2GaunbMkQ9jEQhNP0IJOyBHgdGvTeuZb4m4aitydiISC/F3TsejJh8mGj1DKDIKw4pxVKTkIjZL3sgY27meAY2tRsOKvfzw47P/53/4Dz98/29H7w7H48nTF28Xi9PdN7uNreqfX50u3HK5PNw/ev7i5fv9PSdMVUVkAC2Q6RwPGzLWMIj3S1NXFvHCleuPPvv80Weff/Tw8cUrlyprPPcGKwlcvMbgYdjRb7JCFn3CcLBeUG1Ec3x09vL56933O33bcjD4xAIejBNhEAcIwAgmcD8aqIU2ucx91w+n6x88+uzTL766ffdeM6q475xzVGFlqmSDVjGu4i3Vn4SLyrKTLBbFP1Yq77C8Z7LLxYdDVlXUgklioTCpBBZsSyE+yTeU/E6MPFhvXUIWyNOsn9Qz7c8xL4VCyvlHOGeFk8lP3qCwSauErmTphjSRUYClmJkUzBZINM7r6ozmaUBI6lJ4K7WD8ZsKEArhAI9gzAENYuf8su/HLFRVG9uXr1y8vr3x5mTRIVa9A+9ZQpcSCW2ooyEhg8vF6V/+9M9Pf/uHazc3w14ToAC3ZNEuvbe1McPJUJzr3fqlre0Lm5svX+0bgI69rWoCBCIHbIhYPBJtXLi0uXkRyYrvBWK/LtSS5/MLVrhwKMQAIFDyEawq8QNRySSsPa3Mc/owooR22wpF1dLkWdUgUGU2LnSmcTCt2Iq0FNRLHHyoYtHniK4ZyoFC7IwmijUAS/eUZLWAI8VzaWYvvaTzl4b215R15SUpPxxdoLCAtXUF7AN5IMwUi/Ulfi0BIcWDe0ogBClaBkWMcTHLuQr8X5x2UsUNzxStXKTjQFFl8ZgBKMaXAogTAWYxZPuuJxIQfvbs/X/4j//vP/7xHxenR37pFov+tO0A3GLZDQf49MXr93vHIHx6ejqfnzkKPRmI0LAACxMCGvJeXLtAQ2Sq67fuPfjs889/9asPH3+8sbVlDAoAsgdga41aGASmiNnT5OaKb2EORaAUznnp2vbFs9fPn708PTph70yFgp7ZEzGLB3QRq5MgQDiPM0eXiIBCprp6687Dhx8/fPBoOl1j3wFRVRkQRgPeCZFJtl6i7uQd7ZEmyZmoZKFS1JrxTlY0OLeiSU3PiRquXlCKqpQqX9xWEXoU8ChXqVFR0o2kLoXdzzWrBbBLpjIPJ8XJ6WMpy7LyU7ARetZyUhTFZpF3wtK0/xX+NlHOKz/ltyY3kR4hP6ekb84fTWMUKGKEcPhpnnckQZp3/aLtRKCq682t9SuXLq0NhmNbGapnvDTgyHsw1jOHTizCHpBDbL1/uPvdjz98/NlHW5sj7x1ihYDWmq5bOFfX1kw3NtGx991w1IyGDQB776iyXjwQsAdE45zzIrYZXLtxfW19TUKrX6MkfsAo5bwrflTbrwY5GhzQxJWkNUwGPFFxoCuU7xt8bXIZKeJUBHKOYInzmTzwCkLJs693wKQ1GA6qoYTIEy+YQlAp7qLv5aCkXOOI+5LG5g+sWvWsRKXbTFYo+bT8zMmYJLCSZh8sO0+EZJCQ+o4RAxcV9nnFOhII9lcS94pxYkXfWJmtQAlG0AIYfyHAsKFdUnlKMj76BQU/FJMJ5QQFviUgHmttheZsPvsf//TH//6//cd3r16NBtZQ43uczVpjiMG0jnnZzhZL8LhYzK0hJEtE3gOTB8DaIhkr4smY5bKfjDeu3f7w0199+cmnX97+4N7a2hCBnHdhDCJiKOAiJJLk8BEMIoZOXXG5ojFDYW+rChweHJ8+e/b81YsX3fwMoPfOCDOaMDM+VoJyKMAzAXoZRAYBYS/cdm66denehw8//PDh2vqa65ZAwL034UQAEUKBeJImoh4olDBFSsiU1KH+nNMEpeX+CpBQaQSF878wo/qx0oMUQr5i22JQGd6KRkDFqLTbyfgHsJGIkmAYCmOebUJBq8Z3MhuFmV1SwS5UTNQJ/cKKl/S/okPJ5RARK2Y4pDF/AgxpHtQaFRBS0iqdm79iFbKuZwqKBZCBBQwLe+HO+fly0Xd9PR6ONqbbW9NxTdb7UWNQmn7ReUCPBhA56lkrKMQCRPOj3e+/+6cXTz9e++yRRcssYmQ4GFYIiFSNGvJMlbWNFRAhYBBmCWdNG0temD0DkXiw1WC6Pl3fWENCIxSr+OJcpfrFgv8Ie0bzPEMhPyDCSKSzjnGBc3UWosYyCeskWJ1J+czS5fuvGMw8t2qcQwo0rWAxLq0ailF/rlzKwxMoRpx8fhz5X1nVYiiFQzwvBfmOOXrA6DDVmqog5UQZqquQ8j7xn7aqLXOUB2tNfFuPiA+lh6CMROFakhdRMKNfF+E8QKyAyYRvYrHSaijFE1YvHYQW5yicvBueJ8+vsHjvK2u9k59fvv4ff/zHpz9+b0hihpsMiGGpGBbLfsnUSOed9wQihL4TQkYywEJElsgYWi4WwLy2dfH+g8effvXlJ599cfPOncFwiCKAJI4BgYXDPjaRsul4DN1VVgAk5LuQkLxn8YAWew8v3rz/+fmLg909lg7DduHQJBE6DBvvBQAMgAEgkZ4QXditQ+CYq+Ho9v0PPvro0c27d5vhoGs7MjoMwdhOvjAoJW7UYRWSF4Q/z3OpbKVtLGUTAFZKhTCuDaTVTZBs5fPx6r/uT7K+pzg9+nltZAFqGlXgYvvgeDIBZrHP3ifGrznRFL1EqcLxwYPcYTFlorFS/LJkQbJXORc7gboXzGqWeoxGO1PotM56uUpQDLBU+L/uYaWY4qD4BCQoQo5x0fWL5WI8Gg4m482tzcm4qSsUa7yX4aCR3rdLByhSOef7VAGLBn3f/vTDNz98//0HH94bjy2JGDJE0ti6Hg6qpupOz6i2pqqoqpkArGWYG2ziU3E82ojZDUfD9bX1uq5ZPCMYMoHyLPBe6jGuMpAMv1L+0SmikueYpkDnQWc+/0OSaBTXJF1NLlgvzIRpBseFKqTfS+FBXVEplxQg0OSShQEhBjdqmpXMPBcjljZeuS7IJq/wTel3PP+5ZIQlXSGlL5NfTlr6gEUADIWQmn6NpgIRRXxoYxAseTLPAiujAF1ARtSNSJKObk2HZCtJXRLQWU/S90YHm7br5FNIJHBSIgbJIp2czJ58/9333/6JXTeoh+LBgzA7MMxu7mXJ7DoGEPRdjwTet0jWOUH0dW0NkfPO9b2t7caFKx8+/uyr3/760y9+dfHS1Wpg2Pne+3BOAhkEj7HSB8L2Bd2qBpI2FcZISAuNgdnYSgT3Dw6fPvn5xYufF2f7RhxiD1gxewi7wIRBDIJFtGFfp7BjxMoQGXLATvzly1ceffb5hw8ejMejZbskQGEgY8K+MIDyqN5A3sUgWg8zRxVBtaVlnAgF1kg8JmhtXelZSjpHfV8pzavhqup3sdaZ3ikMWZaf/ILkkenv4V9UxgqpSYYoEBQ5TxikWp585xXbG+Yq4q5oDpOxiKhDK0v0BZIiXoFEVQnkgpWV79QkQglBNRjR2GLl+mJ+yzkIOkci6Yx0RBAOwMl56QG6nrtl7xzbutm6eOHq1Ss/v3l30vuRHSxdv0QMHQUtkudw3kzYwogAcLy/890PX3+185v7968ZEGPQGDcaDwmx7zwzDieTbrlshqPhcBQ68Ha+F0Dv2Yco3xhC2ty+tLGxYRA8i8HAh8aTuNQq/II0KG1nEh09RybEGTptkuvH1MZHwc7CWfjS7M2z512RUxVy/QKJNjSDVU2JYQ6+BLJoBBuQbXa2i6J+IFIfqQQHRGU6baotXBnGFUl4IplfWCUZReNXBdEluZNUGBBEWKc17IMWABZmYQuAAOw54p4US4SDN6OHLicrfjHAOXFX1Y6NwTg62UzxpQcMHiIk+jCvYb4otYFD9dcAzCIijEyIDOyR3++++/PXfz4+PKzMAKl2bUdEzJ6lE1iAsAi7VhBqBEtAIA4QEcUYI96ziHOdtfbCjZuPP/ns13/zh89/9aut7W0WYHaCYAgAxBoCACQURgQOB5NlaUmOE0RAPICwhBZ1zrMx4Hr/9KcX3379w+77t8y9AQFrvHcCHtBjWA2kEOQKCwALxE1c3hjn/drWhUefffHo448vX7liBxX2wM4BABEKgiAKggkJliKMjv+iHBomY6IAtqhvKYmUJGGRkuTEzCWZhMJFqJJkVSyMXAlMIqSLbiTJsM5d+Wv5D8mPtfKORPFXn5vejeF5aVByvAyq1iUNlMMaBMgNJcrvzp9PRHXKTaXpSAR2hklqFFa/LzcNTS+Bqnaaj8xuJU8W8mTJk4RgM+xbBCZDIqZ1ft523rOtzOb21t2797/56afDN7s4GDRVTdYAEaFUWDvumRGBBFxYYvHt27ev37/fuXv/qqkskK/rajgdVSgEHodAgnYwmq6v183QVpUgOMdojXM9kgFgEkTE4XiytrZmq6p3DgiMMdw7NEWNi1a+6RNrti+u3vmlj+kXpbwTSoRy+pLjiPkD9QFSziGUcUe033mFoayaKahHiHEIRtHR9QoijZBJ31yBmnxIcTvK6BBUCiULpcqWfkuBibKkJGucPpu+ICen09hX5iapSlAXg4iIVsJBhJINSHpurXHKHhcgbezK4qlBdIKMqU2QujgASR04UuiXRxprgjCtliQ1w+TFAmICQbKGvO979/b9u739fWOaemPqWhFuvPPAHUML5DDsFRBGIIMDFhFx4LgiICLfdQ48AV6+fvPzr373N7//w+NPPp+ujb3vgaHzLQCSblmIBbph+GHaWVgdP+luQgFAzZsLQz1oGPDw4PT7b79/+uS75fExgQMw7JyQAHCEQ0wIBowFAEZHIohoDAlI37cs5s4HD7/89W8ePv64qW07W1BlIk5nn0QiJuEzCaM6UhjNnAoLalikMyGtigoA66sZSBRkS1ajVRWEX764orrp9vmS//9+CrCX7EIU5+RNog4qTloFeNkClGNYuS3q/CFoS06Iwo+JFwp/UHl9RFhxCP+TR0pJbSTNyJ1PsxQZXjin22oOitVVXBVoTwAfbBF1vl8s27Ztm2a8eeHCjZs3Lm9ffvVu1zsnwmjJowAJogdKYSuKiDHWOdh59/7Nmzdt+/H6dEy+bZqqspW16NtFPRgbwEHv6sGgaRpAca5DO/Sux9g/BR07ABpNpoPhEDyDZnNjg5Vs3HPzl2TbEnFf/KSFlXKVdR3iKuRr8gVZ1PNCFQ4j/UurN/Mi6HSH+degd3VUJaCI8hTMWKgAPnc31n9HXSiMusTzzgt0ILHUK+GzUkywuLmCj5XIJz5UYiP0KcIHJKtC8AgiYsM7qLmrIFEphxEtgxRzioTFtGFmlGIQnIsOA2oMh9npqQyFGiMoOwalj82LFdkiBiQQpthT3DtnrZm17vDkpPe+aiY+YGZjfLtg8AAe9BHDYFgQkIDEEBCCMDM7subqjdu/+f3f/Pbf/d2jx59ON9a7zjnnkMiQDQMJBVEMEPYhRIJEEGKJbGxzHWeWwAD13iODeLQVdU6e/vzih++f7L97D9IaFEAv0gKQBvQWoUKyYY8eGQBhRBIBZu8cX7h288OHjx49fLR5Ycu1i65zCMzMxhCIhKyJrnqSreRVVcfCNFDyycWKaUpJw+Mo7VH2AkaiuEio0Amiv4PkdErnIOVKr1i5HJqEO0rZp3yVKkpCnvUPM9LXQ8Wz0ytdS45hEqWllmaFysyoJg0dixGnGgbILGoeViqnygagGD4WnNFqpiVhzoTcyiU55z8KbVeGVGdEJP0OEvoRCQB5Ma2D+Ww+mQ6bYXP1+tU7d64/+fnp3unCoFSWxBALEyICISIHAIsBQsjZ2cmrd2+Xy7aqDBJZG3xDXY1r7jtjqmbQIyN7JgRgRwS9c0ToewaD7JmMHY5HVVUB6hl3yl1hmpw0t/khM0UO6v+CxKW4KM124TyTZJarmADjCuAuplb+yl8rLkOTxnlYq7c+t0iIWRCLgZZXl/xfGctgUaKjOqkyK4p18ldJ/rOkKeNjxG8S1ZOYT8gFykokBXTDAAhWsyy8QvCmQQMwnTN8aleiAsX/tOIQAVKBmoByOZwzvAqmsgoBxCMjNWdSprkYgIITFQYBBvZCBrveLbvOM4BYayvXLVm8lx7AxabMElTPCACDAwFCMcb4vgPDDHD1xq3f/d3/+oe//18+ePigrqtl14r3Xhg9hJajkcuCFfMa2am09zNlBiRAneDwxdqKhfYP9p9899PzZ09de1IBAzo1JH081RdQ0IQtxeEbkdBYEubee2ObDz/+5NNPvrh0+aLvF0JQWYMAiNEzQWixohR4MnRZaOOYk5tNETYqpI1cdMpfJH5hVcrjobsgWTYkCcmqbq0woUlVk9BGsj1psSi6U0UsFQIhMPQrZTnh0EelP7PXilCG8reKmlat0IFStJLalEqOK0oWP8kF/ZW8TGFoYIUP01EmtkmS4sVRaTImVyOm501jSa9gOvG4nFwBEWYdCzMTGc+MHhadmy8WrvP1oN6+euWjj+798NNPx1//2AGgsEXxRBAbt5twIF3w7gjGtcvd3TdHJ8fMV8Z1heLJGENGkGxtUKBqhqPphAFZwFQ1GUIfjmzi0BPL2GY8XmsGTXhqNOm4adH9v4lFEXWH2RCgimtJhuRpSjb1F3Wc2YaqXsa+PkFhQFYWJjqiFbGSxNFHqYnrgRlSiEhay0T16Y75FfEAtbKrrqWQkCSa6XplmRTE4bkL9EH0joFHS9KiD7NCI6WJCcqYj/DiyMLZwLyEtIO+uZIo040WCX2U8VSyNUIUsXb0+oXfDex9ClXU8Kz47IizIJGE8fVQORrjEC8Q4Hvv20XbLrq+84PRwEkF0krfMXgCDmctFmQcC3QEQgDsnGcv7DcvXPr0i69+/4c/PHj8qGkaLyjcI2GFloCEvUgsqxSAsNe3AIGh7zWGOjCAcLY9CAARGmv6ZWdq6Hv39McX3/7l++P9AwQP6JBYhAEFGGJpFRKFo35DokxIfM8oaCwgXb1x6+GDR/fu3R/UTS8u6DsRkiUJjwlq1/M8FtICSXwEALNfTTOfiVJQpYMofAmtpxwOnnMJpehC4s1Lb5BKJiB/IWQRAC7cQNJtyb/FvFugA3F1mDl2DP9M7E36cFIxUdFarfNIGKYw/zqGPGgtCcX8a7pbMfPRAUeWXtIjFsKexifReyk8LVjdcunS82EcrYKwIkMRnim2Z48Pgr2DZceL+bwZDcab0zt37j+8//PO3tHLd3ujYb30br7s2IkhQ8awd/Fm4RB7budnp6dHxwhi66quLBnjRVBEPDMg9AweUKhfdqG3FxH1ridEITBCdTMYjsaVtYEqSC4vVnZEycmYRFdVVKrS4pYv608hXPmCFRuZpkd5CoiyD5q8Sw5+xYlI/isT6ZpU5Yx7VOh0ufD82kG+RF1EUR6WnhCCDVmNMNIMrIxLBeA8DAp/cQItK+PSOKNwiYljT3Y2UkApPAn4u7hTymkU6iYrE1CUQ2mWQT8YELQARGoMin0EGa5GDUDQtEw8ED5l2BBAPDMZDGccGkLf90dHB0fH++1yPjuddUvp3dLxEqFT/47p/AEBBmBjDJB413vwTTN+/NlXv/3dv7v/4UNC6voWJGx2Q0MIyEihQxup4iW/WCBtEQwn57GEQ5S8j15nMBiQ0M7+7rd//ubnJz+45SmBg9Aqi3SWEFAsQIVoRQSYGRhJjDGC3PVLUw/uPfz40ccfr6+vLRYzYwxi2E1aAI8kCpJjxvxaKaBxHfU1JbU1+yTJ+mo/thXortY9i+Y5xcyGWd9QOFMgo8xWqrGMnkVCMURct6zQmCQzmfMC7iNi3gZ8fjSl7chGGlas+ao50bRVVvI0e1L8glA0J8oTHeCuqnMOurPNAwEIzZ4gqGxZX5U8U5qg7BoQEGLpQYq6iogE4lFcLCLMlqwA9x7aRes9m7q+fPPqBx/c+eHly4OTMydSLxbOQC/iHRskRtOLQ0AwgCwicHK0e7y3J96z52YyNZWp60Z6TwDcLg92d969fXM2PwUkQuNYvOMEAVjYmKpuGiJi70Vif+ms3skKRsHLmEofKEplKduYpybBhFKq0l31yrxqKxS/ak+28piHE2sgfyFHaq6jD0uvqmWNS43JraUvzCKWHkaS7IfXZUWH0/fBygMHoROVoxLNqO1MXFIW3lU+HgAgnBeo0hiTrFbik2nWQDgLYcJa+eESv6pgJDthHRqLana4ByfpTjKPmjFQek/HjcXigh76Hly4CIAgIqPfPzr68acXr9+8PZufYUPQ97zskVtEQeDg7nXiAMkDewDDnp14i83jT7746je/efTpJ9ONNc/e90sEIUMmLHMkRygbs7hW2X3q9AgCECIjsIS6THGdM41pW/7xp1c/PfnpcGcPwCOG+3pgBNGsEFLYHo2IQMyutYgg7D27Xq7dun3v/oPbN+8MR+P54kSQEdHmYgRde0n/Li0eQuBJANOyBHZRSXAJfFVg5uRcngxFRa00hrKyhOWPstyovZUl2jeMi5jgFSKolxeJRyaokBZptWR/y781ysZSjkgDxoyKiydJg0lzFMZRWpvChhd52eINlfyV0sWMdnRq8r/TCkXNTZqQvl/C7YKdKmju8IwlWxxdnQgEHJo9aRxyZrtEjCHxXgCdF88srvfI4+n4zu0b929fefvy5Xw2Q/YozN5ZOyBE3wv2LaOEDwLw8cHhbD47m80mo7G11M2XFVhDMjs5fPvi1ctnL588e77zft97b6xxHCxGoEaQvRCZuqpN6G0uYIyJLR1TOZQkCypJKMoK40LCQt4tFt2u2tcE8IuJDXJerH9RSxOiyLQsicDTb1wJI8ryiEjuqqlPi6h+I/7CBUrRN9O+mdIvZF65kL0kb+nF9BERKQ1RBCHR/utgEQrhzNGwZDcVHzNKT9y1ICBW7y9R36OICSRAmVUr5BdClKu7G8p8M8VzGhWmBfI27jIrvJs66HAVYawODmMqF1sADSGzB49AtrLe+WXb//DTj998/83LFy/7vvce+r713AJ6BAcgOop4ABBGDXKho/XVW3e//N3ffvXb3164uM3Sg57bLo6ZQlUPYWqGx+r1AFI3yRicxM7Lcc7YezAIzHVTI9DO7t4P33z/+uVPwMc2zSBSOCYtkP5IhAiEDMAMjowAsjFWBNDStTv3797/cLw2Yd8FG2nQiHA4ViEjn4DmCRNvA5GJCGucYVAGFKiLCPHhMKlOksEscOocJAvGipOOd4CUkS7uovvj0p+a5AqDzKcgF2oDOmIsXQGoPoSXQ0kB5lutjjlfrhXzEh+xvCHGbwrTVXw7RJHQqDY6UTz3LOWoVoy+znPsK4DFJdkVUx5cfn61YGFFgjLF3Q7RgAlA6DfHiZ8ONyAERGSWDqB13HvfdV0zHiDRpWvXP7x/783L94f7p+iceEYBY6iygx6c7yvxPSASgBd27dJ3vetdMxwS4GDY+Haxt/fu5Y/P/vTnPz958vSnH1++fvfOMZA1VtCIRfGxwS0gWWutJWviI6R8RylfhTBkZ6brrs30Qo2DFISRxk2phavEFlzFgheTGQGgWqRk88M3ZckpkEUpGrrKmeYDBVOFAoSbxhhBxT9JdHZy6qPSMFe+ItwkIxV9nHMfiv9QEwkpb5FSdwUo0f3JsYGU5KSTejJEARtNfemCIxzh5GUipZO1M2e8VtxXqRgYfVde9TQrkPhcUfsTnjWmUwEABUPBnEFiAvBRWdnL6533z1+9+umnZ4v5Ak3Vz+bIDNwjOkEBZEEMx7BLVJXwOQbgtY2Ln/7q15//6ldXLl+xtfW+l0DcR3MZy/xDUkwdWwKohUBwfEKQUBQoRIjG9B0TUuf81//27bd//uZofweBESGFFSnjEjqkYNiWw4zIRCgsHrDz/falG3fvf3jrzp26bgB6WxkAL8IgjIjCanOjV8Wyf0hcpmh7UYOa9P65tUoWS51KsvJFf6dwJyiUIQGvpDpR4dKLIivfpzKuogtJqzll6yQN6bw0iYpdxH2KCs+LHsb2eaDYKfqAQNyouoMoHVSmpdJ0JNOQBlLqYSngmCRCobgqYvpwvIJAUoObZP4KcyGQmFwBgHx2TRSbbOJQlQSTpgKICIOggCFils77Zed9zyIglsYXtz569PD0eL5YdHPv4OBo6cMxaGyNiQUOOhrXLo92d9z8bGCoXywJ5XR/5/uv//zdd0/++U9//vPX3x7un80XS7IVMyAhIXgGY4ygdNDXzcBYa0w4qjseEqDzpOtV6BKmRV8NqvTZU+pAuVideyiqwspbqrSi3iyRFsWCIJ4DBAWnpDK8wj7CuctKrxXuo9kZhUDnUcLKBISHKNFUWbAEK14Agl5FPIfBQeaTABAk1IKw9r0Laky4+qUKtZISBX22uUOnqrHoVUHGg2nJ8w6ln9M7qxKEX0NxpAAHJ435XPNwMSa+SG2P6oYOgQI8DoolUFc1IXRd9/rFmx++/u7pDz/uvX3bzvvlYslsXNtBKGqK1INAbGNEhQlzo8nFL3/7h9//zR9u375LyNz2HhxSsEEszACMhCIct8oJR/6CcwY1nNqFBfaMxUKIwtAMBuL4+c+vv/nTN8+eft/PFxWR5x4RRTwiAhMhIFhgIxSOj/EiTCTG/9XlAwABAABJREFUGkFo+1bQ3v7owQcf3Nva2nRdG1oGxWP8EJAAOBzLExPJEslnTRBCMteFjKFamiLCFpFYpKXRRLRd0duGQ3lUQ6Lqai2QyirmuDEJUtQVSFQpRCYEQQSBKLaHDF1iknVQW4arNwIs/iq8kPJeGJvXIiqtEi2qFLfNu1OKeCg/ec4NSLZRK04zedhU7ZbNGUaLINmmaNwUb5LARJoX/aLkD5VLDvpeGIOIkfWveBkCSDqSKKh7EAlkBAfQOnbeL+Zno/HUDCfXP/jA93h4unz5fm82n2PnHcNi2bq+ZfYgwhl/9vPTIzebIfNyNtvfffPNP//p+++++fPX3/344sWbdzvMlp1UDZGp6qruHIPzzjHaQDELew8g3jN7FopCoAeBl+JZSkpe7Kj2cK46Kxrl7EDD1J8jzaL7zB/KBjv5etSRxCUruInSoJ0jXpK/11UN4wHN5CsXEFy55FsWDxdvqcxkMtZp7OkbMOVfAcKuWkzoQQqhFfEIROGlYP8o1aUhQDg6V+FCglqq1iw2TA+kPKzqCyBms68DxOR41a8mnxwvQIyHfEH0ghj2gCdPHlU1zH42D6CIJk5EaLvGYgyxiAFg4f3D42+//+Hbb759//bt4mzmeunnLWIDwqhRczCKqPZOAEBIoDVm8vDTz3/zN7/9+ItP1rfWfNcKikFDCD7uLgbvBZhRSZWwexoBI5xOC57VGwWEgFiYgFwvQDI/a7//4dnTpz+eHBzU4YBMlhjCCCKGMiWLVOlRhp6ARViYkAyCH66tXb1x7c7dO5PpcDk/DVVVlpCjV84EeDIm0fbF8Qa3jcmu6aomvBGsaNznnem2SA7Gh6MCEGB+/PB3sORqjUUXO2tdkpkEvzAhsaBkZRCd7LRksUvKBlpNlCAzQPFLjrdjFxhF71h+fU5pKLhRs1x8jVoDNQ2Iq8+ilhkyesFiGbLNznZIAWGYsFi2m8N0FIhNOyRpmuYXqRiPICJwLDkOSrfqtEUzp4hkDCB0jh1DBeQ9EIm1jaHKda5btsv50gkCVQhpiwdq+Eu+d7P5WbtYukV7urv77T//+R/+2z9+/d13Pzx9OffdsueqJlNRqIcWFgYQBGPC6YaeCOq6QkTvXTAFKjNlGVqCs0kYdI3CNKzIShKU7BKSeuuKpon6pTvJ/kbSTfJvmgbGlex+/kZQnSruCRKXrXwNsqoVbMrKD55jWbPXkiTYwfDyKqtJ6SmThAgAexFgAPRqn5AQ4sm7GCx/iB1YYqs0gZCTj+IEwhZYghhIsr6gwD87KcxTq/AXNJZG5byEo+vUUplVn5IWBFbCaxAIMFxCDgEQEC2CAIR+y01TM/vFot072P/x2Y8//fjD8eHc2pFfzq2p+64FcAAh3KDQ/AAiKCcRz+AA6gcff/qHf/f3v/7t77e218V3QEyA4gEMBI9JiIIkzBBa/WAKOBXFBqPK4frYrSzWCQkaYxDAtf7HJ0+f/vD93vt3CB1i5V2rfbCjngsYhAbAeOmBGYxj8bYyZMh751x36caNW7fubG+vc78A8IRWOOzTUKpREvIIciSaaE/WOs4vUhJX9esckQMkwFn8BoxJylQcRJGFErZBgfWD8bc0lhjiZQMZiDgo8giRHUy6GzGiogtQq56GEm+bULpqZqpXgOToVIkAJG8X0PULITpF9xC1nSUXqEdvHW7FWjmon07MJeiCZtS/ErJn7Q3EK6ZHUtZCDVJO5QHCSsSaNgwDxykDBhHm4KhMvEYhrIbhQSwdS+t823XD8ageDED6g5ev/vN/+n/95//tPz756cnh2RxNw0IoDTJFxlM5SWY/W5yczc/a2dnBzutnT75/8ezH3b39k9mZI3JAgEKAglAhddyHaJ/ZW1uFtXSuD9XaDGiMEc/JTpfRZ/DYIvqoq0seBAwVyq3AZD2vJAmmGsdMwOn/C4OeljJBAvXdugA5IlCGJ/2hAyyWK/2aUgmQw5EcLZSOCqJNLTxNBHUAymtpkYh+OhLa0Xkhgh7NDojE8WgRjlrlmYAiPSAQ0ykh4ccS6XBkUNsmwjaS3ombTeUFYf6KLEb4wVXcRMmjKu+WFaAIicM3qzkBCW3yEQHQUMztBITEICLxGHFjTARihLs7B9/98MO7d+/bRTcaj+vReHfRiW+9dIraECQRZCTiMX4NX9i+9ejjT774/LMrly8SiWckQBE2xug8ekTDJAgm9HoLlf0IpJRyJF5UgjLbFTCz692gGc5PF9/9+bunT76fn+1XZMgi96FGIpcrIiCSIQmbMH0kq0TIGOf7eji5ee/e7Vu31tfW2PdkkNkhBWYqwVZhjk3BMPZeSigf1ZpkK1SwhVFa430CvlVkphmbcz+K0krpL0xx0jTMbj59Y5KVqJek70UnkX1VkIVYFVZ8ZbqpamE26NHu6gMnL5u8R0qOYDEPyUFE3RcE0gKboC+RcFH9icYgT0zCScHzRWopMz5Z9fXZs3PApGgxzxQ6scXYjQqsyvkbNXKHiFNjCijBsAj/w+fC9jBDnevPlostGAEItItvv/76P/+n//IP//AvC+dp0HTccW+MqVkiz4fRzLKIvH+/u7uz3/dub+/g4GBv72D/zYs3HaAdVb7rwAmRB2NBvHM9GiKi3jtmMWT6ruu6brFYoqm8eAsERCJcts8IKgoKS4qFUVoA02wpV18KoyaOMb2i76flUbyTrHdalxVHnWLCIK4QrVMRg2YHkX8vxxKfKTueFWkt7iH5sdTf6SshAFBVoVSFFx4/9MIDTaUkKxvVJ6ApZi+hDoPQhAPFGULVSXHMkHIEeZpCYaEIxugkTal6MEyUTcGsocYs8UrlXnRCQB1dnARSSh1JZzt8iRBiDhhAAmYNYSV7BhRjKgBsF+3zFy+e/vDk3cs3AoJC/WLp+t5xC+AQSTgGPoRGYocNcsIIeOHy3U8/++2vvvybi9tb0nfeSHRaUZtiGRILIyAairNB0YQU2Z2i4zagqihF3oTRCM4OT18/f7H77iV3i6pCFhdI0WhT4klLFYJhcOFYPvRChrz37XLpRTYuXfzo/oO7d++Ld+Jc6PhPCIiFr00WNvqgGB9o0UmMVIJJjWGc6EhDtl2LByRmE3S7ExZ2PZ53r+i4YF0SrslCA/otCnUCqkiQoqiHWxVjFf0c4OZCPv1zVcN1YaL11+fIXix+qkwvJtoVVHYxb+mKQCuxOQmtFci6tDfR40EBWpWZl3PDxOiySh+qdwc1gwLq1FDVJz+CQKAZ8/6MZAcEOLSrAkBAAkRBHyA1Ysd8NluwA3C8/+L5z999d7C/3/W+agZ9kPrKes9d51ny1n1D5Nnv7r5/8/bN8fHJ2XwxW8yxptF06DrvBaq6tlXlet/3Dqqq9148O+eNIYMGLdnK9l1nyQgReyAiFgFWEQI1b0ka1OGXXlq9bpEmTDOX/KvO6DnpSJOXITUkqwTpnsrryLkPrXxZErXyJ863iLqGc/4hCrpEMjWqYLoymFKMtL1o73P2HouEeZJdTj3JAoxUhQ6iHlI38f7MuTkNqD+LAFMtWWhvgwAcDl1nm6ImDXyKx41ZRlB6OM9N5ISihhc2Iuqy6EwVbhgh+Q0s2oOxiO6x0i/N4b4Jc3RwdPT69csXz58f7x82g7r1c9863wfrz8JeLREnhx0KBa/cvPvFr3/z1Ve/f/DJg2Y8QGNAvDWGkfO5Hxi2McepRHVdhATpKLfkn5UIIXV7gODEV8aCyHx+djY7WM6PiFgYwmndED0wASEwIppobYmjq/SCSK5nBn/p0uXrl69sbW6wawWlMkYQRRhjFlgCYiRtSRxsOgeaJ8C4OOvZWUF6NU5tpIZyPiaawHS9AITtO5iNmwLckpxNqpPgQsI6ydSXmKVA3lBqXL6VGmUd+Eo2IV2aLDVmHwX5CKgERtSHp4ANE/TK6C1KbHT1kSETPcc8R/eF+4LVFu/J1Oh48q1XzYes/Ct6B1k1OCLa2jX6BArYIfNjxXrEAbEOIRwUBp4ZEGdtu+z6SbvYefn652c/nZ2dWBO6gbIBqCsrUvXOM1NImrHngMLOZvOXr968fPHGAYAxV65cnc26buegEwAB7p3vPRrTtl2If4WZwIJBdm45O/HdzLuOQAwSe4bYqYKoUKO0aMVkZDicpiNlZNTnF05a4pKn2Ssgg97vnNWPl2X5TJOaDG6BskqZjJ/ESN8UO/I02VTqGxQLWEARyGRR0slo2YUAmDUTr6sJAqEvMyuFEIkdTP2wEAkI0AAxxxOhUEmiVXGDACWjlYsPjlZdbeLy00gBAEIOU6QEMmkNw0fOe99yogTyU0AJpgBiAgoAFMTEmYk6gISIhETonZudnBzu7uy9ee0WcxLXdzift955UY6bEJkZiQjQA7N4AX/58o1f/c3f/B/+/f/x8eOPBwMrfYdh0yNEQxphYzxUFQlBIl0d1iG6k7QmKo1KowOAoGePgkKAKJaAiLntp+vj5XLpFh0hcaSAAv8hBMzsAHpBhwhE5LwzaIDIiL189dblS5cscuu6QVNHCwExhRMmipLB1YWKp8qk6c9Cq1MeE7wKUtUIUxHjZEsbXUH4bAgRkyqW5XERvEYgk7Q5WUw5r+Urw1pNqUNJLiZZLy7DhI1ipij+u6DRs8uBXGG/8kYcnroHSfCzYHJjEj3xl5ithO49KhCkDl+9JyWPUNichGjj9Ik2cQpop7RCmpAQJVDzShT6nGQRoglBkbjNnAmNCHovTHRyMptaODo6Op2fzc9OR42Bulr2XVXZ0dpEWFjc6Xzhg+nR4bq2/+nnZ//2r3/66MGdje3ts9nZzWtXrB283ztiwtliKSDO9RKKmAFC5gB76p13fcuuBe83Llw8nc0IMPo4xSvIEarEyVbbnlZx1Q0ki5PZiTijCYqrY9D1ijctwUMxX1nKMj7BFa+Kau3iBzDLKST6NKyyZCEK8oTnPJXKSrb8AaVq85hwgxCs2xxBYtaGIPpMWs0MLIgiQESxsywGS2tMGhl6zj1IE47B9HiQhcuiNmzTvbMIIKzpWMC8k1PDVZXXbBJKjxpfKcFWthrqJVc4BbVN6QKCcMo0Mgsjt317sH9wuL8n4Dq37M967qu+64UdUGg560UAkcR7QfLgBXh76+pnX3757/7wt19+9eV4NGgXS6xr17mmrrjvTWWSjYpwPAQNWrIajarC3ZBGyTgBUHUYAvHE3gPKeDq+ef3mq6vXjo8O2HWeORK2ZCSGWCQo3rdIDsBx1G4jDCLSDJrxZLq5sTkcNN1iJuJBiAwyc1rmKGGi8xdz+wnVFD/R8OuqAqwYFUEUCdVWK5FfolDUS8j5u6pCqE/PoEdiQl9/h2LZEbJHSO+EooeCO8EksvlH759tFEJeGxDJvk+S1Cel1X+nJw/DCAU4xU41yJJdUAdhrbN1Tn5PfWuCQ/FvEUibFIpvLPqeZp8seWZ0IkUdnNJO6Zk1IwpYzhIGxYaI3ZEYg+4IEBh7tlgen4JpqguXtr/8/OGrt3vv9o5GgwENx4ym7V3TmGWH/aJP9oGIHLvvn35749L22trIedhc28ae3Bq7rp/3PTPPFksB9OgRDCJ5ZkTj2QH4frk43H3fns6mtweL+YJB2AsKkiFgVncpaeoK44+lG8ggRU1I4U9XfyISU1cg2WsouIn+Nfs4LACNrMqb5LkvXso5JvUU0b6V4oPxf2npC+FQvxH/TwgAsVY9/jOeNKVgKrnIwJ1Luk/oIB3UlAKqCyQPoWA8jzfOJ8ZHPSexKTMmIha1giHa9BQuU/z6UPWDomxWetoUI0P58ejNJGZvdXmxWEfV3+CsKSZRlLMG5RDIAHgB8b4/PTs9OjiwxrDrgYEZPTsi5ABAyESanoXFI8i1W7c/+fS3/+7v//5Xn305riz3nREhQ3YwQPCgWZagfpi0WjB0s4M4E+r9EQjChi4VHf0PBInQCwOIEz9emzz6+LOj07M///P/EO+6tkcEQQxJW8TQCajH2JA9IEoKR2Uwd7aZkiFA9n0HwISGRXP3AiBCREoHRrIFtVY1bUdIUxxlV9T2QuBMYk6o8ORqeLLQl+ayuGNpsFKYFKcBo9fX14qaiTjNUUTiiBKRCZp3U3umhEqyewlqY4QNWcNXnPiKKc/55wKhK/IMb4jSXimNl7kiSIPRicBz9AAWZgILsyMafGOe38KhBm0QDbdlxYiUcUPmeBLXGqPqHJ6wPiQpRxQXWwjJeoDWycl83ownH330YYPVow/98bw9nJ8dzs6ePn3te18bqYisMZ6FEJ2ARUIj7Xzxb3/6N2PcvWvXTF1fuLDl2TOZ/dnZgo/Hw1Hr+kXXEaHnQFOjMBOQWyzevX725Lu/XL5yaTKZnC6X7LwlQ8FJsXC0P5FVlvLps8yo08bi5ZUl1pCzCBXi3Ku0J8efvyQ5FM3gqYypoMC5b0pAQMFA4aU0uM3kT5ZiSJY+r7yoomAhM6iWJpDKwlmYs7uBc+KtvidcgEhIeTgmdnaO6qVDUK3Ru6oHtBDkPRaKxtuHfSV5ZYI7iaXj4aLM+6e0B0Rhj8yPPml0afE5Y2MoVHeR3bSENp4YmpsjO4dE1lLfu8OjIyfSt51pGu7Ftz1ZEkTmWOGECIZsJ52AXLxy9Yuvvvi7/+Xvv/rd79cnExEgz0CBOEdmEvCo5AVGICiIaDD2FmNAzY3rvjDtA6GxYWKqmUNdGoLzfjAcPHj44XwxO9zZffbTbDY3zvWExpB1ngmJhT07QgATGjIAMAMzmgoAnOPWdSJiLIYmoWRQPIc5BCJhRiJBUUoNMdkYAkmbvzN8CQxGjBRKYmSV60x7CPS5SA1Oftzs+qNZBixFVd8qbSwUkEsvPI+aJOlOlBTN0iWQldALQBap+BAIoUQGNVZRHVZvETF02um+ouNZl1RBEkMI6mv0QVY/Hmvaim8r8nwFe1XKSmGtilqM6DDCsmG2UYXDCJ49uToU9VjqolGhV6hKAvauQhKAs+VSehnUw83ty8NmNB1Us3l3NJ89f/n25OB0+ea9M6a21UwgBN5GIhXAXnYOD7/+7ol4rLAf1vV0fX19a/vCrBf82feuO+l1TYXQIBAj2MaC9y+ev/iv//W/bW1f/vXv/7YxRiyIB/bMwsYaVAeoUlOIYbEoJQlT/Cu9kKACrtwBz9+rmHO1zCsAIwpNeXMolvJcojj9O9F/wSIEwV3lkYpLCqkNCCy4v2iK064xASQSiQ0Dc5UcrqhfvGsxfNbNk6mJRgJaEoFIiUKgIHXFUshXJl4TFOskC5EeJURZqTYLi6UqXWHSNHVwwftFNxsSFdrCI85CbCYFjACAzB4CqEcSkNm8dYxd53rPTTPsqK/YcbBnvSASGhRmEQ8Aa2vrn3z15R/+l3//u7/9w9p00rctemBmQCENjtIeY4kdHThZUlXDSO/pairNiClFHcYtImgoptu990jmytUrD+cP373aWbStkx9P9vdNZZldhTUZw+K5FwYfni5mZMmwCAC1y65dLFzfgXgJt/ccPZzCB4kxXsgDSSirysIhoeQomdvwqpYJS6axQhlpfOCMEIL+a4pLXytqL9TmBMmMCbXIGIoiCzXZhc8Iw191GSkiSbdNT7FiGuL0qxmMwpX+CZJ0q4BrST0L96RGJ/65iujUKaYbYn7OVQ3ULXTRWBedzqH0X0GuYwgiq3ORkVj4KeJpnYdE+UliX3POUxmMXNkRgwKRUJfMwuyRxZ6enfXc14Pp7Tu3hjW1nTs8Ph5Npjs7+wjN2ZIre9B7f3xyFr8UyDkPaNq+f7u733V/soSjpr526fLVy1ehtuPxeDQZzRdt1/uwNyFACw/eQOXYLQ/2f/j2L/945crW9vb1O3cNiBNHRJwWNVpLUegH5U964uJHwXCGEytoNrANmAQny56s3EHyOzH/l+H76uSnTyEmDiV5e1BzpyRo4mfLLPe5BwjrRIl+zEA/SXvS3BIFpChdVF6lmB5Z+SIEdXhq+HNUI8Xf0UOAxHbQRBqFl3XT5yQ2mr8Ys6cRIIYDt5LplGjYgjQGK69PWiA70LFKMQkCCMJo4tYp3zsA6Nt+Pluwg8oOWHyDAL1nZg9gje3aZWUr9uyZm6p68OjBb3/966+++u325qZz3iAJiQk8PCF7FqAAlrNGS6qDVEYV4oZqnUzBIscatCTS9xgaOgAQCTtLWFm6fOXiR/cf7O7uzBfHbrFczmcI0IwGxtZ9v2z7HgSYAYmSsyQE9MSO+94f7B3NblwSYEQTNdKAMEQJlihukhYfY35Znb7kmc25XfVkha/WdiHFUqYVT/YqXLkClKMMpeAjU4irNzoHnBDLa4I9V7+aqJA0/+eEMFxdOqqsrsni6u1WLssXxUg2aTsqSAmmXCL4iR8pNveX98rQXW+JOrmU5xwTHaG2O91INO+rTyk6BQlcAOhgY3VG4dIwfb/euBDKpE8E4YAWMXa4tjaCgeWlGCvWIpq1zfXrzJ998qiu197vHnmko9PFKS447HRBJgAiYjRt51692TUGraXD+ezl+9319Q30yN4Ika1s73pgARDHPSB0bgnICHB8sPvPf/zHrQtX/8+bFydbG2fOOeeAIO1vKPxpyv4VNjZdokTZijwV3j4KZTI9xSWorMuKJK46G1D8msURSvuXNWLF0CYpLYnPEvAk0q7IvEr87ZzoJlRTWMnSvCeuq4wpzulAAdaj8kZogEqhJiuQpzlMqs0sbNIDdWqlmY63F10YHX9GVKhMUcYi2UXHoZVGAuIqEiJHNQxG1ZMx4kWIDFG7mO+83ZmdnIKH7rRt1ofce4wsDiNRXdXWkEHpGW7f/eBXv/mbr778zfpkbREqENijIRIUYRYJ0D3Ml8F0TCUKAQjFycIYlKtdU9ORJo5XmMFQchePTgdxXTcZNbduX//5zY2zxV7XLg7e9c71TWNtVXvfVZUF10lMXQtZQ4QCYOsKvF0sZu939k5nN8bjce88EhGiqYwXllj2HrZhkoAICMZeqhDJrDIBhEnXRCk5kCzM+jxRULU0NEQEGWnHG8ZF1+3ymZ0UHUMytlmXk6BJNK2I5TfrHVanF/NH1etIHrCqURL0pOiFtqa/NM6W8pdylCtKX6pmnqbkt9K0pQSXzkupmUGEFNzGlwKLlyYmTGGkp1R7UV8tbqtGIXK+2UphXGNA7YgZ9TfIOaCx5JmJSOqKjGlMvexnxkjPrhkML14dP/B26et5/7TefV9ZRAECImMB0UEHLHXVGEstey+APRwczo4OzoYH+4RksTZkbGU9MHoIOJnFgwcGj0DO9W+e//iXP//L7Tt3v/jqq8B0hy30Ph5OChrgqBjo6kISNihxRn5dRU3XIxURqqwV8VhcKSkkKxnQ8wJTvpTHBSs/om+j3jz8rhJaXo5JjoKMSzwuMD9kmAcpszcIEmo+MgsWHY7E6Do97TkeK85Nrjco0AxkGc7OAkFiDiD8wipWWZ7PTUeMQjPfmZyL2v5MvCr/Ga6LgUX8Lxus8FGBMn2Djj0AorCx9v3O3vPnL3bfv5ufnqxvTTx4hz6Mr192tjJN1RDBvF1eu3nzV3/z69/97e/v3PvQVFU7mwEBEVXGevDsBViTI6JPH+FZ/C9iNE7PCgC54Xwaqs6JpmJ1KQ1iqHMw1l68tPbo0d3eHy7mJ2cHO+yWG5vrdd04t/RLZwwtekdgAVDc/5et/1yXJEmuBMEjImrm7pcF58krK1kRkMb07s7Xj7Xf7rvsn3mV/aZnZ7vR3QAahaLJg/O4zImZqYjMD1E1M49CFJCZca+7EVUhR44QdW/UnYRbCD198vjZqxebze7K1ZNhO4gwEWAepw6QeSSSS8KmriswVo2Fjajx6H51ptdnLfT9rKpx5g5oT+xHTDrGQ4UyKusxETEzuZ+qeibT7dNfx0/vq8tICO7fHPOf7P2pSJpjQCrt2ZDZfSoqKS5ocmczHYlX23MCJfQPIFUXrzzQ6KXmvqG+1Kg2482Kz6waMP26Wqh6iymFTFVvCp4aYeZ7C1d9iQU1S14TBUIs2a3PuoO3jTTNUhlQJm6bpl0eHjv4Yr2+XK+HPEhqJDUAq+XAPJoHRwNiYu7zgK4j8Hm3W6R21eSUWhBR05CRao5pND7aH6Zd7r7705///Is/fvr558dXjnaXnaRU2ELmmWRg2rWZvZltAtXEf8WmFZJUC1Ig8gwH1IuPlo+IZsO3MW407e/dtKKzv+xJ1ASCx5h1+tbeRUZEU68yxpuF96tyNdPSuRRVOaVSpjKZ8Epfzd4DAYsoRGjuvkZEPhOf+k13T8R13vgERGrsNFuJWbDjmJlxjxQIiv7NtXy+oOMbzGytO2LmdDHJLDG6mIiIWEzt7PTs5ctXL54/effmJbMdHC532+3QpMw9ka1WbUqiWXdDd3jl+Nd/+9v/+L/+r19883US95yzqjsESUveoqzf/gCC6Xno/YzSpOAhfAG/p5LAsL1exYwJMbouW2Y9OD74/JefddpdXnRnr16fvX19fHJyeHS4Ojx4+bzd9Tucb7X3rAMRsSNbhpM6vXn+5OHDh29Pz+7du+UeEymAQAWJORGiK0RRhoWBPQbrR0VYHYjJVIuXMKPnUF5jJt4VE+2z1HtijFHQx8WYjO/4iwrW3WpNzewm9YtzQR+FsRQ4zmzBqNHVu4x2j2bfnSK0sk9UBL1Gb6jZNVT/UkmgiqT2ks7YF97KGo8RBEolC7yqss/VcW4BqjJ5tTxxkSjZqpZhNO02Y1+rrhYiaZ/Zqd6wONSJFRifuo5YoFpmId0wkOWmaVZHywVRJhb4u7dv//zHP/7rH/71D9//4cWbs8vtZWo5ydLMMzT6z901DyW1BiehJJTYBVk3uWsaSyLVMhcRKMUoVMboXrx7+dNPf378069++c2vOLJL1ULXp6bxP3i+9qjmrwr1KIo0+pi6rV4mstdDIjAdL4JR0X1axNhOGrkfHx9jz4gTZl/Zf6y9P3MoMBOj0YISjbJWhtSj+IDRD1RIjFJlQ1NwRPQ+p4spcTbTjNEt1Z/tYdXy61lEUZ7EkajOnojTaqt6ABVeeh31VSV8D2iN8fceGirKPrMC47bMyN26TeUWVLSMiWkYBpG064bHj5+cnZ+aD03Dy9Uid92iYWs4D50IN6lxy62nL775+rd/+9vf/va3JydX+ssNmJsmuZrEaB/y2jSBusT1GXxaxZoIruanOvCSXfeyQXXpA+nU+qD5saEESnT16rWPPvj05YuzZ48fbzcXifGLX3yaJP1wdPDoySMzOXt3mSS1bWs2MGnYlX578fiHH148e/3g/r3DZSspIdeZDFZWb/RVhToG1dStj5tVfrcHFMYf7ksGMbxSy6jqgTkTWUR8DHfGDohYFZ9j1MmV0v6NRrEaf1g3P+SgLnkpZymRu+/b1fckurxReRh7D3vPNjGsqFdH56UAYdKX2dWqsaDKWo0sptccypxsrhRuvXNVDKfqwMomxbXnSkilfIQxg6d1rcta1O2eL2ExXHCMJ18gcrEOgJnLKdZuSiTMzslZsGiFaCHSbTY/fvfdH/7ylz999+3jJ08vLgdO4kCvXbWlcEDNYqi/Wn/t+o2//+1vXj5/+dPDH7ebDhBJDJCbuRkFq0OoZYxObkKNaf/o4bcPH/7wyS8/b9pGzdiNJ/1CYQ72DO/eImIMT8efz9aeRpAwBqWxdhNAn3a2Xma+voGZ6/7MP+yF+qO/HoQYn3pPlXz8x/hsxeZOULNuY7HToXx7IatXza6qMmdWRwg6CdGoceN6YLrheA1/7zFH3woQpZl5qEN7UJU39GD2iPuvOUYF8ZcxJziznPXK46HAhQ0EAlfE7nHMHTBk1dQKEYPJnC5Oz09fvz19+yYRlJP33iTpe7DQYtmIJNOc83D3g4/+9h/+49/87X+8ev3GsO0GVXHkQZetEFHWQURAMPM45n22RqjetHR61W2YVm1Gq/u8vW4UAS+kiAMwcycyg7kl5mtXr3/48SdPHz58/tP3q3b5zddfXzk+OlwsCUB+Mmx6UwfQD9kZDhfhZPzy8cM//f5fjxbpH/5v/6FJqdcBRnCSwv7HpDwYwBEcm0e/eHjUIhUFIjDX9HatBZ0qg6u5JtDscN34VN3AuuN7VMkIKKbynIAqM59TrVzVp33PswdcMCaCpymJlUscr18tfnm5+pm5LBYUOfN5NF4rdqwkOCYrXMLv0RgU4Dw+Gu29wYxDrkFGHbQ1/nh6ytGSFJGp1pyoTp3bE6K5SGKCUvW/Kt2B2sYxhaIAonw6hsMTEENqzWDuqUkk1vV+eT7IghrPL169+PGnh3/685///OfvL9brg+Prm81WcwYn9ZK9cAcxiYgDQ28f3r////5//T9fPnn2//nf/rd//sf/rkY2uHsevPSpgGolXzUnTGD46esXb149v1yfHl25YaoxB4WkiowDY/7IMbn7EpcF5gpzSWEeqwEfBbNKiI+WZ8Y9V153z8rN9hDv0YvVQNYY1rxGxpVCDL89SfB7ihHfn65ZwOF4ib0/VN1mvWlFVsz7lynoY3zAAkbineZXLXTilLgc+Y7JFo+ACYAjlS6yehOqTmnmN3wm3PMfoMKj/bXdW0H8O+sDtwnv1SVl0aEXsGeHKZOcn108e/To7PQVD8PhcrlKi7O3Z8mxcMruxKnPg6oerlZ/87e//fVvfvvBp5+1i+VuN5AMVsagOjiGxIEixhhNVF0CKnqPur0+CVxNNo7fqdV2pYqranR54XAhwqzmIAw5H6zaD+7fe/Xpp89//vD27asff3jv048eJB26zQVnoJfstFnvskG1A1w4IdGu6//xv/2Pk6NrX3z15Y1bV6Pdj5mZaDATpsk4Eo0EqFenS7XXhJxo72BjKqQ9odq6GS4KUDnyjFW3xkWatr7c16t+0fiFspeTTwiAV1kamlQIM7EsF55hsBIK1ubDvSeaP98odJXVAVDOQsYsLY3CsNfaKaviPl6rIuyZ6Z8kvTgbmv1mjpBmq7Iv5fENnv+4KkTxJZMhr5n1cXmqJYp/VnZy7o4LM+VlCHu8V2VZrHgnJnazrlNq6N3bS21pd/7u4c8P//TdD+/OLoSE0TBIkmTLqh1xMjhMbQbmGuDDe3c+/+QXn967+//7z//5+9/926Y3Y1IFm+YSU1l5TKJ4KgYG83y+fn36+vzs/Pjaraw9CRPGdsuJf5t2fhIvKgcxlXWYgPH7vHutyHlv/eOL1WvuudXJNFYdf+9rNLsLzf45oon6Q3rvWzOjNn/Qvdea5MvrRQge0xpR/WIgqrlLis9OhrxO0XjPwu499bgA03+P34h7pRFbTOo8qT/mkRS99+9pQauFrPYRAI3Va5PzG9XFgXLiJMGZJd6MiIQlysS6Xffm9ctXL59tL94+uHeLjc7evcVyudldbodhKYkP2rPLC7Xhsy+//u3f/cMXX329aJq+73Pfq6FtEoORM2IWfWlkpnnMUhVx9irjwWU0028frWZ9gaqyRFQK66vgcnQRG0hIQcR89drJN7/6JvfrYXd6fHB4cnz88ScfDV3fNoer9njdpR9++Ons/IzAEBuGHXPT9/nZw5//8G//9ovPPv5f/u9/n1Kbc25EYj5SbfMj8lLHWXO0+zZy2ociN3EqYVi7Wp5OeyZ4FM6RYyx23ur19lYLk5kfLdOMNyqsjk21CqMMVB2oZM9kACeAG8/8nondE6D9V5z5xKone/QvUAiKvYsRahJhUlrMrz5esobM5UpzZr7qWkWi1VKNuzHZLp8S6pO1x2jUJ9NS7lhC0/rr0fF5DQIDPFVX7iAv852t7LC705ABt8PFctttnr54/fs/fvv24rJXcxJp2t2u1yFTpkaWaqY2xLxygNxsyObA8ugwW05s164dSZu6i4vmYMUMNoK7lUKkWtlDRJ5A5DBzf/P69enp2a08AKTubUoxVYVAY5pxzwCPtPgeKEG1UPsGz0dt3f/hKGH7n59Zc6pXnLv28qk9RSrfqf+aQEBFFijk20QbTHJeDXb4uzpvB4VWmuSnPCmVrB3PFQmja33PGfl7izEpFkYcNX2IZlJZ38oTCcc0yekIRszfxieTPt0iflPT03PXWhR3JKIxa46eXDiBwIURKglAApjNrVkudn3/6vWbp0+fXpy9+fzTzw7axdmb193FWZ9wMexsyGnRgojFb9248zf/8A+/+s1vrl69RlwmmzNBiJTJOE6aSZU65LkfKg9ea5omnoQxsX6zt4LXjZsNCZpnNDjIFI8mNhaGwdtGbt68/suvv3r68M+b7YYIHz24S8PQiojjybPTy9vXzs5fbbvBMEgSgjWC3G/+7Xf/dP+DB598/smHH3ww5J5FogGMiNzAMcNntjGoDXrFnI0cR92MQj5EKoFH4ZtEikEjNzIVnE2vjZGxLfZlcpfV79flHXlZmgSJZitfflBt/ySplWSpkrrHd84EnSpfNDY2zL5U3nYCLyGVNjnJkgGkMYk7KRRNBn30JuWedWnK2/F08PI83pi0873u44o4pnWqnm5UbJ/dDV47CfZt03SbOqC8Pi9VvR9pPnajKCRT0763ly/f/P6P3z589OT8fH369nzY9YumbZbLRgSQ3a672Kx1NyAGlhE5EysZ0os3b//13/7w4Obxdr05WC6ZLzXnYCqovJVXg+eFazMPQLW9XG82ayIIUdVBLjtYEaaXVNYMdO0Z62oxx5WrDq+up48+d/zIhJppukLdiNE077mevYWer30JkDFKRi1fGW/ok6OiuaUjwEP0Rq7Bp1/y3ISXpBTP6b7p10V0jKbr+1/1qM0dQvUo41LN3oTYQSCLYXBzwEsjjzpRXTPDsh/UUP1VuLe5FRhFfO9PAZ7FuIywTzWD2Q2cGndozi9ePH398sn161c/undv2dCPPpyfvug6tGtJDbHQZtg0y8Vv/v7vfvP3/+HuBx+bmnY7SgJ3NtKsMONqkuvkCRSqp/LARasnE1J2wWOCVV3O8CMgd605C56lqQD3Mt171HInI4eZqWN1sLr74MHl2as3r169enHjxvVrt27ecqLzy7Oz7VnzYnt00lw+751MWnGzROKul2/f/eEP//K3P/zNnXv3UkrZAmtROSKYCJH1dCL42NI1LbljDzxhOk5wBK97MKesSX2DKrtVeWYooMaFswQBRncxil5oaU0S0IQkRlpt/Fv5ns2vCtSUQjV4M+Zu9pnKp4+PQlVUpw2qxdd1Q8cAYq4tM3GtUjpjf+uPQeMDj6FzaPHEno0GfkwBj9/2MqqhOsbxAWbF2+NGAqjlLnN2o5aG0uhIaTT4QIQ55ZIA2E3V1Bcipn550X377Q/PHz5+8ejZZuiWabk8vtIuF4u0ALBpNjnnPOz6PBBHRSkMLoRnTx7/H//n//d/+c2vN7td0y5Y0tDn1DQlsJ7492pwQiTg5rrbXG4vL3PfsQtTQ0QWB5vNtnkSt9je6YXfJz/q3pXvxn0npFLxCkYnMW7wv8fWV+M27slk1PY/NXMw0z9qjnj+yCMwmoUroQhVXCp3M35gknA4Cn1XiHwvYx6qCBZPialwYnqLPeu/9+ReCZn3k84EJDcfD2xmmmzG/HoTpT/XtdExzFzbzF9hXxFHDZnhPICYyEDM/aBwpKYZuuHt6zdv3zw/OVp9cv/DWzeuaLd9/fwR+5Ctc6gTbbptn4ePv/rqV7/51Zdff3NwdNhtNwY0RO4wgQiZVwy/R9dW3Z056DCKVN/TAeKYugYaV9ajPKnuYR2C4KhRfQ1/AYAid1QOPidKB8vV7Tsf/Pjdv/3l228/+fDDBx8+uJL1+s3rt66/eLjCYiXNornYXiz6IyLLXrqAH//88//8n7/79NPPP/jwrg3ZAbjFmWWIM8sc5Xwo24cyY3g5s5kYszLVZNNcbCYFxuS/HRQJ/JFmKdeZkgOjjIygjGLNvaZ2w0SNfofGVMpocMudvbA+Nb8yj3BpVJYZHV60i6p1ra8xAZUxjvM622P2j8nqT69B809NP91Pxs4V4a8WuRA+f3Xhqkbjck96tMfvz0xcdZvl+5MrQa1ora9cQ3Ey2F7WxBFiYqZOMCNzWa/Xh0ere1dvH125reqc2kZkt+3evMPZ6TtmIVIHqQ0Ob5dtt12fv3v35uXzt+/ui+Do6rE/ecZJDFDVeBOvXgnFa09W2Z3ULA+5YTI1DtA1Oo3R3I7moaKJidWf2/fZn5kz8NEj0/SNSc/3dGFvZ2scikmgafar6kSqINcdrkxlPZW0pvX30jejB6hkZo3S52m88dEnl143u1aqzoSseqmZ4vnI+Ix/n7mV+qW6SfWJanSeYpx9uZtQRSjucC56QzU4H2erlnz8FJGNN6oAacYfjV8cnYKPNVYMNlMwi1CUZO0265evnuVu8+Xnv/jso49ODpfPnz1uWwLberNe77aykHzete3hL3/1zVdf/83V69eGvnemlBrLGpbI4ogYd5QzcGe7s+8Aw9NSFVvUxm4rq+Rl4CpKPM7EcxdZtKwsmweh4IC5OzkTqZtabpv29p27l5uLP//+fy7T8uT6dSO6cvXG/bu33n10rwfpkNM77vse7pIELm3TDNv17/7ln37129/evn2DyN1MALMMYpQhQARQyUbURS9U4VxTpo2JN6VKWlZDNNOKvcCApvoczF3ATCTjjgSMQ/onlZkt8nzN6+KNfx2N2/zBC6mM/VfxEfDFZYK/nCz+XiAyqp9P6lt0vIrgX19+9pijYZpAywSECh1X1em996t58PH+QMHzf2XGaLY9xUxUkzNbxtlX/P3H3PsLVQoG0SMcpWu9aivN4cnRBx882Lx7gaz37t+9fueWO2XTzeX25ZPXTKzquVcSEMDEzCwiHXC4PDg4ONyuN+ZmOR+eHOx2ago2N1OuBe1VMypOAjl86NXd3S1rbmHmRDGPBVRsKKpRix2f2fFx3eayVZmfSVgqMpgvVPylOGJ6b4ve2wDMfze7xvvyvA8LisXwauB9sv9FEeeRA5XnmXzI7EIhATTTytGOztDqBDKqVI6+Y/SC9YY+zR0d708VEHk1fUAaPxzVJTQdSzZhwdmKTps8Pvv0gqO5L/s0WY15rmC0ueRkOdhCa1Ii4l0/PH/57NWrZx8+ePDBBw/uf3AXedt9d3l5dr7Z7PrBh8G4SW7+2ZdffPnFr+5/8IkpaYzChROzu1c6pIzvob/aU59MElVNLmpX/gMQGqsaQOWUSnDU143uokbbREXZwnFSqewGASIpfr5aHTy4/9GTJ4++e/Tzjbu3bly/dnJw9Nmnnx2cHB5d+6lFY5pfvnjtECIHNFHbm7558fgPf/jXLz7/xaeffrjbrD0X+h8EAjMX8TM3uJPwVHNCI+FV/NoofSMYmBVhlA8Tl4LdUbCLGlUqrSzaX2nMdIVR/IGRa69eZLYF45OMyl2FrkLAurCjE6i4cJR1oOSna/eblzcbLWE19PWl9/38BL/qG2BKHVRF2/tTFbW+ok/Lg/EFp1V97wJ7XnBUIyquc5azqK9C70E5r7q1h+72XeoMCMIjEHViMbcMWx0efvzpJ+uz1xdv3ty+dfP6jeu73XazW2fJqyUnocXBSnYbVbM4uy6lbLZcHly5cfPGrZttK0Q4WC4PV6vcr9Vmys8z5DA9ggNoF41IHDvBjjgXtqZTRh6I5v/CuCNl+300XuP6TpoMzBqnxvBoMv1Uv7SHSkbLusfD7HnW2V/m7mgWJZSvj5cb36Ga8omvq9+pyli/b1MdfZH86dvzra4xA9U9nvDFqF003nHm1KrIj+8X5t5Lz20qpKmPRQOogH3m08dE3OR09iQTM5dcvjuio3kkR8V4EEoBiAj3gwsnkgS3Xbd59uLZapG++PKXN1YnAtpcrrfrs9evX/bbLka5rbfr46vXfvV3f//1r37VLpb9rmOXtEhObprjvHTyeE2actqoHNssF4DipuaOd9xvKulBp3Fq6Ki4XjkW92nDxlxybBE5BTFDifJgjcjhlatff/m3f/rD//jh5x/J/erVa6urB4uDEx9W27f9+s3m4sXFYD7YALguVE3XZ6e//6f/8vknn966e7MRVjNXBbPlTKAmNVHlFLpkDsCII8PrZSQN162b+XIgXmrPUlUyc7IlRSmmAGlU98mCVcmdX7oO+PQxTRYsJI0w9z1Fp1G/R9Uu8rRXTFY+Vm+K6rWn1oZRx3y0HOOWVN0cPzIX38kelN/F6XoTrVQXafYg02Ng8qxz8zf5Fi8urjzAFB8U41lpX4y3qFfdX9m6aJVxKdQl1TCXiONASVA57IaEycmTyGDarto79x68ef1SPB8eHrSNDFtvmnT92jEBl9363dnirE15N4SrNbNYmQ8//PDXv/m7Q6GnPz87Wixb94VwZu4D3tfob48/r5zfYrE8uXKyWCxNwUQMIi7QaowUClj0iktGaZyJybgqdX3HpfFKU4w4Ybbno/qHcZqDl3rTmZl1VAnDGPuO337vv2bPM5EkFdO895zvmeTp+iM4r/teBb8+/p7HHx/GRhs0K7iZP9T75NFomms+gGKp0pSwI2BuNEf0NT4WJo82e6HZe832jBxe+lGmF4aVpsf4ZIw0SCmxsOW82e1evX7l2n/28acP7t5pQP3m8tXTJ6+ePz19/e7ly7fdps9muacPf/PFZ59/fufeR9IsHEPuBtKMWqwYPjL+6T6PoVDsYAVsTkVMq2p64bymHS5E0rT2VAiwKm6jxfSZ4y6aXEXIzXxgkyT37j7Ydds///G/NalZHR0etosrV65+9MA3p2tBOjq88vbi/NWr52/P3l2cb5qFcEo/fvf9f/mv//Wjjz/75ZefqpkwBcQRYYOhlCPUqipHNGNiTHgb4ldgqkuEmQurdTT7AfRM2Ke12Jf78QMjeqrmlcY9rk40JHoyDP/un5J+r5+p9Y9zqEHV+oYkjs9cOb7Y/vJes7ay+AXtqUWR9Al7Tu4bxVyPOezqf8bfVcPwV+/icJrKiUcTNLM71TpQ/efcfe7biSqqU52jv7dBPj1dHdRScE3ZvFosHt31TLJYHd558KH1W24WRpwW7YFz7nZt4kWDJH3TWNeZEw05JyJTS4v26OCkQcPiqVmQk2cXJstOABPM2cxKP+UcLrsBvjhYLJYLZliZX+JTQmcyGTSDBbPVHndvfKXprecLMV7vr8x0QWdzp+ujd8Loh6ZbVnWv5rLu5V/5+Ll2VHBQKeT6sHt2mKZXqaHTaDbHwJdmdn/84t6+Ux1NMIo/quUbPzV+nfaXYkRBjDgDMVE16lSG+Vi5llU/Oq9vcJ8/yr5TLU+zR4PNFLhy607l7DOCQ2FCLEJdry9fP3/1+sm1G1c+uHPn6PDA+/7d6fnZ+Ztnz54/f/la1bltbDcsVseffvnNR59+4aZ5tyORlIQcbkrjWGRM/EzIfzEdxWNWo1SXusQ044SIQnlUyZiWYQY1iuJV+r0ahjB2VLFFwKOU2OE55+Wq/eDDzy4vT58/f3Ll5OjDDz4+uXpi2X79d79+8NG9z3/5+dMXb3/88dG3P37/7Xd/YdbcDevu8i9/+Nff/e7Xx1dP7t67Q642ZGYCUc6ZiIgFXCZ7jH4a08uHGzBUgIU9rqEKLxUhnOKhPd9eXauPyoiqiPPQYoJqM7Q+XqmCxJlU1KgeUz5tLnN7LPgYUU5qGDNrbIzLCeM163/UG2AWpgNVOUdDPRqV0cj4dKPxZ/t4sq6E10Ufc4OjMo+GpH7qPQteXyeuF4kkn94gPmazFcYsTnAqybgYdluxj5v56ODZzZyJQUJJswm112/dE8Pm7I16NiPmpNnW64v15qwfNizOTESNMHNKXbdOq7QbdtmVU3t89RpJ2297bkgipC8rPxvuGS9TgjA+vnr92s3bTbt0ZE6JbPbaE7tP067sr898c6ptDt88wgJMGfFRvuqvZteZydJI1426MKrv/M+emR1N+mjo5k87YYU9VETTQ4+PNBPpvY/UZRtvPLrFmV2f00fFbQWfg7Hlv1re6ZWK5RrvWvTNDZ5QvHZQ/yNlum8kvBLCswWaxbNedd2nRalFOLE1xWlFcBZHmAvlyJyTD9k22+2LF48Plu3nn3xy8/YtgW+2F29fvnjy7MnzV6/fnK7XO1WQu3z+5Re//OKLew8+Iqips3s2jcbCODiZAAMc5VSCMsefaNLE4meLAYl1rrJcBO2vERvKWxXzSmXhfEom1q1lwAIGhslkjsMqHRhUF4vmkw8//37oHj56fOXkytHJ0Z2714d+uHvnyp07Nz55t31w5/bB6rDfdS/ePBzyFrDt2ek//Y//cv3G9ZOjo8WCSUEkrpFgcCcnFnJArQhhYaa4CPm4EVWMAczh8RQYTII5vT+POcnx3wVXzILAEVvsCTSNia2a/Kpi5COJMwppZa0xiu7+5edPN9uZ0T7TqHQjHbBnCt4Hlft/5li+ukqvDm3WkFq/OZZOj5Iy+Z3JVoVpHN3n3o2nnRq56DnWq2Br9vYzKDbyjfUJCwkU86DMii6zxDGicDARhFlbXbVHYvdBuDx9RdIMw25QNbecMwn67Y5TMmMjV/dFuzC1Vy/fDIrV4ZUr125evX778MqV04szEmYmYnEzApejjOtjxoO1qblx/ebVK1cJTsSmLjxaZZrJ07/7Z4bnZ+HbxOR5Xe/Jy48m8L29H2/jM1Hx6bSFMfs87uGc0XCf3X9yBOO3xwziqBL10zRdbiLHsC9vEwKYO5X43sz8T1YLe4FWJRspEqsjY1H1bnzD8afwkpFxJK/9KsVwjg6m7uQsjCkIaE8hi7vx2bdmDrperRwDUWMQdVcbWJiZHTRsu9dvnnnWezdv3rx29XCxgPXby9Nnzx7+8POPL1+9pdR0ebfdbY+v3Pnmb//+m9/8JjXNbr0lJIdRsRwTiY29V66rVCH8DI8GwPfxsOpQmxoI+Pwd3EHE/r7nL/anwL/JOMYx70SAqjIROEahG5yv3bzxKX/905/+5+OfHq2Wq8X9u9zKanFws2mWB9s2STYM2v3lx8XDh9/h3JL5wz/+7h+Pj25eO/r1r//m8Npyt+7yMLAImCw7xAhxNBxgEGYSHs1AsT8llzGzWHOTNNvUPUtVAqGJyKm/HBHPJOfjL8e/VbYx/k6jsHoBjhNAmqzA7OPksw2oD0lF0Mb9m5OgtPfR9/6MqAhjjETvf7wafq/Db2dAZ6Kkqk7Vd5uJFYoY7d94MtXjb+st529ONn2jYmqPc3SLaQ2ihTGHxYWRqtYsCt/MiBgWrVdkpiklyw4i5qY5OFwdX911m0yU+95YFAQHMy+Wbd6oWs6amRMRbTdbZbrsNi7p4OTKnXsPrt96dHZ5IW1qh5RN1Wh0mnM5cPck7cFqdXJ8BBavQdHkqicVmxnbeXI4lmfU4UpTzPaNMBPp+Vb/9R/H/G7Yk5zZXtddCkhY1WbfZNOsS2oqX5gRRnv3qZozScj0QNPC1S+P+lkWh4KWoWL4ffa2teijFi2WF/FJsGYPPcWRBFA5MSihdCyWdrVRE0PcvcqZV/Jnb68mndoLc2tCCuXxq9qM9ih+lAgkpH1+8/b1+enZvTu379y6devWTc757NW71y9f/PTo4aOfX759u95uh35QN/ng088++eyzGzdvqeZ4ahZ2tTKEuO5NtcwjWTHneL0qbzz/7F9eCZ3wFbNlq68z7m4dzTlu6WxxJw9UQxCPg7NZiqKK3Lxxq3vwi4c//uHx40eHh8ujk2MAzTId5OX1q1e++PIjN10cNA3Z48cPFXj7/M13f/jTf799b7G88nd/+2tpDErmSgYRMtUkEkBehKvNYuLxQd3mQGt0lSMhuZf6mvnOIoVT1c78Ens/m+iPPdGYCV68vJeancoozR6oOt7Jlo9WebamewbWMcL16WVG++57GIrm35+ZCKfx5+UpvFLDo0Hw2RWwh7Kq+tOUfijPPH54krfxRjXTV5Z3XO/ypHUlvBwA6l7ZrpBrUIFwxab67BSLGlAQ16iUwCIMdjIHnJjbdnF0vOqvbVmoVwxDszhpV8eOtxCGGBM8q8eUCaaD42MFDe7NwcGdjx/ceXLvzenLru8Xi+WuH4BhupO7VWDNoHbRXr9yY7U4WO+2QJllMi0mzZdktsfzzZ7veLVGM5P/3rrOV3GsmsL8I39lid8j3EMGKnDeU/+yrzV1XCmsUeGpXm1+18liTgWbM8GeskGTGu2p2ayMLfzN3uOGjY7v1UiV6tvvvbjv/Y1K+JMKzKqvDKe9d/XxfHifub2J9q2kc13ucXxe1GOWLGxVxJKIczNN3BqD3Pp+9+btywXjwwf3rx6cCBm8e/P62Y8//fD0yYufHz07P98Nhmw4uXrz69/++rNffJ4S7XZd1CkXpR4HeUbxS+HDAhBjdJru5uO+Tq85SmRZXBstQt24qZplb1GLEPjoMGi6II2fcEi0XgMgZqecBxG5c/v+Zrd+/uKnq8fXEi+u3DyGmko+vHa4unJ4sDxcHR+eHBxdPbn24vVLN968O/3n//pfmJNp/uSTj1bLVWoaywoHgcwMDCYJqzHxxmFfvDrludvb816z5NNoxKbPjFKzrwpe0XCFZvsLVCWhfJ5sz/t6tdMjlzlndoHJEfj+0leDOk2g3L8ryjf23PLMp809zPRqtcamfq8Ge2N4P1faMQk8IrBKhlcSa7aINFk4qkWf8Fpt7RNnZLN3mULZIlw0GRv3aP2IchpYeY44E8KZ2ctU6AJiQQA7CExulM0ScVoeHl+9zdzsNkMadHnQLQ5PDg+PT9dbR+9uqREWVtUrJ8eLxUqaBZqmOVje+/CDX3z19cu3b148e4Z+J0Jtk7IaWEzV4FGoDKach6ZdpIZ16IZ+ADNHVXQ1XGVFqCzhbPfe39U5R1IVrRr8cVswCyTf86gAapnO+NNR/v4aJk+uPKxWBeOF3fLJJdGk7bNtm9sPn8GRcQvnbiD8eZmqWhdkirqp3KMKSQVP1fKPajxT7eISqJIjo4JRnJ1U7Z8jFZ86zhGp6l0v7aPXmjhjFFs5Pyg3eMm9huC6U0VZuMKW6AMnd/P1dvvy5Yvt5fknH39w986tFrw5P1+/e/Hi5bNvv/vx8YvX707XfQ9ZLJomffHrX33y2ac3795zgIVhZjkTCzGN+rg/2KVYPkxDM6bHLTCpvtGYOkE169Mq1LIFr8JQX7L8GvMx0TS5vHgqjmE3RoBzYrgZAWbtcnH33kfb3fmPjx6tVqvl4aJJtDpcNoMKNekuu+r63bvL09cvnj29eeP24+c/vXr29B//9//9/OL8P/2n//TlL784uXbkcFcnIudiQIXY4MXOuJPvmZW6NsVjz8Rn+uekm5W+nmbbT5I+xxcjNzn+fNLKiYQsxeJFYYhoWjIKODiTwaA/aBTE9/ZvVCufUNR4vz0Ptv9gkxmZ/W2sWJ62PMxDUZsYuDlL8c31sbrAqvnTMIrZso+eDnX6f/VS8b/ybOMgvHBCdQ3JavJp8rm1eKSYh9HklADI41RrIoKGqVCA4DHh2bNbs0gH6Qjk3XZo2iYP+eT4+urgXdOcM+0gTO5Nkt48LRbHJ1cWq5W5HxweLa9e/+UmP3ny7Pz8/Oz0FRGaRsw8qzqRO8fYdCZxYHV02LZLI+aU1AwohUB/TdpMQohpj0Z7PpnVIgkzE4OZbXqv4GrmD8KW71ntcU/n7r1A3Hk+F9Ha856OzKjkMpXPp2+MAjpJXwEy07uMgeukKxh5BQJ5bfgZrU0RIyo/n+qfpzcZx8JXKzarV3MGjTljkMHgKaxkPEp591H4aMyMFMxFlRgrt+TpmcediUhg/oN6jSjUEQDtoiVQHvp3r18//un7W7dv3L15++hgtbtcv3zx9PnDn/78xz//6dvv3r3bBKy93Gxu3v7gy9/+/S+/+iaJdNstnIjIzBU58rs84Ypy/m9hQuqw52J/vMwhnRPYc+ZuMmczEZgsxJ6M0ugqavvtPMFVTZ+XfQGAbIAb3Mw5Navj4w8++vzJo+9+fPQToNdv3rh27Qo7qeb15XnXXy4aPTxoj44XncvdmzcG51dPH+XcUe6GzebrX39z884tMx+6nWUkYdXsxBTHC8T28xjNVhvi487svdOUBan/OWPwa15k0tuiWIRa9T+Twmoep1Wl0TCjEpmjRaymzifEUJbQfTJuo47Uh60Gt0r31F8/s/9zmPKeSZ7feM4VVPpl+v2UKBzvXp99XJaaga1dKBFRu6POdRwN2R5VNiMu4UBtJ0S0oMdCEiUnVJTjVccAEDGjxNmYTFyR6zhcD0Js5kZE5AwWciUjBzMRrY6PrimvL9qh69tXb8lTIw2pw2zRLpZtq10GcHB4uGhb4kSNeOLrd259/suvX755ffbmFdAMuR969Qox4zg/ZhZtTq7eWCwX3W43mDVNa24SBwAwlXetCsLjvtHMmFZLxlT/jumPTyTPaIPGzauFAB5zlvdkY2/JMWrxtMe1r38/pIg19sqEjAoFAsjH/M2ISMbai5EIH9m58U5zpwYUn13vV2O/SXccXjt4CNMl4zNSVL6i1+pJ6vPUk8RBZdofg9NMYebVpjM7F8q1b/Aq1CibMmYnphXm0RaSoQwOZeIhD0lEhKHYrrdPH/1wfLj48P69k+NDs7zdnD788ec//f6PP/z0w4sn7y63AzLvhoGl+eSrLx98/PGV67ecyZzcckoNc3FPo5cqR2LPqL/RDM3CTh/3ddyjKmDTJuKvxC2EqRqFuV77lAHz6XeTQEc/VjkvCUk4u/emDfPJydV856Onj3/4y08/fQE6PDwmsOZ8cXn27s3r09OzXdcvFwtkvXJ8db0dXu7evHv16r/9n///i8tLBf6++bvDK4fslBKbGRzg6LUvD7J/MFV9Pp/td9GW+EgRj7H5q+5zxZ6YL2wVPp+/bmUqxhqhYuQjGsV0mTnTubfQ05OOlPvkbmY3G4VtiteKCtevVUfy79yjuLlRkTFioPd4vumZK5oZvdeMuY98k9W/zdRnUpX6dpOdGa3/HgtXcVf4l3DZBlBIezEUIA+zWP9e5G7WgkFEBI6f29h+i1IDHlR9atrlygRXuouLo9WRoGnA7G45U2osZ+hweHB45eTK8uDQiUioVzs4XH302ccv3z3fXL57/fzF5eWlZu1zb+5MDC/XP1gefvTJZ1euXlNHzsqSmaXsou0VuFTumupuz/Zh4mJGWFoWsjiEyvaOnadzozm2e5QdqzRMnXpZLcFYOEZ1dvxs14vuYqxiqUIzOpHxyQj4qxNgarRINGlTsdoVHk5QftLGSWy94Ce32spTlWpE+wDR+Fsb1YQQJz5GSqg0qBjcyRmkZsnNbGoh8RKgeRXcUKzaExCF9l41a5yJWZgxeCFd4Fz9pwf1GPM1hYSEiWE+7HYvXz3JefPlZ18+uHNr0Tab87OXz549fvj4+x9+evjw2dOnbxYHR5tdf77ZfP7VV7/4+psPP/mkWbCrurlwollerOhaUReL7lgen6+a4VgumvmEMamB/T8+E7RRW8urzl6aJkUuMRcwmxBYP1dFNb7t2czMSZDVEvHJ1RtD3z386dsnT5+2iyVUE5EOujk/f/7o59OzU+83LfPq5PjoKJHLYP3b01f/+l//cXnYLprmq2++Pjo+AjNZoDrkrMRgTiEzVWKK6u29TvyQ9gHU6Mkwk9xpo+di6nPrHx8fp1HuX2+MiEb0857PnRRgMu6z5aPxE7Pwe3Le06XcEQo86sZfJwMLSI4tofE1ZxB/xmVWCxuDV+uCVMBLE0yj0RLXALOC8fHxRh0v0GWvG628/GgkqnVyrvEt6laNFFhdYae6GpH19wL+Anvx2AWopXHcxTn8VWpbuF+5dvPo5PWNG7fevHtxtGj6xMo25K2pP3hw786dm0eHx+425OxAatK1Gze/+vVvhOUvv//9zz9+33VdWm8ULkIADeaDdrdu3f/iiy/vffiA2VNKHEkKVPtRusb+Kmta37uuX8n0UF2UooPl1KzRdYw4ADRf8yIBk9Eced9ZxrTWJRR5LtHbtN8V1BWkObqnmmsMrD5LDdQ3BHlUYsV7+hhKTzo5gtE6hiHcHTlKAnOSQ6pWFjWGtJr/AcGMUQf5xJs4eNL5eJugE30UzRS2q25JVBygmEb3MWNQNEmrEwxHYwZQHRdZFLvG9pFcIIe7xShwuLmQpCSm+ubtq7PT1x9//MmNm7faxaLbrl8+ffrnP/zxp59+evLsxdt3a2XZ9P1mtzu+cvWLb775/Be/uH33HpN5clFRy2aGuQpg/BfVMMX3jDQmSqPu43vHTYxuYoSxo3/F3EaMQhzsx/Th+H8q6U4EIzdR2V6doomwA+6m5O1ycf3q7f5+f3n6+udHjxdERweL1OD4uPngwY1r1xevT5cvnr/bdt3hqv2bb752su8f/+Xlm9d/+Kd/bmUhkr7++uvVUWvqYDZ3LoOwvQxJsiqZVDe32qHJNk5wvf5qrAn2Kpt140coOctqzdZyJKUnzRn5xbEzeEJR5fYjzH/PK4waillKwGcfcp+JACF4ytGB0+xudYd91LYxtp2eo/qFsDcjgh/VbPrEvq/yktuIKKUwAyUrRpPhGT3SFH7MSIwZr1xIHaqLXm48sQEoWlfUdfxxKR+tWZZaHV6NQgG4jAYahRrgJKtrTXrQ9a/fnj568nCxXFnfn7972yyWq8OjGzdvX792XaTd9Z06MagflFr58MMPBMyg9fqy2+22l+tu6HPOAhLhrHrvwcf37t6/fu3mbhiSkJvaBIvqg86Ua3xTrq9gZafmiGC276iiUT/g42XmETqNkldXbzTCXvdtChPHIpzqdKp4jmDDpgCZRiNd0jojsT9qB6ap/U6oKzDFCMXjePRhTa87I029/F8gXJ7kCGPcUx1LNCHNFqtaY2iMYaqjAeBMREg+hj6jxRyNVdHd2CvMb+TVJ1TbN+lsvQ5ZuIOw/AZTT4k5CTt2uT89f7tqmrt376yapQ59tzl/9ujnn3/+6ccffnrx6lXX+eHJ4ds3l53is48/+erXv/3ll7/kPAxDTxRRZK0vcjcCE7OTjdsUlrecPDmCodEdzAIujGs764waxRTT50p8U4GZV1dQdnFPtMexFEXELNpz3EIWLaY0EqzPqWU3tKvVrbsfLJr28vzF2zfvrhysbt++eefOzasnxxfn52/fnj669vLZ45dN03742Ud00H74i7vf//jjv/7un//1//jPosPhIn3+xVcHJ4f9YDrknJVFIstTgMvMuADTdk1nWlSLOZlWHiPXmREfX2q22ZiWYbT+8/yXz1dz5q2rURs/OtPwmcCFdNbNqbq0d7n5Xya0P8qlo+7+/pfGBLJPbnp06KjIPoTjr+xPebOafvAxCYFQ0j0tHHFfvXeBjoSZ/pVig7HqfBq15jRGKZMLmAzf9Eo0/tjH7RxdtxetdADECneiwYzhbdtySldv375178Nr9z9+d/FGcLlcrtab3dWrd67fuLNaHeS+67oOgLNkUxJqF+nmnZvrzcdv3r3bDnmz7WWz2W4v3A1uS1nevffg2vWbprnsZ1kJHwO0cXDRKJKjWQN5JJPrNIv93faipVQOzwop93KcMRChbyCxOu0YcSQ4UE1ydfRjjReNvqMa5rKWRuNNRixT/C9xaUUKsan/cJ9mvvFY0lBBwyj8M48/ei+f4yGvxHocJ+aIiALRWUslHiLUwWMOjxOtUP5e3FtIjFE5RrDEOLA0v5NXPaYRdY3ucr709WErigoj616tq9c4jYhrJQzHSdBkULfLiwvkfPfm7RvXr3O2ty9ev3j26PGjRz/+9PDZq9fv3p6DmoPUaB6u37z12Rdff/75l0cnR7uLHWA6DKmN6tURzpZ98spe1VTaBLpGmISZJZjMA0UZFo1ZH/fJcVdYVz8QodHoa8qmlSiwKG+soLnFsBRzh5srSnMPm2mcxGBRskm+WLZXrl1jyrv1+vXpm6PDxf2bN68cHl87OjxaLijbSnh5cnzt1jEvlic3P7p/9yZr/vMfv/3DP//LwcFR0x7+8ssv0kIwGAnVCaElB0yj+szXYp4IrcaKJhkvJENd2zmRVeHLnl0bPzHBgYqlJofh03NMN0UNTWbAqvL9/r4Azi+wx+34dL35TX3233M7svej6crvP/LsC/ELmp6TqPqwMFQ+/W2614T2a6m2V6BYQB88uuPn3GSs/2jXS2IZxbqUnr/6OaC6XRiDom2otsUXc1A4DaprZgYwmFgYg+mC0+r46Ob9e/c+/Pj1yyeb9U7RLFrc/uCD2/fuHB6fOIuIxFwJaSVbn9UXq/bOvdufr39pgGd//exZ322zZnf/8KOPPv3s02s3bql7HpTbRjhFatBstN8VlE2lCU5MBovFrAUppdHSZoJUV4hROg8wAreqt14i9XoAnjvVqvARA7iPC+4jIpkQ4sxuhFCWrajxlSOGrJQbBdodZWh8yBqWlWPmw6QU7no/RVUBWY0JUFmE0q7qlWOt1mzuNaaO271Fcq4PXS5cjZO7JbcYoBwIuHA+9bF9ti60f9GabRo9eFHW0biGO63tKnDmciD0bre9OH27XLTXTq60nHa6fvP6+ZOnj77/4fvvvvvh9KJTJxY6vThX0Keff/nVN7+6dv3GbrPt+j7kQAwx6D+yXrGPPjmsuaLNtWas9vB9liIMdfW7VHMy1Vt7bGpsXdjE0QKOLn3ki2jkH4pXsCpoAWYKDgO5QxLDkFUBT0RNszy5ftuzvRjyru/PLy9uXLt6fPU4JVm0i5PrJ9Qmb0jdD5fLr775sk2HVw7v/PM///c//Pd/uXHr1mp5cPfDuyCJ4yjVjYsUUXSEVcku1NyoMDWxGOJWSkdRzpwtyKBa++Icx3h4fqGJYZrM8uR6pj80W+u6CRUhjrpYv0NjBq8i5pC2cjBDzTXRWLQ1u8Ko3dPVR1V7z8BXEmVyTHuZwNEZVX0oVx493jziR43mixYXzQs+2OvjjCs/wS6qwIxnv6qAcoYvmNgIbsRjCFGNPSGQMBOPWQRmdgIsTJaVv9bcR6x+dmeR2w/uf+N/p3nIRpv+u6PD1S9/8+s7H36YDpaqqgY3a5om4KeZctscX7/y0SefpWZxdHD8/Z/+pDq8ev2qSfLVb/7my6++XB0usw2L1crgOWfymGDo7jBXgcTmBpxSODlofCs4SotFUTAmrl62ZiLdEfWSdRuLDa8WkZjCBEVVSoRA5UiiWI8x2TAHBlSBzChCHkd+O6jY/OpNgbrfZekDccb8F3MhGYWoiPBovH3agWK9CvDaRyWVXjcHVU6lqB/Y2cYfTmCNyzXMnFDyvzapCYjJFeae6oPVo+SmW89R014abc92UB07vO+SRvvL5ASoDk7eLluz/PrVs2598eD+3UXT7Nabd2+eP33y9Lsffvzu50cv3py7C5C2m10munnn/me//PzTTz8+vnIyDBsnEw7/pQBgpdalniZY/XDdzOAQqYQnoz+YqghGEEnjSOOaHxld37is9WDB0ls7bt1Y1Fc8cQ0TxsrRuDFGoS5ZEmOw52CqjAgsoqrtYnl85Yaabs9fv3p7dnJ80rZ8cHywPFwcXVvttD/vul2Xd+vzWwf3v/7yF40t+m7z52//9Id/+ZfDo6tIdPv+3XKymwNgsMERjdJUbMhU0rxvbOt6ACCYg6JuCc71lz4ylqO5nARvtGSBJqr3HCttfLprMfn1rzTCLa7ec8JjoyeoD1H2biaPhVGoqYBxMyMXM+Lqufy6z649/1ex/TPPVOP32mQyE7LZF0MFqT7AuJxcrzqSETwRQBznelL1FeMzFPMdltGolAdW0Dg+UBlhZTPcCoSOMNV53xRXIw7SgJhI4UwwMzOLajrLCvDRlYOP04eug7O0x4dXDha3739w7dZtTs2uy8JwiKk5Wz9kZk+ERdtevX6yXDTXr16/cnKSPftf/nT16skvvvrl3fsPOAn6bG4EalJjbgRxKrPrgiFgJi60dDXqhTC16hSJHG6I0+dLbZuh4Jvyz5r/5FlYUIJxIpCZxu0qCAyTxVz30eGlNgljaFfyRBVh5rhXHBcIK6MYCBYImYjNHGU/yIhozP6GWBeU4nPJCUdPFMlUlK12MteqE0XEYoYm1dPUvNh9LhedABGNzAwVz0ITQPISKoRjSKM8VaWbkFF1NBglG9UvuzvGkHeMl4rZrW1TtV8xhjWmhhvGTofN5ux4ubhx5ZjU37x48uTRwx+++/aH73969vT1Zrtr2yNTZ0ps/IuvvvnlF1/duH6j26yzZx2G1LaR6I7GljghF4C5hqkppXJm4xGz5aDLGp6PujpixwncjtNyKh5zK4WbXpcUo7oiEojTRLRS4RBWo65JDaOKuZDqfggMkMHMXZKE+CrMjdJidXzjNoP6zdnri/N+6K8cHTVNe3zlWHZdahbb1L15+foiLW7dvPP51x/09g+ybB4/e/iXf/snYUpJrt24lhrxDMuKGAEGjWQgJndV7feEqivPQ2Gmyhe4FswhitrHQ6vn5g8FXJSgKCxZufIIYwtso+pjRj0smlHs+ChIVTLLk3FRjZBSHxH/rEmjkijuk0DuMykVTVYtD7GPu1eNGvWoVsTRiNx8ulpIyoTGqBikkbia0suVmB6/BkQ/II1JEDdiUK2gKtSNG1do6JicrgcQjlO1UDOS7m6lcZ+Z6ww4Kw2CRDBiJgNUjRkQYkom5anNwYlVsDpe3fvkE10sju7cWjRy5+6ddnU8qJEkdlfPasEewCn1g2U14nT15o3D46tpuVRuTm7du3P72je/+vvDqydubiRkAHOgTHMDxzx7UlMzhxJH53LsEhEgkoiKA4gV8LDVk1tlgllMgfSxYGFKW5attWlPAUBIqgDH7HQDMUsVXaYgAKhCu0rBGzwOV/M4w0WEmb1h5ooYi7dgceJ+MIXDXbgYW3fEBKewKKEYgQeEqMoe5hIIwMyY63gFBxzMbK6jkRnNL4A4vgGoZ65WmpFAhTGMkBEMdzN1s16HVKxTsYMoFNBk06ds1aRQ1VnMQJeX8ZejXhiMmcwNtut2y6Ztkpja5dmZD93ycOVq64v1z9/+9MPPP373/c8Pf352en65XvdM2u16dXzwi88+/eKzDz77+ODo0F2XJNvcw1WzkQhxHMLoGBmK4o+dKh8kVMGXg2pVS538xuZKkS/3GUwsxyEQcUmfqBkVe1OzovHRMFlcZaui50AfABmV3haqeJNAzGJF7ELYoi+6eEs1M0eTUtusXK+p53W/ZXSNpGvt0erwKDXLrP2q3e0uLt26i4vTxcnJZ198YO7cpp9++v6Pv/vnpm2++vXf3rx9XZK5EwuZOdeuQhJyM6t0Ftf2IipmsGCBEZJHCmEsta1vOhO7woqOjOH802O0NQp1gQcYRWsmXQGCKvCuMUe11T7NW4j1H2E9lVSX+cyIe0R2GAW5Qply6yrN7i5UuqlAMDOObzIiZ1bfy4ozCJPLpQTfzYhKoI1otqrWqEqUj3EPaARVE4FRJIScnR1BUMDN3NTMncLaBjdLxEzg6PtmJgZVRtiZiYTgMC8FnsREnODurlCIMJigTIKIDwLyKBEI0goxq9vgaI8WN27fkiTmvlgdbgbfaUdOC5ZyICrDXQw0DDkxFomNZXHU3sJdsNy9f+/4+OTWg/uZpB9yPwyqlDVnHYY8aB48XDVzztlN4RASZjCJCAtx/EuYmdOgg2omYmZiJweYSUQCihBNCKwqWsEdBBCxuxU0X7FzAO16ZoMLRT4EI062qDCsGKTmTR0wd2W31KbFghuSRJFoYcBdLUyEEjF40/fkBpcSQoIYru488hURNjB5nKQAg9V5UmpEGLN30TRXTldxB5dea3dyNcA5pg0U2YwJO1RjHypGEXCHZc/Ww5FNVYddt0tUEZaXU5CqgmEU26K+7oDP1oWmgIEAh41DECL+cgvCzhOLwzX3fd+dnb61XSci67Pzl0+fffun77979PDHn569eP1u2w/Lw+Ou77LpcnX01a+++cXnn9+5e3MYtkwCwI3ykOFOSYSZ3MyU3IlJfdx8ApwLU1T5lgjrJhjm7sZMMUk+ZqepVvDOzBHVMRlFQ2Y5c52ZI2ouYKUY0NJ5TBTsZbE3VPGhuSHOwQuQQ6QjNHRjISIyC6jEntXI2YmbxcGVG7Y93+7WvL5slw3EmeXKlavHR/lwdbDddG/Pz7q1J2k/+vT+drfrNttHPz/6/uDw5MpJ07Srw9YdyWWKQWqLykiBmFutJPY6NIkorB0gUuxrWDE3Y5Ix2OQaPxX3O9YBFIgQcQTVMWXV6BaZcacyr9rcqrBNbbOjzR5j0uK8o+aYK6gBQJG2iJ03R3gRiuqwGt1VKFT8jBeNceM6Ui0kvB5YHzUB1etMuTUva1HGHsTkfR4dwxibz7IOVEE8SmEcRhtV2pHcPEkSRoSrwZ6perYBRGEyQsu57ogkYWE3ELu5q2oSLh3mDmYQM5jj1NA8DCwMYXN0mnd9r2qDqrmr5qzOjZycnLh323WvfXbC2fnFdr1zAvWZzs+YxTOWTduCwCwLEiFpWVV16A6Xq4NVOS51cXhy5+AEhMtdvz497XrddUNWDNny0PdDNwy9a475FGoaspM4wZ2ZE1ESEUlN0y6WCxHJOW+2Gy+iRUzcNE1KTRJukjTCbds0KTVNw8QpRQLMQTC12mBVmDlhIeYCcCOqmOydw9xdXeGaYdlNHWBQ0yQiJo4GOU/ky5aWjTAhLshMRKyqAA1Zd0POQz/0w2BmTuBExCklIibAKqCEU5y9HKejCAlJ4A4zuLq5RbsQjUaMmBFBXiWhWQKuOUAW57c5TW9NXFMs5o4ha7frhz5n027ohmFYb9bJK1NEIx4ZabBKDs/EO5BFDUoxRu+AmQMFGaEEBAj6y7Nm7HR49+LZi2cPFyltt7vXz17+/P13Pz5+/OPPj5+8fL3tc87WLphFSP3+Rx9+9NFHH33w0aJpLzebrN2ybZskqkMSEYAsW8VkjIAGY0xXQXhgdnfXqIh3MCWRAiQL6FbUmBEIeEFwkLtmIyFmigOPqFhAcBIL/4boiwOzlHY6AoG0Xo4ZZiNFx4XDYAbqwE6vkUxFvdI0TAw1SaldHA9MO6DP29dnp32/ODk4TMTL5eLk8HghTddtzy4uPa1ODg4++ehut95s1ufPH/746NZNSe2Hn3y0WC0H9ZY5myeQkjOxmhHHEoUpLNOKUkSgzOQUDjLgiWouvQUsNahEZS/cp2ETrkEMxCyyWNBydFHpQa9xQIFg8V+FODEvfYYVxnsJzrzCkBJ+FsKkII3ISZQNn5cfMVjVaMx3FEFQrvwfCxNE3eO0BqoEg9fGciZQBeBUE8Ih1YUadIPDRjDtQR9ERFcOVqrVOYHxZumIcDtsRMRETEbEbZImSbg3VbFF44iADeGoa/hNgAvADQsLEXLOQ9ZhGIbswYxKEss5q7q5qmYzNc1m2667vNxsN9uhz14xQWqW7eJcdSDAB+112HQ7VVXVlBo3NQOcGmmTg1jSIjUL4QZdt2uYF+2ubdaBbtzM1N3Rab5cX3S99v3g4JxVNZuqWjbNHiLisewMczgkldbNlBKzNE0jxOaasw59pzBykhQH1TRMJMKLNi1Xy+VicXx0dLBcLZeLJiUiMrNhGIYhm5u7EoiZl4vFYtlyAfQWYT4BImxmRK7Z3LPlnuEMc7eWpCVODGkSs7khETfsKyFuUoq560FQETvQZ9/t+rOLy+2Qd0M2J2ZJ0rRN0ywWqRECJImpOiBEUXHhDjUzQFVV8zDkfui7vlc1STJky3lgsCQRYSZOwsLUNk3bNG5mqu6xy0okbprVQMQsGqbK3c13/bDdbPt+yHnY9X0/9LvNJjGzldk5wJgqqIWj8aNo+KoMby0R8Zrqi8Ohi0aaFQDirp5NpeGmbWwYuu3l2bs32/PzdHz89tWrZw+f/fH3f/npyZNHT59s+pzdpGlAZOCT67e//JvffvXr3968fXO32Zp6kqBzjFkYMLfElBp2UJQmEJNrSSwlZnPALWsmApOwEDlUncPIMqvqkIdS8eKAa+Q0mqZtGwak7wZhMrU4KCPOmhERFgnll8Qln1azPgYnsBVjFjwjFe4pnGKpLI5iXPY4dp5oNGfmLkzGcHVpG058kJrFajGcn+7O31peD13XnPHJ8fFqcWDs169fb1Pz7uyixfLO9avDpx9frk//9Jfvf/zzn1bL1XLRXr97l0iwWrn5btdJYpHkhNwPIuy1dEQSAa45C4s05GrMTCLull1BYJEaRIWxi+CSTB0U470MJddY2mRKw2EABK+UmZXPVAq/hibT2MKK4jWMUzljBDDT8mkqUYUjyu0dphkRF0Sig4Jv9hSYraJ4JiGQubkqhNxZDeP0SlMraT3iMPwRpDFRlK1EPhZ7uQ5EuS0xu1Hh8Yt9JsBmGd7qPqbKHHIHMYLNTiKBTuMFSKhJklIyt13X7ba7ISuI3GFBFLoxS7tcpNQSU1bbdv3lerPe7tTcSQDpVbtdl3MehkFNc86a1YChz33OUFczImmaVn1n9ibnLCmJSFbt+h4MGMy2REJEWTVRlwggkSROZp6JIMKJmDnF0rLw0PVG6Lq+7wcDVF2Ys1pEN8JMaHIeWGKnBBRw0U0nSk11S9gSyIiEKYQC7oNmAtx7mBERs0ubFm17eHCwXCwPVgdN00R8OAy95qzmpoNqXrTtydGV5WopUph+JiLyNjUx4FEYyJoEib1tpCEhQgIzOYkTMsGbNjWJ29Q0khwYzHLfD9mGrOZsoPV29/rt2buL8y7brusdzMTLxergaHVIPGRtRNTifCi23PXdsOu6YdBB85B1t+vyMORh6Ic+D2qam0XjYFXLfQ+iJomISOLlYnl0eNg2C3OzPJiaWjZAFWY66BDs0WDZsrm5qfd5GIasmtVdNat5t9smd48DugpgL/1KFBFZDcRLMEultn4MmUMl2UvSDE4opEKounoiNlMbhvO37969fnPx9kzVum333bff/eWHn15fnF7sdi7JemuEVZWUPvzkk1989sWDBx+D0ruzs37YevbVaiUMYZBbI027apNQqIOaac5935tpkxpmNseQB3dPSYi5SYm8dJZ4ViViQiI4I0bnEsjNAE7CDAf7ctnsut1uuzNY1iwpgTjnzAObm0iCChOrR4GFmDsDahZ/VTeKBBRzMXYE98BytTGEynoRQMJwb4hFGHBvE0ewkMBga7Pzxsm2w9D7MHT9lau2XC7Tsj04Ohr6LZDJ8p07J1/rLzbb7fO3b589ebQ4OHZK7fHJxeXGyD37yFwRcYyc6/vcLheL1VLzYDmbqjRJWJbLRZOYmNs2iYgTLA+By0uRbQlm2EpWKwSGzMoUcC7zn2qAGvhdgj4aGRgvbHikW2OkNeBW6h+iYpxqGajDGXWotEWSxQBnkiDf3QIcROTBzBQEkbsKsXumqDMSKvGcIwg/EKkSyMPHw2EKc63aQOQuzEkSkZiZm2XNGqEDSaLkhKDmR+7HzeagqnaRuLpPjdXEQmjaRkjcrcvZB1U1U01Ns1gszGzXdecXF92uJ2ZTy4OpmsNFeLFakRMxq1k/DBfrzcXlOquqYci+6zp3DP2g6mbRg2IsyQFJrZvnDLesPZxl010yCzqNqpIgneCkvXICADUatGMiFrGdGQymMFosWiFxGrpuGxRLzhqxkBlYIlVXiseYSFVZmBtxdycyVQYzSSkFRQA4dxJQiSCtnIhCLGyqAT8jD6Kqw27odsP55SYJt6kVEQaBoJrdnFmyDkPul4vFq+a0bRYszHCOcadNk0SIPCVeNLwUvnH1+OjK0WrRNsxJQkf6PmcCGmFqeLk8aNIi52GzvbzY7Po+b3f9dlBz6rrhcrs9vbjY7YZsyDk7KEm7bHVQ7HqLQlKDa1Z174dhs95ut5vdbqdmfdfnIbuZqUUmKSgmNY+AJrXCJMPQpzatVsuDg0NGSXK4aRyR4pCseeh7Nydmq0xSqEEgvsihBl5OEHb1IqgB5aL/TgQoMwhNKQqkou0udF6ttOFZaG5ospepz5FME05OtD5fv33z4uXTp08fPb64OLXXby4uTh/9/PTF2zcXu37Ta2oIkL7vOMnR8Y2PP//8zv0HZ+eXby8uLi4vu13HJOl8zYAImja1qZW1CCOrBpoys6HP7jmlVk01a87ZyZskSVJKqRFZNNIkUUfbNBBKIsRChNSWGeUsEghLLXe7brfrul3X5xypQDU3NYcxiyRpUiMsKaWUmqZpI7hPIqpayQoyU3EiqX5TDSIRgIoIAHMxVTDcIInNXOF9r+qWh8GzM9yz2q4zZ2ERIqZ8eXG5GV4crw6Pr16VNp3cuNn3vQzmw/DhB3ekSd99//Dxs+cvnzwahnx08ybSQglmzgzLSsTEwiQRbTIzC/d5IFCUNAjxwWrVtKlp2oPDg6YREHLXOyyqHoi5aVthATznHAkhhqemqZypuKuH3AXXxmVV3NzNSKLI0cCB5wt9HnUtJcPqMUJ73zuQEBO7s3BEe8QUOI+ZzEqwQiKR4fCQTHLE8wBmulytFm0bbnuz2XRdl81zVmbhVgisqpqzWXZzcmNJiyQHRwepXYDJs3abzW6323U9wMvlclB3c0lEHLU5Y9YpkgRUo0JY8R4RslBKsli0UO8pd7vd5fm5wXNWM3N3EXFDznm72w3dgBBCc83q7pxS03Sqg6upWVYb1LbdDixZve+HnGvPKLhoKPOQzQ2kfTTSuJoTwL5sVyJpyEPOltXRVMI6YmuQO8U0/zBOlQmEDjrYENlpN+SSPeFSX0DEI6NoADsDbmoodUHxppWmrnNsAYMJJKr8zAubHNUL4XjYYa5EcLC5W84Z1JOi1kVGxBAhu7nn3Jtvg3cl8iDvhblJIsKNYNGmK4fLo8NDg3CzSG3KfbfphvOzs+2uB1PbyJXjk7Q8yuSXm91PDx+fnq8H9fVmZySWvevzZr1Zr3ckktqlpMRJ+kxdv1nvBmbK0Dz0amqmajb0eejzMAwwB3MeMgFJJEq2JElq2pSSGw25ZzALD8PgjqFXzevNZkuOmkOOoW5I7VLNhqFzjclgTJCC3wEiJ+FItCchtJLW205IBh3icHYAIizcqHvfD6qqUZGgRpCUkpurDuZGjJRaAF3f9f1gMeqDCO5CEMLBanmwkL7Td+/Ov/vL969fPH/2+Ong/fnp+vLy7M3rtxeb3a7LkkTAxDTkgT3d++SjO/c+bA9Onr8+Hazf9b1nJ+LcDUmQmtRIihoAh8HM3DiFrypVj6pDHsLF2nK5bJsmMR0s2oOD5cnRIREPeXAjy5kTi4h16o7UNEHWDHno+qHruu12d3G53u46CPd9NnfNmYjSoo2zaBLxYrlYLJbL5UFqm8SNQ1GT7w6EiRQRApu5C4tIuEknyapZdch50Dx0OXsesg05d/3Q9UPOuus66wZyWxCvSG+eLG8eLsHSYX359u1bPr3Z9ycnR0fHx6vlwdHVNp2ut7vN7atH+OTB+mLz488/7Pp8A45mqYQ+a1os3NQUbqjGEBpI1iHCcBNOUF2ulot20bRN0yQpBXzmdbJEu2hF2jKO0t1hDEqJmySHq9XR0XHTuKpq3+fcj/U6TCwiIkEQBv4FucGdAgk7mMOwkzsCtpYIwN1YSpBJYJag8iKWahsxy+AoKmciEeFIPfW9Dn03ZA1E3g/dsm0WV06Oj44gsl5vt9vufL1ebzs1Y5II3IY8WM7uHg/TiBwfHykkNerwbhg2l+vdbtd1AxztYuHEphmEOCY3PE5kUKoD8JjcbNmiYAGWWWS1WLarVkjMsV1fXl5e9jr0XY6EnjBHM1Hf9SBxj8RkcEek2jP34WiHITugTtmVk6tTVieWnMvyOrG5wjybMrErYLWn1ByuxE2tqFMSqkWFHqs6LjwYhlwLQlyEsmeDU9RhM7lG8BUVWA71SN2XYgurJTgcE1GcDVT65cfaxcihuMIiZmLhyC4UYBUZpUJSsxdJShXhklaw6yA2wMldlJC1eBIClJxcCXlISdgBbRohwun5pm1XZiyCvu9Oz87evH41DLnXYdG2d256j0ZS++bdu+8fvnh7ejE41FjSKs46zt5Qy6aeldTd+mxqbqZ549BsGW5RWAjiQGPsIk1Mcg4qJYSnpODglig5sTOZWcQEVoC9FmIm6s6MIKRq5CTcohLRSVgk1YxsEJwMN1U3G9KPPz8nwJCFOAkvFovVciVtO+Rhu95udpt+GKKqvk2LJI2pah66frc8WB0dHQ1ql+vL3bbLVpppLWdhWia5ffNGurHcrs8f/vzzn//45xfPnm7W6+zDxdnlen252e6MGESJKlhIsjg4vvPRx8ujay9evbu8uFRQzoOkJMxulhLToITO1AodQW4GSalpWmmk73am2VQt2mvdu96XbT5YrZL4AZpeoZ61790zA8TUtE0U3IVNj2jGnFTtcr05fXuq8F3X55zVXLNJI4vlIljgZbsYhtx3eci6Wi0PDk8SSeF2xh53AJTMfMg6ZPVuyFnNPZutt9td1/XD0A/Dbrvrh2HXdbtuAIuZEzdEyLuB3BaJD4ScSKi5cdBIczjY2ydPHj1++vjWjVsP7n1w54MHR9IcX7nSNg0B3Tbfv3v75ZvXm9PTdHCYlodysDBKm93OQe6wQYP6ZmZ1HtSSpGGIEu0snNabftc7Y5s1h/UXJhJyN5bEkoLUII4uNmImJlou2pOTo+N1v1ws3GzodzlnVyVGSmmxWCwXrUhqm9SmxCwpcSS1RLigtloIb24JMEefc9/nKLFwMgomBXZwcLBo29S0BNKs/dD3XafuiQliBlO1ruv6odcc5eZRwAUz6XZZ8+Wu796en795c3q53e66YRjUmfKgVk8YLeEIaLFo19uhXVyau+ahH4Y8aKRPTeF8bkEGuUVLObNwGfJhtTabJCVJKUxi7gdib5smiUhKwuLufd9nHYY+b7e7vt8R8erwKEljZnD2mKhMQswgsuxmnncdSicKu5OaKWgIylfNyT1HbYIFIeUwU1MCwcrRTAojYZAqaTQfRXmaZ4zfdKdaDu8agdsI29Xch6zCzFGWSSU1E04iaklqQtGj0MrMamGZU2RXguQncnWFOHvNx0dnrVUStcgGOcWB18TR4FoP1AqWhcjHPH2hEKNTiJklmKgotUjEIhI9ZH22N2eXWe3t+cWqbZg598N2t7m8vBy6Xt3adnl6kY9fXwindxcX796tewM4OYmqkwoxQQRkzGGfS+OAu5uVHKUbARxlNcwpKjG0kjQBO+IsN+ScVXgYzEGgIfcOEEvIWAwVCCZWUirtgEKxN6YGKoU5ahr9lfFEpe6oZo7TH7//iQFiEzAzrQ5Wy8WKm2YYhl3XbdbrIQ9qnpp2tTw0hWk2y6q5XbSrg3NV7YZhs95awT0qIpbzwbLh9sD9/MXTR3/8y/d//vb701evIZRz3/V9N+xUzWwIrKGWAwScXL92eHzVmsW7i03OUdUhfXZAOZEZuWU4O9zyoOoslKTx3lLOvh3MVYjgyUHEyd1Vue9p0fKuw9lFt+sNOgz9VvsuwtLFaknMXd+X+k4iEIXOZtWMIHhBJMiac++ZOKNJwsz94Gq79bo7VktNq4rUpmHQoR+6YZezaTmWnbu+73f9drcb+mGz3cW9ur4fVFFKS+HAtuthTonImYWaxUJWy6joyz68vtxZ1m5NJwero9Wt7XH/5PnPr9683e0GbhaqEGC1TDdu3MhD/vrLT0/P3/z8/NX67PWKaLFcBNGEkr8N3RQziJAzJ0kKJUESZkjWfhhMhM1ZNZy7gZyF2d37IXhCEXYCCbupu226vMt6cdEt2gVHrEFODmlYUkrbPklatO1q1R7k5eHhAUvTNIlqoUFW1ayac1aN+jh17fqh7wcz63a9BklAtmikaVo+OEjNghx9v9nsusvLdc7mpc6aUpOSJJYWAX/Nkvmguun04sWrbsiX64vL9Waz7dVhJGpmBh1Us3I5bNSFiZj6TbfeDiyswfw7AnaQiAOqOffKTFE/HrMHSh9W8BtmJEykREMkYIL3oK2KCOC5z0ysmsMyqZHxws0H5SQNMQl4UGVO2VSzu6uSeznhF6SlolQNWdWiURYOhwi7RgAW8I+YxWxMzHBaJOHEIixsDtWsZm7q2RUOqAOmxgBD6pQbd8sIroYIRMJCY1kwSmK8pOU9SjdLHBdzIGpm0cfEeK13VCeqc4DIoKWUMLtzKYV3j3n2XqOBUm4Y1USlMzfqa6mMYTF1Zo5y2ijaD6PDiCoSiJCC1bTvcpcv3p5dMoiZcpfNPehuZpFsb85ep/QO5kMY09Q0KwHgWak2E4Sr9VpaYogqb/XS1eHucZQhB8Plbh7NragVyBqBErqhd/dSpsdEIuRabLcqEaWUCG6aS52BQdXU1DSPOTZmkUEcyKYOV1UHoAoWtpzeXG4FLEKLpmHGZb9l2qnq0A+95ZxzzgpQaoaUBgJpDK5JiXZrvtgmYTMMajlqnN1ZMPRDn+nksr88f/H4+x8fPXn09t3bi4szYjb37EYilJgtdoOGnLNbI8ub9+6vDo/Pz093vbeyTAySJhokQMgcoQ1IHQLzIeAWgzszMjMz5QAPziRuOgxZE3Hq+2zr7Q5wchOBgIQZ5BvtAGS1oe9MrWlS2y6IxR3uyVkGzc6t5mEwz970qv02pwbCBDMRWbSLy+1Al11v57xt+l13frlerzfd0GdVJ86qfT/kQfu+y9k1Zy70I5OIlyMWiJikWQbVCggg6jAnJ8rqYobcd+uLM9brRwf3j0+u37ynZk8eP/z++29XyyWbLw8O1Nrj48MPHjx4d3n5//gP/+HGTz8/fPbm9PxtdqO0bA4OkBbDoMRinvMuM4sngKjPfdTnZDe4RtAelJeX/ptyyALKWT+hgsIiRsieYRg0Z/MtdcIikNQmFmJhqDIrOxhIzMs2HR0fbXtdbjtJTaDVPAzd0A99zsNQ7BdxeAXUc7aymeZBrT9crVRpu82LxcLM15fri8162/VZs4FUcyNt2y6SJGYK4OPuQ/DbOW+2m/Vm3fc598rSymKh7tkCs5O7qJYxZRznaai65ijzZE7xymoEd41i80xqwS9wtIOFLWQRinpvq9ng0n1SpgFSVpjCkC27OzdsuVCpwikbbQeNSQBmsAhvyRwwh1qOzF5JjGt2dyezkm1BKdpTI4FbRpCzVKqRS6iKoJFNB81mOQfpqxaTeSQsmgtxQu2QgFE0ZJT6XwpdiN6bIL1qjXFpTY56wsguEo/TU4o3KRRO9LS5uxtxRHrs9cue4zh7IrB7cROJU6lBj9ozcnOjOm4pGk0YcC4dStHzISJRuWGRFbJh8FI9LyTdoJ2pZYtwhLjU6rs6uk5zzsNFNDazJG5p8M6hBEeOohg3i9IAHkdYwSIJ7yAyNyfAHJEHivcrqdYoTHDiKJMjh5t6xCvMSTWH/XcDSmG6msK0pMRKDY5b1E/HPxlMwm4INtBdHfEUmWCJpDWjRlrjFJw6zPpe+6wGAEmdslmGkykTiyRE40J5I3EHkYA0eEYHO2PX67OXr4f1xfOHj5+/eHZ+cbrt102zdIuRTozaqSwsxKSDHx0cLFeHIk0edOhzJkvSpMTctJKoTS1HBahqafFwgrsO2YjVzbNGJR+xSGoteGOQOtbbjqgjAGQNcUrSsDDByM1UhNQ8DwDxsPNdn4lLMiBrJuZsuR+ym5tS5OuoU4dHJ/rywJpuON1shZMz9X3fDcNu26nD4GrERNkCbogBYEEpC6GYIxtHRBKRqlN0psGdFMrmpsDgjtzZ0DXWnQ27Xdez+u3rx1ev394Nw7OnP/3l++8vzi/vffDB8cmxDvnmnVtXj07aB2l50DLLtw+fvHz91JvjK7jLizjUwTRnBkEYirCQxMQSJY8hsm4aGAtEZf6GM3RQcy8TJ8HqOZIJAVVyjoEtxsjY9cTEKaZ1Uxk6YLpo0/m2a08vGom+6JzdNedBNULgIM3VHWqlXD8tmMjcDKqeLy535xfbNr1NScy86/qu+I6scICXy1VM3HEzdbVaKgqHE1SzaqDU5IOR9kYwd3VETTQ5SMjduaqvEFOpByVVN4e5GSjnXGTSAoc7k8CJSJiIzd21tOyDiRlsTnDPZgY3AkGjr5OIqJTzmRGRCwh5QC5tJFZZJgaIoj4pPLVG/VF0BZNZae0EHGwEdTKD17EKUcjt7moOGryHuzoi4RJ4lMEKJwm4bG6WzUJEiYKIt7Do5ZTV0vAYA3u8dL1HupfqYLtS7VUP0I1H9CiRc0DgI1VkrmGqrNj3mp0ggFniQkRkrmHsS1tXQD+L8JEAMJOiDmcvNVlwCkKLCvgurhJwUYJpJidH4dxIIjeRowaXAaJEkQuH5dyrDkHe1CYULwXEUQdcZ0gimrYAjZKbyJaW2hkQh+0GuasWA8lMGuGAK0Nch/m7ovSRpLD22YZSVFg5J48yLoOzW45QJkSp0HLB9CXN5E7OJq5R92YaclUaC81jwEVSAxgJYBZ182xJZLAhqjeMoNCiLq4LSecX2+FifXZ6fnlxiTKSMFYTrh5aYWbZ1cEszcmNW0cnN0DS95qaJYuYa7YBWZdpZardbtB+N6jF0AlzZyGO5dcg75XcYUlAzAKCCODKSqqDWmYidiciQentY6amSSwyGGAw1SF3aq6qgTIC3uZeyVk4JRIKIwhzUxbqsjuUiN1cCVCQiJOwRN5JiUGeFFTjXJOYWw53zc6lm5/MVUtFlQMkGO2whS3sugbWkl7u8ovLC0p+slpdvXkv5+Hls+e/++Pv3p69e3DvQX5wJ7XNzdu3b12/eXL1kKXpHWe//8vl6emamaWV9lCWLYyyAVpGapm7uVHiOLSvhvBw1IPfwi6bAR6dPpEYNHWUMm3nKNAIyQw3Vlxy1LyaqxN0swNfrkkY2bIZOVh41JLEAoJmNVU4pyR1lqkRk0ZJS9a3dAkzQRAXxsIkKeIVzXmzvQCRZc06RNEaETVNWzSdiFiinsYdjoGcjNyIysQWdTF2Moqxig4P0jzeP14law4s5qUII7IHIklIop8DBa8pGTEnSYJoGCgQDOQUaV4gJjeIAZAI2C3vtlSdVvSclW4HjgxuHDAR7aMKi9mH5lxGwkMdRshlVFwZVkWAuznC06iZq3vYtuCnygAzCm/tblCDmnsCCELgQM6OiuRMASclOGBkzMIkDrUohUN5ekQHTCSDg+gptQBU8g7B5BcuJBY9+CuMAhk997DSM109Q21MLB6uFCqbFp9QprBGQBJP5MXwF0ZU2KCewzc6g92dpfHS5hKLz2CWlt2N3NSdzJxgEfxpHTpQZrqFlyvdf0QcmUuHugcBV4fEhPiMsUz0xhsMFgPxrCjdaLtLXzqDNArGrPqESHBTdcExFSpKkOsxExR98DGISi3t+g4u2vdNkhACdle1KGdUVbhL05ibgsgsO7Ea3E3zoOqucAMLCM5CTMLiDgWiHzoPKszEnNqFZgfKHA9SH3I2MxEx8rZpj69cPz65Ik1rTKlt3UwV6k465J6Hruu73dB3KTXMQkxZM2cmJqPo4rEykkVg2ZlbJugQ5dsMkihQ1aDgADZ1dYL3vZJIKFPA0IgvordBdeQg4NmCDqfEYHBKCuSwhhQNBuQGMuLEGTHcLcQjCyc1h9eGschoICZDE8zihMvSuEelZFFjqn/ExuyqlpEGSm83nWfFDRwsm9s375Pxjz+dP3r8szS8PGiu37yxOGyOr1/3k8xYXFxsXzx+cXH+7M3zZ83q+ODID/iYJZl51gwHhKM2IKa1l+IQoLIEAQRKP1W1idFtr+qKIroEUOlZBYSFmZzZS60CXDXanozcssZgsQBl1DAcksSzdqZ1+Aq5aTdkggi3kXtUV0pkpjDzrEzMwmbOGqNhiVMKpxnheFELwEFDzoX9dgKHHzM3qy17wYowmAsnjjo80qAOdzVXi6bwoEI0ylYi9ckiHJ2GzBIqG7UckKj/pkhFK9WxGA5xYgiQ3Uw9xhZTWTE3V3Pz6A7zcexg9CwWBt24lFnGvIjahC5EzlH76hYzxYJIilFZZQnInQuTFwMDIrdYhtTZkGOQfDR1m2YWik0pdK/CFEzsFhU9Fm4ppQZsxV4T1SwsEJZHw4CF7fdxcqzZJHggMiozkAgU55aF3S9Vwu46WvHYgOC1PCZPFpsYnSA10VDUCcIFhpoTOEpW3VThseaRQxgb28lj8gGIybxGe+HQNNd+RqfSz+yhsiQhwtNSA5GfClfFVBoFwzdRcUZhuSPkCz8Wy1cGmRXajCrrZW6WJ+tf0+QlVnJwGbpKidlL1VBIH7upMUsyJ3cfVInATkziDs0aN465giA20yTMwiyJhDTnCCg85lZQzqrE3LQNNcxE2g9krsPQNGm1OtxenOmwXSwWHulpePWGpRK4SSzMzJSH3j3loWNuEktocZQ9Mcvx0ZVIiaiFEdDSWaRlNZhFszqsachISmI6gjHSuh8eFAM0mxoTRweAI4Yd5hh6aZY96q7HUy8hFJgkuyQ2Rkn3BFEhyU2RJFTDDDnm40R5i+Vo/HVzibwXtFonxBGOqhnuRGyWndxgQQebqrsNWROTqfGglHvvehG6drS6drC6c+++CN69ebXbrN+8en7v/i0DOadm1fDifLWUlLC9PH9zvlker/vN1u324uCQUgNHViUjNYDQLNI4cKGY/yQwRPYuqkoCfBAxJwnuNOSKRcgpqhkigwcX8xxchYUhQ1HHWBQvPUeAscFyVnj42rBLBjNXwJRIQSAhl4DVDkOSBuqayQAzkKgTaW+m6jl4WJTpn8wEKNzUKAo/ArWVkZrO4bA40dgrB3Iztazuph6qEBnvFHgT5MknJiOMEUp1fNQckTmDvUyljh9Fk35A1yiKiZypOqBOrjHWOOrtI5/N0QpRbb67K8oB8R7hQs0fIhpcYQh6kYkhXpmBUpbmBFdFMGrFcRPiFJby8vFx5QrICcwSYxvMLFe2I4o1o2s6yhbDsKmZBgUD5unDqCRQMPJcJsuV0T0ReBbzVrLY5h7DceIRUXpVuXTQV/xOldYqYRHczbm2ZZtqaee2kjyI1WKQxf/CllSJdLMc7UCWObiE6Q3groCVIaCE6suJCidKqVSmRlLW62MXSOWlfQrMIiSVy6ZYZie4WmGzilTFGLy4k7k7eQ2XidhBjZuVZDNQ6tAi4xGpiNKZWUdnSRKPVno2YaRGElNqGgM8MQkE8IU0koiboFhczVQ1MmTM4kRgN8pMlIhcBPXwEE5CFGedI7WiDbcti3CbBO2K4EMcI+xOAlU3MgKraWrbtlk1qXXzvts1aelh/GGAZ41OvJa81AsmYWoTURMzA01tyMOg2bMiUKrDXRkczKkDhuxwLSNkAQMUlgcwUx4cQu7m2aCU2F1N1UueiMydWUTgEX4a2Nmza3gWh0MsKzF7DlIlUl5UxkmbgxExTbSEMrmjtugRBc6KBHtMqbMyIUQBGoYszIAZkjBlc4Zszd5tt4AvEh+smqvXrzVLfvPquUOdcnu8JOYh95v12dn5u2236Yf+/PzdzvPZxWWX+1t3HxxduVpsDVC8e5xehkJ7FODKBC1zekL1IsfGRV0KsxAojUsVv8U/VTWGMVjwlTXxY+YxC5+IwDFEIIbRGRzMqdBPRBCajraKKZ1EJMHHwKMjzAzsAVa8TF0IspcCVVIoi0V7KTHq/OeoBfAC3MwyxQhzgrtny3VqmQc6YjA4htcwI2I2NzJQhAgl70Zl0HcOpqeEIB45DSeOxYsmuewkBoNrVHsYk0UOviLi6CaJApnAtuaZS7srBXFPXopPw4IQwRXBVzOxljLKkEQzmJkGZRzdQ8FIohwewqVUxyOvE1SCOJFHm5cb6hRmUwt8ylykwx0ekX4ZERLTQgL7ewDu4NMiBeJm1YgCgMLYxzR1HBlpqKPAw0lRGeBKxOERzAtSKyVGHtEIMZw4SkSJ3WFqzBy9CW7uwuXAASqxYoHmUXrq5u5aj4KKpCwRQMrBtRCVfFkkSJhjYLXXAgkQGMwckybCzpfZ6sHSoRDRdX4xjEDGKOMFax6XSEoxbfE1iF7yGC4WFe2gckAXVSSC8bh4RLbUnVy4OA9yYhKCJ1V1iSy5qRPgi2XLLE2bloerhsXd85C7XdcNQxzIoKaW8xirROcal+QwDWrClJgacyzTWohh7bIlsqHbSST3yOAsnEhYswFol6vV6oCIVU3AQ9cDbGYqSiDNgKGRXLrEE6fEkpiYG25jfCyEMHD23rIm4bZt1bTvB8saw1IUOSgMFDmlciCHZoDNhiivgBAqbA1bZeaqmpqGSogPc1LVCGBIGIQcfdiqMESLiRX2swRlcS5wYLjIlcG9sOklhiTAuAbDgW0SsxMRBCBJbT06w1yZmoQkmdJpv5HFcXuwWMnJ/UauXj26cuPqwdERk1xcXD558vOjJw9fvnp+uXnb9efbd9s8kA7d4dHh4dFh0yxS22g2TgnRcUMlDWDuIEhKRORSMIcwB8xXVWLiJE6UVanWuACkqjFeJKJhC5fnxVrWsD8sonkMw6YySzz4ygB4EHFXGInwhPPq6U4U04GJmLnOmkOElohx7RHsBo1AQcbMNDcqGOYxt2VXBTyabuL5o7g9wBO5gyxoKwdbzBaJSJaLj7KRhHGQqanWssOyyVI5tcI1e5y7AHMLkkYM5fgF8uBNOHisKDB1NzOGkUJNY3cEZBRhJQDihgllKhVD3XKY8hh60TASOObTRqlPyUUTrBZRRtjqzFa6xhRw4lJZEiRMmMMoWKEyT5/CX6GuOTFbmR6FSKEG8GEIUIpYqXAUKNeNPAyBUMhRB0f+WUAgJ3M2Z7LIylLYX3e4ihCFOyc2J4dFuQUxR081iEt3XjF1xuBS+FBoHOc4MIDASsZM4bPiNSJ+Cr9Q6kydHOJxAhc5HHFAgLnEtEEiiUmFAfsYpgZyAjNxxDuBNOEWHpjCccCj5tXcCVpMefUk4ZKs+KkcVo1KrtuLiJOyEMEKIUnjjEKucSvAnvpuRySRzCKntkmASyvc8NBnY2VQznnXd5pjSIll07DaZXQEXJqSKIyBOTCTJF4KVrMQtU3j1lnGMJiaERlRk4SysQGAN6k9PD5O7bJb95rdwZY1Ww4IHjN8Ou5bIRDnXU6J1I2FOTUiQsSSyM3LKCKY9z0jDYPmoQ8vjUjTJiYpSfeYph0pNs0a5QpsTCksQpAHDaBhgApdbh5EWUEjMOLS16JRaW8hAx5z070OSvMg9iqBGEOXLWYBEY/kZgl3iZnJ3Ikkl6Z8jhSgGyMxUtPDt+7W2Wql0qSU2oOr7a2bR/fu3meRnLuLd++ePXv56OmLJ89fv3l33g/a5b7rVRp5+fJZSs3NO/elSRnRCA2A0kKI2KHRxcIiBHJ2mAd5AsCzmzA4hnA4i6AMwiaLgmYqvyIihQDiKD1FATwjKK6sQCQcaTIEBJTRkkUbAaJIJ9QxOlFPwsz1E9E17FwrHeLKwQMQR96CDRrlGlSiDSdEZxA7GuKIySLypjoLy0v4T4XEDTGLbpqSwNWIJajEAHF9KpPvgHgd1NtGwVXwk3V8UOBPiqoahAR6QQII5iVyomHtohArJSERlOJcuLlIGToeCx1D08PvVCMCh3uMJIkQs65oZZw5uGYQuSocaBLCmpsajIq357pVQW5bpGedOcbVxR01FsnN4yGC9omQsJ6IwwSigoK50IQRA0eO2wI9mCpHOYAbWKJ9IfLYZZncoeG5iJIkaUwt5kgmabhMgoa565D7IWYmeYkXol6L2Emjz9woxtR5CSqCM4CZ57LpXGA5c6ATLa4zAAITI06+CdtrJRNFJfTzOKbRjMyibwxwsKtaDCQrhbo0rQl5gY5RNxL0gqohSmjdUc5ndEoxyhbRZkluHGU3Vogl15JVT123I7BFXogoD4OZSk67vhMWxFmCCoVqaad0NTfNboQYzelGHYGh7kwMRyJo57thN1yedd0utj96IUpzFwcNDnKFO4OkaWK0UzcMQ28sDVOCEJzMh0Ezs0Okc0BBTIN6n3vAiCU8MxMzsTAnXiir5TVzq5ZVldgLXQnyPiMKjCM0dY9CRYebg53dwQXVUT1bidUyIcorIrAWAEoGqk01hbCo9LY5m0dbEMIRUHXcMI9jmAG4R1VSzGQONWC4g1nYzRsJB5mQQCyNiIR+QoXZPaNJJrrp1TUfNVheOVo0C0kyXFz03e75o8cvX71+/Pzl46dPNjlv+zzk7Ejbzebls8dkvjo8PGluNE3DzBpsACHKwBHd+9FSWsBlnCNhMcoltYm8lHtXJgGFjgjmHdHTGIc3wSuRNF2ulCZToDmYk3DpXwxWxiNdC/UMhbmVdFoganUmAssY+nppWEUsdqAxAtyiRjkIJlQzUE7iBMjK2RoggjCPHUWhTSg7V/yTUwyRghM7l7S9uwu4AKG4Q3R3lAN4UeCZAQwRZpag7KkMhipyFFEJBbwqkxNQ5u9GGinSI9GIRIg0pmomkKSYbOjMEvO2o2/PTBMzR9tRcNNVvr2mF4N0LoMsipcweOM2Eu0UVYIlZGMuQDMSCFGvSDHfLR7bzY0cObIwMfA18q4cQCHwNcdYdWdSN2EWlkiAglTdIDGEHE5KphpBlXuMIUscr0kWE8A0M1Fq26ZtFu3CspoNMDNXJnEWScJEzi6wnLtIcI78jmmmAG3wyGsXYt5iybywRdFrYdHRUGZORQNgnNhAcGSLkl8QCOwe855LaA2wiwX9yXAmKEfvcmB5c4eZxzHqbgYy8nruBBGI3cy9NFIlKWJnZl6CFnKDxKbqUE6EjV1kgiGKiYWRhtwRyrx7IyIng3ISd7WcI+EvnDgxgcqQbFPV6N6N+K04lWxIwknSoJncuN/ZbhvvpKquZmoRPBHYwMxkcLdcDlgzDIOqIasJmbHWrmYlMofnnDlGZJg7kbohjtRyj1oOYTYWZSfQkAdGT05mKg27q5cYVhEDkWKZarwetWJxZI8W4AgiF4K6V04uu4PB5kOMDI5QNLC5RwkeXEKzKKJ6JxYwO5V2j7pzNSIDCGAhZkEQCgEMuQTKiNE2zCINM3GM2ycjUMMLIe+H7Vm385UcpLZp29VqsWxa74bnP/zw7b/9/tGj589fvnlzerkzVcva5XZxuBnWfd/lXg+vXU/tol2sHJ06CCzCLOUY64C0ahqcOosIsTBLdNYOaj6UZTJXLxRCCcPH8kYhGMUm1cK9GgQEX19wGUrfSyGHNAbgEyXAs2UyGzQH3RCDg0ydnYYwkYWfJYoUKCEax8DEBGKGwyrpUBKR5eS/poIjYzAnKT05VPFtCeXKNcNmS6EnghyGReqglIpSyXQSIQ7hcnhUxZfdC78YTA+HNyGqcljjhJJXiduWIt1UxTUoavMS8UIoRV0pMxNzBJ3Ru8AgSlLQemkq9bAkI1zBmOgo3BzgjpjQyQUGM5G7WD14I75E5WQLT0xOqczaYIG7wTSSAq6kLizF/YW9iLaxMmTC3Q1MwsQkiVkaISdzzzoorOTMMrl52IqIctRd80CWHSYBLgkET3DJaugIsKF3ZDPrHa6WUpuaVjXnbFG6GwnvGtaYuwaIjkxBJIGF2AIVBtUXadlyrICbFbniUuQXLjRqnbywjyCvGSm4g4xjLRAtYyTMOVoz3KOEPXrTonlWo43DFNWDo8iZt02Kdnozs9JEHAJHpdsjhLRsr6RoyIlqYuQ09L2woDRZgVmG3JlG4XW2IRNRkoaUKU4KKSRYMEHqcGYhYXNzhSqBhkQgz2TZc3bNbpb7PnqFtCachFMSQeYhOUAc0zE1mykJUQJIXdXNhJ0kIRYB5JpDRZgpTtN1dUNM+iUmMGK2j0sIOBO5xkBGmKvmQFgSCCiObiY2J2ZOktycpWS5Yixu4lLaG+dUwCmlxM7qiKMQEIVwZW+8iQZE9hK0wVDMAgcCdbDDo0UhWAKJRD8LwYvdjOxDlFQmblkCiXCk5CgxUZsY5N51fbazYbfMw+baktO1brPeDOtH3//46MmL77/7+ftvf9jucufWiCwXK83WpIXnvD4/ffbwxyR8886D5cEBDENWNXDPgEOYS4kO1HNYEwpes1AsJXFW0TdC2CiENcLRKFl3qLllDfWh4gjHZFm4EFAxbRZ5F3gcaSXulm1w9xzlHO6lmBwiwWRb4Z8LcUZUEnlVGVhihI7H4S21xsQJ5L0JMbsQ4OR50MgjFGavWscIDkhq4VckIb3yXWEhgTg2tiYkiIksl/pZ51KTHanvCJ4IcM0ePFWhi6IaWAtzGPjXSkomBt1EhUo5UA0g9zzk6FxJSaBlyLm5Nm3i1KQAKDFBq6w3h2uzHFWPsUyk1W0TEYPdYgokRd68nJUYSwFiYrPBFSEXYSDNNKuxBINXoGyQXO5KjvGvEfwlYY9jJwxg0pwlNSFsQsTgOMqGOCbWe9OmJEKQKMjsVfMwAHGyg5tqEiIXMho2OzN3Ug+caQ73Luecy3wFITLXqOWNoCu6+YIUrOaUQBIROcyjPYSTiMhquRRpYl50HvpwA8WgR44jq8NYQAwRjvb+cDIcIw3LzOqiCRK5dpawM1YbPdRsyLnONoq+SSMmmKdFw1B2atsFUYoxU1onjqtadJjXsNi4NOcVN8/kyc1IxOJTQm5uqiWjUWSbhqGXxGxsESSYZc0wqOVwxzAjNzLncmCZMnsrDEaXs5t6jHgxc7iaxxk57qRkLAmAJCGCuwq5cwRdYHJiMCLGJ2MSIucUtEobRtPJxE09eIQkKdgMBjfSah6yZjeHAMQuUHIQJUnjGd4R8ZuhiaFkgtQKS4SbuXjzRMIpIjJBklKDYuSWY3J8dIdTuAxU60YOVyszOhAD2Smm+5REdKFPhUQkSWKqPZ9waCBnILMmb5sFcyoJNTMFspGr95ueLe/6tW/OmzRcO1wdHRxsLrunz08fPzv79uenr19fymopQ4aSK1iaqOLqdHjx9Km0rcjyxp2k6iDWrExsbvDSzequcM81y0XETBKsR4GrgfjhHFRXDFMjYpGUxCzaoQIdBvQvGNMr4V6TAigp8OoES0DtlqOG00Fx6IKIkIAoezBzpfwjeqmYCG7hoUruNrLADHDwSlFrFCiUBgMZmEQ4ITpz45RKHmkoAjw4xpoJqofjlriaIhivpt8D1JRyE7XIRtSieMAK5Ria6WalYr2yiRrtNSVuZy95QgCFKwwfyVEn7ZZNyyjcIQauFn8SjcDO9fg1rRVJKDeKffEScIR3K31GJXFh0GxETkwaI+jMUxJJcZiue0ROLMycXXNWpzIqQl3dChD28AfZ4sQFiuIfVwXAkQZXZAA8DL1TFyf3RYkmMTy7uQmz58iyKLlbzsiDUAy4M3MTQnTxJmYndP2WguOJKN0l6OtW4qg1JTMudXfQOF82IhxS8XqokTmco/ebAEkJTuwuhAXDKLHpNqOWZ3K0IzowskFc+EIWJiF2EJmTk2kOOoUYIoLEYfETkXDBxGo2YHBEqTJpDtVKEe74kEmkXSykpCM1krIgj+a8hmElmRUlEAVreNlgT4tGiCmJOEe9lIvGtDomFi20U0iQjueWSkpmxiZJkjBHFsHIJMCsYdmK2BDjYVVz9pzzoFYOK46DvUgkW2k0i+h10TaG3EYbiZmDkzDcOCXzDFjiUrDvbhb3AsygZbiHJhYwNcySmiTsmcw45wwu+IcXDYFLnj9nEGJ0sMGTeMOeON7JDZxZygReLie0ELghEXD2zOSZS++rEEgAc2ZG2O/w3+QNC8qZRhGzK1zNIURNasKb5iGbCKUWTBa4qyw8MShnHba7IfVNu2SRqMsl8q0qwOj7diHkuFhv3p7RxeXu1fnl4x8e//4vP/3xux+fvjhDEmKJOSg6SKLULq9s+nd52J2fnuLnnw6XR6uDFRE5aOh7YklNYiZkLmA+0GI5LDvqi8PmUaliAcVwq9LibEZgYh364OpjCHWp+EY4MZR0mZkFbGKWiNLgSu4lZwVXG6LdLObAeFZKBIlqrrD1gdKDofcyj8Brlh3OIlGa4nGAnBszW6EW4BotGUzOzgSUehXzbFFSGXVHNUFKIqWIkhFVPe7gaCQQLp8hwKaBmnDAMkFYGChnckcLGcw1ihECEzAxxRmmY+zu0VsROWEvAD0geFQ55jDoIuLZBhrcXUSIyPIwUO8jCCxUXtSiMDlHVBxAnRi1HCUIIomVCN4iVpaici57GT0U3tUKh+VE6hqjKL2MvY76F0okpjnmtSg6N2eAmM0zJzL3Mu1fTSTB2ZBSSs6qmg1GRa0su4f7L+VVruxZGgYJiKKUg9z6vDM1JuQ+p4Y5cZIEi9nDbJobSRqvahSF4gICs+pgUQ/F1ETQEdkpYmeKlFTutt403ebCJLmj18FVoa5REgmHO5uVMzC4uBTTTEZUWFwiUNs2mSkOqCImNe/7ISj2ZrGMeRDBTTfkDjZWEYI0LAx31eyGJEKqMI8h+B51iUAqc8khTeKUoiyP62EJBo/m2VRsunsEPLDSgxY9RwlUa7wUKJ08JOSAs9T+cTRcatYSCQNN0yQyuA6kpt2Q+2HYDO69KogTtygRZErinFRzDvvdMJRILfCCSySLiSPSpjgroeQAyczD9zhHkQ/BUzmLGDDPYsJCJtwkwTSLqonUE0o7h3HkAEmZIfR/MfVnO5Ik25omtiYRUTUz94jIYe9zqroLRAN8/0chLwgQZBe72TXus3OIcDczVRFZEy/Espp3iQQy09PDTFVkre///kBUdAcDpmSEfMkdwTMgjIglEcMkg9bIkiUIVu0a8l+Fv0LE8IrWJlhE9yWatDAHQAIULoAmyL5wwAif3SItVtrqNdQWKTq19yFS+nnQqgPnJMowm32k6m2vaPN8fDwa//79/tuPj//3//P/83/7v/8//uP/8d/GOLkKrK2DIyAhk/lJhKXWOc/H8/M//+f/zTx/+vlvpbKnF5JpS+27vqSMhG6eCJ6akb5OrLj2ofAa4TEHECZjQLxo+NW/FbFeiQgYq9BlYTgL6EHK9WTF//FqyFf0ERnJPYDZEnDprgKSBXLxJAvqBQYk5DWTWQu9tdOycAAqsjxmmeGJAQs6Xc+4V/QJXs/Yl3BgfV1fWh4ijPWEXkYJIiKSIpALZ3/1tGc4FiFCxKUHyNeGOYKJ0v9PrGghFa97QoK7r6O0u+aqkCbw8ACISAwEwEW4v3Sa8YoHEhKxvC5TmMS8OEA3zSX1R6CXKNhfa5EIgFiDUwRE4BeQA+HuyOhpYUZELExJCGQBhOTuJLjsAKsbd42/8DU5eW39ExIYw9fC8691AlGRmus9HR6RqnOxcISYmMQ4TZlX9yPY1ABupSXlnMPDiBFZ1qzPTREJaiEgYiZ4LZ+QGRAzwtXWsRSFK7MVj3SW15KFmG2YEDZiFDaziPXKCiFG4Qi2XJweMhEiur0uu4G8VltVGCOsd0VAfL1NaaWv3dQNApZIiYUJyczX+zoAUn3NNbZtY2KuPGfiK5gYtOQxgh4W017HHg5exBYERBJjIYpMJMbk9fiFF4K4xmvr2JaLXF8VSrCO1Pni+jBTkDFAYGrSizdazE14oKez0YsuWruhZMQwfw2H/rrLrolehC6jSMAiBREoCDx8uKupApRM9QxKiggonCyOmKvgUkhKZVkazEjw9QbOMHALAJYSZjY9EJiFmVe7K792Yim0wp5I8UI03E1dkaAQLYARgNQcMxhlKf7iFd6GBAdeThwLzzmtrMgzs5AgOiGQe4TnfN3HiCmJEDmBI9cPt6YEiBFEzECMZX3mdYzxfGroGDPMWQQTjLiU+lIYLacBoqua22p3A8haq2sfam4GqcwVwdPQyTUMPAoyF7Z+F51oHsP/0//+n//tj3/7j//xP/3H/+0/PfpJIii0PpSZTlyB2MN1XaoTvY9//vO/hE0h+vnXXyszAtgcCQyZyGz2+kvApZ1PorV4STdfEB8Th1MmURJj87DwAMCkQFy3V8KFKyC+KB9MxhUhxNeAYiWPXjDMq7exFgamihUIfAULAihf6c2MXB6qdXentVBLFEZAEK5rg766tgNg7e6SwCPWsAsW7ZKRHohESUSwWBdCIKGMEBZZgRhzYQYERvD0xRoY0JpZpyb/VWYJayKo+lfcAGDFPj18fUshEmH1cQkLAUAsaDLC100+IeFVkysEEX+FYheL8nInLG31WsP//5HHa06CLzLnfyTZMxnZ5li5NeYCIIjoYG76ElKsNYUyBogUBE5AEQhPfj0nVvDfF4PHwoUk3RfnuMYaEa9hEiIwcAxHpKWLAAhIY/rrGo4S4HUNSWKNp5EphSN9MDhiIiLlyqpDbXXFRdaWlRCacIaDryVGCNK+NQwwV2BAJBZhgAjPpXljKsIiAADSBGGV/bkIRYCay7IJZDIBIhT5H/vfdXNnRPIxPTM9WASYElc1J7oHgufrrUihHoSRsR5O9HrGGBBpT5+ThZi5SDOYOlUYhKpIyRf1GZlAsT5vWZhiSQLTl8+YXnffyAwpKLUuUmEdaNbwj9Y1cw0gMsASieElXEkZxwOZkxloCdETcdEuuVRqFuulER75SrUBRcZfHm4w9xeP4FGlgpC614Jh53E8zC0ikQuOoAQ3oyKJYv6iESJSCjNRLTXDwkeqUxEG1lDV4WbIIrS4r8AwDH7NW5MygJCoCCyeHggcEwPCBZezj4hgOUIkwdXWICAyEYEKM1MEwGo/F4LEhALpkI4aSb7u5BCOS+YGlAiRNA43pGngGcdxkDDgSn7HHLPUwkgJkEGqc/QTCMY4IbPUulbqgyjDF9q0pGkZbm4JYW5Si8+OxHPMBIDakJdYSMONOSoztY2RighhVLpFxP/6v/7H/9f//h//+dvH948n1wqQqa5mmVmEE8w0wDGEkDPSkdDUfvvtH7Vervvl60/fxvE0dyZxD+QCGWmw9mAouASRkAGea+wNiGGWiQjogb5AXUBcc7EVU1kPFiHP5bN3IgZ60RIrvb8QnterJtMzhRmQ8aUEXS7zpLUNTcvIFQfLNfmJTF8lXkAkmGtcmWEWoRmBEMSERB5OkUwkImtTQIXhLwhv/escApHMXT2kSKx8zStmsgYgwcyQaa62riLMvDKGgMxL4bMkJInE+IqzpXkwE67DRyQxm00EwARMCLM1pBUiTPS1iPQwVRIiFgQEpkxw91c7awYTwquFUxeFss5oYEgMHkZEUipA+uxEmOYAS5TvXDfwcLe1DH6Js5bPY6oUEOaMFEzml/uCCSsWgFiV9khoDmCGBOAWEWuCj4zhkWovCwhyRma4MIbpWs4LozusPfci9zMcSdwVcsW5gqlgQpizrMLP9bbGpUQGJmFGXpMDR6TQzkgxBhEWkYJIlLYYLKIZTuAYsRoTA0J4De2DCajwiimF+4twggBYCjcQob+yL0SZKMKFE8LUASndJNMTXsZdXbEVyIxFOGXga6SWARS+epm46TzNlCEIaCV01zxztWauH6BWMVsZLCOk2ioRmburOiQLE77gwEVd28IoMtHtL8IgY4Xt0hkcPJlCIBUjIixCI1aC09eXwOZS7kEYrFwGwQIkMQG5/JXHt9Uc6bmShw7olk46nud59j4sfEy11waxWGIfykEYmOhTzQ2O49nP575tc85USzVIRM7QbnMmgEHWthESkBPICysIgKREyb/i1L7cXuEsK+qcmS+VUtrrOQ9IpRRCsnCCSFd6LQYTXtlRwAwExERwi2Ve+StAZqYB6UDm3oetjq9hY+1C1w/g0xKSEZc5KgEyDAXn6JAB3iCJZY3ScqUT19uUiRMsMkIVyC1gzmnmBMCXm9ze99as5+N8EGcQTBvAJFKK8NvP33qf98fxn//Tf3vqWm8jIrullMYAWESPCUQOOLsJR0SsjNDU8ds//8vb5Xbd98u2hWkCzHBAx/UayyCWSHe11yAFEWCdsnEJyhAAGcNtVa4Wqo66Ep+AjpGhvgSUgADhK4O0zsvh9hpbRzLiMqIEUPrK9eArx7d8D5luBkClNptKAPBXIDsU1hgyATIWAZlhBhC4RrhIkJ4WJCSU+PKxxGJbiSgi3OYrvJPB4OgACTonixBRPw6d4zUIQjS1tcngpYNL4CKv9yEAvJgL5CIkiIRmFgsGZYHMtPVmeV2C1il6tX+IFFiJ14xWBQkz3NwXmLgUrAs5WJNuxL+6UogifB0kiTi5ZBilZQQTENJ2u2JCnwMwBQ3ABSLCa2llq7BGqFNJiDCFYtpEhFJWiyGicOEFm2JAmKunQhgkcCYTIb5eTQjppgsdRKK/RH8IvrBMCu3uusiiDFv2pBj6IugTzDVJiEiqCADFa0ddWBIgPMACwlIRIBuv8qYAd0lnZAzLYUlQmAkw1BpjhGMAJvr0RSGveAuLuDvka+SwRlL0V5RXCq+jGiA5ClYppU4dEdBhgnupLTy4VIDXPxXh4Z6YpZaXFhsAAJhZRFY5ICO4KejEjH7OWiuXQiiFcKUcwi0ywJyRqkhQYAJBgIcgGFG4C2DEwiOBktc8Ye3x0xNftX3rykYIhCSuTsSSOoBEPdJnLNn4Wv5nEJEnEhMAhHqmr4QHv+rUy6tY3CYiILys+VIKptscbmamanaeQ9Xd134eMiACtQ8EAAZ3TaEfP37849/+sW/XWsTDwYJJ0jxU02ekExJlWcYHzpehJdelFmB51VgI0BHBQucwEZZSMELV1umMXhbdjHTH9PD1voRMT2ehzACHfBXkYgISgnsAkdQVTvaX1VVauto459TjPC0cmWBBLJ4I5Gtug/QXZLGWXUaAyUAkqZqZMZWFSikIiCgZkyAQ0tPG51Sfry9Cwvb+9r6Vy6W6ZMPd52yttG1jIh8DwFsrRbhIo7qhW5F6/fIOIIiAUtxUTaOAqplNAvIwgngVXAGdvf+X//5//PL1l1/+l/9lzqdPxQLrNGoRRJygkQF/ueyBkFlocdNma6y8duKRk1HCDTkpX+aHpdRav51FFuLK0MA6m8S6T6x/T1IQkHvmKi3Ml4M33SAQEnz2DEw9CRCYkYlRFhrNhBT6In8iE4EFVgJrWfbII93TU+fI12AdGZiLwBqQhqY7MYV5LQvLxut21TkjozI8z48xRm21lIoomCmlgpvPTA+qdeEOLJILN1qheV2QKLilujKJSCFEAmLiRDC1xGQRyAh1M8twgAh3mxMJuQjTeo8gFBIqhYt5t0m8/rCIMvAFDCGoh88zbEYmFy4kxCTMkk7EHmt0YpwZYJhOQKgrMLesFViIw2dah8wgF+DatlqrqXmGnpO3YrOjK2W4Lg0cAq1oEiIkhQMChkGiIK0yjng5xAMRApCQErwVESkLwQy3Nbg3Z0wg4rZvwrw+Q0zc2ubua1aDTGsk2FpNIGEOC2iVmcwcPJBgXUqgQAK+BCsAqzp8gQnmWmoJD1WrtSJWWTeeV1YHpMqaVWZAQDIJUk4C1clQyyo4BW5t43XZQAp/9Qoux/bSfxKRMAPSGFNVEckJKqOaCWWrZY2IAbiWChHhZGaRwLJI4mWzCMR1x1pJUlRXFsqIRTkKCjIhgHtkBBNhWT8UFS4AMKcRhDA4WKCF6QkAvg4+iJHJwiyy8AERAH8RTYtUjDlizbXWoRqiAHBGzFGlsMg8D+3TprmlDkcq+RIc4dQgYVVLS0YhrvfH/fuPH//yt/ONLwToMSM93cGdEQRw39rWCr24u1h3jfV6xszloANXgNQ5zDQhzdDO15bAEISEpbgaACxIIDGZVw+4Z0ZOjPAlw1qWKCYG5lD1zDkgPDx9qTB1dA90m2GzkIObDyNmXoy1Z2A6QUZKYVgDEVq3AijMiFRYECCE0q0WLm1DItNVJekSbBnFF9lOUnjD5Nm3a6u3S8k50URga8AYfQaSzXkS1G8///zLL3/v//Wf23YR2m5vX/e3y+N8Pu8P4Obz4QoEBphJGLEkXUkgGXH/8cd//7f//defvrzfdto3M0ogKq/SSgRwM2N5jWzWUh0iIgrjypouYmItO4leiyJEIgReCaDgyGAWFEYi97+q5CIJMNN57XgRhMsisEQoMzyNmMwMIQjpOAmBahVIWJWEax9da0WCjBCR1b2BL5Ni5iqNexE1EC8RdEIAkmBmKxVwkarV3IgoMrkUQMjAUor71kfvmO3nn8MDMra211aJuG3bMgrjyyjpxKu1HrkUU0/MPrq5shR3O56Pfdu3bfsf02UWUdWEbJfN1NUcEUxnJEBBZwiL1gpLkVIIGSJrabfb2+gPAICFtCMgYiKWKjb1OM+nnx/3TwK4tve327ZfLgnoauZWdlqN5RkZhNgqs9gc4V5KASQR2fZmamdORMQwxnirl8ulqbNNPNM9lQVcCkRCTTPNSC5MQK+REWQpYutADQSYtWwZIQKuhkRb2yw9zPdtl1KJyM1VlQpAgE1lEUwqTVYCFjIXcEXIq+yNhdUsEVgoLEVKRAgTE7nZ7KNujWlpEWTOsRr5chHt5iyviZyIrL4pd0fEVtu6rDJLhHNhW9/OFXtkQoTRJbyZGROPOQX57XYRaYBQSyGEqZPw1S5FjKtJlJEA8Bzd1Ig51I/ziYgRTot9MI/w1ir/pbNbn90kEBZ41b7hartubVtbz9fvwV1qrVIJgVnkdbFeukJAplqLO5hOohTtk5Az4iUAW3rfZTDHZFwX0IAMYgIIIskIJmThUqqHj2ELTwMMRlwEnRARk1qoh7knEbwmCZC4mBwmkUxHQjWb9vzzz98e98+fvn7ROSGdMAH8UjCRAKgKV8BlAiFCz6AMEnSbqZmhkZ4+SQhcGQABTedLOUIIiIYaOsNfl761KcEgojX2Cc90NyJZyDszA0SGu871uwl3oCThDGLgUJOwSwFq7TgBoSDhX5Ga5QVcIDcwc6Qz5cLJ13B4b02I5hgRtm07EiemQQQQcns+4/LTFwB0szmVGYlyb8Q2wCf6COseZLxqu3KODgm3969fb7d//eXXeWj3rIQ/fft2vV6YiBLHGGFtnj2RPAfEa120BiPrVPzf//nf/vbTr99u/9evXy46ZE1yzdfZBUwJCBNizvma83MxNUKSRX6tqrclSMkgkeU4E5EMX/zPmFOEY+GVrSywS5ARwJfvZXWIkbha2zcmnGPSUonhq7bul/cbIYkIrFhEOCS0Wv8anGKE+zRmZikexsyJaebmJlXSgYXdEhMul93UE8B9vnD8BHUDSJZCwn3MdKilAEE/YFYRelsKgct+TczWtswQolKEgNzddP7lnqF1THuex2gLV6HI1PdrK62wWIRNC/dMCIF6aVtraRCZc46I3UMBchXb1lZwZRQT3YyZLuKXa3NXV3MKYiwsiVCEs5WD/K18+eXtipm36+39/da2femy+zSdY6p6WEIicm2VmNICeY0votTmbgg59qI2EFmISpWt5P7+Ns3v98+MlCIrqCCFV+SKmcKT1tKfiBkX4JiZY4ytNZGCmGPOVltt1UwBkEVEJAM8PU1ePR+10rr5L9cCLJ+Wr/e47AWQMmMrnBCRjkzMmCDyCkRIbJWLiBQiDI8pCPjyHrq5F0yEUmTRK0sYPvtYpLUwiXBrDQDMdAICk3sACjO7m7S6dr/hUZlcnSEw3VU1FFYwmBBcCZIRCVd5AhLxtRYoJSNP90sppYi5p9s6iBOVWiQjpZYwV3OAeIUB8/9sYkPCQllEoqzoKWoE+PT0JBDe2laY5PEYfXQzZWabNdxrra5TqnAkFJaVvwHEJFkHJVhgRmQtAklCEmnhtlwchakIliDK6mEAnM4RmhokQqsunPCvHUgBYMhlRsSlcY4MTEKmtIDgfs7Pz8959IJAlD6exLm1wlj7HJyWmuFG8pIyJ0SaVSoejjEzw+egIq2IZwrxXC5i5mUkJMQIQw8SBni1aVautLBzgMxkeNU+IYDwq1+vMiGBqflCoZdcNixMN3otDrlwri0grCPV+gCuvswVleNSuFQBwDAPTxHaW7OtLLZaVVmKIagbMr7/8nPZGgKMObUPYjRX9tmf5xydmXjNFJz6ec45aqna5xjDmP7Dv/wrAP/z9z+A62WvVbhKLSKAOPqZGJ66bt/wSknhwikj8ziOf/v9H//hX//dT9/eWpNVYiKMyJgBJNtSSXotwyYz11IzWqivQ9+rbQMAMkKVhTOCpa7XQK1ljlmpEKNOT8wir9Xc1rah02YC5fLc4qKvYRYutS5nOK+/y6W0UldEEQEzOZNhDdsjFvbT5wmZxBUxRUgK5muJheFaiLdWcWNMJKEqaGGQ4h46eiIIYW01MsJN0kphAB1nb4yXWhGQmGutUkRVgaYOHe4xCSLHmJFeW4vMqWP2DkiqhmWRDswshMFg4GbjdHNiDs8w9WFBISTaO7iubCEKJWatpVROD8x0c0pnCJigNns/XFWEZWtLCtDHg1kqY70U4p2SmBFD5zndzNQAGcBbJaKar6Vj1MJUCxMDwpiTOSxdWCi5SqltWxk0wejnPSKqJKMgAtdCxIkQbkTMhEPNXUX4r5jAXCRopUgfpn11DofHcfQIJSr+VGI2s7OfACm1pK+B8wowEjEzCQBExDgOEWERJM5MYpxzIACX9evlp04iqlwtghC5lMWnrksPMSGBW5hZEtJri0RE6BoLDlt7J2La9gsRHMcB651EWGpZXV2LgVsHDh3GRKYzRndbbJEuLBUZpQggRIappkNtlYXdfPUwA+BUTnA9OwAwC7wm0zkN3WwO8/RSCgvpmO5GTEyiU0upVaoU6eMEBA11dZuz1opAbdta257HffSekFu7mGvovFyuQ4eAqbCIUDhGIDIBYzh4gE5bdoRWChNVKemZ9n8uQxIgAggoorw4WxcrIUUgI9e+iJhkDwNkCUdERGbEkgCQnmm+7lwZ988fH/cf53m0vZhNyhnTNDu1rWL66CAVI8CDkCMNzFfus4l4JBIH1YQUAAFaVxDiFwO+NAw6VfZWRMzdTT2yCQZkWX5tKbBqm5KEkITdQ4RJWKeygNOKoZJrIGJrm4YiyxidEOrWWimY6eHpsQQ+SIuGATOttazTX2SiUGYyJAsh4ewDXBPjuu8REglFSjokwobQ9q0U7n2YjnADN6Syb42QAgMhTWeR4upAdN3f3y+tbK2KPObU4zHnOM5TdZq76bBUBE+ECMNVvbLGfJDEYmH//OOfPz5+/Lu//9IECgMszwwBJeqcGYQEWXiTFgC8Fo+UmI7oy3NORAFBlSN8QdlhzkTgKhDbVjKylFQzciUmCtLTMsLHjMzLvkGimS+PjfYpldFzjCMgiYBLCZIE7P2AfHl3iURV53lKra8MWOR5PKTIKrLGv4SX7nma2rwwceHN3DKiNBbhNJv9HGeve7UhgKg2lzasiJzPIyFra1vbbKZNmWY6Oy6Xi1qoI4Gre/h+3UupgGlzrgOHdlWm/XrBgefZpTTXeY7e2ra1ko7jefjkGJ0ItFsiqGnZpEZFQNfwfuLL7BthQbSZaaZzvsIWOtI0M3POWUoF4nATqXvbpsZpBhjhfh6dS62trNyemwdkKRK2BGopK1WA4KbpsZIBaROI+3F2IgDXoWWrp7oI19YQk4DOo7PIIu7dLCqFxXkcLEKIEVmKQOQc4zjP0qrXtn7/yGTuc8ypU0cnpm3bi9QJwMRzKDKKcK3bum242/F4liqLQl70jemUIrXVjDS1ObVIWRddKgKAbipSzI3+8hcD0Ws8AlmksAhEQsCcY7/sYTn7PNqDiS00EdwcGZkYMpGon6O29pLOAqSIH6qqlEAiptp750IinF5I0MNtWnimOQnp1IQgYkTs41ypUNfXuEZK2bc9AVSnqWWEFkGEOXXOsX5aYXZzY81IM5WtIGaoQWaGzznH6ETFXTN9v1xu++3oj2lmaaYue10XJQ8EpxcoSgCC2GqptbZapZTMECEirJdaaxVhczWzyJgD1UxE1jNiqrnrVEcAYmGpwqtNktYIKZGWESReyLHrHIgYbn/+/o8/v365/PqzoCGBe9ppkgnIwkwYyIgA6LaUXWnulJiCiHvZRri6AyUk6dTCdXHNRMAM7pAMhZEZlpegMBVhMwNc8S0EArSFeSFGCiMzumm6rVAurjROOvP6nTAXJtxeWUu3JaoyjzAPABaphRBRzVNwqGVAKYKZYT7Dll9NtRfiOQe2KkjTbfQx5pQqrVVhyrBUpYTbZfdS1WZ41OtGTOhw2a4RMUG5cCG0qd+uF//7L//Hf/2vP55/dvPjnMNNp44+cOWhMoh4FX2u0WAuvi7zedy///jz4+PHt9seqnVr7tmqEIClh5lFlCbIRAkeOnoPtVJK3SsTqaoZMBOJ4DqsZmLCeWjkkgrAa1wOEWoEjCTqpkMTsbzqumg8j7qVbbt0nQwEGK5qZqVxq2320zyezzsilSJEFABh7uZnPzCTa4EAhCxyYYTjOMy07buZIUJEPn58fwXVEgjw+nYV4fUMMps4YOb0mJAw5ywik2DOuZ4VoSpte3z/g1mmjswl5iFa5j/CQuxqmCtImMICaaNrk4uPOedklsZ8znjbNyJhICaQtysCeDgnb9e9T9232vZm7jomRBDiOM7MWFdgTxPm5WfktYOMFCQpIljM1U3dHAGVyMx1jm2rENjaNudUhIBYjkV3C5VoseqfDNk8aisR0c9n27cAnv3cLjdAOB6P/bKVreocs6tXwdUPao7E4znVdN83ErY++znP47lf9vxryI4Aax6ofa6R0UrMWZ/pFjq1z8v1UqUVEQAw1aVMIGjDT0J0W/8tDDNARHRmnj5nP5ivs3dAMAvVoTpflVOz/DUG8AXzmvt6cDnkeT5qrUTELK+1WMboZ5GKQPPsLLx8lpkptSxHjs2RqqdOAFir17ZtgODTIpyDAaA2KcIAIOuUAkAFUTAsCCgQpVRAHGfv/VghTyroU5OoEDPDefTRBxCyMAGEO0IUYdV+Hv72/uVyaWFhc4yh0wbya9lFxKXWzGQkG2npRPRxfLrNqbNQAKH8+uWKSGauqpG83oe4EraR+7azSILhwthIaikEsOZZwhQAjRrkFulmRkytbIj7j89PBmBkCGQqwOwOSfjiluOlwcjQzCmIkWmqnx8/bA7CTHcb5/WyV7n+paBBTHTT11oPHTMA0uYgeMHUfZxzjiLc2hbTJ8XaikAGFylcmHAFcgFia+XF6YUTY0QiBgGvtEFGmk0gcofRx0ouZwDRav0NIshMMyWCy9bUNNyJuApHwIqQ65yYgZiFGWphlpUikJeePhGztTLGKMJEvDFPtTCrbd9aqaUQUakCAAEEGxCAVBk5Pp93YRYgIrpediqln0P7fY5p4cfjeP/2E4Ff9/KPf/v+eY5hgFzO45y9exoi/uVk4Bek8xfWSUlm+cf3P2bX+vMXQEdwDNM+V5R6XdJ1ODIiobtXIdm2tfHD8NVxuGzva6e6TiskgAG1tDCDDCIyt5W2a7WS08qdvZygYbfrlgiuc22AdeqKDtnUDoeqmipGbJe2MHJEWC6UMHOPCsCliAgLneMYerpZYl5vb+M8RXiqhevzfrZ9q7We56Gvxcbi9SHd1py9FolIV8+E0gQQzuNkNSYqhfvwOWdkiBRGTlljMRjHmQDuXi51wddrqaunQSRtfN0bCxFSmIWnp7XWIOnxuEsTIJLCxHQcBwAIszDbtPDgQu4emT6HEbWtwWtXSarzGH0t3Zlp2zZTX4l0d9u2LdPVNBOk1YxXCD8T1G2oXgDa1gCgn52lZMToHeAlAym1QcZ5nGrWPHs/CAEY3HyMAZDalZvo0DF125vZPB73RGYmU90vV2bpx0FE4c6l5JymXkqprYUZ7ReErKPt27WUUlqLuTrUqFaJJGa2oQ6w7ZujApH2QcJS5Xa7Ph6JbSOS4/mw8FoKABBQrSWjLv8nIoB7bXXl6Nb5BAlDw8mRQW1A5uVy7X2GL+tKQiILjzkjrWxFfB4WkFlKXUDqDLfe2/tbYVIdEOGqK8NMIDq61OpuOicAcJHKdardf/+9bOV2u9ESFa0BZqlE2C1tTrlc3UKHAiAjhec5Tki4XHYAEJLTTzMbx0iA++PTw8/Pk4jPfrat5fu3srV59lBTjaSX1jjDzTw+7e39JrdWIxJqGZPdTUpZIB4BZ1IrgkRz9ggvCLd9n1PP4+lmgMiMtVUpxdxtOkO0UpgFkI4iwuyq4YFEhOyRf32QfBEZ6/yYqa8KNki3Gf5q0mXgjL9ilREL9hJZPoBERGLJZWNGQoDjPOdUN9vaRkTB4WpCTJC9z5KAgqrq4auVfm2ww2OOwcyegQBqXpbyE3h9PvoxPFxKWapUBHBTd99wX6n3xbJ7xBxDFtmdkItbJSwilEBMIhzgapOFp2u4IYAUUZuIMFUJ7f3tKzEPHUXE3aZpplvUFZqPyOkq4A5eq1wuV6kvxQUTlVr264awRbhX1XEK0XXb/vbr3+jPDw+antZ1ZtJfagH4H2LHv3Inaydg4I+jP/tQHeTq5qARkQtXTfBaOBEYacFwZStrHDdnt1igEBOx26qpi0xTSwBMj4mga2DlJsylMmRMHWYRGRQZDv08hcu2bUSsqghw//jsY9RaV9nsVM2Itu2lSpGSEOfzNA8RqbVgJjepWwXA8/l8Pp/CPMZ5jnNre3gUFiBqpQUZvUuVIq2NfroZMUf4frkyYwa0Wll40Sa993bh8BQqIC6llMLHOcYxxpyI0G5NmC/7bd/3UCtS55gpISJuHupNWtsaQI4xay3DJmaO2RHIp3Gt4aE23GP0Mc2IaBM2N5sqwrWBEL19+YIQY/QxZyzTqrm5t1pFiqIRFQ9DdCGJdClsbmp+vV1CDaCUa9HpvQ/P2C4XyBw6Z5+X/bIQQwQsa4UlXFuNsHQAwSIlM1tttdSISEulQMB9q0gw+5DKRJwVSqsi4hGtXVtr9/t97RfnnB5RS+1qQoLkCNTaTsz97KU1gFxlMkzoZmN2AJTCCfCqAERagpi275irezMg4DjHOk0TMQLttVJZyjcotVJSiFtEhhEzBLDUXdq2XVUVMvkLM6FI0TEW9ttKo8aYGBYA6OGpXqo0ablm1mYWiSRCzACWOUdP96WoDzfTAMEqoHNGxNRpZpmJhMISgf08dt7vj89Vlnk+n+5Wt0bI5j77GDoS06Yl5LZvU+183mstAUbIY3RhqbVm+OjjuD+4FgxUs3n2jDilRrirurpHpsGP37+3VkXK6EcE9P6HXLcaAUjYhM4jmJCECEikRgAjAAIJmweYhc8mOCH7OAABStF0n5MI3y47E081JrJMzMCX7zpeLRbrzzYy8xU6i4zMkWHLcOequG2BSS+9vEOmmYVqhAvhvl8Y0V6Z/oV8i0UAopllRhUBkVIECSMXi5xMwmJuhgCrKHCMzswIh0dAJiGqaYSxyNpTt1K2bVfVjMQV3CR6mTgzQRIQMxwARZiIYrqPgZA6Z7wqp6K0EunH8SASmr3VlrEWHrZqjkstENnnWWsDTxTSOUut4TFiuPkcE15seIS7Ts+ItrV9a1/fviGjmWECI1Wu85z9ea9tq1Uurf7+/fu3X3/5+na53W7/87/4OfLznP+t/OP38v1+fA4bEXN5GuEV4XrRNGsb4GFzTgAwNUjbSl3zrlaLefTjTCBgUpsZoE7gnkw6dOq8XK42Zm01HMwMIbkU90CihHDTmIrCzAKAU83mXKrLlRVaIaJzPCOitmqq64JsNplSaptzjn6KlB2bmS/zz+ydq+xbW1k+Zrle9jnVaskZpZVta2/wVafanLytAmcordaGo490r6UyMTFGxmXbkqCVOm1mZkAsmURqMhJiFqnpOV0xodVyuV4WO1TbVkQKEe87LOcmAnCiI1coUm/vb3301Yvr5nN0D2cq7obG9brBQDeHJNV1iPY55+x923aMkSJQwE0jl3MiMDHcCbDW0ntfX6tzjOvlAkRhfvYOiPtlMzU7R9t2ISlbjUgzW4yg2vzy9n65Xog4I3UOYBGRWpoIHefKM+HoHYmRYA5XnQlBiFLYw/qjMxMSjjEWb0tCZx+EmJrqysw6ddUdR2ZtzV1ZpEjlwmqzlKajm/qL9kE2m5gg9YUkImKRWqW6+SvitBrQWCJznh0FW2nqzlzatntYhGWATwPhzEgzS2+lIKIOLU0Y2QAAYasbIdTaGNE11JSQhISZoSBkjt73S9v2VrdNVRVGloKZJMJIpYjOoXPqnOleWwsAncPP4DcRlj6Gma7WGi7lPHoCRuTxx58kizD2fvZxntcvbwRkZrxWle6mambqF0Ay9xjAMpj4eB5vb29IQMJw5vVykVLcnURu1808Lvu+7/trNIf0+flB2Gpt7+9vOi+fj0ekS6omYJEakIWp95OFMrE0L1I8IiPP83xlfk1brUL49e0NiNLdXG3OfduYQAiTqNaqPiHctEdYrpQo4F9qC8u0DE0wAEcwXB1Qia9uoATMLIjYSrhCUD+fHnFpbelc3E11wfi8bAaE2ccwNRIQLvP+WDsZJkYQQhSRtQf2cHV3DxIyV1fbLzsi+HQhQUQqS8Hq5kqEgBQA09WHEQkTb/u+1W3tVNf/T621lAKAo4+IuN1uVcq0OXVgYiKc53O9pddOxtO3tjEjMyZmup/HYev5kjmXvxpA3cdxtq3xCiQQI7irZSmtbK2UPz9+PJ8PZqq19HFWabUU93kcc/Zx23cbXZiFkHYGmF317Va6NYBr0zJ0LIGJQarOzIA0wBcZP6aqjUxsrdrwzCCCDPcwU4/IOTogeDgVYkNMjIjCLLQLUjAsBHu134iIMDFLEkUEZclEM9v2bapHhFsQY60FAd28imiCzgkZbd8yEgi2fW+1eGSoIWCY6ZyZMcNMbc5R0qyWSDBVdwVwKY0FJAgRpQiK1LalLfMnegZQRoCF23i6A2RIKQlBlB7JjK+z05JVpo9Hb5cdFQiLpxYpfUwWbrWqTkSspbQiCKnaXWdA1FoBwSFYZG8bAVYpUMJ8LR5BWJiJQRK8H88A4MJm0Vj2vY2uj8/Ps5/C/Pb1RknhDoBAyIIYZbGmqrquv32MgGSCbduQ6DyHm5Ogm5qHsDyfz23fWt2EeU5Ve6GK72/vKGJjDh9jnFILAqijhzNThukYpz9ZWmubFAIQT0dKJppjhjkAlIaAlOEZ+Xl/1CK1tYzY9x0J7ZzbOiaOuV12nVaqiDAyNqwKZka1MRMmYmGCzOt2oVJ0qIcFgKcRcYCNPl5lZx7E0rZ2ngMdMlGnQoSa3R93EW6lePp4nhmZAX0MU0eh43mWKizF3WuVulFC9nnqnMKCkWOMDn2/XgQlIpFxb1utxdPDp84BgNfrRaSY6Yq2uCslDAsouW8XIupdRTjCzvMEyLa3F5qyyxz6PB75wtFdmAjgsu0VhZkrsXt8+fIOkedxjKmN6n699XKExi9ff1FVQZHCPi0Rrre33LY+Rmnt7e12nMfZz8IFAWur9bpixbii7K2VvTW3SHQ5j4daonBmCAuvIyeEh0Wt6+mJGQRMghmZ7nttzKKmcylh3dxtPI/Y9lqK2/TwwiRM4YOFyF+5NSBY5XGAmTETVw0BAVJmElHh8rbdLm0HA9c5R9fQcBMSQtIxXk8TekGrJIwsyCzsRQQJVaeZSZH14UBDRLQl5fBERGZKYYgEJhYS4TlnrWU5eseYEY4oFt5anUPH7H10AKwVihRYNaoARz9LKZg4zlNNAYCY1uOYmFMDEmSl1cX76OzKSGc/2tYQ0SGtnyQy51hlAjpmdZdq27bBknDuWWpd+hiWghUzco758fFDRMbokZ6mma7a+Z3ev779+PE93GuV1bjXtv3j48eh9ttv//y4H//2+x+H+bREZmlcSyUqAOXz+WPqVNN8ESZQmIk4zALDzMZ5SCEiCsjC5Xrdt7qNOZMSGd2dgLZaIGGqqmmp7Rx9ydFXNk6ICRBEbJqlx1AmVrGM1V/oQoVREKBuJSwINVc9fMbog5FKlW1vNo2u1znHihAjoLsTZq2FGCM9I1W7+bJxU3pIq+4xhxYPkZpM7p6IOrWfWlrjKqZmNphJtbv7HN1MRUhaDQ8kLiyB6OEAOcYQDikFEm7bziIkFN50KoIjuLCEg+o4+0TMUgQT3P3MQ0gcYvahEbXVVmuEM2K7Xk0VmZlxqi6Get0YdUyMIMDC4h5uGgEoQMDIAAlmWoqcj2dmzDHavpdSmVl1EsBaDof62/VNRLR6H/3j+SMZuVB6MNPtsru7qj3vP75//Hh/e8tMQySeod72VlgwaapSuuksrUybhCAsqUFIUoq5qloGnueJyEhYy87IgQaAhJwcTI0IWfIcw1RnSvUihcHDTGFtkiNrrebOxIAIAVPt7E9A3PddyjLAAjEQkCLonJGJTOfjseEFMPfrRTWEeaultcscHZBK5bQE5DEnJ9xuu6eHGyZMnQnOSOZepLSt6WOe/QRAFg4ORoyMGKo2qxRm2S8XRtq2lkCjd09nhOv1loCbmarpmKa27W1v7exx3TapRWrxGW5WS7EahYWLZFirdbtsOl/DmlIKAY6pe9uYZavtefbb5dL2y+NZIPyy7VZEWnnc76NrhF1v18t2IbPCQoQeHm5GdGtXYQFzgNi37XK5MMnUYWoi5B4ChOb68eeftTJLabUR0epkn9nfbrfMmDpBwcMJ8advP0kp7qY65xgetg6oy5TyOA9ACoLeD0wQWpmbtEwkYCH3VzFXIKwi2dW1nBlLmRvuaeo6/TUys+XtiYxwaKUCkrv1PqS2/bplhqpJFUAkeeXPuQhGepi6YaCbE6Gpt1bpr5E3IAiX0efU0fZtRbaWCsbMwnyimvqYqqqX/fp2e8tICF+lGpfLRUTCIsOnmXskRNt2BFSdproAu/QMTGKqpYR5RGBAa/Xop5tFhKkhgDC3VtUUMM9MJC7CbWsRwSJ99jk0VyEOETEBRi3CjGP0x+O+ioL3y74qmQiplrLtexJftwtg/3r7iimQ/N/+8c9zHBYxQBEkIIhLROB6QMPLqSyA4JYZqqoeoV6KQOL5OJRLbZuIMFPgYkYchabpWigQ8YKdXZ2E39++QOQYIxG3vS0DZJpzKQhZiiREbWUpx+fQZV4bczHLG2YwYyklM02NiAB99Zpe96vHtGm1ikVAgpSyTliuIUXCbPQeCO7x9nZre0PkhJDkMXSM/vnx+PLl7fb+zghpvrWaEOfzIEKuBSAxkpG2bSulQCAzpzsWyQyMKEXcI8ExgQRjmB626rgjorT2qgSKYOJVRECN5rSpeo5ea0Gi8NgvGzN6IGScwwCAC5dax9DzuK+e223fHPw4n7PPhEQhJlntOcLMXCCHR6rafiESUdflyTPTx/0sRUqRkpWJhdnZplkgJUSiCNZz9H52d3t/v133HYCP/ixYlgshMAHydrm9YM1z9vNkxqm4xtAecZ4jANu2SanH8bjsbxH2OProByC01grXqaeqZkBSursez1IrEYY5EkqRUD/n+f7+ziT9OEhk2y7m2se4XPa3200KPz4/I2OvG6OQG6GYm6qWJgDeyiZCK/SUW4VlfIFEwro3GFqESVYfrYflnHOqJQIWerve3MwjmKVIra0JcphfbldVPR5nOtYqW2u0MyYyk7knhLvt+y5SzJ1LkVLmsLAR7FKKuM0xz/NskEwcGSjYuG37RgI65r5vRYpudvZTVt89UZvzJfeG2PfGlUXoct3WjXeJzmqtz/N+9FMIhWT1OE7TMfvHx8ft7ZZxoyrP53l/3Lf9EhCt7uc4j34QQNuqHMeYQ4Ul3EsFdaXEOdQz3t7eM+D5eJgqEj7uj7fLdfZBicf5OJ5PWbUwCAOGCIWZq3IpYUmYTfjtdh0fnzON0gHLqkaHXDUzuCyiTKv6NpFy32qaPR937Y9Q3W9bkQ0izNxMmVi2EplLHClEY84lXKIihYiJFbRKLVIKyzSdY3ATqqhzShFhnnMQYxVeXZ3LA25qZkbMVYpQiVzMj4twYZmBGbm1faod9/s0rVvbLxcmSg4zm6runhlVStva8ef3z48f3FoVWVGRbduIyFMhgEh0OgCWIolUEzNTuIQ7eeA6ZpoxblyrzeGQfXRTZyqEWFslhDFnfzypylKWD53Fqmi5Xi5DhBJqq8x0nl0Q3y/XS9m+vN3+1eHvv/z6jz8+jnH++fHjnOOc09bsw1/iw8jcgG7XrQjbHIV8KxW5SqFwj4RMml3P6BqRGECr1S832ZZecUw1d0YBIXl5u7P3uVKBtdTWtuAgRjNlIEYk4SJtnN1MSy37Vs2mqa0052o0tDFbba2U+Hwcw1rbWqumUKXUUj1jnSda2S51T4Ra63n2H+7mzkJVynpNIjALMXGYCZXLtt3229QhQLVWIhQkQlR34uVA5VqLaWRYISapgDj7GRnn6JnJyUs56OFnf9YqGRmxBn1kZhhYCretJoCQOHlu275frrcdACaRFMbEVbB6PJ/h0doWmWFepF63S6SHBTq4WUKaKwQGualxkVYKIZWyvJTh6uEd88KFpulxnMd5MCIgbW0TojnUMqbOHOgZtXAgjn4+Hg9w//bTzwBipnOMWmrb9/RIgPWfQCJ1P88jM0dXM3t7f1u72MwMcxu21SYkCWga/exnP5e2wXBV94CNKVtd9o4x+gpeysLRId1snL22lhnPx5OpVKlba5XrUvItWMtMNZ0II2NrFQOAkplKoTm76dQ5VFtlG2NwEhRyCyaKjMWda2irtRRx07CX2dzc04Ng5cNjuRkIQAiFWc0zsnBh4szMhPBgYqpMKOY5x6hlq7XMaUBgZsfxPOd5v3983I+ffv56u12R6PPzh0fertfaCjL0eX4+7mpaRLDUSNCji5QqcjzHnGPbt6nT3CP9PA5TEymlSgRcLpevX78G+LQBCeqaAzJThAjwPJ6IJKWaeR/ncZ5UnmYa7rVUYhczl8JcGDNrbaOP0YepW/qs8+3y9nwcffT399vXty+ZeR7P4/mYY6rZZceI8Aw3u9yuHoaEhFiIb/ttzriaPVnOVJwKlOlOEAXBmSAphXGZpCHMTJCuW7tsbYlyKUF7z8KZOcYc57zt1+t+9Yxp83l2da8RzPz5eedCUoRFVlIxEnCjCAda/e9cdlmcj4ezUN2qTouItm040TOoytI21a0Qrpodn1NjFVgWAUwzPXv3iLa1KqL2InlqaYXLdDUzHdPdn4/7l9IubU8AN2fivW2QuG1xuVz26+Xz84OYt+2iZpnByLPP/XLlQmMauBNSP47zeG6XfRWMrYXt3rZ92+F5P+Fwc6q0X6575GW/tK1er7dwfx5PYlKdY0yzsV1uAEoUTeRf/+Wn2/ttTH0e/3r/fHx/Pj7uj3N0T3CfFkYJ//L3v/3P//Iv71vFTBvKpSBSH0OYAVHVpLa6FTBFAiZSNSFue4OA8+zbtgHmcRIRLkFmLQKxLksxYjITE2XQ2c9Ve64+CjdIeDwfIoLA+37Fy4LBsOtstZRa+3mYFirl9nbjInVrW6uP4zldV9soEYd1Atm2TUppCbU27x0yj+fT5rqVbwBQ2pYJwnK73Vbn4lQnNiG5Xq/HcXzeH8h5u70TwfM8bHhCbNvm4eaGRDpnQI6zSyulFEzo/SSgvwad2I9zupsZEokwIpvpYs+ZOQHOPoj4PA7zuuKvtbXeR3qsIieE5YINEvbMx/PZz5EEpdQi9fl8HMfx7dvXNXAztdaaFCHh43ki43zocTyPs+ucrchxP1eA0T2Scg3Jwg2gwvM5jnH/uN9u1+PotXqk60x3uFy2x/0+5hCWmslMpkZFUu3ZR2KY2uHHsx8QaeHz8ZBSkTABTXUhWLXWKk1dz/O4Xi779bJKvcLCPUwHMzIzIqHg17cvCVBZkhxCx/OUUnsfrjPcpPLn/Y4IfbCp1m0LT48a7vPstZVw73OcR+/jbLUe7unx+XxezC/bNcAf9zswFsFIOGNkpJpBplo8Hk+H2C57Wtw/P5n47fqWGUlZWZYqZqXYIhITqEh4JNAY8/48zI0RL9eVTCQRQaJ+djUtpf78c7vue+Wi6TbVMz8+flyvN0SwNRU0Y6Z92zISA0oBl2BiQDrOLrWM0V9ULqSET0Vm2bc9MNy993O1ee63CwLdbl+Y6Di6exJJ4ZqB7mY2zPRyuWaCMEt4iFSPxPUwNr9ebgDwOI85/fvHD3WF8NXw2vsJFohgbq1Wd0eiRFCz5+OwVmtplJ4UaF4QN6YL0xRSDHUNM1g+eEtTp1V35xARkbbVaytMYWaYpmP2HEFllQ4jJJxjfHw+VrURM4+plmlqltGPjkjMuF32S9vP0c95UkDZm6lhxtZqeMxxRoZGTJ+uVqRKLX2OPiZXRmR0R+aXWTdM59QXycpu6W61liWEvX8+pDAiLYsLMefU0AiJjKzt0loD5tlPRDzPQ6SUUrQWEjl7N3chDshaSgJgwPZlAwBmqhJj9MjoXT28ba3Vtg5c/Tynzq1tQFT3rZS62mPux/OcUw7ZnwcLh/kwdRsLrj2eD2bWPgjt7csXaHlr9e8/fb0/3/7Lf//nVssfv//BrXqYu2Hiv/7683/4d/9aWeYc5+f9ctnRs24FBYkEMEfvHgUobdpi/pFAzo5IOqaZvX39Atk9fK3HEXDbtz4tItztcTwgsu1bn+O4Pxzs/nn/8vVbq7uaatp83hODRdBhzgGZdt1dXVVr20qtfY6N6HEe6TbGPPs5xwCA9/f31W4lD2m1ecSYw8Mg835/bvuWHn32cKi1DtPS6tDxfPzpPvft0s8TOhDidrm2Vs/ZAYGlIJLpkavtMMB0llq3vZmFqbs5ZApJLVWYpbQwzwTzSMAxlIXNY+h5v99FKgnNOYiFl5qTBJD7+QDi43kSyzmP8dBzDGEZZ1dXcDj6iQljdI/4+uWrRUyzSOhd1e6qx365eKaqFaZSax/jPM5zdJujcNn3KxHPab33dt0oEBC3bVebmBSWgPTtp5/M7M/v3wGz1tZqU/Xv3z/HGB4TWT/uHyKl1T3czLxK7Taex5kAU/v77W1r+0f/4eEkQiTpsde91LJtDYn0nPiy+KaqbrQBpEN+ef8Cmcd59Hm+3W5LQARACSgiiHg8HmOexszIakiIUiVeDiKLoM/vH1JK76eHDe4RmaG3y83NdSq+ggiWmzPh7bojU22ljzmHAkCtbY4OgOezB8aX9y9U6Hiee2tt23o/+nGYCCIys5p5Ps9zhMUCpZipj3Pq2Npm7udxZOS6FCQhA53dzPR2e98v+xjjx48/t61y4OPz7pmYwSLncZoHCxfi2trW2vM4C+9IlBluqqEZiQBEBC9xOAhLZpzHkCrLJ/E8RiLUVlVthC9WuG3oFtxEh6mqu7Vte7vejuchv/322/W2t7b+xIXyUvbGjI/zZMbeO5h/+/Jta3uR0p/POXvb99vtNsboZ9/2CzH1ccIYkZew8FITcoyOGYXwbdsIcJMyhj2PY3K6wwRcqV2UYhjuULj9/eeffrm+CYHOc8U13WMeE1ZZYKBcau99jIHMdW+qmgRjThIZx7ifz3D76ddfyleubXvcP8O9jVakYmLAZc410Ha1ae6h8+eff7kSZ+Ln56NubdtaP05Eul6uUnhOO/vJhaUKEh7HU93UferZYsMECRl9mBsi1VprLe5mIaXV6+1WaiViEUnIOeP++cG12dQx5rDxx7/9RgVvb2+IUGrVMWup27axyByqqr33XDfcQEQ0n3306RaPu1l83j9JhFg+Ho/WqpRq7uNx3D/uEdnHmQgQ/vb2tm87MblHFS51++nLF8JPLrK0fz9/ubZK73t1AE8309t+/Z//w//0drnktOP5JCZTA8uEVFUAROKpOkwtzMJm76U0Jvrz/OEa+9YE5PH5+bg/ps66Nyb2dEzcLpfj8UAWm8pFzK2POU2ZqJaSkbP3sx9ba7W0aVPC02P2CQjPflQpnjnVtm339ON5j4POx6cjnPfn2Y/VdXe7vrnled4/9DuxLM1RZghTYQ4gm1rbJTIYcau11vJ8FZ0LIfXRxxgJfJ4dmZ/nefQZYbMPQDx6X07AtvvWWmGpW3P12pq7mc1CnAh9TlObOsvWgMgyj97VtE9F1da24+iqk0iYedt3eD7HOIFp9F7q1lWJcE5FwpVsa9vWe8ckqU3PbpGq8+Pjjohtu/R+fP/j968/fbvs3nsv4a22fo5zdEDaLtdWt1JqmJnbNMOpGg4AeB6JMPtgogi4Xq9q9jwOSNSW/VQpW8R4Hsd5PIGAmBF7xicEiJS2FSIxs3OMQsxcVD0CjvPY9q0UJOK2VTPrY9KE8Hg8HmN2qY1FPu4frnZ7f+PCi1+aOqvOc4xSik1DpIzcrnuEb9haKVtr5oZc3HzbL+4x+mRikZIZLDzGIEREvGyX6/Xt7L33wUgWcHu/fv36/ng8uykmqetQVbWttrfb1S/7eZ77ZY9YOzu5Xt6qsIgUkdFdp0qrbWsJ4B5hDvmKKJdSm9QqZd/3758/jn4mJOGUIhBxjpEAau5hqnocT7dFIRCLEBAhguP18raAq7ZdainncYS7ubfWhJg2KYVV9aH2/fufv/zy688//TSmmtmcc05D4evbu5sn8tba5bqfPD8/P5hFWim1QGJg1rKxyPP+GeYIpDPk48cjM7d9ezWmMD6fjwTctx0p0+giX2/vt3GM6WPbt1U9fNh5vb0lECD2MQCQCKeqe0AfnFC31hgJm7zjZS9mMbo9t+oBw2Oanr0hCxAmEiBS+t9++uXL+8aY4V6YQBoxZ0dAKkyZVGp1d7VIN3Un5oi83K7Px9PdI8I8zmcfVw/U4+zH8/H29uW6weVym+oRWWolNymiZlgbk7hFJlxvb6o6pwOijnmevbW6CmLrtifm/f4gxP16Wa/ZMUa4+zOmTlOVUr9++XJmPp8Put+l1TGV6zzPUaokZCSM0XGam97P83weH5+fz+Pzcr3e3q4QUGoNi/1yKUUCwKc+nwdRfv320x8fPxZX5xaEeH8c92d/ng+Wcg49x3mM/n59u9Rt8DyfjzGneZzPo261bhszv72/PR8HoezbfjzOKkIkgQR57qW2Uvqmz/M8x3h7e/v29acmLdWfzzu6zzlpawHenydkSm2Xy9Ujx+irtS48FfXxOABwydlrq/p8tK2po7khglucRz/OIaVctlKKiEgfPTRqu2xbLW1PyPvHPc0tktKvlxtzcXPX+5ijj6ElPYIALLNtdYx59m5jINPR++Pz8eXbt2mBzAVpzuEOLBxuzLTtW3gAJovo0PCoe/OIsDiO83E85xjTnIhU9XyepXciOh6PRSiozoiUWm0qVwGPCGitmgeRzJhjzNEPqcUTPu+P0actEd7Q4+wJ2XuPjHXZndPV5mL2t31bKeLncU8iBJCpGVlKhQQfhgiX61ttRaepKWWWrT3O08yf/cSkgM85ZmI8jrOPaR54xmpYB8gitZSShI/nMzwSUt199DGnmpkrRDJzq8093Q2oqCUheESt2+N4utvjfnefr6YGwFKqME2d5gqIhOgWzGwWqt3diLGfwy2IiBjPowNEKYULqevjx+NyuRapxLRfLoXL836Yz+UkPPsc54lMQsxMjGXqUNO1inHMYfNx/0QmDU8HVUOgbd8AE3WJBoKAq7QELqW22iJy36/C5BaIcM6zz+HhrVTMkiWJpLZyjk7CaTnGdHJeLb6RImWSqs66Ci4R3LyUBh6lNjM1M7coVfqYOtXc51BAQ6Mxxhyztna5XuecY8x9b9fbRYciAUJet23F6358/Nj2rW6NEMJ0rVeP57P3zoJCvNW2AuHLwAgIxPT4uD8ej5Vf+fbtNnDSmLW0Vnc3wMAEJCkLiuUqe72Y5yKPe+8AKVioFCGmfd+fj+5u//ztt+tt//uv/3p7e3t8fGSgqg7t5vr29at//iCSADjnyaXUUrr2JMpCwxyGZoQgjdn3y54ZTcpl30Xk8TiFkrhorKdZWgQXKXVnhIh4u16IcjwfaYOQSysBsKyvYdC2gswZgYUgQFXRo7aqc5pHbfsvl2sCPp/Px+e97ZuqIzAkAvLUOedQtf2yl1I+749SSq11mI2Pz8fxqK0dryQBPp4PQb69XWF1PwIkweP5YMBh09UtQ5j72c/jFBEirI0jczyOfg51e//2pZQitQ0bc87P+6e7Syl7aUBpfRy9f96f+7YL1SJbLoKFuT/PhymVUsuKnqGH66k61cPNtNUNAh/Hp/lsSX/2PyP9ermt4l9Kltp+eXsjlPN5vL1fv/z8JTWut0sG/PHH78fs6SCtXi5XaY0QzVRaQYDz+bi+34iZKFXnx/MHzGhbAcQ+us455lS3KttxdCAeo3Ph7bZ/vf1MxDomJjiGpqUuqeV8f/9ye/9Sm5yPXutpFsyUAdPsPCcQT48MGM/HVG11e//yrYjUVi3s1CnmaqGZ0loFQMTL9SbEHp5AkUnE++0tMt+53q5vtTUmnqqJUGrd98tq73IIh9RQnbZfLiD88fykg6mSRwTEUsd8/PMuIh4++6y1AnFETNWIMJ1SKhz9+Xy+f/nKRBFHbfWXn345x7g/nh55Ho/r25t66Bw6bIx+uVyk1qGzH+e0ebu9SSlm7nMiEHORQpBo7mMMokJMaj7OCYS17tvlMvo5xsxV/cVkIyx6IplaH13N9v0aAJ/3+9Txy99LRE7TMU6bFpltb5t4P3ppBQKP41lbiwxM8AhGktJKKXvb932bao/7PdxXZTwTL+HweRwRAUjH/emZl+u2bzszAYGZ1lIAaXkPPz4/MaLtO7z6lDIii1TY01Uj/Mcfn30oEtr0tHm73a7XL+nWz8/zPG/vN+YSkVNVnK9frrVVDHwczzF62/bn80Es/TzPPllYSEuthMhE1/0iQn32Qpzhe9tZSu8HM9X9mhksJTPUhpu5+Z9//Ij0n3/69q9///u2bTbn5/N53B8B+eoRxFfPYZTssx/ng4mnucU5p5bCzBwZNs6t7gSeYaPP4XqeHYWQ0AN8jDlm78PUIGL0fr1dC10d4s/P39+vt2/ffiLk5/3zx/P+frtd3t5s6o8fH+72P/37f//+9v7bb78dx7MUvlwvz+fzOI/IfPvybqrjHM/j7GfXPo/Ifb887o+paqtyfFXyeKIQrwayQpe9VGHWKu9vQLC3ojaEKJlJT/MNIvzHnx9A+HieW/3RdTzv93kOqeXL+5tn/Nf/8p8i4TF6rY0mvt++kMg0NzOfU7CARymllBpuj8dDiALg9v7eWoNIDE9AYnaAYdPN98sViM7zLFwhlJEAYcxBUsi5lIpiYRZEZvbww9W4snDbEfsY5p4R8xyltbfb+/14AOLv3/+86e3S9v394upTow99Pu5qapFIOObEfiKSqkV4a214/LjfH/e7NGYiA9rjCpBn7/fjjsKFlksWjvP89vM3RD7PH1MVifbLtUgBoNJaHMfo2s/xy08/b+WipN8/Pj8/7glxvb2VEhHJXPb98rdfSm11a+3Lt3cCSghVHb1/fn5e9v3L1y/heX8+Rp9q9vn49KnX9zfvw8xWBk0yfnzeE6OUds7+cR8C3Grd24VIrtsuVbTbgk+O0b9//JAiHpkPuI0hpabHnJOEt63+T//+30/1SNtqJc7C9f3XNyY6ns/vH7/r0jAA6rTwKNvGtTzPQxGQxCO1j+fjUSo3kX/3r/9eq/74+HHMAc9n6eX9y1ek8vlxJ5E///jetd9ut3GMH/f70Dnmwci//vov+16m2fN+VxtjTEJQtX3bWmuqxoQXKqU17+fz6MzctuoRZPb1/dvW9rOfx+if98/tshcuQJwAgTR1njozjNd3GyAgx+h+hoOPMUorK1yqOoVZ9s0yx9kBcWlGW71sl/3Hx49EvD+f+7ap+XaOf/72Z0KqRe+j95nwGGOM0SEAE5/PfqU1SBzHedayXy638xxjnIAksnqBIcJaabfb7TnOMc9IsK5POAh5zHCA3/74zqtQCnGOkYSqqkPDnLDd9ehzmvuPj88Fy6rp7MtPR64RartfFof6eByAyUIAqeoiLKV6+PPZ1TQWXCfFwh1hHs/MxMjaqrtv+67hzKWPvm9tiU7HnBBITGfvSPDl/ctlu4zZa2tzDLMQocL7ZD4eDzf/cr1d364ReDyPyFQdc8w+O0AUKfvlehz30iQ8n+fzOJ9EsoJv7q6qXR+fPz6m9rbthaW0bd/3pVXc2uXa9tt2KVQy4zjHQpX6HATU6lYKI2VCEOD77f3z8ZkGKyf1PB7358fxfALh3//+7263q6qH2+fHhy+vauXb7X1r7fPzEyC3/QaZn49PSCSUbau0lTgPzqi1DNVzzirl/e1LXuDH/WP20832fXf3f/7+29cvX9+vb/vWLpd9dBs+f/ryfru+oxTIFOH0cPdvty/6/hUBSAgRns/n8Tza1mpr77f3ttVnP/a2XS/XaZaA08ZiC1cPmpkiAUCcx3F9u16vl+u2ReTs3d1E2BFYRLa9Si1JdH8+ex9cRALm1Gcfwz0tpJZv374xk2Oev42yt97HeXQdE/6Onn6ex2+//+4Q77e3t8tbK0UjEXBOi8K1NTX/+Lzr1PM8a9sj7Zz9PM+2bdkPj3Tz7kdGbKV65PO0wlgbXdv28Twez+6R1+slE47nkxj3fX+7Xcz9OM9tayQYoGd/QIbavN/vgMCEfY45Rulnk9LHmDqe50Ei729vEHmcn8/z0DHevnx5f/9CxPf7/Ya3rz/9ambP53OrGxIfz+f1epVS2t6ej0euFsOE2jZiMfMEOvuc097fv7CIp5vF/fH4/c/v4X6M/v3zM8IcoJbmYUtffPvytm3t7Me0WWvNyHbZPf3ty9vb25vUOvo017P343mOOd5vNybp5zjO/va279tl368e8J/+0/9Xx/x4fLxfb+/vXyP84/6DqBBmZHjE3//2q3rcn4cnFq7MdD7u/dRv2xs3GtNY5Ha7qcfjn/+cc15uFwKol/2pHR266tnNPbZr+3a7nM9TpG6X7Y8fPz4fzxvRtD8+j6f2iQmu+u/+/rcfz3ukH3P279/vjwMT//j82Le9bEUjftw/H8fxeRxDbZw90o/HwVJ++hn++Hh83r8fz2drdZ2w0iKRzq5h9uXrt8vb9ej9t+9/nv1gEUiPgFYL10LJ9/54PO/T9Kqz1SpUROQ8z8/Hp5oRwdf3rzMgiLbrG/H4/vFDCnMpJGVOI6KtXajIKo3SGXNMe3Wg8LN3EgHjOae5vV3fPu/3UrtrIKCqesYwG6aELEgJcPYzEDIAkC77NTLPo/c+Hsf5spuZr+Iqhzy+DzV1D+HqFvfnfWh3i0RYxaor2YeA7qZmmLBt7ejPPsboAwj6n11EYHn9AAmw987MTeoqoi21cEhGAEFmFkFkPs9zjL4+KyRy2S9IFDPmGGY2x4CMagUCgODSGiLOMSci0aqD9VJYmEEyIcL9+/c/VtUyMfo0nbq1tiKERLjt22W/9jHMpp/25f19zvnx/WPbm7vPMYqUy355Ph9zqrsjZa31emnMNIZstV3K5h5t22qRfGXTZ+/neTz3bb9dLgG+Yn0Z+TgOv39eL5d+PquUX/72q3tcbtftemXhVrcIW0ObjLxd31SNCYrwVqvNsV+u5ziPjycN2vfL5XJ5u90IuEo5zvPZz/M4937eblcRifBp+vF5P/ohxL/+/e/TdZxDBLevX4SZkL7/8d3Bp86fvn2RUksps8/zeTKJp9+/f5rrZd9v19uY88/7p7uWKvtlcwvG8/Z2W9avUriK/PT+ZUxlEVV7HgfEAlN99PN6uawJ7f3zk4U05s/ffi6lnedzjHP6zJnDPrZSZJjfn4+3L3XOaWatbePxOI6TiL5dvgYLBRDLmPPz8dzer+pR9x08RcoxBgg7gJQyjqP38f7+LZLSzXSOOTkIpcS0afPjjx/IuAcCwefz2Xt/Hl1EIuGy7+FxPI8nn/t2K3XPhDH0N/3xPKeGz2ErO05SAOJ5HGMOZu7nOXRcL9c+xuN4MsvlsvfntpCMMbWP7h7QAoXOe1d1Znq7vSUAAEbC/fGjbNtVlbm8f/lSpF2ut/vjU4f2OGtrt+v7tjVTT59qcY6xq7tPKWLmOvU4zyLlPCYgmi3Hcnx+3qfOqXNMvT+fqkNqESmLo71er7creRIg/P7n7wB02fa3282mIdNxHPa4936evTOXfd9++emnn37+qev87R//3Fu9Xd++vH8l4vvzmcyfx50E//a3f7ns2/P5eH6er+JDyLcvb0efLEYkt/d3NctIKgUEWej+PDWcUixy6Pj+44MIP+4P4SqleNj987MfnTAR4na57e2SwMLSfZ5jaMSfP34c/Vlqo8RSpcmtm//3f/tnhNdWpW7jed5/3AHil19//eXXX3983H88Hx8/PqQV8yBkSA+Qeczf//iRSI/z43l/ImEtUkS+fvny/uXb2+V6fz7d9B+//97H/PPz8/m8SxHwyIS399sY/ybMBvH58WO7XOzxJDiEJAE8Y/R+nEetNeH+eByttm277Pvtx/3hgMj1efZMxEDvnadEBCSeXeeY5saFCFfzaQDBVCOjU2Yifv/xJ1Nl4jGGp11v10xsTYYqIn98Puqcy1wvtcSAPsdxHuYmVGZmePTzWWoFJDXVaVwEQYLw+x8fdStLQJsJ7jlmZxYShExVRwBPIAQ10/BW2nKr00uOSK8yIuJSN1dXMGYhQiDETCJq+0bMfZzhngjmLkBjjiWXJmbEJERAFinMWGpdlUFjjATwCDMX4VpaLeWyX8xU3e/POzGZxdvblYh6P1Wnm405Sy21NZ2z9w4IOuePjx8I8Pb+pmbH0cP9erllhFBxCps2jlO+yHKBFCkGAERNhJky8uPz4xzTbW6tLYlW6DRPTKhbraXsUoHrvm0eOef48f3H25f3v7+/fz6ef/z+p5FquoW9XW7v17fz6MfxfNyffYxQt7Ak7L13na6673ttDREfn9+3bdu27duXr19uXxJTmJfI4Ha9IdD5j9MyP+6ff37/43K5/fzta5GaGUV4XLf7593MRBqvgkDM63WPiM/7/TjP83i2f21vt6Zmn59/6vR9awAQkJfrlZmLCBCo6lQlIhSKjAS0OQHhdrs9j+Px+Mw0QLzse4SP8yQkYVH143mMPsomz97H2dvbTc6zZ6TDDxYytbN3TCylhufzGKEe4c95RMQ0NZ+3t2+R8/r+RZb8a0ydDiylNtXQoen5fNznGCIU3braMjQ9x4nE07P7MHdA0D57H621c/SImFOZKV7duTmeChj3x2E6at1+//6nkLRtM7NaKjG6BYuoWZ+DGO8fz1bL+/vXL1+/CDEkZkShctkvCJhuQq3swECC9Pm8W1hr29evfxOSo8+I4R6lRO9jzDHOg5gXqn+5XubQ8+xLC/p4Pm3O1TCvoXnAvsOYI5+g5umh7p+fH0SUGbMrJAjxPH22SSymHpkWNh8TkdX8/vF57odHCuHsY/Su5oTQ9mYWrW2329tUO4+j96OP+fXb19rKeY7783Eex77V2/7+fnuvtTzuT1VjQQKcpq7x/c/vtgpKwJjq1KFh5PHj89n7+ecff759fVeNz/MuhRDlzz++365fnsdvM6w/zkQQgOu2fTwPke2cc877MPv9+/dAZ5bjcXz7tn37+nNESKmZ8Xw8fvz+x9dff/6//C+/ZpJNA6DStj9/fPz4+PGP//aPCZ6PiMza9tWhae7//P0Pc5/Wk9DV0u12ve7bPtQuiIn058f9PP/7GPN5PFe3tSC93d4heUy7j2dgHo9+Dnt/fxcWjTnGOI7u4TMmnf3svaAUKW3fwlNtOqSZTlNEDDVza3WHTJ2WEQAIEBzsqogIL5wfRGSOjghjutuThc/ns9TCwu6hY0Rkbdt0mw8VEYC04bN3h3Q1ZiyXHQA8rJZKSLMPEiaWguKu0zTSjofWrWQgIDHR1jZ3pySi5CYrzB7uVaRwkSIAq/uMmYWZMiEjC8tWizvr1Cqcq1GdaeUoPQwzSymMWHC1FYV7EENd6iQpQixVMjzcZatCYjpqKUWkSmFGJs6AJbAKj61eShWPOJ5H3fapmnMCRIQn0ufnd2B6fD5EpFQ5Hp8ilQjDTXUAxfHnEwlH1yURivA5JxE8TzvOc6X0v/30TbU/78/ffvuHDkuAt8vl11//ft0vBPn5/c8A+Kn8JCyX2+X97RYZj8fz0efzeUgtzIWJL9fL/fGY//aP2+367cvPIkIMaqauHvbbP39jpnbZz+O8Xd4wE5JWJLbUtreNWBxMhEpprQkzq+rvf/7x8f3H7fbGIo/HAyLeLpev7+9m/uPj46FTpBBRP8fzvIelhUWAAxzPRwIggln40MJVWObZT50dBxBmgpmReamSER8f3x/Ps+1bwv+Ppz9dciRJ0mxBEZZddMNi5u4RkVnVt/oSDc28/+P0remqzAhfbAGgi+zMMj+QPW9gpAoDRJi/7xxmtAEunoVwxpgAEfdw7Id11igrQDSkUtsW1ppbLXU8nQSA1j7KA1uRRy4xlb7vo3cAstaiQNdaAfg97IJz6n3bVm2M9XYPR6jUWhuf8rNSc4rPBB4SKaHu64NzYIxSjgplqVnmpLTFRjEFJXWIsREKLUqpMeYQd6WcNhnpqR5UDRkAPJ0/peaaqxCcp4KIzjnTmlaSQ8XWtVJaWimxYaNKyzyzzox8pncol1xqUUpN47TtR6vone+Mddbv27GudyGFd4NQOpac6/O+yUoT27HXUkpDVtE5rK3FnAlZyqkhloolHuEIWkkAobVFRgyYtjbVVHMTQrQQeicJyroB+qGN7vwJRObWGgBmjWWcVazWSkEKgPXOgTGrDWO81VZq20PIrRptAfhtvdWcGmLvXUpVG27H3jtzWr9crtt+YO+3z0872H3fCLoSMqS873uprbW2HZv3TgoBXD3PesXQg4WcYy0tvr2X9t06a82QU7ndHyEWpLruWy21E355+cq1vN8frIsY4+f9VjuC5Eo5Rmw5XUtp2Kgifd7fT/PCuAJluJCPbQeuKnWlVCn08fl5f9yI9dbosT5ASov9CfjlHI71UWp5okMZY4Qt5lw6/nr/eKwbVdxD/Px4KzUTkdKKOlrt/DiHVJ5s7VzrkxKeUnn6RnOp234gw/3YjTUxCqvdOE37fc0p1dY69JLT04nciai1aWK9847YOzNaa2NbLUIp1js+O5/KMMZrK2ldgQsAQbU764y3MQasLVDX2vwL/ILYexdSEqNca85xGqcnWIIInbCc81pqowasj4N/bjuO98MZ95RgSC2kMFxyznmttSEqJYALxhghtdq00Yxz63SKST0BHQBP0u4zwiiFLDmr0UopCImInNZPAAlnHf6PxNFq/QQOy1alEs8lMImmtNZS1VpjiM5YrXVKUSsFHIy1UkDOKcXo/DgMPhxHAu69K7Uex07Ex9ErpTljWeYQ4hEOpbUxxo8D1hZaSzkKkMCF0YaIWuthX2POLy8v1ph5mlOMKSVtTGuVdQZcjMOghLTSKJBPaqHkfJxGo/Uzklda3VOotSopKpo9hPX+qK3lUt8+PmIuSMSBI9Htfo8xAhejHxEJGOPIsHcpFRe8d84Zv5wvT9bF7fbBeVfaHCkRo7BttdVhmJZl9s43Qs745XKxzmEnwaEjWWNTqhUr450BEwKGYRRSYsNS2rat2mghZGk1pXxapuW8IOs5R6TOWHfePv1f+7Y/h9Uv51OuNZcmpZRCxJR5Z0bb0zBNp0lpvT5WyWAPhwAwxtRa/v9lnZgCdCFAdo4xpkbIOJdCyBwSB5Y5cChEvfbGOY97REQ/eEKshDXEPcWcU8iZMzhCwEZx25nkLZXT5Wy1Rewx7ozIOsOFaIRcyIZYY2yl1da0sgDdCI1EwKRRXHBZMpZYAVhFLL2mkBlntSIyqrXU1pxVUkhC6p3lmC7nkzSiI5bWOmPeeSj5OA7goKTsjKSA9PRqAkgBOWfqGEIUEoZxJMTeCbEaY4SSirGU4lP1aZUxygLnApQ1HDgvsVLr+WnnKg2Ah5RSjd5axjjn0Aih94pojcGu0pGVUrVWKZXSSivVR6+tAyVSSIKDlIIzTkQde0NknSmpvB+cdeM4sY61lHCk3HLvTAgpACq2Vivn3NvBaU+sO2M57601JdVyOU/jBELsx34c67pufhrCeoSUW6uPx75uW0OSkg/es96pk9RGwJZzFgDamBhjzHGaZqVCSLEjrUd4yoW00UDYsCC51NL2459YqWI7wiGVkEp2Bp1oP477vo9+aESdkWAitdI+PtdtQ+oAXGvVG9/2/bFtUkIjEkILLgQT/JkYIa6E4p09mU611Y6cGt4/t13GWgpie743pXRraV33TsRGuN1uEoBzeDaDasnDOFHnMaaUynHsxBm2yhmEIxmtCDkXopR67Me/RBK9a604sUbMmUE+ofNaM8aMMUbrnAEJpZRPQYrQkrBz1sMWjIb5NLXWaqvUu7au8SRBchDAoeTqBsOJCSEBQAkJvFtjBIic0nI6WW2klDGGz/vNWWetc96nlC7n07YfjHUlhDGmtCqUINalNr0gl6CVERxKLYSklCTOrVVOqyf4F3h3Vj9rKFop3nlUkGJE7BKkAiFAIMOSMighlZRSCg6dmJSylNJq00YKAbVVrdU0T0qqjmStEVLkmLTSWqtSCmckQNTa9iOAUjz9y7GltFZPYUBnzjljzHYcvRMD3okbZayx3rkiW8tVWc85EHVgsJyWUtp6X52yVrvBOaV1RyylTuOkhGmtPeXVnZgQSildSpVSnZbZeptLZhym07yt+8fbLcT42x/fQKjbbfvzn99P82xHDwAxxxRTiKnUGrYU9yiEiDE931TnrOSojHLeSqmtNt5Z4CKUCBxyTuv63RhrrOHUY8oNCYDnlHpnpVZtFIeOBYnIj556X4/tsd4566d5YZ2XWgajrHVCtnAEwk69KSnloMZpnsep1fpY7+tjU0oa6yQIQhRCgLNSQEwJG87DZJ3jgk2NQIhaClXKKU/TmIzZ94MLYa1zzqWcOeejH631OSIDfsTDaC2VBM5D2uTLy6WGkksZp6G0SohEXYLkjHfOhJDI2rJ4JIoxPFL2w+jH+dg2JNTOWmPQ4ThNyzjFXOjemBScC2t1bUUK1bCVXEDQaEfn3DPfmnIaByNA5Fy3IzSkafZE9PH52RnvjJ47QAG8c9YBtLW9EQeulZZSCSlyay1V4QTvnHPoRCXGBuIpeyGi5/bJWGO1RUJrtLH2tJz2cCjEL9ffjNHDNB0xcM4Z58CY9c4aq7XJubDec8k5xNaQESGiMWZdH9gp7eE8nZRSiPQU3MCzxQ4glHi21pTSUspcM2N88o4LLbiUQuzb9mRNKy60kETojefYpQDE1mpJMVUszlrW2egHZYyRmgHvRKWmbTuMMsPgOmPLdL7ze0W046KNuX++f95u4zzF/UilWmdIaq1QSGmtfRqJsbWcqjCaOmOlSKsbEuNCG5dLS7myjm4YNaIQMMkJiYgw5EKPFXsP2/qUPDekPQTGmLbPnlcvKYAAbUzMERhvRHHbn55hpbU2lhGVUrSSnRFnbPR+8KMU8hnxfkImco4MeOddJJCDBwbYkPHWsHHiWslan2Zta517olhrLRlJSCkaCM5jLvLYn/N6qbhWUiiJqDvrrTeldCcCIZTq4zhqpRqi0lIp2RtJIfS/zn0EjPdOwzhgxZTJWaut6Z212rCh0loIGBsKJrW2DQ/shKkx3iUIqVSuledKiAok8afEmPMu1TAbqxljRsrBW6uNFFIIToTGWiklZ50hCgFScK3UPE1CqhBDZ6xRAyFByM7Y4LwQEGOPMSGiEEIJ0fu/DplEJAGMFFwAMMY6AePAmBDCak1E8zTGkPrejNVCSWcttg5CCs5Tjs4qLSU2UlyM4+CM9d5jqQxYq9Vara1+aiSPfd96fzY/UsyMcWrIGUs5D37419MGwTojQimFIQXOOevGYdBaSVm1fLHGEme1tNaaUloJ9XJ9scacTiet1fvto9XqnBEAyzTlklPM4Yhc9HDEt5+/9nBcLhfr7egno0TDzngPsXbGh2kYp1E7a709LbMbPRcAAFKp57JXCjGM3ihNjdVcjdVImGI6wjGfltEN07wgEudwHMEp07wPKbDeee9WaaON9YMA3hlt+15yGYZh27ZUKgggolhKOAJxYp0JIZ6eK611yRW0OLZdKMlZR8aU0uMwns4nYNAqPe7bEcM0DhJx37ZSivd+9ONzjWGMUUoA50JKazVh00LlHmut7x+fiKSkGKar1TqmRJ2sM1zC/fEAAbHklqNS57//7feWa2kneV3mFYJljnf++vqllhJjBM7HYWDQa237tmvnlVZCgJRy3dbX19fBuH1/SGmcM0qLVlvDNnpnlDrCroSQShpjOu+qitO0lJyFkN5aLuTxuGfGtNFaamU0FzyVMgyDEJwL3hGFENQ6sV4aImutETAGHJwxQgjJGWu9N7JKKgHYigCulRIgWGdaKKRmjXXGP38MKmbOmbZaKmC8U2/YUEiQRjJOzunOBtYZY11qxQRHQilFrkkqgVqklLwdlJClVKU0a+Xry5dpGJUxMQYkmoaRcdaJpJTGGCHlOA5PZUeKiYPYwyFkiylQZ/t2R2pSSiGskrrF1LiUAoiQIZVaU06dd+vs4AfeOQNOHTW3TbQS6pFiyKlDl1JyAc7oeRwY58pI0CAEc9rEvl+WZZqWGFNK+bqc53muiIwQCfc95OdX/zS01ggZn4QU0BqGGAbrnkTPgXpnveRinKFaiIgheT907MoqJQwSdtaVkMh6SpUcGqO0Np014Dynxr1n1FsuwzhwIXLK9mQBgJDFFIWQy3TqnFIMnHPrHOMMOBJjAMwqDQCc9RiKFOAGgw2VVbU26iilFIwP01RLJawxxMGPAlhtdVQjdCY6J86klHIehZS9s1qLMaZzTrU2JKWM9oZBJ8Tn7F4LaaRSStZaSy3AmZBKSYgdrVHeGRASQKBUMcXR+VKbmAA4CAWycODdeqO1kiCpMw6gpfLOCAnUGdXKifvBeecAAAlZ71o9g6B8cM4YTaxrZbA1CSAiSOBK6+dIsArRWsPavLEMgPdun1y5opSmJ38mxcg7H7zvvFOtiLTtOwA8G2FSCAbMD94otd63nPJ8mkstMeVByJQKdRqkfjbCjuMouXTWeYeOHThPIRFWRgQcuOAl5ZKz9z4d/b49hFDKGIZ9Gkat5B6PnFIMkQsuOmslr+sdCUfrK0ettTGac957N1orqbjgwJgUArvKJWnppmmKJaRSpBYSxLqF2hCEcBaWeensvq0bJ6DOSqMj5GWhWltIybtzxbLuR2vNDZ5z3PddSe2HgX/pzg9EmEtat7sCNY5TbTj6Sf2fum+trQNxDlor79wTUqmUDDFqrRj0krUWerqMg/VCSsbZMnjGObWihDJSdd6FULfbnXM+jmM4jhTieZmHcVISBJfzNG37EY7j2HaiLoWYl+U4ju2xNUdCit475907p7V+zgO39WCsj+MklSBST53yx/sDOw3TyDkIgGVcpnl5bI/b52fOtdb68uV1GsfcipRiWkbEHo+YUso1Yw3DMHAt5tNJ8i5TjNPkWee1VsE5SJ14EFKcl0lK/fbx8X3/88W50bmOhB1nseSclNJPlYRWXoAsLe3HNp8vXy5Xo+S23ltBKaVzdj5dlFD3xwOJxsEradKxSQEKuDFylG4w9ojBOSMETN46Y44YHvct5PzlckLCUHKN2Tk/jyMS7Y8VWVMghOStFq3Ek3DrBidB9c6IgVOaUa+tpQBAdqYAAPK9SURBVFSFqFwK6ojEcsmtllJbZ1Sp5Zw4h1IyB4a98xqJGCJSI+edFIqoa22FEEoq6rSYkRCVtlKI2mqtmXVmra21xbwbY9Q4KCWd8ev2eDzu/tlNCwdSqjVLJZ7xHKJO2LlkqbQQP8Zx4oxvx96oWmcst/M4G2Me25ZDyjlKkK9fv0zLHEtdt/X9490YA4IZZfZjRaSzepmGSQvJiCmplnkapymGAByHwY+DizkZ7Z8aXm2EdT7FtG4PkGCtcc5xxnL2xthacjjCMA/Aey2NS9HRYCPrHTVstRIjow1nHLE/QfC55A7PqCFDbEIILYv3nlqvMVtvOucRpB2MUDLFOI5GSuXdEFLsCIzxeXRIxHtD7EIJwUVnHbjwGq1zSBiPHTkabYnoOU5R2ighjJna1DgD40xMh5AKgGFt7F+iDdZ718Yw7rRWtbZWZcllGIdxGPdja7Vqo6ZxkCCe2nEBHXoTIJfRa6W0BO6dVBobYUcutdWKgZiGERuGcCB1JcXknfe+955zKyEC8PMyDeO4HwdnrORMnYzRT1ddyxWx9a73WLBmpY2QmgiVEFKKWpjg4KzXRpWcSi7UEVuj1qwzz2aCEMA4H70fhoEKEu/HvjpnrTGs99Aa1eK8Tzk9HuszndIaImJlrDMmpailAOvOaMT2eOwlV3rpl9PZe9eJ9mNHbIMfGrZ935Foe9yp92EYnHM5JSXF4GxHYo879maM5ZI3rFKKhrRtOzFUUl6vV1Ay3mJD1EpxYNY4KUXOCcAJCfEIuRYpBbVuvQOhPm5vIZdfP/48ny/fvv02TmOKR0rlCIfRxlm7HlBqVlpba5ZlkUoLqYj6se8h7CXnkDPV1jq73z+ddX6clFT3UjlE6y00iDGlnpwbtLbG2GUcueAp5pQfUsJpHhnMHHjKeQ9BKBBMaO3GwTVLo/fWOWztCDuD3shqqTq1eRw5H2PKRjckIiKtzb7vVpl5WobB15KRmjbaYfvnn//Qxry8XLW2iKiUOF8Wo7TTlqjLATphOEItFQSc5llpNQyeEbuczt75fV+PPa+P256iAmmMEVxdrGuI27EzxmqrIYb+2XunGCMiNmIxhH3ftiNQi6fL9fF4zOdvRjHZGs4apNDbhsex5VzeP94v5/NpGo2zAGzwg5FgtQycjcai6Tmk948PDkyCA+CskxA85TKUEkI0QkUukZrgXAvljOlctFb+5YThbBomkAoAECtnXGkxgSeqQFwafT2flDYlJeuNtRqRuaabt1qbZVpKKYp3RJISWO+EiERGCj94qURrGFPijJvJCM5TTdSJUVdcGi2ps9ZaLVUKxXmPIVQABoC1CSWVkiWV524t1+qdQ2y1pmmcjJHhiFSLm0bGFOu9UQHOlABsRFhZx8fj4Qfn3TBPk5BCSPH8/jHG5lKAsdENzrti/JPwo6TU2vTKai2j99SfceYMnFnrOqOUc0xHDDHXBFwMaXrGnJ/GSsTGkKQFznpMx5C9lsZYU1MF4IQ1h4NTA8YYqyFuMQQaPO9cCqas5ZwJ3kvJUkhnp3lywHnO0hjDyK6SEe/O+1oK40DEGHU/jYxYCHvvbBwHBTqW9BRqL7PDjrW1Wksu1DtdLydjLDVs1grg2LvizDijtPZG1do4Z0pLItEKd/b5096sEqWWkjLwLrUSoLjlyiiizlklROvtc/bNGCOsrDdsXVvDqHciZ4yQUimJteaUnnoAzjkIxhkICaKLjEScGymslpxsEVwqKYH33gCg5PR0/3prqFampeC8c9awllwqNmsdB96pWj0J73INvdI8jUSktCgVOWPUhNHaeysE57x3ImOeieEsWa8dn48JOGfEtm1TJhrrGFGtVQhRUmW9K6OfdyxnjVCKGpVW52nWUpWGKRy1VOyolEKOIcbtWJERdeSMM87GeWa9dwZSqME7a/2x7ymkQPV6uvz27WtMqeZMrFfqRlvW+fPsuW/77XYL8WCsK60ssznnWkrJmTMWhXj+Sc44wt57V1oRUu+EtRXOlVLHsd22T2/9+Xwax4lqq7U+oeXWaGcNF1BLIcIc8f7YW8vjMNbasBOXMpdaS3Vu9HbwxgouXl+/bNuWS66tPLbHcRwxHrXVeTl/+fpy3w7eMYRorO3UYoxIzws5EfUQ0sfH+ziMALDeH88d+evLK+Gzg4Gso3UWiWrbUy0nN8/DFEs6wvH28YsR8+MgQTrTpBBKiXlakNV9j2+/3sZlmqellVRyBQ7e+2WeU8lIvTNmtQNkjLNxGqwxWol1XR+3OzG+TNMwz+fzKYaw7lvDermevRuPsIfjOI54xK0Tnpazs65KqbQutSI+JVN8T3FPRyzlMpytMbnUHz9/bNuaSkLE0Q/a2JiOUpLWZt+3FMt8XrzzT5BfOLbttn3o98FcG1WZc3rcGCjFGKzrvZQ2Dl5JGVN87Btn+PsfX/ORCZt3ynnFGDzEmnI4zeO0nAGE4Mya+TKfOAchAXOdp0Ep2RlDxF/vvxjjKaWUghJqHEYBoACw4+3+AME7Mu9tjKGW5qwDYI2oYjVS11xrq97Y83QqtbHetZTMulqrVIC1HaV01hlnzrmKmFJ43O/jMAgAASABOnSQoqZsrOm9EzYJAJx5NxIxwqaM5spQ78boyQ1dQDqCLFlJKSQw1FKp1pr1xnnztNPnXEotL5fLaZpDSA1bJ/LOCCE574x3AC4Fc/5fGcfRD7mUJ1UchBAc/OCoofoXxl0LKVvOR4zWmhhCTJELwIbbtiklldAcIKXIqbOO4+idMeu63h93xphzlgEPIW51t4NpFa3TEqSS4vXLC+v89riVlO+Pu0nBWss6EfGnNus8jdZ6DizuT7WksVr2htPga61Ui2DsGXM+QmhGe2NJK86YYqCBV96Jam+McaYAYi5I1ShB1KlVBAZMCsE76+kIUgshgHUEzoWEHENtpVOXwI2WghHj3WstBZfAc84lRWd577xVLiS3RvUujBIAolMptWFrRzgY9vlyVkLVmgUHY5QUXHCQwpRUOMNxmPZja0Qpk3PeW2WUBMZS2BFRSi6BP9nx/+czI8Q0tlqx5bC3p68vptRqQ0LOmBS6lGSNMcYC8FqiAE4NQbCOSA2/fvnSGtbStn3NOQ1+kFIaZUrNMSTsOAxegADOpRbLMqeUqOFxBHYcSikpVUcEKYD46CenTcWWWVbGCICneTiEYz8Oomad4xxySki9U+cAjHHJOwAPRzJK6nm+XF4EADGWUwAh7OBjiNuxtyfehzGtFTAGjK3ritie6iQJ0LF31qUSrTJnXW0tp6i1AGGR0XasJRasDQRIIQo2YxXrPe5hva/6qp1z3noU9evr196fljoWjtSw+tG2hmE/gHUBz1gEpojIekhhHIZ5nuZhrKW+/fj5+vplnpa/fn7f9z3ktK/HY9+Nspfri7VeafPx+bHeHyqGeRpHPyJ2Y3TtaIzhAEqI1pqQYl7mhjh4K7Uqpd4+bh+fn9MwCim986XmwRoldax53e45ZWqopOTUWysBiWrV2kilJJhxGDd9d8Yuw4LGfd//vL0HeAEptdW2Oqytcc6MMamklutRkRgxzkOKOaaY0+lyaRXv6+N2/5BCJecGO9RSt3Xd1o14P5/nZV5Syuu+Wue00h+3uwSea2mlAmfneVrmSQgJkHnvSM1Z7Zy2zmHvb2/7tu9KKi3FOPrRjXZwvLOSWojHfqxC8uP4hcjkt28vP/5675CU1lIKCWIYfG3411/fl3lepllo+XR2Ga2llEzJlON//Nv/uFyvSqi3j7efP35cLudhPimjUoqtVkT0zhWspdTH/cY5aKUHN8YQx2EYxrHznkvt1HOtrbXOulJqW/cjpNyKkmoc/TgtJVUGILTyfir7LeUAXDxNpPxpdxSiPilZtYEUIeWcs5G6E4WYU0qcg5YaAKijFIJ3mKZJa51ids4y6spoJZ4UT7TeghCMdWmVs3ae536ikEM6aknVOIsNS8neu7M8PT9POVdiqI110v5LUog91xi2oJWm3ktKp8tl4twqo4w69qPUIgQQ9VyLNFKA0FqGGMJ+yJO03scjbOujNTq2bZmXZZqQCDpb17vo8PL6ar0P4ehEt88PYmya51zzvh7W29++fCHWJYBk4llD08oiknd+GielZc6pd+qdrqeT1AaRWm05x1yz1SbHhK1y4MrI57BKCIVI3pnJOwFAjYOQvdWQEiK2WgTIknPnjLB1IpASe8spSgHPfDcxRr22iil2UIL/a1bEGKHTxlljtWGMcopCCgAulWSMGWW4ENRQGi0EF9CxITV8DvgFAz9OAsBII402T9ePks4axnmrhfd+8CPGKCScllPKGUAM3gshO7FOVHLMJVMnAF5La60a55VSnHXgz8slAXABUBsKJoihkob3XksupRz73rDhsw5CDbEplBJAWyelTDlTpcfj7q2TIJRUjFCCcFYrpbQ1tVRjzDjPtZbH/Z4zGVMZ40JJb6zSmqhxBkgtZmrYUwwgpR0sId7vn9u2x5RyDMBAK9tKVaC+vH4RAB+fv/Z1FxKGYbxcL+MwVuq3+01KoaeFelNCPI7tz3/8s1GfRqeN5RyscwULIJNSDsNzJcapUTqSMcY5Bx1Sztu+Ye0k8R9/fueMTsvpiRgquX379vX68nq73YVUgj+Xzz3nWHIDzuwwdsKY0m29UWuNxo69M/Z6fdVafXx+OOuGYfhc7727r1+/jePkjfl4/0Tse9hLw9Zwy0lLFUJMRyHbjxgGO3DrpFBSSQ68d66N1to+G1Ln5cSBd2y1tBRzKZE6IWINFHOsiKMfc8nf//zLWBNjUlL5YSSk9bE2xGVYnPPKCMHgCDtnzDlzu907Y1wqoQ0i3rc7J7TWcOs44/u65txizlLp68Vxzhrm7dgb1qdK+zTPnItjPx73z+SGbV1vn3dnHXDOGEgJhF1KpYwSXGKt9/v919vby/VaRDVSrfve2Z1xfj4ts5/2FO7rDbgQQpxOs3Mu5tBaAwbzMEmhjm3NqXsvjFFaKyKUxGc1zovjvEvBawqyNAQpt33T2Ky2MUVjDefsdF5qzjFFUcEaZZQ5YnrcH5eXl9+uX7gQEmSpJdXkrPajFyAYMQEgtaJM2Akremvhcu1IIOWxbcYYDr3WXGstJYNQWsD9sT4e+7gMQqplHLHW0fvr9VUqG9IvqZRQKmHpjB/xACawVj86zllpVQph7SKk+PX2w3qrABRIpQ0HbqyOSRC2JzkvHAeXirAKEMMwUmd53RqhtIqLTkRI7Qg7gGCse+eMUq2W0Q8MeM25lqKVktoGxpz28zACyFqptWq0HocpxtRKLjk/Z80d+3ydrbX7GoAz8VzFdCr3UlpJFXsnCUIrJaXmIIEzrXUryKDHlIzWEqSzXit1Pi1S2pSPmjNRc86Mg+f9YqwtMd23TRvrh0FyOY3T5XotuaQcS2kftw+jDGNdAPz22+/LMpeSH9sdOMtPnJYQ2BoALzkPbvDWsd6ZNU/ovDYKODDOSy5cK8aIkAkhvHPUMLHEODN2zKUyzqkzbw0xxoFN3mND4FwbF1ncHtvgx1pKq1V0UkoZawTwp3CKASNqT61CLdVY451FiSAlliaEWOaRM7YDA8a3bbVKOaWp93GapjRSIyHF5IaKjbEOjDPqgjHGmNXGWoutOT8qoYm65EqCxN64AOk9If3rp6h3b5z3IyfWqAyDeQb7NNeccSWEFoqkdMMYU6yt/YsFW6sWsrF6WRbOIcYohRIgCEkBCCn15cVZZ7R+jlMIW4gJAHKu1PB08oKLSszaAeuupJZKWmuUUEJCyv3YDhDgB9+pI/VWWjwCZ72WokByrQdnp3ECKUspQkilpJLCapdk4gCsc6MN55BiuN0+tLbn0+U49vu6piMy5F+/vjzbBkrpYRhKq+HYj+MwxiqlgbMY0jSOAOJpZzLWVKoChDHWam2VupzPUun7jUupnXM553mc8KWFY7fOG21TKY/HHTjlkpWWudTOupKq1RaOMI7zNI+ENI/jkUKqWRsd0tFae9ZuQUtlbSwt57xMi/Njp2aM1Urv6Xg81loqF/J+u5WYh2HgHIRSKadWKwOwRgul4KkfyGU/jopt21dE5J3GcZkvlxzT++fHEQ+jDWMMQAgB4ziFeOSW8GgntRhvY4JWm3L2xC/ff/xoITzWu9AypKAlLNN8OV+c8531EFP9/ABguRRrLSKu23YcIYbd+SHn0hlQp9v9MZTGGFdaIbVU8nFsnIucSwxRUatY1mPr2L68XFkXj/WODcdlbrVaa+dxNs5+PG7rYyUka904OilHXkWIj5za6Xyaz6fvRNjQWMsBcsmlFCzFaGO1Tjls9wcRymOPpTWiLkEJKcZ5QsRSyhNEnvP9tMxCq4oNBDzpOufLZdv2x7au++Nxuw/W1dxKXhlnwLkEOY6jEMJoKySIXAlbpy6AKy0FCCJk1FOIwCEcqdauQQnS8+yncXbOaqv9OMWY9yP8/ttvpbb39w/n7DTNNVUutdUaBAxCMd5bwef1gnE2zFYJZZ17Zu2tNikyCVJKUaBAB8746IeOCJz3Towx65x31hOLMRxhb62N47hMc8553R7hCOfLVWnTiSmpWSMplDNGalkrUmvYCLRQUh5InchoPQ5jLrkTphBSKqWW/hxTQedc5Zo+P+5IRUpxPV2X5cx4TyGel4tQilGvuaEq0zSPg3/KpZXUQgAj1qlr7WJKMWchxe9/+yPtUZsPOw71/xRDCGk/DsLKnigQgCeyWBvDOeRan55C1kUpqXcGABL468v1tJzm+RSOI5Uc99CoAfDG6WmemJdpcDbGxJl9NjZAwGhMzlUCU1qO49SohRSodwBApBgjMe6dBc5675wpIiGFEAIYdQnSTkZIaKUSAwFyHKewBwGi1SZBKakLEjYkROBcS8kYn6eTMRo6R2xKSS5ES9VY7ZztIdzXGwAgIuudMT6Ng/N+va8lp9Y7cJ4Klq1oqad5FAKAi5RC54wzPg6DH8YYQtwD68xoY5TW2pZSEKv3XkvJhBACakXvxhSD5BI4e7letVJEXYKgjt64XDJnTKpn4B6ehfBcstFmGMdSM28oOENqAMZ5K7VCbHbw3hqQ0CoSomBcScGEkFJRJ/n8z+GccZjGkY1Qa3XeG61ba7wzLsFqU1vVSg3DOIyesJdaibF9Wz/ePv8FvOKCc2a1iUpqZbTRj219v32M43CaT0zAEQ88Vu8G76wyknG2xyMcBxFqbYnwvHijzZcvX0bvCXjfNgDgwLA1a11r2FozzrKOxxE457x3zvi+r4wLbcw8TVbbhlhKBWDvt/fXy+t8Pt//8fj8+aas+XysT4Uh4/zX29vn7TOGMC/zCF0pPU/nkpuUSgSZW3t7/3huhl8u17DvUoARMtX4+fmORCBASqmlbq2GLXABKcWPzxtjeJqXy3JRUnLnpmnYtqCkElJxxhkxo4xQans8cs6lVK1w9OPH7Z5iHqbx9evXXz9/IfbRuuvlum/rvgehHlyA836aJ2Mt76zUlHJKMe3xiCl7P8zz0pEejzu2ZuZ5HEclpRIy5zzPi1U6l7rGh/O+9lpqHbybLy/LMH98fK7H9hTYSS5ZZ6VULoTRZvRjCpEa7fuhlMLeQywpJOPcybjXL99aqwAil7aH/Tg2o3Qfe6u51pq24CYrj22vrQ2jt0p7OzzWhx0cgIgxj94L4MMwCS3347jf76Xk2uq6Hx+fb0cKJWfGeKW+b3tqmXO2TKeXLy8hhlwrdUqPlGu2WjvjjVbeeWfscQSt9em83NattfLt9UWAeH191VpS6xKE1poI97AbpazzQpWOy8uXF8bZr+8/18eaWhn8sEyn1tsjPWJKfhwEcKXNMIyPx6PUCpxzBYMatdKddyWlscZbR0QKQEtprUUkrfU0ThLkjbGQAu9NKTENM+Ij7DuXcplnq4wAYEQg+ahcKRkRn1ZSzjhRz6U9V/yjH8T/kcDUirkcJddG6Ef/uN9BqlbqcRwhHoOzl+XqvZVKG1AN68v1BQQ7tkDYlmWy1qaUwiOEEJZpsc4up4U6e2xbWHfj3XI6l9aOcFTWsSFxSjm/fbxv24MzNo+ztSanIkFyDopL1jqVpiUQYs2pljL7iTGoJZ/O5/PlLKXuve/7VmvF3tq/6hRtuZxO86wkKKm2261Sw2cnEzhwhrVqpZ4rPqRWciUkRp13MFK9XC4p5vv2qLlao/3glZCNUADTxuacamm1lPEyMmIdn2tM5oxTUtYUe6dW6rPCKqWwg1NK5RjDsZdHnc6L1go45Jz3fetEQgrORI6pIV3PZy0NcHlfP6XUWmshudEaW2WMlNLAOJLiHAbvtVTP+ESnbpwRIJ6SHynk434z0vZOJRZGfVlmROrYtNElJmoNjCrYOO+MkDryzgix1gqMcaOFkjU/9TmktBmHibNj37afP34qo52zSuvOuhRgjMVOiDXljK11zhlhbXi9nMfWck5SKSlkLglAWGaJqNQcY3DegNQhxRCOFIOWZvRDjP9i/ueavXeCC6mUEnqc7bEmV3KMcTuOWuoRw2N9pJyFFKW1FOMTTs4Yvz0eqeTeKuucWqgVp3FUSkA3DEAKMQyu1IyVYkqlVcFla4Wz3jl/3G/AmQTQ1jIkpuQ0OBBSK62p43x6rA8/Ddg7QzyOtO4Pg15w2I/j//lf/6u2lrCtj8e27bEWpfUyzUrpnAsRaak668w66/08zZ2o1AYgtnXnjM/zUrGF/bh93Jx1p2WZf5s6Y79+vTuTQgqcixCCfD55raWtnVGpddsenIFWehm8ApVj5Fxsj4cwxnlPRIR9muaQ4qnkL19fL/O5lPa4f+zf07Yfy3Ka52n0U4zh/f39c11zTqXWeVp+/+23wQ37cbBO0zAsp1lK1RkNfnhaqoh1Dux8OeVWgUHvNPjp5fqSc4klYq3X6wt1jq1JKY4Qjn0H4OfTcih9HKF31hkXQiilsyyllZKrtQ6Vvt9ux3E0aqz3LijFPFjTkbgUWioptdRaaedLSt9/fFdKDnwINdVWkcwwjKW167Qg9X3fH/dt348Qc4hRSzUuA3DBO2tILQXGeqm1lBJD+nzcpNYhBs47CKCw15DjkH/77cvpvFTEx/qIKe9SGm2u5/O3b9+E4Ou279uqmtRG/fb1W5oXwcUwn7+cv/6P//l/HTlsa3h//wwxAGfTtFTCdd9LyfPkL5ez8z6nrCQIAdpoRdq7QQLU1oZxtFanWI5wdN4boVBCmifURORcck0ll1raMrNScu+91OZAEfZOXYF4OpWO/RBSHuHgQkiplVXEsHfMJUODYRyOfKScthBKS6OfrPUxBsXl68urEOrHjx/O+RRijs+09KGx7fu6H9vrt2+n+bSMkzdPtpV9cP7zV7ksp3EcChrsnTNeG97f7tjTk0zCgCPW1roUkjP+8fG+76u1lnNOyISEaZgRu1KCiHKI48sllphiGvwopNJatdKkVM46pc0TdOOcU0porUsuG+6jc7MfOPBbWhE7B2DEgAtrndHWGnfEcGwPpUxrBTj3fiiqDt4v82KdAyFjjlVXJaTkUjyvAUo4554KvZwLtnY5nThj33/81TpSo9evX8dx3ve1lBr2/b7ez5fzl1d/Pp13KcMe4ra7AbXTAKzVapSexrG0So1QoZDsyXSjTt64ZTlLqdbtAcAL0rauvPOYU05RW0NMIiLngrHegcWSeQfGuChVgpinU0ME4J+3Wynp3PFyuvztj79RxxxjigkrYmuP9b7Mp9IKCGDAjxhqLWNrRFRz3vZ9HIdcSq4JkY4UU0ztsWqtnPdKqcGLx/rIta6Pe61Vm3/1zgAEMDDahRh6rbmUeAQuhRCAWHMpNWcuFsVgP/bb7V5Tur6c131V2mmjt2MHeg553OhdZzzHbK2WSh3Hse57SpFzMMbkVJ4OPiUV55w6YaMQY4zHMs3TsFBvhAw4f9zuMeeKeZlPUkqlNGFOKQ3T0KgyRtM4dUY5pMo6AmCnVotTajmdiNj7x8e2bRw4KNBKb/uxbvdKzfnper0Al63VPRwfH7/c4Eupb7/esOHgreTiQ8p9Wz8/Pqd59MadltM0Ts65Ywt0rkrpY92kks563Qm6iLEYY6RU0zAz4K12Lc2zuqWk3B/3VMs0T6dl6o20soKL/dhryamWXLKWSlsXG/35z79O1/Pl9SolHDGFGDtnhJQRQzrWYx/9sB9bzFlKIZ/4VfG8+vaaMx+IOq1xzzm8vLxM49Ra3ffw8fnRiKWa8qPgOF7OF+pUt0eKKaSccibWjdXTaUw5gZDTMD7uj2nyy3w69p06juMslOKiD34wRqWU4xFKK6Lo3Go5kDodMXze7+PgOECtbZ4mKSVnfPDjt29fZO/daCtAHIj37aGVWsNxPp2X+cQZq4j7sZZar1+uL9dXax1wCDEIENMwejsiYky5pIM6Q6TS2p+/fjWs23HIUqSA83yZ56nltLZWawkhCpCM86cqdpwGIKa0xFaoQ8n58dhI8Hmar5fLuu45p3iELFIt9TTOr9cv62OLKR4hYec1F+ptGOyynHpnOcVSasrFCTmOA+8QQmiMl5yNMY1awRLjwUTvxJCjUSNi2/Z9W9fb7bZtq5BqP3YAaKUNfjBKdcKSknjK7oX0k2+1UKSO3WoTGpaSOjDEVgr9/PXGWE8p1lafrkclZC2SsT76YXAD60yCptK2bd+24+PzNs1TLmF9rOM0Jmu00uM0UGu11hjDPI3aWuqstgaMjeOojMVcQYhBD022ZTrnlrd1r6VSoxRyr4xZCClho9frVRvdEGMKtaK2+jj2hni6nKx2Sgqt1PXlxIF/3m7PdajVRkshpASATqSNsdrse0g5aC3neZJKt1Jrrd65cRxqpVzq436j3gC5NkYrxToDxo3WtVYJzGhF1synk5L6CHuMATIopaQQ4zAw7Foqot4Qc8m55nmceCdjdGcj6xRZ99YPbpjGeRlnrZRgkjN+Ws7X8ynl/PH+3pAYluPYGePWaKlMyU2IhNisH4QQDWuKkQN33m/rJqSOMXzebtM0utEz7Me+xxgH7+x5uN8+c63LvIx2qIS8M2rUsJZaAGCaRuocGOUUQzqO4+CCT8MotT6OnYPgwKVUhJ0ICbGU0jtpY7TS6/4Axo0xrNO+BXjqMBkjwm3btn3fHuvpem6IrPfaWyzpftyxYamld8Y65VLLkQl77+S9qa21WhB7SUUpKYRjXDwe+3LRLRwxJiGFUto627B+vN+8tt26kvOR9iecHImmaXTehSPs+8GflO1nvI/TPE/WuNZbK/UpxC5Yc07rvjPGlZTtKdXr5IxTSgkmCtVwHJfLJRzHz18/qeP5cupI+x5AipDif/33f1+u12U5vX8+QHJs9eXlteXqxwGY/P7jryPEWir1UCsqY0ptHx83AEm8pyOkGC/ni3eDspoDtIbWWSkupRYOLOW0h4M6Wuv+/rc/qJMEXlt11v3+9Qv/9pWwe2cbtb9+/FUen1rJeVyMMUbbUluI4Z8/viN1IcT1cnHzaKdBPgTjPKZ0y4/Htq7rdrtv+7ZfX+P7+2cIkXHw1hVMbx9vSB0btYZErNS6bccTmdo554RWG2VULSXVVEplHIw2z6makiLXdj1f72It7UbEeudfLlcmJNa+PfbedwF8OZ1O0wkEfH5+HGFHomU5Swm32+22ro9t3cNhQx7GCRjs+9pKOS0nEKzVprVOOdXCJ++5gH3fpBKqEU7WxKRbax2ZVH32yzxNezy27bGHPcRgnXPGLsuy70culREi9T0enPHS6pECIWOdY8FUYi5RKp1i8N53YKkmbGWcvBIqhtA71UaP9bGHg3O+LCfO+dv7e24xHrnVRtWXkm7v7/dtY5yHmGI4GOd//PEH1soFKzn33h/rByEaKYWQHDgD9uv9vbW2rfuVQ0pZSsV6F1q0UMPt6MCkgHEcpFFH2FOsrHNl5LFv27o97o/HtkoALURHkiCWadZSdU5ErZTWGSNFUgoi1oFprYWSRikFcJqmA+TjcW+txBRTLjnF6/lslAIGCuQwWCUEcMY7gaDTeRFKWmu00GELwODbb19rybePm5Cid8Z6p97TEThAOMK2byXnVDKyZsoIWgjO9hRyDspoKVXIaZknajiNIx+HcZ5KyTm3wQ/Qe9yPnKM2mnrf1ltp9fXlpYJIKXQ2cABeOXV2bEfORQpxOk8cW8qtlMJ5/7h9rPdVSLhcr4wz0xFAdt4f26MhCqWcM6P/Paa4bdtju+/H5p07n67A4df7D0R6mrZaa1pr7FhKqa3VWjtjxuhhGEvOrdZa/tWEUEq1VoVkL5cT6/BO7ymlWlrO8fG4xxz3IxSspaSQ4rbvbx+/asNSM+fscr74YZQgc86lJAHCaFNbDeHojOVa0/1utCFEwUEpnVKqrRKSFIJ1ApAxhiNGrNW8fhmm8dfHWwxhnmehlOO8E8ulpBTDvhOR1MIxb4w5L6cjpCeTylhntLLGWKWI0zNqVUrtrNfWiPB8ur6cL+u4l1oAxDzOHCDHdJoXb6z2jjHWaoEmnfU555RyjId1bt9iLQVEr7E1Kka/zONERIi5d/xyuRJjIRxYMYYDOPfeT6NnjYWUPt8/121D38LH26+fP5dluS6XlmtjfVnOQkBKRYDEhjGmlJN1bvaDELLUCkIopai3I4YYAjCYxlEKKYRkjLWalFQ5x1ordWJE1lht9LbtvTNn/Wm+KKFvjwdiI6L/+R//EzsZo2NIj/f7v/3tD6VlDDHmGI/4eNyPFLFhykkr9fvXr601QtrXTQkBnZ/OJ+qUaz5yyDnVUp1x52VhvBdsb28/12OTUpxOl7//8Tet/Lbd7+tjHIZluXTeJz+YybawM+DaGue90poBhBiOFLYYkMha37A+jk05ywlASOcM9f7+/uvnxyc1rITxFmrD1trL9UUrTUggOOfiWXiqpT0eW+d0fbn0DiGmcXS9w+32GWIIIQoAxsU0eeusUoqLjthyPuZp/vr1RQooub6czoMdj1oaYaoRCSXnIPiej1+3Xx8fH9TJKnO5vnIpY05vb78QkTqlI673dRx8OAIhzqP2w2S9Kyncb3ej1MGjkJLzLqlzLHXdDwF8cAMASGkatiPGcIR1W6VU63os8y5AYK37urVcTsvciT3Wz1IK67w2nMbp9fVFABzHkUoKIf78+SPl3DkbnOOsn4ZpHOfH+vj59qshxRBba9qYgtV36tBryQ0LSAmsr4/HnR739UFEoPS+76HEnFONLYVQEfO+/Xrrr+cXq01jlHNijNVcGGdaqZTy7XY3Sr++vEgpSio5l5KzMPZ0PYMWt8dt39acM0iRUzr2LcXIeu+83x6PWus8TlppptTTU4FIEqTTxmjTGUu5UqOc6jyMnfWnGr7WsobwuN86Z0abXEsIh1EaWTvC/o8//6GlAeDHEZQSp/M8jqN3Lu57zpEzI6T8fHw6awRIDeoJwLqv94LtdruVnBtVoYQ3+LjfhWDGj4/Pz4JFaXs+nay2y2W0Sj8lwESUYlJKhSOWWpjgnfd1Xdd9b7VYZ1OqOYWGzViLrQFXSFRybgAhKSVlSrGUCiC223qEMAx2PXZqBMCVsUoKwr4fP6HDy+vLNM9Gm43vMSQpQSszjdNj2x/3NcYwnZaUcq31OFxp5fN2k8aklBDpNI9aGinl7fYZUjJSYqdt27GjlmoavFZaCfUEDr+/vX///n0Ypu2xMuD7HlhnFbHklnIKMThjtDTQxefnzVrrvR88lJQJqZRWa+2dxRS1MvM0HyHg/dYIFRHrfRwnrc2RYgmrN84tl9752+cHMqqtNcJGtO0bEuZaGNb75+N0Xqx152X249AZK/UBDFpt2nFjtbVDzbnEgohS633bhZK9t9Ywp+SmeZ6WdX90BqXkcZicG2opUmkiGsdJSsGFFJIf+5FSDTGV2lpGIXknBsB4B0LUSimtjhQacAZ8GgfGuzVGKonEvr5+mYbx/rinnLfHWmvJHO63D86YNZYLQbwaZ5UCpe04jCWXGDNSPeI2TdOyLLXRY3vITq+Xc+8sxBj3vVBjvAvg4zCAsLwzAFFKzXFz3kPnwzg2bEJIqdTL9eVyvobcHr/+ai29vnx9ub4S6+u2MkaD89Z5qQR1xIbbsSshXq/neRiUlH7yrVGtiNhiiikeSmrGZMqFPR5Ky5Tzdt+0lK0VIWA7duy9NjrWQwqz7/tpEqxDLjnltG5H5+z3b1+FEkdIrTUhZEX6fHyEmEpMyLqS5vLysu/hr5+/5mly43hZTid+qa1t+55y3bZNKXW+XE/TyTrbe9dSxhS324aI0zTO8yykbLWeTrO3znoX9uj9YIwMIZRatn2XUlUkhr0TAyFiClqr83xCavu2dSZijJ2xx7btMW7HmmMcvKuVCNm+Hxzgfn/c1keMaZqGSng6L1LJy/kcU80lKeOWeXLWSSH3beOMA+eDdaL36qpSQilJrC+XRU6T/3i75RIFSOcMCHW9vDwh5uHYa6mD8S//9u/D4JSAPTWO/eVyGZzPrd4qWWmk0pxxabWQME+z1vr+uLWCy7hIo6wyikMIgfkhhNBaY50DF856a7X1FgBiS0ap03LOJnMGvbN4pFJL2I7OmDKopNwe+3+W/zW6uaSspc6VMDdOnXoP+44doZP1fh5GDk+x+0EctBTERcqJs75MS2uVCJW0wzCuj6O1tt1Xo9XgHHQg1pVU2No8ToxoW1cApoyaxklq9aR3U4xI3Q9DK7XkLDm/XC8hsMe6ppK1UlYbY8zpfH65ns+nM3B27DGlFENE1awfpnF4yqaNUpyo5IyEnWEKhZCM0qd5AQafn5+3z89UUpcQjqOkgtTyFkY7Ga3Wx2bNYIy5fb8NE5/GUXG+H2vFFHMlwNNykl3cbrd0pBhDrZUBq6Xt2yGAbY9NiKdruI3zTEitoTd+mIZWawoxMJZCIM7GwY/T8LRQQcydseM4OAcO3GgLwFol0PzJ+s4lGqOllJ36x/0jHEfKiajHPSIRVmwV920PMRqkcOzjOFHvrRajlZTKKHY6XdZt2/ctxHUelof1wEMspbTKiiilvH9+nOaAlZTRteKx7wAihJhrGofJGg0ciIgIOZJVRhsVucw5zuP461dqDL++vjj7JDfQ5XRmjFljsNYQY8gl5fi4r9W3y39ctyP8+fOfr9frPM+lVOM8EUkQRuu413k5M8Y/3m5xKkc8KqKU4vr6mlImxMEP83yOYQ9H4Jxbrbdtazkw3k/zCZHePt6BS6WUG70GyTk0ah+Pe2nJGA1a/v31j3FZ/mXm+rw9bquU8uV6fnm5ttqObRdCOGfUM78CInXWiRTI83xCpG1fwx72YfXe39f79+9/KqVYpz3sL+frNCza6f2Ioe375947fvnydbmctDbbusUcichbzzh/PB6/3n59fX1lQhgQDVFIbZVQUpecGlYr3Twv1hnWeQqpE/VOrVXOuZDifD5fX17GZS73x/a4gxCIKKScBs9Y58SMUkKB1fZ6ffn8fG+lMuhWm8GNSsthHu6PlXoELruxVmtjTCnlx/ef4QjTabDGTn7QWpWSj3W/3e9K69N04uMyjKN3Xmg1MF9rOWLc95WD+P7ze86lVnzshzHqvq63j49t3UrDP377/e+//RZLqfX76D1Rt0qfTkvB4ePtx/p4IOI8jMa5L9dXKdXlcr6czkeIMexYamfkndVS5Np676fl5L3HRoxFYvjxed/DgZ0IW++C9a6EQKp73Hpr07ycptM8nu5439f915/v59dTynX79fbr55tS6j/+7/+xTOp+u2NDqbgAZbU32oZwfNab1UYpdTqf5Xa47l4v15eXL73zarLo7O3zrWHhvCulGO8lhpJBK/X+85dUUi/LnEoKx+78AB2EkCEGouZHr6SQUi3TPE/Duq0CYB5HoXTOhQv+7curECLlert9Cqz/9vff/v63P/Z110JMbhit4SBfrtfHenPG+nHKOR8hMACnNDbinDXqNUVEVNOotZYSS6laaCZY2NvgvFCgrb3fH9v9ZtS11cw6DtqeprHU8tg24v399nFms+TCu/E0z86Z94/Pj7dfVZbvP34Y50ouKWcmZGv1834/Awxuul4p7IfV1jlbW0mxLNMkQTLGlZbbvmNrDVGgHKap9x6p3G43wiqV+tu//VvN9XG/Y8VOHQAYkVHKWues4QzG4dl4mzhjHbG0whgrDcP9cx5HznkqMaUIwIlQCJFLbaU8eY3eeiLSSsXj6Lx76y/n07EHEPAERBtjri9qcN5oVXMxxgBnrdW3958xBerd7EeKkXNx+7wRIrYWY5rnSRjpjKWOnINQApmMOfMYn41lY+31dG61/Hp7q7XmUqxzl8tVK71tOzDQytRWS8Ztvw/e8VFIIZBwD4eSqjWkRta6lGOMB2IhJG8t9g6c14re+fm0cM65EinFmOPgB62lHzwRsd6lVJ0zqc3946EkeEePdWfEUkmtYm2hd7o9HvM0GevX7dE5O8IxjQMi1lxhEs66UqoQQmv1/e1XKnk5n4QQuWTg4Jyr2ARI51xOZVtXxmhZZmv843474nFeLu7bF/qDbvd7iqmWfBw7cOhclJL9MEglrbEgpffj4AcheJnP67YKKUvD0U3WGhzROne+nIUQyZq0p5prznnd9pDjPPr599M0DvuxxRAFgBayU6dOtdTb7bNSk1IUJOsU9V5r3Y+91TJ4syznv/3xhxTi8/EppfDen04n6hRjLCnP8zj5EXqvrTBiT3lYPOLbx1vNRQgYhsEoHVIeh2Wa5oKVdULW9xCQ9WmatFXGGFg431hNmff+eGzYyugcNtzuOwheSqpUOfLlNGitc66dujMeQEghgfMYQ8702LfOmJQSGE8xjyMBF1qbVCvr3GgthXDWtVxrKnGPVhtvzSbVPI3eWwDoxBCxN7RKMYPOOCHEPE6Mwe2+fr59kLfejVppNxltdW2F9V5qZZxb6ybvvffejfu+7/taWzXWGGuOlJD6Fnbe4du3r4zxfd+1tIIla61zg3NOaMf4D2Psebm8vn6Z/LzneL28arFzuCmlXr9+uV5e/vz+1+ftQ0q5bztwPo0jI+KdhZTSHgirFApb/bzfEZEi7iG8f9xAgtHm5Xq9nk5Y6f3z7f72xhhdri/euxjyy8vrb7/97oZJCPDDaISSXDIBtTYpVM41xdxjLblR58/p4vVyncbxeRnqnJ+W+eXltXN+u73HFBkSQ9xitMZi086YrkXJWQp4fDzk7e1TGunHoROOw8AAkEqntq6rtVZpSYghbsRrTjnF6LQLIQCAEXI5XaSEj9vNKG2sFgCcced9o/L5+YGIp6tHhufLcj6dqff77X7sR23NeX/sIeRgBautAWfYqbPeEDljwzRQo9baNI4MOBEyP+L5fJlOwzSFmMzVKiWOnD4+Ph63277utZXBDgCS8c45l1J07GvYGec2Rim1kiodcd8PqUAbI6UGDtoYpRTjjDrNp8UP3ikTc44xWu9LirW1IwYk7L0fIcQc93UdvKdSnbYP6g3rcRyddWv0MPhG9DK+aq165+Y5Pio55WK0ybq22lptORfO2c+3nykkBvx6ukzTwFnvxPzohnHkgjWsneE8+c5gmPzl/NJ7z7VopZQxWMr5eh2H4Xa7Xa/Xx/rY140zdr/ft3Xzw+D89HisrWGnPvlRcGmNm5ZJciEAai3TPAitkVrKpeZqvO1IUglkJJRyw2AaWeuxNw6iE1tOZ6uNUhoraWmnabycThx4jGnbN9Hher0y4uvjfr89WqvXy2UYhnBE70hqJaXcQ9BGCymmeZbO3D77lV+sNafpdJrm3Eo4ItXMWNdajcNotBn9bLTJOQsmfvv6W+vtx88f19NlHGbOgTaOtQoQnIEbB2KstdYZV1qBYIqZ8/mUUrEpMc7unzfrfGtlnsZpnrRSOZfaitL6fDoRgGtuyfP19TJPY6kICtKROONWGqL+89cPDiLl9PXr12EaGWMhRVzz9fXVa386n7gU//2//+vz89NYraT0s9dGsQ4hhSMd+7F1YEardd3M2WoNzjliPcaUc0olWmWXy1lrPc9TSnnb95/b994whUSd3T5vt89P1plScp4HqXXrrWjtjHPumanP3rt5Pk1u2MNx/7g1JC6E1tpYy4iM0dfLlQtxOV+eMcr7cffD8GRQ11JLKX+qPx/7qkA9rQBM8Fzb4N11+WM/4tv7r19vP3NKxtreOzO8dz54V6qstez7lnJ0zislkegIx8f7hzLq9eUaOfvHj39saWcEIKUFppVGwprrsR1HiO/vH9QxlqSkQuzX62Wahv2I7+9vKZVY8+CGb9+++WFQQgohUkwmytPpzDgbvG9EteWe8HQ6n8/n5XwuubSKjXrnPdb08fn59v7zdJo5F6CEtVZJwTsvrbbahmFSJ6mEctpV6rXW//znfxFjn/eP/Qig4OPTf94/wrHN07kD347DarMss7EupePP948///zntm6/f/19OS2M6J///OupU+TAgTfizBo9TYuQsuFfQqxCAwcGAMa6zKJSuhVmtK2NcsWfb+/WmNfXL8t1Eb1zkELCMA/3dQ0fm7JGKv728R5KCeEgzmotQCSklkor1pVO2BghI2yh1P/65/8+9s0oMwzj19MXzjgAI0JjjBCCGkkh5XwaGvZWG1FnnDnjUslcyC9fv3ZsnImSUy6FczY4b7RpjVqI4+CU0ak1C0pIoa0OR/z1600JCUzWUh/r+ryPn5fZecc5zylT78PoOZeIFEt5e3s7Xy9//PG7Varl3Kk7Y40xp8v5r3/8BcCf98pSojbier1YY6xV1hohnrBziC7WXGvvjPdhHDuHj9vtaRsGKUSXUmtkfBgnUdT62IwzIGTISTTqrINSpdb7ul5fzq+vr956AfL+uO9HkBJiKluMOcU1Bo6YSzbKgpCt81gKY8JYE/aQc1ZGW+OOlKSSgxsY47WUn79+tVYFcC3M5eXCOZTaBID3DjhcT5c73UFKZz3vgnP49uU8DONgp0ZVMHk9X40we4icwTB4IeCx7YJzYGwY3OW0AJNI1FoTAu73u+ACG1prWedUEaQ0WjlthmH6/ZuttdSaeYfLvAgtnHONsVrLNAM1zKWEY8+lzhPHhpfTGREb0eP2qaTknQ3OSaWEUAzaCebz5TSN0xEPqVSpeZgGAWCdyzGCgNlPQql/ca1yGsSERLU1paQEOC+zOPbqXAG4Xl+MtXvYt217uZwB5Bb2/YhGa6WMViqEYx6nJKSUQPR87SLkmEtZTqOWKsT0vDooKbkAqWXFFh6HEvJ0Wk6zcN4aY2Y/xRiUEilFBiCWOdeilVzmmTEuOL8s58nNnHcJmsvmjMXaTmLGL1R7e+xrOI5a8nKaj2xqrlhTiWWLcRyXl+sVC2GnI4Te6UCsWHPM4zClkHuncR6IupKqVtLK1kL7Hjvv1rn18Xh/e/v992+C83H013aJMVFnj9tHjPH97Z1zjp20VkRMKRmOKEtTQqDUrbXt2LGhFGIcRm9965hjKrVKpS+ns/EOlOSMNeu2xz2GCMN4mpb3z8+Wy3D9Mg1TI1r37eevXz9+/tL3x+gHJQQRzzm7wSut1niknLvg0hiljRCiE7HO923vzj61WemZ1d0P751UShk5jkNp5YjRGXtb7399/wEMjNHDODHgt3UFYsdxSADvfWPtvq45ZS2NUSrlgoQ5Z2zI0TBi1HpNlWkeQ14f98f9AbwLkFhbyPEIm5RSGzOr6eXykku53W6Pdd1DD6WUlq3RCkwnqpmsUQJ4juXXz5/vv94vL9cvrxdjDE38sa1vnx+5JKUkQ66UBqlCjPf77Xb/uF72cZxSSuE47J92mo/75z2XGkPKqcSSR8SaIhEd+76tu9bq5XJWSlmtL6fTOI1EvZT2/vm+58O7qbUWcm7YpnkBgCPE9/fPnPP3v37cb3c7+nkeSgmf91ttpbR6xEOUJKQK2x5bTSnlWntHo9QetyM6BmCsX+/r7fbZam6MtUK1IFG5XKy1wxG2eGRvjWb6fDp3ztePT9moGuMFUlUl5VxyK9RKKc5ftPPxiJ31++M2TRMXwliTcyqtvd9uSomUo1bKG9eIQkpDLB+fN8ZYzXh5eSFstdXb/ni/3WtNDXHbdiHgdDpt6xpizLFw4pfloqW6397DsUsuJeesM201NGjUBueVEcaaXIsSwlorAKzzjAEXHW5sWWY7emusH8ewbft6IJIUYL2fjfHetdyUFM7MVjmlzHHse9w+P961Ud77IycpwY+js966YT+2I8dKzSrvxvl2+8y57EfgRNa5r68Xo+QztJdKEkL4yWutQQoAPkohlayUc6opRNa71RaxxRyOQ3cmtJLzt2/OWSISoGrp1lkt1Of9XUn1+uWrdXZP4X7/kJxrpZH1gq23pl3mAu63zxSSskZKGOaJdf729nbsx8vXq/cuhDDy0VgHAqiDtFIKsa1rxXpe/v3L6+UIx/rYdDVaSWIspXSEfZxmaUxMseT873//+9//9m/vv96+//WXVMpY8+Xly+SnkI6cyxZCa8glzMP45eXSqIsirtezHyzrvRPlkFopQgBwKKV8//mj5MyAPbaVcdBKMcau15ec036s+3EM3s/TCCDe3t/SEY3Wzo0coHd0g3N+yDGO83Q6L4x6ylUhzvNcG95uHxXb77/99n/97T/++eMf//m//7/Qau94ns/DOOYUc8lM99qqtxpbVcNgnKlYDfCUy/e/vn/ePkfnEZu29fb4izoZLb0fgfPb4w7Al/G0H/v5Mi/XeY/xnM4/f/58f3v7+dfPz7eP2qrW0hoT3uP5nEMKjDPCjlhzhlZrLhmx3/WjlpZSQSLqzPnBWC+16QB//vwzHMcwOKxNS5NLO8JOjGkjpR5ByWlwxlneeS25sT5/GSWoeTkj9l9vfymlhmHINdfQQjimcdLKIlEuZQ/HEaMqOM+LoN5iIsLWSsW2HdseDgGylMagl5as8MC50WaYJsQqQfTOpJRKKqPVU+x6hL3Wir2PSjo3KKkAeEfCWo9jr60VrNSwd+ymD9wzxjp1Jng5Sq1lOb18efmy77sU0hh7Pp3v93sqcfCDVnqcFudLyvGxbu/ru5SxtsI6GWeMVJOfpFIN28+fPznjzjnsuD3Wx+Ph3VBFT9t9jyGnRLzv4fj773+bZlRKC6lTym8f76dlmv24+DnnVHKdl+l8OlXE0QnC/uPne9jD4QciXI+jlSKV8MPZGBuPeFL68nIBBjnlA7awp2lc5mn59fPnr1+/GAdC/tuXPxhRK/X/8//+f1nv33/9TLmun/eV70QMifWKH/sHQv9d/205zX/rf8u11NqI2vv9vdaWWh6nyVljrEEiY50yx9vtcyrl8/PTOLNta2f9dDoJxlNKYT1SzMtpPk/nIx73ba053z8fCsTXb79//e3Lsmz//d//HUIwfvjy+tVb99i2zoEYy9QQqRLL2NYj/v7bb8e6ynWL55P68uWrWs3987aHsB/H6TRJJsdhqrW1WjnwwfvWStoyVhrnIaXcO5XSSi7WuuvlfD29OG9TPNZtSzGbwXRORwj39XaElI7QkADgejkFY2qt1ujz5cSAh2MLrJdaWsMQj1TycF6+fvut5pRSyrlxyTrjWpneMR4H57y15rxbxum3L1/2IwiljTHEoeZyxMNxP/iRiE/zBELcy41xNozjaVbYOxImLEocl9MitQYGdjBCwD//+V+N6KlgHLy31gqpOuuEiGE3xg3OD8P09frCgK/b/Xb75AymcWgNrdZmNLfPWzySlBCO2Ht3xi3zCQD++v7nXz9+EMH5fLLecwa9996JqHlvGOOMdaT649efD20qtrDvVrlvv38BKRhnDbG2yhC0sUobKYSyClvLuQoGp3nWUnk3TONcUgox5VpzLZI0cIZYc+Uft185RedMSpHx/vPtrQvWeb/d1o/Pm7GmE/ZKRH3bw9vt519vf83DPFY/fvmmtbxt6bE9QkpEPaei/v431qGkeBy7s9fr5Xocx7auj8dWSxZCrWmrWGstKUej3R4PrS3jrO/7dmwhpWOPOadxGIVR2Ag6EwKQMMYj5nzsmzJuWmbWHQBnHEBAaUcuRUjZiLHOrfba6i2vhcoweqIeQ0wxv1yu8zghtloqSGi1IfT9WDkTjHMQHKRgrOeQTtN8Pp9Kpbe3n0eIr9dLqeiMySnt+5bnDMAJEZT4+vISUzZSC8aJEbYaconbvksplbrdbrm2ZRrn5Zyl3LY1HkEA98OI2MNxgABjTGnUGlrnmFB//vU9lGNxo7UeHJNK5xxjSowz1tkyTZflvO8H9c4Y+7h9CMRpmgTXDfG+3XOJyzJpqQhbrUi9x5So30w4QAJ10tZ443Ip92Nf9xVb44x9+/p6Wpb/+sc/e+/ej1KomFMIkXV6uV6ccyEdMSVg3Bp3uVywtce27fuxhy3npI2x1mpttFHzPEsGx74/7o8jHKVmAUIriUQAXCvZSBqtt97v62Gsu16/jn6qtQkhcivAeWs9paqNvm/3HFNMMYYyjovS6nH/ZKw7a07zefDDfbtjaymGmIpeV1Cq5MQ5EO+15nXdbuvKgDlrcmm/3n+llKd5YYIbZ3++/Rq9G8epFfq4f05uYJ3tIdRarPPffv82jcv9dgvHse3h1/ubcebrt6+/ff2GSJveBIAAyZmwylvjUywC5N/+9j+MMkh0Xl5rIqEUa4VbLqWwzqSW//z+V07Fjfbl/MIaFSwc2LY+PpT98vptHufRDHCBbV8/H3fqBCBaJw6nDqLxyjr3zmmjc0z3x92PzllrjVnmefLjuq1G65WL07w4P4achFS3z89K2BlnrJdcxnH829//nlMSUqRcexCF2pFixV6xeuvsMPROxxH/83/9V2tJvr8/nHW1IhfAgIOE63l5/fLaatv2vTfUxkydDc5p5/77H/9oyGRnpdTe6Xw6lZylEkorqxxSa7VhxZQjKBAS9uMYvV9ez6vaSkmdM9a76OyP339PMedlHganlVrv95qKEPx+W0EeX3777fUyHfv+9v6+bweXHAQYJRl0rJhDFiCmeRz91IVAxMYKdWy9d4bGPI9C1RgzTrPSinU+eKe0Yb0zQi7ZOA+DtefzpSKWVKlhKmXdt2Pf/DQvy+KHmTMCCa/2hTNmd2u1cc6Nw6CtJsaVMjFmZ21pTWs9LRN0COYYhqFh68QZYyHs7bOez5eXy+v3nz9yzTHG9/c3CWLwIzEmJFhtpZJ3rZVWAqC1xhnXUnWiFMr5fG2Namt+cNR6q6UTE1JO0yRAITLr7NvH+8d2//e///31+vKgHj5v1Pl6bH3nSGU0/vW3FwH619t3pQzrXCh1OZ+FVvf1YXQ79g2gXk8X57wW6r/+8//5r3/+58v1eh7PtZZ9uzPWS8y1FOgAwDPlWnHfwmP7ePv1llM6n8+Ms8/H4+PXB+NMaVWx1lIGNxi5FCTRYRpnpcS2rT++/1imeRzGVipnbL3fjbZCqMErq0cAVlojYiGEt7fPYz9A8PP51LA97o9UkhCSddaBSSXCcRDix8e7kOp6Ou32IGwAvPOupAYmlDSicyGAsDNGnLHe2XlZ5mHMqXrnjdR7uAHjf/z2m1Y6p7ze74z1hm3bt2EcYo6YqSGtYWsN/+d//A8/TVTrP/77H/fbgwitd4yRMu715XWe5jKMLddeaD6P0zjWWosQSptxHjqy+35g7xLEuu05hfO4dGIomJB8UAMIHmNspTnnsDPszyZR885xCQxEiPG2P37+/PP18hJTzKkSI63UZbm2VsNxrPf7E47wcr0Qsc/HnQM4ZXNPT4K/dzan8nhsxtjOKKdUS7FaW6M77zFFIZS1tjPOeHfOpVJSTE8kxmlerHGlZGAsKT14X2q5r49cipRimEZnTKsViZQ2s1ZCqJJbLq1z0TkJZSpW6ui0Xab5vt634/jx9j3F/Jw8ez9cL+fW8MH56/X65fXLeT5zALx/gBBEzFlHHTmxcRiROuOMUu+MY2NKgVVuGDxjPaVsbKLOldZfvrwsfjbatJI6MS5kbbQdH2+fn7XWeT5fXy8k2bHvORfWeat13/ef4mdtrTUUwPNHas/zF7aKteSMtU/T6eP+8fbxVmo9tluOwVn31/vPKebeecW25zifpi9fX3IsKYd1fXx+Ppx2eH6hludpDDGkkI8UYwzYe64p58xZFxJmP57m+Tqd0xFySVrKeZqJ8O39F0P2+++/4+myLZsdXKNeeuNSgFKsgzY+hMiIEaG1xlmjjRayHMFMwyCEfOxbLQmEvBptlQlsrykD67Iy3MP+8+MNsaccvfPLOFszvG0/t4/76AbG+jRNADAMgzN2O8I0jdfzOYZjHKcQ9v1Ye2vNFqPMaZy1VJwzJngtGWv5+vJvy3z5Zd4/Pt9D3NctTsuolADhBzacllNKEUCCaFLK379921NiiLfPWzoyto7EwnrkEp23zhoFkjqPR6ithpg44/txpFw4yNP17Ky/zI4LVlIGIZSW18t10G497h/3O7WaSqKGUoh5mpXWn2/ft+0e4zGdZsaotNb3g3NGDOZxVErU1qSWxppxnMdxBBBHPIh6IzydT0Lw3jli3Y/HPMwvL9fHY40htEYMOmMsl9JamYbl3//tb7VS572kFGL4/7H0H0uSLFuWJcgYClRVM3P3C96LzAzqrmqi/v8P6epBEUVGxrvX3ZACQYxRDSznMlQRPcxn77VAbRjjeZwBaN45LVWsqVbQ9T3GxO77+liXZZOyQ5iiBpyLOeV1332IEEIbHWfCObts67IuIaah7+dpbhAhgjFiyLkQjHWWARyCHwYtuPy8fRLCni9PUsmY81cdYZwG2GDXDefT7Kxd9+UyTH98+00pve+HMfv18+OwBmEYUyKEYUqctbfl7twRUvj59y9rLOM0l4Io2de9WQNhm4bxfLkch412RwynHAlVDcLgHZ5OjPCo/HEYxgmmTAiBIeqUEpxzKQDA92253+7eB0RxzjmW+Lg/MCWggpJKbVW+SELIF3DQOZdk5IwxpgFA3oecc2st+DB2Xak1+GCMjcFLrTrdY0adj8Zb620rudcjIaLAFlIw5uCcIoRTTsu6llK7Se/7Yd2RU+nUn6euqxCVHECtSnIuVQNNaj0PU/JpW1dGcPd8oYLWWnLKPkVA0LbttTYX49CPGJGUU6c7wuRhDsoJbk3prpXirC8l3x4P72KDTUphvZOcSaZ8iNfbh0+BYXIeZkrEsW8AQDHyeToBUG8fd+tMyqmVSgmLueScWm266wASJedj35x1CGMqGEAwx5JiGoYeAZxqgQB2Wl2U0kpBAIehK6Veb9cYI4SAIDx0I1PcW7usy7YtwzBRQgEAGOGx74d+4IIhAEorqSQlFYC4AcglJ4SGEOzuYkzfv3+bT7O1dlnXI8Rt2/fDQAAQhDkVgnHOmTP68u3l6XSpre3b0WqNMRKCpVIxeGtdDQViWGsjlHb9gDChlGgtU8opRkJqSgUi2GoVQlFGXIjGHbU24z0hNAPIuTJhuS93Lvlv3795Fx73u7XuMEfM5fp5La1prQCEZjuOY1NaKiZKbY/HoyGUor897rVCgrnzxzx1Wur77f73Xz9j8qd5HqdBcQ0genq+LNvj9der260drXcHo2wYZIFnpcX1sdyXxRibc1v3PceoBNdCUkoF54ySXDNoVQrmrc8hMUoaaJTibugRIbDkehSEmpRCCUkwaaXdrreU4uV8fjpfUIPOWu9Dg6jWBgByPkofrPMI4FKKD0FKTDot/v7Xm3yslGKCCCxoHqaYLIBNMckIAQ1Yc+QQbrfVRuNdBKAJyj2wtWTF1eN+P/bDkGMcxqHrhkFBBHwOHx8rQYgSFEpctof3bhqnH9++pxg+Pz9LBUIKF8yyLttj6YToh4kQcn46x5StjX///beLjgsBELTehxyd5wQTCrGWkmFUYrbersvKuTjNnaacUdp12qeYg7fWxuBLziGn17e3+7J652otSmnJeAz+1C636/399dXH2PXDPJ4hIuY4oksGHqfT6du3l23dWwVSqct4IoS1EkPwmznO80wwQai1Cqw57tcHSAAhtO37z79/lga6QUsmhmGYhlOK0dvAhUwlR5+O5XjUZRrHfuyHcTDHYa1JISEEi861VcqEVNkZ560z1oaUUgmE0mVZQk6tthh9zrW22mn99HTZtr3m8nm7bcu+Hdsfv/+DEvL3v+xlnKWQIdjPWyEIC8at9w3UcezfPm/e2obwNI6tFoAA56zB9jyfL+cT5RxCyKUAsG3Ltm9HLkUplRswxhzGmeTGrp+nszfW+1BKEUIwzrpOW2u5oN9ennXXldrePl4BgK3WEBwj9DROvdaplC822WEswoQSiiGWVZFGIIKUUcIYFxwRXEvNqTYAh2HWnWqlme0otczT1OkupMQYaxABCBBEXyjQWmqDMKUAkCqwhRjXbc2lWucgxgTj5Tje39854103DLobJ/Vx+zzMXmvmnJ/m8zRNOeflsSzroyX1fDqtO/38/Hz79Su6SDmVkv37v/93CGBOxQUrGWWc3K+3j/e3XvcVtPu6tFoF1/N8KTXt23F93GptoMJxwlp3gnHJVYr+2MzQd4yLaRzG6XR/LO9v76/vn0KIP//80Sp4ffsYxyHF8vn+MY3jt+c/np++11aN3VtuMcRailJyHAcpWW0NtEI5bhCABq73x27cv/3jd8XkstwfjwVARBklBHdyHIdxGMeU0vV2PbYNIMQp65SCEPZal1wxxM5Z553gwjiTQc0xxpScNSlnRiWAoIHqoyeBIAr7rrfWrNtmfci1oIr6fpJKxJAetztogBKCITbGfX5cISEp51ozwkQqOc1DA7XULCgLzn183ABIh7Xv7+8553GceoIQFI/lsR17TZUw9vzt+XI6tfNJUI4IXpdlK0ut1buj64enb8+MMAxRKdlaAzFY9jXkWFpFCBPGGKScspIbgGjbjLNhGielO+uOEFINhRDCEJ27kUvVCQEwE4yCVp2PxriYKyVBcD508zxPwZvH474uG8P86eXMJT3Nk+zUsj1qA5ii1tr1+oEoDcHH0iin//jHH+eny+OxtFo5wTHGcdC///j+7emJcWastTv1wQvGBq3HcQghGLsnX0zwSmsbnPNBUtFdesE4wRhj3Kz1LlrjHnCptT727Xa7lZYrRK3BlKOxx7Gt2fscQ4o5pUZAzBijz887ROW3H7/lkq13fd91Ssn5pJgCCHx8vteaU4zeeMKY4mo+z8bs189PRGjMJaZ0Pl2EFNu2hcCZYKPoaynWucPacthWyzT0f/7+e23g/rj//fNnypkKBhFopZbWCGel5W3bmWeIkOC8scbHaJ33KTZQEaQVgFIrwjCWFFML3ivJ57FXuhv6AWKcUgyJNNgaAuM0YkjeP94+36/Lul8/b9u+MYpbQ8lHhBBlUkgBIfrql5xOZyqolOI4XAih1XaanxBm67qXAghjgnLr82as3a3iutUGYAUNplhqAcdhvfPG2QZALSXHUkgdh34a5vt6z2VnrUrOUd9jQpy1utO1tpySECqn29//+pswShgFDXSqH8ZRCEk4TXteHg9MUd6MdQ4yLIWEiDq/tlb7vldSMsancT7M8fHxASDEmBCUv788DcMYol/ut5CDVhpg2Fr1wZZatO76Yfjr16s15vJ00V3HGIsxEIJ9DACjZV0F48M4MMS9jxBBRJmLqbRbSF5EQTl7Op1SiI/rLeYcUsQQzqdZS4kwnqczokSGJBj3IUOIcs59N3AhY0ohBIhxqaUBtB6GAJBLybVQxkot+374lAglpbZ9O2wIXaeeL09SagChoHLdN8akdWE7Vu/c92/fp2nyMS2P21cUah5noWQr2Rz74/EoOVNKOiUbAMu2IYz6TnMup26inK7bFkMkmGBKlewup6eny5NLwVkbStmP/enleZzn9493CHHNMdaEAeSkUEoBamZfjdkV5xhCznkF9e3j47CGMXKa8T9fnhFhAHzs1oAGt31FGDcIEEYpRQgBgqCfBiUEqEjrvkGyLlun9DhMP77/iDlrJaxzGEPOuBQaIbpvBtJaS0MYH8YytpSSUsqtASkEYTiX4oN1zt9vj5eX505pLqQJ1n1++hB73bMKIEDW+5hzreUwxscAEd62PcaIECy1UMpLLTmnTumQ8ufHByCIYtIaPKyrpU0T4Zynkh7L4pzLJQmpSoPrtuWSW2uUsL4fuKRdr1qtjFkAYIMNE3R5vvx6/1i3nWB0Pp20lEp9pTxhzPk//+u/rLGllXEcUynOGS5ErYVxNZ3Oxrl1XaoNehzmbzOFtEEIGtBalZYfj9vdO4BQP4+CUMaoOQ6IIKA4mXK9P3JJmNF5mIhUxlrQIEJwHDqC8TzN02na7LFvRw5JaSkYY4x6H2Brz88/aqmPY2+FrszAFs/ni5YKQvh5/cQEnJ/OUkrQmjGefZHqQ8mxIIyGcUg535e7cXbfNq70bz/+eDqfhiErzmvJBOLDmHnsnk5PneoqACWv674RiGttIaRaa0xp2/d129bHLjvlfTDW/vj+gxHmrfWwEYxBKVpKJTUAwB7ucX20Bo7DuBi5kF2nMaKl1ZCtNU5LpYQk53FwvtKQAMhfsvKU877bUhJjrKBCEf4f//7/Sjm+/nw/rG0NpBD2dWsAHMY6H47joAz56KWgkKDdbDyJ+TRBCHOuf7++EkQoQX/8238/z+OyH845Y2yrVQrBGb/MM+dCSL49tkjT9XqtuQEE+77vINyN3Q4DQLtcBiklQphA5KypraRaSi2X85krnWsJ0ZsQfHFcypxz19Fxnl5/vn28v6/Hvmz7fmynaaQE910fQ9iPjRDMOLfWxxhut6uQXKt+W8z9ens6v6zLdlj7/voeYmg1adXv+367f2IAb+vDmr1B0HK2ziippZDW7Dmmvh+16hsoMUZOqZb6sd1d8NZ7SinnHFPEpaCUfHv5/tjWbb2HXDChnEkIMaHYBisYP82nbujRF8MB1uv1IZXigk/TLATXUqXoKSGUEISbVBJiItW97zRGEDXw22+/YwT3A3rOAYIAQgjAPE/n04VStl0f674+9pVAOJ9HWGsIfn2s72+vrdZu6EKMWqtn+o0p9seffxCMrQ9vt7sQnHJCCeGMSSkABBnk1awY4b7vCCGAEIhRrlURPIzDj99+y7mmVHNK4zAqLZ099n2PKSNMc0koZ8IYxXjbd2NNqjnGDCFSg24VNgiWZe07DQl57GsqqaZyOPNxu9ZarTMcUYwoYxJiert/vL2/7vYY+uH3779xzo2127rrruNMaKVzKdfrO8VsGk/jPEomueCUkWNba65DP57mcyrxsdwxo4hy3XVf5p/H7dbr/vn5GSNUSrHHcewGY5RzLjl9//Z96HqCOSVkXQ8EifdxXXbBlfWeCcg41UozykP0UgklFaXUO+d2t24PQkk9lQa3nGOFiEvRn8ZOylwKxmQYxqGba85P83MF8Pb58fbxS/VKMTXNfSlFq+4rY+2C2x1WWgAAQkyU0tM8X84ngkkuxRzHum0Ik9paKcVZY50N3gOIYoqlFkLpfbnVWlupITpK+O3jdljLKMeYfH5+MMaUkozwLzhHP/ScUQhbK+U4DEJIKC2ZnMa5gUYwba2G6IO1g9RSiGPfrTW5lmVZrfXOReeDYpxzpnS3HWsrbegGwimX8tj24ziU0J3WGMKUknUOYcoZPc8XjGnO5Yvn6kvY7K6kHPsBGGis3XbL5Qbe0F/pX6C14Lyx4XR+vlx4auXj81pLI5QSgiFCtRUtOy0kppQyRAjmjIFe0RMbh6HXqtR6u15rqcOorInm41jM4ZLDGHWdZpzfPl+v10/VqX/88fv3799LzjmmFOL7+7sUCiH05++/L481txK8gxVO/UmPnRK8pFBjVoxhIikhl8tMCIo53h9LqdlYMww9JyLFcBzOeFdqoZRN44kzfRz7qAdYUHCeIHJ/3IJzGGMt9eXpiVJCCZEyz+MUa2mtgbrrrv/jx2+CcQgBBKWjXa5pXQ7y/PtzAiS30moWXHZa11bv93tMYTu2vusG3VOpMMJCyafnZ0LoP/74owHYWg0hWOeNsSkma21OATSUc065QkKM9bfl7qy7THOvTyWlhtAXLvw0ThCCp5dnTlk/DlIIH2MsiXD6/cd3WKHSuh8H5/1tWa1zy7bHXEQD43QuMcaUQjxKqaVCSFmsxTq7Hodz/kzP4Wg15X5sr29v9+URatucS60IrRtEpYFU0ufjEUMgTNRWIcf35WGN6YceUZobiKVer9e//v4XJryCdr8v0TvKOMbQHgZh4kNa1weAoKRUak2hHtgsj0cn1dPlmxQipCgFqgA456yx67JgSgmhPsWaS0h53RfrQ9913secE2Est/r5eaOcjMNojA0+9c6knITk1nuhpOqkEGIYhr7rOt09lltMSSi5LdtjWRjll8tFaz0N3QFhDpH3HWiNMoYp0VzlnKTqiODLfjwej8+Pq7eGUbLv2/X64V2XfFBCxhgPa2ptPrpWwcv5SSiVW7XBrcejtlxKtc7txyGliCmFFL8wpQjiWovoZAjh/eNt6PthnF6eX/bdXG8LwVhrrZQErT7ua0oRMx5CgAhAAABCx3bUmhGhEGHnvLWuIQwR6rUijG3GrettOzbQIGoQfclRWsMdeyxriBEjCBtqiCyP1VpHEL5cniCilHIte4RhQxA2GHPe92Os4HQapnlMKYJWhRR+DcZ6rVNM6e3js9Nd1/Wn6UQQiiF5YwgipbWcMqg5pJJiEFwwjLteKa5abhCAVhthpCOdNnsqyVj389evYZoxRpiSlKJ1get8OV1KTLdtc8E3CD5vtxAjINise2lgnGZGmc/h9e2tgaY407pHCEnBXErGmOvt9odUWBLGWCuNcY4Jzrke3u3rdn/cawPd0HEulM45lcd6xBpjTlyImjKAoNYWU/Qp2cOU1mopTHIOYc0VtCaE6LoRQkAZHYdJKV1by/MJIySEbDUzrse+67sOQMBzibHsh8kV5JgBaxgRDL8KTJAAeOzHl/MnxAgQFErU2lJOWokU+9baYRzAdN23+/12mc7n05kyMc6nVBrEiAiOS/HR2xBq3XPNBYJpnCDGrdbb4/a4rznF+TQjDDHClPF5pkrpfTtSDowy54INbqi5k13XT8bGWgulrLaWY4yg1SSVUqXImP1utnVZcqnn8xkj6JzLKYFWT+PAGF231Rzrx8fHfX3047i7Q8HaECKUxJCSj3I+0Y49lse2rvYvM0+nl/NZK51TC96fphFDbA8PIKCUW2Ovt1vJdeiHTivBegDhsq7HvglG52me+yn49Fiuy/KoABBKIIQIY90RgiEoAEGYSyYYdVJhiFstjHEAmnXH2PVKiQpqyoVwLJWc5/PzyzNF3Ji15dAN2jj79vODPO7Oh3B6OrWUnp+e5mF8f39/3B6HPwQnOT8ty3J9XId+wgghjKTkCAEuRavjtu3rsmmtCEEYEQhRbQAitBu7W7cdRy35H3/+43I+gwY+r9e3j1eppOR8/mOGEHApnPWf9xsAwAbjne2UFkzUUBAjmMJBjjaEaZy6aUgpHYfFbGkNuhBSLpuzEIBlP3SnXIigwufLy/lyoZTVAoRkBGPdaaG5joPsa8cEp/Q0zQC08wkc9lgfG2hgnHrViWNd/vWvBxUMNkwoPo7t4+Nd6wFjRAmy1tmPT0TI5XKmhOcYGaINgK8OFGMc1MoJ7bXGBAJQa8kh+n1bam77thXQEAQ2OL+vKScMIITg8/YphCi5We8YFyXn2+PGOUcQY0L8uhzHejqfGWGl1JxzChEhaJ0RkhGCpJSUUkIYY/z9440S1nX9OPRMCOzd4/Pz8/pRW4EIj32HALrfHjbGCqoL4dfrWykFATL2E6jQHJYzSgTBtAPWgZhCi6AWH+JujpCzDe7Xz7dfb+9MMMJ4TPHX37+ObYWYmH0jGDYAxrFvAEbvU4632/J43F6+fdd6gBCWkjHCELUQAsRknCeIIMS4Fnm7L9t2zOfzaZ4JwQiSlNOKdmuO3XhGSa8HZ0LY9hh9dAkjjDn31iuplVYIgp+/frVW+qEHDUKMp/EcgrfOPR5Lqw1TsuyP2to49g0ATGgqx7o9hkUBiDqtAYC1Fkzw4ezxn//ZQI0hPT09tQoBBLKTOVfKSE7w13/93INBCCCIGWXDMHHOcs7/8a//yT8EgLCUgjBjnM2XU4Xw+vmxbOtsjqenp06p4zi2bRWU9n/8Ubj8r/w/IWoNovu63ZZFKUUwIQg6a2nfgQZzjLU2k0oprRSACZrG+XS5YIyfny9KDoQyn+2vj1fOeS2QMiYaiMHd7ncfA6e8gLqaxXgbo1dSjsMQfIYQf0k7YoiYUEFZjLGUAgDijEAAh27UvCMU98PCpKQI39et73spBWig5vz88sw578eutlZqq6WGMAjOamnOR+9cCI4x9mV7llLlnGsrKafjduzOcMaF5ABAdqE2+BjC7ePTe5tDdtbHLmk1sJFUACTngqvk8+KWe2nBf4TitdJadl3XIYwIZpwyhIEP7uP63utxniZCBUFYMzX0Y2nl/f3d+nBfr/dt2Z0FBIICrHURwpfz3Osul+ACqKXs2woJOfbdubDt6+1z4IwJyad+6ruRCymkUFpLIbqkUQPX6wdnnCHy559/YowohhhCgpFitEgeY4zeP/ZNSV1abRAwqWoD+/Xqo+dBcsEp5bWE0nKu5TBbrm1f1+PYOtUNeswwxRiMtTFFTOhhrb1dKWedUFIJu9uUIsIYQXg5P0EIWy1fO7B5GL5/e4kh5pRccGOv52lUWlNCvDXW7lpyAOsXKZmA2r5/e+mH/jiOVkErGEKyHUcIrjV5uz0oJY/HakY39CMCgHO67is49uRjyYlghEADANrgmmtd35fY7svSAGi1CS4JpqAiiGABzYWAMS4pe+d1p130wYfrshhrg7d//PHHMIyttdvy+Fyv/yT/5KxwSv78/fdKwLIsr6/v27qEmASliKBOq8MEsu9M8KenbzFEQpig4p//+Kfu+8fjFlPy3kshvj8zzhmFhFKslCypTtNUILy9fyzrMih9ukx3RDkzFTXQ0Lod3vtteQjOp36I1jln/WFAaZfzpVfduu9KSIwxwCCFNJ1GzVnJOYQAIYQYcE5jcvfb3Ri7rmtM0XhnnUUIS63GfsgprzEvt9VYO0wDpiTnbLxzzgMIv/5Rni8vwzgF542x1rpc82Y2urHD7kM32N366IRUKUXB5fXzBlpbVx2T99atx27MkVN++fat0xohbA/7WB+1Fozgt+cnRujgguzUNPZTN/Sqy7nElnM5NrtbZwhCl8u3aT6V2lLNSqrny2W+zD9+/L4s63/8x3+8vr1RSiimkJFWq1IKE/pr24KPCABj3bKvDcIUk7FbPw7L+rDHoYXuhk7Qp1wrwTS6uB6GIjKfzoIx7723rmklORfM9V1Plfqvn39v64Yg0F1XS4slRutLbufzpba8HSa44FLulZpOY69faqsIwpLStu7W+c/bu1I8liQl51L2tYAGGmr2OEqugrHL00u7X+3n7TB7p7XSGiCYStJSUkKN2byLALNl3z/uV6VUr7taoo8JNeRTeKybe//IoBKILufnF/2CCT2Mi6U65+GySSn0cz+fzp+322b2t/dXisU0TbfHY/242uAYpxDh0lrJpVhzeTo9zxdnrbMeQOStDTH8t3/+89u3H/6wBJN5PnMm7uvj4/6xHwcETet+7LuuU/vXeFtqY40xZkysLaWUxUlzSmNaa62ccYwIo1IpxTm7L4+Ug+xUqzW5YL25Xj9030upKCveupzSoLu+07VUwdjT5Xw+n7gSqRTYAKwQVGCdSzHnWlKI+2EkLyVl2KOu6xBCLobSSmsZQ6g4t9ZG0DiTSqgMSqm51f7r3WGU9Fqe5ul7+uZj9N4DgGoF3sXDmFiCFB0ArdRSShZCwBP03jlr9+0giPZdf1iTIaaYGnuUVnNODcH7fY8pbfagmAzTmFKQXT9P0zwO9rDemZSyswYSQjDu+j6FYMwOQCeVkEo0UB+PuzGGEvJ0Pg1df5gDAAhKY4yfhklKEZMP0R/7vu2PUts4jJQwQkittbbMJL0/7tfbfV0WIUTMjTB2ulxArbVGjHGt2Tl3mMNY33J7Rb8QIimHnAshpMLmg6+tCcoooVKqVmpJJeWCIOw7rYRooFrjSk5KcNgKAIBgRCGUhFHOaqn7uizLLafE0OghiiFhUEiI8f/4//x3qfptN5/vH4/tui4boYTRvh9GZ82xm9N5BgCE6Bklj+X+uF9jit74WuswT12nXz8+NrPPw0yZ1FKdTk8QgeB9CPE///ovJT4QBAghCBpojWAcnE0lrsuec00pAwSnbrqczkM/ANA4xrU2UPL9bgjj/+P//W+QsPv9gTH9vH7WkCEXg+6QHl3nEQQlVx9i8H437yFdpnlKrThvEaaM0F5KiKjqOGjQhWCjLTFP89OfP348Xc73+5URwhkdhjHm5EMKOdHPe0lBSMEIBQDNl5O0EgEoJH8+zwAga02lCEJQW0G4aSlO0xS9fyyPbVtRdIQwjDHFpLXWQOOMxf1wxirdPY2X3377LYRw9PP2eCz7dr6cCKPHYQhCx+FSzDnk8+kkpFBKKS6ciwjh2tJh/GNZDneUSyu5Xj8+IIYAwE6pP779QBQhUK0xztppHBllZjc5x23bum68PF+4EDXHUKpQAkG8bNsX+rTru2Pfr5+3hqCP3nrnQ5iHgRCktRRS60OW0EptjLOUc4gh1vT09E0KWUvOMYLaet0jRC7n88fHJwhVq/7b+RuhZG+HEqLvNMX4119/v4X3l+fnvh8IoTnHkMI0defTLDj1wSMMulGfLjPD5HZffYwhZy2lMQeCkFLGNCu57GXPOaUUv0RmpdTgA0aQORZQHoZeMOGhwxhjjAVlwQQnHcPIpQIb6PoeYGK8+7oWl7qjnAspSitCyHk6Scl98CnFYBHCEBOSSskVtoIllxiTBgFAkCvVIsQbBTAF7yvBqUbjbN91CBNMadf3Qohaq7VbqaCCxjm5Xa8tV0SpEFxqxSWf55kLkXIw+0EIGftOSmmMWfYlxJRTEYK74P/v//i/j31HGIQYCmjX+/Xnr18+eS5EboBx+nR5wpjs+55KQghVAKZpUlzmmCTjXIiGkNn3XErKGSLUDZoSEkvEpEcYOuN3t7x/fLzT99NpHoZB6x4RwimTQmLCWoshhcdyo4wo0FKpAKAKqvchxGiD01JKLuQsEESl5pySdeZ/V5CUhJLnnJ2zg1IIolYKonwaewAxQjil6JxJ0Tt34PPp9++/VwRv91stLeWYS22lDXT4dnlmgjlnvHM+BqklYRRYyKkQlLUKOKJEsu2xHPueQSOESi4kkz4mRYVPnjRAIKIItpo547Br1u4ANkYZpRwi3A09qKC2BgHglB2H2bbVe2eMc8FTxnIooLVx6jHAWkqMQIohxhC8ddZaawY9wAZTTJAghKuUSg/D9XrNMSGEhZIUsWHoT+fx2I7HsuZUrDU+BlCg4Lw1YIytteUUUykpp1iy4PQ8nfq+L6VILgXmnewQQg2AvldSiJhyTMl755wPIRCMIGigVgia9353u3UONki5tD4YY4PN2UfivV8+H3UGf//8+/p5TbVC1E7jRClXWtxhQRhpob4ydo0S730DteYMYGsNJBdTzAAiLbRUnXc2pSS44Jw3AGwMMcYcU06l0+rby0VrSRBSXMToW6tdp1prtcHnlzOj+HG7jv3w559/6K77+6+ff/36vzrdM0Y63ecQn78978a0UqdhloyVkrXW/TAE767L3ez2/fa+7UfMkTGBGhBC1tYey9IA2g5WW04pEYpLKMfhCEK677VWCGFGIKYUJ4IY0wB0QoJauFClVWcdp1QMlCHa9x3GZFnWx+2zQdhatc4pJZw1hlFvzbqvxhwpJqXU6XzqdI8wBrBVACFCKaUKMGVUCDYO3WkaroJLLefz1BCsIPd9531at2W533NOGIJOKkZpKY2xL7en3/Y9lix5hxH2Ia7rY55nxVWGEQLsvKeUSqFabc4vLgecyWPdcmpD34/TKXrDaoEACMm6LKz1fdcpLu/X+7HuehoZ461BwYUQrOUCW7PHsR9bLslHm9donb1dr+bYfnt6/vb8PQS3bw/GWAUVgTJNEwLoX8e/OOEvT5dYc0ox644Sjgkcxwnu27qtznmIUGuwtcYpp4gexlm7QQimbuiHYeinmNL+sXPKe8m97kIKCACKMGGkdHVd1o/PjwJargkx0lo5nEUMt1IPsykhKeUIQ0IwZQIhRAhJpQZnOiVrrWbbGwD2MOM4IQhjjJgQrTvYwDhMWsv399efr79gbvPT/Mcf/3jc17fXDyUlpuyLNLXsW8oFtFJA45I3VBFGFZRlv2OCKEUvz5eUCoSQC37fHrePG0Hs6enSKw0B3I712Awj9Pn5D6VV8L7lrIQYp6nvh5jjfmyPdQk+cCYQQX/9/FlKySlB2FLN3TB4Z30Im7F52ztllJYxZcIpE/T1X+9KCUzo5fnCOH487s7af//3/y61jiFs9/u27tM0hehigozRodOxFO8iwjjn8oXURhiXmnOMX6rXnHcfPAD1/f3959tb3/VUSFiBj8FG652lnDNCu64TmOVa9n3LpYXDeh8hbtM4csZ9CClGCAFqbXemp9T7ABEWSnLBSiulJOfs68frYa0eBtCa0mo6z8GGGKPg7Ov3WSpYto1RihD8GsQoY7W0DOLpdEYUb9txHIcv8TSeX769cCZKqbsxwfvDHS2lmjMAraTUamu1tJKlFLWClFIKcegHCGEKsZYasoOgdapTUpVS1mO/fd46LS7zRBBJMcUQIQQAAEYp7ft5np5PT5ixx32tAGgttR5SLgRjRDGrdBqn0+n0b//2p1D811/v9/v183pLKULUOtlTRHNOnAmttQ/+8/MTNEAxJogJLjGmLvjb7dbrjhHadYoLbqwtJUOIai2M8xRT8E5qqaWsYAwxhJjdYRFC0+mp0zqkEJyTDPNvZyIFNpvZrduXbd0WKbVWPed1GHvr7B8/fjQAa621VWv2FANnnHPSdz1ByBm/rsvd7KNSL8/fcgMfn2/XjysmaJrGWluJceh6CjGEcBz60zwSQqw9MAZj12vVTdO4HQcX/OnpbKzd1+3Xfph904O+XRezG0rY7Xb77cdvOeW/315ha97H2hokyLlwmeenlxcIYMPEmL/2wx9H3A/HBWOUEoIJZaWU4CNEELRaW9W601Jl637+/Mkod9FB1JjgwXmXAuNyGkcGcN/pBpE97Of1o9Us1ZBTpBHHHN9e/17XrdO61QZqDs6+vf883F5CPo4NIpJzyaXknFNO52mCGN4f90F3X53ky3kUDMfoj/1AsCECAGi91hS/LOvBmKglR+cYphSg6D0B5DSOoLVtXWNOx2G1Gs7zjDENwYJWn84Xgsjnx0cFreu7aRoZZj6EmHOp4L6uqdYQ0+YOBDDGDbQKKxiGcRrH5/P529NTq3BU/aY6WEFMKXovBFNcCi4wwnY/tvuafay52mAAcSWXTvSUMUqwJEMnRa15vT9ySVIoSuk0TzmXnHLIcd12H4NLDoBm/NF1GgJkDoMQKA0oqWotn/eb9cY7O/RdNC6nCDFFCH67PM3zvG4Hgni1h0/B2K0UkEthjFhnnTMIIy4E57SU+vrzlWDUWu27bu6n03ySSkFUCUAvz2dCyb6tGMEccvQBQtQJ9eP5B5U8xuyt98FxSmpLiOhhnKJ3//m//otLVlMRUnZ9Dwl2yeeaej6UCpZ1WZbb0Pf/+OMPimlp5Xb9fHt7W5fj+fn5tx/ft8MgACFGQorsc861luyc73RHMbXWHoeZ5jEf0VoLah2Ufnn+No3zsi7B5+CTdQEiqhAmmJUSCKatlH03iBCm5OnylBu83R97Pj7ePzgimPPDulyK91EpzAkNPtwfD9LI/5J/Cy5LhUzIGWGCyeuvXzW389NpHAaGSGsVYzQNg+Dq5elJ6z5EjxCsrW3rEVP0ySNQCcbLsS/rgjFFECKIKWeXpydCMCiVYNxPvTncV2i7gJpqxgDEFHJOIXrvPUIEQwJAq7Ws6+OwDiHEBE8pckaS9x+3K6NMSiW0JoQCCDFB37+/MMpySTEGQuj3b98wJowQa5xW2jt/O26IkOeXZy4koxRSAlLJpdZate4wRVSQ5da8dbkVCjGsIAUPGkQNgYbGbkylvr2/1VoRgpTwnMs4dEpLUCommHFeakmt/vj+Mp9O8zjVDJbHPaRwWDP0ikopGD+dT9M47of7+Lh+PhZCCRfqsax//fzLWEMR3dfjfD4rIXLMIbh93cxhGCFDN2jVwQbXNTQAtNIIoXEYckqIUBPs9XFrS8MIM0ZTigig3R3zfPLePe53RCjBZBoGglFtFUKEMO5010CDABvoDheYd5QxAFE/nlsGkxJknsZcSvCp1nI5XYRQtVRK6Dh0gqBxGK0P6759+VqtdwShP377QTEhEIWv638AOqUJwykkxhjDxFpvsSGUSMJHPUjBKKFaSwjhceyvP/8WQkynaRpnzOjQj5SiFLO3vpbmjd/WTUqKMBnHIZe8Lcvrz/dcoDH+9e3DO0/4bTvoOPSx5sfjxrkiCAsqpn5OIZRUHfD7Yaz3CCEuOSXEmfBlcCSkIBgJAinXZfnY1lUPihLqgk85Q3IEazqhrFlTbs779+tHjqnTpuRijGKMhhj7TgshWymcY+/D9Xa3IUguAMJSSM45IXhdl1rbMI2MMgLR4XaO0cvlaR7n1urtfn/96y9MaKm1lGKdZYyl6PdtrxVowaehb6it231blvP5UnOpNXNGny6X8+n0/eVbqdW5fZDqdD7VAu73e80RIpxzoRjUWltrJgTj3OaTlgIjSCmelBRS5uCRhZKpfjqBBsxhYozGWheDiy7XpLOmnFDxnQlBfKAEk04OWR/HwSQfVRdSCc59fH5wTBmjKef9WJ0zWikpdczJ+/D+cT388ev1Leb4xT6SXEmpKaUKqOQTqKDU2hDy0aUYfQhCMK7Uduzw/W+CmeISQSQ454yoKkGD+7qnmoRQ3TC0Wjuluq5rsKXoa8q9FKUUQvn5dJr6ceg6xplgmAD44/uLlCLE55zK9lj2YyOEMsaF4l3Xh5R9CB8f7wYCAP715NzldPnttz+ssT74n7/+hbnABGaQd2OdtRkCRIg5Nhfcy9Pz8+UydEMsmSDy8/Xz/nhM06S0yrnebp9KaQzxNJ32Y3/ct33fJed9pyBEy7rcl3Uc+9NlUlwSihjBsAGMiJYdRAQ0iDE5zxdK2fV+3bcFYUQqIISNw6TVCCpKoeSaKBNcqG7QGALKOAZNcnWeLuM0TNP518+frz/fSiv9MH7//k1yFWN4e/3pQfQx3u53jEnwiVBOcuOcYUI4ow1UhNCXxT6k6J3LNRMCddc9HhtESAkpGO37fp7HnGuJoes7qZR1PufSICCUKC5LK97HmGP0LpUMGtCy050GEJRaS2nOWe+ic3bolTXHsR+EM85ZN45aaaFkQzDlBCn2MTyWG6dy6gdKOSUYVKCfnlCrf/3169i2bd0uXGohn59fgnMQQorhOKjz6WytuXHRMYYxkkJIyRsEKTiEkBT8cn4qDbjgb/cF7gfBQXKhlB76rpZ0HMe+OsLYpLvLNHEhEUCh5Jj8um9j33f9AABklNRcP67L7fP+89drqTXa/O7vHx9/7+smGFe9nrQetIYFoAY4oX2nAAS97sZhJIT5EHKOX0dqjBClFNQGMcGELevDOquk+u3H9151JacU3dv7KyawtOJsVEqlkhEkmBCCUMqZIFxSiakQzGoL67bHnCnlQw9ARTEDgilbzboYSwGchilG72L84/ff+qHjjFVQjTcf9/cGYM415zadBky5dS5431rrh27ohtzalxhaCQHOJ7qt8zQRiDAm59PcWr0/1qHT4zjUmimhzvoKHxjh3VjBxY9vzz/f3l7/+tv7oJXilGFEhRCgoliSd+H/+v///7xND2MgQpjRz9sVtAr++D2m+uvtl+SCE9EN8r/RP5d1s84W2ByKLMMGKwK0FlAgKrlo1QGA9uPACBMm59NZS5lraaVQxCpqJRe7GhCLbcD64GIwxiKIsSalVgggaEgJPY4DgRiASineduO8V1wp3UvGpZQxBICgtabWZnZTaiaEdF3nrffOHhu/b/f77cNYixBBCDpvW6sVwBwjxJgiMvT9MCjQ6vvHlTQYkg8h1ZpLjkpIxqlzlgsFIUo1h5QEF/PlFL3vur6Vum9r3w2MSkDI4dyyHbflrjj9x48f/ThopWDp7GGjM8vjtm+Ls2HdjnVbQ8kNAp9iTAlBcJm3XnUxJutcrY0QOk3jfDqHEG6P9djX7dhgqZRgjIjzPuUYQhLOBx8Jo6/vr+u6plxCjLC1AsqoOEUUAyyFGjrijN8OAyHACDbQJKMYIoJpjPH9/UMpbYk5rE25ppwbgDFH661gch5mxllJeRrGHz9eIISv778YIZwxAAFnbJ4nLTWCsNSsFP/+8nI5zbU2a00MKVgO0SClCjEs68PHYA6LENJd/3m/bX/9q+bCMSs1E8JiTp/32zjOtZZpHAFEKaXg4272WmqnhmEcEEYuBiH5NE//+OM3GzxnzHtfW4EQPNbFG7eYg3EK4Zc6MYzj9O//44/aUHDufJmHobPWbuv+F/jXcRwh5odZfPDrfhAuIMKxFpPc57a2VijCXIoKWkqltEI5BakywgBEzgXQYNf3oOaSyuvbT+dt341P33/4ENdlq6Vxwsdx3Nal78e+NQBBK+Wxb8t9ZZR3XS8VSynelwdCJMR8WAsgwJSUo9YKKgA1V8Y4JajrJYW403qeJtAQAO10mgkiEMPaaogeFZJTLqCUUnLJNedWKyWs1kIxRYQigDs9IEQIJaC1GNzK2DSMRHDOmOp7wUXXDzHFv/7118ftuh2b954ScthDSwVa5YwMU6/lMJ/s4/54e32LOU9dz7kwzizLfdu3t/dfoIFOq5fn50HqL9uwj/5+u4UQci5SSEQgQlRILYR31hOYQK2tZAIRZHwty7o+ICZSKsZYyiUE66yz3lNMWgXW2ArbVgoze07l9nGzzk394L11MT7uD8HYy9N5Pp21FIyiw2zGGmMNhKjT3eXpSQhZSo0pplJQyT4G1KBW+te2hX1vGLcMjPUI4JoqZ7xyxhitOaWSTyedS6ulIQQBgs6YiJCEGlIolErFQACncfIhLp9rBTGcThgwsyPi3HFbl/uy9kpVUKN1TEgpFUVksYt1x27dth4FNE758/z8dHkGqL69/9yW5cfz9+f5AiA00SOIe93VUlLO5eWplvz5edNaYUqtMYyRfuyezxeplBTya9Z8PO7Ldvx4+f789IwgXrYdVnA5Xca+BwiWUn0JsMH7fSWM5Nz2bXPBHd7XXFLO+P1NSeXtAXI9TadvL8/j1BVQIAYVgif9VGrZD1drXfYtuqA6PXRjrSnFyJUiCFCEkVSPx80bSxg7TxMjLKccgj/2Y9kX3XeoVc4owbAihBqAFUilJOMEY8YoYUgIhTCmnFPGJSMQoFxrLoUwDmoDADEqXDHTOGTd3W5XG/y2rsYcSnWU4FpryCnXnH3AGJ9P59ZapzsA4LIsy+NOMNnMkVIB8MvABVJK//Gf/7MhGL0z1qSUXp6ez/OJYlxb9cYzTqdxxIgm2D5u98OH2goEFCI8T5PWuqUkqdjXfVsWgEADSCj29PJ0GBdyAh55b63zuzHOec758/PLui20ZNBAay3FlFJOueRWKEQUoa8Gsu41p9R7V3JhkjNG+mGQglvrvXGI4mmeKaHBGanU0+W08cMGH3L8aurWymoqKSdQAajw6wI/pfx4rKGU3FqKEZTaKz30fQM11cIokpxyzko+dYIpISBAlBFCKEboCxj1dDoroa+f18dj2del1JZCJgSXCnzw99uDCk4IDbnEVEIIpaTV7u/3txpTLrm0KoRgjGHMNneUUlNrwXupxNQNz9NpHucQ0+P2Wls7ny7fv39f972C6uyxbcdpng4T/v6vv66Px9Pz87dvL4qLGhOjGDXwb3/85l3ggkvJgndb8Mvf22NdW4HLYRoATLIK23JsEMHdmphDK81l93m9HtZa5wBECAMMyHJs5bUQTjRXEMBWc/Ducbvp68cfv/1BherGMZUimCSYxBjNvocYSq211Ibqbo7D7AxFztnE+9ra9fqZS/UuppK6TlcAk4wI43FUX2oRxgilRDAmOS0lYcy1VlJKRsTpFJz1j205zHGYo7Q69L3gDIAGGyilUkpC9CilTvdC6NP5/PR0BhBac+QUAWwp5dwKAoQwKqQ8rH3clmU/ciwpl/u67ubodCcoOU2nHGPCjEvx8v05l1xKNM7VVqyzhzUxBmvtsW7fX77Nw4QJLr6sh3XOf14/S62MCYDQfdkwoTFGCFH52gK3dpiDcyqUaLU9HgtAmEt3WAswRhDU3Lqugwivj8fn7RMRhDBtOdcGa0xaKkTobo4CqhT8fLo8Xc6E8Zjz4+9fBTQImvcxxIwxPow7TEg5mn3f1gO0YjrbKTWN0/PLt4/bFVGGEHUpQwhyLbs1ELZaM6NEMCGYxJQ44xGCKScXfPBuLKUp3alBv/SmDxU2H9KvDKzdawWM02FWZDPOHK5VcBx78B4BEFJ+f3vru/4wbl03zBjjylobWv6yZW1mv35ca26ltNpayvnz40oYnacJU8S5nsZxWdeY0+V8ElJjDLetPpaHNTbXGlNOMayHud83470b3PV6K7mcTjMj7NvTtwLrvq3LtsacEUSEcYjBtpv7dtyXFSBUS3Ut3+5b6LIgpNOSMtJKSiEQCCSnmNF+mmJKzsVQG8Ws77SUErUKa1NCjtNwmU+UEmN89tE4f9LyPJ85EyGG69t7A6CUSgk7z+eQ0n7sznrnRd/3jGJnfQUFtgopkkKpvsOUnKZz33X7dtzX7bY+as0YkYohZyzH6JwXQoWcTYyIEC6603zClG7r2hqglGmudNfN00QwhBg/7vd1XSVVSnfbssEGVCcVlIf1PsZ9Xfd9Z4RghlewccYupzPEJLqIMXx+/s4YO5zrh+7pfM6gcjxpJeauP48zxtikDFrVWjJKYkypZK10p8bD2tVs9dYQBEoqRhmltOs71Hf92Png9n1bd/P6+vrYDCVoGMep7yVnoDWMUMy5H7Wz7gauhLPLacaYIQis89tjFUqeLidMsNkIwhgTTCnFFDKApWBKKOPs7fPjOGqnuk714zCNw+BT3HcTSk4p1FIQwBhBDAEEyMawb4/3VyiViDESADFGGNPg/R53iGCtxdtoqGoNfX7+ul8f1ljQmrGuH/rD2xjSfhwySQjJfVkRpYPuGafPT0+t5G1bnfNSCDpxJcV0etqNzfVf92U10ZdY1El3fY8xdSH8fH2Lzh/GdP1UanXer/tSQlZCI4SHcS4Nn+ezFJJ1JMX4uN2cdX0/5JqPx/Gb/P50uTy2tVZwGJ9zDcGDhoZxhKD9ev1ZYNVSnE+z2Q4oZK0w+JhzoZRo3eeSjmM/jl1K7vsBAYxhC9YZ40P42m/3AGHOGWMkxbQf+/pYd2dKzQBAqvg4TLCg9bEs94eUap5PWg1//fp7W3ZEScpMKv39+/cK2jR3LWUhpRCEQIwJxBBH72PY3c5yylp1IaTaGkIol7Js66C7Xne91qXVlGJOiVEWgg/WO2CV1FqJrpMVgZg9RK22EmL0zocQAARC6xhSLulymmEDn9f7VnbYUEu1oSYYZ4wbu3vvKacCMcyIPY7DmNvyqCUjjEEDpRTnHUUYEQRgy6W46BEmTBAtVQXw/fZeatv2PeVMMNZaEYqcs4+1qqhjylxJDDHnIoMKEqgIwgYwJhDCEP3tumAMMKNSKE7Zt++/jed5PZZjXSjX3ekiVQ8RXNfFOGOtLaVQwhpopbXs8uFtSZVT3hrgnNeat2VFECgtIQKq01zIaSQFNtgKIcRY4/2OIOqUHroOgtZqGwcNAHDOpxCNcTnkqF0ayjCNQlGICSZpHDWlgEsxdNrsG2kAPp1PPsR9X401vewIIbf743q7caEgIq01yVUp8LDb5+3qg+ecdrorqVCCMMUFVkTg7Xa3zggutJJcstrKNPZKqZDibo/Nbj8/LIKNUoYR3bettsoo51zt1n18fkihdNdzKjMCIcTr8rDeUMYbQAS2nGKIAaP2/eUFAHhYV9YVINhagxiXXCCAhLGYQvCeMsoFzyk4543ZfIgAQEoxBHU71prTaZ5P47nrx/1YjT2s9xAhhpi3vrVWW0UcnS/jOA8AQkZ5Snkz225ctAYz2lApsYToc44YoGEeh/4EUCsFWO8P599vt4/bRypJcBlr6qQWnEkmXAzWpZxzP/Tn83Q5nw/vfPTHvkOEpnHQUrZS+2EkjHvjXp5ezqfZOZ9CqJVqIQBGCNKBQAoxRoQSEoLPIcUYMEYx+sf9jgHqho5zrgQDED2fJ8EpwujUq9N0YvRLjVSc9QjBnNO2LyElJrnuhg7LIxytFowx5bzW5mNkzsNWBWes62sF625LKcWn8TT//vJdSFGS11LO81Ryiy2d+hFBtKwP691pFgQCSlWxljKqpew6fRr7kgth3B02e884u0wzZTyXDAAMNlKcCBMVtFQyBEjrjipJnU0hMkZdiPuxaik4I84cb94RQiAEUgnrDUQoWH8cBn/FNFP7af9qGHp7HMZQyvp+wJTlkrdt3/cj5ZpSBJAwgodxqEWfny6/f/9+Xx/J+xQSABACWEqhGM3DMM/z+8d12Vfng43eeF9AIwg8Xb7vx9YaXJcdINAw6HXPTtxYa4zttO67gXEiKYMYlEqc89fHMjrTSos+SMnn8yyl3nbLIYYQQQBzLaSR2sD9cRt6zftRdVJyYXYjGKNCiCJjypwzlCHGpJZScnPG9v2QY/bO5VoIJPtuY0hcSk6YZCLX5JxZj2O3R8qBMv48dOfTWQltj307js5s8zye5zMA4BW+GWdbA4Lz8zwDAM7niSIIAKIYQogAqCEEl8K2Li7lZVu5kLm06+NeanHBQQgQQjklHwImmGDSaS05TyEsaMMIC05S8B9v78Ycn7cbAKXUuq2bC947BxFmnDPGpegQAqRBLRlGz0Jw0BqsNeUcQmwVlJgwxgT/b1MegoBiBLEY+v6rIX85nRhnOeZYM89l6Id5nIXgrcHbY/38/BliXPeNEtIPo5IScxJLTGvwwbcClJDTdGoQHc5Y482+IQj7/gdBhHPBGAWwcSGVkgzT02k+P82qEzeCGJEc05Tr/fF4e/t1uENJjTCO0SKEDmtdDIggCunLsx66Ljpv7JFT8N6nkmtuMYROdwiTp9MJwAoB3h434+w0jJTQWuu+7xQTNs+dEiknyqiQspa6OxdLccHobpCdcs6XErgkSrDLPL+3SCihXSecj7XU4NI4nL79+H573O7LjXLFGW8INJgagCnllHM/DPN8pgB45xDCOWcXvJRi283j/uBSBO8P6zohu06nmIw1H++focQQ474fhBFOWSf10A1MkPvnbT9s1/cCQueiddEEW3PmXArVlZJjTPu2G2u4UH9+/yb1kGu93VdGWcqZEYQADCHV2iDACIGuJ0oJgNFhrTn2FJLzAcLGKWu1uBi8s4LTkNx64Mf9/vl53faNYHTf1tVshCOMkVbq+flZcvVYl20/CGMsCIgwxggg6EN2zh/HXkoSjGUIbcyEkPu6MsZDSJ+3x/W+YQpjaQ2Addtezk/n+VJAPYw3275uG2cstZJqccEvx9pKQwgSiikkhCKhSqv1fDoPY19yJQSnWLdjp5zO82WYppfzt3VfzW7u91uIYeqny/wUkt/XfVvXn79+HZvhkiHCOERTp4a+e346twr2fU0hRe9aa7k053wtZeiHcRhlpzbjv+TDCKJcivP2ev1cHg+KwDiNXLAYQk6RU/Z8Pk/DMPeD1up+u0qlXp5fMOHrvjpnOmv/81//WUChFDPKBKdUEOuO/RCwtQob5xxAIJWYT+NlPs/z/Pl4tNooFoAXIWXfa4iAscdxGOcDJLjVgjCexoELShFqtWjOKAQxxmBdQyCmIKWCEOaUKWF910utUoyP+y2ZmHOa51HKPpfqQwopKckxQgCB1gCnWAhJMa4QPT+dzueTkCyaA7ZKKJVCP51OnNFlM8l7CCEAMMS07murpbZ0GuZe63meawbHsSFEtRIvl6fc2n/+r/+83++tgeeXS9f1lDFQW4wZYtwawBBVUGspHx+fx252awTj8zhLKQ5zmMM20HyMc98Pw8AIAhWN/ZBjUVzO5xk0uO0747RCwTHNOaWUtOpP89kdRw0FN3w+nxCC1lnO2PenFwiQDz64ACFooKVcEG2McsEkpvR0PrP9IIhYd2SSGMXT2APUaisMI8EoaAAjyDjzzj8OCyGEsKWYfAgQkk7yBlCM0YWQYyyllpAklwC2+/0GSkMMvzw99d2glMb98LURGcaJUvz5+fH3X39dHw+lZINgW7dcEkaYQLzeF601eUKE4Ms8nM4dRBRj7A67mw3Uag7TarHOjeNECU3eRB+lVPKlK7VSjMdpeLmcT6czpdBaa3aTQIQtM8oxoTlX2ForreQ66B4CIAilCFNCQKtaSYxwjhljUluLyYcQnDPrunVaAth0p378+I1iDkDDGCMEW2tSsXkaCCXemhjyYrbHfXlsS6lF6wETEmP46vmUCg5jrbVCKgChUAoCsJtVCIEJqqUwzjSQpWQpZFGSEVQBTMlwRk7neRzGWqqz9jiOUutx8IogFXJkssSSQhKcccERgjXnFIK3BhKMCf11/7jfboQRxCnlQkYfbtdbBXU692+fr9YYhEjXDYiQzR1fbE6EMKYsxowIRpSu1h6v4TCHlKrUaqytDUQfMd7R+UIJ7WTXd1hI+fl6363frSGwjf34/Pzy/ds3yhnIDVGihXI+vr5+CKV+PL9UhFPLnPLUYKMgBSwY01J0Up7Ok1TdODwQQbfbFSGMWkMEgwp2ezDEdCcJpRVAhDCnvNNKCsm4EJwghJxz2/rIpby9vwGE1vuyLEvf9yGV99snxpBzNnTd8+XbPMyU8cO53fxqgESfGkCUwlIL+KLXEIIwrhAY52OpACHQWm0thXw4DzBEhPmQYngAkKWUj21tAFofTAywgd3Y/Os1RF9rmfpRCKklpwSXkt/e3yDEDGEpZE4ZAcg5A60GH2stcKpPpxmd8e0m3+CHcQehSAiRUwIQaq0yaCWlf/38V4NwnifOWPRenk+gwhzLsizuMJxzKSVEkCKkGBvG02W+AEKcr63UVkGGtTawW+e8F5QQjHdzVFBTSsZabyNDDIDmnNNSSCGt9Z+3BxfChGM/tsM5Qojg4gutHFPupqGs2+f943b/bA2c5tM8z5yx316+TdMMEaF4a6V2SivdX84XxlipzdrNWXdbFhd8Q7DX+vx0EULmGEOwADQCQEEoAwBbY5jABnMpKWStRd91hLKaa075/lgxRqLvDmtSLZ+3T8E5xHKeJgAAwvArLAhhE4pBCPZ9d9ZSTvthKDkD0HwMOItSc6kJtKy40FJqoSGA27K1VHKOikmIyMftxjkT8lssKdfmvH2sD8kFACCl5IMjCGFCvr08//aDzdPQWluXLaRkji358PT8/McfP0ADnZYb22prLnhGGVd8eTz2ZeOST31HEaEYC0IpBEKIitu9LbstrRLBWKeEZhSU6Cz98e07hO3nx+ugu3mc1+1w1lXQGmgl1wYARqTWutu9xNR1/dD1CEHv3OqXXApCqO90LhljAEBNMS6P2PWdM/bz9pljBgCUWiBAnIrz+UwZqwBgQluDy7oijBihjBJGaEqptlpadc4SgiBAtQGEUSuNawEAPMzhQ0IY55wRxqehE0KC2uxxCMEEJ6U0pQXjDBEKIWKYxORrrSGGlkv0AXRFdUNMDtQCERqHoUIoGe20IgjVmCiTQvDtsR77lmqlBJdWvHe15XHodfm6jhK5Fik4JYRRojuNAYIAHda8vf3cDltqCTEFH1st1hjNFYSg0yqWRBEspRBMGKHOBWvMFw3ssH5ZNh8joiTVElzGCA7DMI5Dyum2LMkYQkvKCSJAOSMU11b7sccABu9Bg7mm3Ww5FaK1UgKeTqDUTnecyZxTFbXWtpkjLCsm5MePHy2DbV1L818EbCkUJpSTJJXerXksa7hdvXGkxAg7iTGsIJVWEIYpJABRAzD40MCBCLtflwpbaZAQEnO8bwuBAADo7R5KRA0uy1ZKAwCVWo7j0Fqt+9r1PebUPWwuLfpyHCG1ejpN8zADAFzwtdV5nHU/1JiM3UOJZ/E0zrM15vr6t2eMEPolOWKM5JyNtb8JpiRPbXwOMXoLIZx054M/9v14PxDGYmeE4AZhjNFYn1KSquuHfhr6UqsSgUASS2RU5JxTLlr2GBPvXSpJC36aT5dxHPte9zrn2hq4X5dQaowRY1oSLKVyqYRUfTfUUo0xhzlqzfM01IZ8MK02gr6gzTBC5L2PMV+vS8kAQZRSrLVSjPdjXx43CBolRHF1uZx7rSGA1pnb9RpTZpxhQiEECCKtO8EZgDCVnEI8jo0x0RDAjAgha6ExxbfPtxDDF9lRdb3g4na/5xApwgCAmMK27+vjcb/fY4zn+dSpHmIY4maNT+CBBOv7qUGYS42lTOOo+z7FiDEWUtWUbtfF2D3nLLTsO40hjTnebp/HsUOIYkn3ZaOcIIx8CI/lYX2aGqKUIUhi2JyLjArn4+OxYIQwJqDCYRwYF5iRlHJrDUEUfICEPLY7wRRBlEtqACKEMEIYI4IwRgjBlkvYj5VAQgkhEFdCtVa66/bD7MbUUrksDQHCMAow52Ks7ZR63JeUI1cK1NYpBUGTnPXDSDlLOQUfIISI0I/Pj1be1mXp+2Hqh926bd0Afqy72+3hnEcITEM3DtOpH1JKSSlOaSll3ddcyrou4zR5G97juy/RHvYyz5fzSWttjNn3A6ImuJRS//7n93kacyyn0xkicKz76+vbtx/fLk8nzngI3j25kssXIgJT0kn51//6i2DSay0Yiyma4AgmXyNhTdkeRykVIziOulP6dJ53ijkjAEElRK3FeHtbbvfHDWFsva8AAoDY//buvpaUlNR93yGIoj2MNQhALnjf9VyJoe+1ksdmrD1KTAgADGmIMeXsQ4QAwB6X2nAFAENCiBCiz+UA4IsENQwDajCXggkJ0bn3I9VSY5VSaNV9peB0P2AmckreBy7EfLpIIUAt35+ehrGvDRhjUi4QghRczu0wO0GEctopFUOArSAMlRSxaIDu67rUVk/ziVEOG/Teb9s6dp0SAjaIIeqGXmmVW0UQMs67rq+lMM77ThNKIGgppVoqBDCkSDCKMazLth57AzDHQgkZuq6kcn/cd7Pbw0KKJOcE0U6rGMP10z8ey34cBBGCaCzZuhj2A2GEEJjGQfXdaZ5CTNt21Fy5lL1WWqkU/dj3NeWu0zkX/1ju6woQVlpxKmLyonDJJSYIAWSciT44H1LOpYHNuk7KVMo4jFyJx/0WQ3AxNIsAAF/PCKFsCPt6rY2Sx7J454jSm7EQo1TT47FgDLt+bBVAhI11lFMh2GNZD2MgBP0wolqCd/u6dL3iTNRaBWcY4W3fjA+QYCFEAXA7zGN9xBAppVJwHOHUT3/+8ec49ut6v18/a6lMCARhSJFRJjjPKVnnSy5bOObTSXWy5Oi9tYfnWiOMtu24L0t0RnHeCXU6XZZtfazLsh+E4s1DBEGuNThfaqsVQMwaqDHlXFKtuSEgMH96unAmBz2u2/pYl5wzRFAI3ct+nCbBRMnt8Xis6wYhXddHKYmQCBDQkvfj8DSdORU5phuAzjkpxOV0hoDsB9/R4R73kAKAECGipdJclwKPwwjBIIQhhIIJBC0Ff55mRhnBFDRYSiGEYEKkUtVYiFGIwVijpCQYc64qAMYcrZbP6y2l/Ng3AHGuteR6f+zOHiE5AKCUXEitpJyncy1RSQUAMLuDKK7Lvm22gVZKI5hUWAFCCdTj/jAxzicLCWsAdqrTshtkV0Q5DT2BMIQYrDcAcCkv51Mnu9rQtq3rvqXljgmFGMVcEMZM8JSTNYcxzoe076aW9nis7WvmbEAwhQkmiIeYrHXTNB7HYY1tpSql9u34+Pi4L0RKQQmFEKWUci6llFwTidj6PVcWvPMuoBbHYay1SiG/Pb0UDFdjUs0hRxJ4zqW2RhjVnfrnP/6JINidFUKcn87i938AUO6Pe4wREzQNPSb4sHbfj1jaer830BTlFBOXUslls0csGWFirMOEMkxyrgyjmANoVQvRWsMQEUFIq3/++Qcm2Djz9usn5YQCMoju9++/xQI+3j+sOcahZ5gITimC82mAAG/rQhijBDFNT9OJcooAZFQpIRBCOZePzw/K8B+//6al/vpIQdiut8+co+Ail3zYL4yMq7Xl2viD51JKSpszdCettt0cPoTSoDE7aAgihABEABGEEcSC8laL9Y4kHxNHAOSSMcYIQsoYgG3sh6fLGSBYU6klIQA5F73uCCKl1Pi/W4d1WRdEKEAAANBaizm1VnOthBImBMgVYsiFKCXvYT+OLfp82wDA8DJdgvedHoVsdt8PayklGCOtFadk6HqC8WGtqtWHUECrFQCQJWPnYWJcKMqNNQtsCIKUIwAYILId6+Hd4ZzUclRaMAZhaTm2YaQYD32vOk0o9TEmlCjGXHOEkY+hxCgowxRFH6w3wYdSCkbIGc8F/6Y7H4L3oZYGCaacp1wOY+7LIgVHEPBeAIR2s3sftn2DEBKhqgu1VMJogc1nD3JLJQEAMCIIIc7IMHRd183jrLjYc2SU5QYQIBihBmEuWVA66p5wbvbjw7wLKRDCACHvw74sJSfC2de+KkR/bJsSWmpJDNvMboPfrMENUcq45CF4hDGEFFZIKCfLY02bcdan3GIor+/vzrlSW4OoBB9TmbROsFFGUy6l1ORjjmHflpbz9DL99vt3DFFIcTcm54YwhRBRKnPJtVWCqdTyhT3x5dj2nWEmKeGYMcLf9r9rLdRzRCmlbOh7TJGWihDinEkhIQgxgoTJChqmFgJ4vd+NcR8fHyEkTijSygW3uaM2yLjAFPsYrLclZ4KI5CKnAmuzxu7HkWKMIbZax2HAhKpeY4yJ5KXVWirCeBpnpRWGGCEYQyipgFwE5oPqQgi15VoLSJXAxgmmBHHKrOGcoEHraRhCiIepADbO6G4MaE13/ag7rRQEtbVKCLLG11IpRRACgHEn1Rd/OwQbnWmwEUK+tAepJIxRrqWUAgGIPjnn1+1A1KtSYipv758Ao5QLAqC06o8DY4wRwqjGEDHCmGAp+67va60f1ysGiBA6jxOAQGsNMawFFgCZUgXCj9v99fbJhAYZSClj8uu2aS0hRCnnCkDDiEk59P00XSil1oXcqm8JUsI4gwRXa/djr2aFAOeYEKIhVmNcyWXdDaOMUtYaYFwyxpRQrQLYEKjA50gJ5YRTzFPIAOAKmtKqVRCCjzFSiqQYAAIlZwggoXjunuZhdtYyRJwLQ9fLThkfd7NvhwkpVYDIx6s+FEKIcaYkBRBChIdp+PPP3ylh5lhBrSn6nGODTUiZazMumu2GMdWcfz+/IEK2Y9/ue7CRYk4xnXreD32M4bE8YgyM4KHvU8r7tj72hVLy49vvYz/GEFy0Sv2bWQ/UcG3AGhtLpYz2TQ/dQCnHmJRSICbfvn87PZ/eXz9CioexPnjOubO25NxqbQCUWo11WknJdYoppDgwQjGephOnWMmeEGJjQIxkBO1hS62P+8MaW3KqX1bVWo0xCKEYU8lVcAEA0qpHyFsHYnDbsRGCe90xQjglhNBOqgYqqM16jxFGCEIArPPGHYcxXQc5k9Mw9HootaSU9sOs6/JxvTYAIEYIQowpY4wxTrnQXc8oPcIRg4cYcSaEUoww7/19uX+8vx37XmrBCHGuAK6UIOfM/YEggi9PT6VWG8Oy3KMPlDCl5DxMEEIIUMnVOZdaCTn46NYjuZhzATbGhuBu3GNfCSFDJ1/m82/fXqZpopRRjDHCCBMbw+fHpw++H3stNeU8xni9Xb31hJJt29Zjp4wKxiFCGBMpNBNsPp28D9bYBpoxB8IEIswZY4xzxvuuI5xF54IPDcAvw2irgBImNN2Nqb5473LKzpnDGeuMcQdsECPYajqM2dZ9vT9aqw2CUlvJVQp1mi/TfPIpGm+sdWiFOZdcKkK45YwQIl9Vi1YaQ+u6MsJC0Ptur497ipkLJpkUsI1aP0/jYWxysYFGni/PrdDrtn6df40L63JvAFLGKmilNkLwZlOFiHHaIIJfAnrQEACXy/Pz5fz//T//zxDzv379XSEgmBzGCi6maagV3JY7AXieppQTAhjBOoy6tFpLBqWcL5daas01g9ZKCzFKxcepcyH2w/D++Rn3zac4jzMmHAB8OFPeszX2fr0DAOl82nbjPj7WwzQAKSEFAIgRpYwQgiqqFWBCSmmft0euOaeYUqEIEYavj3sDjSDMKVaSB8cpZ1ySXPJjW623wzAwSvt+SE+Fd/w4bKu1lIQBkJTnFHOMlFDJqeJcMAJgRRhAWKQgjI2SM0bYMAxKKMZJLcUHX1uBoCpGh0EjBEsUSivGaK0t5RCyq7XSkgFCGKNUQAWVM6G7zqcQFrfvx/V+x0wgwghlUun78tiNxQgzzhrEpQKlBKU01+aspYT1nW6gQYCkkJQyTnhwIaYAIF7247E+fEyYkAoxxPT+uVS0Kak7rSto675AVDdKc0oAgJAzRFiprla4GnPYY/cGEzKME+fU+pBbO/zBOP/2/KK4qKlqKQVnJtpWWgQVM1Bra6DAWnyKJdcYY8gJI/jbyzeKWeQpxpxTSaX0/UAIWbe1tEIA4ZQ22AjEfded5nkeBgjR/b7cPj8RI1LKkNKx753WmPDVHt6aX2+vgpFxGBXjhRTKhFBinAbOqHMhBHeaR+9og+DraIwQ4YxQTBihL5eLFCrlzAkee13bpevH89OFYFxbtc6lnLy3T6eT7jpjXYhxc0epJaXsg/c5ai6ef/sDlvZYHutubverS/nb07MUOkYXQ2y51FpqLpyQcRwQYvfr/XFfnHOU4WM/nLUlx9YAwQwiPEx9DG+tNsYIJEBx1nX9t+fnvhu0VDGXfh5jba9vn9u2hhh11317fkEQpeD3bYMQWR+sD51UtOshwEJqYo9Sy+1xq7BO48AZ/RLMjsMoGM2lxBiEDw1WhGAMCZQCKui1IhgH5wnBXxIIQmnf99ZZf7+N08Q4hxA20ACAKSeIMCa0NriZw1prUhi6gRMiu14pXWsx9rg/7vtxQAien18wIgDC7bDbbkIqECIllY9+uV2D973qIDpRxrRUBNPg8z08ainehXU/go+5AYQIAM05vzmXc0AN1BwmrWtttbVaa8NYSpFbDbsz5gAQlFJDCgBBgjBjDLaGEey07jstu04ynnLatsM5jyhlnBFKSymHObY9McUxhpiQUmqKOaTEhYQQMcpaA7U2Rgidep+iT4lSyqoI0VtnPz4/EIQ1Z4JQLiUmv++HseF2e7vfHxTjUirEEAFICWutGmuddynmlEvJOYSUcxGMX85nKfjjcT/MzhgvAESSrDMx5/vj/v75kTPohq5owKSCEMIGpFDnaW4gktePa8ipNhhK7XT3NUEgQFppXHDGaMk55iglZ5yPHYk+DLrzlv5+mf7tn/94upyfn0+PZTfH6swOEccIIUoqaM5Zc+ygll6PVHBKST/0CJPH8rhePzhjWmsAYAyBIZBC7IFSUrRaYkjrsdvgHsvS6y6khCDcje20kNOEIAnGA4AZxjnH/TiM8YRQyGCuOZbIKEOw5VhKqQ20nB1lFEFECQMt1VqMsff7reYoKKu1RR8qqLCWWuv9fm2tSiEgRFJxAOsw9oRRTlnNBdQ2TX2nZE7l9f0159ipTihRavLO1lY5IZ3WORfNpVS67zqKiVQcI7xtW2lZMd5K5kIwShFonNGcso8u5dRA5ZwJxitEKaacEoQQgtZqRZAIrbl32veEMMElRIRzXktLKUPaONFSDxAWhNA4aClEThnCEqNrsORcY86Y0IZaAXVzG47Ue/v6+Q4bkn2HIHYhEM5AqxDB1gBnFAOYcl63xbtAKKklI4gAgi7n98/PdXmkkp6fn06nmWBa29raVisADWit//Hjd07Ytj5SdAgDKWXIpdQCEIw1M8J3Z3LK5jhaLYKzUgvB0LvgY0wguRRP9DRNA4DNx1Bb5oIDALWUnVKcUYQhaA2AAmDDEMcUK6xckRf9fFhHCP10yWeTW8KtCc4woSEFiFGs/vPxeSwbI+R0mhUXuWVQ27HvEJFa6jD0Y9fP4ykEl2MArWmluFZad3/+t39M07Dv5u3j3TmjBDtPMyY0lya54Fw67z5ub3/9HRlj//bnHxjRCqvq9HLsH7drimXoB0SoT2ldFyml6sTn+zshsO9HE1IsJbaymS3dk90PTJCSikBUGwK5JlcoZRVXjPFyXzylBJEKKpdc9IqUIq3UnSZ0CTFSjAjDmMBedUArikgDMKTUQMOM1FZLzUOnJjrWWo3dBaYIQFBrLaW1opSYpxFhXFvLKYXga6kYY4zRPEycsf04Pt/+PqwFCEBMptM8z5fO96Mz8zj1fZ9LNd5Y40KIPoUvzJkL/rDW5xBjkoLP46nTaj5dWoOwmUxLqVVQ2feD1kNraN/2FNLjsezrDgDwPpdSD2tKqTHGOE5K6NIaRBAUiBCmhIpJKq1qhTkXJUQFsFTGCb6M/cv5IhlNwacYmhCd7ikkAFaMoYthedydMbJTBGEMESaYUz6No1BCClka3NYt18XlgGoy3pbWKqgAtBC9kBwSihE0xnj3/9T0X1myJEuWJUhEjFlEFJhd4P5eROSqrOzK7PnPpkFlVT7kfg0oEMCYqD8segD6oUtliTITnbP3UVurtSnEWgqP4Z1bptgYrX+8PT9Kr0K0xAkQgaHmHGO8Xi/HkZBo3Z+llJKLd95q21pH1iFYTbzu++fjQUS1jtbZKHNavNY2urCcpt6bMWaKkzNWUIxSiNRqG5VJDHM7UlGkLi+gg3ExOEFNoBTof/ztjSwJoLc2huC1vZyW5/Ohtfrx84fW+na7jbUSDw3gjX6Zp2BNMfRvv33/7//jv9fa/r//n//3H78+1vsjj57TfuQUa8k5tZa35723UU5tOV2MNtZ+5a8fCnCe5ylEZ70y2kWX07E99+e63j9un4/HnvNX7mowpCMTiDX2er78+1//fV2PUfq259Y7a/IuhHgSwNzakQcOERpfADthHiwIvLhpjvPgkUvKKaEIjL4+npsAEaWSW2tG45c/utVizfdakyJAwBjMEgO8XHhwb+10Olutt/3440/urSqjLm6qvSOK1YqdDSEwM0w0TVFrLYMtobUa54CIi3OtNgbQiryzDHwc235s1loEVFovy4mF38vncSTDfN/Wo5TWu9aKtI5xAqDWaqlbbd0QIYAMEBnGqugiEPx8+W6DWx/3+/O2HztpxSJKGRHovW1b+vPtXSlVSn48V2NMYQYAZnDeTdNJK0VI3vk8Sj5ygbqnXWm1zJNzbs9lYGWQ2vt2HOeUx2AEyb3lXPvg2npuubRcW/58vj1ud0XKGuONVdYohFI6AzTudbRSK/PwzpWW96M9H3c0drRWK5MCIWQUIkGhELzWhgCYeV/XfOxG61pS8FZbx8x91GBD6U0hWEPnJc7RWUsh+DAFBnruSWkSFkQK0TtS0Hk+zahor/X2rz8FVK0lxul8Oiut8jOXVibvBsC+J5Z6OsUf3785b97e/1A4vib1pZR9W1M5vHEg8PZ5+/y8/fbjZ6r1b3/8fVufyzwro1+uLyW3I2dSWoSRKB3p/e2jlPz+8eZdAKR9P6C30zIXnZ1Sc4wvr1drLDOuj6328fL9pZV6e9zqflRSxprTfVGojm0vo//616/H52203ktlhPvHHcfw1jutjTfO2+A9gBhjBrc+WKTHGBDOveXr6aSNTvnopbFnFOE+jNLRWZpDLeFxu79/fKacT6flFJbP9fn5+DhydjZoY0YfSsH5tNRRz/M5xnDkkmoSxCGyruuRktefZFTtnUsCQOGhlZ68m6KHcX0iGdQDILpwOZ1Q0eV86qUBQqoppePICZhDCNZoRDyOlHNBVNa74D0Ltlan4OM0O+vaGCmll/P52zez5bR499fff/zl50+jVM17KbW1NkYHrRGQAVIux34A0ek0v15eg/db2rsMVICaBsuey8f7++3xqL0f6Si1WmuCC6TQO+utAVLVhXTU1nptvY/xfG4ft09nzfdvL0fZSXtALjWV2pxzIU7RuRh8sFYrmsLEbYhSvdZ85GVelvk8WsspKW2C9c6HOvpzfdbakVBrZY331lnjonfOe9PJfn8tZRljDGZUqLTSjKfTsqcD81FH72Ps6diP9DWtUMLp2LUyJK3H8/Lt5TrH+atbZBXMy3J5ORtt5uDSPqeUgPAU/cvlBYQzQfRuXe9vvz7+9sfftvXY99IRnuv+WLfLGMdxtJxJ5PvLN2MM8yDlB3OpOR11jtMQeLvdhPl8Pl3xhYW0cX3b/8//6//sjVsf83z67fV361ytqZZknVtOpz76nnYGBhq5VjX0HKO2rg+O4hfv2qitlFKqJlLGAKhaq0IgEmOMUmg0aUDvTK+9tjq4I0Bw9no6W+fLvrUuCGhIgQiCTM6H6AlQaV1L7YNLq62Xy/WyTFE7Q0pDa946a4whrYxd5uB8UMaM1o5tazX1lntr3ofgrFGKeRhr4hRrbzmnfc+oNAFoYwVRaxtDvN82GfJ4PMfgx/Puvf/+7efpdAKA3vpe2+jtNAUkbK3C4FbzIIqTN1YtUxRu9+dnK7Xl3jsvp4vShrQawkbZwYOYvl1el2Uxzm7bsa6bBtRE53ma4kRIicpOqgszMDAP5lRr4dFGr6WwQmZe1/3t/Zcm9evj4/PzVnsHkOfj/k+t0/F4+/PPkvIUJ23cMk0/z7/PU/jXr/fn9hBhAXDRO23P82KUMcrwYFRUW4lRXy6zoOz7er/fX1+vyzQN5lFbTnl7PKQPpdXpfJ6mudU+mL0N58u5MoPcBPh6mhWS1iTAqLB3sZZCiN8uF2dDS3mUYlA567T3QtkYk45KqKIP1hphzseejz04HWLY972Xkrb14fz753tJueQsgjmVo6THY133LYTJ+XCdL1Dkv/zl335+++3t8+3L6AKIpY/cG3WjrQlOi/Tt8Ww5bzDe3v4EQGOcJuOcvVxfFIEC8tY657XRg+E+PW6f91JLa91oC3YIj5KOz1+/yr6R0kcpn5/3f/3tn7d1G6036MemJu/W560Yf6TURyNDmiiGYIwqrSliluGsPp/m8+Xknb/fsdTCXbZ1LSl/gaynaRLCx7o/7mvKh8gAguPYrLfeB++iVsooPfoIMfzmf56mGVmn8tY7l1YZQRlba2m1a20Q0Rorg9e0lpRJ5Mf3n2HyQGC0zjkDAkOPPmpLWRMPya2u63bkQ2u1zPOPb9+tMdu25SPteUMFr9ezIiWj3W8t5525ISqjwDo/ny+/a+2M/vn6+nK+tlb6KF4pg8r6wCKkFGklIOu+k1bOmDa1KQRn7Bj9sa2f93tpLZXyeDxzK4Sqt87C0QVEXEKc4hynwIDeegUml/L926tz/tmfhHSal97Hx+cNiEotMXqjTHDBOXeaZ+esVtoaBwI+RBaRwd6Gy/nlfDqv+3NLx7bf88iLDNK6D36sj23fYwikqLbWRu2jMPZpiiH4aZFWWm1NKVKKRhcz+uvLi8sh5dRbO/bt84OS2Y3WhtQ5an2efavj5/fvL9ezNsYZ27KhUa3312nyMX6/LI/PRynlyDsCw6jA7I0Rwv/7f/7Pf/75x+P2IGO/hvnW6G8vX92EUZT22hpnRaC35j2EEGsfg/n2eOTRjFY8+sf90/7jn3GeTqcFEb7Iz8de/DQJ6pTz4IGkrXFjyJ9/vD0e9/04iCAGfz6d52UeQ0opbfRWsDQUZwixteFD4CFHStpqQrLeTeTG8CRCglvfSjoY5OV8iWF6fXkBxGN7EIgCrK3x6DyG1UQwUBA1EalS63Ndxxjn01JKXdeVJRvnhHmM0XLx3htjCRAYYAAIlFJKKTK6DI4+kMgX4HuKwTWbfVF6z6WRonEkEIwhKqW/fX/9shVu+z6G1FpJ5DQtxujahiZVuNeawxxbq0TKGuOU+gJnak3zEq8vV03mmbZcDq3dNE251QEyn2al1fFYXQy//f4DEEspt9sdAV9frss0W2tHH09BRaCdLnXej33P+bltQwYSalKTi/aqvbGICgAVamu9UHdOO+3WbX98fPYOpOyRCqcsfZxfXl0Ijcf7x7sxyrs4h2WZgrOmj9Fa9t4CweU6f/v++8v19K8/PtbnE3hMMXrrj5R67URqDlPNVWmlUaWUUdAYZ72Rr2jKPHsX5jgZRU1azseWk7ZqDt6HSKRbKdv67LVF75exWK2MsctyFr4b6523vTdEcc487yWn0pmJIJX0j7/97XFfP28frVWj9a/3j1JKH2OeFmuuWhultFZaiZ5D1Mak51d5pmtLrdXaih0aeEzTdfSR045KHSkpTc45UppAxRiDM9fl7JxVBIRKUIaAQuy11dGNUlkGDk2knTG1VuE+RI5c1m1vowJ376x3888f3+dpcs711u73WxsdUJz1qMBaY50V4d4SNyFgReicC95/ySI/7w9mHq0rUvM8TctCgMbZ2tuRUhcuOWljDRkkbNzbcZDC0/l6Wc6n07Ku6di3++O+HvtArH0AoI9x8pNzFkVS3lPOx74jsrV2CotW2liTamm9fJ1ha81f69Dae2s1pcNbB8LeuximIx239d57O5/m02lutQt3JLnfHgJstG+tx9PstPHBEWDO9b2/MbdpcnOYY5xDjL1zqaPUsR9ZaUOKBnNK+Xq5GOtGb0dOt8e6rY/1SKVk0mpZTufz2TuvCVpr3DsCISqtlHdxmrrSxmibchGRl5dXZ00u+fP2XmpGra/Xq3udjDaEZJX2IWgEhaRBO+MYQBqDYRTWigCx93r7eAy8Xy5JOdv62I79uW2adPCsSfVWSx/BGe5jCDDiYBkygAEQ6mhWK32awxTWdd2Ovbb6+fkRrDWkgp8Jo56iH5q/v5yu51MXaSX/+tcfj+ft+/dvoy/H9iCA1jLLIMSU0midhELwMgCQFJkQJyRF2Lz2zvsYFudCb62V1rnzGF1Gre1Ix5aOUmodPdea7kUpMkhHPhTA73/5fZ6X15eXcYaWSy7jqOl2v93u99r76/VqtH481mN7PNdVmE/n5Xw5nZfTMk+dmTkCcC318Xg477TWzlhEKrnW1ksuuSStdIxBmFNOadtbLVOcphjjNCutl2Um0sSyHwf3UY6UxhBgAihHEWBhUM4Mli98+RSidaq8fW7Hdr6+xDDFGIVh23ZBOo6t1QqAStGoXUaP1qFA9L62XmpptX183olUyjmVsu25Se+9TsG/XF+NNdM0B++BaN4PBCwl1ZbePt+ctcpaRnbOWquEAUk0kNVGaxrMcfLWWy36+/efxobxRo97Gp33lI+chnCYojc2OJe/RijaaMI5/OadO59OmtTovO1bCGaewnJajpT/eHvLR94fa+dhnJ3jNJ8Wp90c41/+7d+EBPW/QH3u+TidptP13FsbyxkZv6oPwmysfj7ut9vteb+//euXsebf/+0/Zj8ty6KJct5yKtu2Tst8Pp3/j//n/8Mb969f760Vo7XRmplLyrlkq6wCFIExuPRxOZ9djCmnPR33fRcE7gIEyjtyTpga98EjOGdd7K3db/e8H8/bjQfHOOUxXns7vVxfv38PISLgGP3z9mmtPi1z723ft7K2krMN/nG/32/Pj483Yx2P0Vv9848//stf//0/fvsrEKbS9uMAZP2ymGBaq8pQCCEfSSl9Pp/nOJea8r5t3iqjXAi9S4xLiCF4OwDLUdZ127Ytnw/vvFYKNV7Pl+8/fh4ur+u+//q1HwfLsFZ756boUZEiZJbe4bworcN+HCBklX799jrHKU6x1kqo9ryX4xi95yMpAO8DCuRUylH7aCmUeZEvOHkpOdXCzDLEGD1Evo63AogKB8OWjtFqKW3vh7GWCPuAzmMAaKXO89x739ft159vuRdRqvfhrNHG+hAuy0mYEaGV/NyP+/2p7a/vV75crjZ4N2o58ro9a29W6+Bd3g8e49v1ZQohlwKIpWRmSCnlVBTRHKd5ihulL3+LIrXn0pq01smYlFPvrdTey87cg7X/+3/9366XAFrnMXLOpTeyBkiTtorwizt75AxQauulpNZ7Li2lxMzROq20QppDcEanXHI67o/PVBKSGh0EoI+Re+mDfZiMVkBApJC0IrtMizPBktHKIOLog8foIiW3UgsICNGxbc9tAwVozBgsRIzSW3///GREQiJCozSIcO+gQSuK1hulW6kVpLNsx9ZH76OKsLdhOZ2mGDyDQkCibV1br/lIKk598HI+69fLHFy8zPNpWUqtb8+nSFum6fV85lFvb/d125T+TzhJOvKjteg8I7q0kTLLfIphqbX8Ot6vyxymGUQjioCAFuzcWi+tAWKqdT/2/UgCsqc8ehcUi+gMfUEWxmij99EYRARHysfteX/uGzM4c+DAIT3nbfTuvSVErdQUHBFwLYrUskwSgzeKSIXgldK1tlayUXT0+sfbP19fvhmNAtJqLiW32r69fr9eLqRVH12hcsYV53KuqaZtuytF315fT/MJAFLOpZSeCwOXNuY4AWoEVkYHF+c4xThZa8OP+e9///uvt3du7fZ4eOe8t9Zo74w1Rmm01voYS2tHzUc6BHTKNedWeztyzjU/1m0v7XJaGMh5d5rnYNzo7fG4f95uuRStzev3b8s8T8GPwb1XrVW01ofw1RZGpCVG1NYoX9JAuJfOf76/f6yPwcMYPcZUVUXglvP7rz9//Paz5n0O8bJMVqnRR69FRvOE5/N8ulxWt6/barVWpLSypJU1XiuNQM4HUhYQrYvBJh7snAfUhDBPFxmsAIuuvbVv3749njcZTSszhQWIEBUDChMjipAIGe1b6Y/7/fPX7bxcCGhZTse6Px5PZmAeWmkWHmPU3lM6XKugtGrjuT3Xfb09brUVYZiX6bear9er9waAjDHOWkv2j3/9ua1bybnX0UcvDEMjGpNqA1A8GIW3/eg1wxS/X34g+c/H/+vX+7smpa0jrVvtrbR9P1ikpnKJ5/Py8vP3HzL418et1pq24wsjSQhLnIPqzbjU8/V8HQL3++f7477nzfhgtDVKv768GqutsXX0Yy/rut/Xx/vHR3BuXuLL9Xo5nYVZfWHDU045Wa3CskzRa0Va6+C9iExhbsIplSFSaqu1AUhpFZNoZV4u1294uT/Wz4+33GrvVhuttQZAYSxryzk/Huu27/ftWUsXAEKyRkf0lrm13ttRW23CbdScM49eW9+2lUidz6dpOllre+vr82GMTakC0BSnuo4jZRa2SiMCIViro3NaAbdWa2+9HDkfJV3oZZ4WQB6t328PpdZ//7d/P18u0cXjSKiw5vxYn8652/1Zyq9yZBC0xglirU2BmpfTn7/eh3CIMyHJkVLOj3VFgFpby0dwVqO+P5+NodXaWQBhfR57yvfno9QCINZa1VL581+tFFLGGtN67yLOWm1McN5rY5QCkDEGoDgXUskM4LRmbseeSs7KktGWFA5gAiBFr9eXZZ5d8ISq8ai15lRC8MKypaPUXGsffWhrc62AuO158LtSmlAZF7octfc22Fq3OG+U0aS0JmHWRMF79ZWzYmmjldSPevTRtCLnglJKG6VQCYoQCUs6DoV0Ol9imJ570su8tNzXfe29W+O/1v0/fvz43//rf/v1+f7nn79KadR7iFOwwRmPXxDS3m8fN2WsInLBRmsU8HK6oFL357buD+e8Qjpauz3utQ3Q+ig5HzsgOWO8sYWBR7fBeq1fXq5ziNLL2597q52UYlE51yOXzmKNSb3WR2qjKRBvTAyRiIzR2pneWjlKCB5EEEgbo5V2zjJDb/3YU6plWzenwhLnKU61FXG2lQ5CMQTn3Z6OkvMWfOvj9rg9ns9aai0wB+NMdD4CYa61tlY7O29eLuclzEaZVAsNnOL87fsrAz72vbU2TfNz26IL//ZzTrnMITpvtFEgHZR61GSGaYP3Ut7eP3rlY8+5FGed0c5Wt23r7fNeUmZhlsYAL5fz6XJuvR9HyrnBAOhCSCgkowPDMs8vl4tzrtZ8h+e6bmOIta60sR3b7XZ/PvcxOoN0aDGGdFosUbTWWV1KPtZNk97W3WhrrU0ptZRDiFp9tdK8sqaPwSyi9WgcpymG6dj3++0ugGtOg+X2fKaScy57Tx+3T6M0CRAhAR7HGp2vrf748ZPHkC6Tf885tdreP99Tzk6bWo+Wj5freVlO+7b/r//1f53i5f39nmtNpVk3jLM2Tuu65ZRaqza4yarG8tjWdPu8PR6p5iPl3PIYbT32UgoA/Y//8d/tN7Wtu9FKsS5HeX//9H5JkttIH/d7h6Gce3veaymjQ6+p1q6F/vKX3+9+7QikDKKe4jzFGQdM3r9crrf7vbR2Xc7Tz+XH9x//9S//BbUC+l+pZF3VP//1vh7Py7J8GQBBSa+9tNK+HD0A//z1ZrR+uX6bQlyPNXJwznPH2nqu7bFu+7E7Y1q7THF5rFtpXGt9e3t/bs+cin+9eh9QUapZtYaEQsAi1oY4TaX1z4/bs26f9w+R4b2b3Hw5Xc6n0/255VLW4/DeK2MIv0gM+nw+i0ittZT6uK+P7TBWG629cwAwzRMLpHJs+9a555ZzSkbryU/OhtJKrT3OpI1VRJ3lfr8NBoX6fLr0zq22AXSa5/M0KxBr1PcfL/McFVEffJQdAfsYffQwxRhC8PH+fjOkFCprHE0KSQ0eSmlrg7bqa+NVoRllQejz8z5N02k+A5Cz7v7cLtfTMs+Ct21ft3U3RrXeogvn88lqWp/b+/vHsScm1Nalo9wezyOXARJ8nEJQiPuejm1VSjtnlVHWmBDj5XqZQgzeEdLXGqyk3FkYYDLmfLkabfKR/vHPf6Xj2GQfvVtnT/NsjCWrpvkECojUaMWA9T4s89xac86VXB/Px1E3Z8zlx89casp5tKFIiwiyEFH0gRmcc8E5FCAUbwOM7qx1zn1VLNsY237sx5F6HtyDdUh6muaXy8VaX3L7eNxrGTnXIWOIWB96L9oHnVP94+9/CzEEG70Nczw5F0qvb2/vf//b39uA33//bXLTspzP0+yjTyn/8x9/f+wPj0jGKVBGa5zP3vv78/nHH38HwN9//+s0RUB4Pp5bT63kPtoc4xIX68wXmhVBxhiTtf/+l798e73s+/HH7Z+IyjpP2h6tCQMgsQgpqq2MPoCUCPYxzst8Pp+j92IsDTZaS2cWNqS/So4igwidNYpwtgGRvv/201n/3NdkPIgpOpPSpbZ927e0kQIivW2rMWaOUwudEEqp67ZZbwdD6SPtSdgty3kwp30tOaeUe07n/RLCvKf0/uc7EXrn13w40oikvbHWA8KRW2+pPbcBrMjUnO+PXUbvpWltr9eLtS7X+uvDvL//Okr++LzlVujrvun89frCIKf5MkbXGlGAecBgFBhNUqqp9i1tt9s95cRDrHExzp3h8nIFrdb92PZ9PzYRABalVQjxsszn8+yMqaXklN/e3hTRf3borHfOI4L0Nvtgv/+slVNurfMynZXy67o9ji2DpF8tj8wgpTYCKPcKyFppZ4ww8Og0+uvlMufp2/cXBUhCWqlfv/58Xx+39a70hyWtCa0i7+35cr2+vny83260b+lAoG8/fvz49gqAqZb12Ld1FZHLWcd5tgzrvt2ej3/8649KMJgZuHd+rLej5NPp1Nr497/8JcZUtx1RLaczADFgSvXPj7d0u/XbutcBCkpOqRToQ5M6Taf7uqfyt1xLb1VAaeMQqLVhnTtfTl1k6sNpE8PpL7/9AILWKg8hpUEhaZVy865prdft2UYDovp8pnykXEbnNgBAvlia67ojoPdlMPfeGMSHQAKInHL69fbrdr975wFwfWy9syLVGtfeG+OxH9z64/4IMcyn5evzeym3x/0ff/yjphSCFz6NOqY49dFTTl+zaVJakSYErbUGFadJEX3cPlpvIghEgNgH7/sRnWuDabTS65aOUmupqaS8zLO7Om2tbDdhGb3z6Fo5RAQBrXWYQmX2zlptlKavicIUvHPGKDNsn09xeXrG0bnnnJ6P52mZvbbReTidam2jDRnMIK23lPNgvizn5TTXUqx2Rj0+P+8DOJf6/nHb9pxSTq0JCKLS1k1hWrdnyWV0ZYya5mmZ5zh5EckpN4Hb/bHfHrfnWlu32sYYX15eXs6X4N1xHL9+/VFKNVo5b61yS/DLcpqC18bkI2uiSpRryaUgKWs1j2GsG9bEafp83FPNSNRkWGu9tbWX/PkmPHyMMfivBJHWmgd3HCwDQLzzyzRNYVLb3nq12hDpzoyEznkXfO9DhjCI1soba4xmZOcdEpZS9iPn2p7bdnve++gMY/R2bdfgPSk9+uij19ZzybX32opNJaZuDOrBvD8ePEbe0i1/nuarsSbU/P75yYPDdApAIrgee+mt9nqlM7Mws3TBIcoIyWhjjNruOX98fLZU//qX37+dzz5MIqBEce2alNPux/XbsiyosdfG89K5EcLLeXm9no02PIb37rxcjPK1y26LsNTWBJXnEXz03lpFOIZVJvhokKQzAGijj30DUALogpuCR6AxaqvduRA9GePaGJ0715xLzrUM5oECCmpvx7YBQNpyG80Ycz1fo49jjPvnx2O973mdT4tC441Dj9ao3kret9v6ZOZUynPbRcu3b78/7o/b85HWY1q8C6EixriA8Jb2I+c1rYP747EzsjGOB7eco7fLsihSztlpirrpXE/Cg4FRRt6Pz483jaiVBlSA4qMBsa0VrclZw1ofR16f27YfW9m2/Tj2I/XCbSil5nl2JpxOp+DjvO8ft5vRxhg9h+C0jj6+XC8vlxdUWI8ETPnYe+8EqAgFpdYihyTvtPkiMK/b8QQymPdUPt/unwNlK/nX86P2JqTG6EYp/qq+SCVEBaARLUppFUG0wZGKIGmHZLCNPtogoMKJidBqYUbElPLb++3IZU+p9fbf/ut/sy583O6fH2/P51pyAmAEEtCM9Nj3dT0ay7oXhqGsEYEG8FzT7fb5/v7HX3//veZ8HDsLDB6gUSvjlPJHEKI2+Ljd66i11tKqN36Zllz7v/71q/USvfv+43vvbJw1ziKB0lZZ/00Z5uGU/vbybZrm7bn++f7n//y//l6VHEftLIz0yAkBepdUkzVO0nHkxAytFmG+vL6eptN5noSHDP78fB9CtdVlma6XCwqU48jpeN53gM1770IAJFL03LcuTFYrReXYem2t1W8vL/P5RKT2dNyf63N9ch+vL68/Xr+HMM3RT3EZMuZ5jtN0f95HH1/9clIk3GtO8+lkncN9n+aorEUi5q4RrTEowq2P1r2xKIgsqMUbG1xQxghKLUWYmWWMgQLGW2Nsjz3X4p2NIWhNGpEQvDW5pm27KaWMVq/fXrXzz23N6bjdPlD6Kc7WOUXKB+t8QJGcjtvn4/3+S2stPMgQAnYQ4308T6P3MIVc67Zvz/t6lFRbPdLugxPC4MO+51ba5Lz3Pjj/8vrNWfe8r3XAumaRKoJG6z5GbU0QwjT9+P4yeteI27ERAiDOYZqCG62WYwyrCVFZV2vrbeRUGBhgOOfrqK2O2jsS1tZRYRutjW6tIWFEaiWFMC3nU3R+sLjh0vH/17COFmNYTkvwQRFZZ3tv67EjjGkKxvrzeemDUyrIzALWGiIkZaxz1tjaRt7SuqcmwyrrvdeKhFnG2NetllzrSDndnvvHx+deDkJcj5UBDLBuZfz4+frvPv7555/Hfmz7OsH8WB9hCi/fXp/bcXus674LgNbEyC+vF2fM5bxMk4/eeuu1wtbHx+d7b32Z/Rx+93HqtRSAltMc3JBlDI7e/+Xnd2Ptuj1IIxIZ5aZ5CtYSUMlZsbyeX2OYB8PH5x/3zw8FoACkM7fmT9NlWQwRCSMi9/b+/ma0muZJEYlALkcpbeHTeTm3zukotXzxwZWA5JZrqrnk53NrvSGoOE3zvLRaQ/DM4pzte3PWB+cRURmrrN3ej8EDrXk5RWesddZobYN5tLId22Ax1gyS94/PwXjs6f3zQ6PSRc+LPZ/n03LOOf/59nZ7rlXG11mGGaK3WqnJB6W1dSZ465wJVo/RpqCdvjBArfnYt1rK2/sbCSChd34KMcbZe3N5uQbnau2l9Ofz+dy3LaVcU6rlyHn05q3tg1/O6P03QwZQQHiOERGsNijDW2u1aaUiYh/DGC3OKdLAI4RASh05YUvGGUb4uK+/fv3x9vZGzhE9Ummltr22o657yY0HETHzADHaEClhqbUIsAP8QiouS3w5XyX02/1zjI4kU/TBB2+9IeytGKN8CKfz+ePj8XG/P7e0HdvpNLfeU637cXzeH/u2iXRFat13VAoQS0mK5Nvrq085915qYgEt4hBq6Y/H+v7xtq/b+x9/9NHHGEja2FBaO0ruvfcxWAYgz/M8C3gXnf1KcI10FOcdI4YYpvlsnOFe9yP1VjTh99dvv/38tiyn0eTX+uuxptvjkUb/fK7PtJMyKkPvo/ZOisrgWkvvQ0R6695YssYFd3m5yhjbuqWtIMJpWaY4GWtljG3bSg4iICCDuY1ecs0lr+mofZBRhASjSWdEMNYKiwB+pYq1Vv/+l7/+/Pnj5XJxxgIAMuVRkUhIldpyLY/1aY1y2ihS99ut9krGzHEGAJtL70Mp75yeffj9r78Ly+32WaqdGWrJh3Wn0xKCN8YSYWl1itMSY28dWIxSL+eTtRpAeisAwxh7Ps1GUymp5vTkMc9LcHaK0+Xa39/ef/361Wq93R/cx+V8ssZqbYJ167b++nj/5x+/7uvd+pBK/3yuBOi9RVBIykXDiNueHs97Oo6cE5F+bqsgktJAaKxxJl5frs4564wmLYP5K4OMpLWZ4pRK2tImKPuxdWmtFBQ8nRatsfYarfv2+m2OsaVSciKjjDI2eB5ijSGtcq5jP+Djze1bb2Nb9yOVNkZORSmqz4cmmuforQOGbd9FOFvrj4RIg0c5ch/dENjTaY7eOW8QnNO1dSTI6fDGnE7LsizbkXPOdTQQwc6ojdHovIs+CMq+xNKb1Q5gUoq0VTw6Ev16+yUsXYCF91TWtHUe3tpj30Zr1yVqErxcrt7F++MBQN9eXqdp9t6/vH5LqTDiXtPzuZaSjNHWuSMdzgUX3aKn4O3ozNxQMMZpIvTWA0BpbfvCaBjlSM7eCcDPnz9fX07rdqSywgBEtMtZIdTR1u3BrRNqh6q1mnpLLZeSlik473prwEzCGoAQiAgYnutKKDF4EYlxCmHqnZ9586733pVSImys8c4A0eO+Pm73Ne1HSdu2i3D08XI6O2XIwvl0Ye6ECkScNYN7aWWw9NGtc0Aw+2WaZ6NNrw2QFVEM8/Xyuqcdib69XnNprXQe7cfldZ6naN1yPn37/hKn5df7+57//ljXvZQOYo2epkkhRWdOp9M5Bmct95aOJ3PhAVph9LNSVFuwikouXMdgdt55Z52zws1oY7Sy1reeSimfj3vt/Y8/fx0lA6F3do6zM9ppmmJY5hB9tEnH6GtuAEAsrRZvTSnl8XEvLVtnnfOChChhDvM8t15Y5Esqklt7+7x/3u97SU6EtHHGC6r7mnIpIqK1ZgYiBIHehgijoEIVjJu9i5qid04b7v2LE8M84jS5aSFlYghB25JLTisR5tpAUZzPe+6DkdDU1u6Pdd/3UooiMjpqJBSQPpSm2btgLYjSgANBJK7bYdT8cpqdoSl4buX5/Lx9fO773vuI5+Xnj2CsJg2aqLQajJ6XOfigtBYgRFSECPjt5SWl4/68O+Of+RgH7+v92NdjXa/z4q17eblu6diex/1rzoPqud1LrqOwjYRCyGxIIWJLpbZmjFZaGVQxBKPM17lEWxPnOGSwAAooTQDSWgUY1hrvwhdlvZbSRiOiy+mEqLXSiKi1AsVaKe9DnOZ1P/YjlVKUsvNyPp8vy/lkjSUAZ3wq6bHvxmoXXEoZPj8n79Rp8cp579ORwkLW6pNagg+t1S+p5jLN59NJK4WE98/P3tlQeLmcyRgebWs7ES3T5P10Pp2F+fbxVtK2O2OtcdYsp9l6Z7S+nGZAOB6Pmo/eitU6xjifTp1l8Mi13j7ee+05l8NkmpXRmoGV0ceRt7Rtx+7GWNfVGD3FYIxBJKPtNMfG7fl8rtvGfbCg0coaI8AsjRRezvM8T/M0fX99CT7kdKSSP263+/Oe8sHSldFYFQD11h+Pxz/+/rf9/gkCX7+Vt35eluvl7I0rpJSinCsjtDbCFM4vV3KWno/W+n7klGvw0Rhn6nCGuXOtlUCs1k5ZqzSQjNaObU+UNlqDj0bbr75qFwaE2hsDaEBnrTJ6yJin5cv4LUSppM/7LZUqKN7aybkYfGxVO6OtmU5TaZUZWABwGKPDPFlrtm0trQ6Qbds/n1upZYphCkEhxRiXU9QCUI7Egtz7y/n8crl+wR2PnO7PfYhYYxWZLhnGuK/P//WPf8zTdAoBfaxtk865/GdTNzofYhSEvj5RoXDjAdFbqqSsnacgg4+8j1JQGRmwbasIe+8UqsG9tlpzUy4rY5Zp8jYcKaect7T30U5TDD6M0UDEGk3ISqF3DgWFGUnN87IdG4HknDUpAmitdgBQ1Frb0na/3XNrzIyCw0jr9bHeUYAAWAgRtTIsUlvf973kUluJMZ7Ol9NyitNstMoqp5KEOxC+vr7GHN/ef1nnp/MCDBouwYUQ4uUUSetp8qSUNXRepjp6vd0UoPVuWWYCDEad5uitQ+YhUksZvXnno9bL+WS02fOuCLbHWmtTSMtpuVzOztuW6r7vdFO99VTKdqz7sZXSWq+I4JwNwZ+W2Rk9efdyPU3etl7zvu0pIyAC1joIQAHlo75/vgnwVb2yZiLlo52mSRtdWq69MfCWsguh9QYgk/c+zvO0LOfrfTtKaaXX0psCQpDObLRGRE3aKhW9O09TdNoSXk8TEd9v74p0KbmkjEovYbYhKFQ8BiH2xk2avj8ElPdTCAXvj9LHth+gNCD8/PGDAFiGAqlHtoa+ffsGArWNx7Y6exalRPgZvEa8XM+TNd9fXwGYhFurAoAEvQ5mGSRG6/kcaYVlWn58/+6DrbXk3Af3McbldLmeXv/4+OOfb/9ItTaRnMtxPFpp+Thq4/nXL9FaEe57zkf6fDzW/LRWXS4/GIgUgmDJeYCgwlrLdiTnnHMeBUDkejlZrXur0tTXzikdaSACS62pHCVGH3wcPI58yBiKkER88D5OYwgSaFQoIl0AgIcMFhTa172WQYq3fb3dnSKMIQTnwILxborhfD7VWvZtq6V4TSjgg1daqZSU1gAqRq2/GvAA3Juzxir0zvVlUQh5Tyystcml/v2f/zh6vSzn+TR3ZoQ+xTiE3z/en9tzuZyFQRFGZ421RmsA/tKbjD5qa62UWnIb0vtQWmujR+/MUmtTSmtt1n3vvddcS8osAiKI1FsvtaZcANEaU2oGBbkWAPDOa6MBwDgXp8lZ+5+RNUWXZf72+tpbf94ff/z55+1x31I5jgwKx3/uw0ItZd/3X8A1xznEKUYYwxqlFbZSa6712LfjWNe99Rrm2cd4Oi3G2D7G47mO0bS2r+ez8+F+f96ez2XqzAMQgnfWGqUIAXppe0ooMs3TPC1D5H5/pnwoTUc6Hs9nDDEYS0gszMxKk1OOBY49b+uxp5xq7dy3ktek5hwAVRudBGttqLHlymOQoimG79++lZKPvLNw6a3UisBTDJfL+bKcjTanZUYRnUvO+wHrqrX+/fffTIjb81la//P23vsQFiQNpKwNiqTU9vZ5y7W0Mh82W2vqkaR3rVVRpdfKxMb7mtO2b42rFfFTDDOhUmP0Ryujl+Cjtq7Xvm2bIvXj9Xtr7diO3jsgtqPaEEgpiyhiW29O6/M8vV5fjLH7sRGSUkhk5znGGHjA6PXYN23NeT4551tN21FKrV9WWBbY1rWWZrVTSiOQCMc4g8Dz+fwaeQfridA6yzxaazmlkmuXcTn776+vqHTJ+Ri8pzXnREoxiyJFxsRpqrmdltNlOfkQonNzmJzVtVWW0TrHGH7/7acN0VifS9VWW6s14DKFeVqiszB62gc3cKSx8+BmFIbgGPvoQ+Jwjq02xhoiZbTWUffR1/tj29Y2GETmGFGOl9MpTJP1lpCWZX45n2IIl/MSQ3iu6/P5uD2exhgCZAZvnSnUaofBU1iCjSDS+yCi2lsZPeUqisaAI+WhlPVuuZxAkbVuitN5no+coreX00wrMIIJGoQQIbjgrDakTssUvVuCv5yigiG9PW83ARyD91RAU23dtlpqPbbt2I/Ra5xi6iO4eOR8tDJAWmvPbT2OY5nmH99fjVLMXYEUlwA4OFNqnaL19opKdxEkmsLGo76+Xs/zMk+TSFOkQ3Cl1ujDWss///xnrrnkukzT9/O1lHI5xevl8s9fv/KRQJo37nKahZhF9meqcDy2XQR7q8I8gLZc//bHn+uRjNG9jnQcpRXu/XK9vn77ZnRQWonIfmz52JsA4PwTiQWUVkZpo9SPby9TmKTXlNIQDta33LiWWoYwe21/vLwCqtvzLizeWed0cM4776e51FZqkiHAgIYUkiIatUcfldLH/qmtqa3kdGzr8/p6OcV5igmNAYF5ntJ+jFo10hSm6IPRWlgI6UgHi4QYvV+01iIySJg5lwQICiB4j0K5FmE+0r4d6xIXQ0oaZzlGTTVnTahIpW0XYaXtfiQkcmy1FhnMwmGK3Lnm9lzXIZJqezyfrQ7rfMcmiEQYQgzefX7ejyOJtDD5+TSHEK110rmOVms78vFFdNBGaaXD8vVXBS46BEJE76yxhhC9NeeXc/D+fX+/3T+Pfe+dR+sgPJoIIgICCxHN1s3O/3j58fP1RVvNfXAfNdfneHDnktORU681176nY1lO8+nknHXWfvXUrHE+hOV8VkaTRhEx1gbvSJEIj1ZaGax7iMEbO80LKDr25Fw5Dl1Lfq5rDMF6n2putZfScqu5NkCsfKRcH/ueaqssqbRRiiYYzN4FABmj11zqqASKmRWBc8YHDyDO+O5E26HJepeMsWEKL+dr9CFOvtSsb/d19O6C/+vvf0Wh55E+7499Pz4f9z7GAEBUzPwlUxbEVCsVLbwmnUkAmJ2ms1uY+5ZTk269P3LuvSOQ1jaEGKagjLnd70gQQvBxJlTsBrfxcr7O8/zr11tpXYForXMpenSFgIjMg2BcL+dlnr33uVYUMc4sU9SExuoxpI+aSh29nubZKGO0acz78RWFtKJBWJh5joEnbK3XXAVAEJglTpMwj9ZyrYGUcUZEH7kiKK2NAg2Ie8q19dv940ip5oIkzvlemw/eB69IaxpW6+Bc8D44Byj7cRz7xjKY2ZL68fpqlMXBH/c7WuONDj6eYphCnJxFYW/NFHxvo5dWxzBKKyKFFLxDgVY6oTJaWW2csWiIEDWZVLLACMG54Kw1Zj/m04m0RpDLskwxWm14yFdJShOdpxORarU2bqP1Ix0albV+ilErdZSUaqnPjoigxCjtnK+tK4S+H5fz6eV8QUGlzDK53rNCmYMiDAb5i/yLShulpjhZo6zSzlurcA4hOs195NZ7q0PQGGeMfe7b+3EnY5FU2o9930NwQrU9dzTPXNux7cZYIpVbtyjqTCCsUCkUb+x1mpBocNtbcc5cT5fS+fZ85lL6qMCcc/Om3G8PUhLD9Pry4/HcK0gr/b6+j1bnODnjTsvES4zO9s6E2Ho21r1ez0qrt/df729/NpbHtndhRBQBpRABRdHjOLYjE0gfwxkdvVPaXc+n63LSSmutiDA6fJI0Zq1VmGZNmhEsKa1NsJaF17S3XLQ2SvvJx7TtbTRn3WmejNEMGJ1DEXZeAzECM/cx0rEf6UBCp51TJgSvNPXa2kARPHLhfCxz5M4i92mKzY7BTLX1mjSK1WS01lp96XlbG9u23bf1uR+dR4xHKukLkqgQNOlcqlYKkQCx1tZ766Mj8v/xH/9NSMkXzJeBxxAzjPGv19eUEwIOkC+FqlYKBouwVloHdaQ8Og+GfU9Ha8/H2gcPHl+SCqVVmIKzlhTUmq0zZ5it9afTyVhXSz1Sbq0rUuuxC4gIKm28c0SkNQEoERlj9MFBaUM4x6A1PbfHx+dHKXX00WoVZq0UMrfBCKCJTstlCv4S43/89T+u52k0/oqH5JzTviMLIQbrwHrX23YctaScDChdWyVEImIerbfRGxHG6BHRaB19+HIX91KzObgP522MCxAduWxjt85qrffUWxvPbWdGQuTOtbVcW62j1NplHLWmWgZg6b0wt9EBhDBrfNTegUfLyXhrFJHRCvELtSvA0xx88K32w6ZkDRJ5706neYkTCwt4PQa3PGrf392ngKzb8Xl75JpKqqW22nqcotFOkIBksOz52I90nmIwTlofvb5eFoV4mmfjzGjteXs4Z799/+a98z7YEL+y5Mtp/nysrZXBYIzFjkbZKcZSWmsVRYxxWmutzdf9bggEj965aZmVNrmW5/popS6I1loMttWyb3veDyIMzgEAouS8G2vO8zI6a2uQqNYxzzMSOe+YZd2Pddv2bWvGKKWEqPfa++CSFju3MVI6Si9KKWSpvd4+P57r83G7d5acEhIao6YQvfcaYIyhEGFw2lPO9ZOl9pqPrdWKKAgYv5yUli7zPL5Khp01AALUnBQMTYoUeT+bGY89US5EhKhqqinlL3rtkIFguu2pFBBptQqKc1Z1rr0prelMy3LqPFpvAMDc9217jk4EpEgEx5DRR4NeauXeYogxRPnPhg4ioggeRy6jt94YhzFG06ZJOactccnGG3sKk/XeubjVw2l1Xhaj0ilOpJULHkAphVoRESLK4FEbJxKCkPat1ZJT10rFYGM8Mcvn7RmNmeJ0pAQItY3cnq22XKt3QVi0VqVVF9wUoreOEEpJWJuZaLleYpyf27O05l003q+P9XZ/3NYVEAe39/stWK2Mejmfr8tFEOI0H6135nzkZZnPlxejjdH6+/cfXz27diRg8MacTmfUWmlSSJOPjSHlTESA6LxZ5iU4u4RAwmnbSinLaXZKB++/nV6982MMFtFIp3kx2m378UUgZhzeOKUQuefS9n2tKVvjlQD36owL3qkKc4zOmy6jlLode+1VGLRSWhlA2NL66+3P0cdpWoisC+Zra7WnxKo+t/Wxb87owagU1Jz3I01hPvbMozlrtdJtKjVXACGkMYYI19KEsdVWeq29bMeqiRBgiuEUFq3VWkuvvY/BIF9m5tfL6zLNnTnXvB+dAAi1Eu2M18FM89R5bNuhyKL+Kg5JHwOYjbbGeh+U83Fdn4/78/5xbzxGH0hyuZy1scbYMM3z6bTtO4NMWoUQr9eLMfr52I59R5R5itroVLIictYE74w1IjxGZ2alSAMaUiEE731rfd/2fdtTOh7rs7autNaohohzajBPLiznU3T2337/7b/8l3/j1v/484+a637suSRuw4A6L4v3rvXGTMHaVPLj/llrf+6HsLyeXxng8bzXUkuv3LtS2mid9iNE76zVShGRcWaeZybqraeStCasgKQU6nwUp8uoo5XKzEDEArX14yjPba9j6OhIadKDmA2S8OABR84oYhUSojXGaouC3hgefGwbErmvvKnwVGLOrbZKRAgAzENGL0l/fz2v9/3tfv/jjz+B4Ej1cV8F2Wgzz9MY0HvvrSOQtabUzIPnabLGpJzzuk9TyL17ALLaBy/enpT68eNHjKGLECkTQgheQB7aIOlj30sfhvSQlglu94/pdDZaB++Nss4ZYy0CGm+JqLPkXPsYY8i6bo/HJiJ1jO3Y4xQJJKeDBlzOpxhn6y0MqSU5Z3/+9ltvI5dypESAU4jWmtP53NpoLEfJjVlaeR4bAnIfPEZ0Thm9puP+fIwxfPDWGKU1KbLOXV6urXWtVW8teP/jx/fX19fg7fPxLKn2Om7pUXsfIKP3/sXn5FpTCps/TadpmadlIoXvH7eaS953DVhBno+uEa3V5+Xk/RQismDOpTbe9v328RjcY5hImZL3VApoHLV2YQUkCKXU3psyhhBciABQctZK7dveesvpIMLr9TrPJwHYj73W0ltzznnvfvv5HRnfPz6I8OvKwcz7kXIteTRCsVot02zcaQjue4ouhjhZazOPXjsIAqBVRFoHF0jrUju3vm1fihUUENK6FptMIxJFdLpeiUGTtcYyoNPWGOd8tNZsOBQqZ7RWKsboXSy1HS2P0r+OV8Z8GSK5lIoAR4rWeWucUZZZjpS35367P7ecrfN9wLY/cz4Uwc9v345r00afX15sq5/PJwgZ7Y2x0U8vL1fvfCESHiknjcoaZ4213p+Xc/0uMWW9rs91V1rNy3w9n2L0Rqk5eKtUyvvnx4dz4TLFy+nqok8pPW4PVOS9V1bX1vZUck6pJFI0BR+CN0oTColE7xUZZE5pU6oiiFJKRLYj1edjS+krrvnFziQi55yz4S+//97LQIbzskxzZOE+5H57HK2klq6XJfjJecettZrzkdqpe2VP0xynKIBGG0T1eNyNNkprY6xSWh7Px5HykdJzRxSrKFhrlGmmj96O43jcn7U1VMooFbzj02AQIgQCq5UxTqPyPhhrFJkwLV26ILVcy+gp7X203juJOBt9iNOyGG3SkbVS1joYvbej5ypDjDGEqFAp0gL4Vau2RkfvFaph2+Fsbs1Y67yz2YCIdfY0L0pRbeWrtiEsPDqIIDCIfMlYQohv4z3v2ccwxdiZR+1d2GoTQvz289tfvv3862+/GaPf17fb+/vt8eitkaIpxmWav3//TgjP5yosMoSCyr2OcWhSmpT3sfV2/3y+wz3nxCBfxwuNaLSZYgzeW22cM7n33vlIybmvLyHeueq9UsoFhwC9k1b0NZsKVqNSoGTPTZRKpQwGBAQBhdpYpzVprULwzhnnnQaEAVOcgbm2HrxXiAhktbbGOtufz2dv7VjXvO+g1OhF//h2rqXb4rZtryWXIajBW+d80EohKBmcW1eoGnSrdDidTtOkCS2ZyzRbZ0KwyzL7aVJahcm/XC+//f5zWmZBar1Z66010qXm8rg/AJgYBPpoNR+7MvrlctoO1UutraIjQum9CtMcJg24puP94w21fdzve0rW2ZrK43GPKTqjovE/fvx4/XaxxhBRKak15ZydTzMBvX98lNo6V60weDdP4WPdUtkfz0fuDWUcuWijjdJK4URqsIzeRx8pF+ed9+60LMaYOUyA2HrrbQiw0ep8Xl6uVxEeg1nWVPdjK1vKQ4CJSCNL77VG59DYhkNp9e31pS4nY/zb+9uRjpwTCTKModQY3VrXgb01jcfj159aWxlyuZ4BaYzeet9zalsDws6dQYCltX4ce2nVWWtQh3mKwWutATHX1HM7tl1pOi0XReqrm2615j7UF6tBJEx+GTP3YZxRtTBiG7znNARk9KFoiUucZ2d034t2xhhfud1vj8f2HI1bKbWmaVqMMdgl9bxta60NhYnUV3lBpB6l9VzOS/z+8zdkDjaA1uHhT5ezoPRSEGWaordOESlljLLa2se2t2frmkbvzPy1yEr7no+jd+Oebq9Vke5jpHp07vfHo/Q6RG7bNkSYsTIaoVLHfd9+fvv58vLtcWzTNHPl2nrvw0aHyqZWam1CeppPvXVUqnEjNjFOL6+k1k1p5ax13n2/viqrmbMCjk7/x3/8W23l7145F76/vqCox/b84+2P533TweAKSKb0/ng+97QhIoNYQ1OMl2W5LmdrrEjvvcjoY3DBAoJ9tOeRU67353M/mjJKGQ3CAsjcT8vy+/cfcZpaqxrpMl8G8p5TKT238nn/dCb8t//2X+Z57q3eP+/32/iyPw7iyk1KQiARIa3iHE/LSamvcZCpMOKxrZtuQgjgtDvNy/V8Pk0zEWrSvXVMefQBIjz4OA7SFGN4fbmAAJFSoProjXsXVqyItHOu96FABFCEeu01laek61XOl6u2xkd3xWvw034cb+NXAQCA+/3+Ns25tPvjvu/7/fFUhNb4nCsRMGKMAbNCQkUKAZBwCnFaZuEBKKRojIYMRut9f2yPu518CN6QBUJSWhvlvZ+ncKRS+iAGrWkKbrIuesejf2y3j/c/Pz8/3z4+uY9v367TPF2v17j4XNtynkNwpXQkHADbviO859JyPipzHi3Vko5UejdWLSE60q0NQAJCIOhp9NHTkVhgwRMS9TGY2Vgbog9hck7LEEAUlMYyRg91+OjVc62deYx0JIBhFc1xWkIIRp2CN8YQQZyjIVKgrLHp2GTwduy6KutdDEEYjnzkUnqvpbDWegxovenbugmhtgaAt2O3Lk7TpBRaa5yzhqwwT4B98GN7EoH6un0AaUXWmhjij99ev13O1mlNtMxz8NY5dz6flss55fq8r4RqLwcAt1bf/vxl47RME2o6XU4+TIKCCIywHnsDSUft0mB9eu99mHKtR8rP43NdNyTswL11HlUI7GnxwV+u15fL2WhLSradWqshBmsMKXW+nDsPLKi0Kdz+8evP23P9x7/+dXs+GZUgfM0Z5jB7sg14T4cAhBAA0Bu3zMv5dLJG55SJCERIKRQZAs5oYcm1t95aH8ee1/XYS81jDOaumEf13gKC0gqEmYVInebYxtiPbTv2PWdgMEqJxhjmXPuR8wNpsGzPFYkUkrU2hEhkaq+185oOBgERIByDW60pF6NViJPVJk4xWBfmCMI55QKkWzNGI0jKCRWezycRqCmLMCqsrVDV1ppKyDC0UT7Y0NzAL+VpR8Q4Td9eXpflnLZdGJrAx+fHv3792o9jMPfWlSLGNACd82mU3BsLI3+ZsURgjzFMYXLBna+X0+UUjO+9rfvG3ADlOI7Oq0Y6T6cQ4jJ5ayMMyL0JQE7HvkPO2RmbSs6ZS0rOWO39x+PB9/tg8CEYrVOpRy0m+M/tI7XeZbCI0lpEcmu2VueMACigKfjbxyePvrda+vj7H79K3hHAGova8IC9VPi8Az65jTa41goIyxJeTlcitT8f2/6I0X6/nKLR3Gqw3vsoorZ0/PH2/vH5WRtILbW20nrqNedaezHOKKUptd45mgAz5VxgFAAmAFDKaEXKlIPXddv2fHseTWRUab2SUtF76T3GWMd4eZnbGCDShPf9WI8t1yJERhtjzTzNv/34OXjUVo/j0Nal3EptoIRbbyXlXI0z5+VEmuZ5csYdR351VxEG5odRwOKCf325/Pz+fZoi83DOaqtSLjnn3obSChC11s7ay+VilSGta+u/3n7dH09GUOvDaCsCtbUxRmdGIu8nAPX5eTc5PfdtkVkEENEG09mSVu1oQ0SQnuuWS1u352Pfn8emiLR3+k7nuBjrlmWxph41t9aN0dbYaZqsNrWxIkLQVikQQJB0lCNnSLvSNMUFEVh4XmatsLdurSpFlELvjHOGgNO2tZrv94/77Z5LVoiklHd+meaX68U4rRXpOCN+0ffGV2Bp3fY6eF+39UhCKEiiNAmzYGljkBhkFxiVLq3X1krKfXRr3XZsY3QR0FppE+M0Ga2XaXHWDhZBKK3mWpptyqivFljNRaEgKG/M+TRPzl6WafaBEJzR82lRgMxcSunMrSatdG29Dj5K6XXs+y4s3FtwZoxhjG596H/864MEASBOSz3y5eUboKzrdn6N5+U0REbr255arTiG13rft37s1lrvvdYqRPfzx/d///3f9n01RjG3PWX+/BBSqY+S6+3z1sdoX08h4GBx3vroEVFZi4DPdf14/7zdnwxwfN746/Yj0NobEo0hzFBrzUfW2owhRtHlcg3WOmuXeRIu99vH9eX1+7cXY411ZorBWNtqY2EWQUImud3Xx7beH9vf/vWrsCAhs2hFwTmSnQiOfQVmheSMKUc2hryz3llSZIfuvbFwzwWAWHh0VVpNKR0p7fm4PR+1sRDVo7UhrAYpNRpsfedaD0PLaX7szylMIExECCqVXHLWQNeXl8ZS6tH7l9GTmXmMiiBj3Yx7xjhzl1wLCImMtBcAMdZaMn62wfvzy+nb6+vlekEBbQwIb+tx7NsSJmO00ZpRBMV5Z40ewSGAtW4wt5oRiADGaCBjid5andtp3fbPj4+vnbO33nvPnd/e37dU/3j7uK1r6x0VuegIqMG4HyumbYiASKkN22DmmluI1r9cYwhx8t9/+3a6LE6Zx/Nx7M/H8/55f+Saci7Bx+v1JUZvne/89epsDGMKYQw50i4svQ0Uds5bozqP1sdjXYGBth1AAIlRGEgQcyqdB6AyGknTcz2strmVx7ax9OD89++vH4/7c92G/INbP/bVGE1aI6AgIgp/cG/cW2cETaQUvVyutY91//x8/9iej//4j9+Y+dfH25HytuWjtMe+7/v69va55tY6HzkdtZbWGJCFtbHPlIHz7Ows0Hq7P2/Qm2pMBq3VOnhgOVpKtT6P47HlRyqFe2dWmoxCyzzHOARyyx1YANfjuH18HEfKtTYuQBoQS8u57LWmeTqFEEjhkY/aGzM37r23VrIwXy9naw0iuhCiicyDjAa5KsTLMtdandHXl/PpNHnnSinN6NP5NJ+4tZ5TrbUu83S5nKcYz5fzPE8A9P7xsW7P5/rY0lFLQyQgZYwy2nQewZppWrTTSuvSx3N9lJRyLYOH0QZJpjnsx87M+3bsezJa5Vy2Y1NKE+Lz+QAeKHhCVEqDRs1UCwMhKuzc8lZqyUSolBIA5l5S/kq1lVJahZzeEZA7KwKR0Xohpa3VtTWlFHzxIXImwnSkdd8Vw+ydACoBBaK0BgAAHMKEiApRZEgDYh+sSlkp6qU1BuW0RqOtJsLeeqkpGNcnaa3hF0GaRSk9Wsu9tVysNkop7a1SEILVRjFw58E8RFgRojEIyPNAFJEIMEipOMXLy+U8zz++f3Najd5FhtJKgaq1pD210QdIqbmW2scQwD4qIvIYhpTRaorzMoUQnb5cF+oUz/OxHo7ocj7zkN++v7x8/zb5kEv+vN2I4HwKU7R98BJcSXlZ5mmalNJKYTq2v/3j/+bardMIoAh5tNE5PJ57yrfbnVm0MdKHiFyvrzKkNamNU+kivO/H7bEyAimdj6PUigpBpNWGANqYaVqu57MhfaSiFDljYoiG+MfL9Xo+GUWKRBHXXBRAdAGRcs69tGM/jjW10atIzuX97f5+f9TOzvvGAwEGS9oy+P56OSkkRNGKhEURkkBrJeUDWERYRISZeZSaSypMAETbcztyzaMUYDAIIsYaacPPkzWGUKT1UZM1mnk87p/HsWnRhHQ+LUjUalFKtd7ePx+gRuc+WgcRQnLOgIDAOPaa0h2JEDHGQERW25JLiN5qba0O0Z6XZZ68JVJatdqVVpN3OIYGhQi55D1vwTvvwlfpwRgDyKWkPe0aSSllrY3eW2s6Q65FI5Kw1WpZIkhfH/fn8/h8PN9vjz9+fT72jawy2pIho3QtOzPzaJfLxZAJtlulCWD0AQCTszK600YRlpy7yig8TdN//NtfX67Xx+OxruszJVLYe/m4p5L2dd9768Y5UiZEZ5Sa50kRKdQk3FoHEACYQsy51NwGd9SatKq9G2WWaa5tKGOMVpqgbNsQfmxbr22wIIvRxrnw2PbHn8+csjWmjyGEStEQsdbUknkAt0FKyejLFLU26/bVSEm19n1Lv/78cNaLUG68ft4b91Lqnst6tD0fR6tAyAjWWm6tiyhtuAzpiIIgAjKQRRBIFKG2xjsbueb6PD4+n59b6iLKGsFeWh8Ckyel7RhSBz+3fbDcHo/n8/Fxux+pCLCL4Xo+Xa5nhv7n2x/P59pKG8Jl3wZL4157yykZRQjoY9D7YY1NR+5Ya8kiIiJea5ojsNdGe+9zzjkd+/ZsfXjrnAve+eB7b+P1cgnRC0pvpVajrRUB7xwhHfux7kfONQQfQgjR9zGEuyBqpcloxSPn0qge+5FqCcE7H4y15/PJWCcgvZR972nPDKyNJiIeVRPF4JUijUoQlCZndamVBx/bXmrbnpvSFKaoUHKtvRRCHCy1VhbWpAwppzWhqr2PMUSElLJguY90HPnYjSJA4SEGyU6TM7r1EbxVJNv67K2OMQhJK6WNba2u+1Y7xxC+vSrjvHXx/ngyQx3NWjN4SOdlOVnjjNJa/6cXDwFBBAaP0b9W1iLYSuEx4hRLb731nHNrHQlAGImYQSucgndGnaaIiuY5hinOU5ick9GZudRa1jIGl1zSXipz7630/nVTr6P3kplAel/iFGOcYnDG7i1pJP39Lz9NIG8NyJjmCZURYSIsra3r4zg2ZawyejnPtdav19B1OQNgykWY7491vd1arqjUMkUfvCC2IrfPZx2yP/dcEsvQiozxfYhStD73P369ow6j1+fztj4OE6zRikEfx26sOZ0mrbqwzHM4nc65VG3dok0MngQ00fW8/P6X315PCwgrIusM18aIJTdRko+83h5dZHBnwL/9z793hHS0xhj8bLyetEm1jTYs4Hnyp2kxzkAfnTswX19ftKY+2vpcay3eB230V1SmdX4eqQ7po/bG621vNNAYrUVpM2AQ6SWeQQGPbsj44L5/e52DH7UBjK4kToG0BmOZSAmgQCqppcYktbFC8E6RslrRaMz8tVpGa+00zyBCRPM8W2c1gtHqep29sV6bVo792bbtEALuQloRKGa5P5+5VB8ikPqy1LBArS0du7BYrZdpUkRGGwTjlPbT1ES0t96q0zz1UvZc/vn2/OPt47ZtW65MCjqxojrEKsNC3Mdg1NobYzSIJkUgIKKdQgKN5C1J78/PX6iolFa7AOE8Ra0siIrz1U9BKS01H1uS0kfrMsAFhQr8HFCrXEo9EoloRdprH4Oxpgto7UGkCwPA4Aoi0XvnyYcJpNeUT5ezNTofx/3zvaZunbYukLIdyzN1qdhHR62lS2pdBHPJ8IXJUQZYAA0AldJ6y7mkUro1bn0c9/DUxiyna2H68+3een1//2BjBxMbOBJrp42xhEZrhSSkzIDydXZRiNI5paJIDQEYuh8ps9pLOQZgCJKGtVYI9BCkpkBkwHM7Ygh7qgyP0sd633odDIpFEWKI8+Xl9dvLBTq/v/95l8ee8udj7aVpb1tpA2QUGiQxhJxG8DgGb/uqumz3Byo1eteTV0oJkzJ28Di2LR3p4/YJQsspvr6i15P1wQXSRgtITqm1cpRcS3se5eOxNgDromx1WaJGnMPZWNq27fnYa+khRlIWUWmiUVrZm4iw4o6992599N6NWkcbiiBOk3XGGt1KLcXgIG4sg6vw4EFaoVJINIQBoOZacwNEGaI0pZxlDK1tH6PkQQqURWOM1Xo0QQARYGRvjSKTc962lWtTpJTSiBhnr7XRyM6G+XQy1qVj256bsFhjXIiU+1Hyr19vyijjHBnnfYyCX10OImWd3Y9jicvr9QxDtAKvdCtNlFIKFSEppQRBHAMO7jllIKy1CnOpo6TKg4nEaKUQnTcsYlu35twFjTNT9F/iX+E+Wk/HkWu7Pe6lttvnnbQRoNLqYGxfKTKjhGnUQcrLMCBWBr3vz9yyNj5UKFBBeXV9mZTWgnDsrfYxaicZLfc4RxFgBE3QhV4u15eXc+99fIzaW++t1HT/tU7L5II3wkfehKV26EiN63NfU8ouOE3JeGuN+ce//nz/2Bs+pVVSWECspgGt9nH58VKP+u3n9fk8amUfvQ2qow7Fe29Pp5l7yUf78ePb5XUJ3rfSQgzI3HprYzxrfj4epeT9kV9+u4w2AFEs/nq7ocLHXubZAiomQ5qMNYtV59l/+8uPdd3IaKnKKHTet5ZryX30VuqRx+U6IxICs+KtJO30caTaoWvOTRAaNghRA5F2BjSUzjhEIc3T9Jf/+N5af5TqrQLQTcQ6Nzl75BqDJcHHP0sTYuEqaEmFebZKCaBzUFqptRlrjXVxCooQNzqfJiCU3uc5zNFaTQCsFJXBRztuj4MQtFKISlu91XI5n+brQoCIwEqEoB+t9NpS1uczIFirAYGUWs7TumcfAik1n3yI9tiPz+1+T9tWUmZOrQKpEGwtbZ4n47ENDYSIZL0jAgJhHhpgMJxOsfYKAspCaQlGK11Kba1ztNZbRWj45XyUar05X1+3//W34AO6ML8s7+9PFz0qzA3BqFprbmwIGMFap5w/Uj2/XG8fq7WqlVZrHYIiNM2hdpoup+N+CyGignm2veTGlIVISBHVwWJ0yuy9GSLChIZGozDZdhTvnXRxk0OQmpuQUdZWztoFUWwMOSLS8Of7Zx6yj565sOJOkga3VgB0Bem1GadzrafrMlhaZSRlow/nyK2KVcim1RGif2wlKMNH2ktJvSvv0DSwWoYop/Kzvfw491SUNWI0WZ25r/tRuTF0491kLZehjVfWaR+dVp+3z86jjUFWI2ETMLMfqU+voeUOwSfG3y/T0TvkTKOkluoxCGhZYh+NDHLfozIDOmjQRg8BNMgwBnLtubehbWzH4Nrm03Rfn9te3tadUYbBcJnMUbV1366n5XTK+ejA5Q46hCZiEI3WQMKFfXCDx/myrKkCqfP5VEfjAsZ7xTD6EAAXgvMuvz0YyE22jTZYSFGrTSkmAq0gp6y0kAbuo3dJZZRSlNLKcm+tMsMA6xRprZ0zUY0jj5xB5Pu370rrj4+PWsoQCZNPew9eHXmEyXy/zgjaR+e9+3zsuZac2vfXS++ViGovtVcCIku94wAwwdhgGEawsY0+hWmO4cfPl3IcvfchI/XKDb232mgBNNoRqQ7g0AIBy1fdmUFJKRkQZm8N6uU0G2uAlPDQRldW0+Sd10dKo1eWPrB1acdI9307SrnfN4pBadjWAgqhjTZ4ie58XmKIufLoGH68JC2lMmj7/wMxcOJIv96waQAAAABJRU5ErkJggg==\",\n      \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"composing ['a photo of an astronaut riding a horse', 'a jumping horse', 'a white horse']...\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"52995e9c61bd429c9b25a878b2adf587\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"[False]\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"image/png\": 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\",\n      \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"name\": \"stdout\",\n     \"output_type\": \"stream\",\n     \"text\": [\n      \"composing ['a photo of an astronaut riding a horse', 'a jumping horse', 'a white horse']...\\n\"\n     ]\n    },\n    {\n     \"data\": {\n      \"application/vnd.jupyter.widget-view+json\": {\n       \"model_id\": \"8d89fad91594458eb8280f73dc3eda74\",\n       \"version_major\": 2,\n       \"version_minor\": 0\n      },\n      \"text/plain\": [\n       \"  0%|          | 0/51 [00:00<?, ?it/s]\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    },\n    {\n     \"data\": {\n      \"image/png\": 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     \"text/plain\": [\n       \"<PIL.Image.Image image mode=RGB size=512x512>\"\n      ]\n     },\n     \"metadata\": {},\n     \"output_type\": \"display_data\"\n    }\n   ],\n   \"source\": [\n    \"# Sampling parameters\\n\",\n    \"#@markdown Here is an example of composing sentences using <b>Negation operator (NOT).</b> \\\\\\n\",\n    \"#@markdown <b>Negative weights should be assigned to the textes you wish to negate.</b> \\\\\\n\",\n    \"#@markdown `prompt`: when composing  multiple sentences, using `|` as the delimiter.\\\\\\n\",\n    \"#@markdown `weight`: weight indicates the weight importance of sentence when composing, also using `|` as the delimiter.\\n\",\n    \"prompt = \\\"a photo of an astronaut riding a horse | a jumping horse | a white horse\\\" #| green cushion in the chair\\\" #@param{type: 'string'}\\n\",\n    \"weights = \\\"1 | -0.17 | -0.1\\\" #@param{type: 'string'}\\n\",\n    \"scale = 10 #@param{type: 'number'}\\n\",\n    \"steps = 50 #@param{type: 'number'}\\n\",\n    \"seed = 1988\\n\",\n    \"generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"\\n\",\n    \"# positive prompt only\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image = pipe(\\\"a photo of an astronaut riding a horse\\\", guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=\\\"1\\\")[\\\"images\\\"][0]\\n\",\n    \"    display(image)\\n\",\n    \"\\n\",\n    \"# composing prompts with CEBM\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image = pipe(prompt, guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=weights)[\\\"images\\\"][0]\\n\",\n    \"    display(image)\\n\",\n    \"    \\n\",\n    \"# fusing prompts with perpneg\\n\",\n    \"with autocast('cpu' if not has_cuda else 'cuda'):\\n\",\n    \"    generator = th.Generator('cuda').manual_seed(seed)\\n\",\n    \"    image_perpneg = pipe_perpneg(prompt, guidance_scale=scale, generator=generator,\\n\",\n    \"                 num_inference_steps=steps, weights=weights)[\\\"images\\\"][0]\\n\",\n    \"    display(image_perpneg)\"\n   ]\n  },\n  {\n   \"cell_type\": \"code\",\n   \"execution_count\": null,\n   \"metadata\": {},\n   \"outputs\": [],\n   \"source\": []\n  }\n ],\n \"metadata\": {\n  \"accelerator\": \"GPU\",\n  \"colab\": {\n   \"collapsed_sections\": [],\n   \"provenance\": []\n  },\n  \"interpreter\": {\n   \"hash\": \"e7d6e62d90e7e85f9a0faa7f0b1d576302d7ae6108e9fe361594f8e1c8b05781\"\n  },\n  \"kernelspec\": {\n   \"display_name\": \"Python 3 (ipykernel)\",\n   \"language\": \"python\",\n   \"name\": \"python3\"\n  },\n  \"language_info\": {\n   \"codemirror_mode\": {\n    \"name\": \"ipython\",\n    \"version\": 3\n   },\n   \"file_extension\": \".py\",\n 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  },
  {
    "path": "perpneg_diffusion/__init__.py",
    "content": "\"\"\"\nA codebase for performing model inference with a text-conditional diffusion model.\n\"\"\"\n"
  },
  {
    "path": "perpneg_diffusion/perpneg_stable_diffusion/__init__.py",
    "content": "\"\"\"\nA codebase for performing model inference with a text-conditional diffusion model.\n\"\"\"\n\nfrom dataclasses import dataclass\nfrom typing import List, Union\n\nimport numpy as np\n\nimport PIL\n\nfrom diffusers.utils import BaseOutput\n\n\n@dataclass\nclass StableDiffusionPipelineOutput(BaseOutput):\n    \"\"\"\n    Output class for Stable Diffusion pipelines.\n    Args:\n        images (`List[PIL.Image.Image]` or `np.ndarray`)\n            List of denoised PIL images of length `batch_size` or numpy array of shape `(batch_size, height, width,\n            num_channels)`. PIL images or numpy array present the denoised images of the diffusion pipeline.\n        nsfw_content_detected (`List[bool]`)\n            List of flags denoting whether the corresponding generated image likely represents \"not-safe-for-work\"\n            (nsfw) content.\n    \"\"\"\n\n    images: Union[List[PIL.Image.Image], np.ndarray]\n    nsfw_content_detected: List[bool]"
  },
  {
    "path": "perpneg_diffusion/perpneg_stable_diffusion/pipeline_composable_stable_diffusion.py",
    "content": "\"\"\"\n    modified based on diffusion library from Huggingface: https://github.com/huggingface/diffusers/blob/main/src/diffusers/pipelines/stable_diffusion/pipeline_stable_diffusion.py\n\"\"\"\nimport inspect\nimport warnings\nfrom typing import List, Optional, Union\n\nimport torch\n\nfrom tqdm.auto import tqdm\nfrom transformers import CLIPFeatureExtractor, CLIPTextModel, CLIPTokenizer\n\nfrom diffusers.models import AutoencoderKL, UNet2DConditionModel\nfrom diffusers.pipeline_utils import DiffusionPipeline\nfrom diffusers.schedulers import DDIMScheduler, LMSDiscreteScheduler, PNDMScheduler\nfrom .safety_checker import StableDiffusionSafetyChecker\nfrom . import StableDiffusionPipelineOutput\n\n\nclass ComposableStableDiffusionPipeline(DiffusionPipeline):\n    r\"\"\"\n    Pipeline for text-to-image generation using Stable Diffusion.\n\n    This model inherits from [`DiffusionPipeline`]. Check the superclass documentation for the generic methods the\n    library implements for all the pipelines (such as downloading or saving, running on a particular device, etc.)\n\n    Args:\n        vae ([`AutoencoderKL`]):\n            Variational Auto-Encoder (VAE) Model to encode and decode images to and from latent representations.\n        text_encoder ([`CLIPTextModel`]):\n            Frozen text-encoder. Stable Diffusion uses the text portion of\n            [CLIP](https://huggingface.co/docs/transformers/model_doc/clip#transformers.CLIPTextModel), specifically\n            the [clip-vit-large-patch14](https://huggingface.co/openai/clip-vit-large-patch14) variant.\n        tokenizer (`CLIPTokenizer`):\n            Tokenizer of class\n            [CLIPTokenizer](https://huggingface.co/docs/transformers/v4.21.0/en/model_doc/clip#transformers.CLIPTokenizer).\n        unet ([`UNet2DConditionModel`]): Conditional U-Net architecture to denoise the encoded image latents.\n        scheduler ([`SchedulerMixin`]):\n            A scheduler to be used in combination with `unet` to denoise the encoded image latens. Can be one of\n            [`DDIMScheduler`], [`LMSDiscreteScheduler`], or [`PNDMScheduler`].\n        safety_checker ([`StableDiffusionSafetyChecker`]):\n            Classification module that estimates whether generated images could be considered offsensive or harmful.\n            Please, refer to the [model card](https://huggingface.co/CompVis/stable-diffusion-v1-4) for details.\n        feature_extractor ([`CLIPFeatureExtractor`]):\n            Model that extracts features from generated images to be used as inputs for the `safety_checker`.\n    \"\"\"\n\n    def __init__(\n        self,\n        vae: AutoencoderKL,\n        text_encoder: CLIPTextModel,\n        tokenizer: CLIPTokenizer,\n        unet: UNet2DConditionModel,\n        scheduler: Union[DDIMScheduler, PNDMScheduler, LMSDiscreteScheduler],\n        safety_checker: StableDiffusionSafetyChecker,\n        feature_extractor: CLIPFeatureExtractor,\n    ):\n        super().__init__()\n        #scheduler = scheduler.set_format(\"pt\")\n        self.register_modules(\n            vae=vae,\n            text_encoder=text_encoder,\n            tokenizer=tokenizer,\n            unet=unet,\n            scheduler=scheduler,\n            safety_checker=safety_checker,\n            feature_extractor=feature_extractor,\n        )\n\n    def enable_attention_slicing(self, slice_size: Optional[Union[str, int]] = \"auto\"):\n        r\"\"\"\n        Enable sliced attention computation.\n\n        When this option is enabled, the attention module will split the input tensor in slices, to compute attention\n        in several steps. This is useful to save some memory in exchange for a small speed decrease.\n\n        Args:\n            slice_size (`str` or `int`, *optional*, defaults to `\"auto\"`):\n                When `\"auto\"`, halves the input to the attention heads, so attention will be computed in two steps. If\n                a number is provided, uses as many slices as `attention_head_dim // slice_size`. In this case,\n                `attention_head_dim` must be a multiple of `slice_size`.\n        \"\"\"\n        if slice_size == \"auto\":\n            # half the attention head size is usually a good trade-off between\n            # speed and memory\n            slice_size = self.unet.config.attention_head_dim // 2\n        self.unet.set_attention_slice(slice_size)\n\n    def disable_attention_slicing(self):\n        r\"\"\"\n        Disable sliced attention computation. If `enable_attention_slicing` was previously invoked, this method will go\n        back to computing attention in one step.\n        \"\"\"\n        # set slice_size = `None` to disable `attention slicing`\n        self.enable_attention_slicing(None)\n\n    @torch.no_grad()\n    def __call__(\n        self,\n        prompt: Union[str, List[str]],\n        height: Optional[int] = 512,\n        width: Optional[int] = 512,\n        num_inference_steps: Optional[int] = 50,\n        guidance_scale: Optional[float] = 7.5,\n        eta: Optional[float] = 0.0,\n        generator: Optional[torch.Generator] = None,\n        latents: Optional[torch.FloatTensor] = None,\n        output_type: Optional[str] = \"pil\",\n        return_dict: bool = True,\n        weights: Optional[str] = \"\",\n        **kwargs,\n    ):\n        r\"\"\"\n        Function invoked when calling the pipeline for generation.\n\n        Args:\n            prompt (`str` or `List[str]`):\n                The prompt or prompts to guide the image generation.\n            height (`int`, *optional*, defaults to 512):\n                The height in pixels of the generated image.\n            width (`int`, *optional*, defaults to 512):\n                The width in pixels of the generated image.\n            num_inference_steps (`int`, *optional*, defaults to 50):\n                The number of denoising steps. More denoising steps usually lead to a higher quality image at the\n                expense of slower inference.\n            guidance_scale (`float`, *optional*, defaults to 7.5):\n                Guidance scale as defined in [Classifier-Free Diffusion Guidance](https://arxiv.org/abs/2207.12598).\n                `guidance_scale` is defined as `w` of equation 2. of [Imagen\n                Paper](https://arxiv.org/pdf/2205.11487.pdf). Guidance scale is enabled by setting `guidance_scale >\n                1`. Higher guidance scale encourages to generate images that are closely linked to the text `prompt`,\n                usually at the expense of lower image quality.\n            eta (`float`, *optional*, defaults to 0.0):\n                Corresponds to parameter eta (η) in the DDIM paper: https://arxiv.org/abs/2010.02502. Only applies to\n                [`schedulers.DDIMScheduler`], will be ignored for others.\n            generator (`torch.Generator`, *optional*):\n                A [torch generator](https://pytorch.org/docs/stable/generated/torch.Generator.html) to make generation\n                deterministic.\n            latents (`torch.FloatTensor`, *optional*):\n                Pre-generated noisy latents, sampled from a Gaussian distribution, to be used as inputs for image\n                generation. Can be used to tweak the same generation with different prompts. If not provided, a latents\n                tensor will ge generated by sampling using the supplied random `generator`.\n            output_type (`str`, *optional*, defaults to `\"pil\"`):\n                The output format of the generate image. Choose between\n                [PIL](https://pillow.readthedocs.io/en/stable/): `PIL.Image.Image` or `nd.array`.\n            return_dict (`bool`, *optional*, defaults to `True`):\n                Whether or not to return a [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] instead of a\n                plain tuple.\n\n        Returns:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] or `tuple`:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] if `return_dict` is True, otherwise a `tuple.\n            When returning a tuple, the first element is a list with the generated images, and the second element is a\n            list of `bool`s denoting whether the corresponding generated image likely represents \"not-safe-for-work\"\n            (nsfw) content, according to the `safety_checker`.\n        \"\"\"\n\n        if \"torch_device\" in kwargs:\n            device = kwargs.pop(\"torch_device\")\n            warnings.warn(\n                \"`torch_device` is deprecated as an input argument to `__call__` and will be removed in v0.3.0.\"\n                \" Consider using `pipe.to(torch_device)` instead.\"\n            )\n\n            # Set device as before (to be removed in 0.3.0)\n            if device is None:\n                device = \"cuda\" if torch.cuda.is_available() else \"cpu\"\n            self.to(device)\n\n        if isinstance(prompt, str):\n            batch_size = 1\n        elif isinstance(prompt, list):\n            batch_size = len(prompt)\n        else:\n            raise ValueError(f\"`prompt` has to be of type `str` or `list` but is {type(prompt)}\")\n\n        if height % 8 != 0 or width % 8 != 0:\n            raise ValueError(f\"`height` and `width` have to be divisible by 8 but are {height} and {width}.\")\n\n        if '|' in prompt:\n            prompt = [x.strip() for x in prompt.split('|')]\n            print(f\"composing {prompt}...\")\n\n        # get prompt text embeddings\n        text_input = self.tokenizer(\n            prompt,\n            padding=\"max_length\",\n            max_length=self.tokenizer.model_max_length,\n            truncation=True,\n            return_tensors=\"pt\",\n        )\n        text_embeddings = self.text_encoder(text_input.input_ids.to(self.device))[0]\n\n        if not weights:\n            # specify weights for prompts (excluding the unconditional score)\n            print('using equal weights for all prompts...')\n            pos_weights = torch.tensor([1 / (text_embeddings.shape[0] - 1)] * (text_embeddings.shape[0] - 1),\n                                       device=self.device).reshape(-1, 1, 1, 1)\n            neg_weights = torch.tensor([1.], device=self.device).reshape(-1, 1, 1, 1)\n            mask = torch.tensor([False] + [True] * pos_weights.shape[0], dtype=torch.bool)\n        else:\n            # set prompt weight for each\n            num_prompts = len(prompt) if isinstance(prompt, list) else 1\n            weights = [float(w.strip()) for w in weights.split(\"|\")]\n            if len(weights) < num_prompts:\n                weights.append(1.)\n            weights = torch.tensor(weights, device=self.device)\n            assert len(weights) == text_embeddings.shape[0], \"weights specified are not equal to the number of prompts\"\n            pos_weights = []\n            neg_weights = []\n            mask = []  # first one is unconditional score\n            for w in weights:\n                if w > 0:\n                    pos_weights.append(w)\n                    mask.append(True)\n                else:\n                    neg_weights.append(abs(w))\n                    mask.append(False)\n            # normalize the weights\n            pos_weights = torch.tensor(pos_weights, device=self.device).reshape(-1, 1, 1, 1)\n            pos_weights = pos_weights / pos_weights.sum()\n            neg_weights = torch.tensor(neg_weights, device=self.device).reshape(-1, 1, 1, 1)\n            neg_weights = neg_weights / neg_weights.sum()\n            mask = torch.tensor(mask, device=self.device, dtype=torch.bool)\n\n        # here `guidance_scale` is defined analog to the guidance weight `w` of equation (2)\n        # of the Imagen paper: https://arxiv.org/pdf/2205.11487.pdf . `guidance_scale = 1`\n        # corresponds to doing no classifier free guidance.\n        do_classifier_free_guidance = guidance_scale > 1.0\n        # get unconditional embeddings for classifier free guidance\n        if do_classifier_free_guidance:\n            max_length = text_input.input_ids.shape[-1]\n\n            if torch.all(mask):\n                # no negative prompts, so we use empty string as the negative prompt\n                uncond_input = self.tokenizer(\n                    [\"\"] * batch_size, padding=\"max_length\", max_length=max_length, return_tensors=\"pt\"\n                )\n                uncond_embeddings = self.text_encoder(uncond_input.input_ids.to(self.device))[0]\n\n                # For classifier free guidance, we need to do two forward passes.\n                # Here we concatenate the unconditional and text embeddings into a single batch\n                # to avoid doing two forward passes\n                text_embeddings = torch.cat([uncond_embeddings, text_embeddings])\n\n                # update negative weights\n                neg_weights = torch.tensor([1.], device=self.device)\n                mask = torch.tensor([False] + mask.detach().tolist(), device=self.device, dtype=torch.bool)\n\n        # get the initial random noise unless the user supplied it\n\n        # Unlike in other pipelines, latents need to be generated in the target device\n        # for 1-to-1 results reproducibility with the CompVis implementation.\n        # However this currently doesn't work in `mps`.\n        latents_device = \"cpu\" if self.device.type == \"mps\" else self.device\n        latents_shape = (batch_size, self.unet.in_channels, height // 8, width // 8)\n        if latents is None:\n            latents = torch.randn(\n                latents_shape,\n                generator=generator,\n                device=latents_device,\n            )\n        else:\n            if latents.shape != latents_shape:\n                raise ValueError(f\"Unexpected latents shape, got {latents.shape}, expected {latents_shape}\")\n        latents = latents.to(self.device)\n\n        # set timesteps\n        accepts_offset = \"offset\" in set(inspect.signature(self.scheduler.set_timesteps).parameters.keys())\n        extra_set_kwargs = {}\n        if accepts_offset:\n            extra_set_kwargs[\"offset\"] = 1\n\n        self.scheduler.set_timesteps(num_inference_steps, **extra_set_kwargs)\n\n        # if we use LMSDiscreteScheduler, let's make sure latents are mulitplied by sigmas\n        if isinstance(self.scheduler, LMSDiscreteScheduler):\n            latents = latents * self.scheduler.sigmas[0]\n\n        # prepare extra kwargs for the scheduler step, since not all schedulers have the same signature\n        # eta (η) is only used with the DDIMScheduler, it will be ignored for other schedulers.\n        # eta corresponds to η in DDIM paper: https://arxiv.org/abs/2010.02502\n        # and should be between [0, 1]\n        accepts_eta = \"eta\" in set(inspect.signature(self.scheduler.step).parameters.keys())\n        extra_step_kwargs = {}\n        if accepts_eta:\n            extra_step_kwargs[\"eta\"] = eta\n\n        for i, t in enumerate(self.progress_bar(self.scheduler.timesteps)):\n            # expand the latents if we are doing classifier free guidance\n            latent_model_input = torch.cat([latents] * text_embeddings.shape[0]) if do_classifier_free_guidance else latents\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                sigma = self.scheduler.sigmas[i]\n                # the model input needs to be scaled to match the continuous ODE formulation in K-LMS\n                latent_model_input = latent_model_input / ((sigma**2 + 1) ** 0.5)\n\n            # reduce memory by predicting each score sequentially\n            noise_preds = []\n            # predict the noise residual\n            for latent_in, text_embedding_in in zip(\n                    torch.chunk(latent_model_input, chunks=latent_model_input.shape[0], dim=0),\n                    torch.chunk(text_embeddings, chunks=text_embeddings.shape[0], dim=0)):\n                noise_preds.append(self.unet(latent_in, t, encoder_hidden_states=text_embedding_in).sample)\n            noise_preds = torch.cat(noise_preds, dim=0)\n\n            # perform guidance\n            if do_classifier_free_guidance:\n                noise_pred_uncond = (noise_preds[~mask] * neg_weights).sum(dim=0, keepdims=True)\n                noise_pred_text = (noise_preds[mask] * pos_weights).sum(dim=0, keepdims=True)\n                noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_text - noise_pred_uncond)\n\n            # compute the previous noisy sample x_t -> x_t-1\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                latents = self.scheduler.step(noise_pred, i, latents, **extra_step_kwargs).prev_sample\n            else:\n                latents = self.scheduler.step(noise_pred, t, latents, **extra_step_kwargs).prev_sample\n\n        # scale and decode the image latents with vae\n        latents = 1 / 0.18215 * latents\n        image = self.vae.decode(latents).sample\n\n        image = (image / 2 + 0.5).clamp(0, 1)\n        image = image.cpu().permute(0, 2, 3, 1).numpy()\n\n        # run safety checker\n        #safety_cheker_input = self.feature_extractor(self.numpy_to_pil(image), return_tensors=\"pt\").to(self.device)\n        #image, has_nsfw_concept = self.safety_checker(images=image, clip_input=safety_cheker_input.pixel_values)\n\n        has_nsfw_concept = [False for i in range(image.shape[0])]\n        print(has_nsfw_concept)\n\n        if output_type == \"pil\":\n            image = self.numpy_to_pil(image)\n\n        if not return_dict:\n            return (image, has_nsfw_concept)\n\n        return StableDiffusionPipelineOutput(images=image, nsfw_content_detected=has_nsfw_concept)"
  },
  {
    "path": "perpneg_diffusion/perpneg_stable_diffusion/pipeline_composable_stable_diffusion_3d_rotation.py",
    "content": "\"\"\"\n    modified based on diffusion library from Huggingface: https://github.com/huggingface/diffusers/blob/main/src/diffusers/pipelines/stable_diffusion/pipeline_stable_diffusion.py\n\"\"\"\nimport inspect\nfrom itertools import accumulate\nimport warnings\nfrom typing import List, Optional, Union\n\nimport torch\n\nfrom tqdm.auto import tqdm\nfrom transformers import CLIPFeatureExtractor, CLIPTextModel, CLIPTokenizer\n\nfrom diffusers.models import AutoencoderKL, UNet2DConditionModel\nfrom diffusers.pipeline_utils import DiffusionPipeline\nfrom diffusers.schedulers import DDIMScheduler, LMSDiscreteScheduler, PNDMScheduler\nfrom .safety_checker import StableDiffusionSafetyChecker\nfrom . import StableDiffusionPipelineOutput\n\ndef get_prependicualr_component(x, y):\n    assert x.shape == y.shape\n    # print(((torch.mul(x, y).sum())/(torch.norm(y)**2)).shape)\n    return x - ((torch.mul(x, y).sum())/(torch.norm(y)**2)) * y\n\ndef weighted_prependicualr_aggricator(delta_noise_pred_pos, w_pos, delta_noise_pred_neg, w_neg):\n    \n    main_positive = delta_noise_pred_pos[0].unsqueeze(0)\n    accumulated_output = 0\n    for i, complementory_positive in enumerate(delta_noise_pred_pos[1:]):\n        accumulated_output +=  w_pos[i] * get_prependicualr_component(complementory_positive.unsqueeze(0), main_positive)\n        \n    for i, w_n in enumerate(w_neg):\n        accumulated_output -= w_n * get_prependicualr_component(delta_noise_pred_neg[i].unsqueeze(0), main_positive)\n        \n    return accumulated_output + main_positive\n    \n\n\nclass ComposableStableDiffusionPipeline_perpneg(DiffusionPipeline):\n    r\"\"\"\n    Pipeline for text-to-image generation using Stable Diffusion.\n\n    This model inherits from [`DiffusionPipeline`]. Check the superclass documentation for the generic methods the\n    library implements for all the pipelines (such as downloading or saving, running on a particular device, etc.)\n\n    Args:\n        vae ([`AutoencoderKL`]):\n            Variational Auto-Encoder (VAE) Model to encode and decode images to and from latent representations.\n        text_encoder ([`CLIPTextModel`]):\n            Frozen text-encoder. Stable Diffusion uses the text portion of\n            [CLIP](https://huggingface.co/docs/transformers/model_doc/clip#transformers.CLIPTextModel), specifically\n            the [clip-vit-large-patch14](https://huggingface.co/openai/clip-vit-large-patch14) variant.\n        tokenizer (`CLIPTokenizer`):\n            Tokenizer of class\n            [CLIPTokenizer](https://huggingface.co/docs/transformers/v4.21.0/en/model_doc/clip#transformers.CLIPTokenizer).\n        unet ([`UNet2DConditionModel`]): Conditional U-Net architecture to denoise the encoded image latents.\n        scheduler ([`SchedulerMixin`]):\n            A scheduler to be used in combination with `unet` to denoise the encoded image latens. Can be one of\n            [`DDIMScheduler`], [`LMSDiscreteScheduler`], or [`PNDMScheduler`].\n        safety_checker ([`StableDiffusionSafetyChecker`]):\n            Classification module that estimates whether generated images could be considered offsensive or harmful.\n            Please, refer to the [model card](https://huggingface.co/CompVis/stable-diffusion-v1-4) for details.\n        feature_extractor ([`CLIPFeatureExtractor`]):\n            Model that extracts features from generated images to be used as inputs for the `safety_checker`.\n    \"\"\"\n\n    def __init__(\n        self,\n        vae: AutoencoderKL,\n        text_encoder: CLIPTextModel,\n        tokenizer: CLIPTokenizer,\n        unet: UNet2DConditionModel,\n        scheduler: Union[DDIMScheduler, PNDMScheduler, LMSDiscreteScheduler],\n        safety_checker: StableDiffusionSafetyChecker,\n        feature_extractor: CLIPFeatureExtractor,\n    ):\n        super().__init__()\n        #scheduler = scheduler.set_format(\"pt\")\n        self.register_modules(\n            vae=vae,\n            text_encoder=text_encoder,\n            tokenizer=tokenizer,\n            unet=unet,\n            scheduler=scheduler,\n            safety_checker=safety_checker,\n            feature_extractor=feature_extractor,\n        )\n\n    def enable_attention_slicing(self, slice_size: Optional[Union[str, int]] = \"auto\"):\n        r\"\"\"\n        Enable sliced attention computation.\n\n        When this option is enabled, the attention module will split the input tensor in slices, to compute attention\n        in several steps. This is useful to save some memory in exchange for a small speed decrease.\n\n        Args:\n            slice_size (`str` or `int`, *optional*, defaults to `\"auto\"`):\n                When `\"auto\"`, halves the input to the attention heads, so attention will be computed in two steps. If\n                a number is provided, uses as many slices as `attention_head_dim // slice_size`. In this case,\n                `attention_head_dim` must be a multiple of `slice_size`.\n        \"\"\"\n        if slice_size == \"auto\":\n            # half the attention head size is usually a good trade-off between\n            # speed and memory\n            slice_size = self.unet.config.attention_head_dim // 2\n        self.unet.set_attention_slice(slice_size)\n\n    def disable_attention_slicing(self):\n        r\"\"\"\n        Disable sliced attention computation. If `enable_attention_slicing` was previously invoked, this method will go\n        back to computing attention in one step.\n        \"\"\"\n        # set slice_size = `None` to disable `attention slicing`\n        self.enable_attention_slicing(None)\n\n    @torch.no_grad()\n    def __call__(\n        self,\n        prompt: Union[str, List[str]],\n        combined_w: Union[float, List[float]] = 0.5,\n        height: Optional[int] = 512,\n        width: Optional[int] = 512,\n        num_inference_steps: Optional[int] = 50,\n        guidance_scale: Optional[float] = 7.5,\n        eta: Optional[float] = 0.0,\n        generator: Optional[torch.Generator] = None,\n        latents: Optional[torch.FloatTensor] = None,\n        output_type: Optional[str] = \"pil\",\n        return_dict: bool = True,\n        weights: Optional[str] = \"\",\n        **kwargs,\n    ):\n        r\"\"\"\n        Function invoked when calling the pipeline for generation.\n\n        Args:\n            prompt (`str` or `List[str]`):\n                The prompt or prompts to guide the image generation.\n            height (`int`, *optional*, defaults to 512):\n                The height in pixels of the generated image.\n            width (`int`, *optional*, defaults to 512):\n                The width in pixels of the generated image.\n            num_inference_steps (`int`, *optional*, defaults to 50):\n                The number of denoising steps. More denoising steps usually lead to a higher quality image at the\n                expense of slower inference.\n            guidance_scale (`float`, *optional*, defaults to 7.5):\n                Guidance scale as defined in [Classifier-Free Diffusion Guidance](https://arxiv.org/abs/2207.12598).\n                `guidance_scale` is defined as `w` of equation 2. of [Imagen\n                Paper](https://arxiv.org/pdf/2205.11487.pdf). Guidance scale is enabled by setting `guidance_scale >\n                1`. Higher guidance scale encourages to generate images that are closely linked to the text `prompt`,\n                usually at the expense of lower image quality.\n            eta (`float`, *optional*, defaults to 0.0):\n                Corresponds to parameter eta (η) in the DDIM paper: https://arxiv.org/abs/2010.02502. Only applies to\n                [`schedulers.DDIMScheduler`], will be ignored for others.\n            generator (`torch.Generator`, *optional*):\n                A [torch generator](https://pytorch.org/docs/stable/generated/torch.Generator.html) to make generation\n                deterministic.\n            latents (`torch.FloatTensor`, *optional*):\n                Pre-generated noisy latents, sampled from a Gaussian distribution, to be used as inputs for image\n                generation. Can be used to tweak the same generation with different prompts. If not provided, a latents\n                tensor will ge generated by sampling using the supplied random `generator`.\n            output_type (`str`, *optional*, defaults to `\"pil\"`):\n                The output format of the generate image. Choose between\n                [PIL](https://pillow.readthedocs.io/en/stable/): `PIL.Image.Image` or `nd.array`.\n            return_dict (`bool`, *optional*, defaults to `True`):\n                Whether or not to return a [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] instead of a\n                plain tuple.\n\n        Returns:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] or `tuple`:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] if `return_dict` is True, otherwise a `tuple.\n            When returning a tuple, the first element is a list with the generated images, and the second element is a\n            list of `bool`s denoting whether the corresponding generated image likely represents \"not-safe-for-work\"\n            (nsfw) content, according to the `safety_checker`.\n        \"\"\"\n\n        if \"torch_device\" in kwargs:\n            device = kwargs.pop(\"torch_device\")\n            warnings.warn(\n                \"`torch_device` is deprecated as an input argument to `__call__` and will be removed in v0.3.0.\"\n                \" Consider using `pipe.to(torch_device)` instead.\"\n            )\n\n            # Set device as before (to be removed in 0.3.0)\n            if device is None:\n                device = \"cuda\" if torch.cuda.is_available() else \"cpu\"\n            self.to(device)\n\n        if isinstance(prompt, str):\n            batch_size = 1\n        elif isinstance(prompt, list):\n            batch_size = len(prompt)\n        else:\n            raise ValueError(f\"`prompt` has to be of type `str` or `list` but is {type(prompt)}\")\n\n        if height % 8 != 0 or width % 8 != 0:\n            raise ValueError(f\"`height` and `width` have to be divisible by 8 but are {height} and {width}.\")\n\n        if '|' in prompt:\n            prompt = [x.strip() for x in prompt.split('|')]\n            print(f\"composing {prompt}...\")\n\n        # get prompt text embeddings\n        text_input = self.tokenizer(\n            prompt,\n            padding=\"max_length\",\n            max_length=self.tokenizer.model_max_length,\n            truncation=True,\n            return_tensors=\"pt\",\n        )\n        text_embeddings = self.text_encoder(text_input.input_ids.to(self.device))[0]\n        print(text_embeddings.shape)\n        text_embeddings = combined_w *  text_embeddings[0].unsqueeze(0) + (1 - combined_w) * text_embeddings[1].unsqueeze(0)\n        print(text_embeddings.shape)\n        \n        # if not weights:\n        #     # specify weights for prompts (excluding the unconditional score)\n        #     print('using equal weights for all prompts...')\n        #     pos_weights = torch.tensor([1 / (text_embeddings.shape[0] - 1)] * (text_embeddings.shape[0] - 1),\n        #                                device=self.device).reshape(-1, 1, 1, 1)\n        #     neg_weights = torch.tensor([1.], device=self.device).reshape(-1, 1, 1, 1)\n        #     mask = torch.tensor([False] + [True] * pos_weights.shape[0], dtype=torch.bool)\n        # else:\n\n        weights = [float(w.strip()) for w in weights.split(\"|\")]\n        weights = torch.tensor(weights, device=self.device)\n        assert len(weights) == text_embeddings.shape[0], \"weights specified are not equal to the number of prompts\"\n        pos_weights = []\n        neg_weights = []\n        mask = []  # first one is unconditional score\n        for w in weights:\n            if w > 0:\n                pos_weights.append(w)\n                mask.append(True)\n            else:\n                neg_weights.append(abs(w))\n                mask.append(False)\n        # normalize the weights\n        pos_weights = torch.tensor(pos_weights, device=self.device).reshape(-1, 1, 1, 1)\n        neg_weights = torch.tensor(neg_weights, device=self.device).reshape(-1, 1, 1, 1)            \n        mask = torch.tensor(mask, device=self.device, dtype=torch.bool)\n\n        # here `guidance_scale` is defined analog to the guidance weight `w` of equation (2)\n        # of the Imagen paper: https://arxiv.org/pdf/2205.11487.pdf . `guidance_scale = 1`\n        # corresponds to doing no classifier free guidance.\n        do_classifier_free_guidance = guidance_scale > 1.0\n        # get unconditional embeddings for classifier free guidance\n        # if do_classifier_free_guidance:\n        max_length = text_input.input_ids.shape[-1]\n        \n        uncond_input = self.tokenizer(\n                [\"\"] * 1, padding=\"max_length\", max_length=max_length, return_tensors=\"pt\"\n            )\n        uncond_embeddings = self.text_encoder(uncond_input.input_ids.to(self.device))[0]\n\n            # if torch.all(mask):\n            #     # no negative prompts, so we use empty string as the negative prompt\n            #     uncond_input = self.tokenizer(\n            #         [\"\"] * batch_size, padding=\"max_length\", max_length=max_length, return_tensors=\"pt\"\n            #     )\n            #     uncond_embeddings = self.text_encoder(uncond_input.input_ids.to(self.device))[0]\n\n            #     # For classifier free guidance, we need to do two forward passes.\n            #     # Here we concatenate the unconditional and text embeddings into a single batch\n            #     # to avoid doing two forward passes\n            #     text_embeddings = torch.cat([uncond_embeddings, text_embeddings])\n\n            #     # update negative weights\n            #     neg_weights = torch.tensor([1.], device=self.device)\n            #     mask = torch.tensor([False] + mask.detach().tolist(), device=self.device, dtype=torch.bool)\n\n        # get the initial random noise unless the user supplied it\n\n        # Unlike in other pipelines, latents need to be generated in the target device\n        # for 1-to-1 results reproducibility with the CompVis implementation.\n        # However this currently doesn't work in `mps`.\n        latents_device = \"cpu\" if self.device.type == \"mps\" else self.device\n        latents_shape = (batch_size, self.unet.in_channels, height // 8, width // 8)\n        if latents is None:\n            latents = torch.randn(\n                latents_shape,\n                generator=generator,\n                device=latents_device,\n            )\n        else:\n            if latents.shape != latents_shape:\n                raise ValueError(f\"Unexpected latents shape, got {latents.shape}, expected {latents_shape}\")\n        latents = latents.to(self.device)\n\n        # set timesteps\n        accepts_offset = \"offset\" in set(inspect.signature(self.scheduler.set_timesteps).parameters.keys())\n        extra_set_kwargs = {}\n        if accepts_offset:\n            extra_set_kwargs[\"offset\"] = 1\n\n        self.scheduler.set_timesteps(num_inference_steps, **extra_set_kwargs)\n\n        # if we use LMSDiscreteScheduler, let's make sure latents are mulitplied by sigmas\n        if isinstance(self.scheduler, LMSDiscreteScheduler):\n            latents = latents * self.scheduler.sigmas[0]\n\n        # prepare extra kwargs for the scheduler step, since not all schedulers have the same signature\n        # eta (η) is only used with the DDIMScheduler, it will be ignored for other schedulers.\n        # eta corresponds to η in DDIM paper: https://arxiv.org/abs/2010.02502\n        # and should be between [0, 1]\n        accepts_eta = \"eta\" in set(inspect.signature(self.scheduler.step).parameters.keys())\n        extra_step_kwargs = {}\n        if accepts_eta:\n            extra_step_kwargs[\"eta\"] = eta\n\n        for i, t in enumerate(self.progress_bar(self.scheduler.timesteps)):\n            # expand the latents if we are doing classifier free guidance\n            latent_model_input = torch.cat([latents] * text_embeddings.shape[0]) if do_classifier_free_guidance else latents\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                sigma = self.scheduler.sigmas[i]\n                # the model input needs to be scaled to match the continuous ODE formulation in K-LMS\n                latent_model_input = latent_model_input / ((sigma**2 + 1) ** 0.5)\n\n            # reduce memory by predicting each score sequentially\n            noise_preds = []\n            # predict the noise residual\n            for latent_in, text_embedding_in in zip(\n                    torch.chunk(latent_model_input, chunks=latent_model_input.shape[0], dim=0),\n                    torch.chunk(text_embeddings, chunks=text_embeddings.shape[0], dim=0)):\n                noise_preds.append(self.unet(latent_in, t, encoder_hidden_states=text_embedding_in).sample)\n            noise_preds = torch.cat(noise_preds, dim=0)\n            \n            noise_pred_uncond = self.unet(latents, t, encoder_hidden_states=uncond_embeddings).sample\n\n            # perform guidance\n            if do_classifier_free_guidance:\n                # noise_pred_uncond = (noise_preds[~mask] * neg_weights).sum(dim=0, keepdims=True)\n                # noise_pred_text = (noise_preds[mask] * pos_weights).sum(dim=0, keepdims=True)\n                # noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_text - noise_pred_uncond)\n                # print(\"we are here\")\n                \n                \n                \n                delta_noise_pred_neg = noise_preds[~mask] - noise_pred_uncond\n                delta_noise_pred_pos = noise_preds[mask] - noise_pred_uncond\n                \n                noise_pred = noise_pred_uncond + guidance_scale * weighted_prependicualr_aggricator(delta_noise_pred_pos, pos_weights, delta_noise_pred_neg, neg_weights)\n                # print(\"we are here11\")                \n                # diff_v = noise_pred_text - noise_pred_uncond\n                # diff_v = diff_v - (torch.mul(diff_v, noise_pred_text).sum()/torch.norm(noise_pred_text)**2) * noise_pred_text\n                # noise_pred = noise_pred_text + guidance_scale * diff_v\n                \n                ## another try\n                # noise_pred_uncond_prependicular = noise_pred_uncond - (torch.mul(noise_pred_uncond, noise_pred_text).sum()/torch.norm(noise_pred_text)**2) * noise_pred_text\n                # noise_pred = (guidance_scale) * noise_pred_text - (guidance_scale-1) * noise_pred_uncond_prependicular\n                # print(\"we are here\")\n\n            # compute the previous noisy sample x_t -> x_t-1\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                latents = self.scheduler.step(noise_pred, i, latents, **extra_step_kwargs).prev_sample\n            else:\n                latents = self.scheduler.step(noise_pred, t, latents, **extra_step_kwargs).prev_sample\n\n        # scale and decode the image latents with vae\n        latents = 1 / 0.18215 * latents\n        image = self.vae.decode(latents).sample\n\n        image = (image / 2 + 0.5).clamp(0, 1)\n        image = image.cpu().permute(0, 2, 3, 1).numpy()\n\n        # # run safety checker\n        # safety_cheker_input = self.feature_extractor(self.numpy_to_pil(image), return_tensors=\"pt\").to(self.device)\n        # image, has_nsfw_concept = self.safety_checker(images=image, clip_input=safety_cheker_input.pixel_values)\n\n        has_nsfw_concept = [False for i in range(image.shape[0])]\n        \n        if output_type == \"pil\":\n            image = self.numpy_to_pil(image)\n\n        if not return_dict:\n            return (image, has_nsfw_concept)\n\n        return StableDiffusionPipelineOutput(images=image, nsfw_content_detected=has_nsfw_concept)"
  },
  {
    "path": "perpneg_diffusion/perpneg_stable_diffusion/pipeline_composable_stable_diffusion_rotation.py",
    "content": "\"\"\"\n    modified based on diffusion library from Huggingface: https://github.com/huggingface/diffusers/blob/main/src/diffusers/pipelines/stable_diffusion/pipeline_stable_diffusion.py\n\"\"\"\nimport inspect\nfrom itertools import accumulate\nimport warnings\nfrom typing import List, Optional, Union\n\nimport torch\n\nfrom tqdm.auto import tqdm\nfrom transformers import CLIPFeatureExtractor, CLIPTextModel, CLIPTokenizer\n\nfrom diffusers.models import AutoencoderKL, UNet2DConditionModel\nfrom diffusers.pipeline_utils import DiffusionPipeline\nfrom diffusers.schedulers import DDIMScheduler, LMSDiscreteScheduler, PNDMScheduler\nfrom .safety_checker import StableDiffusionSafetyChecker\nfrom . import StableDiffusionPipelineOutput\n\ndef get_prependicualr_component(x, y):\n    assert x.shape == y.shape\n    # print(((torch.mul(x, y).sum())/(torch.norm(y)**2)).shape)\n    return x - ((torch.mul(x, y).sum())/(torch.norm(y)**2)) * y\n\ndef weighted_prependicualr_aggricator(delta_noise_pred_pos, w_pos, delta_noise_pred_neg, w_neg):\n    \n    main_positive = delta_noise_pred_pos[0].unsqueeze(0)\n    accumulated_output = 0\n    for i, complementory_positive in enumerate(delta_noise_pred_pos[1:]):\n        accumulated_output +=  w_pos[i] * get_prependicualr_component(complementory_positive.unsqueeze(0), main_positive)\n        \n    for i, w_n in enumerate(w_neg):\n        accumulated_output -= w_n * get_prependicualr_component(delta_noise_pred_neg[i].unsqueeze(0), main_positive)\n        \n    return accumulated_output + main_positive\n    \n\n\nclass ComposableStableDiffusionPipeline_perpneg(DiffusionPipeline):\n    r\"\"\"\n    Pipeline for text-to-image generation using Stable Diffusion.\n\n    This model inherits from [`DiffusionPipeline`]. Check the superclass documentation for the generic methods the\n    library implements for all the pipelines (such as downloading or saving, running on a particular device, etc.)\n\n    Args:\n        vae ([`AutoencoderKL`]):\n            Variational Auto-Encoder (VAE) Model to encode and decode images to and from latent representations.\n        text_encoder ([`CLIPTextModel`]):\n            Frozen text-encoder. Stable Diffusion uses the text portion of\n            [CLIP](https://huggingface.co/docs/transformers/model_doc/clip#transformers.CLIPTextModel), specifically\n            the [clip-vit-large-patch14](https://huggingface.co/openai/clip-vit-large-patch14) variant.\n        tokenizer (`CLIPTokenizer`):\n            Tokenizer of class\n            [CLIPTokenizer](https://huggingface.co/docs/transformers/v4.21.0/en/model_doc/clip#transformers.CLIPTokenizer).\n        unet ([`UNet2DConditionModel`]): Conditional U-Net architecture to denoise the encoded image latents.\n        scheduler ([`SchedulerMixin`]):\n            A scheduler to be used in combination with `unet` to denoise the encoded image latens. Can be one of\n            [`DDIMScheduler`], [`LMSDiscreteScheduler`], or [`PNDMScheduler`].\n        safety_checker ([`StableDiffusionSafetyChecker`]):\n            Classification module that estimates whether generated images could be considered offsensive or harmful.\n            Please, refer to the [model card](https://huggingface.co/CompVis/stable-diffusion-v1-4) for details.\n        feature_extractor ([`CLIPFeatureExtractor`]):\n            Model that extracts features from generated images to be used as inputs for the `safety_checker`.\n    \"\"\"\n\n    def __init__(\n        self,\n        vae: AutoencoderKL,\n        text_encoder: CLIPTextModel,\n        tokenizer: CLIPTokenizer,\n        unet: UNet2DConditionModel,\n        scheduler: Union[DDIMScheduler, PNDMScheduler, LMSDiscreteScheduler],\n        safety_checker: StableDiffusionSafetyChecker,\n        feature_extractor: CLIPFeatureExtractor,\n    ):\n        super().__init__()\n        #scheduler = scheduler.set_format(\"pt\")\n        self.register_modules(\n            vae=vae,\n            text_encoder=text_encoder,\n            tokenizer=tokenizer,\n            unet=unet,\n            scheduler=scheduler,\n            safety_checker=safety_checker,\n            feature_extractor=feature_extractor,\n        )\n\n    def enable_attention_slicing(self, slice_size: Optional[Union[str, int]] = \"auto\"):\n        r\"\"\"\n        Enable sliced attention computation.\n\n        When this option is enabled, the attention module will split the input tensor in slices, to compute attention\n        in several steps. This is useful to save some memory in exchange for a small speed decrease.\n\n        Args:\n            slice_size (`str` or `int`, *optional*, defaults to `\"auto\"`):\n                When `\"auto\"`, halves the input to the attention heads, so attention will be computed in two steps. If\n                a number is provided, uses as many slices as `attention_head_dim // slice_size`. In this case,\n                `attention_head_dim` must be a multiple of `slice_size`.\n        \"\"\"\n        if slice_size == \"auto\":\n            # half the attention head size is usually a good trade-off between\n            # speed and memory\n            slice_size = self.unet.config.attention_head_dim // 2\n        self.unet.set_attention_slice(slice_size)\n\n    def disable_attention_slicing(self):\n        r\"\"\"\n        Disable sliced attention computation. If `enable_attention_slicing` was previously invoked, this method will go\n        back to computing attention in one step.\n        \"\"\"\n        # set slice_size = `None` to disable `attention slicing`\n        self.enable_attention_slicing(None)\n\n    @torch.no_grad()\n    def __call__(\n        self,\n        prompt: Union[str, List[str]],\n        combined_w: Union[float, List[float]] = 0.5,\n        height: Optional[int] = 512,\n        width: Optional[int] = 512,\n        num_inference_steps: Optional[int] = 50,\n        guidance_scale: Optional[float] = 7.5,\n        eta: Optional[float] = 0.0,\n        generator: Optional[torch.Generator] = None,\n        latents: Optional[torch.FloatTensor] = None,\n        output_type: Optional[str] = \"pil\",\n        return_dict: bool = True,\n        weights: Optional[str] = \"\",\n        **kwargs,\n    ):\n        r\"\"\"\n        Function invoked when calling the pipeline for generation.\n\n        Args:\n            prompt (`str` or `List[str]`):\n                The prompt or prompts to guide the image generation.\n            height (`int`, *optional*, defaults to 512):\n                The height in pixels of the generated image.\n            width (`int`, *optional*, defaults to 512):\n                The width in pixels of the generated image.\n            num_inference_steps (`int`, *optional*, defaults to 50):\n                The number of denoising steps. More denoising steps usually lead to a higher quality image at the\n                expense of slower inference.\n            guidance_scale (`float`, *optional*, defaults to 7.5):\n                Guidance scale as defined in [Classifier-Free Diffusion Guidance](https://arxiv.org/abs/2207.12598).\n                `guidance_scale` is defined as `w` of equation 2. of [Imagen\n                Paper](https://arxiv.org/pdf/2205.11487.pdf). Guidance scale is enabled by setting `guidance_scale >\n                1`. Higher guidance scale encourages to generate images that are closely linked to the text `prompt`,\n                usually at the expense of lower image quality.\n            eta (`float`, *optional*, defaults to 0.0):\n                Corresponds to parameter eta (η) in the DDIM paper: https://arxiv.org/abs/2010.02502. Only applies to\n                [`schedulers.DDIMScheduler`], will be ignored for others.\n            generator (`torch.Generator`, *optional*):\n                A [torch generator](https://pytorch.org/docs/stable/generated/torch.Generator.html) to make generation\n                deterministic.\n            latents (`torch.FloatTensor`, *optional*):\n                Pre-generated noisy latents, sampled from a Gaussian distribution, to be used as inputs for image\n                generation. Can be used to tweak the same generation with different prompts. If not provided, a latents\n                tensor will ge generated by sampling using the supplied random `generator`.\n            output_type (`str`, *optional*, defaults to `\"pil\"`):\n                The output format of the generate image. Choose between\n                [PIL](https://pillow.readthedocs.io/en/stable/): `PIL.Image.Image` or `nd.array`.\n            return_dict (`bool`, *optional*, defaults to `True`):\n                Whether or not to return a [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] instead of a\n                plain tuple.\n\n        Returns:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] or `tuple`:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] if `return_dict` is True, otherwise a `tuple.\n            When returning a tuple, the first element is a list with the generated images, and the second element is a\n            list of `bool`s denoting whether the corresponding generated image likely represents \"not-safe-for-work\"\n            (nsfw) content, according to the `safety_checker`.\n        \"\"\"\n\n        if \"torch_device\" in kwargs:\n            device = kwargs.pop(\"torch_device\")\n            warnings.warn(\n                \"`torch_device` is deprecated as an input argument to `__call__` and will be removed in v0.3.0.\"\n                \" Consider using `pipe.to(torch_device)` instead.\"\n            )\n\n            # Set device as before (to be removed in 0.3.0)\n            if device is None:\n                device = \"cuda\" if torch.cuda.is_available() else \"cpu\"\n            self.to(device)\n\n        if isinstance(prompt, str):\n            batch_size = 1\n        elif isinstance(prompt, list):\n            batch_size = len(prompt)\n        else:\n            raise ValueError(f\"`prompt` has to be of type `str` or `list` but is {type(prompt)}\")\n\n        if height % 8 != 0 or width % 8 != 0:\n            raise ValueError(f\"`height` and `width` have to be divisible by 8 but are {height} and {width}.\")\n\n        if '|' in prompt:\n            prompt = [x.strip() for x in prompt.split('|')]\n            print(f\"composing {prompt}...\")\n\n        # get prompt text embeddings\n        text_input = self.tokenizer(\n            prompt,\n            padding=\"max_length\",\n            max_length=self.tokenizer.model_max_length,\n            truncation=True,\n            return_tensors=\"pt\",\n        )\n        text_embeddings = self.text_encoder(text_input.input_ids.to(self.device))[0]\n        print(text_embeddings.shape)\n        text_embeddings = combined_w *  text_embeddings[0].unsqueeze(0) + (1 - combined_w) * text_embeddings[1].unsqueeze(0)\n        print(text_embeddings.shape)\n        \n        # if not weights:\n        #     # specify weights for prompts (excluding the unconditional score)\n        #     print('using equal weights for all prompts...')\n        #     pos_weights = torch.tensor([1 / (text_embeddings.shape[0] - 1)] * (text_embeddings.shape[0] - 1),\n        #                                device=self.device).reshape(-1, 1, 1, 1)\n        #     neg_weights = torch.tensor([1.], device=self.device).reshape(-1, 1, 1, 1)\n        #     mask = torch.tensor([False] + [True] * pos_weights.shape[0], dtype=torch.bool)\n        # else:\n\n        weights = [float(w.strip()) for w in weights.split(\"|\")]\n        weights = torch.tensor(weights, device=self.device)\n        assert len(weights) == text_embeddings.shape[0], \"weights specified are not equal to the number of prompts\"\n        pos_weights = []\n        neg_weights = []\n        mask = []  # first one is unconditional score\n        for w in weights:\n            if w > 0:\n                pos_weights.append(w)\n                mask.append(True)\n            else:\n                neg_weights.append(abs(w))\n                mask.append(False)\n        # normalize the weights\n        pos_weights = torch.tensor(pos_weights, device=self.device).reshape(-1, 1, 1, 1)\n        neg_weights = torch.tensor(neg_weights, device=self.device).reshape(-1, 1, 1, 1)            \n        mask = torch.tensor(mask, device=self.device, dtype=torch.bool)\n\n        # here `guidance_scale` is defined analog to the guidance weight `w` of equation (2)\n        # of the Imagen paper: https://arxiv.org/pdf/2205.11487.pdf . `guidance_scale = 1`\n        # corresponds to doing no classifier free guidance.\n        do_classifier_free_guidance = guidance_scale > 1.0\n        # get unconditional embeddings for classifier free guidance\n        # if do_classifier_free_guidance:\n        max_length = text_input.input_ids.shape[-1]\n        \n        uncond_input = self.tokenizer(\n                [\"\"] * 1, padding=\"max_length\", max_length=max_length, return_tensors=\"pt\"\n            )\n        uncond_embeddings = self.text_encoder(uncond_input.input_ids.to(self.device))[0]\n\n            # if torch.all(mask):\n            #     # no negative prompts, so we use empty string as the negative prompt\n            #     uncond_input = self.tokenizer(\n            #         [\"\"] * batch_size, padding=\"max_length\", max_length=max_length, return_tensors=\"pt\"\n            #     )\n            #     uncond_embeddings = self.text_encoder(uncond_input.input_ids.to(self.device))[0]\n\n            #     # For classifier free guidance, we need to do two forward passes.\n            #     # Here we concatenate the unconditional and text embeddings into a single batch\n            #     # to avoid doing two forward passes\n            #     text_embeddings = torch.cat([uncond_embeddings, text_embeddings])\n\n            #     # update negative weights\n            #     neg_weights = torch.tensor([1.], device=self.device)\n            #     mask = torch.tensor([False] + mask.detach().tolist(), device=self.device, dtype=torch.bool)\n\n        # get the initial random noise unless the user supplied it\n\n        # Unlike in other pipelines, latents need to be generated in the target device\n        # for 1-to-1 results reproducibility with the CompVis implementation.\n        # However this currently doesn't work in `mps`.\n        latents_device = \"cpu\" if self.device.type == \"mps\" else self.device\n        latents_shape = (batch_size, self.unet.in_channels, height // 8, width // 8)\n        if latents is None:\n            latents = torch.randn(\n                latents_shape,\n                generator=generator,\n                device=latents_device,\n            )\n        else:\n            if latents.shape != latents_shape:\n                raise ValueError(f\"Unexpected latents shape, got {latents.shape}, expected {latents_shape}\")\n        latents = latents.to(self.device)\n\n        # set timesteps\n        accepts_offset = \"offset\" in set(inspect.signature(self.scheduler.set_timesteps).parameters.keys())\n        extra_set_kwargs = {}\n        if accepts_offset:\n            extra_set_kwargs[\"offset\"] = 1\n\n        self.scheduler.set_timesteps(num_inference_steps, **extra_set_kwargs)\n\n        # if we use LMSDiscreteScheduler, let's make sure latents are mulitplied by sigmas\n        if isinstance(self.scheduler, LMSDiscreteScheduler):\n            latents = latents * self.scheduler.sigmas[0]\n\n        # prepare extra kwargs for the scheduler step, since not all schedulers have the same signature\n        # eta (η) is only used with the DDIMScheduler, it will be ignored for other schedulers.\n        # eta corresponds to η in DDIM paper: https://arxiv.org/abs/2010.02502\n        # and should be between [0, 1]\n        accepts_eta = \"eta\" in set(inspect.signature(self.scheduler.step).parameters.keys())\n        extra_step_kwargs = {}\n        if accepts_eta:\n            extra_step_kwargs[\"eta\"] = eta\n\n        for i, t in enumerate(self.progress_bar(self.scheduler.timesteps)):\n            # expand the latents if we are doing classifier free guidance\n            latent_model_input = torch.cat([latents] * text_embeddings.shape[0]) if do_classifier_free_guidance else latents\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                sigma = self.scheduler.sigmas[i]\n                # the model input needs to be scaled to match the continuous ODE formulation in K-LMS\n                latent_model_input = latent_model_input / ((sigma**2 + 1) ** 0.5)\n\n            # reduce memory by predicting each score sequentially\n            noise_preds = []\n            # predict the noise residual\n            for latent_in, text_embedding_in in zip(\n                    torch.chunk(latent_model_input, chunks=latent_model_input.shape[0], dim=0),\n                    torch.chunk(text_embeddings, chunks=text_embeddings.shape[0], dim=0)):\n                noise_preds.append(self.unet(latent_in, t, encoder_hidden_states=text_embedding_in).sample)\n            noise_preds = torch.cat(noise_preds, dim=0)\n            \n            noise_pred_uncond = self.unet(latents, t, encoder_hidden_states=uncond_embeddings).sample\n\n            # perform guidance\n            if do_classifier_free_guidance:\n                # noise_pred_uncond = (noise_preds[~mask] * neg_weights).sum(dim=0, keepdims=True)\n                # noise_pred_text = (noise_preds[mask] * pos_weights).sum(dim=0, keepdims=True)\n                # noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_text - noise_pred_uncond)\n                # print(\"we are here\")\n                \n                \n                \n                delta_noise_pred_neg = noise_preds[~mask] - noise_pred_uncond\n                delta_noise_pred_pos = noise_preds[mask] - noise_pred_uncond\n                \n                noise_pred = noise_pred_uncond + guidance_scale * weighted_prependicualr_aggricator(delta_noise_pred_pos, pos_weights, delta_noise_pred_neg, neg_weights)\n                # print(\"we are here11\")                \n                # diff_v = noise_pred_text - noise_pred_uncond\n                # diff_v = diff_v - (torch.mul(diff_v, noise_pred_text).sum()/torch.norm(noise_pred_text)**2) * noise_pred_text\n                # noise_pred = noise_pred_text + guidance_scale * diff_v\n                \n                ## another try\n                # noise_pred_uncond_prependicular = noise_pred_uncond - (torch.mul(noise_pred_uncond, noise_pred_text).sum()/torch.norm(noise_pred_text)**2) * noise_pred_text\n                # noise_pred = (guidance_scale) * noise_pred_text - (guidance_scale-1) * noise_pred_uncond_prependicular\n                # print(\"we are here\")\n\n            # compute the previous noisy sample x_t -> x_t-1\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                latents = self.scheduler.step(noise_pred, i, latents, **extra_step_kwargs).prev_sample\n            else:\n                latents = self.scheduler.step(noise_pred, t, latents, **extra_step_kwargs).prev_sample\n\n        # scale and decode the image latents with vae\n        latents = 1 / 0.18215 * latents\n        image = self.vae.decode(latents).sample\n\n        image = (image / 2 + 0.5).clamp(0, 1)\n        image = image.cpu().permute(0, 2, 3, 1).numpy()\n\n        # # run safety checker\n        # safety_cheker_input = self.feature_extractor(self.numpy_to_pil(image), return_tensors=\"pt\").to(self.device)\n        # image, has_nsfw_concept = self.safety_checker(images=image, clip_input=safety_cheker_input.pixel_values)\n\n        has_nsfw_concept = [False for i in range(image.shape[0])]\n        \n        if output_type == \"pil\":\n            image = self.numpy_to_pil(image)\n\n        if not return_dict:\n            return (image, has_nsfw_concept)\n\n        return StableDiffusionPipelineOutput(images=image, nsfw_content_detected=has_nsfw_concept)"
  },
  {
    "path": "perpneg_diffusion/perpneg_stable_diffusion/pipeline_perpneg_stable_diffusion.py",
    "content": "\"\"\"\n    modified based on diffusion library from Huggingface: https://github.com/huggingface/diffusers/blob/main/src/diffusers/pipelines/stable_diffusion/pipeline_stable_diffusion.py\n\"\"\"\nimport inspect\nfrom itertools import accumulate\nimport warnings\nfrom typing import List, Optional, Union\n\nimport torch\n\nfrom tqdm.auto import tqdm\nfrom transformers import CLIPFeatureExtractor, CLIPTextModel, CLIPTokenizer\n\nfrom diffusers.models import AutoencoderKL, UNet2DConditionModel\nfrom diffusers.pipeline_utils import DiffusionPipeline\nfrom diffusers.schedulers import DDIMScheduler, LMSDiscreteScheduler, PNDMScheduler\nfrom .safety_checker import StableDiffusionSafetyChecker\nfrom . import StableDiffusionPipelineOutput\n\ndef get_prependicualr_component(x, y):\n    assert x.shape == y.shape\n    return x - ((torch.mul(x, y).sum())/(torch.norm(y)**2)) * y\n\ndef weighted_prependicualr_aggricator(delta_noise_pred_pos, w_pos, delta_noise_pred_neg, w_neg):\n    \n    main_positive = delta_noise_pred_pos[0].unsqueeze(0)\n    accumulated_output = 0\n    for i, complementory_positive in enumerate(delta_noise_pred_pos[1:]):\n        accumulated_output +=  w_pos[i] * get_prependicualr_component(complementory_positive.unsqueeze(0), main_positive)\n        \n    for i, w_n in enumerate(w_neg):\n        accumulated_output -= w_n * get_prependicualr_component(delta_noise_pred_neg[i].unsqueeze(0), main_positive)\n        \n    return accumulated_output + main_positive\n    \n\n\nclass PerpStableDiffusionPipeline(DiffusionPipeline):\n    r\"\"\"\n    Pipeline for text-to-image generation using Stable Diffusion.\n\n    This model inherits from [`DiffusionPipeline`]. Check the superclass documentation for the generic methods the\n    library implements for all the pipelines (such as downloading or saving, running on a particular device, etc.)\n\n    Args:\n        vae ([`AutoencoderKL`]):\n            Variational Auto-Encoder (VAE) Model to encode and decode images to and from latent representations.\n        text_encoder ([`CLIPTextModel`]):\n            Frozen text-encoder. Stable Diffusion uses the text portion of\n            [CLIP](https://huggingface.co/docs/transformers/model_doc/clip#transformers.CLIPTextModel), specifically\n            the [clip-vit-large-patch14](https://huggingface.co/openai/clip-vit-large-patch14) variant.\n        tokenizer (`CLIPTokenizer`):\n            Tokenizer of class\n            [CLIPTokenizer](https://huggingface.co/docs/transformers/v4.21.0/en/model_doc/clip#transformers.CLIPTokenizer).\n        unet ([`UNet2DConditionModel`]): Conditional U-Net architecture to denoise the encoded image latents.\n        scheduler ([`SchedulerMixin`]):\n            A scheduler to be used in combination with `unet` to denoise the encoded image latens. Can be one of\n            [`DDIMScheduler`], [`LMSDiscreteScheduler`], or [`PNDMScheduler`].\n        safety_checker ([`StableDiffusionSafetyChecker`]):\n            Classification module that estimates whether generated images could be considered offsensive or harmful.\n            Please, refer to the [model card](https://huggingface.co/CompVis/stable-diffusion-v1-4) for details.\n        feature_extractor ([`CLIPFeatureExtractor`]):\n            Model that extracts features from generated images to be used as inputs for the `safety_checker`.\n    \"\"\"\n\n    def __init__(\n        self,\n        vae: AutoencoderKL,\n        text_encoder: CLIPTextModel,\n        tokenizer: CLIPTokenizer,\n        unet: UNet2DConditionModel,\n        scheduler: Union[DDIMScheduler, PNDMScheduler, LMSDiscreteScheduler],\n        safety_checker: StableDiffusionSafetyChecker,\n        feature_extractor: CLIPFeatureExtractor,\n    ):\n        super().__init__()\n        #scheduler = scheduler.set_format(\"pt\")\n        self.register_modules(\n            vae=vae,\n            text_encoder=text_encoder,\n            tokenizer=tokenizer,\n            unet=unet,\n            scheduler=scheduler,\n            safety_checker=safety_checker,\n            feature_extractor=feature_extractor,\n        )\n\n    def enable_attention_slicing(self, slice_size: Optional[Union[str, int]] = \"auto\"):\n        r\"\"\"\n        Enable sliced attention computation.\n\n        When this option is enabled, the attention module will split the input tensor in slices, to compute attention\n        in several steps. This is useful to save some memory in exchange for a small speed decrease.\n\n        Args:\n            slice_size (`str` or `int`, *optional*, defaults to `\"auto\"`):\n                When `\"auto\"`, halves the input to the attention heads, so attention will be computed in two steps. If\n                a number is provided, uses as many slices as `attention_head_dim // slice_size`. In this case,\n                `attention_head_dim` must be a multiple of `slice_size`.\n        \"\"\"\n        if slice_size == \"auto\":\n            # half the attention head size is usually a good trade-off between\n            # speed and memory\n            slice_size = self.unet.config.attention_head_dim // 2\n        self.unet.set_attention_slice(slice_size)\n\n    def disable_attention_slicing(self):\n        r\"\"\"\n        Disable sliced attention computation. If `enable_attention_slicing` was previously invoked, this method will go\n        back to computing attention in one step.\n        \"\"\"\n        # set slice_size = `None` to disable `attention slicing`\n        self.enable_attention_slicing(None)\n\n    @torch.no_grad()\n    def __call__(\n        self,\n        prompt: Union[str, List[str]],\n        height: Optional[int] = 512,\n        width: Optional[int] = 512,\n        num_inference_steps: Optional[int] = 50,\n        guidance_scale: Optional[float] = 7.5,\n        eta: Optional[float] = 0.0,\n        generator: Optional[torch.Generator] = None,\n        latents: Optional[torch.FloatTensor] = None,\n        output_type: Optional[str] = \"pil\",\n        return_dict: bool = True,\n        weights: Optional[str] = \"\",\n        **kwargs,\n    ):\n        r\"\"\"\n        Function invoked when calling the pipeline for generation.\n\n        Args:\n            prompt (`str` or `List[str]`):\n                The prompt or prompts to guide the image generation.\n            height (`int`, *optional*, defaults to 512):\n                The height in pixels of the generated image.\n            width (`int`, *optional*, defaults to 512):\n                The width in pixels of the generated image.\n            num_inference_steps (`int`, *optional*, defaults to 50):\n                The number of denoising steps. More denoising steps usually lead to a higher quality image at the\n                expense of slower inference.\n            guidance_scale (`float`, *optional*, defaults to 7.5):\n                Guidance scale as defined in [Classifier-Free Diffusion Guidance](https://arxiv.org/abs/2207.12598).\n                `guidance_scale` is defined as `w` of equation 2. of [Imagen\n                Paper](https://arxiv.org/pdf/2205.11487.pdf). Guidance scale is enabled by setting `guidance_scale >\n                1`. Higher guidance scale encourages to generate images that are closely linked to the text `prompt`,\n                usually at the expense of lower image quality.\n            eta (`float`, *optional*, defaults to 0.0):\n                Corresponds to parameter eta (η) in the DDIM paper: https://arxiv.org/abs/2010.02502. Only applies to\n                [`schedulers.DDIMScheduler`], will be ignored for others.\n            generator (`torch.Generator`, *optional*):\n                A [torch generator](https://pytorch.org/docs/stable/generated/torch.Generator.html) to make generation\n                deterministic.\n            latents (`torch.FloatTensor`, *optional*):\n                Pre-generated noisy latents, sampled from a Gaussian distribution, to be used as inputs for image\n                generation. Can be used to tweak the same generation with different prompts. If not provided, a latents\n                tensor will ge generated by sampling using the supplied random `generator`.\n            output_type (`str`, *optional*, defaults to `\"pil\"`):\n                The output format of the generate image. Choose between\n                [PIL](https://pillow.readthedocs.io/en/stable/): `PIL.Image.Image` or `nd.array`.\n            return_dict (`bool`, *optional*, defaults to `True`):\n                Whether or not to return a [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] instead of a\n                plain tuple.\n\n        Returns:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] or `tuple`:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] if `return_dict` is True, otherwise a `tuple.\n            When returning a tuple, the first element is a list with the generated images, and the second element is a\n            list of `bool`s denoting whether the corresponding generated image likely represents \"not-safe-for-work\"\n            (nsfw) content, according to the `safety_checker`.\n        \"\"\"\n\n        if \"torch_device\" in kwargs:\n            device = kwargs.pop(\"torch_device\")\n            warnings.warn(\n                \"`torch_device` is deprecated as an input argument to `__call__` and will be removed in v0.3.0.\"\n                \" Consider using `pipe.to(torch_device)` instead.\"\n            )\n\n            # Set device as before (to be removed in 0.3.0)\n            if device is None:\n                device = \"cuda\" if torch.cuda.is_available() else \"cpu\"\n            self.to(device)\n\n        if isinstance(prompt, str):\n            batch_size = 1\n        elif isinstance(prompt, list):\n            batch_size = len(prompt)\n        else:\n            raise ValueError(f\"`prompt` has to be of type `str` or `list` but is {type(prompt)}\")\n\n        if height % 8 != 0 or width % 8 != 0:\n            raise ValueError(f\"`height` and `width` have to be divisible by 8 but are {height} and {width}.\")\n\n        if '|' in prompt:\n            prompt = [x.strip() for x in prompt.split('|')]\n            print(f\"composing {prompt}...\")\n\n        # get prompt text embeddings\n        text_input = self.tokenizer(\n            prompt,\n            padding=\"max_length\",\n            max_length=self.tokenizer.model_max_length,\n            truncation=True,\n            return_tensors=\"pt\",\n        )\n        text_embeddings = self.text_encoder(text_input.input_ids.to(self.device))[0]\n\n        # if not weights:\n        #     # specify weights for prompts (excluding the unconditional score)\n        #     print('using equal weights for all prompts...')\n        #     pos_weights = torch.tensor([1 / (text_embeddings.shape[0] - 1)] * (text_embeddings.shape[0] - 1),\n        #                                device=self.device).reshape(-1, 1, 1, 1)\n        #     neg_weights = torch.tensor([1.], device=self.device).reshape(-1, 1, 1, 1)\n        #     mask = torch.tensor([False] + [True] * pos_weights.shape[0], dtype=torch.bool)\n        # else:\n\n        weights = [float(w.strip()) for w in weights.split(\"|\")]\n        weights = torch.tensor(weights, device=self.device)\n        assert len(weights) == text_embeddings.shape[0], \"weights specified are not equal to the number of prompts\"\n        pos_weights = []\n        neg_weights = []\n        mask = []  # first one is unconditional score\n        for w in weights:\n            if w > 0:\n                pos_weights.append(w)\n                mask.append(True)\n            else:\n                neg_weights.append(abs(w))\n                mask.append(False)\n        # normalize the weights\n        pos_weights = torch.tensor(pos_weights, device=self.device).reshape(-1, 1, 1, 1)\n        neg_weights = torch.tensor(neg_weights, device=self.device).reshape(-1, 1, 1, 1)            \n        mask = torch.tensor(mask, device=self.device, dtype=torch.bool)\n\n        # here `guidance_scale` is defined analog to the guidance weight `w` of equation (2)\n        # of the Imagen paper: https://arxiv.org/pdf/2205.11487.pdf . `guidance_scale = 1`\n        # corresponds to doing no classifier free guidance.\n        do_classifier_free_guidance = guidance_scale > 1.0\n        # get unconditional embeddings for classifier free guidance\n        # if do_classifier_free_guidance:\n        max_length = text_input.input_ids.shape[-1]\n        \n        uncond_input = self.tokenizer(\n                [\"\"] * 1, padding=\"max_length\", max_length=max_length, return_tensors=\"pt\"\n            )\n        uncond_embeddings = self.text_encoder(uncond_input.input_ids.to(self.device))[0]\n\n        # get the initial random noise unless the user supplied it\n\n        # Unlike in other pipelines, latents need to be generated in the target device\n        # for 1-to-1 results reproducibility with the CompVis implementation.\n        # However this currently doesn't work in `mps`.\n        latents_device = \"cpu\" if self.device.type == \"mps\" else self.device\n        latents_shape = (batch_size, self.unet.in_channels, height // 8, width // 8)\n        if latents is None:\n            latents = torch.randn(\n                latents_shape,\n                generator=generator,\n                device=latents_device,\n            )\n        else:\n            if latents.shape != latents_shape:\n                raise ValueError(f\"Unexpected latents shape, got {latents.shape}, expected {latents_shape}\")\n        latents = latents.to(self.device)\n\n        # set timesteps\n        accepts_offset = \"offset\" in set(inspect.signature(self.scheduler.set_timesteps).parameters.keys())\n        extra_set_kwargs = {}\n        if accepts_offset:\n            extra_set_kwargs[\"offset\"] = 1\n\n        self.scheduler.set_timesteps(num_inference_steps, **extra_set_kwargs)\n\n        # if we use LMSDiscreteScheduler, let's make sure latents are mulitplied by sigmas\n        if isinstance(self.scheduler, LMSDiscreteScheduler):\n            latents = latents * self.scheduler.sigmas[0]\n\n        # prepare extra kwargs for the scheduler step, since not all schedulers have the same signature\n        # eta (η) is only used with the DDIMScheduler, it will be ignored for other schedulers.\n        # eta corresponds to η in DDIM paper: https://arxiv.org/abs/2010.02502\n        # and should be between [0, 1]\n        accepts_eta = \"eta\" in set(inspect.signature(self.scheduler.step).parameters.keys())\n        extra_step_kwargs = {}\n        if accepts_eta:\n            extra_step_kwargs[\"eta\"] = eta\n\n        for i, t in enumerate(self.progress_bar(self.scheduler.timesteps)):\n            # expand the latents if we are doing classifier free guidance\n            latent_model_input = torch.cat([latents] * text_embeddings.shape[0]) if do_classifier_free_guidance else latents\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                sigma = self.scheduler.sigmas[i]\n                # the model input needs to be scaled to match the continuous ODE formulation in K-LMS\n                latent_model_input = latent_model_input / ((sigma**2 + 1) ** 0.5)\n\n            # reduce memory by predicting each score sequentially\n            noise_preds = []\n            # predict the noise residual\n            for latent_in, text_embedding_in in zip(\n                    torch.chunk(latent_model_input, chunks=latent_model_input.shape[0], dim=0),\n                    torch.chunk(text_embeddings, chunks=text_embeddings.shape[0], dim=0)):\n                noise_preds.append(self.unet(latent_in, t, encoder_hidden_states=text_embedding_in).sample)\n            noise_preds = torch.cat(noise_preds, dim=0)\n            \n            noise_pred_uncond = self.unet(latents, t, encoder_hidden_states=uncond_embeddings).sample\n\n            # perform guidance\n            if do_classifier_free_guidance:\n                \n                delta_noise_pred_neg = noise_preds[~mask] - noise_pred_uncond\n                delta_noise_pred_pos = noise_preds[mask] - noise_pred_uncond\n                \n                noise_pred = noise_pred_uncond + guidance_scale * weighted_prependicualr_aggricator(delta_noise_pred_pos, pos_weights, delta_noise_pred_neg, neg_weights)\n\n            # compute the previous noisy sample x_t -> x_t-1\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                latents = self.scheduler.step(noise_pred, i, latents, **extra_step_kwargs).prev_sample\n            else:\n                latents = self.scheduler.step(noise_pred, t, latents, **extra_step_kwargs).prev_sample\n\n        # scale and decode the image latents with vae\n        latents = 1 / 0.18215 * latents\n        image = self.vae.decode(latents).sample\n\n        image = (image / 2 + 0.5).clamp(0, 1)\n        image = image.cpu().permute(0, 2, 3, 1).numpy()\n\n        # run safety checker\n        safety_cheker_input = self.feature_extractor(self.numpy_to_pil(image), return_tensors=\"pt\").to(self.device)\n        image, has_nsfw_concept = self.safety_checker(images=image, clip_input=safety_cheker_input.pixel_values)\n\n        has_nsfw_concept = [False for i in range(image.shape[0])]\n        \n        if output_type == \"pil\":\n            image = self.numpy_to_pil(image)\n\n        if not return_dict:\n            return (image, has_nsfw_concept)\n\n        return StableDiffusionPipelineOutput(images=image, nsfw_content_detected=has_nsfw_concept)"
  },
  {
    "path": "perpneg_diffusion/perpneg_stable_diffusion/pipeline_perpneg_stable_diffusion_rotation.py",
    "content": "\"\"\"\n    modified based on diffusion library from Huggingface: https://github.com/huggingface/diffusers/blob/main/src/diffusers/pipelines/stable_diffusion/pipeline_stable_diffusion.py\n\"\"\"\nimport inspect\nfrom itertools import accumulate\nimport warnings\nfrom typing import List, Optional, Union\n\nimport torch\n\nfrom tqdm.auto import tqdm\nfrom transformers import CLIPFeatureExtractor, CLIPTextModel, CLIPTokenizer\n\nfrom diffusers.models import AutoencoderKL, UNet2DConditionModel\nfrom diffusers.pipeline_utils import DiffusionPipeline\nfrom diffusers.schedulers import DDIMScheduler, LMSDiscreteScheduler, PNDMScheduler\nfrom .safety_checker import StableDiffusionSafetyChecker\nfrom . import StableDiffusionPipelineOutput\n\ndef get_prependicualr_component(x, y):\n    assert x.shape == y.shape\n    return x - ((torch.mul(x, y).sum())/(torch.norm(y)**2)) * y\n\ndef weighted_prependicualr_aggricator(delta_noise_pred_pos, w_pos, delta_noise_pred_neg, w_neg):\n    \n    main_positive = delta_noise_pred_pos[0].unsqueeze(0)\n    accumulated_output = 0\n    for i, complementory_positive in enumerate(delta_noise_pred_pos[1:]):\n        accumulated_output +=  w_pos[i] * get_prependicualr_component(complementory_positive.unsqueeze(0), main_positive)\n        \n    for i, w_n in enumerate(w_neg):\n        accumulated_output -= w_n * get_prependicualr_component(delta_noise_pred_neg[i].unsqueeze(0), main_positive)\n        \n    return accumulated_output + main_positive\n    \n\n\nclass PerpStableDiffusionPipeline(DiffusionPipeline):\n    r\"\"\"\n    Pipeline for text-to-image generation using Stable Diffusion.\n\n    This model inherits from [`DiffusionPipeline`]. Check the superclass documentation for the generic methods the\n    library implements for all the pipelines (such as downloading or saving, running on a particular device, etc.)\n\n    Args:\n        vae ([`AutoencoderKL`]):\n            Variational Auto-Encoder (VAE) Model to encode and decode images to and from latent representations.\n        text_encoder ([`CLIPTextModel`]):\n            Frozen text-encoder. Stable Diffusion uses the text portion of\n            [CLIP](https://huggingface.co/docs/transformers/model_doc/clip#transformers.CLIPTextModel), specifically\n            the [clip-vit-large-patch14](https://huggingface.co/openai/clip-vit-large-patch14) variant.\n        tokenizer (`CLIPTokenizer`):\n            Tokenizer of class\n            [CLIPTokenizer](https://huggingface.co/docs/transformers/v4.21.0/en/model_doc/clip#transformers.CLIPTokenizer).\n        unet ([`UNet2DConditionModel`]): Conditional U-Net architecture to denoise the encoded image latents.\n        scheduler ([`SchedulerMixin`]):\n            A scheduler to be used in combination with `unet` to denoise the encoded image latens. Can be one of\n            [`DDIMScheduler`], [`LMSDiscreteScheduler`], or [`PNDMScheduler`].\n        safety_checker ([`StableDiffusionSafetyChecker`]):\n            Classification module that estimates whether generated images could be considered offsensive or harmful.\n            Please, refer to the [model card](https://huggingface.co/CompVis/stable-diffusion-v1-4) for details.\n        feature_extractor ([`CLIPFeatureExtractor`]):\n            Model that extracts features from generated images to be used as inputs for the `safety_checker`.\n    \"\"\"\n\n    def __init__(\n        self,\n        vae: AutoencoderKL,\n        text_encoder: CLIPTextModel,\n        tokenizer: CLIPTokenizer,\n        unet: UNet2DConditionModel,\n        scheduler: Union[DDIMScheduler, PNDMScheduler, LMSDiscreteScheduler],\n        safety_checker: StableDiffusionSafetyChecker,\n        feature_extractor: CLIPFeatureExtractor,\n    ):\n        super().__init__()\n        #scheduler = scheduler.set_format(\"pt\")\n        self.register_modules(\n            vae=vae,\n            text_encoder=text_encoder,\n            tokenizer=tokenizer,\n            unet=unet,\n            scheduler=scheduler,\n            safety_checker=safety_checker,\n            feature_extractor=feature_extractor,\n        )\n\n    def enable_attention_slicing(self, slice_size: Optional[Union[str, int]] = \"auto\"):\n        r\"\"\"\n        Enable sliced attention computation.\n\n        When this option is enabled, the attention module will split the input tensor in slices, to compute attention\n        in several steps. This is useful to save some memory in exchange for a small speed decrease.\n\n        Args:\n            slice_size (`str` or `int`, *optional*, defaults to `\"auto\"`):\n                When `\"auto\"`, halves the input to the attention heads, so attention will be computed in two steps. If\n                a number is provided, uses as many slices as `attention_head_dim // slice_size`. In this case,\n                `attention_head_dim` must be a multiple of `slice_size`.\n        \"\"\"\n        if slice_size == \"auto\":\n            # half the attention head size is usually a good trade-off between\n            # speed and memory\n            slice_size = self.unet.config.attention_head_dim // 2\n        self.unet.set_attention_slice(slice_size)\n\n    def disable_attention_slicing(self):\n        r\"\"\"\n        Disable sliced attention computation. If `enable_attention_slicing` was previously invoked, this method will go\n        back to computing attention in one step.\n        \"\"\"\n        # set slice_size = `None` to disable `attention slicing`\n        self.enable_attention_slicing(None)\n\n    @torch.no_grad()\n    def __call__(\n        self,\n        prompt: Union[str, List[str]],\n        combined_w: Union[float, List[float]] = 0.5,\n        height: Optional[int] = 512,\n        width: Optional[int] = 512,\n        num_inference_steps: Optional[int] = 50,\n        guidance_scale: Optional[float] = 7.5,\n        eta: Optional[float] = 0.0,\n        generator: Optional[torch.Generator] = None,\n        latents: Optional[torch.FloatTensor] = None,\n        output_type: Optional[str] = \"pil\",\n        return_dict: bool = True,\n        weights: Optional[str] = \"\",\n        **kwargs,\n    ):\n        r\"\"\"\n        Function invoked when calling the pipeline for generation.\n\n        Args:\n            prompt (`str` or `List[str]`):\n                The prompt or prompts to guide the image generation.\n            height (`int`, *optional*, defaults to 512):\n                The height in pixels of the generated image.\n            width (`int`, *optional*, defaults to 512):\n                The width in pixels of the generated image.\n            num_inference_steps (`int`, *optional*, defaults to 50):\n                The number of denoising steps. More denoising steps usually lead to a higher quality image at the\n                expense of slower inference.\n            guidance_scale (`float`, *optional*, defaults to 7.5):\n                Guidance scale as defined in [Classifier-Free Diffusion Guidance](https://arxiv.org/abs/2207.12598).\n                `guidance_scale` is defined as `w` of equation 2. of [Imagen\n                Paper](https://arxiv.org/pdf/2205.11487.pdf). Guidance scale is enabled by setting `guidance_scale >\n                1`. Higher guidance scale encourages to generate images that are closely linked to the text `prompt`,\n                usually at the expense of lower image quality.\n            eta (`float`, *optional*, defaults to 0.0):\n                Corresponds to parameter eta (η) in the DDIM paper: https://arxiv.org/abs/2010.02502. Only applies to\n                [`schedulers.DDIMScheduler`], will be ignored for others.\n            generator (`torch.Generator`, *optional*):\n                A [torch generator](https://pytorch.org/docs/stable/generated/torch.Generator.html) to make generation\n                deterministic.\n            latents (`torch.FloatTensor`, *optional*):\n                Pre-generated noisy latents, sampled from a Gaussian distribution, to be used as inputs for image\n                generation. Can be used to tweak the same generation with different prompts. If not provided, a latents\n                tensor will ge generated by sampling using the supplied random `generator`.\n            output_type (`str`, *optional*, defaults to `\"pil\"`):\n                The output format of the generate image. Choose between\n                [PIL](https://pillow.readthedocs.io/en/stable/): `PIL.Image.Image` or `nd.array`.\n            return_dict (`bool`, *optional*, defaults to `True`):\n                Whether or not to return a [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] instead of a\n                plain tuple.\n\n        Returns:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] or `tuple`:\n            [`~pipelines.stable_diffusion.StableDiffusionPipelineOutput`] if `return_dict` is True, otherwise a `tuple.\n            When returning a tuple, the first element is a list with the generated images, and the second element is a\n            list of `bool`s denoting whether the corresponding generated image likely represents \"not-safe-for-work\"\n            (nsfw) content, according to the `safety_checker`.\n        \"\"\"\n\n        if \"torch_device\" in kwargs:\n            device = kwargs.pop(\"torch_device\")\n            warnings.warn(\n                \"`torch_device` is deprecated as an input argument to `__call__` and will be removed in v0.3.0.\"\n                \" Consider using `pipe.to(torch_device)` instead.\"\n            )\n\n            # Set device as before (to be removed in 0.3.0)\n            if device is None:\n                device = \"cuda\" if torch.cuda.is_available() else \"cpu\"\n            self.to(device)\n\n        if isinstance(prompt, str):\n            batch_size = 1\n        elif isinstance(prompt, list):\n            batch_size = len(prompt)\n        else:\n            raise ValueError(f\"`prompt` has to be of type `str` or `list` but is {type(prompt)}\")\n\n        if height % 8 != 0 or width % 8 != 0:\n            raise ValueError(f\"`height` and `width` have to be divisible by 8 but are {height} and {width}.\")\n\n        if '|' in prompt:\n            prompt = [x.strip() for x in prompt.split('|')]\n            print(f\"composing {prompt}...\")\n\n        # get prompt text embeddings\n        text_input = self.tokenizer(\n            prompt,\n            padding=\"max_length\",\n            max_length=self.tokenizer.model_max_length,\n            truncation=True,\n            return_tensors=\"pt\",\n        )\n        text_embeddings = self.text_encoder(text_input.input_ids.to(self.device))[0]\n        main_text = combined_w *  text_embeddings[0] + (1 - combined_w) * text_embeddings[1]\n        \n        text_embeddings = torch.cat([main_text.unsqueeze(0), text_embeddings], dim=0)   \n        \n        # if not weights:\n        #     # specify weights for prompts (excluding the unconditional score)\n        #     print('using equal weights for all prompts...')\n        #     pos_weights = torch.tensor([1 / (text_embeddings.shape[0] - 1)] * (text_embeddings.shape[0] - 1),\n        #                                device=self.device).reshape(-1, 1, 1, 1)\n        #     neg_weights = torch.tensor([1.], device=self.device).reshape(-1, 1, 1, 1)\n        #     mask = torch.tensor([False] + [True] * pos_weights.shape[0], dtype=torch.bool)\n        # else:\n\n        weights = [float(w.strip()) for w in weights.split(\"|\")]\n        weights = torch.tensor(weights, device=self.device)\n        assert len(weights) == text_embeddings.shape[0], \"weights specified are not equal to the number of prompts\"\n        pos_weights = []\n        neg_weights = []\n        mask = []  # first one is unconditional score\n        for w in weights:\n            if w > 0:\n                pos_weights.append(w)\n                mask.append(True)\n            else:\n                neg_weights.append(abs(w))\n                mask.append(False)\n        # normalize the weights\n        pos_weights = torch.tensor(pos_weights, device=self.device).reshape(-1, 1, 1, 1)\n        neg_weights = torch.tensor(neg_weights, device=self.device).reshape(-1, 1, 1, 1)            \n        mask = torch.tensor(mask, device=self.device, dtype=torch.bool)\n        \n        \n#         text_info['weights'] = torch.cat([torch.ones(1).to(text_embeddings.device), text_info['weights']], dim=0)\n\n#         decay_w_front_prompt = torch.exp(-(1-combine_w) * opt.front_decay_factor) * opt.scale_front_side_negate  # decay factor: 4, 12\n#         decay_w_side_prompt = torch.exp(-combine_w * opt.side_decay_factor) * opt.scale_front_side_negate        # scale: 1  \n\n#         # print(\"before text_info,\", text_info['neg_weights'][0])\n#         text_info['weights'][1] *= decay_w_front_prompt\n#         text_info['weights'][2] *= decay_w_side_prompt\n\n#         text_info['prompt'] =  f' {torch.rad2deg(phis) = :.3f} {combine_w = :.3f} $$ ' + text_info['prompt']\n\n        # here `guidance_scale` is defined analog to the guidance weight `w` of equation (2)\n        # of the Imagen paper: https://arxiv.org/pdf/2205.11487.pdf . `guidance_scale = 1`\n        # corresponds to doing no classifier free guidance.\n        do_classifier_free_guidance = guidance_scale > 1.0\n        # get unconditional embeddings for classifier free guidance\n        # if do_classifier_free_guidance:\n        max_length = text_input.input_ids.shape[-1]\n        \n        uncond_input = self.tokenizer(\n                [\"\"] * 1, padding=\"max_length\", max_length=max_length, return_tensors=\"pt\"\n            )\n        uncond_embeddings = self.text_encoder(uncond_input.input_ids.to(self.device))[0]\n\n        # get the initial random noise unless the user supplied it\n\n        # Unlike in other pipelines, latents need to be generated in the target device\n        # for 1-to-1 results reproducibility with the CompVis implementation.\n        # However this currently doesn't work in `mps`.\n        latents_device = \"cpu\" if self.device.type == \"mps\" else self.device\n        latents_shape = (batch_size, self.unet.in_channels, height // 8, width // 8)\n        if latents is None:\n            latents = torch.randn(\n                latents_shape,\n                generator=generator,\n                device=latents_device,\n            )\n        else:\n            if latents.shape != latents_shape:\n                raise ValueError(f\"Unexpected latents shape, got {latents.shape}, expected {latents_shape}\")\n        latents = latents.to(self.device)\n\n        # set timesteps\n        accepts_offset = \"offset\" in set(inspect.signature(self.scheduler.set_timesteps).parameters.keys())\n        extra_set_kwargs = {}\n        if accepts_offset:\n            extra_set_kwargs[\"offset\"] = 1\n\n        self.scheduler.set_timesteps(num_inference_steps, **extra_set_kwargs)\n\n        # if we use LMSDiscreteScheduler, let's make sure latents are mulitplied by sigmas\n        if isinstance(self.scheduler, LMSDiscreteScheduler):\n            latents = latents * self.scheduler.sigmas[0]\n\n        # prepare extra kwargs for the scheduler step, since not all schedulers have the same signature\n        # eta (η) is only used with the DDIMScheduler, it will be ignored for other schedulers.\n        # eta corresponds to η in DDIM paper: https://arxiv.org/abs/2010.02502\n        # and should be between [0, 1]\n        accepts_eta = \"eta\" in set(inspect.signature(self.scheduler.step).parameters.keys())\n        extra_step_kwargs = {}\n        if accepts_eta:\n            extra_step_kwargs[\"eta\"] = eta\n\n        for i, t in enumerate(self.progress_bar(self.scheduler.timesteps)):\n            # expand the latents if we are doing classifier free guidance\n            latent_model_input = torch.cat([latents] * text_embeddings.shape[0]) if do_classifier_free_guidance else latents\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                sigma = self.scheduler.sigmas[i]\n                # the model input needs to be scaled to match the continuous ODE formulation in K-LMS\n                latent_model_input = latent_model_input / ((sigma**2 + 1) ** 0.5)\n\n            # reduce memory by predicting each score sequentially\n            noise_preds = []\n            # predict the noise residual\n            for latent_in, text_embedding_in in zip(\n                    torch.chunk(latent_model_input, chunks=latent_model_input.shape[0], dim=0),\n                    torch.chunk(text_embeddings, chunks=text_embeddings.shape[0], dim=0)):\n                noise_preds.append(self.unet(latent_in, t, encoder_hidden_states=text_embedding_in).sample)\n            noise_preds = torch.cat(noise_preds, dim=0)\n            \n            noise_pred_uncond = self.unet(latents, t, encoder_hidden_states=uncond_embeddings).sample\n\n            # perform guidance\n            if do_classifier_free_guidance:\n                delta_noise_pred_neg = noise_preds[~mask] - noise_pred_uncond\n                delta_noise_pred_pos = noise_preds[mask] - noise_pred_uncond\n                \n                noise_pred = noise_pred_uncond + guidance_scale * weighted_prependicualr_aggricator(delta_noise_pred_pos, pos_weights, delta_noise_pred_neg, neg_weights)\n\n            # compute the previous noisy sample x_t -> x_t-1\n            if isinstance(self.scheduler, LMSDiscreteScheduler):\n                latents = self.scheduler.step(noise_pred, i, latents, **extra_step_kwargs).prev_sample\n            else:\n                latents = self.scheduler.step(noise_pred, t, latents, **extra_step_kwargs).prev_sample\n\n        # scale and decode the image latents with vae\n        latents = 1 / 0.18215 * latents\n        image = self.vae.decode(latents).sample\n\n        image = (image / 2 + 0.5).clamp(0, 1)\n        image = image.cpu().permute(0, 2, 3, 1).numpy()\n\n        # run safety checker\n        safety_cheker_input = self.feature_extractor(self.numpy_to_pil(image), return_tensors=\"pt\").to(self.device)\n        image, has_nsfw_concept = self.safety_checker(images=image, clip_input=safety_cheker_input.pixel_values)\n\n        has_nsfw_concept = [False for i in range(image.shape[0])]\n        \n        if output_type == \"pil\":\n            image = self.numpy_to_pil(image)\n\n        if not return_dict:\n            return (image, has_nsfw_concept)\n\n        return StableDiffusionPipelineOutput(images=image, nsfw_content_detected=has_nsfw_concept)"
  },
  {
    "path": "perpneg_diffusion/perpneg_stable_diffusion/safety_checker.py",
    "content": "\"\"\"\n    file copy from diffusion library from Huggingface: https://github.com/huggingface/diffusers/blob/main/src/diffusers/pipelines/stable_diffusion/safety_checker.py\n\"\"\"\nimport numpy as np\nimport torch\nimport torch.nn as nn\n\nfrom transformers import CLIPConfig, CLIPVisionModel, PreTrainedModel\n\nfrom diffusers.utils import logging\n\n\nlogger = logging.get_logger(__name__)\n\n\ndef cosine_distance(image_embeds, text_embeds):\n    normalized_image_embeds = nn.functional.normalize(image_embeds)\n    normalized_text_embeds = nn.functional.normalize(text_embeds)\n    return torch.mm(normalized_image_embeds, normalized_text_embeds.t())\n\n\nclass StableDiffusionSafetyChecker(PreTrainedModel):\n    config_class = CLIPConfig\n\n    def __init__(self, config: CLIPConfig):\n        super().__init__(config)\n\n        self.vision_model = CLIPVisionModel(config.vision_config)\n        self.visual_projection = nn.Linear(config.vision_config.hidden_size, config.projection_dim, bias=False)\n\n        self.concept_embeds = nn.Parameter(torch.ones(17, config.projection_dim), requires_grad=False)\n        self.special_care_embeds = nn.Parameter(torch.ones(3, config.projection_dim), requires_grad=False)\n\n        self.register_buffer(\"concept_embeds_weights\", torch.ones(17))\n        self.register_buffer(\"special_care_embeds_weights\", torch.ones(3))\n\n    @torch.no_grad()\n    def forward(self, clip_input, images):\n        pooled_output = self.vision_model(clip_input)[1]  # pooled_output\n        image_embeds = self.visual_projection(pooled_output)\n\n        special_cos_dist = cosine_distance(image_embeds, self.special_care_embeds).cpu().numpy()\n        cos_dist = cosine_distance(image_embeds, self.concept_embeds).cpu().numpy()\n\n        result = []\n        batch_size = image_embeds.shape[0]\n        for i in range(batch_size):\n            result_img = {\"special_scores\": {}, \"special_care\": [], \"concept_scores\": {}, \"bad_concepts\": []}\n\n            # increase this value to create a stronger `nfsw` filter\n            # at the cost of increasing the possibility of filtering benign images\n            adjustment = 0.0\n\n            for concet_idx in range(len(special_cos_dist[0])):\n                concept_cos = special_cos_dist[i][concet_idx]\n                concept_threshold = self.special_care_embeds_weights[concet_idx].item()\n                result_img[\"special_scores\"][concet_idx] = round(concept_cos - concept_threshold + adjustment, 3)\n                if result_img[\"special_scores\"][concet_idx] > 0:\n                    result_img[\"special_care\"].append({concet_idx, result_img[\"special_scores\"][concet_idx]})\n                    adjustment = 0.01\n\n            for concet_idx in range(len(cos_dist[0])):\n                concept_cos = cos_dist[i][concet_idx]\n                concept_threshold = self.concept_embeds_weights[concet_idx].item()\n                result_img[\"concept_scores\"][concet_idx] = round(concept_cos - concept_threshold + adjustment, 3)\n                if result_img[\"concept_scores\"][concet_idx] > 0:\n                    result_img[\"bad_concepts\"].append(concet_idx)\n\n            result.append(result_img)\n\n        has_nsfw_concepts = [len(res[\"bad_concepts\"]) > 0 for res in result]\n\n        # for idx, has_nsfw_concept in enumerate(has_nsfw_concepts):\n        #     if has_nsfw_concept:\n        #         images[idx] = np.zeros(images[idx].shape)  # black image\n\n        # if any(has_nsfw_concepts):\n        #     logger.warning(\n        #         \"Potential NSFW content was detected in one or more images. A black image will be returned instead.\"\n        #         \" Try again with a different prompt and/or seed.\"\n        #     )\n\n        return images, has_nsfw_concepts\n\n    @torch.inference_mode()\n    def forward_onnx(self, clip_input: torch.FloatTensor, images: torch.FloatTensor):\n        pooled_output = self.vision_model(clip_input)[1]  # pooled_output\n        image_embeds = self.visual_projection(pooled_output)\n\n        special_cos_dist = cosine_distance(image_embeds, self.special_care_embeds)\n        cos_dist = cosine_distance(image_embeds, self.concept_embeds)\n\n        # increase this value to create a stronger `nsfw` filter\n        # at the cost of increasing the possibility of filtering benign images\n        adjustment = 0.0\n\n        special_scores = special_cos_dist - self.special_care_embeds_weights + adjustment\n        # special_scores = special_scores.round(decimals=3)\n        special_care = torch.any(special_scores > 0, dim=1)\n        special_adjustment = special_care * 0.01\n        special_adjustment = special_adjustment.unsqueeze(1).expand(-1, cos_dist.shape[1])\n\n        concept_scores = (cos_dist - self.concept_embeds_weights) + special_adjustment\n        # concept_scores = concept_scores.round(decimals=3)\n        has_nsfw_concepts = torch.any(concept_scores > 0, dim=1)\n\n        #images[has_nsfw_concepts] = 0.0  # black image\n\n        return images, has_nsfw_concepts"
  },
  {
    "path": "scripts/image_sample_stable_diffusion.py",
    "content": "import torch as th\nimport numpy as np\nimport torchvision.utils as tvu\nimport os\n\nimport argparse\n\nparser = argparse.ArgumentParser()\nparser.add_argument(\"--prompt\", type=str, default=\"a forest | a camel\",\n                    help=\"use '|' as the delimiter to compose separate sentences.\")\nparser.add_argument(\"--steps\", type=int, default=50)\nparser.add_argument(\"--scale\", type=float, default=7.5)\nparser.add_argument(\"--weights\", type=str, default=\"\")\nparser.add_argument(\"--combined_weights\", type=float, default=0)\nparser.add_argument(\"--pipeline\", type=str, default=\"\")\nparser.add_argument(\"--seed\", type=int, default=0)\nparser.add_argument(\"--num_images\", type=int, default=4)\nargs = parser.parse_args()\n\nhas_cuda = th.cuda.is_available()\ndevice = th.device('cpu' if not has_cuda else 'cuda')\n\nprompt = args.prompt\nscale = args.scale\nsteps = args.steps\n\nif args.pipeline == \"cebm\":\n    from perpneg_diffusion.perpneg_stable_diffusion.pipeline_composable_stable_diffusion import ComposableStableDiffusionPipeline\n    pipe = ComposableStableDiffusionPipeline.from_pretrained(\n    \"CompVis/stable-diffusion-v1-4\",\n    use_auth_token=True\n    ).to(device)\n    rotation_flag=False\nelif args.pipeline == \"perpneg\":\n    from perpneg_diffusion.perpneg_stable_diffusion.pipeline_perpneg_stable_diffusion import PerpStableDiffusionPipeline\n    pipe = PerpStableDiffusionPipeline.from_pretrained(\n    \"CompVis/stable-diffusion-v1-4\",\n    use_auth_token=True\n    ).to(device)\n    rotation_flag=False\nelif args.pipeline == \"rotation_perpneg\":\n    from perpneg_diffusion.perpneg_stable_diffusion.pipeline_perpneg_stable_diffusion_rotation import PerpStableDiffusionPipeline\n    pipe = PerpStableDiffusionPipeline.from_pretrained(\n    \"CompVis/stable-diffusion-v1-4\",\n    use_auth_token=True\n    ).to(device)\n    rotation_flag=True\n    \n\n\ndef dummy(images, **kwargs):\n    return images, False\n\n\npipe.safety_checker = dummy\nos.makedirs(args.pipeline, exist_ok=True)\nimages = []\ngenerator = th.Generator(\"cuda\").manual_seed(args.seed)\nfor i in range(args.num_images):\n    if rotation_flag:\n        image = pipe(prompt, combined_w=args.combined_weights, guidance_scale=scale, num_inference_steps=steps,\n                     weights=args.weights, generator=generator)[\"images\"][0]\n    else:\n        image = pipe(prompt, guidance_scale=scale, num_inference_steps=steps,\n                     weights=args.weights, generator=generator)[\"images\"][0]\n    images.append(th.from_numpy(np.array(image)).permute(2, 0, 1) / 255.)\ngrid = tvu.make_grid(th.stack(images, dim=0), nrow=4, padding=0)\ntvu.save_image(grid, os.path.join(args.pipeline, f'{prompt}_{args.weights}.png'))\n"
  },
  {
    "path": "setup.py",
    "content": "from setuptools import setup\n\nsetup(\n    name=\"perpneg-diffusion\",\n    packages=[\n        \"perpneg_diffusion\",\n        \"perpneg_diffusion.perpneg_stable_diffusion\",\n    ],\n    install_requires=[\n        \"Pillow\",\n        \"attrs\",\n        \"torch\",\n        \"filelock\",\n        \"requests\",\n        \"tqdm\",\n        \"ftfy\",\n        \"regex\",\n        \"numpy\",\n        \"blobfile\",\n        \"torchvision\",\n        \"diffuser\",\n        \"transformers\"\n    ],\n    author=\"huangjie and reza\",\n    version='2.0',\n)\n"
  },
  {
    "path": "stable-dreamfusion/.gitignore",
    "content": "__pycache__/\nbuild/\n*.egg-info/\n*.so\nvenv_*/\n\ntmp*\n# data/\nldm/data/\ndata2\nscripts2\ntrial*/\n.vs/\n\nTOKEN\n*.ckpt\n\ndensegridencoder\ntets/256_tets.npz\n\n.vscode/launch.json\n\ndata2\ndata/car*\ndata/chair*\ndata/warrior*\ndata/wd*\ndata/space*\ndata/corgi*\ndata/turtle*\n\n# Only keep the original image, not the automatically-generated depth, normals, rgba\ndata/baby_phoenix_on_ice_*\ndata/bollywood_actress_*\ndata/beach_house_1_*\ndata/beach_house_2_*\ndata/mona_lisa_*\ndata/futuristic_car_*\ndata/church_ruins_*\n\n"
  },
  {
    "path": "stable-dreamfusion/LICENSE",
    "content": "                                 Apache License\n                           Version 2.0, January 2004\n                        http://www.apache.org/licenses/\n\n   TERMS AND CONDITIONS FOR USE, REPRODUCTION, AND DISTRIBUTION\n\n   1. Definitions.\n\n      \"License\" shall mean the terms and conditions for use, reproduction,\n      and distribution as defined by Sections 1 through 9 of this document.\n\n      \"Licensor\" shall mean the copyright owner or entity authorized by\n      the copyright owner that is granting the License.\n\n      \"Legal Entity\" shall mean the union of the acting entity and all\n      other entities that control, are controlled by, or are under common\n      control with that entity. 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The text should be enclosed in the appropriate\n      comment syntax for the file format. We also recommend that a\n      file or class name and description of purpose be included on the\n      same \"printed page\" as the copyright notice for easier\n      identification within third-party archives.\n\n   Copyright [yyyy] [name of copyright owner]\n\n   Licensed under the Apache License, Version 2.0 (the \"License\");\n   you may not use this file except in compliance with the License.\n   You may obtain a copy of the License at\n\n       http://www.apache.org/licenses/LICENSE-2.0\n\n   Unless required by applicable law or agreed to in writing, software\n   distributed under the License is distributed on an \"AS IS\" BASIS,\n   WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.\n   See the License for the specific language governing permissions and\n   limitations under the License.\n"
  },
  {
    "path": "stable-dreamfusion/activation.py",
    "content": "import torch\nfrom torch.autograd import Function\nfrom torch.cuda.amp import custom_bwd, custom_fwd \n\nclass _trunc_exp(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float)\n    def forward(ctx, x):\n        ctx.save_for_backward(x)\n        return torch.exp(x)\n\n    @staticmethod\n    @custom_bwd\n    def backward(ctx, g):\n        x = ctx.saved_tensors[0]\n        return g * torch.exp(x.clamp(max=15))\n\ntrunc_exp = _trunc_exp.apply\n\ndef biased_softplus(x, bias=0):\n    return torch.nn.functional.softplus(x - bias)"
  },
  {
    "path": "stable-dreamfusion/assets/advanced.md",
    "content": "\n# Code organization & Advanced tips\n\nThis is a simple description of the most important implementation details.\nIf you are interested in improving this repo, this might be a starting point.\nAny contribution would be greatly appreciated!\n\n* The SDS loss is located at `./guidance/sd_utils.py > StableDiffusion > train_step`:\n```python\n## 1. we need to interpolate the NeRF rendering to 512x512, to feed it to SD's VAE.\npred_rgb_512 = F.interpolate(pred_rgb, (512, 512), mode='bilinear', align_corners=False)\n## 2. image (512x512) --- VAE --> latents (64x64), this is SD's difference from Imagen.\nlatents = self.encode_imgs(pred_rgb_512)\n... # timestep sampling, noise adding and UNet noise predicting\n## 3. the SDS loss\nw = (1 - self.alphas[t])\ngrad = w * (noise_pred - noise)\n# since UNet part is ignored and cannot simply audodiff, we have two ways to set the grad:\n# 3.1. call backward and set the grad now (need to retain graph since we will call a second backward for the other losses later)\nlatents.backward(gradient=grad, retain_graph=True)\nreturn 0 # dummy loss\n# 3.2. use a custom function to set a hook in backward, so we only call backward once (credits to @elliottzheng)\nclass SpecifyGradient(torch.autograd.Function):\n    @staticmethod\n    @custom_fwd\n    def forward(ctx, input_tensor, gt_grad):\n        ctx.save_for_backward(gt_grad)\n        # we return a dummy value 1, which will be scaled by amp's scaler so we get the scale in backward.\n        return torch.ones([1], device=input_tensor.device, dtype=input_tensor.dtype)\n\n    @staticmethod\n    @custom_bwd\n    def backward(ctx, grad_scale):\n        gt_grad, = ctx.saved_tensors\n        gt_grad = gt_grad * grad_scale\n        return gt_grad, None\n\nloss = SpecifyGradient.apply(latents, grad)\nreturn loss # functional loss\n```\n* Other regularizations are in `./nerf/utils.py > Trainer > train_step`.\n    * The generation seems quite sensitive to regularizations on weights_sum (alphas for each ray). The original opacity loss tends to make NeRF disappear (zero density everywhere), so we use an entropy loss to replace it for now (encourages alpha to be either 0 or 1).\n* NeRF Rendering core function: `./nerf/renderer.py > NeRFRenderer > run & run_cuda`.\n* Shading & normal evaluation: `./nerf/network*.py > NeRFNetwork > forward`.\n    * light direction: current implementation use a plane light source, instead of a point light source.\n* View-dependent prompting: `./nerf/provider.py > get_view_direction`.\n    * use `--angle_overhead, --angle_front` to set the border.\n* Network backbone (`./nerf/network*.py`) can be chosen by the `--backbone` option.\n* Spatial density bias (density blob): `./nerf/network*.py > NeRFNetwork > density_blob`.\n\n\n# Debugging\n\n`debugpy-run` is a convenient way to remotely debug this project. Simply replace a command like this one:\n\n```bash\npython main.py --text \"a hamburger\" --workspace trial -O --vram_O\n```\n\n... with:\n\n```bash\ndebugpy-run main.py -- --text \"a hamburger\" --workspace trial -O --vram_O\n```\n\nFor more details: https://github.com/bulletmark/debugpy-run \n\n# Axes and directions of polar, azimuth, etc. in NeRF and Zero123\n\n<img width=\"1119\" alt=\"NeRF_Zero123\" src=\"https://github.com/ashawkey/stable-dreamfusion/assets/22424247/a0f432ff-2d08-45a4-a390-bda64f5cbc94\">\n\nThis code refers to theta for polar, phi for azimuth.\n\n"
  },
  {
    "path": "stable-dreamfusion/assets/update_logs.md",
    "content": "### 2023.4.19\n* Fix depth supervision, migrate depth estimation model to omnidata.\n* Add normal supervision (also by omnidata).\n\nhttps://user-images.githubusercontent.com/25863658/232403294-b77409bf-ddc7-4bb8-af32-ee0cc123825a.mp4\n\n### 2023.4.7\nImprovement on mesh quality & DMTet finetuning support.\n\nhttps://user-images.githubusercontent.com/25863658/230535363-298c960e-bf9c-4906-8b96-cd60edcb24dd.mp4\n\n### 2023.3.30\n* adopt ideas from [Fantasia3D](https://fantasia3d.github.io/) to concatenate normal and mask as the latent code in a warm up stage, which shows faster convergence of shape.\n\nhttps://user-images.githubusercontent.com/25863658/230535373-6ee28f16-bb21-4ec4-bc86-d46597361a04.mp4\n\n### 2023.1.30\n* Use an MLP to predict the surface normals as in Magic3D to avoid finite difference / second order gradient, generation quality is greatly improved.\n* More efficient two-pass raymarching in training inspired by nerfacc.\n\nhttps://user-images.githubusercontent.com/25863658/215996308-9fd959f5-b5c7-4a8e-a241-0fe63ec86a4a.mp4\n\n### 2022.12.3\n* Support Stable-diffusion 2.0 base.\n\n### 2022.11.15\n* Add the vanilla backbone that is pure-pytorch.\n\n### 2022.10.9\n* The shading (partially) starts to work, at least it won't make scene empty. For some prompts, it shows better results (less severe Janus problem). The textureless rendering mode is still disabled.\n* Enable shading by default (--latent_iter_ratio 1000).\n\n### 2022.10.5\n* Basic reproduction finished.\n* Non --cuda_ray, --tcnn are not working, need to fix.\n* Shading is not working, disabled in utils.py for now. Surface normals are bad.\n* Use an entropy loss to regularize weights_sum (alpha), the original L2 reg always leads to degenerated geometry...\n\nhttps://user-images.githubusercontent.com/25863658/194241493-f3e68f78-aefe-479e-a4a8-001424a61b37.mp4\n"
  },
  {
    "path": "stable-dreamfusion/config/anya.csv",
    "content": "zero123_weight, radius, polar, azimuth, image\n1, 3, 90, 0, data/anya_front_rgba.png\n1, 3, 90, 180, data/anya_back_rgba.png"
  },
  {
    "path": "stable-dreamfusion/config/car.csv",
    "content": "zero123_weight, radius, polar, azimuth, image\n4, 3.2, 90, 0, data/car_left_rgba.png\n1, 3, 90, 90, data/car_front_rgba.png\n4, 3.2, 90, 180, data/car_right_rgba.png\n1, 3, 90, -90, data/car_back_rgba.png"
  },
  {
    "path": "stable-dreamfusion/config/corgi.csv",
    "content": "zero123_weight, radius, polar, azimuth, image\n1, 3.2, 90, 0, data/corgi_puppy_sitting_looking_up_rgba.png"
  },
  {
    "path": "stable-dreamfusion/docker/Dockerfile",
    "content": "FROM nvidia/cuda:11.6.2-cudnn8-devel-ubuntu20.04\n\n# Remove any third-party apt sources to avoid issues with expiring keys.\nRUN rm -f /etc/apt/sources.list.d/*.list\n\nRUN apt-get update\n\nRUN DEBIAN_FRONTEND=noninteractive TZ=Europe/MADRID apt-get install -y tzdata\n\n# Install some basic utilities\nRUN apt-get install -y \\\n    curl \\\n    ca-certificates \\\n    sudo \\\n    git \\\n    bzip2 \\\n    libx11-6 \\\n    python3 \\\n    python3-pip \\\n    libglfw3-dev \\\n    libgles2-mesa-dev \\\n    libglib2.0-0 \\\n && rm -rf /var/lib/apt/lists/*\n\n\n# Create a working directory\nRUN mkdir /app\nWORKDIR /app\n\nRUN cd /app\nRUN git clone https://github.com/ashawkey/stable-dreamfusion.git\n\n\nRUN pip3 install torch torchvision torchaudio --extra-index-url https://download.pytorch.org/whl/cu116\n\nWORKDIR /app/stable-dreamfusion\n\nRUN pip3 install -r requirements.txt\nRUN pip3 install git+https://github.com/NVlabs/nvdiffrast/\n\n# Needs nvidia runtime, if you have \"No CUDA runtime is found\" error: https://stackoverflow.com/questions/59691207/docker-build-with-nvidia-runtime, first answer\nRUN pip3 install git+https://github.com/NVlabs/tiny-cuda-nn/#subdirectory=bindings/torch\n\nRUN pip3 install git+https://github.com/openai/CLIP.git\nRUN bash scripts/install_ext.sh\n\n\n\n\n\n# Set the default command to python3\n#CMD [\"python3\"]\n\n"
  },
  {
    "path": "stable-dreamfusion/docker/README.md",
    "content": "### Docker installation\n\n## Build image\nTo build the docker image on your own machine, which may take 15-30 mins:\n```\ndocker build -t stable-dreamfusion:latest .\n```\n\nIf you have the error **No CUDA runtime is found** when building the wheels for tiny-cuda-nn you need to setup the nvidia-runtime for docker.\n```\nsudo apt-get install nvidia-container-runtime\n```\nThen edit `/etc/docker/daemon.json` and add the default-runtime:\n```\n{\n    \"runtimes\": {\n        \"nvidia\": {\n            \"path\": \"nvidia-container-runtime\",\n            \"runtimeArgs\": []\n        }\n    },\n    \"default-runtime\": \"nvidia\"\n}\n```\nAnd restart docker:\n```\nsudo systemctl restart docker\n```\nNow you can build tiny-cuda-nn inside docker.\n\n## Download image\nTo download the image (~6GB) instead:\n```\ndocker pull supercabb/stable-dreamfusion:3080_0.0.1\ndocker tag supercabb/stable-dreamfusion:3080_0.0.1 stable-dreamfusion\n```\n\n## Use image\n\nYou can launch an interactive shell inside the container:\n\n```\ndocker run --gpus all -it --rm -v $(cd ~ && pwd):/mnt stable-dreamfusion /bin/bash\n```\nFrom this shell, all the code in the repo should work.\n\nTo run any single command `<command...>` inside the docker container:\n```\ndocker run --gpus all -it --rm -v $(cd ~ && pwd):/mnt stable-dreamfusion /bin/bash -c \"<command...>\"\n```\nTo train:\n```\nexport TOKEN=\"#HUGGING FACE ACCESS TOKEN#\"\ndocker run --gpus all -it --rm -v $(cd ~ && pwd):/mnt stable-dreamfusion /bin/bash -c \"echo ${TOKEN} > TOKEN \\\n&& python3 main.py --text \\\"a hamburger\\\" --workspace trial -O\"\n\n```\nRun test without gui:\n```\nexport PATH_TO_WORKSPACE=\"#PATH_TO_WORKSPACE#\"\ndocker run --gpus all -it --rm -e DISPLAY=$DISPLAY -v /tmp/.X11-unix:/tmp/.X11-unix:ro -v $(cd ~ && pwd):/mnt \\\n-v $(cd ${PATH_TO_WORKSPACE} && pwd):/app/stable-dreamfusion/trial stable-dreamfusion /bin/bash -c \"python3 \\\nmain.py --workspace trial -O --test\"\n```\nRun test with gui:\n```\nexport PATH_TO_WORKSPACE=\"#PATH_TO_WORKSPACE#\"\nxhost +\ndocker run --gpus all -it --rm -e DISPLAY=$DISPLAY -v /tmp/.X11-unix:/tmp/.X11-unix:ro -v $(cd ~ && pwd):/mnt \\\n-v $(cd ${PATH_TO_WORKSPACE} && pwd):/app/stable-dreamfusion/trial stable-dreamfusion /bin/bash -c \"python3 \\\nmain.py --workspace trial -O --test --gui\"\nxhost -\n```\n\n\n\n\n\n\n\n"
  },
  {
    "path": "stable-dreamfusion/dpt.py",
    "content": "import math\nimport types\n\nimport torch\nimport torch.nn as nn\nimport torch.nn.functional as F\n\nimport timm\n\nclass BaseModel(torch.nn.Module):\n    def load(self, path):\n        \"\"\"Load model from file.\n        Args:\n            path (str): file path\n        \"\"\"\n        parameters = torch.load(path, map_location=torch.device('cpu'))\n\n        if \"optimizer\" in parameters:\n            parameters = parameters[\"model\"]\n\n        self.load_state_dict(parameters)\n\n\ndef unflatten_with_named_tensor(input, dim, sizes):\n    \"\"\"Workaround for unflattening with named tensor.\"\"\"\n    # tracer acts up with unflatten. See https://github.com/pytorch/pytorch/issues/49538\n    new_shape = list(input.shape)[:dim] + list(sizes) + list(input.shape)[dim+1:]\n    return input.view(*new_shape)\n    \nclass Slice(nn.Module):\n    def __init__(self, start_index=1):\n        super(Slice, self).__init__()\n        self.start_index = start_index\n\n    def forward(self, x):\n        return x[:, self.start_index :]\n\n\nclass AddReadout(nn.Module):\n    def __init__(self, start_index=1):\n        super(AddReadout, self).__init__()\n        self.start_index = start_index\n\n    def forward(self, x):\n        if self.start_index == 2:\n            readout = (x[:, 0] + x[:, 1]) / 2\n        else:\n            readout = x[:, 0]\n        return x[:, self.start_index :] + readout.unsqueeze(1)\n\n\nclass ProjectReadout(nn.Module):\n    def __init__(self, in_features, start_index=1):\n        super(ProjectReadout, self).__init__()\n        self.start_index = start_index\n\n        self.project = nn.Sequential(nn.Linear(2 * in_features, in_features), nn.GELU())\n\n    def forward(self, x):\n        readout = x[:, 0].unsqueeze(1).expand_as(x[:, self.start_index :])\n        features = torch.cat((x[:, self.start_index :], readout), -1)\n\n        return self.project(features)\n\n\nclass Transpose(nn.Module):\n    def __init__(self, dim0, dim1):\n        super(Transpose, self).__init__()\n        self.dim0 = dim0\n        self.dim1 = dim1\n\n    def forward(self, x):\n        x = x.transpose(self.dim0, self.dim1)\n        return x\n\n\ndef forward_vit(pretrained, x):\n    b, c, h, w = x.shape\n\n    glob = pretrained.model.forward_flex(x)\n\n    layer_1 = pretrained.activations[\"1\"]\n    layer_2 = pretrained.activations[\"2\"]\n    layer_3 = pretrained.activations[\"3\"]\n    layer_4 = pretrained.activations[\"4\"]\n\n    layer_1 = pretrained.act_postprocess1[0:2](layer_1)\n    layer_2 = pretrained.act_postprocess2[0:2](layer_2)\n    layer_3 = pretrained.act_postprocess3[0:2](layer_3)\n    layer_4 = pretrained.act_postprocess4[0:2](layer_4)\n\n\n    unflattened_dim = 2\n    unflattened_size = (\n        int(torch.div(h, pretrained.model.patch_size[1], rounding_mode='floor')),\n        int(torch.div(w, pretrained.model.patch_size[0], rounding_mode='floor')),\n    )\n    unflatten = nn.Sequential(nn.Unflatten(unflattened_dim, unflattened_size))\n    \n\n    if layer_1.ndim == 3:\n        layer_1 = unflatten(layer_1)\n    if layer_2.ndim == 3:\n        layer_2 = unflatten(layer_2)\n    if layer_3.ndim == 3:\n        layer_3 = unflatten_with_named_tensor(layer_3, unflattened_dim, unflattened_size)\n    if layer_4.ndim == 3:\n        layer_4 = unflatten_with_named_tensor(layer_4, unflattened_dim, unflattened_size)\n\n    layer_1 = pretrained.act_postprocess1[3 : len(pretrained.act_postprocess1)](layer_1)\n    layer_2 = pretrained.act_postprocess2[3 : len(pretrained.act_postprocess2)](layer_2)\n    layer_3 = pretrained.act_postprocess3[3 : len(pretrained.act_postprocess3)](layer_3)\n    layer_4 = pretrained.act_postprocess4[3 : len(pretrained.act_postprocess4)](layer_4)\n\n    return layer_1, layer_2, layer_3, layer_4\n\n\ndef _resize_pos_embed(self, posemb, gs_h, gs_w):\n    posemb_tok, posemb_grid = (\n        posemb[:, : self.start_index],\n        posemb[0, self.start_index :],\n    )\n\n    gs_old = int(math.sqrt(posemb_grid.shape[0]))\n\n    posemb_grid = posemb_grid.reshape(1, gs_old, gs_old, -1).permute(0, 3, 1, 2)\n    posemb_grid = F.interpolate(posemb_grid, size=(gs_h, gs_w), mode=\"bilinear\")\n    posemb_grid = posemb_grid.permute(0, 2, 3, 1).reshape(1, gs_h * gs_w, -1)\n\n    posemb = torch.cat([posemb_tok, posemb_grid], dim=1)\n\n    return posemb\n\n\ndef forward_flex(self, x):\n    b, c, h, w = x.shape\n\n    pos_embed = self._resize_pos_embed(\n        self.pos_embed, torch.div(h, self.patch_size[1], rounding_mode='floor'), torch.div(w, self.patch_size[0], rounding_mode='floor')\n    )\n\n    B = x.shape[0]\n\n    if hasattr(self.patch_embed, \"backbone\"):\n        x = self.patch_embed.backbone(x)\n        if isinstance(x, (list, tuple)):\n            x = x[-1]  # last feature if backbone outputs list/tuple of features\n\n    x = self.patch_embed.proj(x).flatten(2).transpose(1, 2)\n\n    if getattr(self, \"dist_token\", None) is not None:\n        cls_tokens = self.cls_token.expand(\n            B, -1, -1\n        )  # stole cls_tokens impl from Phil Wang, thanks\n        dist_token = self.dist_token.expand(B, -1, -1)\n        x = torch.cat((cls_tokens, dist_token, x), dim=1)\n    else:\n        cls_tokens = self.cls_token.expand(\n            B, -1, -1\n        )  # stole cls_tokens impl from Phil Wang, thanks\n        x = torch.cat((cls_tokens, x), dim=1)\n\n    x = x + pos_embed\n    x = self.pos_drop(x)\n\n    for blk in self.blocks:\n        x = blk(x)\n\n    x = self.norm(x)\n\n    return x\n\n\nactivations = {}\n\n\ndef get_activation(name):\n    def hook(model, input, output):\n        activations[name] = output\n\n    return hook\n\n\ndef get_readout_oper(vit_features, features, use_readout, start_index=1):\n    if use_readout == \"ignore\":\n        readout_oper = [Slice(start_index)] * len(features)\n    elif use_readout == \"add\":\n        readout_oper = [AddReadout(start_index)] * len(features)\n    elif use_readout == \"project\":\n        readout_oper = [\n            ProjectReadout(vit_features, start_index) for out_feat in features\n        ]\n    else:\n        assert (\n            False\n        ), \"wrong operation for readout token, use_readout can be 'ignore', 'add', or 'project'\"\n\n    return readout_oper\n\n\ndef _make_vit_b16_backbone(\n    model,\n    features=[96, 192, 384, 768],\n    size=[384, 384],\n    hooks=[2, 5, 8, 11],\n    vit_features=768,\n    use_readout=\"ignore\",\n    start_index=1,\n):\n    pretrained = nn.Module()\n\n    pretrained.model = model\n    pretrained.model.blocks[hooks[0]].register_forward_hook(get_activation(\"1\"))\n    pretrained.model.blocks[hooks[1]].register_forward_hook(get_activation(\"2\"))\n    pretrained.model.blocks[hooks[2]].register_forward_hook(get_activation(\"3\"))\n    pretrained.model.blocks[hooks[3]].register_forward_hook(get_activation(\"4\"))\n\n    pretrained.activations = activations\n\n    readout_oper = get_readout_oper(vit_features, features, use_readout, start_index)\n\n    # 32, 48, 136, 384\n    pretrained.act_postprocess1 = nn.Sequential(\n        readout_oper[0],\n        Transpose(1, 2),\n        nn.Unflatten(2, torch.Size([size[0] // 16, size[1] // 16])),\n        nn.Conv2d(\n            in_channels=vit_features,\n            out_channels=features[0],\n            kernel_size=1,\n            stride=1,\n            padding=0,\n        ),\n        nn.ConvTranspose2d(\n            in_channels=features[0],\n            out_channels=features[0],\n            kernel_size=4,\n            stride=4,\n            padding=0,\n            bias=True,\n            dilation=1,\n            groups=1,\n        ),\n    )\n\n    pretrained.act_postprocess2 = nn.Sequential(\n        readout_oper[1],\n        Transpose(1, 2),\n        nn.Unflatten(2, torch.Size([size[0] // 16, size[1] // 16])),\n        nn.Conv2d(\n            in_channels=vit_features,\n            out_channels=features[1],\n            kernel_size=1,\n            stride=1,\n            padding=0,\n        ),\n        nn.ConvTranspose2d(\n            in_channels=features[1],\n            out_channels=features[1],\n            kernel_size=2,\n            stride=2,\n            padding=0,\n            bias=True,\n            dilation=1,\n            groups=1,\n        ),\n    )\n\n    pretrained.act_postprocess3 = nn.Sequential(\n        readout_oper[2],\n        Transpose(1, 2),\n        nn.Unflatten(2, torch.Size([size[0] // 16, size[1] // 16])),\n        nn.Conv2d(\n            in_channels=vit_features,\n            out_channels=features[2],\n            kernel_size=1,\n            stride=1,\n            padding=0,\n        ),\n    )\n\n    pretrained.act_postprocess4 = nn.Sequential(\n        readout_oper[3],\n        Transpose(1, 2),\n        nn.Unflatten(2, torch.Size([size[0] // 16, size[1] // 16])),\n        nn.Conv2d(\n            in_channels=vit_features,\n            out_channels=features[3],\n            kernel_size=1,\n            stride=1,\n            padding=0,\n        ),\n        nn.Conv2d(\n            in_channels=features[3],\n            out_channels=features[3],\n            kernel_size=3,\n            stride=2,\n            padding=1,\n        ),\n    )\n\n    pretrained.model.start_index = start_index\n    pretrained.model.patch_size = [16, 16]\n\n    # We inject this function into the VisionTransformer instances so that\n    # we can use it with interpolated position embeddings without modifying the library source.\n    pretrained.model.forward_flex = types.MethodType(forward_flex, pretrained.model)\n    pretrained.model._resize_pos_embed = types.MethodType(\n        _resize_pos_embed, pretrained.model\n    )\n\n    return pretrained\n\n\ndef _make_pretrained_vitl16_384(pretrained, use_readout=\"ignore\", hooks=None):\n    model = timm.create_model(\"vit_large_patch16_384\", pretrained=pretrained)\n\n    hooks = [5, 11, 17, 23] if hooks == None else hooks\n    return _make_vit_b16_backbone(\n        model,\n        features=[256, 512, 1024, 1024],\n        hooks=hooks,\n        vit_features=1024,\n        use_readout=use_readout,\n    )\n\n\ndef _make_pretrained_vitb16_384(pretrained, use_readout=\"ignore\", hooks=None):\n    model = timm.create_model(\"vit_base_patch16_384\", pretrained=pretrained)\n\n    hooks = [2, 5, 8, 11] if hooks == None else hooks\n    return _make_vit_b16_backbone(\n        model, features=[96, 192, 384, 768], hooks=hooks, use_readout=use_readout\n    )\n\n\ndef _make_pretrained_deitb16_384(pretrained, use_readout=\"ignore\", hooks=None):\n    model = timm.create_model(\"vit_deit_base_patch16_384\", pretrained=pretrained)\n\n    hooks = [2, 5, 8, 11] if hooks == None else hooks\n    return _make_vit_b16_backbone(\n        model, features=[96, 192, 384, 768], hooks=hooks, use_readout=use_readout\n    )\n\n\ndef _make_pretrained_deitb16_distil_384(pretrained, use_readout=\"ignore\", hooks=None):\n    model = timm.create_model(\n        \"vit_deit_base_distilled_patch16_384\", pretrained=pretrained\n    )\n\n    hooks = [2, 5, 8, 11] if hooks == None else hooks\n    return _make_vit_b16_backbone(\n        model,\n        features=[96, 192, 384, 768],\n        hooks=hooks,\n        use_readout=use_readout,\n        start_index=2,\n    )\n\n\ndef _make_vit_b_rn50_backbone(\n    model,\n    features=[256, 512, 768, 768],\n    size=[384, 384],\n    hooks=[0, 1, 8, 11],\n    vit_features=768,\n    use_vit_only=False,\n    use_readout=\"ignore\",\n    start_index=1,\n):\n    pretrained = nn.Module()\n\n    pretrained.model = model\n\n    if use_vit_only == True:\n        pretrained.model.blocks[hooks[0]].register_forward_hook(get_activation(\"1\"))\n        pretrained.model.blocks[hooks[1]].register_forward_hook(get_activation(\"2\"))\n    else:\n        pretrained.model.patch_embed.backbone.stages[0].register_forward_hook(\n            get_activation(\"1\")\n        )\n        pretrained.model.patch_embed.backbone.stages[1].register_forward_hook(\n            get_activation(\"2\")\n        )\n\n    pretrained.model.blocks[hooks[2]].register_forward_hook(get_activation(\"3\"))\n    pretrained.model.blocks[hooks[3]].register_forward_hook(get_activation(\"4\"))\n\n    pretrained.activations = activations\n\n    readout_oper = get_readout_oper(vit_features, features, use_readout, start_index)\n\n    if use_vit_only == True:\n        pretrained.act_postprocess1 = nn.Sequential(\n            readout_oper[0],\n            Transpose(1, 2),\n            nn.Unflatten(2, torch.Size([size[0] // 16, size[1] // 16])),\n            nn.Conv2d(\n                in_channels=vit_features,\n                out_channels=features[0],\n                kernel_size=1,\n                stride=1,\n                padding=0,\n            ),\n            nn.ConvTranspose2d(\n                in_channels=features[0],\n                out_channels=features[0],\n                kernel_size=4,\n                stride=4,\n                padding=0,\n                bias=True,\n                dilation=1,\n                groups=1,\n            ),\n        )\n\n        pretrained.act_postprocess2 = nn.Sequential(\n            readout_oper[1],\n            Transpose(1, 2),\n            nn.Unflatten(2, torch.Size([size[0] // 16, size[1] // 16])),\n            nn.Conv2d(\n                in_channels=vit_features,\n                out_channels=features[1],\n                kernel_size=1,\n                stride=1,\n                padding=0,\n            ),\n            nn.ConvTranspose2d(\n                in_channels=features[1],\n                out_channels=features[1],\n                kernel_size=2,\n                stride=2,\n                padding=0,\n                bias=True,\n                dilation=1,\n                groups=1,\n            ),\n        )\n    else:\n        pretrained.act_postprocess1 = nn.Sequential(\n            nn.Identity(), nn.Identity(), nn.Identity()\n        )\n        pretrained.act_postprocess2 = nn.Sequential(\n            nn.Identity(), nn.Identity(), nn.Identity()\n        )\n\n    pretrained.act_postprocess3 = nn.Sequential(\n        readout_oper[2],\n        Transpose(1, 2),\n        nn.Unflatten(2, torch.Size([size[0] // 16, size[1] // 16])),\n        nn.Conv2d(\n            in_channels=vit_features,\n            out_channels=features[2],\n            kernel_size=1,\n            stride=1,\n            padding=0,\n        ),\n    )\n\n    pretrained.act_postprocess4 = nn.Sequential(\n        readout_oper[3],\n        Transpose(1, 2),\n        nn.Unflatten(2, torch.Size([size[0] // 16, size[1] // 16])),\n        nn.Conv2d(\n            in_channels=vit_features,\n            out_channels=features[3],\n            kernel_size=1,\n            stride=1,\n            padding=0,\n        ),\n        nn.Conv2d(\n            in_channels=features[3],\n            out_channels=features[3],\n            kernel_size=3,\n            stride=2,\n            padding=1,\n        ),\n    )\n\n    pretrained.model.start_index = start_index\n    pretrained.model.patch_size = [16, 16]\n\n    # We inject this function into the VisionTransformer instances so that\n    # we can use it with interpolated position embeddings without modifying the library source.\n    pretrained.model.forward_flex = types.MethodType(forward_flex, pretrained.model)\n\n    # We inject this function into the VisionTransformer instances so that\n    # we can use it with interpolated position embeddings without modifying the library source.\n    pretrained.model._resize_pos_embed = types.MethodType(\n        _resize_pos_embed, pretrained.model\n    )\n\n    return pretrained\n\n\ndef _make_pretrained_vitb_rn50_384(\n    pretrained, use_readout=\"ignore\", hooks=None, use_vit_only=False\n):\n    model = timm.create_model(\"vit_base_resnet50_384\", pretrained=pretrained)\n\n    hooks = [0, 1, 8, 11] if hooks == None else hooks\n    return _make_vit_b_rn50_backbone(\n        model,\n        features=[256, 512, 768, 768],\n        size=[384, 384],\n        hooks=hooks,\n        use_vit_only=use_vit_only,\n        use_readout=use_readout,\n    )\n\ndef _make_encoder(backbone, features, use_pretrained, groups=1, expand=False, exportable=True, hooks=None, use_vit_only=False, use_readout=\"ignore\",):\n    if backbone == \"vitl16_384\":\n        pretrained = _make_pretrained_vitl16_384(\n            use_pretrained, hooks=hooks, use_readout=use_readout\n        )\n        scratch = _make_scratch(\n            [256, 512, 1024, 1024], features, groups=groups, expand=expand\n        )  # ViT-L/16 - 85.0% Top1 (backbone)\n    elif backbone == \"vitb_rn50_384\":\n        pretrained = _make_pretrained_vitb_rn50_384(\n            use_pretrained,\n            hooks=hooks,\n            use_vit_only=use_vit_only,\n            use_readout=use_readout,\n        )\n        scratch = _make_scratch(\n            [256, 512, 768, 768], features, groups=groups, expand=expand\n        )  # ViT-H/16 - 85.0% Top1 (backbone)\n    elif backbone == \"vitb16_384\":\n        pretrained = _make_pretrained_vitb16_384(\n            use_pretrained, hooks=hooks, use_readout=use_readout\n        )\n        scratch = _make_scratch(\n            [96, 192, 384, 768], features, groups=groups, expand=expand\n        )  # ViT-B/16 - 84.6% Top1 (backbone)\n    elif backbone == \"resnext101_wsl\":\n        pretrained = _make_pretrained_resnext101_wsl(use_pretrained)\n        scratch = _make_scratch([256, 512, 1024, 2048], features, groups=groups, expand=expand)     # efficientnet_lite3  \n    elif backbone == \"efficientnet_lite3\":\n        pretrained = _make_pretrained_efficientnet_lite3(use_pretrained, exportable=exportable)\n        scratch = _make_scratch([32, 48, 136, 384], features, groups=groups, expand=expand)  # efficientnet_lite3     \n    else:\n        print(f\"Backbone '{backbone}' not implemented\")\n        assert False\n        \n    return pretrained, scratch\n\n\ndef _make_scratch(in_shape, out_shape, groups=1, expand=False):\n    scratch = nn.Module()\n\n    out_shape1 = out_shape\n    out_shape2 = out_shape\n    out_shape3 = out_shape\n    out_shape4 = out_shape\n    if expand==True:\n        out_shape1 = out_shape\n        out_shape2 = out_shape*2\n        out_shape3 = out_shape*4\n        out_shape4 = out_shape*8\n\n    scratch.layer1_rn = nn.Conv2d(\n        in_shape[0], out_shape1, kernel_size=3, stride=1, padding=1, bias=False, groups=groups\n    )\n    scratch.layer2_rn = nn.Conv2d(\n        in_shape[1], out_shape2, kernel_size=3, stride=1, padding=1, bias=False, groups=groups\n    )\n    scratch.layer3_rn = nn.Conv2d(\n        in_shape[2], out_shape3, kernel_size=3, stride=1, padding=1, bias=False, groups=groups\n    )\n    scratch.layer4_rn = nn.Conv2d(\n        in_shape[3], out_shape4, kernel_size=3, stride=1, padding=1, bias=False, groups=groups\n    )\n\n    return scratch\n\n\ndef _make_pretrained_efficientnet_lite3(use_pretrained, exportable=False):\n    efficientnet = torch.hub.load(\n        \"rwightman/gen-efficientnet-pytorch\",\n        \"tf_efficientnet_lite3\",\n        pretrained=use_pretrained,\n        exportable=exportable\n    )\n    return _make_efficientnet_backbone(efficientnet)\n\n\ndef _make_efficientnet_backbone(effnet):\n    pretrained = nn.Module()\n\n    pretrained.layer1 = nn.Sequential(\n        effnet.conv_stem, effnet.bn1, effnet.act1, *effnet.blocks[0:2]\n    )\n    pretrained.layer2 = nn.Sequential(*effnet.blocks[2:3])\n    pretrained.layer3 = nn.Sequential(*effnet.blocks[3:5])\n    pretrained.layer4 = nn.Sequential(*effnet.blocks[5:9])\n\n    return pretrained\n    \n\ndef _make_resnet_backbone(resnet):\n    pretrained = nn.Module()\n    pretrained.layer1 = nn.Sequential(\n        resnet.conv1, resnet.bn1, resnet.relu, resnet.maxpool, resnet.layer1\n    )\n\n    pretrained.layer2 = resnet.layer2\n    pretrained.layer3 = resnet.layer3\n    pretrained.layer4 = resnet.layer4\n\n    return pretrained\n\n\ndef _make_pretrained_resnext101_wsl(use_pretrained):\n    resnet = torch.hub.load(\"facebookresearch/WSL-Images\", \"resnext101_32x8d_wsl\")\n    return _make_resnet_backbone(resnet)\n\n\n\nclass Interpolate(nn.Module):\n    \"\"\"Interpolation module.\n    \"\"\"\n\n    def __init__(self, scale_factor, mode, align_corners=False):\n        \"\"\"Init.\n        Args:\n            scale_factor (float): scaling\n            mode (str): interpolation mode\n        \"\"\"\n        super(Interpolate, self).__init__()\n\n        self.interp = nn.functional.interpolate\n        self.scale_factor = scale_factor\n        self.mode = mode\n        self.align_corners = align_corners\n\n    def forward(self, x):\n        \"\"\"Forward pass.\n        Args:\n            x (tensor): input\n        Returns:\n            tensor: interpolated data\n        \"\"\"\n\n        x = self.interp(\n            x, scale_factor=self.scale_factor, mode=self.mode, align_corners=self.align_corners\n        )\n\n        return x\n\n\nclass ResidualConvUnit(nn.Module):\n    \"\"\"Residual convolution module.\n    \"\"\"\n\n    def __init__(self, features):\n        \"\"\"Init.\n        Args:\n            features (int): number of features\n        \"\"\"\n        super().__init__()\n\n        self.conv1 = nn.Conv2d(\n            features, features, kernel_size=3, stride=1, padding=1, bias=True\n        )\n\n        self.conv2 = nn.Conv2d(\n            features, features, kernel_size=3, stride=1, padding=1, bias=True\n        )\n\n        self.relu = nn.ReLU(inplace=True)\n\n    def forward(self, x):\n        \"\"\"Forward pass.\n        Args:\n            x (tensor): input\n        Returns:\n            tensor: output\n        \"\"\"\n        out = self.relu(x)\n        out = self.conv1(out)\n        out = self.relu(out)\n        out = self.conv2(out)\n\n        return out + x\n\n\nclass FeatureFusionBlock(nn.Module):\n    \"\"\"Feature fusion block.\n    \"\"\"\n\n    def __init__(self, features):\n        \"\"\"Init.\n        Args:\n            features (int): number of features\n        \"\"\"\n        super(FeatureFusionBlock, self).__init__()\n\n        self.resConfUnit1 = ResidualConvUnit(features)\n        self.resConfUnit2 = ResidualConvUnit(features)\n\n    def forward(self, *xs):\n        \"\"\"Forward pass.\n        Returns:\n            tensor: output\n        \"\"\"\n        output = xs[0]\n\n        if len(xs) == 2:\n            output += self.resConfUnit1(xs[1])\n\n        output = self.resConfUnit2(output)\n\n        output = nn.functional.interpolate(\n            output, scale_factor=2, mode=\"bilinear\", align_corners=True\n        )\n\n        return output\n\n\n\n\nclass ResidualConvUnit_custom(nn.Module):\n    \"\"\"Residual convolution module.\n    \"\"\"\n\n    def __init__(self, features, activation, bn):\n        \"\"\"Init.\n        Args:\n            features (int): number of features\n        \"\"\"\n        super().__init__()\n\n        self.bn = bn\n\n        self.groups=1\n\n        self.conv1 = nn.Conv2d(\n            features, features, kernel_size=3, stride=1, padding=1, bias=True, groups=self.groups\n        )\n        \n        self.conv2 = nn.Conv2d(\n            features, features, kernel_size=3, stride=1, padding=1, bias=True, groups=self.groups\n        )\n\n        if self.bn==True:\n            self.bn1 = nn.BatchNorm2d(features)\n            self.bn2 = nn.BatchNorm2d(features)\n\n        self.activation = activation\n\n        self.skip_add = nn.quantized.FloatFunctional()\n\n    def forward(self, x):\n        \"\"\"Forward pass.\n        Args:\n            x (tensor): input\n        Returns:\n            tensor: output\n        \"\"\"\n        \n        out = self.activation(x)\n        out = self.conv1(out)\n        if self.bn==True:\n            out = self.bn1(out)\n       \n        out = self.activation(out)\n        out = self.conv2(out)\n        if self.bn==True:\n            out = self.bn2(out)\n\n        if self.groups > 1:\n            out = self.conv_merge(out)\n\n        return self.skip_add.add(out, x)\n\n        # return out + x\n\n\nclass FeatureFusionBlock_custom(nn.Module):\n    \"\"\"Feature fusion block.\n    \"\"\"\n\n    def __init__(self, features, activation, deconv=False, bn=False, expand=False, align_corners=True):\n        \"\"\"Init.\n        Args:\n            features (int): number of features\n        \"\"\"\n        super(FeatureFusionBlock_custom, self).__init__()\n\n        self.deconv = deconv\n        self.align_corners = align_corners\n\n        self.groups=1\n\n        self.expand = expand\n        out_features = features\n        if self.expand==True:\n            out_features = features//2\n        \n        self.out_conv = nn.Conv2d(features, out_features, kernel_size=1, stride=1, padding=0, bias=True, groups=1)\n\n        self.resConfUnit1 = ResidualConvUnit_custom(features, activation, bn)\n        self.resConfUnit2 = ResidualConvUnit_custom(features, activation, bn)\n        \n        self.skip_add = nn.quantized.FloatFunctional()\n\n    def forward(self, *xs):\n        \"\"\"Forward pass.\n        Returns:\n            tensor: output\n        \"\"\"\n        output = xs[0]\n\n        if len(xs) == 2:\n            res = self.resConfUnit1(xs[1])\n            output = self.skip_add.add(output, res)\n            # output += res\n\n        output = self.resConfUnit2(output)\n\n        output = nn.functional.interpolate(\n            output, scale_factor=2, mode=\"bilinear\", align_corners=self.align_corners\n        )\n\n        output = self.out_conv(output)\n\n        return output        \n\n\n\ndef _make_fusion_block(features, use_bn):\n    return FeatureFusionBlock_custom(\n        features,\n        nn.ReLU(False),\n        deconv=False,\n        bn=use_bn,\n        expand=False,\n        align_corners=True,\n    )\n\n\nclass DPT(BaseModel):\n    def __init__(\n        self,\n        head,\n        features=256,\n        backbone=\"vitb_rn50_384\",\n        readout=\"project\",\n        channels_last=False,\n        use_bn=False,\n    ):\n\n        super(DPT, self).__init__()\n\n        self.channels_last = channels_last\n\n        hooks = {\n            \"vitb_rn50_384\": [0, 1, 8, 11],\n            \"vitb16_384\": [2, 5, 8, 11],\n            \"vitl16_384\": [5, 11, 17, 23],\n        }\n\n        # Instantiate backbone and reassemble blocks\n        self.pretrained, self.scratch = _make_encoder(\n            backbone,\n            features,\n            True, # Set to true of you want to train from scratch, uses ImageNet weights\n            groups=1,\n            expand=False,\n            exportable=False,\n            hooks=hooks[backbone],\n            use_readout=readout,\n        )\n\n        self.scratch.refinenet1 = _make_fusion_block(features, use_bn)\n        self.scratch.refinenet2 = _make_fusion_block(features, use_bn)\n        self.scratch.refinenet3 = _make_fusion_block(features, use_bn)\n        self.scratch.refinenet4 = _make_fusion_block(features, use_bn)\n\n        self.scratch.output_conv = head\n\n\n    def forward(self, x):\n        if self.channels_last == True:\n            x.contiguous(memory_format=torch.channels_last)\n\n        layer_1, layer_2, layer_3, layer_4 = forward_vit(self.pretrained, x)\n\n        layer_1_rn = self.scratch.layer1_rn(layer_1)\n        layer_2_rn = self.scratch.layer2_rn(layer_2)\n        layer_3_rn = self.scratch.layer3_rn(layer_3)\n        layer_4_rn = self.scratch.layer4_rn(layer_4)\n\n        path_4 = self.scratch.refinenet4(layer_4_rn)\n        path_3 = self.scratch.refinenet3(path_4, layer_3_rn)\n        path_2 = self.scratch.refinenet2(path_3, layer_2_rn)\n        path_1 = self.scratch.refinenet1(path_2, layer_1_rn)\n\n        out = self.scratch.output_conv(path_1)\n\n        return out\n\nclass DPTDepthModel(DPT):\n    def __init__(self, path=None, non_negative=True, num_channels=1, **kwargs):\n        features = kwargs[\"features\"] if \"features\" in kwargs else 256\n\n        head = nn.Sequential(\n            nn.Conv2d(features, features // 2, kernel_size=3, stride=1, padding=1),\n            Interpolate(scale_factor=2, mode=\"bilinear\", align_corners=True),\n            nn.Conv2d(features // 2, 32, kernel_size=3, stride=1, padding=1),\n            nn.ReLU(True),\n            nn.Conv2d(32, num_channels, kernel_size=1, stride=1, padding=0),\n            nn.ReLU(True) if non_negative else nn.Identity(),\n            nn.Identity(),\n        )\n\n        super().__init__(head, **kwargs)\n\n        if path is not None:\n           self.load(path)\n\n    def forward(self, x):\n        return super().forward(x).squeeze(dim=1)"
  },
  {
    "path": "stable-dreamfusion/encoding.py",
    "content": "import torch\nimport torch.nn as nn\nimport torch.nn.functional as F\n\nclass FreqEncoder_torch(nn.Module):\n    def __init__(self, input_dim, max_freq_log2, N_freqs,\n                 log_sampling=True, include_input=True,\n                 periodic_fns=(torch.sin, torch.cos)):\n    \n        super().__init__()\n\n        self.input_dim = input_dim\n        self.include_input = include_input\n        self.periodic_fns = periodic_fns\n        self.N_freqs = N_freqs\n\n        self.output_dim = 0\n        if self.include_input:\n            self.output_dim += self.input_dim\n\n        self.output_dim += self.input_dim * N_freqs * len(self.periodic_fns)\n\n        if log_sampling:\n            self.freq_bands = 2 ** torch.linspace(0, max_freq_log2, N_freqs)\n        else:\n            self.freq_bands = torch.linspace(2 ** 0, 2 ** max_freq_log2, N_freqs)\n\n        self.freq_bands = self.freq_bands.numpy().tolist()\n\n    def forward(self, input, max_level=None, **kwargs):\n\n        if max_level is None:\n            max_level = self.N_freqs\n        else:\n            max_level = int(max_level * self.N_freqs)\n\n        out = []\n        if self.include_input:\n            out.append(input)\n\n        for i in range(max_level):\n            freq = self.freq_bands[i]\n            for p_fn in self.periodic_fns:\n                out.append(p_fn(input * freq))\n\n        # append 0\n        if self.N_freqs - max_level > 0:\n            out.append(torch.zeros(*input.shape[:-1], (self.N_freqs - max_level) * 2 * input.shape[-1], device=input.device, dtype=input.dtype))\n        \n        out = torch.cat(out, dim=-1)\n\n        return out\n\ndef get_encoder(encoding, input_dim=3, \n                multires=6, \n                degree=4,\n                num_levels=16, level_dim=2, base_resolution=16, log2_hashmap_size=19, desired_resolution=2048, align_corners=False, interpolation='linear',\n                **kwargs):\n\n    if encoding == 'None':\n        return lambda x, **kwargs: x, input_dim\n    \n    elif encoding == 'frequency_torch':\n        encoder = FreqEncoder_torch(input_dim=input_dim, max_freq_log2=multires-1, N_freqs=multires, log_sampling=True)\n\n    elif encoding == 'frequency': # CUDA implementation, faster than torch.\n        from freqencoder import FreqEncoder\n        encoder = FreqEncoder(input_dim=input_dim, degree=multires)\n\n    elif encoding == 'sphere_harmonics':\n        from shencoder import SHEncoder\n        encoder = SHEncoder(input_dim=input_dim, degree=degree)\n\n    elif encoding == 'hashgrid':\n        from gridencoder import GridEncoder\n        encoder = GridEncoder(input_dim=input_dim, num_levels=num_levels, level_dim=level_dim, base_resolution=base_resolution, log2_hashmap_size=log2_hashmap_size, desired_resolution=desired_resolution, gridtype='hash', align_corners=align_corners, interpolation=interpolation)\n    \n    elif encoding == 'tiledgrid':\n        from gridencoder import GridEncoder\n        encoder = GridEncoder(input_dim=input_dim, num_levels=num_levels, level_dim=level_dim, base_resolution=base_resolution, log2_hashmap_size=log2_hashmap_size, desired_resolution=desired_resolution, gridtype='tiled', align_corners=align_corners, interpolation=interpolation)\n    \n    elif encoding == 'hashgrid_taichi':\n        from taichi_modules.hash_encoder import HashEncoderTaichi\n        encoder = HashEncoderTaichi(batch_size=4096) #TODO: hard encoded batch size\n\n    else:\n        raise NotImplementedError('Unknown encoding mode, choose from [None, frequency, sphere_harmonics, hashgrid, tiledgrid]')\n\n    return encoder, encoder.output_dim"
  },
  {
    "path": "stable-dreamfusion/evaluation/Prompt.py",
    "content": "import textwrap\nfrom transformers import AutoTokenizer, AutoModelForSeq2SeqLM, AutoModelForTokenClassification\nfrom transformers import pipeline\nimport argparse\nimport sys\nimport warnings\nwarnings.filterwarnings(\"ignore\", category=UserWarning)\n\n\n#python Prompt.py --text \"a dog is in front of a rabbit\" --model vlt5\n\n\nif __name__ == '__main__':\n\n    # Mimic the calling part of the main, using\n    parser = argparse.ArgumentParser()\n    parser.add_argument('--text', default=\"\", type=str, help=\"text prompt\")\n    #parser.add_argument('--workspace', default=\"trial\", type=str, help=\"workspace\")\n    parser.add_argument('--model', default='vlt5', type=str, help=\"model choices - vlt5, bert, XLNet\")\n\n    opt = parser.parse_args()\n\n    if opt.model == \"vlt5\":\n        tokenizer = AutoTokenizer.from_pretrained(\"Voicelab/vlt5-base-keywords\")\n        model = AutoModelForSeq2SeqLM.from_pretrained(\"Voicelab/vlt5-base-keywords\")\n\n        task_prefix = \"Keywords: \"\n        inputs = [\n        opt.text\n        ]\n\n        for sample in inputs:\n            input_sequences = [task_prefix + sample]\n            input_ids = tokenizer(\n                input_sequences, return_tensors=\"pt\", truncation=True\n            ).input_ids\n            output = model.generate(input_ids, no_repeat_ngram_size=3, num_beams=4)\n            output_text = tokenizer.decode(output[0], skip_special_tokens=True)\n            #print(sample, \"\\n --->\", output_text)\n\n    elif opt.model == \"bert\":\n        tokenizer = AutoTokenizer.from_pretrained(\"yanekyuk/bert-uncased-keyword-extractor\")\n        model = AutoModelForTokenClassification.from_pretrained(\"yanekyuk/bert-uncased-keyword-extractor\")\n\n        text = opt.text\n        input_ids = tokenizer.encode(text, add_special_tokens=True, return_tensors=\"pt\")\n\n        # Classify tokens\n        outputs = model(input_ids)\n        predictions = outputs.logits.detach().numpy()[0]\n        labels = predictions.argmax(axis=1)\n        labels = labels[1:-1]\n\n        print(labels)\n        tokens = tokenizer.convert_ids_to_tokens(input_ids[0])\n        tokens = tokens[1:-1]\n        output_tokens = [tokens[i] for i in range(len(tokens)) if labels[i] != 0]\n        output_text = tokenizer.convert_tokens_to_string(output_tokens)\n\n        #print(output_text)\n\n\n    elif opt.model == \"XLNet\":\n        tokenizer = AutoTokenizer.from_pretrained(\"jasminejwebb/KeywordIdentifier\")\n        model = AutoModelForTokenClassification.from_pretrained(\"jasminejwebb/KeywordIdentifier\")\n\n        text = opt.text\n        input_ids = tokenizer.encode(text, add_special_tokens=True, return_tensors=\"pt\")\n\n        # Classify tokens\n        outputs = model(input_ids)\n        predictions = outputs.logits.detach().numpy()[0]\n        labels = predictions.argmax(axis=1)\n        labels = labels[1:-1]\n\n        print(labels)\n        tokens = tokenizer.convert_ids_to_tokens(input_ids[0])\n        tokens = tokens[1:-1]\n        output_tokens = [tokens[i] for i in range(len(tokens)) if labels[i] != 0]\n        output_text = tokenizer.convert_tokens_to_string(output_tokens)\n\n        #print(output_text)\n\nwrapped_text = textwrap.fill(output_text, width=50)\n\n\nprint('+' + '-'*52 + '+')\nfor line in wrapped_text.split('\\n'):\n    print('| {} |'.format(line.ljust(50)))\nprint('+' + '-'*52 + '+')\n#print(result)\n"
  },
  {
    "path": "stable-dreamfusion/evaluation/mesh_to_video.py",
    "content": "import os\nimport numpy as np\nimport trimesh\nimport argparse\nfrom pathlib import Path\nfrom tqdm import tqdm\nimport pyvista as pv\n\ndef render_video(anim_mesh):\n    center = anim_mesh.center_mass\n    plotter = pv.Plotter(off_screen=True)\n    plotter.add_mesh(anim_mesh)\n\n    radius = 10\n    n_frames = 360  \n    angle_step = 2 * np.pi / n_frames  \n    for i in tqdm(range(n_frames)):\n        camera_pos = [center[0] + radius * np.cos(i*angle_step),center[1] + radius *np.sin(i*angle_step),center[2]]\n        plotter.camera_position = (camera_pos, center, (0, 0, 1))\n        plotter.show(screenshot=f'frame_{i}.png', auto_close=False)\n    plotter.close()\n    os.system('ffmpeg -r 30 -f image2 -s 1920x1080 -i \"result/frame_%d.png\" -vcodec libx264 -crf 25  -pix_fmt yuv420p result/output.mp4')\n\n\n\ndef generate_mesh(obj1,obj2,transform_vector):\n\n    # Read 2 objects\n    filename1 = obj1 # Central Object\n    filename2 = obj2 # Surrounding Object\n    mesh1 = trimesh.load_mesh(filename1)\n    mesh2 = trimesh.load_mesh(filename2)\n\n    extents1 = mesh1.extents\n    extents2 = mesh1.extents\n    \n    radius1 = sum(extents1) / 3.0\n    radius2 = sum(extents2) / 3.0\n\n    center1 = mesh1.center_mass\n    center2 = mesh2.center_mass\n\n    # Move\n    T1 = -center1\n    new =[]\n    for i in transform_vector:\n        try:\n            new.append(float(i))*radius1\n        except:\n            pass\n    transform_vector = new\n    print(T1, transform_vector, radius1)\n    T2 = -center2 + transform_vector\n\n    # Transform\n    mesh1.apply_translation(T1)\n    mesh2.apply_translation(T2)\n\n    # merge mesh\n    merged_mesh = trimesh.util.concatenate((mesh1, mesh2))\n\n    # save mesh\n    merged_mesh.export('merged_mesh.obj')\n    print(\"----> merge mesh done\")\n\nif __name__ == '__main__':\n    parser = argparse.ArgumentParser(description='Generate rotating mesh animation.')\n    parser.add_argument('--center_obj', type=str, help='Input OBJ1 file.')\n    parser.add_argument('--surround_obj', type=str, help='Input OBJ2 file.')\n    parser.add_argument('--transform_vector', help='Transform_vector.')\n    parser.add_argument('--output_file', type=str, default=\"result/Demo.mp4\", help='Output MP4 file.')\n    parser.add_argument('--num_frames', type=int, default=100, help='Number of frames to render.')\n    args = parser.parse_args()\n    \n    #mesh = obj.Obj(\"wr.obj\")\n    generate_mesh(args.center_obj,args.surround_obj,args.transform_vector)\n\n    input_file = Path(\"merged_mesh.obj\")\n    output_file = Path(args.output_file)\n\n    out_dir = output_file.parent.joinpath('frames')\n    out_dir.mkdir(parents=True, exist_ok=True)\n\n    anim_mesh = trimesh.load_mesh(str(input_file))\n\n    render_video(anim_mesh)\n\n"
  },
  {
    "path": "stable-dreamfusion/evaluation/r_precision.py",
    "content": "from sentence_transformers import SentenceTransformer, util\nfrom PIL import Image\nimport argparse\nimport sys\n\n\nif __name__ == '__main__':\n\n    parser = argparse.ArgumentParser()\n    parser.add_argument('--text', default=\"\", type=str, help=\"text prompt\")\n    parser.add_argument('--workspace', default=\"trial\", type=str, help=\"text prompt\")\n    parser.add_argument('--latest', default='ep0001', type=str, help=\"which epoch result you want to use for image path\")\n    parser.add_argument('--mode', default='rgb', type=str, help=\"mode of result, color(rgb) or textureless()\")\n    parser.add_argument('--clip', default=\"clip-ViT-B-32\", type=str, help=\"CLIP model to encode the img and prompt\")\n\n    opt = parser.parse_args()\n\n    #Load CLIP model\n    model = SentenceTransformer(f'{opt.clip}')\n\n    #Encode an image:\n    img_emb = model.encode(Image.open(f'../results/{opt.workspace}/validation/df_{opt.latest}_0005_{opt.mode}.png'))\n\n    #Encode text descriptions\n    text_emb = model.encode([f'{opt.text}'])\n\n    #Compute cosine similarities\n    cos_scores = util.cos_sim(img_emb, text_emb)\n    print(\"The final CLIP R-Precision is:\", cos_scores[0][0].cpu().numpy())\n\n"
  },
  {
    "path": "stable-dreamfusion/evaluation/readme.md",
    "content": "### Improvement:\n\n- Usage\n\n  - r_precision.py <br>\n  For prompt seperation <br>\n  --text is for the prompt following the author of stable dream fusion <br>\n  --workspace is the workspace folder which will be created for every prompt fed into stable dreamfusion <br>\n  --latest is which ckpt is used. Stable dream fusion record every epoch data. Normally is ep0100 unless the training is not finished or we further extend the training <br>\n  --mode has choices of rgb and depth which is correspondent to color and texture result as original paper Figure 5: Qualitative comparison with baselines. <br>\n  --clip has choices of clip-ViT-B-32, CLIP B/16, CLIP L/14, same as original paper <br>\n\n      ```bash\n      python Prompt.py --text \"matte painting of a castle made of cheesecake surrounded by a moat made of ice cream\" --workspace ../castle --latest ep0100 --mode rgb --clip clip-ViT-B-32\n      ```\n\n  - Prompt.py (model name case sensitive) <br>\n  For prompt seperation <br> <br>\n  --text is for the prompt following the author of stable dream fusion <br>\n  --model is for choose the pretrain models <br>\n\n      ```bash\n      python Prompt.py --text \"a dog is in front of a rabbit\" --model vlt5\n      python Prompt.py --text \"a dog is in front of a rabbit\" --model bert\n      python Prompt.py --text \"a dog is in front of a rabbit\" --model XLNet\n      ```\n\n\n  - mesh_to_video.py <br>\n  --center_obj IS THE CENTER OBJECT <br>\n  --surround_obj IS THE SURROUNDING OBJECT SUBJECT TO CHANGE <br>\n  --transform_vector THE X Y Z 3d vector for transform <br>\n\n      ```bash\n      python mesh_to_video.py --center_obj 'mesh_whiterabbit/mesh.obj' --surround_obj 'mesh_snake/mesh.obj' --transform_vector [1,0,0]\n      ```\n"
  },
  {
    "path": "stable-dreamfusion/freqencoder/__init__.py",
    "content": "from .freq import FreqEncoder"
  },
  {
    "path": "stable-dreamfusion/freqencoder/backend.py",
    "content": "import os\nfrom torch.utils.cpp_extension import load\n\n_src_path = os.path.dirname(os.path.abspath(__file__))\n\nnvcc_flags = [\n    '-O3', '-std=c++14',\n    '-U__CUDA_NO_HALF_OPERATORS__', '-U__CUDA_NO_HALF_CONVERSIONS__', '-U__CUDA_NO_HALF2_OPERATORS__',\n    '-use_fast_math'\n]\n\nif os.name == \"posix\":\n    c_flags = ['-O3', '-std=c++14']\nelif os.name == \"nt\":\n    c_flags = ['/O2', '/std:c++17']\n\n    # find cl.exe\n    def find_cl_path():\n        import glob\n        for program_files in [r\"C:\\\\Program Files (x86)\", r\"C:\\\\Program Files\"]:\n            for edition in [\"Enterprise\", \"Professional\", \"BuildTools\", \"Community\"]:\n                paths = sorted(glob.glob(r\"%s\\\\Microsoft Visual Studio\\\\*\\\\%s\\\\VC\\\\Tools\\\\MSVC\\\\*\\\\bin\\\\Hostx64\\\\x64\" % (program_files, edition)), reverse=True)\n                if paths:\n                    return paths[0]\n\n    # If cl.exe is not on path, try to find it.\n    if os.system(\"where cl.exe >nul 2>nul\") != 0:\n        cl_path = find_cl_path()\n        if cl_path is None:\n            raise RuntimeError(\"Could not locate a supported Microsoft Visual C++ installation\")\n        os.environ[\"PATH\"] += \";\" + cl_path\n\n_backend = load(name='_freqencoder',\n                extra_cflags=c_flags,\n                extra_cuda_cflags=nvcc_flags,\n                sources=[os.path.join(_src_path, 'src', f) for f in [\n                    'freqencoder.cu',\n                    'bindings.cpp',\n                ]],\n                )\n\n__all__ = ['_backend']"
  },
  {
    "path": "stable-dreamfusion/freqencoder/freq.py",
    "content": "import numpy as np\n\nimport torch\nimport torch.nn as nn\nfrom torch.autograd import Function\nfrom torch.autograd.function import once_differentiable\nfrom torch.cuda.amp import custom_bwd, custom_fwd \n\ntry:\n    import _freqencoder as _backend\nexcept ImportError:\n    from .backend import _backend\n\n\nclass _freq_encoder(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32) # force float32 for better precision\n    def forward(ctx, inputs, degree, output_dim):\n        # inputs: [B, input_dim], float \n        # RETURN: [B, F], float\n\n        if not inputs.is_cuda: inputs = inputs.cuda()\n        inputs = inputs.contiguous()\n\n        B, input_dim = inputs.shape # batch size, coord dim\n        \n        outputs = torch.empty(B, output_dim, dtype=inputs.dtype, device=inputs.device)\n\n        _backend.freq_encode_forward(inputs, B, input_dim, degree, output_dim, outputs)\n\n        ctx.save_for_backward(inputs, outputs)\n        ctx.dims = [B, input_dim, degree, output_dim]\n\n        return outputs\n    \n    @staticmethod\n    #@once_differentiable\n    @custom_bwd\n    def backward(ctx, grad):\n        # grad: [B, C * C]\n\n        grad = grad.contiguous()\n        inputs, outputs = ctx.saved_tensors\n        B, input_dim, degree, output_dim = ctx.dims\n\n        grad_inputs = torch.zeros_like(inputs)\n        _backend.freq_encode_backward(grad, outputs, B, input_dim, degree, output_dim, grad_inputs)\n\n        return grad_inputs, None, None\n    \n\nfreq_encode = _freq_encoder.apply\n\n\nclass FreqEncoder(nn.Module):\n    def __init__(self, input_dim=3, degree=4):\n        super().__init__()\n\n        self.input_dim = input_dim\n        self.degree = degree\n        self.output_dim = input_dim + input_dim * 2 * degree\n        \n    def __repr__(self):\n        return f\"FreqEncoder: input_dim={self.input_dim} degree={self.degree} output_dim={self.output_dim}\"\n    \n    def forward(self, inputs, **kwargs):\n        # inputs: [..., input_dim]\n        # return: [..., ]\n\n        prefix_shape = list(inputs.shape[:-1])\n        inputs = inputs.reshape(-1, self.input_dim)\n\n        outputs = freq_encode(inputs, self.degree, self.output_dim)\n\n        outputs = outputs.reshape(prefix_shape + [self.output_dim])\n\n        return outputs"
  },
  {
    "path": "stable-dreamfusion/freqencoder/setup.py",
    "content": "import os\nfrom setuptools import setup\nfrom torch.utils.cpp_extension import BuildExtension, CUDAExtension\n\n_src_path = os.path.dirname(os.path.abspath(__file__))\n\nnvcc_flags = [\n    '-O3', '-std=c++14',\n    '-U__CUDA_NO_HALF_OPERATORS__', '-U__CUDA_NO_HALF_CONVERSIONS__', '-U__CUDA_NO_HALF2_OPERATORS__',\n    '-use_fast_math'\n]\n\nif os.name == \"posix\":\n    c_flags = ['-O3', '-std=c++14']\nelif os.name == \"nt\":\n    c_flags = ['/O2', '/std:c++17']\n\n    # find cl.exe\n    def find_cl_path():\n        import glob\n        for program_files in [r\"C:\\\\Program Files (x86)\", r\"C:\\\\Program Files\"]:\n            for edition in [\"Enterprise\", \"Professional\", \"BuildTools\", \"Community\"]:\n                paths = sorted(glob.glob(r\"%s\\\\Microsoft Visual Studio\\\\*\\\\%s\\\\VC\\\\Tools\\\\MSVC\\\\*\\\\bin\\\\Hostx64\\\\x64\" % (program_files, edition)), reverse=True)\n                if paths:\n                    return paths[0]\n\n    # If cl.exe is not on path, try to find it.\n    if os.system(\"where cl.exe >nul 2>nul\") != 0:\n        cl_path = find_cl_path()\n        if cl_path is None:\n            raise RuntimeError(\"Could not locate a supported Microsoft Visual C++ installation\")\n        os.environ[\"PATH\"] += \";\" + cl_path\n\nsetup(\n    name='freqencoder', # package name, import this to use python API\n    ext_modules=[\n        CUDAExtension(\n            name='_freqencoder', # extension name, import this to use CUDA API\n            sources=[os.path.join(_src_path, 'src', f) for f in [\n                'freqencoder.cu',\n                'bindings.cpp',\n            ]],\n            extra_compile_args={\n                'cxx': c_flags,\n                'nvcc': nvcc_flags,\n            }\n        ),\n    ],\n    cmdclass={\n        'build_ext': BuildExtension,\n    }\n)"
  },
  {
    "path": "stable-dreamfusion/freqencoder/src/bindings.cpp",
    "content": "#include <torch/extension.h>\n\n#include \"freqencoder.h\"\n\nPYBIND11_MODULE(TORCH_EXTENSION_NAME, m) {\n    m.def(\"freq_encode_forward\", &freq_encode_forward, \"freq encode forward (CUDA)\");\n    m.def(\"freq_encode_backward\", &freq_encode_backward, \"freq encode backward (CUDA)\");\n}"
  },
  {
    "path": "stable-dreamfusion/freqencoder/src/freqencoder.cu",
    "content": "#include <stdint.h>\n\n#include <cuda.h>\n#include <cuda_fp16.h>\n#include <cuda_runtime.h>\n\n#include <ATen/cuda/CUDAContext.h>\n#include <torch/torch.h>\n\n#include <algorithm>\n#include <stdexcept>\n\n#include <cstdio>\n\n\n#define CHECK_CUDA(x) TORCH_CHECK(x.device().is_cuda(), #x \" must be a CUDA tensor\")\n#define CHECK_CONTIGUOUS(x) TORCH_CHECK(x.is_contiguous(), #x \" must be a contiguous tensor\")\n#define CHECK_IS_INT(x) TORCH_CHECK(x.scalar_type() == at::ScalarType::Int, #x \" must be an int tensor\")\n#define CHECK_IS_FLOATING(x) TORCH_CHECK(x.scalar_type() == at::ScalarType::Float || x.scalar_type() == at::ScalarType::Half || x.scalar_type() == at::ScalarType::Double, #x \" must be a floating tensor\")\n\ninline constexpr __device__ float PI() { return 3.141592653589793f; }\n\ntemplate <typename T>\n__host__ __device__ T div_round_up(T val, T divisor) {\n    return (val + divisor - 1) / divisor;\n}\n\n// inputs: [B, D]\n// outputs: [B, C], C = D + D * deg * 2\n__global__ void kernel_freq(\n    const float * __restrict__ inputs, \n    uint32_t B, uint32_t D, uint32_t deg, uint32_t C,\n    float * outputs\n) {\n    // parallel on per-element\n    const uint32_t t = threadIdx.x + blockIdx.x * blockDim.x;\n    if (t >= B * C) return;\n\n    // get index\n    const uint32_t b = t / C;\n    const uint32_t c = t - b * C; // t % C;\n\n    // locate\n    inputs += b * D;\n    outputs += t;\n\n    // write self\n    if (c < D) {\n        outputs[0] = inputs[c];\n    // write freq\n    } else {\n        const uint32_t col = c / D - 1;\n        const uint32_t d = c % D;\n        const uint32_t freq = col / 2;\n        const float phase_shift = (col % 2) * (PI() / 2);\n        outputs[0] = __sinf(scalbnf(inputs[d], freq) + phase_shift);\n    }\n}\n\n// grad: [B, C], C = D + D * deg * 2\n// outputs: [B, C]\n// grad_inputs: [B, D]\n__global__ void kernel_freq_backward(\n    const float * __restrict__ grad,\n    const float * __restrict__ outputs,\n    uint32_t B, uint32_t D, uint32_t deg, uint32_t C,\n    float * grad_inputs\n) {\n    // parallel on per-element\n    const uint32_t t = threadIdx.x + blockIdx.x * blockDim.x;\n    if (t >= B * D) return;\n\n    const uint32_t b = t / D;\n    const uint32_t d = t - b * D; // t % D;\n\n    // locate\n    grad += b * C;\n    outputs += b * C;\n    grad_inputs += t;\n\n    // register \n    float result = grad[d];\n    grad += D;\n    outputs += D;\n\n    for (uint32_t f = 0; f < deg; f++) {\n        result += scalbnf(1.0f, f) * (grad[d] * outputs[D + d] - grad[D + d] * outputs[d]);\n        grad += 2 * D;\n        outputs += 2 * D;\n    }\n\n    // write\n    grad_inputs[0] = result;\n}\n\n\nvoid freq_encode_forward(at::Tensor inputs, const uint32_t B, const uint32_t D, const uint32_t deg, const uint32_t C, at::Tensor outputs) {\n    CHECK_CUDA(inputs);\n    CHECK_CUDA(outputs);\n    \n    CHECK_CONTIGUOUS(inputs);\n    CHECK_CONTIGUOUS(outputs);\n\n    CHECK_IS_FLOATING(inputs);\n    CHECK_IS_FLOATING(outputs);\n\n    static constexpr uint32_t N_THREADS = 128;\n\n    kernel_freq<<<div_round_up(B * C, N_THREADS), N_THREADS>>>(inputs.data_ptr<float>(), B, D, deg, C, outputs.data_ptr<float>());\n}\n\n\nvoid freq_encode_backward(at::Tensor grad, at::Tensor outputs, const uint32_t B, const uint32_t D, const uint32_t deg, const uint32_t C, at::Tensor grad_inputs) {\n    CHECK_CUDA(grad);\n    CHECK_CUDA(outputs);\n    CHECK_CUDA(grad_inputs);\n    \n    CHECK_CONTIGUOUS(grad);\n    CHECK_CONTIGUOUS(outputs);\n    CHECK_CONTIGUOUS(grad_inputs);\n\n    CHECK_IS_FLOATING(grad);\n    CHECK_IS_FLOATING(outputs);\n    CHECK_IS_FLOATING(grad_inputs);\n\n    static constexpr uint32_t N_THREADS = 128;\n\n    kernel_freq_backward<<<div_round_up(B * D, N_THREADS), N_THREADS>>>(grad.data_ptr<float>(), outputs.data_ptr<float>(), B, D, deg, C, grad_inputs.data_ptr<float>());\n}"
  },
  {
    "path": "stable-dreamfusion/freqencoder/src/freqencoder.h",
    "content": "# pragma once\n\n#include <stdint.h>\n#include <torch/torch.h>\n\n// _backend.freq_encode_forward(inputs, B, input_dim, degree, output_dim, outputs)\nvoid freq_encode_forward(at::Tensor inputs, const uint32_t B, const uint32_t D, const uint32_t deg, const uint32_t C, at::Tensor outputs);\n\n// _backend.freq_encode_backward(grad, outputs, B, input_dim, degree, output_dim, grad_inputs)\nvoid freq_encode_backward(at::Tensor grad, at::Tensor outputs, const uint32_t B, const uint32_t D, const uint32_t deg, const uint32_t C, at::Tensor grad_inputs);"
  },
  {
    "path": "stable-dreamfusion/gridencoder/__init__.py",
    "content": "from .grid import GridEncoder"
  },
  {
    "path": "stable-dreamfusion/gridencoder/backend.py",
    "content": "import os\nfrom torch.utils.cpp_extension import load\n\n_src_path = os.path.dirname(os.path.abspath(__file__))\n\nnvcc_flags = [\n    '-O3', '-std=c++14',\n    '-U__CUDA_NO_HALF_OPERATORS__', '-U__CUDA_NO_HALF_CONVERSIONS__', '-U__CUDA_NO_HALF2_OPERATORS__',\n]\n\nif os.name == \"posix\":\n    c_flags = ['-O3', '-std=c++14']\nelif os.name == \"nt\":\n    c_flags = ['/O2', '/std:c++17']\n\n    # find cl.exe\n    def find_cl_path():\n        import glob\n        for program_files in [r\"C:\\\\Program Files (x86)\", r\"C:\\\\Program Files\"]:\n            for edition in [\"Enterprise\", \"Professional\", \"BuildTools\", \"Community\"]:\n                paths = sorted(glob.glob(r\"%s\\\\Microsoft Visual Studio\\\\*\\\\%s\\\\VC\\\\Tools\\\\MSVC\\\\*\\\\bin\\\\Hostx64\\\\x64\" % (program_files, edition)), reverse=True)\n                if paths:\n                    return paths[0]\n    # If cl.exe is not on path, try to find it.\n    if os.system(\"where cl.exe >nul 2>nul\") != 0:\n        cl_path = find_cl_path()\n        if cl_path is None:\n            raise RuntimeError(\"Could not locate a supported Microsoft Visual C++ installation\")\n        os.environ[\"PATH\"] += \";\" + cl_path\n\n_backend = load(name='_grid_encoder',\n                extra_cflags=c_flags,\n                extra_cuda_cflags=nvcc_flags,\n                sources=[os.path.join(_src_path, 'src', f) for f in [\n                    'gridencoder.cu',\n                    'bindings.cpp',\n                ]],\n                )\n\n__all__ = ['_backend']"
  },
  {
    "path": "stable-dreamfusion/gridencoder/grid.py",
    "content": "import math\nimport numpy as np\n\nimport torch\nimport torch.nn as nn\nfrom torch.autograd import Function\nfrom torch.autograd.function import once_differentiable\nfrom torch.cuda.amp import custom_bwd, custom_fwd \n\ntry:\n    import _gridencoder as _backend\nexcept ImportError:\n    from .backend import _backend\n\n_gridtype_to_id = {\n    'hash': 0,\n    'tiled': 1,\n}\n\n_interp_to_id = {\n    'linear': 0,\n    'smoothstep': 1,\n}\n\nclass _grid_encode(Function):\n    @staticmethod\n    @custom_fwd\n    def forward(ctx, inputs, embeddings, offsets, per_level_scale, base_resolution, calc_grad_inputs=False, gridtype=0, align_corners=False, interpolation=0, max_level=None):\n        # inputs: [B, D], float in [0, 1]\n        # embeddings: [sO, C], float\n        # offsets: [L + 1], int\n        # RETURN: [B, F], float\n\n        inputs = inputs.contiguous()\n\n        B, D = inputs.shape # batch size, coord dim\n        L = offsets.shape[0] - 1 # level\n        C = embeddings.shape[1] # embedding dim for each level\n        S = np.log2(per_level_scale) # resolution multiplier at each level, apply log2 for later CUDA exp2f\n        H = base_resolution # base resolution\n\n        max_level = L if max_level is None else max(min(int(math.ceil(max_level * L)), L), 1)\n\n        # manually handle autocast (only use half precision embeddings, inputs must be float for enough precision)\n        # if C % 2 != 0, force float, since half for atomicAdd is very slow.\n        if torch.is_autocast_enabled() and C % 2 == 0:\n            embeddings = embeddings.to(torch.half)\n\n        # L first, optimize cache for cuda kernel, but needs an extra permute later\n        outputs = torch.empty(L, B, C, device=inputs.device, dtype=embeddings.dtype)\n\n        # zero init if we only calculate partial levels\n        if max_level < L: outputs.zero_()\n\n        if calc_grad_inputs:\n            dy_dx = torch.empty(B, L * D * C, device=inputs.device, dtype=embeddings.dtype)\n            if max_level < L: dy_dx.zero_()\n        else:\n            dy_dx = None\n\n        _backend.grid_encode_forward(inputs, embeddings, offsets, outputs, B, D, C, L, max_level, S, H, dy_dx, gridtype, align_corners, interpolation)\n\n        # permute back to [B, L * C]\n        outputs = outputs.permute(1, 0, 2).reshape(B, L * C)\n\n        ctx.save_for_backward(inputs, embeddings, offsets, dy_dx)\n        ctx.dims = [B, D, C, L, S, H, gridtype, interpolation, max_level]\n        ctx.align_corners = align_corners\n\n        return outputs\n    \n    @staticmethod\n    #@once_differentiable\n    @custom_bwd\n    def backward(ctx, grad):\n\n        inputs, embeddings, offsets, dy_dx = ctx.saved_tensors\n        B, D, C, L, S, H, gridtype, interpolation, max_level = ctx.dims\n        align_corners = ctx.align_corners\n\n        # grad: [B, L * C] --> [L, B, C]\n        grad = grad.view(B, L, C).permute(1, 0, 2).contiguous()\n\n        grad_embeddings = torch.zeros_like(embeddings)\n\n        if dy_dx is not None:\n            grad_inputs = torch.zeros_like(inputs, dtype=embeddings.dtype)\n        else:\n            grad_inputs = None\n\n        _backend.grid_encode_backward(grad, inputs, embeddings, offsets, grad_embeddings, B, D, C, L, max_level, S, H, dy_dx, grad_inputs, gridtype, align_corners, interpolation)\n\n        if dy_dx is not None:\n            grad_inputs = grad_inputs.to(inputs.dtype)\n\n        return grad_inputs, grad_embeddings, None, None, None, None, None, None, None, None\n        \n\n\ngrid_encode = _grid_encode.apply\n\n\nclass GridEncoder(nn.Module):\n    def __init__(self, input_dim=3, num_levels=16, level_dim=2, per_level_scale=2, base_resolution=16, log2_hashmap_size=19, desired_resolution=None, gridtype='hash', align_corners=False, interpolation='linear'):\n        super().__init__()\n\n        # the finest resolution desired at the last level, if provided, overridee per_level_scale\n        if desired_resolution is not None:\n            per_level_scale = np.exp2(np.log2(desired_resolution / base_resolution) / (num_levels - 1))\n\n        self.input_dim = input_dim # coord dims, 2 or 3\n        self.num_levels = num_levels # num levels, each level multiply resolution by 2\n        self.level_dim = level_dim # encode channels per level\n        self.per_level_scale = per_level_scale # multiply resolution by this scale at each level.\n        self.log2_hashmap_size = log2_hashmap_size\n        self.base_resolution = base_resolution\n        self.output_dim = num_levels * level_dim\n        self.gridtype = gridtype\n        self.gridtype_id = _gridtype_to_id[gridtype] # \"tiled\" or \"hash\"\n        self.interpolation = interpolation\n        self.interp_id = _interp_to_id[interpolation] # \"linear\" or \"smoothstep\"\n        self.align_corners = align_corners\n\n        # allocate parameters\n        offsets = []\n        offset = 0\n        self.max_params = 2 ** log2_hashmap_size\n        for i in range(num_levels):\n            resolution = int(np.ceil(base_resolution * per_level_scale ** i))\n            params_in_level = min(self.max_params, (resolution) ** input_dim) # limit max number\n            params_in_level = int(np.ceil(params_in_level / 8) * 8) # make divisible\n            offsets.append(offset)\n            offset += params_in_level\n        offsets.append(offset)\n        offsets = torch.from_numpy(np.array(offsets, dtype=np.int32))\n        self.register_buffer('offsets', offsets)\n        \n        self.n_params = offsets[-1] * level_dim\n\n        # parameters\n        self.embeddings = nn.Parameter(torch.empty(offset, level_dim))\n\n        self.reset_parameters()\n    \n    def reset_parameters(self):\n        std = 1e-4\n        self.embeddings.data.uniform_(-std, std)\n\n    def __repr__(self):\n        return f\"GridEncoder: input_dim={self.input_dim} num_levels={self.num_levels} level_dim={self.level_dim} resolution={self.base_resolution} -> {int(round(self.base_resolution * self.per_level_scale ** (self.num_levels - 1)))} per_level_scale={self.per_level_scale:.4f} params={tuple(self.embeddings.shape)} gridtype={self.gridtype} align_corners={self.align_corners} interpolation={self.interpolation}\"\n    \n    def forward(self, inputs, bound=1, max_level=None):\n        # inputs: [..., input_dim], normalized real world positions in [-bound, bound]\n        # max_level: only calculate first max_level levels (None will use all levels)\n        # return: [..., num_levels * level_dim]\n\n        inputs = (inputs + bound) / (2 * bound) # map to [0, 1]\n        \n        #print('inputs', inputs.shape, inputs.dtype, inputs.min().item(), inputs.max().item())\n\n        prefix_shape = list(inputs.shape[:-1])\n        inputs = inputs.view(-1, self.input_dim)\n\n        outputs = grid_encode(inputs, self.embeddings, self.offsets, self.per_level_scale, self.base_resolution, inputs.requires_grad, self.gridtype_id, self.align_corners, self.interp_id, max_level)\n        outputs = outputs.view(prefix_shape + [self.output_dim])\n\n        #print('outputs', outputs.shape, outputs.dtype, outputs.min().item(), outputs.max().item())\n\n        return outputs\n\n    # always run in float precision!\n    @torch.cuda.amp.autocast(enabled=False)\n    def grad_total_variation(self, weight=1e-7, inputs=None, bound=1, B=1000000):\n        # inputs: [..., input_dim], float in [-b, b], location to calculate TV loss.\n        \n        D = self.input_dim\n        C = self.embeddings.shape[1] # embedding dim for each level\n        L = self.offsets.shape[0] - 1 # level\n        S = np.log2(self.per_level_scale) # resolution multiplier at each level, apply log2 for later CUDA exp2f\n        H = self.base_resolution # base resolution\n\n        if inputs is None:\n            # randomized in [0, 1]\n            inputs = torch.rand(B, self.input_dim, device=self.embeddings.device)\n        else:\n            inputs = (inputs + bound) / (2 * bound) # map to [0, 1]\n            inputs = inputs.view(-1, self.input_dim)\n            B = inputs.shape[0]\n\n        if self.embeddings.grad is None:\n            raise ValueError('grad is None, should be called after loss.backward() and before optimizer.step()!')\n\n        _backend.grad_total_variation(inputs, self.embeddings, self.embeddings.grad, self.offsets, weight, B, D, C, L, S, H, self.gridtype_id, self.align_corners)\n    \n    @torch.cuda.amp.autocast(enabled=False)\n    def grad_weight_decay(self, weight=0.1):\n        # level-wise meaned weight decay (ref: zip-nerf)\n        \n        B = self.embeddings.shape[0] # size of embedding\n        C = self.embeddings.shape[1] # embedding dim for each level\n        L = self.offsets.shape[0] - 1 # level\n        \n        if self.embeddings.grad is None:\n            raise ValueError('grad is None, should be called after loss.backward() and before optimizer.step()!')\n\n        _backend.grad_weight_decay(self.embeddings, self.embeddings.grad, self.offsets, weight, B, C, L)"
  },
  {
    "path": "stable-dreamfusion/gridencoder/setup.py",
    "content": "import os\nfrom setuptools import setup\nfrom torch.utils.cpp_extension import BuildExtension, CUDAExtension\n\n_src_path = os.path.dirname(os.path.abspath(__file__))\n\nnvcc_flags = [\n    '-O3', '-std=c++14',\n    '-U__CUDA_NO_HALF_OPERATORS__', '-U__CUDA_NO_HALF_CONVERSIONS__', '-U__CUDA_NO_HALF2_OPERATORS__',\n]\n\nif os.name == \"posix\":\n    c_flags = ['-O3', '-std=c++14']\nelif os.name == \"nt\":\n    c_flags = ['/O2', '/std:c++17']\n\n    # find cl.exe\n    def find_cl_path():\n        import glob\n        for program_files in [r\"C:\\\\Program Files (x86)\", r\"C:\\\\Program Files\"]:\n            for edition in [\"Enterprise\", \"Professional\", \"BuildTools\", \"Community\"]:\n                paths = sorted(glob.glob(r\"%s\\\\Microsoft Visual Studio\\\\*\\\\%s\\\\VC\\\\Tools\\\\MSVC\\\\*\\\\bin\\\\Hostx64\\\\x64\" % (program_files, edition)), reverse=True)\n                if paths:\n                    return paths[0]\n\n    # If cl.exe is not on path, try to find it.\n    if os.system(\"where cl.exe >nul 2>nul\") != 0:\n        cl_path = find_cl_path()\n        if cl_path is None:\n            raise RuntimeError(\"Could not locate a supported Microsoft Visual C++ installation\")\n        os.environ[\"PATH\"] += \";\" + cl_path\n\nsetup(\n    name='gridencoder', # package name, import this to use python API\n    ext_modules=[\n        CUDAExtension(\n            name='_gridencoder', # extension name, import this to use CUDA API\n            sources=[os.path.join(_src_path, 'src', f) for f in [\n                'gridencoder.cu',\n                'bindings.cpp',\n            ]],\n            extra_compile_args={\n                'cxx': c_flags,\n                'nvcc': nvcc_flags,\n            }\n        ),\n    ],\n    cmdclass={\n        'build_ext': BuildExtension,\n    }\n)"
  },
  {
    "path": "stable-dreamfusion/gridencoder/src/bindings.cpp",
    "content": "#include <torch/extension.h>\n\n#include \"gridencoder.h\"\n\nPYBIND11_MODULE(TORCH_EXTENSION_NAME, m) {\n    m.def(\"grid_encode_forward\", &grid_encode_forward, \"grid_encode_forward (CUDA)\");\n    m.def(\"grid_encode_backward\", &grid_encode_backward, \"grid_encode_backward (CUDA)\");\n    m.def(\"grad_total_variation\", &grad_total_variation, \"grad_total_variation (CUDA)\");\n    m.def(\"grad_weight_decay\", &grad_weight_decay, \"grad_weight_decay (CUDA)\");\n}"
  },
  {
    "path": "stable-dreamfusion/gridencoder/src/gridencoder.cu",
    "content": "#include <cuda.h>\n#include <cuda_fp16.h>\n#include <cuda_runtime.h>\n\n#include <ATen/cuda/CUDAContext.h>\n#include <torch/torch.h>\n\n#include <algorithm>\n#include <stdexcept>\n\n#include <stdint.h>\n#include <cstdio>\n\n\n#define CHECK_CUDA(x) TORCH_CHECK(x.device().is_cuda(), #x \" must be a CUDA tensor\")\n#define CHECK_CONTIGUOUS(x) TORCH_CHECK(x.is_contiguous(), #x \" must be a contiguous tensor\")\n#define CHECK_IS_INT(x) TORCH_CHECK(x.scalar_type() == at::ScalarType::Int, #x \" must be an int tensor\")\n#define CHECK_IS_FLOATING(x) TORCH_CHECK(x.scalar_type() == at::ScalarType::Float || x.scalar_type() == at::ScalarType::Half || x.scalar_type() == at::ScalarType::Double, #x \" must be a floating tensor\")\n\n\n// just for compatability of half precision in AT_DISPATCH_FLOATING_TYPES_AND_HALF... program will never reach here!\n __device__ inline at::Half atomicAdd(at::Half *address, at::Half val) {\n  // requires CUDA >= 10 and ARCH >= 70\n  // this is very slow compared to float or __half2, never use it.\n  //return atomicAdd(reinterpret_cast<__half*>(address), val);\n}\n\n\ntemplate <typename T>\n__host__ __device__ inline T div_round_up(T val, T divisor) {\n    return (val + divisor - 1) / divisor;\n}\n\ntemplate <typename T>\n__device__ inline T smoothstep(T val) {\n\treturn val*val*(3.0f - 2.0f * val);\n}\n\ntemplate <typename T>\n__device__ inline T smoothstep_derivative(T val) {\n\treturn 6*val*(1.0f - val);\n}\n\n\ntemplate <uint32_t D>\n__device__ uint32_t fast_hash(const uint32_t pos_grid[D]) {\n    \n    // coherent type of hashing\n    constexpr uint32_t primes[7] = { 1u, 2654435761u, 805459861u, 3674653429u, 2097192037u, 1434869437u, 2165219737u };\n\n    uint32_t result = 0;\n    #pragma unroll\n    for (uint32_t i = 0; i < D; ++i) {\n        result ^= pos_grid[i] * primes[i];\n    }\n\n    return result;\n}\n\n\ntemplate <uint32_t D, uint32_t C>\n__device__ uint32_t get_grid_index(const uint32_t gridtype, const uint32_t ch, const uint32_t hashmap_size, const uint32_t resolution, const uint32_t pos_grid[D]) {\n    uint32_t stride = 1;\n    uint32_t index = 0;\n\n    #pragma unroll\n    for (uint32_t d = 0; d < D && stride <= hashmap_size; d++) {\n        index += pos_grid[d] * stride;\n        stride *= resolution;\n    }\n\n    // NOTE: for NeRF, the hash is in fact not necessary. Check https://github.com/NVlabs/instant-ngp/issues/97.\n    // gridtype: 0 == hash, 1 == tiled\n    if (gridtype == 0 && stride > hashmap_size) {\n        index = fast_hash<D>(pos_grid);\n    }\n\n    return (index % hashmap_size) * C + ch;\n}\n\n\ntemplate <typename scalar_t, uint32_t D, uint32_t C>\n__global__ void kernel_grid(\n    const float * __restrict__ inputs, \n    const scalar_t * __restrict__ grid, \n    const int * __restrict__ offsets, \n    scalar_t * __restrict__ outputs, \n    const uint32_t B, const uint32_t L, const float S, const uint32_t H,\n    scalar_t * __restrict__ dy_dx,\n    const uint32_t gridtype,\n    const bool align_corners,\n    const uint32_t interp\n) {\n    const uint32_t b = blockIdx.x * blockDim.x + threadIdx.x;\n    \n    if (b >= B) return;\n\n    const uint32_t level = blockIdx.y;\n    \n    // locate\n    grid += (uint32_t)offsets[level] * C;\n    inputs += b * D;\n    outputs += level * B * C + b * C;\n\n    // check input range (should be in [0, 1])\n    bool flag_oob = false;\n    #pragma unroll\n    for (uint32_t d = 0; d < D; d++) {\n        if (inputs[d] < 0 || inputs[d] > 1) {\n            flag_oob = true;\n        }\n    }\n    // if input out of bound, just set output to 0\n    if (flag_oob) {\n        #pragma unroll\n        for (uint32_t ch = 0; ch < C; ch++) {\n            outputs[ch] = 0; \n        }\n        if (dy_dx) {\n            dy_dx += b * D * L * C + level * D * C; // B L D C\n            #pragma unroll\n            for (uint32_t d = 0; d < D; d++) {\n                #pragma unroll\n                for (uint32_t ch = 0; ch < C; ch++) {\n                    dy_dx[d * C + ch] = 0; \n                }       \n            }\n        }\n        return;\n    }\n\n    const uint32_t hashmap_size = offsets[level + 1] - offsets[level];\n    const uint32_t resolution = (uint32_t)ceil(exp2f(level * S) * H);\n    \n    // calculate coordinate (always use float for precision!)\n    float pos[D];\n    float pos_deriv[D];\n    uint32_t pos_grid[D];\n\n    #pragma unroll\n    for (uint32_t d = 0; d < D; d++) {\n        \n        // align_corners\n        if (align_corners) {\n            pos[d] = inputs[d] * (float)(resolution - 1); // [0, resolution - 1]\n            pos_grid[d] = min((uint32_t)floorf(pos[d]), resolution - 2); // left-top corner, [0, resolution - 2]\n        } else {\n            pos[d] = fminf(fmaxf(inputs[d] * (float)resolution - 0.5f, 0.0f), (float)(resolution - 1)); // [-0.5, resolution-0.5] --> [0, resolution - 1]\n            pos_grid[d] = (uint32_t)floorf(pos[d]); // left-top corner, [0, resolution - 1]\n        }\n        pos[d] -= (float)pos_grid[d];\n\n        // smoothstep instead of linear\n        if (interp == 1) {\n            pos_deriv[d] = smoothstep_derivative(pos[d]);\n            pos[d] = smoothstep(pos[d]);\n        } else {\n            pos_deriv[d] = 1.0f;\n        }\n    }\n\n    // verification of alignment\n    // if (level == L - 1 && b < 4) {\n    //     printf(\"[b=%d, l=%d] pos=(%f, %f)+(%d, %d)\\n\", b, level, pos[0], pos[1], pos_grid[0], pos_grid[1]);\n    // }\n\n    // interpolate\n    scalar_t results[C] = {0}; // temp results in register\n\n    #pragma unroll\n    for (uint32_t idx = 0; idx < (1 << D); idx++) {\n        float w = 1;\n        uint32_t pos_grid_local[D];\n\n        #pragma unroll\n        for (uint32_t d = 0; d < D; d++) {\n            if ((idx & (1 << d)) == 0) {\n                w *= 1 - pos[d];\n                pos_grid_local[d] = pos_grid[d];\n            } else {\n                w *= pos[d];\n                pos_grid_local[d] = min(pos_grid[d] + 1, resolution - 1);\n            }\n        }\n\n        uint32_t index = get_grid_index<D, C>(gridtype, 0, hashmap_size, resolution, pos_grid_local);\n\n        // writing to register (fast)\n        #pragma unroll\n        for (uint32_t ch = 0; ch < C; ch++) {\n            results[ch] += w * grid[index + ch];\n        }\n\n        //printf(\"[b=%d, l=%d] int %d, idx %d, w %f, val %f\\n\", b, level, idx, index, w, grid[index]);\n    }    \n\n    // writing to global memory (slow)\n    #pragma unroll\n    for (uint32_t ch = 0; ch < C; ch++) {\n        outputs[ch] = results[ch]; \n    }\n\n    // prepare dy_dx\n    // differentiable (soft) indexing: https://discuss.pytorch.org/t/differentiable-indexing/17647/9\n    if (dy_dx) {\n\n        dy_dx += b * D * L * C + level * D * C; // B L D C\n\n        #pragma unroll\n        for (uint32_t gd = 0; gd < D; gd++) {\n\n            scalar_t results_grad[C] = {0};\n\n            #pragma unroll\n            for (uint32_t idx = 0; idx < (1 << (D - 1)); idx++) {\n                float w = (float)(align_corners ? resolution - 1 : resolution);\n                uint32_t pos_grid_local[D];\n\n                #pragma unroll\n                for (uint32_t nd = 0; nd < D - 1; nd++) {\n                    const uint32_t d = (nd >= gd) ? (nd + 1) : nd;\n\n                    if ((idx & (1 << nd)) == 0) {\n                        w *= 1 - pos[d];\n                        pos_grid_local[d] = pos_grid[d];\n                    } else {\n                        w *= pos[d];\n                        pos_grid_local[d] = min(pos_grid[d] + 1, resolution - 1);\n                    }\n                }\n\n                pos_grid_local[gd] = pos_grid[gd];\n                uint32_t index_left = get_grid_index<D, C>(gridtype, 0, hashmap_size, resolution, pos_grid_local);\n                pos_grid_local[gd] = min(pos_grid[gd] + 1, resolution - 1);\n                uint32_t index_right = get_grid_index<D, C>(gridtype, 0, hashmap_size, resolution, pos_grid_local);\n\n                #pragma unroll\n                for (uint32_t ch = 0; ch < C; ch++) {\n                    results_grad[ch] += w * (grid[index_right + ch] - grid[index_left + ch]) * pos_deriv[gd];\n                }\n            }\n\n            #pragma unroll\n            for (uint32_t ch = 0; ch < C; ch++) {\n                dy_dx[gd * C + ch] = results_grad[ch];\n            }\n        }\n    }\n}\n\n\ntemplate <typename scalar_t, uint32_t D, uint32_t C, uint32_t N_C>\n__global__ void kernel_grid_backward(\n    const scalar_t * __restrict__ grad,\n    const float * __restrict__ inputs, \n    const scalar_t * __restrict__ grid, \n    const int * __restrict__ offsets, \n    scalar_t * __restrict__ grad_grid, \n    const uint32_t B, const uint32_t L, const float S, const uint32_t H,\n    const uint32_t gridtype,\n    const bool align_corners,\n    const uint32_t interp\n) {\n    const uint32_t b = (blockIdx.x * blockDim.x + threadIdx.x) * N_C / C;\n    if (b >= B) return;\n\n    const uint32_t level = blockIdx.y;\n    const uint32_t ch = (blockIdx.x * blockDim.x + threadIdx.x) * N_C - b * C;\n\n    // locate\n    grad_grid += offsets[level] * C;\n    inputs += b * D;\n    grad += level * B * C + b * C + ch; // L, B, C\n\n    const uint32_t hashmap_size = offsets[level + 1] - offsets[level];\n    const uint32_t resolution = (uint32_t)ceil(exp2f(level * S) * H);\n\n    // check input range (should be in [0, 1])\n    #pragma unroll\n    for (uint32_t d = 0; d < D; d++) {\n        if (inputs[d] < 0 || inputs[d] > 1) {\n            return; // grad is init as 0, so we simply return.\n        }\n    }\n\n    // calculate coordinate\n    float pos[D];\n    uint32_t pos_grid[D];\n\n    #pragma unroll\n    for (uint32_t d = 0; d < D; d++) {\n        // align_corners\n        if (align_corners) {\n            pos[d] = inputs[d] * (float)(resolution - 1); // [0, resolution - 1]\n            pos_grid[d] = min((uint32_t)floorf(pos[d]), resolution - 2); // left-top corner, [0, resolution - 2]\n        } else {\n            pos[d] = fminf(fmaxf(inputs[d] * (float)resolution - 0.5f, 0.0f), (float)(resolution - 1)); // [-0.5, resolution-0.5] --> [0, resolution - 1]\n            pos_grid[d] = (uint32_t)floorf(pos[d]); // left-top corner, [0, resolution - 1]\n        }\n        pos[d] -= (float)pos_grid[d];\n        // smoothstep instead of linear\n        if (interp == 1) {\n            pos[d] = smoothstep(pos[d]);\n        }\n    }\n\n    scalar_t grad_cur[N_C] = {0}; // fetch to register\n    #pragma unroll\n    for (uint32_t c = 0; c < N_C; c++) {\n        grad_cur[c] = grad[c];\n    }\n\n    // interpolate\n    #pragma unroll\n    for (uint32_t idx = 0; idx < (1 << D); idx++) {\n        float w = 1;\n        uint32_t pos_grid_local[D];\n\n        #pragma unroll\n        for (uint32_t d = 0; d < D; d++) {\n            if ((idx & (1 << d)) == 0) {\n                w *= 1 - pos[d];\n                pos_grid_local[d] = pos_grid[d];\n            } else {\n                w *= pos[d];\n                pos_grid_local[d] = min(pos_grid[d] + 1, resolution - 1);\n            }\n        }\n\n        uint32_t index = get_grid_index<D, C>(gridtype, ch, hashmap_size, resolution, pos_grid_local);\n\n        // atomicAdd for __half is slow (especially for large values), so we use __half2 if N_C % 2 == 0\n        // TODO: use float which is better than __half, if N_C % 2 != 0\n        if (std::is_same<scalar_t, at::Half>::value && N_C % 2 == 0) {\n            #pragma unroll\n            for (uint32_t c = 0; c < N_C; c += 2) {\n                // process two __half at once (by interpreting as a __half2)\n                __half2 v = {(__half)(w * grad_cur[c]), (__half)(w * grad_cur[c + 1])};\n                atomicAdd((__half2*)&grad_grid[index + c], v);\n            }\n        // float, or __half when N_C % 2 != 0 (which means C == 1)\n        } else {\n            #pragma unroll\n            for (uint32_t c = 0; c < N_C; c++) {\n                atomicAdd(&grad_grid[index + c], w * grad_cur[c]);\n            }\n        }\n    }    \n}\n\n\ntemplate <typename scalar_t, uint32_t D, uint32_t C>\n__global__ void kernel_input_backward(\n    const scalar_t * __restrict__ grad,\n    const scalar_t * __restrict__ dy_dx,  \n    scalar_t * __restrict__ grad_inputs, \n    uint32_t B, uint32_t L\n) {\n    const uint32_t t = threadIdx.x + blockIdx.x * blockDim.x;\n    if (t >= B * D) return;\n\n    const uint32_t b = t / D;\n    const uint32_t d = t - b * D;\n\n    dy_dx += b * L * D * C;\n\n    scalar_t result = 0;\n    \n    # pragma unroll\n    for (int l = 0; l < L; l++) {\n        # pragma unroll\n        for (int ch = 0; ch < C; ch++) {\n            result += grad[l * B * C + b * C + ch] * dy_dx[l * D * C + d * C + ch];\n        }\n    }\n\n    grad_inputs[t] = result;\n}\n\n\ntemplate <typename scalar_t, uint32_t D>\nvoid kernel_grid_wrapper(const float *inputs, const scalar_t *embeddings, const int *offsets, scalar_t *outputs, const uint32_t B, const uint32_t C, const uint32_t L, const uint32_t max_level, const float S, const uint32_t H, scalar_t *dy_dx, const uint32_t gridtype, const bool align_corners, const uint32_t interp) {\n    static constexpr uint32_t N_THREAD = 512;\n    const dim3 blocks_hashgrid = { div_round_up(B, N_THREAD), max_level, 1 };\n    switch (C) {\n        case 1: kernel_grid<scalar_t, D, 1><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, offsets, outputs, B, L, S, H, dy_dx, gridtype, align_corners, interp); break;\n        case 2: kernel_grid<scalar_t, D, 2><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, offsets, outputs, B, L, S, H, dy_dx, gridtype, align_corners, interp); break;\n        case 4: kernel_grid<scalar_t, D, 4><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, offsets, outputs, B, L, S, H, dy_dx, gridtype, align_corners, interp); break;\n        case 8: kernel_grid<scalar_t, D, 8><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, offsets, outputs, B, L, S, H, dy_dx, gridtype, align_corners, interp); break;\n        case 16: kernel_grid<scalar_t, D, 16><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, offsets, outputs, B, L, S, H, dy_dx, gridtype, align_corners, interp); break;\n        case 32: kernel_grid<scalar_t, D, 32><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, offsets, outputs, B, L, S, H, dy_dx, gridtype, align_corners, interp); break;\n        default: throw std::runtime_error{\"GridEncoding: C must be 1, 2, 4, 8, 16 or 32.\"};\n    }\n}\n\n// inputs: [B, D], float, in [0, 1]\n// embeddings: [sO, C], float\n// offsets: [L + 1], uint32_t\n// outputs: [L, B, C], float (L first, so only one level of hashmap needs to fit into cache at a time.)\n// H: base resolution\n// dy_dx: [B, L * D * C]\ntemplate <typename scalar_t>\nvoid grid_encode_forward_cuda(const float *inputs, const scalar_t *embeddings, const int *offsets, scalar_t *outputs, const uint32_t B, const uint32_t D, const uint32_t C, const uint32_t L, const uint32_t max_level, const float S, const uint32_t H, scalar_t *dy_dx, const uint32_t gridtype, const bool align_corners, const uint32_t interp) {\n    switch (D) {\n        case 2: kernel_grid_wrapper<scalar_t, 2>(inputs, embeddings, offsets, outputs, B, C, L, max_level, S, H, dy_dx, gridtype, align_corners, interp); break;\n        case 3: kernel_grid_wrapper<scalar_t, 3>(inputs, embeddings, offsets, outputs, B, C, L, max_level, S, H, dy_dx, gridtype, align_corners, interp); break;\n        case 4: kernel_grid_wrapper<scalar_t, 4>(inputs, embeddings, offsets, outputs, B, C, L, max_level, S, H, dy_dx, gridtype, align_corners, interp); break;\n        case 5: kernel_grid_wrapper<scalar_t, 5>(inputs, embeddings, offsets, outputs, B, C, L, max_level, S, H, dy_dx, gridtype, align_corners, interp); break;\n        default: throw std::runtime_error{\"GridEncoding: D must be 2, 3, 4 or 5.\"};\n    }   \n}\n\ntemplate <typename scalar_t, uint32_t D>\nvoid kernel_grid_backward_wrapper(const scalar_t *grad, const float *inputs, const scalar_t *embeddings, const int *offsets, scalar_t *grad_embeddings, const uint32_t B, const uint32_t C, const uint32_t L, const uint32_t max_level, const float S, const uint32_t H, scalar_t *dy_dx, scalar_t *grad_inputs, const uint32_t gridtype, const bool align_corners, const uint32_t interp) {\n    static constexpr uint32_t N_THREAD = 256;\n    const uint32_t N_C = std::min(2u, C); // n_features_per_thread\n    const dim3 blocks_hashgrid = { div_round_up(B * C / N_C, N_THREAD), max_level, 1 };\n    switch (C) {\n        case 1: \n            kernel_grid_backward<scalar_t, D, 1, 1><<<blocks_hashgrid, N_THREAD>>>(grad, inputs, embeddings, offsets, grad_embeddings, B, L, S, H, gridtype, align_corners, interp); \n            if (dy_dx) kernel_input_backward<scalar_t, D, 1><<<div_round_up(B * D, N_THREAD), N_THREAD>>>(grad, dy_dx, grad_inputs, B, L);\n            break;\n        case 2: \n            kernel_grid_backward<scalar_t, D, 2, 2><<<blocks_hashgrid, N_THREAD>>>(grad, inputs, embeddings, offsets, grad_embeddings, B, L, S, H, gridtype, align_corners, interp);\n            if (dy_dx) kernel_input_backward<scalar_t, D, 2><<<div_round_up(B * D, N_THREAD), N_THREAD>>>(grad, dy_dx, grad_inputs, B, L);\n            break;\n        case 4: \n            kernel_grid_backward<scalar_t, D, 4, 2><<<blocks_hashgrid, N_THREAD>>>(grad, inputs, embeddings, offsets, grad_embeddings, B, L, S, H, gridtype, align_corners, interp);\n            if (dy_dx) kernel_input_backward<scalar_t, D, 4><<<div_round_up(B * D, N_THREAD), N_THREAD>>>(grad, dy_dx, grad_inputs, B, L);\n            break;\n        case 8: \n            kernel_grid_backward<scalar_t, D, 8, 2><<<blocks_hashgrid, N_THREAD>>>(grad, inputs, embeddings, offsets, grad_embeddings, B, L, S, H, gridtype, align_corners, interp);\n            if (dy_dx) kernel_input_backward<scalar_t, D, 8><<<div_round_up(B * D, N_THREAD), N_THREAD>>>(grad, dy_dx, grad_inputs, B, L);\n            break;\n        case 16: \n            kernel_grid_backward<scalar_t, D, 16, 2><<<blocks_hashgrid, N_THREAD>>>(grad, inputs, embeddings, offsets, grad_embeddings, B, L, S, H, gridtype, align_corners, interp);\n            if (dy_dx) kernel_input_backward<scalar_t, D, 16><<<div_round_up(B * D, N_THREAD), N_THREAD>>>(grad, dy_dx, grad_inputs, B, L);\n            break;\n        case 32: \n            kernel_grid_backward<scalar_t, D, 32, 2><<<blocks_hashgrid, N_THREAD>>>(grad, inputs, embeddings, offsets, grad_embeddings, B, L, S, H, gridtype, align_corners, interp);\n            if (dy_dx) kernel_input_backward<scalar_t, D, 32><<<div_round_up(B * D, N_THREAD), N_THREAD>>>(grad, dy_dx, grad_inputs, B, L);\n            break;\n        default: throw std::runtime_error{\"GridEncoding: C must be 1, 2, 4, 8, 16 or 32.\"};\n    }\n}\n\n\n// grad: [L, B, C], float\n// inputs: [B, D], float, in [0, 1]\n// embeddings: [sO, C], float\n// offsets: [L + 1], uint32_t\n// grad_embeddings: [sO, C]\n// H: base resolution\ntemplate <typename scalar_t>\nvoid grid_encode_backward_cuda(const scalar_t *grad, const float *inputs, const scalar_t *embeddings, const int *offsets, scalar_t *grad_embeddings, const uint32_t B, const uint32_t D, const uint32_t C, const uint32_t L, const uint32_t max_level, const float S, const uint32_t H, scalar_t *dy_dx, scalar_t *grad_inputs, const uint32_t gridtype, const bool align_corners, const uint32_t interp) {\n    switch (D) {\n        case 2: kernel_grid_backward_wrapper<scalar_t, 2>(grad, inputs, embeddings, offsets, grad_embeddings, B, C, L, max_level, S, H, dy_dx, grad_inputs, gridtype, align_corners, interp); break;\n        case 3: kernel_grid_backward_wrapper<scalar_t, 3>(grad, inputs, embeddings, offsets, grad_embeddings, B, C, L, max_level, S, H, dy_dx, grad_inputs, gridtype, align_corners, interp); break;\n        case 4: kernel_grid_backward_wrapper<scalar_t, 4>(grad, inputs, embeddings, offsets, grad_embeddings, B, C, L, max_level, S, H, dy_dx, grad_inputs, gridtype, align_corners, interp); break;\n        case 5: kernel_grid_backward_wrapper<scalar_t, 5>(grad, inputs, embeddings, offsets, grad_embeddings, B, C, L, max_level, S, H, dy_dx, grad_inputs, gridtype, align_corners, interp); break;\n        default: throw std::runtime_error{\"GridEncoding: D must be 2, 3, 4 or 5.\"};\n    }\n}\n\n\n\nvoid grid_encode_forward(const at::Tensor inputs, const at::Tensor embeddings, const at::Tensor offsets, at::Tensor outputs, const uint32_t B, const uint32_t D, const uint32_t C, const uint32_t L, const uint32_t max_level, const float S, const uint32_t H, at::optional<at::Tensor> dy_dx, const uint32_t gridtype, const bool align_corners, const uint32_t interp) {\n    CHECK_CUDA(inputs);\n    CHECK_CUDA(embeddings);\n    CHECK_CUDA(offsets);\n    CHECK_CUDA(outputs);\n    // CHECK_CUDA(dy_dx);\n    \n    CHECK_CONTIGUOUS(inputs);\n    CHECK_CONTIGUOUS(embeddings);\n    CHECK_CONTIGUOUS(offsets);\n    CHECK_CONTIGUOUS(outputs);\n    // CHECK_CONTIGUOUS(dy_dx);\n\n    CHECK_IS_FLOATING(inputs);\n    CHECK_IS_FLOATING(embeddings);\n    CHECK_IS_INT(offsets);\n    CHECK_IS_FLOATING(outputs);\n    // CHECK_IS_FLOATING(dy_dx);\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    embeddings.scalar_type(), \"grid_encode_forward\", ([&] {\n        grid_encode_forward_cuda<scalar_t>(inputs.data_ptr<float>(), embeddings.data_ptr<scalar_t>(), offsets.data_ptr<int>(), outputs.data_ptr<scalar_t>(), B, D, C, L, max_level, S, H, dy_dx.has_value() ? dy_dx.value().data_ptr<scalar_t>() : nullptr, gridtype, align_corners, interp);\n    }));\n}\n\nvoid grid_encode_backward(const at::Tensor grad, const at::Tensor inputs, const at::Tensor embeddings, const at::Tensor offsets, at::Tensor grad_embeddings, const uint32_t B, const uint32_t D, const uint32_t C, const uint32_t L, const uint32_t max_level, const float S, const uint32_t H, const at::optional<at::Tensor> dy_dx, at::optional<at::Tensor> grad_inputs, const uint32_t gridtype, const bool align_corners, const uint32_t interp) {\n    CHECK_CUDA(grad);\n    CHECK_CUDA(inputs);\n    CHECK_CUDA(embeddings);\n    CHECK_CUDA(offsets);\n    CHECK_CUDA(grad_embeddings);\n    // CHECK_CUDA(dy_dx);\n    // CHECK_CUDA(grad_inputs);\n    \n    CHECK_CONTIGUOUS(grad);\n    CHECK_CONTIGUOUS(inputs);\n    CHECK_CONTIGUOUS(embeddings);\n    CHECK_CONTIGUOUS(offsets);\n    CHECK_CONTIGUOUS(grad_embeddings);\n    // CHECK_CONTIGUOUS(dy_dx);\n    // CHECK_CONTIGUOUS(grad_inputs);\n\n    CHECK_IS_FLOATING(grad);\n    CHECK_IS_FLOATING(inputs);\n    CHECK_IS_FLOATING(embeddings);\n    CHECK_IS_INT(offsets);\n    CHECK_IS_FLOATING(grad_embeddings);\n    // CHECK_IS_FLOATING(dy_dx);\n    // CHECK_IS_FLOATING(grad_inputs);\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    grad.scalar_type(), \"grid_encode_backward\", ([&] {\n        grid_encode_backward_cuda<scalar_t>(grad.data_ptr<scalar_t>(), inputs.data_ptr<float>(), embeddings.data_ptr<scalar_t>(), offsets.data_ptr<int>(), grad_embeddings.data_ptr<scalar_t>(), B, D, C, L, max_level, S, H, dy_dx.has_value() ? dy_dx.value().data_ptr<scalar_t>() : nullptr, grad_inputs.has_value() ? grad_inputs.value().data_ptr<scalar_t>() : nullptr, gridtype, align_corners, interp);\n    }));\n    \n}\n\n\ntemplate <typename scalar_t, uint32_t D, uint32_t C>\n__global__ void kernel_grad_tv(\n    const scalar_t * __restrict__ inputs,\n    const scalar_t * __restrict__ grid, \n    scalar_t * __restrict__ grad, \n    const int * __restrict__ offsets, \n    const float weight,\n    const uint32_t B, const uint32_t L, const float S, const uint32_t H,\n    const uint32_t gridtype,\n    const bool align_corners\n) {\n    const uint32_t b = blockIdx.x * blockDim.x + threadIdx.x;\n    \n    if (b >= B) return;\n\n    const uint32_t level = blockIdx.y;\n    \n    // locate\n    inputs += b * D;\n    grid += (uint32_t)offsets[level] * C;\n    grad += (uint32_t)offsets[level] * C;\n\n    // check input range (should be in [0, 1])\n    bool flag_oob = false;\n    #pragma unroll\n    for (uint32_t d = 0; d < D; d++) {\n        if (inputs[d] < 0 || inputs[d] > 1) {\n            flag_oob = true;\n        }\n    }\n\n    // if input out of bound, do nothing\n    if (flag_oob) return;\n\n    const uint32_t hashmap_size = offsets[level + 1] - offsets[level];\n    const uint32_t resolution = (uint32_t)ceil(exp2f(level * S) * H);\n    \n    // calculate coordinate\n    float pos[D];\n    uint32_t pos_grid[D]; // [0, resolution]\n\n    #pragma unroll\n    for (uint32_t d = 0; d < D; d++) {\n        // align_corners\n        if (align_corners) {\n            pos[d] = inputs[d] * (float)(resolution - 1); // [0, resolution - 1]\n            pos_grid[d] = min((uint32_t)floorf(pos[d]), resolution - 2); // left-top corner, [0, resolution - 2]\n        } else {\n            pos[d] = fminf(fmaxf(inputs[d] * (float)resolution - 0.5f, 0.0f), (float)(resolution - 1)); // [-0.5, resolution-0.5] --> [0, resolution - 1]\n            pos_grid[d] = (uint32_t)floorf(pos[d]); // left-top corner, [0, resolution - 1]\n        }\n    }\n\n    //printf(\"[b=%d, l=%d] pos=(%f, %f)+(%d, %d)\\n\", b, level, pos[0], pos[1], pos_grid[0], pos_grid[1]);\n\n    // total variation on pos_grid\n    scalar_t results[C] = {0}; // temp results in register\n    scalar_t idelta[C] = {0};\n\n    uint32_t index = get_grid_index<D, C>(gridtype, 0, hashmap_size, resolution, pos_grid);\n\n    scalar_t w = weight / (2 * D);\n\n    #pragma unroll\n    for (uint32_t d = 0; d < D; d++) {\n\n        uint32_t cur_d = pos_grid[d];\n        scalar_t grad_val;\n\n        // right side\n        if (cur_d < resolution) {\n            pos_grid[d] = cur_d + 1;\n            uint32_t index_right = get_grid_index<D, C>(gridtype, 0, hashmap_size, resolution, pos_grid);\n\n            #pragma unroll\n            for (uint32_t ch = 0; ch < C; ch++) {\n                grad_val = (grid[index + ch] - grid[index_right + ch]);\n                results[ch] += grad_val;\n                idelta[ch] += grad_val * grad_val;\n            }\n        }\n\n        // left side\n        if (cur_d > 0) {\n            pos_grid[d] = cur_d - 1;\n            uint32_t index_left = get_grid_index<D, C>(gridtype, 0, hashmap_size, resolution, pos_grid);\n\n            #pragma unroll\n            for (uint32_t ch = 0; ch < C; ch++) {\n                grad_val = (grid[index + ch] - grid[index_left + ch]);\n                results[ch] += grad_val;\n                idelta[ch] += grad_val * grad_val;\n            }\n        }\n\n        // reset\n        pos_grid[d] = cur_d;\n    }\n\n    // writing to global memory (slow)\n    #pragma unroll\n    for (uint32_t ch = 0; ch < C; ch++) {\n        // index may collide, so use atomic!\n        atomicAdd(&grad[index + ch], w * results[ch] * rsqrtf(idelta[ch] + 1e-9f));\n    }\n\n}\n\n\ntemplate <typename scalar_t, uint32_t D>\nvoid kernel_grad_tv_wrapper(const scalar_t *inputs, const scalar_t *embeddings, scalar_t *grad, const int *offsets, const float weight, const uint32_t B, const uint32_t C, const uint32_t L, const float S, const uint32_t H, const uint32_t gridtype, const bool align_corners) {\n    static constexpr uint32_t N_THREAD = 512;\n    const dim3 blocks_hashgrid = { div_round_up(B, N_THREAD), L, 1 };\n    switch (C) {\n        case 1: kernel_grad_tv<scalar_t, D, 1><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, grad, offsets, weight, B, L, S, H, gridtype, align_corners); break;\n        case 2: kernel_grad_tv<scalar_t, D, 2><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, grad, offsets, weight, B, L, S, H, gridtype, align_corners); break;\n        case 4: kernel_grad_tv<scalar_t, D, 4><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, grad, offsets, weight, B, L, S, H, gridtype, align_corners); break;\n        case 8: kernel_grad_tv<scalar_t, D, 8><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, grad, offsets, weight, B, L, S, H, gridtype, align_corners); break;\n        case 16: kernel_grad_tv<scalar_t, D, 16><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, grad, offsets, weight, B, L, S, H, gridtype, align_corners); break;\n        case 32: kernel_grad_tv<scalar_t, D, 32><<<blocks_hashgrid, N_THREAD>>>(inputs, embeddings, grad, offsets, weight, B, L, S, H, gridtype, align_corners); break;\n        default: throw std::runtime_error{\"GridEncoding: C must be 1, 2, 4, 8, 16 or 32.\"};\n    }\n}\n\n\ntemplate <typename scalar_t>\nvoid grad_total_variation_cuda(const scalar_t *inputs, const scalar_t *embeddings, scalar_t *grad, const int *offsets, const float weight, const uint32_t B, const uint32_t D, const uint32_t C, const uint32_t L, const float S, const uint32_t H, const uint32_t gridtype, const bool align_corners) {\n    switch (D) {\n        case 2: kernel_grad_tv_wrapper<scalar_t, 2>(inputs, embeddings, grad, offsets, weight, B, C, L, S, H, gridtype, align_corners); break;\n        case 3: kernel_grad_tv_wrapper<scalar_t, 3>(inputs, embeddings, grad, offsets, weight, B, C, L, S, H, gridtype, align_corners); break;\n        case 4: kernel_grad_tv_wrapper<scalar_t, 4>(inputs, embeddings, grad, offsets, weight, B, C, L, S, H, gridtype, align_corners); break;\n        case 5: kernel_grad_tv_wrapper<scalar_t, 5>(inputs, embeddings, grad, offsets, weight, B, C, L, S, H, gridtype, align_corners); break;\n        default: throw std::runtime_error{\"GridEncoding: D must be 2, 3, 4, or 5.\"};\n    }   \n}\n\n\nvoid grad_total_variation(const at::Tensor inputs, const at::Tensor embeddings, at::Tensor grad, const at::Tensor offsets, const float weight, const uint32_t B, const uint32_t D, const uint32_t C, const uint32_t L, const float S, const uint32_t H, const uint32_t gridtype, const bool align_corners) {\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    embeddings.scalar_type(), \"grad_total_variation\", ([&] {\n        grad_total_variation_cuda<scalar_t>(inputs.data_ptr<scalar_t>(), embeddings.data_ptr<scalar_t>(), grad.data_ptr<scalar_t>(), offsets.data_ptr<int>(), weight, B, D, C, L, S, H, gridtype, align_corners);\n    }));\n}\n\ntemplate <typename scalar_t>\n__global__ void kernel_grad_wd(\n    const scalar_t * __restrict__ grid, \n    scalar_t * __restrict__ grad, \n    const int * __restrict__ offsets, \n    const float weight,\n    const uint32_t B, const uint32_t L, const uint32_t C\n) {\n    const uint32_t b = blockIdx.x * blockDim.x + threadIdx.x;\n    \n    if (b >= B * C) return;\n\n    // locate\n    grid += b;\n    grad += b;\n\n    // decide in which level is this thread... \n    uint32_t level = 0;\n    const uint32_t n = b / C;\n    // binary search b in offsets\n    uint32_t l = 0, r = L;\n    while (l < r) {\n        uint32_t m = (l + r) / 2;\n        if (offsets[m] <= n) {\n            level = m;\n            l = m + 1;\n        } else {\n            r = m;\n        }\n    }\n\n    const uint32_t hashmap_size = offsets[level + 1] - offsets[level];\n    grad[0] += 2 * weight * grid[0] / hashmap_size;\n}\n\nvoid grad_weight_decay(const at::Tensor embeddings, at::Tensor grad, const at::Tensor offsets, const float weight, const uint32_t B, const uint32_t C, const uint32_t L) {\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    embeddings.scalar_type(), \"grad_weight_decay\", ([&] {\n        static constexpr uint32_t N_THREAD = 1024;\n        const dim3 blocks_hashgrid = { div_round_up(B * C, N_THREAD), 1, 1 };\n        kernel_grad_wd<scalar_t><<<blocks_hashgrid, N_THREAD>>>(embeddings.data_ptr<scalar_t>(), grad.data_ptr<scalar_t>(), offsets.data_ptr<int>(), weight, B, L, C);\n    }));\n}"
  },
  {
    "path": "stable-dreamfusion/gridencoder/src/gridencoder.h",
    "content": "#ifndef _HASH_ENCODE_H\n#define _HASH_ENCODE_H\n\n#include <stdint.h>\n#include <torch/torch.h>\n\n// inputs: [B, D], float, in [0, 1]\n// embeddings: [sO, C], float\n// offsets: [L + 1], uint32_t\n// outputs: [B, L * C], float\n// H: base resolution\nvoid grid_encode_forward(const at::Tensor inputs, const at::Tensor embeddings, const at::Tensor offsets, at::Tensor outputs, const uint32_t B, const uint32_t D, const uint32_t C, const uint32_t L, const uint32_t max_level, const float S, const uint32_t H, at::optional<at::Tensor> dy_dx, const uint32_t gridtype, const bool align_corners, const uint32_t interp);\nvoid grid_encode_backward(const at::Tensor grad, const at::Tensor inputs, const at::Tensor embeddings, const at::Tensor offsets, at::Tensor grad_embeddings, const uint32_t B, const uint32_t D, const uint32_t C, const uint32_t L, const uint32_t max_level, const float S, const uint32_t H, const at::optional<at::Tensor> dy_dx, at::optional<at::Tensor> grad_inputs, const uint32_t gridtype, const bool align_corners, const uint32_t interp);\n\nvoid grad_total_variation(const at::Tensor inputs, const at::Tensor embeddings, at::Tensor grad, const at::Tensor offsets, const float weight, const uint32_t B, const uint32_t D, const uint32_t C, const uint32_t L, const float S, const uint32_t H, const uint32_t gridtype, const bool align_corners);\nvoid grad_weight_decay(const at::Tensor embeddings, at::Tensor grad, const at::Tensor offsets, const float weight, const uint32_t B, const uint32_t C, const uint32_t L);\n\n#endif"
  },
  {
    "path": "stable-dreamfusion/guidance/clip_utils.py",
    "content": "import torch\nimport torch.nn as nn\n\nimport torchvision.transforms as T\nimport torchvision.transforms.functional as TF\n\nimport clip\n\nclass CLIP(nn.Module):\n    def __init__(self, device, **kwargs):\n        super().__init__()\n\n        self.device = device\n        self.clip_model, self.clip_preprocess = clip.load(\"ViT-B/16\", device=self.device, jit=False)\n\n        self.aug = T.Compose([\n            T.Resize((224, 224)),\n            T.Normalize((0.48145466, 0.4578275, 0.40821073), (0.26862954, 0.26130258, 0.27577711)),\n        ])\n    \n    def get_text_embeds(self, prompt, **kwargs):\n\n        text = clip.tokenize(prompt).to(self.device)\n        text_z = self.clip_model.encode_text(text)\n        text_z = text_z / text_z.norm(dim=-1, keepdim=True)\n\n        return text_z\n\n    def get_img_embeds(self, image, **kwargs):\n\n        image_z = self.clip_model.encode_image(self.aug(image))\n        image_z = image_z / image_z.norm(dim=-1, keepdim=True)\n\n        return image_z\n\n    \n    def train_step(self, clip_z, pred_rgb, grad_scale=10, **kwargs):\n        \"\"\"\n            Args:\n                grad_scale: scalar or 1-tensor of size [B], i.e. 1 grad_scale per batch item. \n        \"\"\"\n        # TODO: resize the image from NeRF-rendered resolution (e.g. 128x128) to what CLIP expects (512x512), to prevent Pytorch warning about `antialias=None`.\n        image_z = self.clip_model.encode_image(self.aug(pred_rgb))\n        image_z = image_z / image_z.norm(dim=-1, keepdim=True) # normalize features\n\n        loss = 0\n        if 'image' in clip_z:\n            loss -= ((image_z * clip_z['image']).sum(-1) * grad_scale).mean()\n        \n        if 'text' in clip_z:\n            loss -= ((image_z * clip_z['text']).sum(-1) * grad_scale).mean()\n\n        return loss\n\n"
  },
  {
    "path": "stable-dreamfusion/guidance/if_utils.py",
    "content": "from transformers import logging\nfrom diffusers import IFPipeline, DDPMScheduler\n\n# suppress partial model loading warning\nlogging.set_verbosity_error()\n\nimport torch\nimport torch.nn as nn\nimport torch.nn.functional as F\n\nfrom torch.cuda.amp import custom_bwd, custom_fwd\nfrom .perpneg_utils import weighted_perpendicular_aggregator\n\n\nclass SpecifyGradient(torch.autograd.Function):\n    @staticmethod\n    @custom_fwd\n    def forward(ctx, input_tensor, gt_grad):\n        ctx.save_for_backward(gt_grad)\n        # we return a dummy value 1, which will be scaled by amp's scaler so we get the scale in backward.\n        return torch.ones([1], device=input_tensor.device, dtype=input_tensor.dtype)\n\n    @staticmethod\n    @custom_bwd\n    def backward(ctx, grad_scale):\n        gt_grad, = ctx.saved_tensors\n        gt_grad = gt_grad * grad_scale\n        return gt_grad, None\n\ndef seed_everything(seed):\n    torch.manual_seed(seed)\n    torch.cuda.manual_seed(seed)\n    #torch.backends.cudnn.deterministic = True\n    #torch.backends.cudnn.benchmark = True\n\n\nclass IF(nn.Module):\n    def __init__(self, device, vram_O, t_range=[0.02, 0.98]):\n        super().__init__()\n\n        self.device = device\n\n        print(f'[INFO] loading DeepFloyd IF-I-XL...')\n\n        model_key = \"DeepFloyd/IF-I-XL-v1.0\"\n\n        is_torch2 = torch.__version__[0] == '2'\n\n        # Create model\n        pipe = IFPipeline.from_pretrained(model_key, variant=\"fp16\", torch_dtype=torch.float16)\n        if not is_torch2:\n            pipe.enable_xformers_memory_efficient_attention()\n\n        if vram_O:\n            pipe.unet.to(memory_format=torch.channels_last)\n            pipe.enable_attention_slicing(1)\n            pipe.enable_model_cpu_offload()\n        else:\n            pipe.to(device)\n\n        self.unet = pipe.unet\n        self.tokenizer = pipe.tokenizer\n        self.text_encoder = pipe.text_encoder\n        self.unet = pipe.unet\n        self.scheduler = pipe.scheduler\n\n        self.pipe = pipe\n\n        self.num_train_timesteps = self.scheduler.config.num_train_timesteps\n        self.min_step = int(self.num_train_timesteps * t_range[0])\n        self.max_step = int(self.num_train_timesteps * t_range[1])\n        self.alphas = self.scheduler.alphas_cumprod.to(self.device) # for convenience\n\n        print(f'[INFO] loaded DeepFloyd IF-I-XL!')\n\n    @torch.no_grad()\n    def get_text_embeds(self, prompt):\n        # prompt: [str]\n\n        # TODO: should I add the preprocessing at https://github.com/huggingface/diffusers/blob/main/src/diffusers/pipelines/deepfloyd_if/pipeline_if.py#LL486C10-L486C28\n        prompt = self.pipe._text_preprocessing(prompt, clean_caption=False)\n        inputs = self.tokenizer(prompt, padding='max_length', max_length=77, truncation=True, add_special_tokens=True, return_tensors='pt')\n        embeddings = self.text_encoder(inputs.input_ids.to(self.device))[0]\n\n        return embeddings\n\n\n    def train_step(self, text_embeddings, pred_rgb, guidance_scale=100, grad_scale=1):\n\n        # [0, 1] to [-1, 1] and make sure shape is [64, 64]\n        images = F.interpolate(pred_rgb, (64, 64), mode='bilinear', align_corners=False) * 2 - 1\n\n        # timestep ~ U(0.02, 0.98) to avoid very high/low noise level\n        t = torch.randint(self.min_step, self.max_step + 1, (images.shape[0],), dtype=torch.long, device=self.device)\n\n        # predict the noise residual with unet, NO grad!\n        with torch.no_grad():\n            # add noise\n            noise = torch.randn_like(images)\n            images_noisy = self.scheduler.add_noise(images, noise, t)\n\n            # pred noise\n            model_input = torch.cat([images_noisy] * 2)\n            model_input = self.scheduler.scale_model_input(model_input, t)\n            tt = torch.cat([t] * 2)\n            noise_pred = self.unet(model_input, tt, encoder_hidden_states=text_embeddings).sample\n            noise_pred_uncond, noise_pred_text = noise_pred.chunk(2)\n            noise_pred_uncond, _ = noise_pred_uncond.split(model_input.shape[1], dim=1)\n            noise_pred_text, predicted_variance = noise_pred_text.split(model_input.shape[1], dim=1)\n            noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_text - noise_pred_uncond)\n\n            # TODO: how to use the variance here?\n            # noise_pred = torch.cat([noise_pred, predicted_variance], dim=1)\n\n        # w(t), sigma_t^2\n        w = (1 - self.alphas[t])\n        grad = grad_scale * w[:, None, None, None] * (noise_pred - noise)\n        grad = torch.nan_to_num(grad)\n\n        # since we omitted an item in grad, we need to use the custom function to specify the gradient\n        loss = SpecifyGradient.apply(images, grad)\n\n        return loss\n\n    def train_step_perpneg(self, text_embeddings, weights, pred_rgb, guidance_scale=100, grad_scale=1):\n\n        B = pred_rgb.shape[0]\n        K = (text_embeddings.shape[0] // B) - 1 # maximum number of prompts        \n\n        # [0, 1] to [-1, 1] and make sure shape is [64, 64]\n        images = F.interpolate(pred_rgb, (64, 64), mode='bilinear', align_corners=False) * 2 - 1\n\n        # timestep ~ U(0.02, 0.98) to avoid very high/low noise level\n        t = torch.randint(self.min_step, self.max_step + 1, (images.shape[0],), dtype=torch.long, device=self.device)\n\n        # predict the noise residual with unet, NO grad!\n        with torch.no_grad():\n            # add noise\n            noise = torch.randn_like(images)\n            images_noisy = self.scheduler.add_noise(images, noise, t)\n\n            # pred noise\n            model_input = torch.cat([images_noisy] * (1 + K))\n            model_input = self.scheduler.scale_model_input(model_input, t)\n            tt = torch.cat([t] * (1 + K))\n            unet_output = self.unet(model_input, tt, encoder_hidden_states=text_embeddings).sample\n            noise_pred_uncond, noise_pred_text = unet_output[:B], unet_output[B:]\n            noise_pred_uncond, _ = noise_pred_uncond.split(model_input.shape[1], dim=1)\n            noise_pred_text, predicted_variance = noise_pred_text.split(model_input.shape[1], dim=1)\n            # noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_text - noise_pred_uncond)\n            delta_noise_preds = noise_pred_text - noise_pred_uncond.repeat(K, 1, 1, 1)\n            noise_pred = noise_pred_uncond + guidance_scale * weighted_perpendicular_aggregator(delta_noise_preds, weights, B)\n\n\n\n        # w(t), sigma_t^2\n        w = (1 - self.alphas[t])\n        grad = grad_scale * w[:, None, None, None] * (noise_pred - noise)\n        grad = torch.nan_to_num(grad)\n\n        # since we omitted an item in grad, we need to use the custom function to specify the gradient\n        loss = SpecifyGradient.apply(images, grad)\n\n        return loss\n\n    @torch.no_grad()\n    def produce_imgs(self, text_embeddings, height=64, width=64, num_inference_steps=50, guidance_scale=7.5):\n\n        images = torch.randn((1, 3, height, width), device=text_embeddings.device, dtype=text_embeddings.dtype)\n        images = images * self.scheduler.init_noise_sigma\n\n        self.scheduler.set_timesteps(num_inference_steps)\n\n        for i, t in enumerate(self.scheduler.timesteps):\n            # expand the latents if we are doing classifier-free guidance to avoid doing two forward passes.\n            model_input = torch.cat([images] * 2)\n            model_input = self.scheduler.scale_model_input(model_input, t)\n\n            # predict the noise residual\n            noise_pred = self.unet(model_input, t, encoder_hidden_states=text_embeddings).sample\n\n            # perform guidance\n            noise_pred_uncond, noise_pred_text = noise_pred.chunk(2)\n            noise_pred_uncond, _ = noise_pred_uncond.split(model_input.shape[1], dim=1)\n            noise_pred_text, predicted_variance = noise_pred_text.split(model_input.shape[1], dim=1)\n            noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_text - noise_pred_uncond)\n            noise_pred = torch.cat([noise_pred, predicted_variance], dim=1)\n\n            # compute the previous noisy sample x_t -> x_t-1\n            images = self.scheduler.step(noise_pred, t, images).prev_sample\n\n        images = (images + 1) / 2\n\n        return images\n\n\n    def prompt_to_img(self, prompts, negative_prompts='', height=512, width=512, num_inference_steps=50, guidance_scale=7.5, latents=None):\n\n        if isinstance(prompts, str):\n            prompts = [prompts]\n\n        if isinstance(negative_prompts, str):\n            negative_prompts = [negative_prompts]\n\n        # Prompts -> text embeds\n        pos_embeds = self.get_text_embeds(prompts) # [1, 77, 768]\n        neg_embeds = self.get_text_embeds(negative_prompts)\n        text_embeds = torch.cat([neg_embeds, pos_embeds], dim=0) # [2, 77, 768]\n\n        # Text embeds -> img\n        imgs = self.produce_imgs(text_embeds, height=height, width=width, num_inference_steps=num_inference_steps, guidance_scale=guidance_scale) # [1, 4, 64, 64]\n\n        # Img to Numpy\n        imgs = imgs.detach().cpu().permute(0, 2, 3, 1).numpy()\n        imgs = (imgs * 255).round().astype('uint8')\n\n        return imgs\n\n\nif __name__ == '__main__':\n\n    import argparse\n    import matplotlib.pyplot as plt\n\n    parser = argparse.ArgumentParser()\n    parser.add_argument('prompt', type=str)\n    parser.add_argument('--negative', default='', type=str)\n    parser.add_argument('--vram_O', action='store_true', help=\"optimization for low VRAM usage\")\n    parser.add_argument('-H', type=int, default=64)\n    parser.add_argument('-W', type=int, default=64)\n    parser.add_argument('--seed', type=int, default=0)\n    parser.add_argument('--steps', type=int, default=50)\n    opt = parser.parse_args()\n\n    seed_everything(opt.seed)\n\n    device = torch.device('cuda')\n\n    sd = IF(device, opt.vram_O)\n\n    imgs = sd.prompt_to_img(opt.prompt, opt.negative, opt.H, opt.W, opt.steps)\n\n    # visualize image\n    plt.imshow(imgs[0])\n    plt.show()\n\n\n\n\n"
  },
  {
    "path": "stable-dreamfusion/guidance/perpneg_utils.py",
    "content": "import torch\n\n# Please refer to the https://perp-neg.github.io/ for details about the paper and algorithm\ndef get_perpendicular_component(x, y):\n    assert x.shape == y.shape\n    return x - ((torch.mul(x, y).sum())/max(torch.norm(y)**2, 1e-6)) * y\n\n\ndef batch_get_perpendicular_component(x, y):\n    assert x.shape == y.shape\n    result = []\n    for i in range(x.shape[0]):\n        result.append(get_perpendicular_component(x[i], y[i]))\n    return torch.stack(result)\n\n\ndef weighted_perpendicular_aggregator(delta_noise_preds, weights, batch_size):\n    \"\"\" \n    Notes: \n     - weights: an array with the weights for combining the noise predictions\n     - delta_noise_preds: [B x K, 4, 64, 64], K = max_prompts_per_dir\n    \"\"\"\n    delta_noise_preds = delta_noise_preds.split(batch_size, dim=0) # K x [B, 4, 64, 64]\n    weights = weights.split(batch_size, dim=0) # K x [B]\n    # print(f\"{weights[0].shape = } {weights = }\")\n\n    assert torch.all(weights[0] == 1.0)\n\n    main_positive = delta_noise_preds[0] # [B, 4, 64, 64]\n\n    accumulated_output = torch.zeros_like(main_positive)\n    for i, complementary_noise_pred in enumerate(delta_noise_preds[1:], start=1):\n        # print(f\"\\n{i = }, {weights[i] = }, {weights[i].shape = }\\n\")\n\n        idx_non_zero = torch.abs(weights[i]) > 1e-4\n        \n        # print(f\"{idx_non_zero.shape = }, {idx_non_zero = }\")\n        # print(f\"{weights[i][idx_non_zero].shape = }, {weights[i][idx_non_zero] = }\")\n        # print(f\"{complementary_noise_pred.shape = }, {complementary_noise_pred[idx_non_zero].shape = }\")\n        # print(f\"{main_positive.shape = }, {main_positive[idx_non_zero].shape = }\")\n        if sum(idx_non_zero) == 0:\n            continue\n        accumulated_output[idx_non_zero] += weights[i][idx_non_zero].reshape(-1, 1, 1, 1) * batch_get_perpendicular_component(complementary_noise_pred[idx_non_zero], main_positive[idx_non_zero])\n    \n    assert accumulated_output.shape == main_positive.shape, f\"{accumulated_output.shape = }, {main_positive.shape = }\"\n\n\n    return accumulated_output + main_positive"
  },
  {
    "path": "stable-dreamfusion/guidance/sd_utils.py",
    "content": "from transformers import CLIPTextModel, CLIPTokenizer, logging\nfrom diffusers import AutoencoderKL, UNet2DConditionModel, PNDMScheduler, DDIMScheduler, StableDiffusionPipeline\nfrom diffusers.utils.import_utils import is_xformers_available\nfrom os.path import isfile\nfrom pathlib import Path\n\n# suppress partial model loading warning\nlogging.set_verbosity_error()\n\nimport torch\nimport torch.nn as nn\nimport torch.nn.functional as F\nfrom torchvision.utils import save_image\n\nfrom torch.cuda.amp import custom_bwd, custom_fwd\nfrom .perpneg_utils import weighted_perpendicular_aggregator\n\nclass SpecifyGradient(torch.autograd.Function):\n    @staticmethod\n    @custom_fwd\n    def forward(ctx, input_tensor, gt_grad):\n        ctx.save_for_backward(gt_grad)\n        # we return a dummy value 1, which will be scaled by amp's scaler so we get the scale in backward.\n        return torch.ones([1], device=input_tensor.device, dtype=input_tensor.dtype)\n\n    @staticmethod\n    @custom_bwd\n    def backward(ctx, grad_scale):\n        gt_grad, = ctx.saved_tensors\n        gt_grad = gt_grad * grad_scale\n        return gt_grad, None\n\ndef seed_everything(seed):\n    torch.manual_seed(seed)\n    torch.cuda.manual_seed(seed)\n    #torch.backends.cudnn.deterministic = True\n    #torch.backends.cudnn.benchmark = True\n\nclass StableDiffusion(nn.Module):\n    def __init__(self, device, fp16, vram_O, sd_version='2.1', hf_key=None, t_range=[0.02, 0.98]):\n        super().__init__()\n\n        self.device = device\n        self.sd_version = sd_version\n\n        print(f'[INFO] loading stable diffusion...')\n\n        if hf_key is not None:\n            print(f'[INFO] using hugging face custom model key: {hf_key}')\n            model_key = hf_key\n        elif self.sd_version == '2.1':\n            model_key = \"stabilityai/stable-diffusion-2-1-base\"\n        elif self.sd_version == '2.0':\n            model_key = \"stabilityai/stable-diffusion-2-base\"\n        elif self.sd_version == '1.5':\n            model_key = \"runwayml/stable-diffusion-v1-5\"\n        else:\n            raise ValueError(f'Stable-diffusion version {self.sd_version} not supported.')\n\n        self.precision_t = torch.float16 if fp16 else torch.float32\n\n        # Create model\n        pipe = StableDiffusionPipeline.from_pretrained(model_key, torch_dtype=self.precision_t)\n\n        if vram_O:\n            pipe.enable_sequential_cpu_offload()\n            pipe.enable_vae_slicing()\n            pipe.unet.to(memory_format=torch.channels_last)\n            pipe.enable_attention_slicing(1)\n            # pipe.enable_model_cpu_offload()\n        else:\n            pipe.to(device)\n\n        self.vae = pipe.vae\n        self.tokenizer = pipe.tokenizer\n        self.text_encoder = pipe.text_encoder\n        self.unet = pipe.unet\n\n        self.scheduler = DDIMScheduler.from_pretrained(model_key, subfolder=\"scheduler\", torch_dtype=self.precision_t)\n\n        del pipe\n\n        self.num_train_timesteps = self.scheduler.config.num_train_timesteps\n        self.min_step = int(self.num_train_timesteps * t_range[0])\n        self.max_step = int(self.num_train_timesteps * t_range[1])\n        self.alphas = self.scheduler.alphas_cumprod.to(self.device) # for convenience\n\n        print(f'[INFO] loaded stable diffusion!')\n\n    @torch.no_grad()\n    def get_text_embeds(self, prompt):\n        # prompt: [str]\n\n        inputs = self.tokenizer(prompt, padding='max_length', max_length=self.tokenizer.model_max_length, return_tensors='pt')\n        embeddings = self.text_encoder(inputs.input_ids.to(self.device))[0]\n\n        return embeddings\n\n\n    def train_step(self, text_embeddings, pred_rgb, guidance_scale=100, as_latent=False, grad_scale=1,\n                   save_guidance_path:Path=None):\n\n        if as_latent:\n            latents = F.interpolate(pred_rgb, (64, 64), mode='bilinear', align_corners=False) * 2 - 1\n        else:\n            # interp to 512x512 to be fed into vae.\n            pred_rgb_512 = F.interpolate(pred_rgb, (512, 512), mode='bilinear', align_corners=False)\n            # encode image into latents with vae, requires grad!\n            latents = self.encode_imgs(pred_rgb_512)\n\n        # timestep ~ U(0.02, 0.98) to avoid very high/low noise level\n        t = torch.randint(self.min_step, self.max_step + 1, (latents.shape[0],), dtype=torch.long, device=self.device)\n\n        # predict the noise residual with unet, NO grad!\n        with torch.no_grad():\n            # add noise\n            noise = torch.randn_like(latents)\n            latents_noisy = self.scheduler.add_noise(latents, noise, t)\n            # pred noise\n            latent_model_input = torch.cat([latents_noisy] * 2)\n            tt = torch.cat([t] * 2)\n            noise_pred = self.unet(latent_model_input, tt, encoder_hidden_states=text_embeddings).sample\n\n            # perform guidance (high scale from paper!)\n            noise_pred_uncond, noise_pred_pos = noise_pred.chunk(2)\n            noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_pos - noise_pred_uncond)\n\n        # import kiui\n        # latents_tmp = torch.randn((1, 4, 64, 64), device=self.device)\n        # latents_tmp = latents_tmp.detach()\n        # kiui.lo(latents_tmp)\n        # self.scheduler.set_timesteps(30)\n        # for i, t in enumerate(self.scheduler.timesteps):\n        #     latent_model_input = torch.cat([latents_tmp] * 3)\n        #     noise_pred = self.unet(latent_model_input, t, encoder_hidden_states=text_embeddings)['sample']\n        #     noise_pred_uncond, noise_pred_pos = noise_pred.chunk(2)\n        #     noise_pred = noise_pred_uncond + 10 * (noise_pred_pos - noise_pred_uncond)\n        #     latents_tmp = self.scheduler.step(noise_pred, t, latents_tmp)['prev_sample']\n        # imgs = self.decode_latents(latents_tmp)\n        # kiui.vis.plot_image(imgs)\n\n        # w(t), sigma_t^2\n        w = (1 - self.alphas[t])\n        grad = grad_scale * w[:, None, None, None] * (noise_pred - noise)\n        grad = torch.nan_to_num(grad)\n\n        if save_guidance_path:\n            with torch.no_grad():\n                if as_latent:\n                    pred_rgb_512 = self.decode_latents(latents)\n\n                # visualize predicted denoised image\n                # The following block of code is equivalent to `predict_start_from_noise`...\n                # see zero123_utils.py's version for a simpler implementation.\n                alphas = self.scheduler.alphas.to(latents)\n                total_timesteps = self.max_step - self.min_step + 1\n                index = total_timesteps - t.to(latents.device) - 1 \n                b = len(noise_pred)\n                a_t = alphas[index].reshape(b,1,1,1).to(self.device)\n                sqrt_one_minus_alphas = torch.sqrt(1 - alphas)\n                sqrt_one_minus_at = sqrt_one_minus_alphas[index].reshape((b,1,1,1)).to(self.device)                \n                pred_x0 = (latents_noisy - sqrt_one_minus_at * noise_pred) / a_t.sqrt() # current prediction for x_0\n                result_hopefully_less_noisy_image = self.decode_latents(pred_x0.to(latents.type(self.precision_t)))\n\n                # visualize noisier image\n                result_noisier_image = self.decode_latents(latents_noisy.to(pred_x0).type(self.precision_t))\n\n                # TODO: also denoise all-the-way\n\n                # all 3 input images are [1, 3, H, W], e.g. [1, 3, 512, 512]\n                viz_images = torch.cat([pred_rgb_512, result_noisier_image, result_hopefully_less_noisy_image],dim=0)\n                save_image(viz_images, save_guidance_path)\n\n        # since we omitted an item in grad, we need to use the custom function to specify the gradient\n        loss = SpecifyGradient.apply(latents, grad)\n\n        return loss\n    \n\n    def train_step_perpneg(self, text_embeddings, weights, pred_rgb, guidance_scale=100, as_latent=False, grad_scale=1,\n                   save_guidance_path:Path=None):\n\n        B = pred_rgb.shape[0]\n        K = (text_embeddings.shape[0] // B) - 1 # maximum number of prompts       \n\n        if as_latent:\n            latents = F.interpolate(pred_rgb, (64, 64), mode='bilinear', align_corners=False) * 2 - 1\n        else:\n            # interp to 512x512 to be fed into vae.\n            pred_rgb_512 = F.interpolate(pred_rgb, (512, 512), mode='bilinear', align_corners=False)\n            # encode image into latents with vae, requires grad!\n            latents = self.encode_imgs(pred_rgb_512)\n\n        # timestep ~ U(0.02, 0.98) to avoid very high/low noise level\n        t = torch.randint(self.min_step, self.max_step + 1, (latents.shape[0],), dtype=torch.long, device=self.device)\n\n        # predict the noise residual with unet, NO grad!\n        with torch.no_grad():\n            # add noise\n            noise = torch.randn_like(latents)\n            latents_noisy = self.scheduler.add_noise(latents, noise, t)\n            # pred noise\n            latent_model_input = torch.cat([latents_noisy] * (1 + K))\n            tt = torch.cat([t] * (1 + K))\n            unet_output = self.unet(latent_model_input, tt, encoder_hidden_states=text_embeddings).sample\n\n            # perform guidance (high scale from paper!)\n            noise_pred_uncond, noise_pred_text = unet_output[:B], unet_output[B:]\n            delta_noise_preds = noise_pred_text - noise_pred_uncond.repeat(K, 1, 1, 1)\n            noise_pred = noise_pred_uncond + guidance_scale * weighted_perpendicular_aggregator(delta_noise_preds, weights, B)            \n\n        # import kiui\n        # latents_tmp = torch.randn((1, 4, 64, 64), device=self.device)\n        # latents_tmp = latents_tmp.detach()\n        # kiui.lo(latents_tmp)\n        # self.scheduler.set_timesteps(30)\n        # for i, t in enumerate(self.scheduler.timesteps):\n        #     latent_model_input = torch.cat([latents_tmp] * 3)\n        #     noise_pred = self.unet(latent_model_input, t, encoder_hidden_states=text_embeddings)['sample']\n        #     noise_pred_uncond, noise_pred_pos = noise_pred.chunk(2)\n        #     noise_pred = noise_pred_uncond + 10 * (noise_pred_pos - noise_pred_uncond)\n        #     latents_tmp = self.scheduler.step(noise_pred, t, latents_tmp)['prev_sample']\n        # imgs = self.decode_latents(latents_tmp)\n        # kiui.vis.plot_image(imgs)\n\n        # w(t), sigma_t^2\n        w = (1 - self.alphas[t])\n        grad = grad_scale * w[:, None, None, None] * (noise_pred - noise)\n        grad = torch.nan_to_num(grad)\n\n        if save_guidance_path:\n            with torch.no_grad():\n                if as_latent:\n                    pred_rgb_512 = self.decode_latents(latents)\n\n                # visualize predicted denoised image\n                # The following block of code is equivalent to `predict_start_from_noise`...\n                # see zero123_utils.py's version for a simpler implementation.\n                alphas = self.scheduler.alphas.to(latents)\n                total_timesteps = self.max_step - self.min_step + 1\n                index = total_timesteps - t.to(latents.device) - 1 \n                b = len(noise_pred)\n                a_t = alphas[index].reshape(b,1,1,1).to(self.device)\n                sqrt_one_minus_alphas = torch.sqrt(1 - alphas)\n                sqrt_one_minus_at = sqrt_one_minus_alphas[index].reshape((b,1,1,1)).to(self.device)                \n                pred_x0 = (latents_noisy - sqrt_one_minus_at * noise_pred) / a_t.sqrt() # current prediction for x_0\n                result_hopefully_less_noisy_image = self.decode_latents(pred_x0.to(latents.type(self.precision_t)))\n\n                # visualize noisier image\n                result_noisier_image = self.decode_latents(latents_noisy.to(pred_x0).type(self.precision_t))\n\n\n\n                # all 3 input images are [1, 3, H, W], e.g. [1, 3, 512, 512]\n                viz_images = torch.cat([pred_rgb_512, result_noisier_image, result_hopefully_less_noisy_image],dim=0)\n                save_image(viz_images, save_guidance_path)\n\n        # since we omitted an item in grad, we need to use the custom function to specify the gradient\n        loss = SpecifyGradient.apply(latents, grad)\n        # print(\"we did it\")\n        return loss\n\n\n    @torch.no_grad()\n    def produce_latents(self, text_embeddings, height=512, width=512, num_inference_steps=50, guidance_scale=7.5, latents=None):\n\n        if latents is None:\n            latents = torch.randn((text_embeddings.shape[0] // 2, self.unet.in_channels, height // 8, width // 8), device=self.device)\n\n        self.scheduler.set_timesteps(num_inference_steps)\n\n        for i, t in enumerate(self.scheduler.timesteps):\n            # expand the latents if we are doing classifier-free guidance to avoid doing two forward passes.\n            latent_model_input = torch.cat([latents] * 2)\n            # predict the noise residual\n            noise_pred = self.unet(latent_model_input, t, encoder_hidden_states=text_embeddings)['sample']\n\n            # perform guidance\n            noise_pred_uncond, noise_pred_cond = noise_pred.chunk(2)\n            noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_cond - noise_pred_uncond)\n\n            # compute the previous noisy sample x_t -> x_t-1\n            latents = self.scheduler.step(noise_pred, t, latents)['prev_sample']\n\n        return latents\n\n    def decode_latents(self, latents):\n\n        latents = 1 / self.vae.config.scaling_factor * latents\n\n        imgs = self.vae.decode(latents).sample\n        imgs = (imgs / 2 + 0.5).clamp(0, 1)\n\n        return imgs\n\n    def encode_imgs(self, imgs):\n        # imgs: [B, 3, H, W]\n\n        imgs = 2 * imgs - 1\n\n        posterior = self.vae.encode(imgs).latent_dist\n        latents = posterior.sample() * self.vae.config.scaling_factor\n\n        return latents\n\n    def prompt_to_img(self, prompts, negative_prompts='', height=512, width=512, num_inference_steps=50, guidance_scale=7.5, latents=None):\n\n        if isinstance(prompts, str):\n            prompts = [prompts]\n\n        if isinstance(negative_prompts, str):\n            negative_prompts = [negative_prompts]\n\n        # Prompts -> text embeds\n        pos_embeds = self.get_text_embeds(prompts) # [1, 77, 768]\n        neg_embeds = self.get_text_embeds(negative_prompts)\n        text_embeds = torch.cat([neg_embeds, pos_embeds], dim=0) # [2, 77, 768]\n\n        # Text embeds -> img latents\n        latents = self.produce_latents(text_embeds, height=height, width=width, latents=latents, num_inference_steps=num_inference_steps, guidance_scale=guidance_scale) # [1, 4, 64, 64]\n\n        # Img latents -> imgs\n        imgs = self.decode_latents(latents) # [1, 3, 512, 512]\n\n        # Img to Numpy\n        imgs = imgs.detach().cpu().permute(0, 2, 3, 1).numpy()\n        imgs = (imgs * 255).round().astype('uint8')\n\n        return imgs\n\n\nif __name__ == '__main__':\n\n    import argparse\n    import matplotlib.pyplot as plt\n\n    parser = argparse.ArgumentParser()\n    parser.add_argument('prompt', type=str)\n    parser.add_argument('--negative', default='', type=str)\n    parser.add_argument('--sd_version', type=str, default='2.1', choices=['1.5', '2.0', '2.1'], help=\"stable diffusion version\")\n    parser.add_argument('--hf_key', type=str, default=None, help=\"hugging face Stable diffusion model key\")\n    parser.add_argument('--fp16', action='store_true', help=\"use float16 for training\")\n    parser.add_argument('--vram_O', action='store_true', help=\"optimization for low VRAM usage\")\n    parser.add_argument('-H', type=int, default=512)\n    parser.add_argument('-W', type=int, default=512)\n    parser.add_argument('--seed', type=int, default=0)\n    parser.add_argument('--steps', type=int, default=50)\n    opt = parser.parse_args()\n\n    seed_everything(opt.seed)\n\n    device = torch.device('cuda')\n\n    sd = StableDiffusion(device, opt.fp16, opt.vram_O, opt.sd_version, opt.hf_key)\n\n    imgs = sd.prompt_to_img(opt.prompt, opt.negative, opt.H, opt.W, opt.steps)\n\n    # visualize image\n    plt.imshow(imgs[0])\n    plt.show()\n\n\n\n\n"
  },
  {
    "path": "stable-dreamfusion/guidance/zero123_utils.py",
    "content": "import math\nimport numpy as np\nfrom omegaconf import OmegaConf\nfrom pathlib import Path\n\nimport torch\nimport torch.nn as nn\nimport torch.nn.functional as F\nfrom torch.cuda.amp import custom_bwd, custom_fwd\nfrom torchvision.utils import save_image\n\nfrom diffusers import DDIMScheduler\n\nimport sys\nfrom os import path\nsys.path.append(path.dirname(path.dirname(path.abspath(__file__))))\n\nfrom ldm.util import instantiate_from_config\n\nclass SpecifyGradient(torch.autograd.Function):\n    @staticmethod\n    @custom_fwd\n    def forward(ctx, input_tensor, gt_grad):\n        ctx.save_for_backward(gt_grad)\n        # we return a dummy value 1, which will be scaled by amp's scaler so we get the scale in backward.\n        return torch.ones([1], device=input_tensor.device, dtype=input_tensor.dtype)\n\n    @staticmethod\n    @custom_bwd\n    def backward(ctx, grad_scale):\n        gt_grad, = ctx.saved_tensors\n        gt_grad = gt_grad * grad_scale\n        return gt_grad, None\n\n# load model\ndef load_model_from_config(config, ckpt, device, vram_O=False, verbose=False):\n\n    pl_sd = torch.load(ckpt, map_location='cpu')\n\n    if 'global_step' in pl_sd and verbose:\n        print(f'[INFO] Global Step: {pl_sd[\"global_step\"]}')\n\n    sd = pl_sd['state_dict']\n\n    model = instantiate_from_config(config.model)\n    m, u = model.load_state_dict(sd, strict=False)\n\n    if len(m) > 0 and verbose:\n        print('[INFO] missing keys: \\n', m)\n    if len(u) > 0 and verbose:\n        print('[INFO] unexpected keys: \\n', u)\n\n    # manually load ema and delete it to save GPU memory\n    if model.use_ema:\n        if verbose:\n            print('[INFO] loading EMA...')\n        model.model_ema.copy_to(model.model)\n        del model.model_ema\n\n    if vram_O:\n        # we don't need decoder\n        del model.first_stage_model.decoder\n\n    torch.cuda.empty_cache()\n\n    model.eval().to(device)\n\n    return model\n\nclass Zero123(nn.Module):\n    def __init__(self, device, fp16,\n                 config='./pretrained/zero123/sd-objaverse-finetune-c_concat-256.yaml',\n                 ckpt='./pretrained/zero123/105000.ckpt', vram_O=False, t_range=[0.02, 0.98], opt=None):\n        super().__init__()\n\n        self.device = device\n        self.fp16 = fp16\n        self.vram_O = vram_O\n        self.t_range = t_range\n        self.opt = opt\n\n        self.config = OmegaConf.load(config)\n        # TODO: seems it cannot load into fp16...\n        self.model = load_model_from_config(self.config, ckpt, device=self.device, vram_O=vram_O)\n\n        # timesteps: use diffuser for convenience... hope it's alright.\n        self.num_train_timesteps = self.config.model.params.timesteps\n\n        self.scheduler = DDIMScheduler(\n            self.num_train_timesteps,\n            self.config.model.params.linear_start,\n            self.config.model.params.linear_end,\n            beta_schedule='scaled_linear',\n            clip_sample=False,\n            set_alpha_to_one=False,\n            steps_offset=1,\n        )\n\n        self.min_step = int(self.num_train_timesteps * t_range[0])\n        self.max_step = int(self.num_train_timesteps * t_range[1])\n        self.alphas = self.scheduler.alphas_cumprod.to(self.device) # for convenience\n\n    @torch.no_grad()\n    def get_img_embeds(self, x):\n        # x: image tensor [B, 3, 256, 256] in [0, 1]\n        x = x * 2 - 1\n        c = [self.model.get_learned_conditioning(xx.unsqueeze(0)) for xx in x] #.tile(n_samples, 1, 1)\n        v = [self.model.encode_first_stage(xx.unsqueeze(0)).mode() for xx in x]\n        return c, v\n\n    def angle_between(self, sph_v1, sph_v2):\n        def sph2cart(sv):\n            r, theta, phi = sv[0], sv[1], sv[2]\n            return torch.tensor([r * torch.sin(theta) * torch.cos(phi), r * torch.sin(theta) * torch.sin(phi), r * torch.cos(theta)])\n        def unit_vector(v):\n            return v / torch.linalg.norm(v)\n        def angle_between_2_sph(sv1, sv2):\n            v1, v2 = sph2cart(sv1), sph2cart(sv2)\n            v1_u, v2_u = unit_vector(v1), unit_vector(v2)\n            return torch.arccos(torch.clip(torch.dot(v1_u, v2_u), -1.0, 1.0))\n        angles = torch.empty(len(sph_v1), len(sph_v2))\n        for i, sv1 in enumerate(sph_v1):\n            for j, sv2 in enumerate(sph_v2):\n                angles[i][j] = angle_between_2_sph(sv1, sv2)\n        return angles\n\n    def train_step(self, embeddings, pred_rgb, polar, azimuth, radius, guidance_scale=3, as_latent=False, grad_scale=1, save_guidance_path:Path=None):\n        # pred_rgb: tensor [1, 3, H, W] in [0, 1]\n\n        # adjust SDS scale based on how far the novel view is from the known view\n        ref_radii = embeddings['ref_radii']\n        ref_polars = embeddings['ref_polars']\n        ref_azimuths = embeddings['ref_azimuths']\n        v1 = torch.stack([radius + ref_radii[0], torch.deg2rad(polar + ref_polars[0]), torch.deg2rad(azimuth + ref_azimuths[0])], dim=-1)   # polar,azimuth,radius are all actually delta wrt default\n        v2 = torch.stack([torch.tensor(ref_radii), torch.deg2rad(torch.tensor(ref_polars)), torch.deg2rad(torch.tensor(ref_azimuths))], dim=-1)\n        angles = torch.rad2deg(self.angle_between(v1, v2)).to(self.device)\n        if self.opt.zero123_grad_scale == 'angle':\n            grad_scale = (angles.min(dim=1)[0] / (180/len(ref_azimuths))) * grad_scale  # rethink 180/len(ref_azimuths) # claforte: try inverting grad_scale or just fixing it to 1.0\n        elif self.opt.zero123_grad_scale == 'None':\n            grad_scale = 1.0 # claforte: I think this might converge faster...?\n        else:\n            assert False, f'Unrecognized `zero123_grad_scale`: {self.opt.zero123_grad_scale}'\n        \n        if as_latent:\n            latents = F.interpolate(pred_rgb, (32, 32), mode='bilinear', align_corners=False) * 2 - 1\n        else:\n            pred_rgb_256 = F.interpolate(pred_rgb, (256, 256), mode='bilinear', align_corners=False)\n            latents = self.encode_imgs(pred_rgb_256)\n\n        t = torch.randint(self.min_step, self.max_step + 1, (latents.shape[0],), dtype=torch.long, device=self.device)\n\n        # Set weights acc to closeness in angle\n        if len(ref_azimuths) > 1:\n            inv_angles = 1/angles\n            inv_angles[inv_angles > 100] = 100\n            inv_angles /= inv_angles.max(dim=-1, keepdim=True)[0]\n            inv_angles[inv_angles < 0.1] = 0\n        else:\n            inv_angles = torch.tensor([1.]).to(self.device)\n\n        # Multiply closeness-weight by user-given weights\n        zero123_ws = torch.tensor(embeddings['zero123_ws'])[None, :].to(self.device) * inv_angles\n        zero123_ws /= zero123_ws.max(dim=-1, keepdim=True)[0]\n        zero123_ws[zero123_ws < 0.1] = 0\n\n        with torch.no_grad():\n            noise = torch.randn_like(latents)\n            latents_noisy = self.scheduler.add_noise(latents, noise, t)\n\n            x_in = torch.cat([latents_noisy] * 2)\n            t_in = torch.cat([t] * 2)\n\n            noise_preds = []\n            # Loop through each ref image\n            for (zero123_w, c_crossattn, c_concat, ref_polar, ref_azimuth, ref_radius) in zip(zero123_ws.T,\n                                                                                              embeddings['c_crossattn'], embeddings['c_concat'],\n                                                                                              ref_polars, ref_azimuths, ref_radii):\n                # polar,azimuth,radius are all actually delta wrt default\n                p = polar + ref_polars[0] - ref_polar\n                a = azimuth + ref_azimuths[0] - ref_azimuth\n                a[a > 180] -= 360 # range in [-180, 180]\n                r = radius + ref_radii[0] - ref_radius\n                # T = torch.tensor([math.radians(p), math.sin(math.radians(-a)), math.cos(math.radians(a)), r])\n                # T = T[None, None, :].to(self.device)\n                T = torch.stack([torch.deg2rad(p), torch.sin(torch.deg2rad(-a)), torch.cos(torch.deg2rad(a)), r], dim=-1)[:, None, :]\n                cond = {}\n                clip_emb = self.model.cc_projection(torch.cat([c_crossattn.repeat(len(T), 1, 1), T], dim=-1))\n                cond['c_crossattn'] = [torch.cat([torch.zeros_like(clip_emb).to(self.device), clip_emb], dim=0)]\n                cond['c_concat'] = [torch.cat([torch.zeros_like(c_concat).repeat(len(T), 1, 1, 1).to(self.device), c_concat.repeat(len(T), 1, 1, 1)], dim=0)]\n                noise_pred = self.model.apply_model(x_in, t_in, cond)\n                noise_pred_uncond, noise_pred_cond = noise_pred.chunk(2)\n                noise_pred = noise_pred_uncond + guidance_scale * (noise_pred_cond - noise_pred_uncond)\n                noise_preds.append(zero123_w[:, None, None, None] * noise_pred)\n\n        noise_pred = torch.stack(noise_preds).sum(dim=0) / zero123_ws.sum(dim=-1)[:, None, None, None]\n\n        w = (1 - self.alphas[t])\n        grad = (grad_scale * w)[:, None, None, None] * (noise_pred - noise)\n        grad = torch.nan_to_num(grad)\n\n        # import kiui\n        # if not as_latent:\n        #     kiui.vis.plot_image(pred_rgb_256)\n        # kiui.vis.plot_matrix(latents)\n        # kiui.vis.plot_matrix(grad)\n\n        # import kiui\n        # latents = torch.randn((1, 4, 32, 32), device=self.device)\n        # kiui.lo(latents)\n        # self.scheduler.set_timesteps(30)\n        # with torch.no_grad():\n        #     for i, t in enumerate(self.scheduler.timesteps):\n        #         x_in = torch.cat([latents] * 2)\n        #         t_in = torch.cat([t.view(1)] * 2).to(self.device)\n\n        #         noise_pred = self.model.apply_model(x_in, t_in, cond)\n        #         noise_pred_uncond, noise_pred_cond = noise_pred.chunk(2)\n        #         noise_pred = noise_pred_uncond + 3 * (noise_pred_cond - noise_pred_uncond)\n\n        #         latents = self.scheduler.step(noise_pred, t, latents)['prev_sample']\n        # imgs = self.decode_latents(latents)\n        # print(polar, azimuth, radius)\n        # kiui.vis.plot_image(pred_rgb_256, imgs)\n\n        if save_guidance_path:\n            with torch.no_grad():\n                if as_latent:\n                    pred_rgb_256 = self.decode_latents(latents) # claforte: test!\n\n                # visualize predicted denoised image\n                result_hopefully_less_noisy_image = self.decode_latents(self.model.predict_start_from_noise(latents_noisy, t, noise_pred))\n\n                # visualize noisier image\n                result_noisier_image = self.decode_latents(latents_noisy)\n\n                # TODO: also denoise all-the-way\n\n                # all 3 input images are [1, 3, H, W], e.g. [1, 3, 512, 512]\n                viz_images = torch.cat([pred_rgb_256, result_noisier_image, result_hopefully_less_noisy_image],dim=-1)\n                save_image(viz_images, save_guidance_path)\n\n        # since we omitted an item in grad, we need to use the custom function to specify the gradient\n        loss = SpecifyGradient.apply(latents, grad)\n\n        return loss\n\n    # verification\n    @torch.no_grad()\n    def __call__(self,\n            image, # image tensor [1, 3, H, W] in [0, 1]\n            polar=0, azimuth=0, radius=0, # new view params\n            scale=3, ddim_steps=50, ddim_eta=1, h=256, w=256, # diffusion params\n            c_crossattn=None, c_concat=None, post_process=True,\n        ):\n\n        if c_crossattn is None:\n            embeddings = self.get_img_embeds(image)\n\n        T = torch.tensor([math.radians(polar), math.sin(math.radians(azimuth)), math.cos(math.radians(azimuth)), radius])\n        T = T[None, None, :].to(self.device)\n\n        cond = {}\n        clip_emb = self.model.cc_projection(torch.cat([embeddings['c_crossattn'] if c_crossattn is None else c_crossattn, T], dim=-1))\n        cond['c_crossattn'] = [torch.cat([torch.zeros_like(clip_emb).to(self.device), clip_emb], dim=0)]\n        cond['c_concat'] = [torch.cat([torch.zeros_like(embeddings['c_concat']).to(self.device), embeddings['c_concat']], dim=0)] if c_concat is None else [torch.cat([torch.zeros_like(c_concat).to(self.device), c_concat], dim=0)]\n\n        # produce latents loop\n        latents = torch.randn((1, 4, h // 8, w // 8), device=self.device)\n        self.scheduler.set_timesteps(ddim_steps)\n\n        for i, t in enumerate(self.scheduler.timesteps):\n            x_in = torch.cat([latents] * 2)\n            t_in = torch.cat([t.view(1)] * 2).to(self.device)\n\n            noise_pred = self.model.apply_model(x_in, t_in, cond)\n            noise_pred_uncond, noise_pred_cond = noise_pred.chunk(2)\n            noise_pred = noise_pred_uncond + scale * (noise_pred_cond - noise_pred_uncond)\n\n            latents = self.scheduler.step(noise_pred, t, latents, eta=ddim_eta)['prev_sample']\n\n        imgs = self.decode_latents(latents)\n        imgs = imgs.cpu().numpy().transpose(0, 2, 3, 1) if post_process else imgs\n\n        return imgs\n\n    def decode_latents(self, latents):\n        # zs: [B, 4, 32, 32] Latent space image\n        # with self.model.ema_scope():\n        imgs = self.model.decode_first_stage(latents)\n        imgs = (imgs / 2 + 0.5).clamp(0, 1)\n\n        return imgs # [B, 3, 256, 256] RGB space image\n\n    def encode_imgs(self, imgs):\n        # imgs: [B, 3, 256, 256] RGB space image\n        # with self.model.ema_scope():\n        imgs = imgs * 2 - 1\n        latents = torch.cat([self.model.get_first_stage_encoding(self.model.encode_first_stage(img.unsqueeze(0))) for img in imgs], dim=0)\n        return latents # [B, 4, 32, 32] Latent space image\n\n\nif __name__ == '__main__':\n    import cv2\n    import argparse\n    import numpy as np\n    import matplotlib.pyplot as plt\n\n    parser = argparse.ArgumentParser()\n\n    parser.add_argument('input', type=str)\n    parser.add_argument('--fp16', action='store_true', help=\"use float16 for training\") # no use now, can only run in fp32\n\n    parser.add_argument('--polar', type=float, default=0, help='delta polar angle in [-90, 90]')\n    parser.add_argument('--azimuth', type=float, default=0, help='delta azimuth angle in [-180, 180]')\n    parser.add_argument('--radius', type=float, default=0, help='delta camera radius multiplier in [-0.5, 0.5]')\n\n    opt = parser.parse_args()\n\n    device = torch.device('cuda')\n\n    print(f'[INFO] loading image from {opt.input} ...')\n    image = cv2.imread(opt.input, cv2.IMREAD_UNCHANGED)\n    image = cv2.cvtColor(image, cv2.COLOR_BGR2RGB)\n    image = cv2.resize(image, (256, 256), interpolation=cv2.INTER_AREA)\n    image = image.astype(np.float32) / 255.0\n    image = torch.from_numpy(image).permute(2, 0, 1).unsqueeze(0).contiguous().to(device)\n\n    print(f'[INFO] loading model ...')\n    zero123 = Zero123(device, opt.fp16, opt=opt)\n\n    print(f'[INFO] running model ...')\n    outputs = zero123(image, polar=opt.polar, azimuth=opt.azimuth, radius=opt.radius)\n    plt.imshow(outputs[0])\n    plt.show()"
  },
  {
    "path": "stable-dreamfusion/ldm/extras.py",
    "content": "from pathlib import Path\nfrom omegaconf import OmegaConf\nimport torch\nfrom ldm.util import instantiate_from_config\nimport logging\nfrom contextlib import contextmanager\n\nfrom contextlib import contextmanager\nimport logging\n\n@contextmanager\ndef all_logging_disabled(highest_level=logging.CRITICAL):\n    \"\"\"\n    A context manager that will prevent any logging messages\n    triggered during the body from being processed.\n\n    :param highest_level: the maximum logging level in use.\n      This would only need to be changed if a custom level greater than CRITICAL\n      is defined.\n\n    https://gist.github.com/simon-weber/7853144\n    \"\"\"\n    # two kind-of hacks here:\n    #    * can't get the highest logging level in effect => delegate to the user\n    #    * can't get the current module-level override => use an undocumented\n    #       (but non-private!) interface\n\n    previous_level = logging.root.manager.disable\n\n    logging.disable(highest_level)\n\n    try:\n        yield\n    finally:\n        logging.disable(previous_level)\n\ndef load_training_dir(train_dir, device, epoch=\"last\"):\n    \"\"\"Load a checkpoint and config from training directory\"\"\"\n    train_dir = Path(train_dir)\n    ckpt = list(train_dir.rglob(f\"*{epoch}.ckpt\"))\n    assert len(ckpt) == 1, f\"found {len(ckpt)} matching ckpt files\"\n    config = list(train_dir.rglob(f\"*-project.yaml\"))\n    assert len(ckpt) > 0, f\"didn't find any config in {train_dir}\"\n    if len(config) > 1:\n        print(f\"found {len(config)} matching config files\")\n        config = sorted(config)[-1]\n        print(f\"selecting {config}\")\n    else:\n        config = config[0]\n\n\n    config = OmegaConf.load(config)\n    return load_model_from_config(config, ckpt[0], device)\n\ndef load_model_from_config(config, ckpt, device=\"cpu\", verbose=False):\n    \"\"\"Loads a model from config and a ckpt\n    if config is a path will use omegaconf to load\n    \"\"\"\n    if isinstance(config, (str, Path)):\n        config = OmegaConf.load(config)\n\n    with all_logging_disabled():\n        print(f\"Loading model from {ckpt}\")\n        pl_sd = torch.load(ckpt, map_location=\"cpu\")\n        global_step = pl_sd[\"global_step\"]\n        sd = pl_sd[\"state_dict\"]\n        model = instantiate_from_config(config.model)\n        m, u = model.load_state_dict(sd, strict=False)\n        if len(m) > 0 and verbose:\n            print(\"missing keys:\")\n            print(m)\n        if len(u) > 0 and verbose:\n            print(\"unexpected keys:\")\n        model.to(device)\n        model.eval()\n        model.cond_stage_model.device = device\n        return model"
  },
  {
    "path": "stable-dreamfusion/ldm/guidance.py",
    "content": "from typing import List, Tuple\nfrom scipy import interpolate\nimport numpy as np\nimport torch\nimport matplotlib.pyplot as plt\nfrom IPython.display import clear_output\nimport abc\n\n\nclass GuideModel(torch.nn.Module, abc.ABC):\n    def __init__(self) -> None:\n        super().__init__()\n\n    @abc.abstractmethod\n    def preprocess(self, x_img):\n        pass\n\n    @abc.abstractmethod\n    def compute_loss(self, inp):\n        pass\n\n\nclass Guider(torch.nn.Module):\n    def __init__(self, sampler, guide_model, scale=1.0, verbose=False):\n        \"\"\"Apply classifier guidance\n\n        Specify a guidance scale as either a scalar\n        Or a schedule as a list of tuples t = 0->1 and scale, e.g.\n        [(0, 10), (0.5, 20), (1, 50)]\n        \"\"\"\n        super().__init__()\n        self.sampler = sampler\n        self.index = 0\n        self.show = verbose\n        self.guide_model = guide_model\n        self.history = []\n\n        if isinstance(scale, (Tuple, List)):\n            times = np.array([x[0] for x in scale])\n            values = np.array([x[1] for x in scale])\n            self.scale_schedule = {\"times\": times, \"values\": values}\n        else:\n            self.scale_schedule = float(scale)\n\n        self.ddim_timesteps = sampler.ddim_timesteps\n        self.ddpm_num_timesteps = sampler.ddpm_num_timesteps\n\n\n    def get_scales(self):\n        if isinstance(self.scale_schedule, float):\n            return len(self.ddim_timesteps)*[self.scale_schedule]\n\n        interpolater = interpolate.interp1d(self.scale_schedule[\"times\"], self.scale_schedule[\"values\"])\n        fractional_steps = np.array(self.ddim_timesteps)/self.ddpm_num_timesteps\n        return interpolater(fractional_steps)\n\n    def modify_score(self, model, e_t, x, t, c):\n\n        # TODO look up index by t\n        scale = self.get_scales()[self.index]\n\n        if (scale == 0):\n            return e_t\n\n        sqrt_1ma = self.sampler.ddim_sqrt_one_minus_alphas[self.index].to(x.device)\n        with torch.enable_grad():\n            x_in = x.detach().requires_grad_(True)\n            pred_x0 = model.predict_start_from_noise(x_in, t=t, noise=e_t)\n            x_img = model.first_stage_model.decode((1/0.18215)*pred_x0)\n\n            inp = self.guide_model.preprocess(x_img)\n            loss = self.guide_model.compute_loss(inp)\n            grads = torch.autograd.grad(loss.sum(), x_in)[0]\n            correction = grads * scale\n\n            if self.show:\n                clear_output(wait=True)\n                print(loss.item(), scale, correction.abs().max().item(), e_t.abs().max().item())\n                self.history.append([loss.item(), scale, correction.min().item(), correction.max().item()])\n                plt.imshow((inp[0].detach().permute(1,2,0).clamp(-1,1).cpu()+1)/2)\n                plt.axis('off')\n                plt.show()\n                plt.imshow(correction[0][0].detach().cpu())\n                plt.axis('off')\n                plt.show()\n\n\n        e_t_mod = e_t - sqrt_1ma*correction\n        if self.show:\n            fig, axs = plt.subplots(1, 3)\n            axs[0].imshow(e_t[0][0].detach().cpu(), vmin=-2, vmax=+2)\n            axs[1].imshow(e_t_mod[0][0].detach().cpu(), vmin=-2, vmax=+2)\n            axs[2].imshow(correction[0][0].detach().cpu(), vmin=-2, vmax=+2)\n            plt.show()\n        self.index += 1\n        return e_t_mod"
  },
  {
    "path": "stable-dreamfusion/ldm/lr_scheduler.py",
    "content": "import numpy as np\n\n\nclass LambdaWarmUpCosineScheduler:\n    \"\"\"\n    note: use with a base_lr of 1.0\n    \"\"\"\n    def __init__(self, warm_up_steps, lr_min, lr_max, lr_start, max_decay_steps, verbosity_interval=0):\n        self.lr_warm_up_steps = warm_up_steps\n        self.lr_start = lr_start\n        self.lr_min = lr_min\n        self.lr_max = lr_max\n        self.lr_max_decay_steps = max_decay_steps\n        self.last_lr = 0.\n        self.verbosity_interval = verbosity_interval\n\n    def schedule(self, n, **kwargs):\n        if self.verbosity_interval > 0:\n            if n % self.verbosity_interval == 0: print(f\"current step: {n}, recent lr-multiplier: {self.last_lr}\")\n        if n < self.lr_warm_up_steps:\n            lr = (self.lr_max - self.lr_start) / self.lr_warm_up_steps * n + self.lr_start\n            self.last_lr = lr\n            return lr\n        else:\n            t = (n - self.lr_warm_up_steps) / (self.lr_max_decay_steps - self.lr_warm_up_steps)\n            t = min(t, 1.0)\n            lr = self.lr_min + 0.5 * (self.lr_max - self.lr_min) * (\n                    1 + np.cos(t * np.pi))\n            self.last_lr = lr\n            return lr\n\n    def __call__(self, n, **kwargs):\n        return self.schedule(n,**kwargs)\n\n\nclass LambdaWarmUpCosineScheduler2:\n    \"\"\"\n    supports repeated iterations, configurable via lists\n    note: use with a base_lr of 1.0.\n    \"\"\"\n    def __init__(self, warm_up_steps, f_min, f_max, f_start, cycle_lengths, verbosity_interval=0):\n        assert len(warm_up_steps) == len(f_min) == len(f_max) == len(f_start) == len(cycle_lengths)\n        self.lr_warm_up_steps = warm_up_steps\n        self.f_start = f_start\n        self.f_min = f_min\n        self.f_max = f_max\n        self.cycle_lengths = cycle_lengths\n        self.cum_cycles = np.cumsum([0] + list(self.cycle_lengths))\n        self.last_f = 0.\n        self.verbosity_interval = verbosity_interval\n\n    def find_in_interval(self, n):\n        interval = 0\n        for cl in self.cum_cycles[1:]:\n            if n <= cl:\n                return interval\n            interval += 1\n\n    def schedule(self, n, **kwargs):\n        cycle = self.find_in_interval(n)\n        n = n - self.cum_cycles[cycle]\n        if self.verbosity_interval > 0:\n            if n % self.verbosity_interval == 0: print(f\"current step: {n}, recent lr-multiplier: {self.last_f}, \"\n                                                       f\"current cycle {cycle}\")\n        if n < self.lr_warm_up_steps[cycle]:\n            f = (self.f_max[cycle] - self.f_start[cycle]) / self.lr_warm_up_steps[cycle] * n + self.f_start[cycle]\n            self.last_f = f\n            return f\n        else:\n            t = (n - self.lr_warm_up_steps[cycle]) / (self.cycle_lengths[cycle] - self.lr_warm_up_steps[cycle])\n            t = min(t, 1.0)\n            f = self.f_min[cycle] + 0.5 * (self.f_max[cycle] - self.f_min[cycle]) * (\n                    1 + np.cos(t * np.pi))\n            self.last_f = f\n            return f\n\n    def __call__(self, n, **kwargs):\n        return self.schedule(n, **kwargs)\n\n\nclass LambdaLinearScheduler(LambdaWarmUpCosineScheduler2):\n\n    def schedule(self, n, **kwargs):\n        cycle = self.find_in_interval(n)\n        n = n - self.cum_cycles[cycle]\n        if self.verbosity_interval > 0:\n            if n % self.verbosity_interval == 0: print(f\"current step: {n}, recent lr-multiplier: {self.last_f}, \"\n                                                       f\"current cycle {cycle}\")\n\n        if n < self.lr_warm_up_steps[cycle]:\n            f = (self.f_max[cycle] - self.f_start[cycle]) / self.lr_warm_up_steps[cycle] * n + self.f_start[cycle]\n            self.last_f = f\n            return f\n        else:\n            f = self.f_min[cycle] + (self.f_max[cycle] - self.f_min[cycle]) * (self.cycle_lengths[cycle] - n) / (self.cycle_lengths[cycle])\n            self.last_f = f\n            return f\n\n"
  },
  {
    "path": "stable-dreamfusion/ldm/models/autoencoder.py",
    "content": "import torch\nimport pytorch_lightning as pl\nimport torch.nn.functional as F\nfrom contextlib import contextmanager\n\nfrom taming.modules.vqvae.quantize import VectorQuantizer2 as VectorQuantizer\n\nfrom ldm.modules.diffusionmodules.model import Encoder, Decoder\nfrom ldm.modules.distributions.distributions import DiagonalGaussianDistribution\n\nfrom ldm.util import instantiate_from_config\n\n\nclass VQModel(pl.LightningModule):\n    def __init__(self,\n                 ddconfig,\n                 lossconfig,\n                 n_embed,\n                 embed_dim,\n                 ckpt_path=None,\n                 ignore_keys=[],\n                 image_key=\"image\",\n                 colorize_nlabels=None,\n                 monitor=None,\n                 batch_resize_range=None,\n                 scheduler_config=None,\n                 lr_g_factor=1.0,\n                 remap=None,\n                 sane_index_shape=False, # tell vector quantizer to return indices as bhw\n                 use_ema=False\n                 ):\n        super().__init__()\n        self.embed_dim = embed_dim\n        self.n_embed = n_embed\n        self.image_key = image_key\n        self.encoder = Encoder(**ddconfig)\n        self.decoder = Decoder(**ddconfig)\n        self.loss = instantiate_from_config(lossconfig)\n        self.quantize = VectorQuantizer(n_embed, embed_dim, beta=0.25,\n                                        remap=remap,\n                                        sane_index_shape=sane_index_shape)\n        self.quant_conv = torch.nn.Conv2d(ddconfig[\"z_channels\"], embed_dim, 1)\n        self.post_quant_conv = torch.nn.Conv2d(embed_dim, ddconfig[\"z_channels\"], 1)\n        if colorize_nlabels is not None:\n            assert type(colorize_nlabels)==int\n            self.register_buffer(\"colorize\", torch.randn(3, colorize_nlabels, 1, 1))\n        if monitor is not None:\n            self.monitor = monitor\n        self.batch_resize_range = batch_resize_range\n        if self.batch_resize_range is not None:\n            print(f\"{self.__class__.__name__}: Using per-batch resizing in range {batch_resize_range}.\")\n\n        self.use_ema = use_ema\n        if self.use_ema:\n            self.model_ema = LitEma(self)\n            print(f\"Keeping EMAs of {len(list(self.model_ema.buffers()))}.\")\n\n        if ckpt_path is not None:\n            self.init_from_ckpt(ckpt_path, ignore_keys=ignore_keys)\n        self.scheduler_config = scheduler_config\n        self.lr_g_factor = lr_g_factor\n\n    @contextmanager\n    def ema_scope(self, context=None):\n        if self.use_ema:\n            self.model_ema.store(self.parameters())\n            self.model_ema.copy_to(self)\n            if context is not None:\n                print(f\"{context}: Switched to EMA weights\")\n        try:\n            yield None\n        finally:\n            if self.use_ema:\n                self.model_ema.restore(self.parameters())\n                if context is not None:\n                    print(f\"{context}: Restored training weights\")\n\n    def init_from_ckpt(self, path, ignore_keys=list()):\n        sd = torch.load(path, map_location=\"cpu\")[\"state_dict\"]\n        keys = list(sd.keys())\n        for k in keys:\n            for ik in ignore_keys:\n                if k.startswith(ik):\n                    print(\"Deleting key {} from state_dict.\".format(k))\n                    del sd[k]\n        missing, unexpected = self.load_state_dict(sd, strict=False)\n        print(f\"Restored from {path} with {len(missing)} missing and {len(unexpected)} unexpected keys\")\n        if len(missing) > 0:\n            print(f\"Missing Keys: {missing}\")\n            print(f\"Unexpected Keys: {unexpected}\")\n\n    def on_train_batch_end(self, *args, **kwargs):\n        if self.use_ema:\n            self.model_ema(self)\n\n    def encode(self, x):\n        h = self.encoder(x)\n        h = self.quant_conv(h)\n        quant, emb_loss, info = self.quantize(h)\n        return quant, emb_loss, info\n\n    def encode_to_prequant(self, x):\n        h = self.encoder(x)\n        h = self.quant_conv(h)\n        return h\n\n    def decode(self, quant):\n        quant = self.post_quant_conv(quant)\n        dec = self.decoder(quant)\n        return dec\n\n    def decode_code(self, code_b):\n        quant_b = self.quantize.embed_code(code_b)\n        dec = self.decode(quant_b)\n        return dec\n\n    def forward(self, input, return_pred_indices=False):\n        quant, diff, (_,_,ind) = self.encode(input)\n        dec = self.decode(quant)\n        if return_pred_indices:\n            return dec, diff, ind\n        return dec, diff\n\n    def get_input(self, batch, k):\n        x = batch[k]\n        if len(x.shape) == 3:\n            x = x[..., None]\n        x = x.permute(0, 3, 1, 2).to(memory_format=torch.contiguous_format).float()\n        if self.batch_resize_range is not None:\n            lower_size = self.batch_resize_range[0]\n            upper_size = self.batch_resize_range[1]\n            if self.global_step <= 4:\n                # do the first few batches with max size to avoid later oom\n                new_resize = upper_size\n            else:\n                new_resize = np.random.choice(np.arange(lower_size, upper_size+16, 16))\n            if new_resize != x.shape[2]:\n                x = F.interpolate(x, size=new_resize, mode=\"bicubic\")\n            x = x.detach()\n        return x\n\n    def training_step(self, batch, batch_idx, optimizer_idx):\n        # https://github.com/pytorch/pytorch/issues/37142\n        # try not to fool the heuristics\n        x = self.get_input(batch, self.image_key)\n        xrec, qloss, ind = self(x, return_pred_indices=True)\n\n        if optimizer_idx == 0:\n            # autoencode\n            aeloss, log_dict_ae = self.loss(qloss, x, xrec, optimizer_idx, self.global_step,\n                                            last_layer=self.get_last_layer(), split=\"train\",\n                                            predicted_indices=ind)\n\n            self.log_dict(log_dict_ae, prog_bar=False, logger=True, on_step=True, on_epoch=True)\n            return aeloss\n\n        if optimizer_idx == 1:\n            # discriminator\n            discloss, log_dict_disc = self.loss(qloss, x, xrec, optimizer_idx, self.global_step,\n                                            last_layer=self.get_last_layer(), split=\"train\")\n            self.log_dict(log_dict_disc, prog_bar=False, logger=True, on_step=True, on_epoch=True)\n            return discloss\n\n    def validation_step(self, batch, batch_idx):\n        log_dict = self._validation_step(batch, batch_idx)\n        with self.ema_scope():\n            log_dict_ema = self._validation_step(batch, batch_idx, suffix=\"_ema\")\n        return log_dict\n\n    def _validation_step(self, batch, batch_idx, suffix=\"\"):\n        x = self.get_input(batch, self.image_key)\n        xrec, qloss, ind = self(x, return_pred_indices=True)\n        aeloss, log_dict_ae = self.loss(qloss, x, xrec, 0,\n                                        self.global_step,\n                                        last_layer=self.get_last_layer(),\n                                        split=\"val\"+suffix,\n                                        predicted_indices=ind\n                                        )\n\n        discloss, log_dict_disc = self.loss(qloss, x, xrec, 1,\n                                            self.global_step,\n                                            last_layer=self.get_last_layer(),\n                                            split=\"val\"+suffix,\n                                            predicted_indices=ind\n                                            )\n        rec_loss = log_dict_ae[f\"val{suffix}/rec_loss\"]\n        self.log(f\"val{suffix}/rec_loss\", rec_loss,\n                   prog_bar=True, logger=True, on_step=False, on_epoch=True, sync_dist=True)\n        self.log(f\"val{suffix}/aeloss\", aeloss,\n                   prog_bar=True, logger=True, on_step=False, on_epoch=True, sync_dist=True)\n        if version.parse(pl.__version__) >= version.parse('1.4.0'):\n            del log_dict_ae[f\"val{suffix}/rec_loss\"]\n        self.log_dict(log_dict_ae)\n        self.log_dict(log_dict_disc)\n        return self.log_dict\n\n    def configure_optimizers(self):\n        lr_d = self.learning_rate\n        lr_g = self.lr_g_factor*self.learning_rate\n        print(\"lr_d\", lr_d)\n        print(\"lr_g\", lr_g)\n        opt_ae = torch.optim.Adam(list(self.encoder.parameters())+\n                                  list(self.decoder.parameters())+\n                                  list(self.quantize.parameters())+\n                                  list(self.quant_conv.parameters())+\n                                  list(self.post_quant_conv.parameters()),\n                                  lr=lr_g, betas=(0.5, 0.9))\n        opt_disc = torch.optim.Adam(self.loss.discriminator.parameters(),\n                                    lr=lr_d, betas=(0.5, 0.9))\n\n        if self.scheduler_config is not None:\n            scheduler = instantiate_from_config(self.scheduler_config)\n\n            print(\"Setting up LambdaLR scheduler...\")\n            scheduler = [\n                {\n                    'scheduler': LambdaLR(opt_ae, lr_lambda=scheduler.schedule),\n                    'interval': 'step',\n                    'frequency': 1\n                },\n                {\n                    'scheduler': LambdaLR(opt_disc, lr_lambda=scheduler.schedule),\n                    'interval': 'step',\n                    'frequency': 1\n                },\n            ]\n            return [opt_ae, opt_disc], scheduler\n        return [opt_ae, opt_disc], []\n\n    def get_last_layer(self):\n        return self.decoder.conv_out.weight\n\n    def log_images(self, batch, only_inputs=False, plot_ema=False, **kwargs):\n        log = dict()\n        x = self.get_input(batch, self.image_key)\n        x = x.to(self.device)\n        if only_inputs:\n            log[\"inputs\"] = x\n            return log\n        xrec, _ = self(x)\n        if x.shape[1] > 3:\n            # colorize with random projection\n            assert xrec.shape[1] > 3\n            x = self.to_rgb(x)\n            xrec = self.to_rgb(xrec)\n        log[\"inputs\"] = x\n        log[\"reconstructions\"] = xrec\n        if plot_ema:\n            with self.ema_scope():\n                xrec_ema, _ = self(x)\n                if x.shape[1] > 3: xrec_ema = self.to_rgb(xrec_ema)\n                log[\"reconstructions_ema\"] = xrec_ema\n        return log\n\n    def to_rgb(self, x):\n        assert self.image_key == \"segmentation\"\n        if not hasattr(self, \"colorize\"):\n            self.register_buffer(\"colorize\", torch.randn(3, x.shape[1], 1, 1).to(x))\n        x = F.conv2d(x, weight=self.colorize)\n        x = 2.*(x-x.min())/(x.max()-x.min()) - 1.\n        return x\n\n\nclass VQModelInterface(VQModel):\n    def __init__(self, embed_dim, *args, **kwargs):\n        super().__init__(embed_dim=embed_dim, *args, **kwargs)\n        self.embed_dim = embed_dim\n\n    def encode(self, x):\n        h = self.encoder(x)\n        h = self.quant_conv(h)\n        return h\n\n    def decode(self, h, force_not_quantize=False):\n        # also go through quantization layer\n        if not force_not_quantize:\n            quant, emb_loss, info = self.quantize(h)\n        else:\n            quant = h\n        quant = self.post_quant_conv(quant)\n        dec = self.decoder(quant)\n        return dec\n\n\nclass AutoencoderKL(pl.LightningModule):\n    def __init__(self,\n                 ddconfig,\n                 lossconfig,\n                 embed_dim,\n                 ckpt_path=None,\n                 ignore_keys=[],\n                 image_key=\"image\",\n                 colorize_nlabels=None,\n                 monitor=None,\n                 ):\n        super().__init__()\n        self.image_key = image_key\n        self.encoder = Encoder(**ddconfig)\n        self.decoder = Decoder(**ddconfig)\n        self.loss = instantiate_from_config(lossconfig)\n        assert ddconfig[\"double_z\"]\n        self.quant_conv = torch.nn.Conv2d(2*ddconfig[\"z_channels\"], 2*embed_dim, 1)\n        self.post_quant_conv = torch.nn.Conv2d(embed_dim, ddconfig[\"z_channels\"], 1)\n        self.embed_dim = embed_dim\n        if colorize_nlabels is not None:\n            assert type(colorize_nlabels)==int\n            self.register_buffer(\"colorize\", torch.randn(3, colorize_nlabels, 1, 1))\n        if monitor is not None:\n            self.monitor = monitor\n        if ckpt_path is not None:\n            self.init_from_ckpt(ckpt_path, ignore_keys=ignore_keys)\n\n    def init_from_ckpt(self, path, ignore_keys=list()):\n        sd = torch.load(path, map_location=\"cpu\")[\"state_dict\"]\n        keys = list(sd.keys())\n        for k in keys:\n            for ik in ignore_keys:\n                if k.startswith(ik):\n                    print(\"Deleting key {} from state_dict.\".format(k))\n                    del sd[k]\n        self.load_state_dict(sd, strict=False)\n        print(f\"Restored from {path}\")\n\n    def encode(self, x):\n        h = self.encoder(x)\n        moments = self.quant_conv(h)\n        posterior = DiagonalGaussianDistribution(moments)\n        return posterior\n\n    def decode(self, z):\n        z = self.post_quant_conv(z)\n        dec = self.decoder(z)\n        return dec\n\n    def forward(self, input, sample_posterior=True):\n        posterior = self.encode(input)\n        if sample_posterior:\n            z = posterior.sample()\n        else:\n            z = posterior.mode()\n        dec = self.decode(z)\n        return dec, posterior\n\n    def get_input(self, batch, k):\n        x = batch[k]\n        if len(x.shape) == 3:\n            x = x[..., None]\n        x = x.permute(0, 3, 1, 2).to(memory_format=torch.contiguous_format).float()\n        return x\n\n    def training_step(self, batch, batch_idx, optimizer_idx):\n        inputs = self.get_input(batch, self.image_key)\n        reconstructions, posterior = self(inputs)\n\n        if optimizer_idx == 0:\n            # train encoder+decoder+logvar\n            aeloss, log_dict_ae = self.loss(inputs, reconstructions, posterior, optimizer_idx, self.global_step,\n                                            last_layer=self.get_last_layer(), split=\"train\")\n            self.log(\"aeloss\", aeloss, prog_bar=True, logger=True, on_step=True, on_epoch=True)\n            self.log_dict(log_dict_ae, prog_bar=False, logger=True, on_step=True, on_epoch=False)\n            return aeloss\n\n        if optimizer_idx == 1:\n            # train the discriminator\n            discloss, log_dict_disc = self.loss(inputs, reconstructions, posterior, optimizer_idx, self.global_step,\n                                                last_layer=self.get_last_layer(), split=\"train\")\n\n            self.log(\"discloss\", discloss, prog_bar=True, logger=True, on_step=True, on_epoch=True)\n            self.log_dict(log_dict_disc, prog_bar=False, logger=True, on_step=True, on_epoch=False)\n            return discloss\n\n    def validation_step(self, batch, batch_idx):\n        inputs = self.get_input(batch, self.image_key)\n        reconstructions, posterior = self(inputs)\n        aeloss, log_dict_ae = self.loss(inputs, reconstructions, posterior, 0, self.global_step,\n                                        last_layer=self.get_last_layer(), split=\"val\")\n\n        discloss, log_dict_disc = self.loss(inputs, reconstructions, posterior, 1, self.global_step,\n                                            last_layer=self.get_last_layer(), split=\"val\")\n\n        self.log(\"val/rec_loss\", log_dict_ae[\"val/rec_loss\"])\n        self.log_dict(log_dict_ae)\n        self.log_dict(log_dict_disc)\n        return self.log_dict\n\n    def configure_optimizers(self):\n        lr = self.learning_rate\n        opt_ae = torch.optim.Adam(list(self.encoder.parameters())+\n                                  list(self.decoder.parameters())+\n                                  list(self.quant_conv.parameters())+\n                                  list(self.post_quant_conv.parameters()),\n                                  lr=lr, betas=(0.5, 0.9))\n        opt_disc = torch.optim.Adam(self.loss.discriminator.parameters(),\n                                    lr=lr, betas=(0.5, 0.9))\n        return [opt_ae, opt_disc], []\n\n    def get_last_layer(self):\n        return self.decoder.conv_out.weight\n\n    @torch.no_grad()\n    def log_images(self, batch, only_inputs=False, **kwargs):\n        log = dict()\n        x = self.get_input(batch, self.image_key)\n        x = x.to(self.device)\n        if not only_inputs:\n            xrec, posterior = self(x)\n            if x.shape[1] > 3:\n                # colorize with random projection\n                assert xrec.shape[1] > 3\n                x = self.to_rgb(x)\n                xrec = self.to_rgb(xrec)\n            log[\"samples\"] = self.decode(torch.randn_like(posterior.sample()))\n            log[\"reconstructions\"] = xrec\n        log[\"inputs\"] = x\n        return log\n\n    def to_rgb(self, x):\n        assert self.image_key == \"segmentation\"\n        if not hasattr(self, \"colorize\"):\n            self.register_buffer(\"colorize\", torch.randn(3, x.shape[1], 1, 1).to(x))\n        x = F.conv2d(x, weight=self.colorize)\n        x = 2.*(x-x.min())/(x.max()-x.min()) - 1.\n        return x\n\n\nclass IdentityFirstStage(torch.nn.Module):\n    def __init__(self, *args, vq_interface=False, **kwargs):\n        self.vq_interface = vq_interface  # TODO: Should be true by default but check to not break older stuff\n        super().__init__()\n\n    def encode(self, x, *args, **kwargs):\n        return x\n\n    def decode(self, x, *args, **kwargs):\n        return x\n\n    def quantize(self, x, *args, **kwargs):\n        if self.vq_interface:\n            return x, None, [None, None, None]\n        return x\n\n    def forward(self, x, *args, **kwargs):\n        return x\n"
  },
  {
    "path": "stable-dreamfusion/ldm/models/diffusion/__init__.py",
    "content": ""
  },
  {
    "path": "stable-dreamfusion/ldm/models/diffusion/classifier.py",
    "content": "import os\nimport torch\nimport pytorch_lightning as pl\nfrom omegaconf import OmegaConf\nfrom torch.nn import functional as F\nfrom torch.optim import AdamW\nfrom torch.optim.lr_scheduler import LambdaLR\nfrom copy import deepcopy\nfrom einops import rearrange\nfrom glob import glob\nfrom natsort import natsorted\n\nfrom ldm.modules.diffusionmodules.openaimodel import EncoderUNetModel, UNetModel\nfrom ldm.util import log_txt_as_img, default, ismap, instantiate_from_config\n\n__models__ = {\n    'class_label': EncoderUNetModel,\n    'segmentation': UNetModel\n}\n\n\ndef disabled_train(self, mode=True):\n    \"\"\"Overwrite model.train with this function to make sure train/eval mode\n    does not change anymore.\"\"\"\n    return self\n\n\nclass NoisyLatentImageClassifier(pl.LightningModule):\n\n    def __init__(self,\n                 diffusion_path,\n                 num_classes,\n                 ckpt_path=None,\n                 pool='attention',\n                 label_key=None,\n                 diffusion_ckpt_path=None,\n                 scheduler_config=None,\n                 weight_decay=1.e-2,\n                 log_steps=10,\n                 monitor='val/loss',\n                 *args,\n                 **kwargs):\n        super().__init__(*args, **kwargs)\n        self.num_classes = num_classes\n        # get latest config of diffusion model\n        diffusion_config = natsorted(glob(os.path.join(diffusion_path, 'configs', '*-project.yaml')))[-1]\n        self.diffusion_config = OmegaConf.load(diffusion_config).model\n        self.diffusion_config.params.ckpt_path = diffusion_ckpt_path\n        self.load_diffusion()\n\n        self.monitor = monitor\n        self.numd = self.diffusion_model.first_stage_model.encoder.num_resolutions - 1\n        self.log_time_interval = self.diffusion_model.num_timesteps // log_steps\n        self.log_steps = log_steps\n\n        self.label_key = label_key if not hasattr(self.diffusion_model, 'cond_stage_key') \\\n            else self.diffusion_model.cond_stage_key\n\n        assert self.label_key is not None, 'label_key neither in diffusion model nor in model.params'\n\n        if self.label_key not in __models__:\n            raise NotImplementedError()\n\n        self.load_classifier(ckpt_path, pool)\n\n        self.scheduler_config = scheduler_config\n        self.use_scheduler = self.scheduler_config is not None\n        self.weight_decay = weight_decay\n\n    def init_from_ckpt(self, path, ignore_keys=list(), only_model=False):\n        sd = torch.load(path, map_location=\"cpu\")\n        if \"state_dict\" in list(sd.keys()):\n            sd = sd[\"state_dict\"]\n        keys = list(sd.keys())\n        for k in keys:\n            for ik in ignore_keys:\n                if k.startswith(ik):\n                    print(\"Deleting key {} from state_dict.\".format(k))\n                    del sd[k]\n        missing, unexpected = self.load_state_dict(sd, strict=False) if not only_model else self.model.load_state_dict(\n            sd, strict=False)\n        print(f\"Restored from {path} with {len(missing)} missing and {len(unexpected)} unexpected keys\")\n        if len(missing) > 0:\n            print(f\"Missing Keys: {missing}\")\n        if len(unexpected) > 0:\n            print(f\"Unexpected Keys: {unexpected}\")\n\n    def load_diffusion(self):\n        model = instantiate_from_config(self.diffusion_config)\n        self.diffusion_model = model.eval()\n        self.diffusion_model.train = disabled_train\n        for param in self.diffusion_model.parameters():\n            param.requires_grad = False\n\n    def load_classifier(self, ckpt_path, pool):\n        model_config = deepcopy(self.diffusion_config.params.unet_config.params)\n        model_config.in_channels = self.diffusion_config.params.unet_config.params.out_channels\n        model_config.out_channels = self.num_classes\n        if self.label_key == 'class_label':\n            model_config.pool = pool\n\n        self.model = __models__[self.label_key](**model_config)\n        if ckpt_path is not None:\n            print('#####################################################################')\n            print(f'load from ckpt \"{ckpt_path}\"')\n            print('#####################################################################')\n            self.init_from_ckpt(ckpt_path)\n\n    @torch.no_grad()\n    def get_x_noisy(self, x, t, noise=None):\n        noise = default(noise, lambda: torch.randn_like(x))\n        continuous_sqrt_alpha_cumprod = None\n        if self.diffusion_model.use_continuous_noise:\n            continuous_sqrt_alpha_cumprod = self.diffusion_model.sample_continuous_noise_level(x.shape[0], t + 1)\n            # todo: make sure t+1 is correct here\n\n        return self.diffusion_model.q_sample(x_start=x, t=t, noise=noise,\n                                             continuous_sqrt_alpha_cumprod=continuous_sqrt_alpha_cumprod)\n\n    def forward(self, x_noisy, t, *args, **kwargs):\n        return self.model(x_noisy, t)\n\n    @torch.no_grad()\n    def get_input(self, batch, k):\n        x = batch[k]\n        if len(x.shape) == 3:\n            x = x[..., None]\n        x = rearrange(x, 'b h w c -> b c h w')\n        x = x.to(memory_format=torch.contiguous_format).float()\n        return x\n\n    @torch.no_grad()\n    def get_conditioning(self, batch, k=None):\n        if k is None:\n            k = self.label_key\n        assert k is not None, 'Needs to provide label key'\n\n        targets = batch[k].to(self.device)\n\n        if self.label_key == 'segmentation':\n            targets = rearrange(targets, 'b h w c -> b c h w')\n            for down in range(self.numd):\n                h, w = targets.shape[-2:]\n                targets = F.interpolate(targets, size=(h // 2, w // 2), mode='nearest')\n\n            # targets = rearrange(targets,'b c h w -> b h w c')\n\n        return targets\n\n    def compute_top_k(self, logits, labels, k, reduction=\"mean\"):\n        _, top_ks = torch.topk(logits, k, dim=1)\n        if reduction == \"mean\":\n            return (top_ks == labels[:, None]).float().sum(dim=-1).mean().item()\n        elif reduction == \"none\":\n            return (top_ks == labels[:, None]).float().sum(dim=-1)\n\n    def on_train_epoch_start(self):\n        # save some memory\n        self.diffusion_model.model.to('cpu')\n\n    @torch.no_grad()\n    def write_logs(self, loss, logits, targets):\n        log_prefix = 'train' if self.training else 'val'\n        log = {}\n        log[f\"{log_prefix}/loss\"] = loss.mean()\n        log[f\"{log_prefix}/acc@1\"] = self.compute_top_k(\n            logits, targets, k=1, reduction=\"mean\"\n        )\n        log[f\"{log_prefix}/acc@5\"] = self.compute_top_k(\n            logits, targets, k=5, reduction=\"mean\"\n        )\n\n        self.log_dict(log, prog_bar=False, logger=True, on_step=self.training, on_epoch=True)\n        self.log('loss', log[f\"{log_prefix}/loss\"], prog_bar=True, logger=False)\n        self.log('global_step', self.global_step, logger=False, on_epoch=False, prog_bar=True)\n        lr = self.optimizers().param_groups[0]['lr']\n        self.log('lr_abs', lr, on_step=True, logger=True, on_epoch=False, prog_bar=True)\n\n    def shared_step(self, batch, t=None):\n        x, *_ = self.diffusion_model.get_input(batch, k=self.diffusion_model.first_stage_key)\n        targets = self.get_conditioning(batch)\n        if targets.dim() == 4:\n            targets = targets.argmax(dim=1)\n        if t is None:\n            t = torch.randint(0, self.diffusion_model.num_timesteps, (x.shape[0],), device=self.device).long()\n        else:\n            t = torch.full(size=(x.shape[0],), fill_value=t, device=self.device).long()\n        x_noisy = self.get_x_noisy(x, t)\n        logits = self(x_noisy, t)\n\n        loss = F.cross_entropy(logits, targets, reduction='none')\n\n        self.write_logs(loss.detach(), logits.detach(), targets.detach())\n\n        loss = loss.mean()\n        return loss, logits, x_noisy, targets\n\n    def training_step(self, batch, batch_idx):\n        loss, *_ = self.shared_step(batch)\n        return loss\n\n    def reset_noise_accs(self):\n        self.noisy_acc = {t: {'acc@1': [], 'acc@5': []} for t in\n                          range(0, self.diffusion_model.num_timesteps, self.diffusion_model.log_every_t)}\n\n    def on_validation_start(self):\n        self.reset_noise_accs()\n\n    @torch.no_grad()\n    def validation_step(self, batch, batch_idx):\n        loss, *_ = self.shared_step(batch)\n\n        for t in self.noisy_acc:\n            _, logits, _, targets = self.shared_step(batch, t)\n            self.noisy_acc[t]['acc@1'].append(self.compute_top_k(logits, targets, k=1, reduction='mean'))\n            self.noisy_acc[t]['acc@5'].append(self.compute_top_k(logits, targets, k=5, reduction='mean'))\n\n        return loss\n\n    def configure_optimizers(self):\n        optimizer = AdamW(self.model.parameters(), lr=self.learning_rate, weight_decay=self.weight_decay)\n\n        if self.use_scheduler:\n            scheduler = instantiate_from_config(self.scheduler_config)\n\n            print(\"Setting up LambdaLR scheduler...\")\n            scheduler = [\n                {\n                    'scheduler': LambdaLR(optimizer, lr_lambda=scheduler.schedule),\n                    'interval': 'step',\n                    'frequency': 1\n                }]\n            return [optimizer], scheduler\n\n        return optimizer\n\n    @torch.no_grad()\n    def log_images(self, batch, N=8, *args, **kwargs):\n        log = dict()\n        x = self.get_input(batch, self.diffusion_model.first_stage_key)\n        log['inputs'] = x\n\n        y = self.get_conditioning(batch)\n\n        if self.label_key == 'class_label':\n            y = log_txt_as_img((x.shape[2], x.shape[3]), batch[\"human_label\"])\n            log['labels'] = y\n\n        if ismap(y):\n            log['labels'] = self.diffusion_model.to_rgb(y)\n\n            for step in range(self.log_steps):\n                current_time = step * self.log_time_interval\n\n                _, logits, x_noisy, _ = self.shared_step(batch, t=current_time)\n\n                log[f'inputs@t{current_time}'] = x_noisy\n\n                pred = F.one_hot(logits.argmax(dim=1), num_classes=self.num_classes)\n                pred = rearrange(pred, 'b h w c -> b c h w')\n\n                log[f'pred@t{current_time}'] = self.diffusion_model.to_rgb(pred)\n\n        for key in log:\n            log[key] = log[key][:N]\n\n        return log\n"
  },
  {
    "path": "stable-dreamfusion/ldm/models/diffusion/ddim.py",
    "content": "\"\"\"SAMPLING ONLY.\"\"\"\n\nimport torch\nimport numpy as np\nfrom tqdm import tqdm\nfrom functools import partial\nfrom einops import rearrange\n\nfrom ldm.modules.diffusionmodules.util import make_ddim_sampling_parameters, make_ddim_timesteps, noise_like, extract_into_tensor\nfrom ldm.models.diffusion.sampling_util import renorm_thresholding, norm_thresholding, spatial_norm_thresholding\n\n\nclass DDIMSampler(object):\n    def __init__(self, model, schedule=\"linear\", **kwargs):\n        super().__init__()\n        self.model = model\n        self.ddpm_num_timesteps = model.num_timesteps\n        self.schedule = schedule\n\n    def to(self, device):\n        \"\"\"Same as to in torch module\n        Don't really underestand why this isn't a module in the first place\"\"\"\n        for k, v in self.__dict__.items():\n            if isinstance(v, torch.Tensor):\n                new_v = getattr(self, k).to(device)\n                setattr(self, k, new_v)\n\n\n    def register_buffer(self, name, attr):\n        if type(attr) == torch.Tensor:\n            if attr.device != torch.device(\"cuda\"):\n                attr = attr.to(torch.device(\"cuda\"))\n        setattr(self, name, attr)\n\n    def make_schedule(self, ddim_num_steps, ddim_discretize=\"uniform\", ddim_eta=0., verbose=True):\n        self.ddim_timesteps = make_ddim_timesteps(ddim_discr_method=ddim_discretize, num_ddim_timesteps=ddim_num_steps,\n                                                  num_ddpm_timesteps=self.ddpm_num_timesteps,verbose=verbose)\n        alphas_cumprod = self.model.alphas_cumprod\n        assert alphas_cumprod.shape[0] == self.ddpm_num_timesteps, 'alphas have to be defined for each timestep'\n        to_torch = lambda x: x.clone().detach().to(torch.float32).to(self.model.device)\n\n        self.register_buffer('betas', to_torch(self.model.betas))\n        self.register_buffer('alphas_cumprod', to_torch(alphas_cumprod))\n        self.register_buffer('alphas_cumprod_prev', to_torch(self.model.alphas_cumprod_prev))\n\n        # calculations for diffusion q(x_t | x_{t-1}) and others\n        self.register_buffer('sqrt_alphas_cumprod', to_torch(np.sqrt(alphas_cumprod.cpu())))\n        self.register_buffer('sqrt_one_minus_alphas_cumprod', to_torch(np.sqrt(1. - alphas_cumprod.cpu())))\n        self.register_buffer('log_one_minus_alphas_cumprod', to_torch(np.log(1. - alphas_cumprod.cpu())))\n        self.register_buffer('sqrt_recip_alphas_cumprod', to_torch(np.sqrt(1. / alphas_cumprod.cpu())))\n        self.register_buffer('sqrt_recipm1_alphas_cumprod', to_torch(np.sqrt(1. / alphas_cumprod.cpu() - 1)))\n\n        # ddim sampling parameters\n        ddim_sigmas, ddim_alphas, ddim_alphas_prev = make_ddim_sampling_parameters(alphacums=alphas_cumprod.cpu(),\n                                                                                   ddim_timesteps=self.ddim_timesteps,\n                                                                                   eta=ddim_eta,verbose=verbose)\n        self.register_buffer('ddim_sigmas', ddim_sigmas)\n        self.register_buffer('ddim_alphas', ddim_alphas)\n        self.register_buffer('ddim_alphas_prev', ddim_alphas_prev)\n        self.register_buffer('ddim_sqrt_one_minus_alphas', np.sqrt(1. - ddim_alphas))\n        sigmas_for_original_sampling_steps = ddim_eta * torch.sqrt(\n            (1 - self.alphas_cumprod_prev) / (1 - self.alphas_cumprod) * (\n                        1 - self.alphas_cumprod / self.alphas_cumprod_prev))\n        self.register_buffer('ddim_sigmas_for_original_num_steps', sigmas_for_original_sampling_steps)\n\n    @torch.no_grad()\n    def sample(self,\n               S,\n               batch_size,\n               shape,\n               conditioning=None,\n               callback=None,\n               normals_sequence=None,\n               img_callback=None,\n               quantize_x0=False,\n               eta=0.,\n               mask=None,\n               x0=None,\n               temperature=1.,\n               noise_dropout=0.,\n               score_corrector=None,\n               corrector_kwargs=None,\n               verbose=True,\n               x_T=None,\n               log_every_t=100,\n               unconditional_guidance_scale=1.,\n               unconditional_conditioning=None, # this has to come in the same format as the conditioning, # e.g. as encoded tokens, ...\n               dynamic_threshold=None,\n               **kwargs\n               ):\n        if conditioning is not None:\n            if isinstance(conditioning, dict):\n                ctmp = conditioning[list(conditioning.keys())[0]]\n                while isinstance(ctmp, list): ctmp = ctmp[0]\n                cbs = ctmp.shape[0]\n                if cbs != batch_size:\n                    print(f\"Warning: Got {cbs} conditionings but batch-size is {batch_size}\")\n\n            else:\n                if conditioning.shape[0] != batch_size:\n                    print(f\"Warning: Got {conditioning.shape[0]} conditionings but batch-size is {batch_size}\")\n\n        self.make_schedule(ddim_num_steps=S, ddim_eta=eta, verbose=verbose)\n        # sampling\n        C, H, W = shape\n        size = (batch_size, C, H, W)\n        # print(f'Data shape for DDIM sampling is {size}, eta {eta}')\n\n        samples, intermediates = self.ddim_sampling(conditioning, size,\n                                                    callback=callback,\n                                                    img_callback=img_callback,\n                                                    quantize_denoised=quantize_x0,\n                                                    mask=mask, x0=x0,\n                                                    ddim_use_original_steps=False,\n                                                    noise_dropout=noise_dropout,\n                                                    temperature=temperature,\n                                                    score_corrector=score_corrector,\n                                                    corrector_kwargs=corrector_kwargs,\n                                                    x_T=x_T,\n                                                    log_every_t=log_every_t,\n                                                    unconditional_guidance_scale=unconditional_guidance_scale,\n                                                    unconditional_conditioning=unconditional_conditioning,\n                                                    dynamic_threshold=dynamic_threshold,\n                                                    )\n        return samples, intermediates\n\n    @torch.no_grad()\n    def ddim_sampling(self, cond, shape,\n                      x_T=None, ddim_use_original_steps=False,\n                      callback=None, timesteps=None, quantize_denoised=False,\n                      mask=None, x0=None, img_callback=None, log_every_t=100,\n                      temperature=1., noise_dropout=0., score_corrector=None, corrector_kwargs=None,\n                      unconditional_guidance_scale=1., unconditional_conditioning=None, dynamic_threshold=None,\n                      t_start=-1):\n        device = self.model.betas.device\n        b = shape[0]\n        if x_T is None:\n            img = torch.randn(shape, device=device)\n        else:\n            img = x_T\n\n        if timesteps is None:\n            timesteps = self.ddpm_num_timesteps if ddim_use_original_steps else self.ddim_timesteps\n        elif timesteps is not None and not ddim_use_original_steps:\n            subset_end = int(min(timesteps / self.ddim_timesteps.shape[0], 1) * self.ddim_timesteps.shape[0]) - 1\n            timesteps = self.ddim_timesteps[:subset_end]\n\n        timesteps = timesteps[:t_start]\n\n        intermediates = {'x_inter': [img], 'pred_x0': [img]}\n        time_range = reversed(range(0,timesteps)) if ddim_use_original_steps else np.flip(timesteps)\n        total_steps = timesteps if ddim_use_original_steps else timesteps.shape[0]\n        # print(f\"Running DDIM Sampling with {total_steps} timesteps\")\n\n        iterator = tqdm(time_range, desc='DDIM Sampler', total=total_steps)\n\n        for i, step in enumerate(iterator):\n            index = total_steps - i - 1\n            ts = torch.full((b,), step, device=device, dtype=torch.long)\n\n            if mask is not None:\n                assert x0 is not None\n                img_orig = self.model.q_sample(x0, ts)  # TODO: deterministic forward pass?\n                img = img_orig * mask + (1. - mask) * img\n\n            outs = self.p_sample_ddim(img, cond, ts, index=index, use_original_steps=ddim_use_original_steps,\n                                      quantize_denoised=quantize_denoised, temperature=temperature,\n                                      noise_dropout=noise_dropout, score_corrector=score_corrector,\n                                      corrector_kwargs=corrector_kwargs,\n                                      unconditional_guidance_scale=unconditional_guidance_scale,\n                                      unconditional_conditioning=unconditional_conditioning,\n                                      dynamic_threshold=dynamic_threshold)\n            img, pred_x0 = outs\n            if callback:\n                img = callback(i, img, pred_x0)\n            if img_callback: \n                img_callback(pred_x0, i)\n\n            if index % log_every_t == 0 or index == total_steps - 1:\n                intermediates['x_inter'].append(img)\n                intermediates['pred_x0'].append(pred_x0)\n\n        return img, intermediates\n\n    @torch.no_grad()\n    def p_sample_ddim(self, x, c, t, index, repeat_noise=False, use_original_steps=False, quantize_denoised=False,\n                      temperature=1., noise_dropout=0., score_corrector=None, corrector_kwargs=None,\n                      unconditional_guidance_scale=1., unconditional_conditioning=None,\n                      dynamic_threshold=None):\n        b, *_, device = *x.shape, x.device\n\n        if unconditional_conditioning is None or unconditional_guidance_scale == 1.:\n            e_t = self.model.apply_model(x, t, c)\n        else:\n            x_in = torch.cat([x] * 2)\n            t_in = torch.cat([t] * 2)\n            if isinstance(c, dict):\n                assert isinstance(unconditional_conditioning, dict)\n                c_in = dict()\n                for k in c:\n                    if isinstance(c[k], list):\n                        c_in[k] = [torch.cat([\n                            unconditional_conditioning[k][i],\n                            c[k][i]]) for i in range(len(c[k]))]\n                    else:\n                        c_in[k] = torch.cat([\n                                unconditional_conditioning[k],\n                                c[k]])\n            else:\n                c_in = torch.cat([unconditional_conditioning, c])\n            e_t_uncond, e_t = self.model.apply_model(x_in, t_in, c_in).chunk(2)\n            e_t = e_t_uncond + unconditional_guidance_scale * (e_t - e_t_uncond)\n\n        if score_corrector is not None:\n            assert self.model.parameterization == \"eps\"\n            e_t = score_corrector.modify_score(self.model, e_t, x, t, c, **corrector_kwargs)\n\n        alphas = self.model.alphas_cumprod if use_original_steps else self.ddim_alphas\n        alphas_prev = self.model.alphas_cumprod_prev if use_original_steps else self.ddim_alphas_prev\n        sqrt_one_minus_alphas = self.model.sqrt_one_minus_alphas_cumprod if use_original_steps else self.ddim_sqrt_one_minus_alphas\n        sigmas = self.model.ddim_sigmas_for_original_num_steps if use_original_steps else self.ddim_sigmas\n        # select parameters corresponding to the currently considered timestep\n        a_t = torch.full((b, 1, 1, 1), alphas[index], device=device)\n        a_prev = torch.full((b, 1, 1, 1), alphas_prev[index], device=device)\n        sigma_t = torch.full((b, 1, 1, 1), sigmas[index], device=device)\n        sqrt_one_minus_at = torch.full((b, 1, 1, 1), sqrt_one_minus_alphas[index],device=device)\n\n        # current prediction for x_0\n        pred_x0 = (x - sqrt_one_minus_at * e_t) / a_t.sqrt()\n\n        print(t, sqrt_one_minus_at, a_t)\n\n        if quantize_denoised:\n            pred_x0, _, *_ = self.model.first_stage_model.quantize(pred_x0)\n\n        if dynamic_threshold is not None:\n            pred_x0 = norm_thresholding(pred_x0, dynamic_threshold)\n\n        # direction pointing to x_t\n        dir_xt = (1. - a_prev - sigma_t**2).sqrt() * e_t\n        noise = sigma_t * noise_like(x.shape, device, repeat_noise) * temperature\n        if noise_dropout > 0.:\n            noise = torch.nn.functional.dropout(noise, p=noise_dropout)\n        x_prev = a_prev.sqrt() * pred_x0 + dir_xt + noise\n        return x_prev, pred_x0\n\n    @torch.no_grad()\n    def encode(self, x0, c, t_enc, use_original_steps=False, return_intermediates=None,\n               unconditional_guidance_scale=1.0, unconditional_conditioning=None):\n        num_reference_steps = self.ddpm_num_timesteps if use_original_steps else self.ddim_timesteps.shape[0]\n\n        assert t_enc <= num_reference_steps\n        num_steps = t_enc\n\n        if use_original_steps:\n            alphas_next = self.alphas_cumprod[:num_steps]\n            alphas = self.alphas_cumprod_prev[:num_steps]\n        else:\n            alphas_next = self.ddim_alphas[:num_steps]\n            alphas = torch.tensor(self.ddim_alphas_prev[:num_steps])\n\n        x_next = x0\n        intermediates = []\n        inter_steps = []\n        for i in tqdm(range(num_steps), desc='Encoding Image'):\n            t = torch.full((x0.shape[0],), i, device=self.model.device, dtype=torch.long)\n            if unconditional_guidance_scale == 1.:\n                noise_pred = self.model.apply_model(x_next, t, c)\n            else:\n                assert unconditional_conditioning is not None\n                e_t_uncond, noise_pred = torch.chunk(\n                    self.model.apply_model(torch.cat((x_next, x_next)), torch.cat((t, t)),\n                                           torch.cat((unconditional_conditioning, c))), 2)\n                noise_pred = e_t_uncond + unconditional_guidance_scale * (noise_pred - e_t_uncond)\n\n            xt_weighted = (alphas_next[i] / alphas[i]).sqrt() * x_next\n            weighted_noise_pred = alphas_next[i].sqrt() * (\n                    (1 / alphas_next[i] - 1).sqrt() - (1 / alphas[i] - 1).sqrt()) * noise_pred\n            x_next = xt_weighted + weighted_noise_pred\n            if return_intermediates and i % (\n                    num_steps // return_intermediates) == 0 and i < num_steps - 1:\n                intermediates.append(x_next)\n                inter_steps.append(i)\n            elif return_intermediates and i >= num_steps - 2:\n                intermediates.append(x_next)\n                inter_steps.append(i)\n\n        out = {'x_encoded': x_next, 'intermediate_steps': inter_steps}\n        if return_intermediates:\n            out.update({'intermediates': intermediates})\n        return x_next, out\n\n    @torch.no_grad()\n    def stochastic_encode(self, x0, t, use_original_steps=False, noise=None):\n        # fast, but does not allow for exact reconstruction\n        # t serves as an index to gather the correct alphas\n        if use_original_steps:\n            sqrt_alphas_cumprod = self.sqrt_alphas_cumprod\n            sqrt_one_minus_alphas_cumprod = self.sqrt_one_minus_alphas_cumprod\n        else:\n            sqrt_alphas_cumprod = torch.sqrt(self.ddim_alphas)\n            sqrt_one_minus_alphas_cumprod = self.ddim_sqrt_one_minus_alphas\n\n        if noise is None:\n            noise = torch.randn_like(x0)\n        return (extract_into_tensor(sqrt_alphas_cumprod, t, x0.shape) * x0 +\n                extract_into_tensor(sqrt_one_minus_alphas_cumprod, t, x0.shape) * noise)\n\n    @torch.no_grad()\n    def decode(self, x_latent, cond, t_start, unconditional_guidance_scale=1.0, unconditional_conditioning=None,\n               use_original_steps=False):\n\n        timesteps = np.arange(self.ddpm_num_timesteps) if use_original_steps else self.ddim_timesteps\n        timesteps = timesteps[:t_start]\n\n        time_range = np.flip(timesteps)\n        total_steps = timesteps.shape[0]\n        # print(f\"Running DDIM Sampling with {total_steps} timesteps\")\n\n        iterator = tqdm(time_range, desc='Decoding image', total=total_steps)\n        x_dec = x_latent\n        for i, step in enumerate(iterator):\n            index = total_steps - i - 1\n            ts = torch.full((x_latent.shape[0],), step, device=x_latent.device, dtype=torch.long)\n            x_dec, _ = self.p_sample_ddim(x_dec, cond, ts, index=index, use_original_steps=use_original_steps,\n                                          unconditional_guidance_scale=unconditional_guidance_scale,\n                                          unconditional_conditioning=unconditional_conditioning)\n        return x_dec"
  },
  {
    "path": "stable-dreamfusion/ldm/models/diffusion/ddpm.py",
    "content": "\"\"\"\nwild mixture of\nhttps://github.com/lucidrains/denoising-diffusion-pytorch/blob/7706bdfc6f527f58d33f84b7b522e61e6e3164b3/denoising_diffusion_pytorch/denoising_diffusion_pytorch.py\nhttps://github.com/openai/improved-diffusion/blob/e94489283bb876ac1477d5dd7709bbbd2d9902ce/improved_diffusion/gaussian_diffusion.py\nhttps://github.com/CompVis/taming-transformers\n-- merci\n\"\"\"\n\nimport torch\nimport torch.nn as nn\nimport numpy as np\nimport pytorch_lightning as pl\nfrom torch.optim.lr_scheduler import LambdaLR\nfrom einops import rearrange, repeat\nfrom contextlib import contextmanager, nullcontext\nfrom functools import partial\nimport itertools\nfrom tqdm import tqdm\nfrom torchvision.utils import make_grid\nfrom pytorch_lightning.utilities.rank_zero import rank_zero_only \nfrom omegaconf import ListConfig\n\nfrom ldm.util import log_txt_as_img, exists, default, ismap, isimage, mean_flat, count_params, instantiate_from_config\nfrom ldm.modules.ema import LitEma\nfrom ldm.modules.distributions.distributions import normal_kl, DiagonalGaussianDistribution\nfrom ldm.models.autoencoder import VQModelInterface, IdentityFirstStage, AutoencoderKL\nfrom ldm.modules.diffusionmodules.util import make_beta_schedule, extract_into_tensor, noise_like\nfrom ldm.models.diffusion.ddim import DDIMSampler\nfrom ldm.modules.attention import CrossAttention\n\n\n__conditioning_keys__ = {'concat': 'c_concat',\n                         'crossattn': 'c_crossattn',\n                         'adm': 'y'}\n\n\ndef disabled_train(self, mode=True):\n    \"\"\"Overwrite model.train with this function to make sure train/eval mode\n    does not change anymore.\"\"\"\n    return self\n\n\ndef uniform_on_device(r1, r2, shape, device):\n    return (r1 - r2) * torch.rand(*shape, device=device) + r2\n\n\nclass DDPM(pl.LightningModule):\n    # classic DDPM with Gaussian diffusion, in image space\n    def __init__(self,\n                 unet_config,\n                 timesteps=1000,\n                 beta_schedule=\"linear\",\n                 loss_type=\"l2\",\n                 ckpt_path=None,\n                 ignore_keys=[],\n                 load_only_unet=False,\n                 monitor=\"val/loss\",\n                 use_ema=True,\n                 first_stage_key=\"image\",\n                 image_size=256,\n                 channels=3,\n                 log_every_t=100,\n                 clip_denoised=True,\n                 linear_start=1e-4,\n                 linear_end=2e-2,\n                 cosine_s=8e-3,\n                 given_betas=None,\n                 original_elbo_weight=0.,\n                 v_posterior=0.,  # weight for choosing posterior variance as sigma = (1-v) * beta_tilde + v * beta\n                 l_simple_weight=1.,\n                 conditioning_key=None,\n                 parameterization=\"eps\",  # all assuming fixed variance schedules\n                 scheduler_config=None,\n                 use_positional_encodings=False,\n                 learn_logvar=False,\n                 logvar_init=0.,\n                 make_it_fit=False,\n                 ucg_training=None,\n                 ):\n        super().__init__()\n        assert parameterization in [\"eps\", \"x0\"], 'currently only supporting \"eps\" and \"x0\"'\n        self.parameterization = parameterization\n        print(f\"{self.__class__.__name__}: Running in {self.parameterization}-prediction mode\")\n        self.cond_stage_model = None\n        self.clip_denoised = clip_denoised\n        self.log_every_t = log_every_t\n        self.first_stage_key = first_stage_key\n        self.image_size = image_size  # try conv?\n        self.channels = channels\n        self.use_positional_encodings = use_positional_encodings\n        self.model = DiffusionWrapper(unet_config, conditioning_key)\n        count_params(self.model, verbose=True)\n        self.use_ema = use_ema\n        if self.use_ema:\n            self.model_ema = LitEma(self.model)\n            print(f\"Keeping EMAs of {len(list(self.model_ema.buffers()))}.\")\n\n        self.use_scheduler = scheduler_config is not None\n        if self.use_scheduler:\n            self.scheduler_config = scheduler_config\n\n        self.v_posterior = v_posterior\n        self.original_elbo_weight = original_elbo_weight\n        self.l_simple_weight = l_simple_weight\n\n        if monitor is not None:\n            self.monitor = monitor\n        self.make_it_fit = make_it_fit\n        if ckpt_path is not None:\n            self.init_from_ckpt(ckpt_path, ignore_keys=ignore_keys, only_model=load_only_unet)\n\n        self.register_schedule(given_betas=given_betas, beta_schedule=beta_schedule, timesteps=timesteps,\n                               linear_start=linear_start, linear_end=linear_end, cosine_s=cosine_s)\n\n        self.loss_type = loss_type\n\n        self.learn_logvar = learn_logvar\n        self.logvar = torch.full(fill_value=logvar_init, size=(self.num_timesteps,))\n        if self.learn_logvar:\n            self.logvar = nn.Parameter(self.logvar, requires_grad=True)\n\n        self.ucg_training = ucg_training or dict()\n        if self.ucg_training:\n            self.ucg_prng = np.random.RandomState()\n\n    def register_schedule(self, given_betas=None, beta_schedule=\"linear\", timesteps=1000,\n                          linear_start=1e-4, linear_end=2e-2, cosine_s=8e-3):\n        if exists(given_betas):\n            betas = given_betas\n        else:\n            betas = make_beta_schedule(beta_schedule, timesteps, linear_start=linear_start, linear_end=linear_end,\n                                       cosine_s=cosine_s)\n        alphas = 1. - betas\n        alphas_cumprod = np.cumprod(alphas, axis=0)\n        alphas_cumprod_prev = np.append(1., alphas_cumprod[:-1])\n\n        timesteps, = betas.shape\n        self.num_timesteps = int(timesteps)\n        self.linear_start = linear_start\n        self.linear_end = linear_end\n        assert alphas_cumprod.shape[0] == self.num_timesteps, 'alphas have to be defined for each timestep'\n\n        to_torch = partial(torch.tensor, dtype=torch.float32)\n\n        self.register_buffer('betas', to_torch(betas))\n        self.register_buffer('alphas_cumprod', to_torch(alphas_cumprod))\n        self.register_buffer('alphas_cumprod_prev', to_torch(alphas_cumprod_prev))\n\n        # calculations for diffusion q(x_t | x_{t-1}) and others\n        self.register_buffer('sqrt_alphas_cumprod', to_torch(np.sqrt(alphas_cumprod)))\n        self.register_buffer('sqrt_one_minus_alphas_cumprod', to_torch(np.sqrt(1. - alphas_cumprod)))\n        self.register_buffer('log_one_minus_alphas_cumprod', to_torch(np.log(1. - alphas_cumprod)))\n        self.register_buffer('sqrt_recip_alphas_cumprod', to_torch(np.sqrt(1. / alphas_cumprod)))\n        self.register_buffer('sqrt_recipm1_alphas_cumprod', to_torch(np.sqrt(1. / alphas_cumprod - 1)))\n\n        # calculations for posterior q(x_{t-1} | x_t, x_0)\n        posterior_variance = (1 - self.v_posterior) * betas * (1. - alphas_cumprod_prev) / (\n                    1. - alphas_cumprod) + self.v_posterior * betas\n        # above: equal to 1. / (1. / (1. - alpha_cumprod_tm1) + alpha_t / beta_t)\n        self.register_buffer('posterior_variance', to_torch(posterior_variance))\n        # below: log calculation clipped because the posterior variance is 0 at the beginning of the diffusion chain\n        self.register_buffer('posterior_log_variance_clipped', to_torch(np.log(np.maximum(posterior_variance, 1e-20))))\n        self.register_buffer('posterior_mean_coef1', to_torch(\n            betas * np.sqrt(alphas_cumprod_prev) / (1. - alphas_cumprod)))\n        self.register_buffer('posterior_mean_coef2', to_torch(\n            (1. - alphas_cumprod_prev) * np.sqrt(alphas) / (1. - alphas_cumprod)))\n\n        if self.parameterization == \"eps\":\n            lvlb_weights = self.betas ** 2 / (\n                        2 * self.posterior_variance * to_torch(alphas) * (1 - self.alphas_cumprod))\n        elif self.parameterization == \"x0\":\n            lvlb_weights = 0.5 * np.sqrt(torch.Tensor(alphas_cumprod)) / (2. * 1 - torch.Tensor(alphas_cumprod))\n        else:\n            raise NotImplementedError(\"mu not supported\")\n        # TODO how to choose this term\n        lvlb_weights[0] = lvlb_weights[1]\n        self.register_buffer('lvlb_weights', lvlb_weights, persistent=False)\n        assert not torch.isnan(self.lvlb_weights).all()\n\n    @contextmanager\n    def ema_scope(self, context=None):\n        if self.use_ema:\n            self.model_ema.store(self.model.parameters())\n            self.model_ema.copy_to(self.model)\n            if context is not None:\n                print(f\"{context}: Switched to EMA weights\")\n        try:\n            yield None\n        finally:\n            if self.use_ema:\n                self.model_ema.restore(self.model.parameters())\n                if context is not None:\n                    print(f\"{context}: Restored training weights\")\n\n    @torch.no_grad()\n    def init_from_ckpt(self, path, ignore_keys=list(), only_model=False):\n        sd = torch.load(path, map_location=\"cpu\")\n        if \"state_dict\" in list(sd.keys()):\n            sd = sd[\"state_dict\"]\n        keys = list(sd.keys())\n\n        if self.make_it_fit:\n            n_params = len([name for name, _ in\n                            itertools.chain(self.named_parameters(),\n                                            self.named_buffers())])\n            for name, param in tqdm(\n                    itertools.chain(self.named_parameters(),\n                                    self.named_buffers()),\n                    desc=\"Fitting old weights to new weights\",\n                    total=n_params\n            ):\n                if not name in sd:\n                    continue\n                old_shape = sd[name].shape\n                new_shape = param.shape\n                assert len(old_shape)==len(new_shape)\n                if len(new_shape) > 2:\n                    # we only modify first two axes\n                    assert new_shape[2:] == old_shape[2:]\n                # assumes first axis corresponds to output dim\n                if not new_shape == old_shape:\n                    new_param = param.clone()\n                    old_param = sd[name]\n                    if len(new_shape) == 1:\n                        for i in range(new_param.shape[0]):\n                            new_param[i] = old_param[i % old_shape[0]]\n                    elif len(new_shape) >= 2:\n                        for i in range(new_param.shape[0]):\n                            for j in range(new_param.shape[1]):\n                                new_param[i, j] = old_param[i % old_shape[0], j % old_shape[1]]\n\n                        n_used_old = torch.ones(old_shape[1])\n                        for j in range(new_param.shape[1]):\n                            n_used_old[j % old_shape[1]] += 1\n                        n_used_new = torch.zeros(new_shape[1])\n                        for j in range(new_param.shape[1]):\n                            n_used_new[j] = n_used_old[j % old_shape[1]]\n\n                        n_used_new = n_used_new[None, :]\n                        while len(n_used_new.shape) < len(new_shape):\n                            n_used_new = n_used_new.unsqueeze(-1)\n                        new_param /= n_used_new\n\n                    sd[name] = new_param\n\n        missing, unexpected = self.load_state_dict(sd, strict=False) if not only_model else self.model.load_state_dict(\n            sd, strict=False)\n        print(f\"Restored from {path} with {len(missing)} missing and {len(unexpected)} unexpected keys\")\n        if len(missing) > 0:\n            print(f\"Missing Keys: {missing}\")\n        if len(unexpected) > 0:\n            print(f\"Unexpected Keys: {unexpected}\")\n\n    def q_mean_variance(self, x_start, t):\n        \"\"\"\n        Get the distribution q(x_t | x_0).\n        :param x_start: the [N x C x ...] tensor of noiseless inputs.\n        :param t: the number of diffusion steps (minus 1). Here, 0 means one step.\n        :return: A tuple (mean, variance, log_variance), all of x_start's shape.\n        \"\"\"\n        mean = (extract_into_tensor(self.sqrt_alphas_cumprod, t, x_start.shape) * x_start)\n        variance = extract_into_tensor(1.0 - self.alphas_cumprod, t, x_start.shape)\n        log_variance = extract_into_tensor(self.log_one_minus_alphas_cumprod, t, x_start.shape)\n        return mean, variance, log_variance\n\n    def predict_start_from_noise(self, x_t, t, noise):\n        return (\n                extract_into_tensor(self.sqrt_recip_alphas_cumprod, t, x_t.shape) * x_t -\n                extract_into_tensor(self.sqrt_recipm1_alphas_cumprod, t, x_t.shape) * noise\n        )\n\n    def q_posterior(self, x_start, x_t, t):\n        posterior_mean = (\n                extract_into_tensor(self.posterior_mean_coef1, t, x_t.shape) * x_start +\n                extract_into_tensor(self.posterior_mean_coef2, t, x_t.shape) * x_t\n        )\n        posterior_variance = extract_into_tensor(self.posterior_variance, t, x_t.shape)\n        posterior_log_variance_clipped = extract_into_tensor(self.posterior_log_variance_clipped, t, x_t.shape)\n        return posterior_mean, posterior_variance, posterior_log_variance_clipped\n\n    def p_mean_variance(self, x, t, clip_denoised: bool):\n        model_out = self.model(x, t)\n        if self.parameterization == \"eps\":\n            x_recon = self.predict_start_from_noise(x, t=t, noise=model_out)\n        elif self.parameterization == \"x0\":\n            x_recon = model_out\n        if clip_denoised:\n            x_recon.clamp_(-1., 1.)\n\n        model_mean, posterior_variance, posterior_log_variance = self.q_posterior(x_start=x_recon, x_t=x, t=t)\n        return model_mean, posterior_variance, posterior_log_variance\n\n    @torch.no_grad()\n    def p_sample(self, x, t, clip_denoised=True, repeat_noise=False):\n        b, *_, device = *x.shape, x.device\n        model_mean, _, model_log_variance = self.p_mean_variance(x=x, t=t, clip_denoised=clip_denoised)\n        noise = noise_like(x.shape, device, repeat_noise)\n        # no noise when t == 0\n        nonzero_mask = (1 - (t == 0).float()).reshape(b, *((1,) * (len(x.shape) - 1)))\n        return model_mean + nonzero_mask * (0.5 * model_log_variance).exp() * noise\n\n    @torch.no_grad()\n    def p_sample_loop(self, shape, return_intermediates=False):\n        device = self.betas.device\n        b = shape[0]\n        img = torch.randn(shape, device=device)\n        intermediates = [img]\n        for i in tqdm(reversed(range(0, self.num_timesteps)), desc='Sampling t', total=self.num_timesteps):\n            img = self.p_sample(img, torch.full((b,), i, device=device, dtype=torch.long),\n                                clip_denoised=self.clip_denoised)\n            if i % self.log_every_t == 0 or i == self.num_timesteps - 1:\n                intermediates.append(img)\n        if return_intermediates:\n            return img, intermediates\n        return img\n\n    @torch.no_grad()\n    def sample(self, batch_size=16, return_intermediates=False):\n        image_size = self.image_size\n        channels = self.channels\n        return self.p_sample_loop((batch_size, channels, image_size, image_size),\n                                  return_intermediates=return_intermediates)\n\n    def q_sample(self, x_start, t, noise=None):\n        noise = default(noise, lambda: torch.randn_like(x_start))\n        return (extract_into_tensor(self.sqrt_alphas_cumprod, t, x_start.shape) * x_start +\n                extract_into_tensor(self.sqrt_one_minus_alphas_cumprod, t, x_start.shape) * noise)\n\n    def get_loss(self, pred, target, mean=True):\n        if self.loss_type == 'l1':\n            loss = (target - pred).abs()\n            if mean:\n                loss = loss.mean()\n        elif self.loss_type == 'l2':\n            if mean:\n                loss = torch.nn.functional.mse_loss(target, pred)\n            else:\n                loss = torch.nn.functional.mse_loss(target, pred, reduction='none')\n        else:\n            raise NotImplementedError(\"unknown loss type '{loss_type}'\")\n\n        return loss\n\n    def p_losses(self, x_start, t, noise=None):\n        noise = default(noise, lambda: torch.randn_like(x_start))\n        x_noisy = self.q_sample(x_start=x_start, t=t, noise=noise)\n        model_out = self.model(x_noisy, t)\n\n        loss_dict = {}\n        if self.parameterization == \"eps\":\n            target = noise\n        elif self.parameterization == \"x0\":\n            target = x_start\n        else:\n            raise NotImplementedError(f\"Paramterization {self.parameterization} not yet supported\")\n\n        loss = self.get_loss(model_out, target, mean=False).mean(dim=[1, 2, 3])\n\n        log_prefix = 'train' if self.training else 'val'\n\n        loss_dict.update({f'{log_prefix}/loss_simple': loss.mean()})\n        loss_simple = loss.mean() * self.l_simple_weight\n\n        loss_vlb = (self.lvlb_weights[t] * loss).mean()\n        loss_dict.update({f'{log_prefix}/loss_vlb': loss_vlb})\n\n        loss = loss_simple + self.original_elbo_weight * loss_vlb\n\n        loss_dict.update({f'{log_prefix}/loss': loss})\n\n        return loss, loss_dict\n\n    def forward(self, x, *args, **kwargs):\n        # b, c, h, w, device, img_size, = *x.shape, x.device, self.image_size\n        # assert h == img_size and w == img_size, f'height and width of image must be {img_size}'\n        t = torch.randint(0, self.num_timesteps, (x.shape[0],), device=self.device).long()\n        return self.p_losses(x, t, *args, **kwargs)\n\n    def get_input(self, batch, k):\n        x = batch[k]\n        if len(x.shape) == 3:\n            x = x[..., None]\n        x = rearrange(x, 'b h w c -> b c h w')\n        x = x.to(memory_format=torch.contiguous_format).float()\n        return x\n\n    def shared_step(self, batch):\n        x = self.get_input(batch, self.first_stage_key)\n        loss, loss_dict = self(x)\n        return loss, loss_dict\n\n    def training_step(self, batch, batch_idx):\n        for k in self.ucg_training:\n            p = self.ucg_training[k][\"p\"]\n            val = self.ucg_training[k][\"val\"]\n            if val is None:\n                val = \"\"\n            for i in range(len(batch[k])):\n                if self.ucg_prng.choice(2, p=[1-p, p]):\n                    batch[k][i] = val\n\n        loss, loss_dict = self.shared_step(batch)\n\n        self.log_dict(loss_dict, prog_bar=True,\n                      logger=True, on_step=True, on_epoch=True)\n\n        self.log(\"global_step\", self.global_step,\n                 prog_bar=True, logger=True, on_step=True, on_epoch=False)\n\n        if self.use_scheduler:\n            lr = self.optimizers().param_groups[0]['lr']\n            self.log('lr_abs', lr, prog_bar=True, logger=True, on_step=True, on_epoch=False)\n\n        return loss\n\n    @torch.no_grad()\n    def validation_step(self, batch, batch_idx):\n        _, loss_dict_no_ema = self.shared_step(batch)\n        with self.ema_scope():\n            _, loss_dict_ema = self.shared_step(batch)\n            loss_dict_ema = {key + '_ema': loss_dict_ema[key] for key in loss_dict_ema}\n        self.log_dict(loss_dict_no_ema, prog_bar=False, logger=True, on_step=False, on_epoch=True)\n        self.log_dict(loss_dict_ema, prog_bar=False, logger=True, on_step=False, on_epoch=True)\n\n    def on_train_batch_end(self, *args, **kwargs):\n        if self.use_ema:\n            self.model_ema(self.model)\n\n    def _get_rows_from_list(self, samples):\n        n_imgs_per_row = len(samples)\n        denoise_grid = rearrange(samples, 'n b c h w -> b n c h w')\n        denoise_grid = rearrange(denoise_grid, 'b n c h w -> (b n) c h w')\n        denoise_grid = make_grid(denoise_grid, nrow=n_imgs_per_row)\n        return denoise_grid\n\n    @torch.no_grad()\n    def log_images(self, batch, N=8, n_row=2, sample=True, return_keys=None, **kwargs):\n        log = dict()\n        x = self.get_input(batch, self.first_stage_key)\n        N = min(x.shape[0], N)\n        n_row = min(x.shape[0], n_row)\n        x = x.to(self.device)[:N]\n        log[\"inputs\"] = x\n\n        # get diffusion row\n        diffusion_row = list()\n        x_start = x[:n_row]\n\n        for t in range(self.num_timesteps):\n            if t % self.log_every_t == 0 or t == self.num_timesteps - 1:\n                t = repeat(torch.tensor([t]), '1 -> b', b=n_row)\n                t = t.to(self.device).long()\n                noise = torch.randn_like(x_start)\n                x_noisy = self.q_sample(x_start=x_start, t=t, noise=noise)\n                diffusion_row.append(x_noisy)\n\n        log[\"diffusion_row\"] = self._get_rows_from_list(diffusion_row)\n\n        if sample:\n            # get denoise row\n            with self.ema_scope(\"Plotting\"):\n                samples, denoise_row = self.sample(batch_size=N, return_intermediates=True)\n\n            log[\"samples\"] = samples\n            log[\"denoise_row\"] = self._get_rows_from_list(denoise_row)\n\n        if return_keys:\n            if np.intersect1d(list(log.keys()), return_keys).shape[0] == 0:\n                return log\n            else:\n                return {key: log[key] for key in return_keys}\n        return log\n\n    def configure_optimizers(self):\n        lr = self.learning_rate\n        params = list(self.model.parameters())\n        if self.learn_logvar:\n            params = params + [self.logvar]\n        opt = torch.optim.AdamW(params, lr=lr)\n        return opt\n\n\nclass LatentDiffusion(DDPM):\n    \"\"\"main class\"\"\"\n    def __init__(self,\n                 first_stage_config,\n                 cond_stage_config,\n                 num_timesteps_cond=None,\n                 cond_stage_key=\"image\",\n                 cond_stage_trainable=False,\n                 concat_mode=True,\n                 cond_stage_forward=None,\n                 conditioning_key=None,\n                 scale_factor=1.0,\n                 scale_by_std=False,\n                 unet_trainable=True,\n                 *args, **kwargs):\n        self.num_timesteps_cond = default(num_timesteps_cond, 1)\n        self.scale_by_std = scale_by_std\n        assert self.num_timesteps_cond <= kwargs['timesteps']\n        # for backwards compatibility after implementation of DiffusionWrapper\n        if conditioning_key is None:\n            conditioning_key = 'concat' if concat_mode else 'crossattn'\n        if cond_stage_config == '__is_unconditional__':\n            conditioning_key = None\n        ckpt_path = kwargs.pop(\"ckpt_path\", None)\n        ignore_keys = kwargs.pop(\"ignore_keys\", [])\n        super().__init__(conditioning_key=conditioning_key, *args, **kwargs)\n        self.concat_mode = concat_mode\n        self.cond_stage_trainable = cond_stage_trainable\n        self.unet_trainable = unet_trainable\n        self.cond_stage_key = cond_stage_key\n        try:\n            self.num_downs = len(first_stage_config.params.ddconfig.ch_mult) - 1\n        except:\n            self.num_downs = 0\n        if not scale_by_std:\n            self.scale_factor = scale_factor\n        else:\n            self.register_buffer('scale_factor', torch.tensor(scale_factor))\n        self.instantiate_first_stage(first_stage_config)\n        self.instantiate_cond_stage(cond_stage_config)\n        self.cond_stage_forward = cond_stage_forward\n\n        # construct linear projection layer for concatenating image CLIP embedding and RT\n        self.cc_projection = nn.Linear(772, 768)\n        nn.init.eye_(list(self.cc_projection.parameters())[0][:768, :768])\n        nn.init.zeros_(list(self.cc_projection.parameters())[1])\n        self.cc_projection.requires_grad_(True)\n        \n        self.clip_denoised = False\n        self.bbox_tokenizer = None\n\n        self.restarted_from_ckpt = False\n        if ckpt_path is not None:\n            self.init_from_ckpt(ckpt_path, ignore_keys)\n            self.restarted_from_ckpt = True\n\n    def make_cond_schedule(self, ):\n        self.cond_ids = torch.full(size=(self.num_timesteps,), fill_value=self.num_timesteps - 1, dtype=torch.long)\n        ids = torch.round(torch.linspace(0, self.num_timesteps - 1, self.num_timesteps_cond)).long()\n        self.cond_ids[:self.num_timesteps_cond] = ids\n\n    @rank_zero_only\n    @torch.no_grad()\n    def on_train_batch_start(self, batch, batch_idx, dataloader_idx):\n        # only for very first batch\n        if self.scale_by_std and self.current_epoch == 0 and self.global_step == 0 and batch_idx == 0 and not self.restarted_from_ckpt:\n            assert self.scale_factor == 1., 'rather not use custom rescaling and std-rescaling simultaneously'\n            # set rescale weight to 1./std of encodings\n            print(\"### USING STD-RESCALING ###\")\n            x = super().get_input(batch, self.first_stage_key)\n            x = x.to(self.device)\n            encoder_posterior = self.encode_first_stage(x)\n            z = self.get_first_stage_encoding(encoder_posterior).detach()\n            del self.scale_factor\n            self.register_buffer('scale_factor', 1. / z.flatten().std())\n            print(f\"setting self.scale_factor to {self.scale_factor}\")\n            print(\"### USING STD-RESCALING ###\")\n\n    def register_schedule(self,\n                          given_betas=None, beta_schedule=\"linear\", timesteps=1000,\n                          linear_start=1e-4, linear_end=2e-2, cosine_s=8e-3):\n        super().register_schedule(given_betas, beta_schedule, timesteps, linear_start, linear_end, cosine_s)\n\n        self.shorten_cond_schedule = self.num_timesteps_cond > 1\n        if self.shorten_cond_schedule:\n            self.make_cond_schedule()\n\n    def instantiate_first_stage(self, config):\n        model = instantiate_from_config(config)\n        self.first_stage_model = model.eval()\n        self.first_stage_model.train = disabled_train\n        for param in self.first_stage_model.parameters():\n            param.requires_grad = False\n\n    def instantiate_cond_stage(self, config):\n        if not self.cond_stage_trainable:\n            if config == \"__is_first_stage__\":\n                print(\"Using first stage also as cond stage.\")\n                self.cond_stage_model = self.first_stage_model\n            elif config == \"__is_unconditional__\":\n                print(f\"Training {self.__class__.__name__} as an unconditional model.\")\n                self.cond_stage_model = None\n                # self.be_unconditional = True\n            else:\n                model = instantiate_from_config(config)\n                self.cond_stage_model = model.eval()\n                self.cond_stage_model.train = disabled_train\n                for param in self.cond_stage_model.parameters():\n                    param.requires_grad = False\n        else:\n            assert config != '__is_first_stage__'\n            assert config != '__is_unconditional__'\n            model = instantiate_from_config(config)\n            self.cond_stage_model = model\n\n    def _get_denoise_row_from_list(self, samples, desc='', force_no_decoder_quantization=False):\n        denoise_row = []\n        for zd in tqdm(samples, desc=desc):\n            denoise_row.append(self.decode_first_stage(zd.to(self.device),\n                                                            force_not_quantize=force_no_decoder_quantization))\n        n_imgs_per_row = len(denoise_row)\n        denoise_row = torch.stack(denoise_row)  # n_log_step, n_row, C, H, W\n        denoise_grid = rearrange(denoise_row, 'n b c h w -> b n c h w')\n        denoise_grid = rearrange(denoise_grid, 'b n c h w -> (b n) c h w')\n        denoise_grid = make_grid(denoise_grid, nrow=n_imgs_per_row)\n        return denoise_grid\n\n    def get_first_stage_encoding(self, encoder_posterior):\n        if isinstance(encoder_posterior, DiagonalGaussianDistribution):\n            z = encoder_posterior.sample()\n        elif isinstance(encoder_posterior, torch.Tensor):\n            z = encoder_posterior\n        else:\n            raise NotImplementedError(f\"encoder_posterior of type '{type(encoder_posterior)}' not yet implemented\")\n        return self.scale_factor * z\n\n    def get_learned_conditioning(self, c):\n        if self.cond_stage_forward is None:\n            if hasattr(self.cond_stage_model, 'encode') and callable(self.cond_stage_model.encode):\n                c = self.cond_stage_model.encode(c)\n                if isinstance(c, DiagonalGaussianDistribution):\n                    c = c.mode()\n            else:\n                c = self.cond_stage_model(c)\n        else:\n            assert hasattr(self.cond_stage_model, self.cond_stage_forward)\n            c = getattr(self.cond_stage_model, self.cond_stage_forward)(c)\n        return c\n\n    def meshgrid(self, h, w):\n        y = torch.arange(0, h).view(h, 1, 1).repeat(1, w, 1)\n        x = torch.arange(0, w).view(1, w, 1).repeat(h, 1, 1)\n\n        arr = torch.cat([y, x], dim=-1)\n        return arr\n\n    def delta_border(self, h, w):\n        \"\"\"\n        :param h: height\n        :param w: width\n        :return: normalized distance to image border,\n         wtith min distance = 0 at border and max dist = 0.5 at image center\n        \"\"\"\n        lower_right_corner = torch.tensor([h - 1, w - 1]).view(1, 1, 2)\n        arr = self.meshgrid(h, w) / lower_right_corner\n        dist_left_up = torch.min(arr, dim=-1, keepdims=True)[0]\n        dist_right_down = torch.min(1 - arr, dim=-1, keepdims=True)[0]\n        edge_dist = torch.min(torch.cat([dist_left_up, dist_right_down], dim=-1), dim=-1)[0]\n        return edge_dist\n\n    def get_weighting(self, h, w, Ly, Lx, device):\n        weighting = self.delta_border(h, w)\n        weighting = torch.clip(weighting, self.split_input_params[\"clip_min_weight\"],\n                               self.split_input_params[\"clip_max_weight\"], )\n        weighting = weighting.view(1, h * w, 1).repeat(1, 1, Ly * Lx).to(device)\n\n        if self.split_input_params[\"tie_braker\"]:\n            L_weighting = self.delta_border(Ly, Lx)\n            L_weighting = torch.clip(L_weighting,\n                                     self.split_input_params[\"clip_min_tie_weight\"],\n                                     self.split_input_params[\"clip_max_tie_weight\"])\n\n            L_weighting = L_weighting.view(1, 1, Ly * Lx).to(device)\n            weighting = weighting * L_weighting\n        return weighting\n\n    def get_fold_unfold(self, x, kernel_size, stride, uf=1, df=1):  # todo load once not every time, shorten code\n        \"\"\"\n        :param x: img of size (bs, c, h, w)\n        :return: n img crops of size (n, bs, c, kernel_size[0], kernel_size[1])\n        \"\"\"\n        bs, nc, h, w = x.shape\n\n        # number of crops in image\n        Ly = (h - kernel_size[0]) // stride[0] + 1\n        Lx = (w - kernel_size[1]) // stride[1] + 1\n\n        if uf == 1 and df == 1:\n            fold_params = dict(kernel_size=kernel_size, dilation=1, padding=0, stride=stride)\n            unfold = torch.nn.Unfold(**fold_params)\n\n            fold = torch.nn.Fold(output_size=x.shape[2:], **fold_params)\n\n            weighting = self.get_weighting(kernel_size[0], kernel_size[1], Ly, Lx, x.device).to(x.dtype)\n            normalization = fold(weighting).view(1, 1, h, w)  # normalizes the overlap\n            weighting = weighting.view((1, 1, kernel_size[0], kernel_size[1], Ly * Lx))\n\n        elif uf > 1 and df == 1:\n            fold_params = dict(kernel_size=kernel_size, dilation=1, padding=0, stride=stride)\n            unfold = torch.nn.Unfold(**fold_params)\n\n            fold_params2 = dict(kernel_size=(kernel_size[0] * uf, kernel_size[0] * uf),\n                                dilation=1, padding=0,\n                                stride=(stride[0] * uf, stride[1] * uf))\n            fold = torch.nn.Fold(output_size=(x.shape[2] * uf, x.shape[3] * uf), **fold_params2)\n\n            weighting = self.get_weighting(kernel_size[0] * uf, kernel_size[1] * uf, Ly, Lx, x.device).to(x.dtype)\n            normalization = fold(weighting).view(1, 1, h * uf, w * uf)  # normalizes the overlap\n            weighting = weighting.view((1, 1, kernel_size[0] * uf, kernel_size[1] * uf, Ly * Lx))\n\n        elif df > 1 and uf == 1:\n            fold_params = dict(kernel_size=kernel_size, dilation=1, padding=0, stride=stride)\n            unfold = torch.nn.Unfold(**fold_params)\n\n            fold_params2 = dict(kernel_size=(kernel_size[0] // df, kernel_size[0] // df),\n                                dilation=1, padding=0,\n                                stride=(stride[0] // df, stride[1] // df))\n            fold = torch.nn.Fold(output_size=(x.shape[2] // df, x.shape[3] // df), **fold_params2)\n\n            weighting = self.get_weighting(kernel_size[0] // df, kernel_size[1] // df, Ly, Lx, x.device).to(x.dtype)\n            normalization = fold(weighting).view(1, 1, h // df, w // df)  # normalizes the overlap\n            weighting = weighting.view((1, 1, kernel_size[0] // df, kernel_size[1] // df, Ly * Lx))\n\n        else:\n            raise NotImplementedError\n\n        return fold, unfold, normalization, weighting\n\n    \n    @torch.no_grad()\n    def get_input(self, batch, k, return_first_stage_outputs=False, force_c_encode=False,\n                  cond_key=None, return_original_cond=False, bs=None, uncond=0.05):\n        x = super().get_input(batch, k)\n        T = batch['T'].to(memory_format=torch.contiguous_format).float()\n        \n        if bs is not None:\n            x = x[:bs]\n            T = T[:bs].to(self.device)\n\n        x = x.to(self.device)\n        encoder_posterior = self.encode_first_stage(x)\n        z = self.get_first_stage_encoding(encoder_posterior).detach()\n        cond_key = cond_key or self.cond_stage_key\n        xc = super().get_input(batch, cond_key).to(self.device)\n        if bs is not None:\n            xc = xc[:bs]\n        cond = {}\n\n        # To support classifier-free guidance, randomly drop out only text conditioning 5%, only image conditioning 5%, and both 5%.\n        random = torch.rand(x.size(0), device=x.device)\n        prompt_mask = rearrange(random < 2 * uncond, \"n -> n 1 1\")\n        input_mask = 1 - rearrange((random >= uncond).float() * (random < 3 * uncond).float(), \"n -> n 1 1 1\")\n        null_prompt = self.get_learned_conditioning([\"\"])\n\n        # z.shape: [8, 4, 64, 64]; c.shape: [8, 1, 768]\n        # print('=========== xc shape ===========', xc.shape)\n        with torch.enable_grad():\n            clip_emb = self.get_learned_conditioning(xc).detach()\n            null_prompt = self.get_learned_conditioning([\"\"]).detach()\n            cond[\"c_crossattn\"] = [self.cc_projection(torch.cat([torch.where(prompt_mask, null_prompt, clip_emb), T[:, None, :]], dim=-1))]\n        cond[\"c_concat\"] = [input_mask * self.encode_first_stage((xc.to(self.device))).mode().detach()]\n        out = [z, cond]\n        if return_first_stage_outputs:\n            xrec = self.decode_first_stage(z)\n            out.extend([x, xrec])\n        if return_original_cond:\n            out.append(xc)\n        return out\n\n    # @torch.no_grad()\n    def decode_first_stage(self, z, predict_cids=False, force_not_quantize=False):\n        if predict_cids:\n            if z.dim() == 4:\n                z = torch.argmax(z.exp(), dim=1).long()\n            z = self.first_stage_model.quantize.get_codebook_entry(z, shape=None)\n            z = rearrange(z, 'b h w c -> b c h w').contiguous()\n\n        z = 1. / self.scale_factor * z\n\n        if hasattr(self, \"split_input_params\"):\n            if self.split_input_params[\"patch_distributed_vq\"]:\n                ks = self.split_input_params[\"ks\"]  # eg. (128, 128)\n                stride = self.split_input_params[\"stride\"]  # eg. (64, 64)\n                uf = self.split_input_params[\"vqf\"]\n                bs, nc, h, w = z.shape\n                if ks[0] > h or ks[1] > w:\n                    ks = (min(ks[0], h), min(ks[1], w))\n                    print(\"reducing Kernel\")\n\n                if stride[0] > h or stride[1] > w:\n                    stride = (min(stride[0], h), min(stride[1], w))\n                    print(\"reducing stride\")\n\n                fold, unfold, normalization, weighting = self.get_fold_unfold(z, ks, stride, uf=uf)\n\n                z = unfold(z)  # (bn, nc * prod(**ks), L)\n                # 1. Reshape to img shape\n                z = z.view((z.shape[0], -1, ks[0], ks[1], z.shape[-1]))  # (bn, nc, ks[0], ks[1], L )\n\n                # 2. apply model loop over last dim\n                if isinstance(self.first_stage_model, VQModelInterface):\n                    output_list = [self.first_stage_model.decode(z[:, :, :, :, i],\n                                                                 force_not_quantize=predict_cids or force_not_quantize)\n                                   for i in range(z.shape[-1])]\n                else:\n\n                    output_list = [self.first_stage_model.decode(z[:, :, :, :, i])\n                                   for i in range(z.shape[-1])]\n\n                o = torch.stack(output_list, axis=-1)  # # (bn, nc, ks[0], ks[1], L)\n                o = o * weighting\n                # Reverse 1. reshape to img shape\n                o = o.view((o.shape[0], -1, o.shape[-1]))  # (bn, nc * ks[0] * ks[1], L)\n                # stitch crops together\n                decoded = fold(o)\n                decoded = decoded / normalization  # norm is shape (1, 1, h, w)\n                return decoded\n            else:\n                if isinstance(self.first_stage_model, VQModelInterface):\n                    return self.first_stage_model.decode(z, force_not_quantize=predict_cids or force_not_quantize)\n                else:\n                    return self.first_stage_model.decode(z)\n\n        else:\n            if isinstance(self.first_stage_model, VQModelInterface):\n                return self.first_stage_model.decode(z, force_not_quantize=predict_cids or force_not_quantize)\n            else:\n                return self.first_stage_model.decode(z)\n\n    # @torch.no_grad() # wasted two hours to find this bug... why no grad here!\n    def encode_first_stage(self, x):\n        if hasattr(self, \"split_input_params\"):\n            if self.split_input_params[\"patch_distributed_vq\"]:\n                ks = self.split_input_params[\"ks\"]  # eg. (128, 128)\n                stride = self.split_input_params[\"stride\"]  # eg. (64, 64)\n                df = self.split_input_params[\"vqf\"]\n                self.split_input_params['original_image_size'] = x.shape[-2:]\n                bs, nc, h, w = x.shape\n                if ks[0] > h or ks[1] > w:\n                    ks = (min(ks[0], h), min(ks[1], w))\n                    print(\"reducing Kernel\")\n\n                if stride[0] > h or stride[1] > w:\n                    stride = (min(stride[0], h), min(stride[1], w))\n                    print(\"reducing stride\")\n\n                fold, unfold, normalization, weighting = self.get_fold_unfold(x, ks, stride, df=df)\n                z = unfold(x)  # (bn, nc * prod(**ks), L)\n                # Reshape to img shape\n                z = z.view((z.shape[0], -1, ks[0], ks[1], z.shape[-1]))  # (bn, nc, ks[0], ks[1], L )\n\n                output_list = [self.first_stage_model.encode(z[:, :, :, :, i])\n                               for i in range(z.shape[-1])]\n\n                o = torch.stack(output_list, axis=-1)\n                o = o * weighting\n\n                # Reverse reshape to img shape\n                o = o.view((o.shape[0], -1, o.shape[-1]))  # (bn, nc * ks[0] * ks[1], L)\n                # stitch crops together\n                decoded = fold(o)\n                decoded = decoded / normalization\n                return decoded\n\n            else:\n                return self.first_stage_model.encode(x)\n        else:\n            return self.first_stage_model.encode(x)\n\n    def shared_step(self, batch, **kwargs):\n        x, c = self.get_input(batch, self.first_stage_key)\n        loss = self(x, c)\n        return loss\n\n    def forward(self, x, c, *args, **kwargs):\n        t = torch.randint(0, self.num_timesteps, (x.shape[0],), device=self.device).long()\n        if self.model.conditioning_key is not None:\n            assert c is not None\n            # if self.cond_stage_trainable:\n            #     c = self.get_learned_conditioning(c)\n            if self.shorten_cond_schedule:  # TODO: drop this option\n                tc = self.cond_ids[t].to(self.device)\n                c = self.q_sample(x_start=c, t=tc, noise=torch.randn_like(c.float()))\n        return self.p_losses(x, c, t, *args, **kwargs)\n\n    def _rescale_annotations(self, bboxes, crop_coordinates):  # TODO: move to dataset\n        def rescale_bbox(bbox):\n            x0 = clamp((bbox[0] - crop_coordinates[0]) / crop_coordinates[2])\n            y0 = clamp((bbox[1] - crop_coordinates[1]) / crop_coordinates[3])\n            w = min(bbox[2] / crop_coordinates[2], 1 - x0)\n            h = min(bbox[3] / crop_coordinates[3], 1 - y0)\n            return x0, y0, w, h\n\n        return [rescale_bbox(b) for b in bboxes]\n\n    def apply_model(self, x_noisy, t, cond, return_ids=False):\n\n        if isinstance(cond, dict):\n            # hybrid case, cond is exptected to be a dict\n            pass\n        else:\n            if not isinstance(cond, list):\n                cond = [cond]\n            key = 'c_concat' if self.model.conditioning_key == 'concat' else 'c_crossattn'\n            cond = {key: cond}\n\n        if hasattr(self, \"split_input_params\"):\n            assert len(cond) == 1  # todo can only deal with one conditioning atm\n            assert not return_ids\n            ks = self.split_input_params[\"ks\"]  # eg. (128, 128)\n            stride = self.split_input_params[\"stride\"]  # eg. (64, 64)\n\n            h, w = x_noisy.shape[-2:]\n\n            fold, unfold, normalization, weighting = self.get_fold_unfold(x_noisy, ks, stride)\n\n            z = unfold(x_noisy)  # (bn, nc * prod(**ks), L)\n            # Reshape to img shape\n            z = z.view((z.shape[0], -1, ks[0], ks[1], z.shape[-1]))  # (bn, nc, ks[0], ks[1], L )\n            z_list = [z[:, :, :, :, i] for i in range(z.shape[-1])]\n\n            if self.cond_stage_key in [\"image\", \"LR_image\", \"segmentation\",\n                                       'bbox_img'] and self.model.conditioning_key:  # todo check for completeness\n                c_key = next(iter(cond.keys()))  # get key\n                c = next(iter(cond.values()))  # get value\n                assert (len(c) == 1)  # todo extend to list with more than one elem\n                c = c[0]  # get element\n\n                c = unfold(c)\n                c = c.view((c.shape[0], -1, ks[0], ks[1], c.shape[-1]))  # (bn, nc, ks[0], ks[1], L )\n\n                cond_list = [{c_key: [c[:, :, :, :, i]]} for i in range(c.shape[-1])]\n\n            elif self.cond_stage_key == 'coordinates_bbox':\n                assert 'original_image_size' in self.split_input_params, 'BoudingBoxRescaling is missing original_image_size'\n\n                # assuming padding of unfold is always 0 and its dilation is always 1\n                n_patches_per_row = int((w - ks[0]) / stride[0] + 1)\n                full_img_h, full_img_w = self.split_input_params['original_image_size']\n                # as we are operating on latents, we need the factor from the original image size to the\n                # spatial latent size to properly rescale the crops for regenerating the bbox annotations\n                num_downs = self.first_stage_model.encoder.num_resolutions - 1\n                rescale_latent = 2 ** (num_downs)\n\n                # get top left postions of patches as conforming for the bbbox tokenizer, therefore we\n                # need to rescale the tl patch coordinates to be in between (0,1)\n                tl_patch_coordinates = [(rescale_latent * stride[0] * (patch_nr % n_patches_per_row) / full_img_w,\n                                         rescale_latent * stride[1] * (patch_nr // n_patches_per_row) / full_img_h)\n                                        for patch_nr in range(z.shape[-1])]\n\n                # patch_limits are tl_coord, width and height coordinates as (x_tl, y_tl, h, w)\n                patch_limits = [(x_tl, y_tl,\n                                 rescale_latent * ks[0] / full_img_w,\n                                 rescale_latent * ks[1] / full_img_h) for x_tl, y_tl in tl_patch_coordinates]\n                # patch_values = [(np.arange(x_tl,min(x_tl+ks, 1.)),np.arange(y_tl,min(y_tl+ks, 1.))) for x_tl, y_tl in tl_patch_coordinates]\n\n                # tokenize crop coordinates for the bounding boxes of the respective patches\n                patch_limits_tknzd = [torch.LongTensor(self.bbox_tokenizer._crop_encoder(bbox))[None].to(self.device)\n                                      for bbox in patch_limits]  # list of length l with tensors of shape (1, 2)\n                # cut tknzd crop position from conditioning\n                assert isinstance(cond, dict), 'cond must be dict to be fed into model'\n                cut_cond = cond['c_crossattn'][0][..., :-2].to(self.device)\n\n                adapted_cond = torch.stack([torch.cat([cut_cond, p], dim=1) for p in patch_limits_tknzd])\n                adapted_cond = rearrange(adapted_cond, 'l b n -> (l b) n')\n                adapted_cond = self.get_learned_conditioning(adapted_cond)\n                adapted_cond = rearrange(adapted_cond, '(l b) n d -> l b n d', l=z.shape[-1])\n\n                cond_list = [{'c_crossattn': [e]} for e in adapted_cond]\n\n            else:\n                cond_list = [cond for i in range(z.shape[-1])]  # Todo make this more efficient\n\n            # apply model by loop over crops\n            output_list = [self.model(z_list[i], t, **cond_list[i]) for i in range(z.shape[-1])]\n            assert not isinstance(output_list[0],\n                                  tuple)  # todo cant deal with multiple model outputs check this never happens\n\n            o = torch.stack(output_list, axis=-1)\n            o = o * weighting\n            # Reverse reshape to img shape\n            o = o.view((o.shape[0], -1, o.shape[-1]))  # (bn, nc * ks[0] * ks[1], L)\n            # stitch crops together\n            x_recon = fold(o) / normalization\n\n        else:\n            x_recon = self.model(x_noisy, t, **cond)\n\n        if isinstance(x_recon, tuple) and not return_ids:\n            return x_recon[0]\n        else:\n            return x_recon\n\n    def _predict_eps_from_xstart(self, x_t, t, pred_xstart):\n        return (extract_into_tensor(self.sqrt_recip_alphas_cumprod, t, x_t.shape) * x_t - pred_xstart) / \\\n               extract_into_tensor(self.sqrt_recipm1_alphas_cumprod, t, x_t.shape)\n\n    def _prior_bpd(self, x_start):\n        \"\"\"\n        Get the prior KL term for the variational lower-bound, measured in\n        bits-per-dim.\n        This term can't be optimized, as it only depends on the encoder.\n        :param x_start: the [N x C x ...] tensor of inputs.\n        :return: a batch of [N] KL values (in bits), one per batch element.\n        \"\"\"\n        batch_size = x_start.shape[0]\n        t = torch.tensor([self.num_timesteps - 1] * batch_size, device=x_start.device)\n        qt_mean, _, qt_log_variance = self.q_mean_variance(x_start, t)\n        kl_prior = normal_kl(mean1=qt_mean, logvar1=qt_log_variance, mean2=0.0, logvar2=0.0)\n        return mean_flat(kl_prior) / np.log(2.0)\n\n    def p_losses(self, x_start, cond, t, noise=None):\n        noise = default(noise, lambda: torch.randn_like(x_start))\n        x_noisy = self.q_sample(x_start=x_start, t=t, noise=noise)\n        model_output = self.apply_model(x_noisy, t, cond)\n\n        loss_dict = {}\n        prefix = 'train' if self.training else 'val'\n\n        if self.parameterization == \"x0\":\n            target = x_start\n        elif self.parameterization == \"eps\":\n            target = noise\n        else:\n            raise NotImplementedError()\n\n        loss_simple = self.get_loss(model_output, target, mean=False).mean([1, 2, 3])\n        loss_dict.update({f'{prefix}/loss_simple': loss_simple.mean()})\n\n        logvar_t = self.logvar[t].to(self.device)\n        loss = loss_simple / torch.exp(logvar_t) + logvar_t\n        # loss = loss_simple / torch.exp(self.logvar) + self.logvar\n        if self.learn_logvar:\n            loss_dict.update({f'{prefix}/loss_gamma': loss.mean()})\n            loss_dict.update({'logvar': self.logvar.data.mean()})\n\n        loss = self.l_simple_weight * loss.mean()\n\n        loss_vlb = self.get_loss(model_output, target, mean=False).mean(dim=(1, 2, 3))\n        loss_vlb = (self.lvlb_weights[t] * loss_vlb).mean()\n        loss_dict.update({f'{prefix}/loss_vlb': loss_vlb})\n        loss += (self.original_elbo_weight * loss_vlb)\n        loss_dict.update({f'{prefix}/loss': loss})\n\n        return loss, loss_dict\n\n    def p_mean_variance(self, x, c, t, clip_denoised: bool, return_codebook_ids=False, quantize_denoised=False,\n                        return_x0=False, score_corrector=None, corrector_kwargs=None):\n        t_in = t\n        model_out = self.apply_model(x, t_in, c, return_ids=return_codebook_ids)\n\n        if score_corrector is not None:\n            assert self.parameterization == \"eps\"\n            model_out = score_corrector.modify_score(self, model_out, x, t, c, **corrector_kwargs)\n\n        if return_codebook_ids:\n            model_out, logits = model_out\n\n        if self.parameterization == \"eps\":\n            x_recon = self.predict_start_from_noise(x, t=t, noise=model_out)\n        elif self.parameterization == \"x0\":\n            x_recon = model_out\n        else:\n            raise NotImplementedError()\n\n        if clip_denoised:\n            x_recon.clamp_(-1., 1.)\n        if quantize_denoised:\n            x_recon, _, [_, _, indices] = self.first_stage_model.quantize(x_recon)\n        model_mean, posterior_variance, posterior_log_variance = self.q_posterior(x_start=x_recon, x_t=x, t=t)\n        if return_codebook_ids:\n            return model_mean, posterior_variance, posterior_log_variance, logits\n        elif return_x0:\n            return model_mean, posterior_variance, posterior_log_variance, x_recon\n        else:\n            return model_mean, posterior_variance, posterior_log_variance\n\n    @torch.no_grad()\n    def p_sample(self, x, c, t, clip_denoised=False, repeat_noise=False,\n                 return_codebook_ids=False, quantize_denoised=False, return_x0=False,\n                 temperature=1., noise_dropout=0., score_corrector=None, corrector_kwargs=None):\n        b, *_, device = *x.shape, x.device\n        outputs = self.p_mean_variance(x=x, c=c, t=t, clip_denoised=clip_denoised,\n                                       return_codebook_ids=return_codebook_ids,\n                                       quantize_denoised=quantize_denoised,\n                                       return_x0=return_x0,\n                                       score_corrector=score_corrector, corrector_kwargs=corrector_kwargs)\n        if return_codebook_ids:\n            raise DeprecationWarning(\"Support dropped.\")\n            model_mean, _, model_log_variance, logits = outputs\n        elif return_x0:\n            model_mean, _, model_log_variance, x0 = outputs\n        else:\n            model_mean, _, model_log_variance = outputs\n\n        noise = noise_like(x.shape, device, repeat_noise) * temperature\n        if noise_dropout > 0.:\n            noise = torch.nn.functional.dropout(noise, p=noise_dropout)\n        # no noise when t == 0\n        nonzero_mask = (1 - (t == 0).float()).reshape(b, *((1,) * (len(x.shape) - 1)))\n\n        if return_codebook_ids:\n            return model_mean + nonzero_mask * (0.5 * model_log_variance).exp() * noise, logits.argmax(dim=1)\n        if return_x0:\n            return model_mean + nonzero_mask * (0.5 * model_log_variance).exp() * noise, x0\n        else:\n            return model_mean + nonzero_mask * (0.5 * model_log_variance).exp() * noise\n\n    @torch.no_grad()\n    def progressive_denoising(self, cond, shape, verbose=True, callback=None, quantize_denoised=False,\n                              img_callback=None, mask=None, x0=None, temperature=1., noise_dropout=0.,\n                              score_corrector=None, corrector_kwargs=None, batch_size=None, x_T=None, start_T=None,\n                              log_every_t=None):\n        if not log_every_t:\n            log_every_t = self.log_every_t\n        timesteps = self.num_timesteps\n        if batch_size is not None:\n            b = batch_size if batch_size is not None else shape[0]\n            shape = [batch_size] + list(shape)\n        else:\n            b = batch_size = shape[0]\n        if x_T is None:\n            img = torch.randn(shape, device=self.device)\n        else:\n            img = x_T\n        intermediates = []\n        if cond is not None:\n            if isinstance(cond, dict):\n                cond = {key: cond[key][:batch_size] if not isinstance(cond[key], list) else\n                list(map(lambda x: x[:batch_size], cond[key])) for key in cond}\n            else:\n                cond = [c[:batch_size] for c in cond] if isinstance(cond, list) else cond[:batch_size]\n\n        if start_T is not None:\n            timesteps = min(timesteps, start_T)\n        iterator = tqdm(reversed(range(0, timesteps)), desc='Progressive Generation',\n                        total=timesteps) if verbose else reversed(\n            range(0, timesteps))\n        if type(temperature) == float:\n            temperature = [temperature] * timesteps\n\n        for i in iterator:\n            ts = torch.full((b,), i, device=self.device, dtype=torch.long)\n            if self.shorten_cond_schedule:\n                assert self.model.conditioning_key != 'hybrid'\n                tc = self.cond_ids[ts].to(cond.device)\n                cond = self.q_sample(x_start=cond, t=tc, noise=torch.randn_like(cond))\n\n            img, x0_partial = self.p_sample(img, cond, ts,\n                                            clip_denoised=self.clip_denoised,\n                                            quantize_denoised=quantize_denoised, return_x0=True,\n                                            temperature=temperature[i], noise_dropout=noise_dropout,\n                                            score_corrector=score_corrector, corrector_kwargs=corrector_kwargs)\n            if mask is not None:\n                assert x0 is not None\n                img_orig = self.q_sample(x0, ts)\n                img = img_orig * mask + (1. - mask) * img\n\n            if i % log_every_t == 0 or i == timesteps - 1:\n                intermediates.append(x0_partial)\n            if callback: callback(i)\n            if img_callback: img_callback(img, i)\n        return img, intermediates\n\n    @torch.no_grad()\n    def p_sample_loop(self, cond, shape, return_intermediates=False,\n                      x_T=None, verbose=True, callback=None, timesteps=None, quantize_denoised=False,\n                      mask=None, x0=None, img_callback=None, start_T=None,\n                      log_every_t=None):\n\n        if not log_every_t:\n            log_every_t = self.log_every_t\n        device = self.betas.device\n        b = shape[0]\n        if x_T is None:\n            img = torch.randn(shape, device=device)\n        else:\n            img = x_T\n\n        intermediates = [img]\n        if timesteps is None:\n            timesteps = self.num_timesteps\n\n        if start_T is not None:\n            timesteps = min(timesteps, start_T)\n        iterator = tqdm(reversed(range(0, timesteps)), desc='Sampling t', total=timesteps) if verbose else reversed(\n            range(0, timesteps))\n\n        if mask is not None:\n            assert x0 is not None\n            assert x0.shape[2:3] == mask.shape[2:3]  # spatial size has to match\n\n        for i in iterator:\n            ts = torch.full((b,), i, device=device, dtype=torch.long)\n            if self.shorten_cond_schedule:\n                assert self.model.conditioning_key != 'hybrid'\n                tc = self.cond_ids[ts].to(cond.device)\n                cond = self.q_sample(x_start=cond, t=tc, noise=torch.randn_like(cond))\n\n            img = self.p_sample(img, cond, ts,\n                                clip_denoised=self.clip_denoised,\n                                quantize_denoised=quantize_denoised)\n            if mask is not None:\n                img_orig = self.q_sample(x0, ts)\n                img = img_orig * mask + (1. - mask) * img\n\n            if i % log_every_t == 0 or i == timesteps - 1:\n                intermediates.append(img)\n            if callback: callback(i)\n            if img_callback: img_callback(img, i)\n\n        if return_intermediates:\n            return img, intermediates\n        return img\n\n    @torch.no_grad()\n    def sample(self, cond, batch_size=16, return_intermediates=False, x_T=None,\n               verbose=True, timesteps=None, quantize_denoised=False,\n               mask=None, x0=None, shape=None,**kwargs):\n        if shape is None:\n            shape = (batch_size, self.channels, self.image_size, self.image_size)\n        if cond is not None:\n            if isinstance(cond, dict):\n                cond = {key: cond[key][:batch_size] if not isinstance(cond[key], list) else\n                list(map(lambda x: x[:batch_size], cond[key])) for key in cond}\n            else:\n                cond = [c[:batch_size] for c in cond] if isinstance(cond, list) else cond[:batch_size]\n        return self.p_sample_loop(cond,\n                                  shape,\n                                  return_intermediates=return_intermediates, x_T=x_T,\n                                  verbose=verbose, timesteps=timesteps, quantize_denoised=quantize_denoised,\n                                  mask=mask, x0=x0)\n\n    @torch.no_grad()\n    def sample_log(self, cond, batch_size, ddim, ddim_steps, **kwargs):\n        if ddim:\n            ddim_sampler = DDIMSampler(self)\n            shape = (self.channels, self.image_size, self.image_size)\n            samples, intermediates = ddim_sampler.sample(ddim_steps, batch_size,\n                                                         shape, cond, verbose=False, **kwargs)\n\n        else:\n            samples, intermediates = self.sample(cond=cond, batch_size=batch_size,\n                                                 return_intermediates=True, **kwargs)\n\n        return samples, intermediates\n\n    @torch.no_grad()\n    def get_unconditional_conditioning(self, batch_size, null_label=None, image_size=512):\n        if null_label is not None:\n            xc = null_label\n            if isinstance(xc, ListConfig):\n                xc = list(xc)\n            if isinstance(xc, dict) or isinstance(xc, list):\n                c = self.get_learned_conditioning(xc)\n            else:\n                if hasattr(xc, \"to\"):\n                    xc = xc.to(self.device)\n                c = self.get_learned_conditioning(xc)\n        else:\n            # todo: get null label from cond_stage_model\n            raise NotImplementedError()\n        c = repeat(c, '1 ... -> b ...', b=batch_size).to(self.device)\n        cond = {}\n        cond[\"c_crossattn\"] = [c]\n        cond[\"c_concat\"] = [torch.zeros([batch_size, 4, image_size // 8, image_size // 8]).to(self.device)]\n        return cond\n\n    @torch.no_grad()\n    def log_images(self, batch, N=8, n_row=4, sample=True, ddim_steps=200, ddim_eta=1., return_keys=None,\n                   quantize_denoised=True, inpaint=True, plot_denoise_rows=False, plot_progressive_rows=True,\n                   plot_diffusion_rows=True, unconditional_guidance_scale=1., unconditional_guidance_label=None,\n                   use_ema_scope=True,\n                   **kwargs):\n        ema_scope = self.ema_scope if use_ema_scope else nullcontext\n        use_ddim = ddim_steps is not None\n\n        log = dict()\n        z, c, x, xrec, xc = self.get_input(batch, self.first_stage_key,\n                                           return_first_stage_outputs=True,\n                                           force_c_encode=True,\n                                           return_original_cond=True,\n                                           bs=N)\n        N = min(x.shape[0], N)\n        n_row = min(x.shape[0], n_row)\n        log[\"inputs\"] = x\n        log[\"reconstruction\"] = xrec\n        if self.model.conditioning_key is not None:\n            if hasattr(self.cond_stage_model, \"decode\"):\n                xc = self.cond_stage_model.decode(c)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key in [\"caption\", \"txt\"]:\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[self.cond_stage_key], size=x.shape[2]//25)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key == 'class_label':\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[\"human_label\"], size=x.shape[2]//25)\n                log['conditioning'] = xc\n            elif isimage(xc):\n                log[\"conditioning\"] = xc\n            if ismap(xc):\n                log[\"original_conditioning\"] = self.to_rgb(xc)\n\n        if plot_diffusion_rows:\n            # get diffusion row\n            diffusion_row = list()\n            z_start = z[:n_row]\n            for t in range(self.num_timesteps):\n                if t % self.log_every_t == 0 or t == self.num_timesteps - 1:\n                    t = repeat(torch.tensor([t]), '1 -> b', b=n_row)\n                    t = t.to(self.device).long()\n                    noise = torch.randn_like(z_start)\n                    z_noisy = self.q_sample(x_start=z_start, t=t, noise=noise)\n                    diffusion_row.append(self.decode_first_stage(z_noisy))\n\n            diffusion_row = torch.stack(diffusion_row)  # n_log_step, n_row, C, H, W\n            diffusion_grid = rearrange(diffusion_row, 'n b c h w -> b n c h w')\n            diffusion_grid = rearrange(diffusion_grid, 'b n c h w -> (b n) c h w')\n            diffusion_grid = make_grid(diffusion_grid, nrow=diffusion_row.shape[0])\n            log[\"diffusion_row\"] = diffusion_grid\n\n        if sample:\n            # get denoise row\n            with ema_scope(\"Sampling\"):\n                samples, z_denoise_row = self.sample_log(cond=c,batch_size=N,ddim=use_ddim,\n                                                         ddim_steps=ddim_steps,eta=ddim_eta)\n                # samples, z_denoise_row = self.sample(cond=c, batch_size=N, return_intermediates=True)\n            x_samples = self.decode_first_stage(samples)\n            log[\"samples\"] = x_samples\n            if plot_denoise_rows:\n                denoise_grid = self._get_denoise_row_from_list(z_denoise_row)\n                log[\"denoise_row\"] = denoise_grid\n\n            if quantize_denoised and not isinstance(self.first_stage_model, AutoencoderKL) and not isinstance(\n                    self.first_stage_model, IdentityFirstStage):\n                # also display when quantizing x0 while sampling\n                with ema_scope(\"Plotting Quantized Denoised\"):\n                    samples, z_denoise_row = self.sample_log(cond=c,batch_size=N,ddim=use_ddim,\n                                                             ddim_steps=ddim_steps,eta=ddim_eta,\n                                                             quantize_denoised=True)\n                    # samples, z_denoise_row = self.sample(cond=c, batch_size=N, return_intermediates=True,\n                    #                                      quantize_denoised=True)\n                x_samples = self.decode_first_stage(samples.to(self.device))\n                log[\"samples_x0_quantized\"] = x_samples\n\n        if unconditional_guidance_scale > 1.0:\n            uc = self.get_unconditional_conditioning(N, unconditional_guidance_label, image_size=x.shape[-1])\n            # uc = torch.zeros_like(c)\n            with ema_scope(\"Sampling with classifier-free guidance\"):\n                samples_cfg, _ = self.sample_log(cond=c, batch_size=N, ddim=use_ddim,\n                                                 ddim_steps=ddim_steps, eta=ddim_eta,\n                                                 unconditional_guidance_scale=unconditional_guidance_scale,\n                                                 unconditional_conditioning=uc,\n                                                 )\n                x_samples_cfg = self.decode_first_stage(samples_cfg)\n                log[f\"samples_cfg_scale_{unconditional_guidance_scale:.2f}\"] = x_samples_cfg\n\n        if inpaint:\n            # make a simple center square\n            b, h, w = z.shape[0], z.shape[2], z.shape[3]\n            mask = torch.ones(N, h, w).to(self.device)\n            # zeros will be filled in\n            mask[:, h // 4:3 * h // 4, w // 4:3 * w // 4] = 0.\n            mask = mask[:, None, ...]\n            with ema_scope(\"Plotting Inpaint\"):\n\n                samples, _ = self.sample_log(cond=c,batch_size=N,ddim=use_ddim, eta=ddim_eta,\n                                            ddim_steps=ddim_steps, x0=z[:N], mask=mask)\n            x_samples = self.decode_first_stage(samples.to(self.device))\n            log[\"samples_inpainting\"] = x_samples\n            log[\"mask\"] = mask\n\n            # outpaint\n            mask = 1. - mask\n            with ema_scope(\"Plotting Outpaint\"):\n                samples, _ = self.sample_log(cond=c, batch_size=N, ddim=use_ddim,eta=ddim_eta,\n                                            ddim_steps=ddim_steps, x0=z[:N], mask=mask)\n            x_samples = self.decode_first_stage(samples.to(self.device))\n            log[\"samples_outpainting\"] = x_samples\n\n        if plot_progressive_rows:\n            with ema_scope(\"Plotting Progressives\"):\n                img, progressives = self.progressive_denoising(c,\n                                                               shape=(self.channels, self.image_size, self.image_size),\n                                                               batch_size=N)\n            prog_row = self._get_denoise_row_from_list(progressives, desc=\"Progressive Generation\")\n            log[\"progressive_row\"] = prog_row\n\n        if return_keys:\n            if np.intersect1d(list(log.keys()), return_keys).shape[0] == 0:\n                return log\n            else:\n                return {key: log[key] for key in return_keys}\n        return log\n\n    def configure_optimizers(self):\n        lr = self.learning_rate\n        params = []\n        if self.unet_trainable == \"attn\":\n            print(\"Training only unet attention layers\")\n            for n, m in self.model.named_modules():\n                if isinstance(m, CrossAttention) and n.endswith('attn2'):\n                    params.extend(m.parameters())\n        if self.unet_trainable == \"conv_in\":\n            print(\"Training only unet input conv layers\")\n            params = list(self.model.diffusion_model.input_blocks[0][0].parameters())\n        elif self.unet_trainable is True or self.unet_trainable == \"all\":\n            print(\"Training the full unet\")\n            params = list(self.model.parameters())\n        else:\n            raise ValueError(f\"Unrecognised setting for unet_trainable: {self.unet_trainable}\")\n\n        if self.cond_stage_trainable:\n            print(f\"{self.__class__.__name__}: Also optimizing conditioner params!\")\n            params = params + list(self.cond_stage_model.parameters())\n        if self.learn_logvar:\n            print('Diffusion model optimizing logvar')\n            params.append(self.logvar)\n\n        if self.cc_projection is not None:\n            params = params + list(self.cc_projection.parameters())\n            print('========== optimizing for cc projection weight ==========')\n\n        opt = torch.optim.AdamW([{\"params\": self.model.parameters(), \"lr\": lr},\n                                {\"params\": self.cc_projection.parameters(), \"lr\": 10. * lr}], lr=lr)\n        if self.use_scheduler:\n            assert 'target' in self.scheduler_config\n            scheduler = instantiate_from_config(self.scheduler_config)\n\n            print(\"Setting up LambdaLR scheduler...\")\n            scheduler = [\n                {\n                    'scheduler': LambdaLR(opt, lr_lambda=scheduler.schedule),\n                    'interval': 'step',\n                    'frequency': 1\n                }]\n            return [opt], scheduler\n        return opt\n\n    @torch.no_grad()\n    def to_rgb(self, x):\n        x = x.float()\n        if not hasattr(self, \"colorize\"):\n            self.colorize = torch.randn(3, x.shape[1], 1, 1).to(x)\n        x = nn.functional.conv2d(x, weight=self.colorize)\n        x = 2. * (x - x.min()) / (x.max() - x.min()) - 1.\n        return x\n\n\nclass DiffusionWrapper(pl.LightningModule):\n    def __init__(self, diff_model_config, conditioning_key):\n        super().__init__()\n        self.diffusion_model = instantiate_from_config(diff_model_config)\n        self.conditioning_key = conditioning_key\n        assert self.conditioning_key in [None, 'concat', 'crossattn', 'hybrid', 'adm', 'hybrid-adm']\n\n    def forward(self, x, t, c_concat: list = None, c_crossattn: list = None, c_adm=None):\n        if self.conditioning_key is None:\n            out = self.diffusion_model(x, t)\n        elif self.conditioning_key == 'concat':\n            xc = torch.cat([x] + c_concat, dim=1)\n            out = self.diffusion_model(xc, t)\n        elif self.conditioning_key == 'crossattn':\n            # c_crossattn dimension:  torch.Size([8, 1, 768]) 1\n            # cc dimension:  torch.Size([8, 1, 768]\n            cc = torch.cat(c_crossattn, 1)\n            out = self.diffusion_model(x, t, context=cc)\n        elif self.conditioning_key == 'hybrid':\n            xc = torch.cat([x] + c_concat, dim=1)\n            cc = torch.cat(c_crossattn, 1)\n            out = self.diffusion_model(xc, t, context=cc)\n        elif self.conditioning_key == 'hybrid-adm':\n            assert c_adm is not None\n            xc = torch.cat([x] + c_concat, dim=1)\n            cc = torch.cat(c_crossattn, 1)\n            out = self.diffusion_model(xc, t, context=cc, y=c_adm)\n        elif self.conditioning_key == 'adm':\n            cc = c_crossattn[0]\n            out = self.diffusion_model(x, t, y=cc)\n        else:\n            raise NotImplementedError()\n\n        return out\n\n\nclass LatentUpscaleDiffusion(LatentDiffusion):\n    def __init__(self, *args, low_scale_config, low_scale_key=\"LR\", **kwargs):\n        super().__init__(*args, **kwargs)\n        # assumes that neither the cond_stage nor the low_scale_model contain trainable params\n        assert not self.cond_stage_trainable\n        self.instantiate_low_stage(low_scale_config)\n        self.low_scale_key = low_scale_key\n\n    def instantiate_low_stage(self, config):\n        model = instantiate_from_config(config)\n        self.low_scale_model = model.eval()\n        self.low_scale_model.train = disabled_train\n        for param in self.low_scale_model.parameters():\n            param.requires_grad = False\n\n    @torch.no_grad()\n    def get_input(self, batch, k, cond_key=None, bs=None, log_mode=False):\n        if not log_mode:\n            z, c = super().get_input(batch, k, force_c_encode=True, bs=bs)\n        else:\n            z, c, x, xrec, xc = super().get_input(batch, self.first_stage_key, return_first_stage_outputs=True,\n                                                  force_c_encode=True, return_original_cond=True, bs=bs)\n        x_low = batch[self.low_scale_key][:bs]\n        x_low = rearrange(x_low, 'b h w c -> b c h w')\n        x_low = x_low.to(memory_format=torch.contiguous_format).float()\n        zx, noise_level = self.low_scale_model(x_low)\n        all_conds = {\"c_concat\": [zx], \"c_crossattn\": [c], \"c_adm\": noise_level}\n        #import pudb; pu.db\n        if log_mode:\n            # TODO: maybe disable if too expensive\n            interpretability = False\n            if interpretability:\n                zx = zx[:, :, ::2, ::2]\n            x_low_rec = self.low_scale_model.decode(zx)\n            return z, all_conds, x, xrec, xc, x_low, x_low_rec, noise_level\n        return z, all_conds\n\n    @torch.no_grad()\n    def log_images(self, batch, N=8, n_row=4, sample=True, ddim_steps=200, ddim_eta=1., return_keys=None,\n                   plot_denoise_rows=False, plot_progressive_rows=True, plot_diffusion_rows=True,\n                   unconditional_guidance_scale=1., unconditional_guidance_label=None, use_ema_scope=True,\n                   **kwargs):\n        ema_scope = self.ema_scope if use_ema_scope else nullcontext\n        use_ddim = ddim_steps is not None\n\n        log = dict()\n        z, c, x, xrec, xc, x_low, x_low_rec, noise_level = self.get_input(batch, self.first_stage_key, bs=N,\n                                                                          log_mode=True)\n        N = min(x.shape[0], N)\n        n_row = min(x.shape[0], n_row)\n        log[\"inputs\"] = x\n        log[\"reconstruction\"] = xrec\n        log[\"x_lr\"] = x_low\n        log[f\"x_lr_rec_@noise_levels{'-'.join(map(lambda x: str(x), list(noise_level.cpu().numpy())))}\"] = x_low_rec\n        if self.model.conditioning_key is not None:\n            if hasattr(self.cond_stage_model, \"decode\"):\n                xc = self.cond_stage_model.decode(c)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key in [\"caption\", \"txt\"]:\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[self.cond_stage_key], size=x.shape[2]//25)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key == 'class_label':\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[\"human_label\"], size=x.shape[2]//25)\n                log['conditioning'] = xc\n            elif isimage(xc):\n                log[\"conditioning\"] = xc\n            if ismap(xc):\n                log[\"original_conditioning\"] = self.to_rgb(xc)\n\n        if plot_diffusion_rows:\n            # get diffusion row\n            diffusion_row = list()\n            z_start = z[:n_row]\n            for t in range(self.num_timesteps):\n                if t % self.log_every_t == 0 or t == self.num_timesteps - 1:\n                    t = repeat(torch.tensor([t]), '1 -> b', b=n_row)\n                    t = t.to(self.device).long()\n                    noise = torch.randn_like(z_start)\n                    z_noisy = self.q_sample(x_start=z_start, t=t, noise=noise)\n                    diffusion_row.append(self.decode_first_stage(z_noisy))\n\n            diffusion_row = torch.stack(diffusion_row)  # n_log_step, n_row, C, H, W\n            diffusion_grid = rearrange(diffusion_row, 'n b c h w -> b n c h w')\n            diffusion_grid = rearrange(diffusion_grid, 'b n c h w -> (b n) c h w')\n            diffusion_grid = make_grid(diffusion_grid, nrow=diffusion_row.shape[0])\n            log[\"diffusion_row\"] = diffusion_grid\n\n        if sample:\n            # get denoise row\n            with ema_scope(\"Sampling\"):\n                samples, z_denoise_row = self.sample_log(cond=c, batch_size=N, ddim=use_ddim,\n                                                         ddim_steps=ddim_steps, eta=ddim_eta)\n                # samples, z_denoise_row = self.sample(cond=c, batch_size=N, return_intermediates=True)\n            x_samples = self.decode_first_stage(samples)\n            log[\"samples\"] = x_samples\n            if plot_denoise_rows:\n                denoise_grid = self._get_denoise_row_from_list(z_denoise_row)\n                log[\"denoise_row\"] = denoise_grid\n\n        if unconditional_guidance_scale > 1.0:\n            uc_tmp = self.get_unconditional_conditioning(N, unconditional_guidance_label)\n            # TODO explore better \"unconditional\" choices for the other keys\n            # maybe guide away from empty text label and highest noise level and maximally degraded zx?\n            uc = dict()\n            for k in c:\n                if k == \"c_crossattn\":\n                    assert isinstance(c[k], list) and len(c[k]) == 1\n                    uc[k] = [uc_tmp]\n                elif k == \"c_adm\":  # todo: only run with text-based guidance?\n                    assert isinstance(c[k], torch.Tensor)\n                    uc[k] = torch.ones_like(c[k]) * self.low_scale_model.max_noise_level\n                elif isinstance(c[k], list):\n                    uc[k] = [c[k][i] for i in range(len(c[k]))]\n                else:\n                    uc[k] = c[k]\n\n            with ema_scope(\"Sampling with classifier-free guidance\"):\n                samples_cfg, _ = self.sample_log(cond=c, batch_size=N, ddim=use_ddim,\n                                                 ddim_steps=ddim_steps, eta=ddim_eta,\n                                                 unconditional_guidance_scale=unconditional_guidance_scale,\n                                                 unconditional_conditioning=uc,\n                                                 )\n                x_samples_cfg = self.decode_first_stage(samples_cfg)\n                log[f\"samples_cfg_scale_{unconditional_guidance_scale:.2f}\"] = x_samples_cfg\n\n        if plot_progressive_rows:\n            with ema_scope(\"Plotting Progressives\"):\n                img, progressives = self.progressive_denoising(c,\n                                                               shape=(self.channels, self.image_size, self.image_size),\n                                                               batch_size=N)\n            prog_row = self._get_denoise_row_from_list(progressives, desc=\"Progressive Generation\")\n            log[\"progressive_row\"] = prog_row\n\n        return log\n\n\nclass LatentInpaintDiffusion(LatentDiffusion):\n    \"\"\"\n    can either run as pure inpainting model (only concat mode) or with mixed conditionings,\n    e.g. mask as concat and text via cross-attn.\n    To disable finetuning mode, set finetune_keys to None\n     \"\"\"\n    def __init__(self,\n                 finetune_keys=(\"model.diffusion_model.input_blocks.0.0.weight\",\n                                \"model_ema.diffusion_modelinput_blocks00weight\"\n                                ),\n                 concat_keys=(\"mask\", \"masked_image\"),\n                 masked_image_key=\"masked_image\",\n                 keep_finetune_dims=4,  # if model was trained without concat mode before and we would like to keep these channels\n                 c_concat_log_start=None, # to log reconstruction of c_concat codes\n                 c_concat_log_end=None,\n                 *args, **kwargs\n                 ):\n        ckpt_path = kwargs.pop(\"ckpt_path\", None)\n        ignore_keys = kwargs.pop(\"ignore_keys\", list())\n        super().__init__(*args, **kwargs)\n        self.masked_image_key = masked_image_key\n        assert self.masked_image_key in concat_keys\n        self.finetune_keys = finetune_keys\n        self.concat_keys = concat_keys\n        self.keep_dims = keep_finetune_dims\n        self.c_concat_log_start = c_concat_log_start\n        self.c_concat_log_end = c_concat_log_end\n        if exists(self.finetune_keys): assert exists(ckpt_path), 'can only finetune from a given checkpoint'\n        if exists(ckpt_path):\n            self.init_from_ckpt(ckpt_path, ignore_keys)\n\n    def init_from_ckpt(self, path, ignore_keys=list(), only_model=False):\n        sd = torch.load(path, map_location=\"cpu\")\n        if \"state_dict\" in list(sd.keys()):\n            sd = sd[\"state_dict\"]\n        keys = list(sd.keys())\n        for k in keys:\n            for ik in ignore_keys:\n                if k.startswith(ik):\n                    print(\"Deleting key {} from state_dict.\".format(k))\n                    del sd[k]\n\n            # make it explicit, finetune by including extra input channels\n            if exists(self.finetune_keys) and k in self.finetune_keys:\n                new_entry = None\n                for name, param in self.named_parameters():\n                    if name in self.finetune_keys:\n                        print(f\"modifying key '{name}' and keeping its original {self.keep_dims} (channels) dimensions only\")\n                        new_entry = torch.zeros_like(param)  # zero init\n                assert exists(new_entry), 'did not find matching parameter to modify'\n                new_entry[:, :self.keep_dims, ...] = sd[k]\n                sd[k] = new_entry\n\n        missing, unexpected = self.load_state_dict(sd, strict=False) if not only_model else self.model.load_state_dict(sd, strict=False)\n        print(f\"Restored from {path} with {len(missing)} missing and {len(unexpected)} unexpected keys\")\n        if len(missing) > 0:\n            print(f\"Missing Keys: {missing}\")\n        if len(unexpected) > 0:\n            print(f\"Unexpected Keys: {unexpected}\")\n\n    @torch.no_grad()\n    def get_input(self, batch, k, cond_key=None, bs=None, return_first_stage_outputs=False):\n        # note: restricted to non-trainable encoders currently\n        assert not self.cond_stage_trainable, 'trainable cond stages not yet supported for inpainting'\n        z, c, x, xrec, xc = super().get_input(batch, self.first_stage_key, return_first_stage_outputs=True,\n                                              force_c_encode=True, return_original_cond=True, bs=bs)\n\n        assert exists(self.concat_keys)\n        c_cat = list()\n        for ck in self.concat_keys:\n            cc = rearrange(batch[ck], 'b h w c -> b c h w').to(memory_format=torch.contiguous_format).float()\n            if bs is not None:\n                cc = cc[:bs]\n                cc = cc.to(self.device)\n            bchw = z.shape\n            if ck != self.masked_image_key:\n                cc = torch.nn.functional.interpolate(cc, size=bchw[-2:])\n            else:\n                cc = self.get_first_stage_encoding(self.encode_first_stage(cc))\n            c_cat.append(cc)\n        c_cat = torch.cat(c_cat, dim=1)\n        all_conds = {\"c_concat\": [c_cat], \"c_crossattn\": [c]}\n        if return_first_stage_outputs:\n            return z, all_conds, x, xrec, xc\n        return z, all_conds\n\n    @torch.no_grad()\n    def log_images(self, batch, N=8, n_row=4, sample=True, ddim_steps=200, ddim_eta=1., return_keys=None,\n                   quantize_denoised=True, inpaint=True, plot_denoise_rows=False, plot_progressive_rows=True,\n                   plot_diffusion_rows=True, unconditional_guidance_scale=1., unconditional_guidance_label=None,\n                   use_ema_scope=True,\n                   **kwargs):\n        ema_scope = self.ema_scope if use_ema_scope else nullcontext\n        use_ddim = ddim_steps is not None\n\n        log = dict()\n        z, c, x, xrec, xc = self.get_input(batch, self.first_stage_key, bs=N, return_first_stage_outputs=True)\n        c_cat, c = c[\"c_concat\"][0], c[\"c_crossattn\"][0]\n        N = min(x.shape[0], N)\n        n_row = min(x.shape[0], n_row)\n        log[\"inputs\"] = x\n        log[\"reconstruction\"] = xrec\n        if self.model.conditioning_key is not None:\n            if hasattr(self.cond_stage_model, \"decode\"):\n                xc = self.cond_stage_model.decode(c)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key in [\"caption\", \"txt\"]:\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[self.cond_stage_key], size=x.shape[2] // 25)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key == 'class_label':\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[\"human_label\"], size=x.shape[2] // 25)\n                log['conditioning'] = xc\n            elif isimage(xc):\n                log[\"conditioning\"] = xc\n            if ismap(xc):\n                log[\"original_conditioning\"] = self.to_rgb(xc)\n\n        if not (self.c_concat_log_start is None and self.c_concat_log_end is None):\n            log[\"c_concat_decoded\"] = self.decode_first_stage(c_cat[:,self.c_concat_log_start:self.c_concat_log_end])\n\n        if plot_diffusion_rows:\n            # get diffusion row\n            diffusion_row = list()\n            z_start = z[:n_row]\n            for t in range(self.num_timesteps):\n                if t % self.log_every_t == 0 or t == self.num_timesteps - 1:\n                    t = repeat(torch.tensor([t]), '1 -> b', b=n_row)\n                    t = t.to(self.device).long()\n                    noise = torch.randn_like(z_start)\n                    z_noisy = self.q_sample(x_start=z_start, t=t, noise=noise)\n                    diffusion_row.append(self.decode_first_stage(z_noisy))\n\n            diffusion_row = torch.stack(diffusion_row)  # n_log_step, n_row, C, H, W\n            diffusion_grid = rearrange(diffusion_row, 'n b c h w -> b n c h w')\n            diffusion_grid = rearrange(diffusion_grid, 'b n c h w -> (b n) c h w')\n            diffusion_grid = make_grid(diffusion_grid, nrow=diffusion_row.shape[0])\n            log[\"diffusion_row\"] = diffusion_grid\n\n        if sample:\n            # get denoise row\n            with ema_scope(\"Sampling\"):\n                samples, z_denoise_row = self.sample_log(cond={\"c_concat\": [c_cat], \"c_crossattn\": [c]},\n                                                         batch_size=N, ddim=use_ddim,\n                                                         ddim_steps=ddim_steps, eta=ddim_eta)\n                # samples, z_denoise_row = self.sample(cond=c, batch_size=N, return_intermediates=True)\n            x_samples = self.decode_first_stage(samples)\n            log[\"samples\"] = x_samples\n            if plot_denoise_rows:\n                denoise_grid = self._get_denoise_row_from_list(z_denoise_row)\n                log[\"denoise_row\"] = denoise_grid\n\n        if unconditional_guidance_scale > 1.0:\n            uc_cross = self.get_unconditional_conditioning(N, unconditional_guidance_label)\n            uc_cat = c_cat\n            uc_full = {\"c_concat\": [uc_cat], \"c_crossattn\": [uc_cross]}\n            with ema_scope(\"Sampling with classifier-free guidance\"):\n                samples_cfg, _ = self.sample_log(cond={\"c_concat\": [c_cat], \"c_crossattn\": [c]},\n                                                 batch_size=N, ddim=use_ddim,\n                                                 ddim_steps=ddim_steps, eta=ddim_eta,\n                                                 unconditional_guidance_scale=unconditional_guidance_scale,\n                                                 unconditional_conditioning=uc_full,\n                                                 )\n                x_samples_cfg = self.decode_first_stage(samples_cfg)\n                log[f\"samples_cfg_scale_{unconditional_guidance_scale:.2f}\"] = x_samples_cfg\n\n        log[\"masked_image\"] = rearrange(batch[\"masked_image\"],\n                                        'b h w c -> b c h w').to(memory_format=torch.contiguous_format).float()\n        return log\n\n\nclass Layout2ImgDiffusion(LatentDiffusion):\n    # TODO: move all layout-specific hacks to this class\n    def __init__(self, cond_stage_key, *args, **kwargs):\n        assert cond_stage_key == 'coordinates_bbox', 'Layout2ImgDiffusion only for cond_stage_key=\"coordinates_bbox\"'\n        super().__init__(cond_stage_key=cond_stage_key, *args, **kwargs)\n\n    def log_images(self, batch, N=8, *args, **kwargs):\n        logs = super().log_images(batch=batch, N=N, *args, **kwargs)\n\n        key = 'train' if self.training else 'validation'\n        dset = self.trainer.datamodule.datasets[key]\n        mapper = dset.conditional_builders[self.cond_stage_key]\n\n        bbox_imgs = []\n        map_fn = lambda catno: dset.get_textual_label(dset.get_category_id(catno))\n        for tknzd_bbox in batch[self.cond_stage_key][:N]:\n            bboximg = mapper.plot(tknzd_bbox.detach().cpu(), map_fn, (256, 256))\n            bbox_imgs.append(bboximg)\n\n        cond_img = torch.stack(bbox_imgs, dim=0)\n        logs['bbox_image'] = cond_img\n        return logs\n\n\nclass SimpleUpscaleDiffusion(LatentDiffusion):\n    def __init__(self, *args, low_scale_key=\"LR\", **kwargs):\n        super().__init__(*args, **kwargs)\n        # assumes that neither the cond_stage nor the low_scale_model contain trainable params\n        assert not self.cond_stage_trainable\n        self.low_scale_key = low_scale_key\n\n    @torch.no_grad()\n    def get_input(self, batch, k, cond_key=None, bs=None, log_mode=False):\n        if not log_mode:\n            z, c = super().get_input(batch, k, force_c_encode=True, bs=bs)\n        else:\n            z, c, x, xrec, xc = super().get_input(batch, self.first_stage_key, return_first_stage_outputs=True,\n                                                  force_c_encode=True, return_original_cond=True, bs=bs)\n        x_low = batch[self.low_scale_key][:bs]\n        x_low = rearrange(x_low, 'b h w c -> b c h w')\n        x_low = x_low.to(memory_format=torch.contiguous_format).float()\n\n        encoder_posterior = self.encode_first_stage(x_low)\n        zx = self.get_first_stage_encoding(encoder_posterior).detach()\n        all_conds = {\"c_concat\": [zx], \"c_crossattn\": [c]}\n\n        if log_mode:\n            # TODO: maybe disable if too expensive\n            interpretability = False\n            if interpretability:\n                zx = zx[:, :, ::2, ::2]\n            return z, all_conds, x, xrec, xc, x_low\n        return z, all_conds\n\n    @torch.no_grad()\n    def log_images(self, batch, N=8, n_row=4, sample=True, ddim_steps=200, ddim_eta=1., return_keys=None,\n                   plot_denoise_rows=False, plot_progressive_rows=True, plot_diffusion_rows=True,\n                   unconditional_guidance_scale=1., unconditional_guidance_label=None, use_ema_scope=True,\n                   **kwargs):\n        ema_scope = self.ema_scope if use_ema_scope else nullcontext\n        use_ddim = ddim_steps is not None\n\n        log = dict()\n        z, c, x, xrec, xc, x_low = self.get_input(batch, self.first_stage_key, bs=N, log_mode=True)\n        N = min(x.shape[0], N)\n        n_row = min(x.shape[0], n_row)\n        log[\"inputs\"] = x\n        log[\"reconstruction\"] = xrec\n        log[\"x_lr\"] = x_low\n\n        if self.model.conditioning_key is not None:\n            if hasattr(self.cond_stage_model, \"decode\"):\n                xc = self.cond_stage_model.decode(c)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key in [\"caption\", \"txt\"]:\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[self.cond_stage_key], size=x.shape[2]//25)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key == 'class_label':\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[\"human_label\"], size=x.shape[2]//25)\n                log['conditioning'] = xc\n            elif isimage(xc):\n                log[\"conditioning\"] = xc\n            if ismap(xc):\n                log[\"original_conditioning\"] = self.to_rgb(xc)\n\n        if sample:\n            # get denoise row\n            with ema_scope(\"Sampling\"):\n                samples, z_denoise_row = self.sample_log(cond=c, batch_size=N, ddim=use_ddim,\n                                                         ddim_steps=ddim_steps, eta=ddim_eta)\n                # samples, z_denoise_row = self.sample(cond=c, batch_size=N, return_intermediates=True)\n            x_samples = self.decode_first_stage(samples)\n            log[\"samples\"] = x_samples\n\n        if unconditional_guidance_scale > 1.0:\n            uc_tmp = self.get_unconditional_conditioning(N, unconditional_guidance_label)\n            uc = dict()\n            for k in c:\n                if k == \"c_crossattn\":\n                    assert isinstance(c[k], list) and len(c[k]) == 1\n                    uc[k] = [uc_tmp]\n                elif isinstance(c[k], list):\n                    uc[k] = [c[k][i] for i in range(len(c[k]))]\n                else:\n                    uc[k] = c[k]\n\n            with ema_scope(\"Sampling with classifier-free guidance\"):\n                samples_cfg, _ = self.sample_log(cond=c, batch_size=N, ddim=use_ddim,\n                                                 ddim_steps=ddim_steps, eta=ddim_eta,\n                                                 unconditional_guidance_scale=unconditional_guidance_scale,\n                                                 unconditional_conditioning=uc,\n                                                 )\n                x_samples_cfg = self.decode_first_stage(samples_cfg)\n                log[f\"samples_cfg_scale_{unconditional_guidance_scale:.2f}\"] = x_samples_cfg\n        return log\n\nclass MultiCatFrameDiffusion(LatentDiffusion):\n    def __init__(self, *args, low_scale_key=\"LR\", **kwargs):\n        super().__init__(*args, **kwargs)\n        # assumes that neither the cond_stage nor the low_scale_model contain trainable params\n        assert not self.cond_stage_trainable\n        self.low_scale_key = low_scale_key\n\n    @torch.no_grad()\n    def get_input(self, batch, k, cond_key=None, bs=None, log_mode=False):\n        n = 2\n        if not log_mode:\n            z, c = super().get_input(batch, k, force_c_encode=True, bs=bs)\n        else:\n            z, c, x, xrec, xc = super().get_input(batch, self.first_stage_key, return_first_stage_outputs=True,\n                                                  force_c_encode=True, return_original_cond=True, bs=bs)\n        cat_conds = batch[self.low_scale_key][:bs]\n        cats = []\n        for i in range(n):\n            x_low = cat_conds[:,:,:,3*i:3*(i+1)]\n            x_low = rearrange(x_low, 'b h w c -> b c h w')\n            x_low = x_low.to(memory_format=torch.contiguous_format).float()\n            encoder_posterior = self.encode_first_stage(x_low)\n            zx = self.get_first_stage_encoding(encoder_posterior).detach()\n            cats.append(zx)\n\n        all_conds = {\"c_concat\": [torch.cat(cats, dim=1)], \"c_crossattn\": [c]}\n\n        if log_mode:\n            # TODO: maybe disable if too expensive\n            interpretability = False\n            if interpretability:\n                zx = zx[:, :, ::2, ::2]\n            return z, all_conds, x, xrec, xc, x_low\n        return z, all_conds\n\n    @torch.no_grad()\n    def log_images(self, batch, N=8, n_row=4, sample=True, ddim_steps=200, ddim_eta=1., return_keys=None,\n                   plot_denoise_rows=False, plot_progressive_rows=True, plot_diffusion_rows=True,\n                   unconditional_guidance_scale=1., unconditional_guidance_label=None, use_ema_scope=True,\n                   **kwargs):\n        ema_scope = self.ema_scope if use_ema_scope else nullcontext\n        use_ddim = ddim_steps is not None\n\n        log = dict()\n        z, c, x, xrec, xc, x_low = self.get_input(batch, self.first_stage_key, bs=N, log_mode=True)\n        N = min(x.shape[0], N)\n        n_row = min(x.shape[0], n_row)\n        log[\"inputs\"] = x\n        log[\"reconstruction\"] = xrec\n        log[\"x_lr\"] = x_low\n\n        if self.model.conditioning_key is not None:\n            if hasattr(self.cond_stage_model, \"decode\"):\n                xc = self.cond_stage_model.decode(c)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key in [\"caption\", \"txt\"]:\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[self.cond_stage_key], size=x.shape[2]//25)\n                log[\"conditioning\"] = xc\n            elif self.cond_stage_key == 'class_label':\n                xc = log_txt_as_img((x.shape[2], x.shape[3]), batch[\"human_label\"], size=x.shape[2]//25)\n                log['conditioning'] = xc\n            elif isimage(xc):\n                log[\"conditioning\"] = xc\n            if ismap(xc):\n                log[\"original_conditioning\"] = self.to_rgb(xc)\n\n        if sample:\n            # get denoise row\n            with ema_scope(\"Sampling\"):\n                samples, z_denoise_row = self.sample_log(cond=c, batch_size=N, ddim=use_ddim,\n                                                         ddim_steps=ddim_steps, eta=ddim_eta)\n                # samples, z_denoise_row = self.sample(cond=c, batch_size=N, return_intermediates=True)\n            x_samples = self.decode_first_stage(samples)\n            log[\"samples\"] = x_samples\n\n        if unconditional_guidance_scale > 1.0:\n            uc_tmp = self.get_unconditional_conditioning(N, unconditional_guidance_label)\n            uc = dict()\n            for k in c:\n                if k == \"c_crossattn\":\n                    assert isinstance(c[k], list) and len(c[k]) == 1\n                    uc[k] = [uc_tmp]\n                elif isinstance(c[k], list):\n                    uc[k] = [c[k][i] for i in range(len(c[k]))]\n                else:\n                    uc[k] = c[k]\n\n            with ema_scope(\"Sampling with classifier-free guidance\"):\n                samples_cfg, _ = self.sample_log(cond=c, batch_size=N, ddim=use_ddim,\n                                                 ddim_steps=ddim_steps, eta=ddim_eta,\n                                                 unconditional_guidance_scale=unconditional_guidance_scale,\n                                                 unconditional_conditioning=uc,\n                                                 )\n                x_samples_cfg = self.decode_first_stage(samples_cfg)\n                log[f\"samples_cfg_scale_{unconditional_guidance_scale:.2f}\"] = x_samples_cfg\n        return log\n"
  },
  {
    "path": "stable-dreamfusion/ldm/models/diffusion/plms.py",
    "content": "\"\"\"SAMPLING ONLY.\"\"\"\n\nimport torch\nimport numpy as np\nfrom tqdm import tqdm\nfrom functools import partial\n\nfrom ldm.modules.diffusionmodules.util import make_ddim_sampling_parameters, make_ddim_timesteps, noise_like\nfrom ldm.models.diffusion.sampling_util import norm_thresholding\n\n\nclass PLMSSampler(object):\n    def __init__(self, model, schedule=\"linear\", **kwargs):\n        super().__init__()\n        self.model = model\n        self.ddpm_num_timesteps = model.num_timesteps\n        self.schedule = schedule\n\n    def register_buffer(self, name, attr):\n        if type(attr) == torch.Tensor:\n            if attr.device != torch.device(\"cuda\"):\n                attr = attr.to(torch.device(\"cuda\"))\n        setattr(self, name, attr)\n\n    def make_schedule(self, ddim_num_steps, ddim_discretize=\"uniform\", ddim_eta=0., verbose=True):\n        if ddim_eta != 0:\n            raise ValueError('ddim_eta must be 0 for PLMS')\n        self.ddim_timesteps = make_ddim_timesteps(ddim_discr_method=ddim_discretize, num_ddim_timesteps=ddim_num_steps,\n                                                  num_ddpm_timesteps=self.ddpm_num_timesteps,verbose=verbose)\n        alphas_cumprod = self.model.alphas_cumprod\n        assert alphas_cumprod.shape[0] == self.ddpm_num_timesteps, 'alphas have to be defined for each timestep'\n        to_torch = lambda x: x.clone().detach().to(torch.float32).to(self.model.device)\n\n        self.register_buffer('betas', to_torch(self.model.betas))\n        self.register_buffer('alphas_cumprod', to_torch(alphas_cumprod))\n        self.register_buffer('alphas_cumprod_prev', to_torch(self.model.alphas_cumprod_prev))\n\n        # calculations for diffusion q(x_t | x_{t-1}) and others\n        self.register_buffer('sqrt_alphas_cumprod', to_torch(np.sqrt(alphas_cumprod.cpu())))\n        self.register_buffer('sqrt_one_minus_alphas_cumprod', to_torch(np.sqrt(1. - alphas_cumprod.cpu())))\n        self.register_buffer('log_one_minus_alphas_cumprod', to_torch(np.log(1. - alphas_cumprod.cpu())))\n        self.register_buffer('sqrt_recip_alphas_cumprod', to_torch(np.sqrt(1. / alphas_cumprod.cpu())))\n        self.register_buffer('sqrt_recipm1_alphas_cumprod', to_torch(np.sqrt(1. / alphas_cumprod.cpu() - 1)))\n\n        # ddim sampling parameters\n        ddim_sigmas, ddim_alphas, ddim_alphas_prev = make_ddim_sampling_parameters(alphacums=alphas_cumprod.cpu(),\n                                                                                   ddim_timesteps=self.ddim_timesteps,\n                                                                                   eta=ddim_eta,verbose=verbose)\n        self.register_buffer('ddim_sigmas', ddim_sigmas)\n        self.register_buffer('ddim_alphas', ddim_alphas)\n        self.register_buffer('ddim_alphas_prev', ddim_alphas_prev)\n        self.register_buffer('ddim_sqrt_one_minus_alphas', np.sqrt(1. - ddim_alphas))\n        sigmas_for_original_sampling_steps = ddim_eta * torch.sqrt(\n            (1 - self.alphas_cumprod_prev) / (1 - self.alphas_cumprod) * (\n                        1 - self.alphas_cumprod / self.alphas_cumprod_prev))\n        self.register_buffer('ddim_sigmas_for_original_num_steps', sigmas_for_original_sampling_steps)\n\n    @torch.no_grad()\n    def sample(self,\n               S,\n               batch_size,\n               shape,\n               conditioning=None,\n               callback=None,\n               normals_sequence=None,\n               img_callback=None,\n               quantize_x0=False,\n               eta=0.,\n               mask=None,\n               x0=None,\n               temperature=1.,\n               noise_dropout=0.,\n               score_corrector=None,\n               corrector_kwargs=None,\n               verbose=True,\n               x_T=None,\n               log_every_t=100,\n               unconditional_guidance_scale=1.,\n               unconditional_conditioning=None,\n               # this has to come in the same format as the conditioning, # e.g. as encoded tokens, ...\n               dynamic_threshold=None,\n               **kwargs\n               ):\n        if conditioning is not None:\n            if isinstance(conditioning, dict):\n                ctmp = conditioning[list(conditioning.keys())[0]]\n                while isinstance(ctmp, list): ctmp = ctmp[0]\n                cbs = ctmp.shape[0]\n                if cbs != batch_size:\n                    print(f\"Warning: Got {cbs} conditionings but batch-size is {batch_size}\")\n            else:\n                if conditioning.shape[0] != batch_size:\n                    print(f\"Warning: Got {conditioning.shape[0]} conditionings but batch-size is {batch_size}\")\n\n        self.make_schedule(ddim_num_steps=S, ddim_eta=eta, verbose=verbose)\n        # sampling\n        C, H, W = shape\n        size = (batch_size, C, H, W)\n        print(f'Data shape for PLMS sampling is {size}')\n\n        samples, intermediates = self.plms_sampling(conditioning, size,\n                                                    callback=callback,\n                                                    img_callback=img_callback,\n                                                    quantize_denoised=quantize_x0,\n                                                    mask=mask, x0=x0,\n                                                    ddim_use_original_steps=False,\n                                                    noise_dropout=noise_dropout,\n                                                    temperature=temperature,\n                                                    score_corrector=score_corrector,\n                                                    corrector_kwargs=corrector_kwargs,\n                                                    x_T=x_T,\n                                                    log_every_t=log_every_t,\n                                                    unconditional_guidance_scale=unconditional_guidance_scale,\n                                                    unconditional_conditioning=unconditional_conditioning,\n                                                    dynamic_threshold=dynamic_threshold,\n                                                    )\n        return samples, intermediates\n\n    @torch.no_grad()\n    def plms_sampling(self, cond, shape,\n                      x_T=None, ddim_use_original_steps=False,\n                      callback=None, timesteps=None, quantize_denoised=False,\n                      mask=None, x0=None, img_callback=None, log_every_t=100,\n                      temperature=1., noise_dropout=0., score_corrector=None, corrector_kwargs=None,\n                      unconditional_guidance_scale=1., unconditional_conditioning=None,\n                      dynamic_threshold=None):\n        device = self.model.betas.device\n        b = shape[0]\n        if x_T is None:\n            img = torch.randn(shape, device=device)\n        else:\n            img = x_T\n\n        if timesteps is None:\n            timesteps = self.ddpm_num_timesteps if ddim_use_original_steps else self.ddim_timesteps\n        elif timesteps is not None and not ddim_use_original_steps:\n            subset_end = int(min(timesteps / self.ddim_timesteps.shape[0], 1) * self.ddim_timesteps.shape[0]) - 1\n            timesteps = self.ddim_timesteps[:subset_end]\n\n        intermediates = {'x_inter': [img], 'pred_x0': [img]}\n        time_range = list(reversed(range(0,timesteps))) if ddim_use_original_steps else np.flip(timesteps)\n        total_steps = timesteps if ddim_use_original_steps else timesteps.shape[0]\n        print(f\"Running PLMS Sampling with {total_steps} timesteps\")\n\n        iterator = tqdm(time_range, desc='PLMS Sampler', total=total_steps)\n        old_eps = []\n\n        for i, step in enumerate(iterator):\n            index = total_steps - i - 1\n            ts = torch.full((b,), step, device=device, dtype=torch.long)\n            ts_next = torch.full((b,), time_range[min(i + 1, len(time_range) - 1)], device=device, dtype=torch.long)\n\n            if mask is not None:\n                assert x0 is not None\n                img_orig = self.model.q_sample(x0, ts)  # TODO: deterministic forward pass?\n                img = img_orig * mask + (1. - mask) * img\n\n            outs = self.p_sample_plms(img, cond, ts, index=index, use_original_steps=ddim_use_original_steps,\n                                      quantize_denoised=quantize_denoised, temperature=temperature,\n                                      noise_dropout=noise_dropout, score_corrector=score_corrector,\n                                      corrector_kwargs=corrector_kwargs,\n                                      unconditional_guidance_scale=unconditional_guidance_scale,\n                                      unconditional_conditioning=unconditional_conditioning,\n                                      old_eps=old_eps, t_next=ts_next,\n                                      dynamic_threshold=dynamic_threshold)\n            img, pred_x0, e_t = outs\n            old_eps.append(e_t)\n            if len(old_eps) >= 4:\n                old_eps.pop(0)\n            if callback: callback(i)\n            if img_callback: img_callback(pred_x0, i)\n\n            if index % log_every_t == 0 or index == total_steps - 1:\n                intermediates['x_inter'].append(img)\n                intermediates['pred_x0'].append(pred_x0)\n\n        return img, intermediates\n\n    @torch.no_grad()\n    def p_sample_plms(self, x, c, t, index, repeat_noise=False, use_original_steps=False, quantize_denoised=False,\n                      temperature=1., noise_dropout=0., score_corrector=None, corrector_kwargs=None,\n                      unconditional_guidance_scale=1., unconditional_conditioning=None, old_eps=None, t_next=None,\n                      dynamic_threshold=None):\n        b, *_, device = *x.shape, x.device\n\n        def get_model_output(x, t):\n            if unconditional_conditioning is None or unconditional_guidance_scale == 1.:\n                e_t = self.model.apply_model(x, t, c)\n            else:\n                x_in = torch.cat([x] * 2)\n                t_in = torch.cat([t] * 2)\n                if isinstance(c, dict):\n                    assert isinstance(unconditional_conditioning, dict)\n                    c_in = dict()\n                    for k in c:\n                        if isinstance(c[k], list):\n                            c_in[k] = [torch.cat([\n                                unconditional_conditioning[k][i],\n                                c[k][i]]) for i in range(len(c[k]))]\n                        else:\n                            c_in[k] = torch.cat([\n                                    unconditional_conditioning[k],\n                                    c[k]])\n                else:\n                    c_in = torch.cat([unconditional_conditioning, c])\n                e_t_uncond, e_t = self.model.apply_model(x_in, t_in, c_in).chunk(2)\n                e_t = e_t_uncond + unconditional_guidance_scale * (e_t - e_t_uncond)\n\n            if score_corrector is not None:\n                assert self.model.parameterization == \"eps\"\n                e_t = score_corrector.modify_score(self.model, e_t, x, t, c, **corrector_kwargs)\n\n            return e_t\n\n        alphas = self.model.alphas_cumprod if use_original_steps else self.ddim_alphas\n        alphas_prev = self.model.alphas_cumprod_prev if use_original_steps else self.ddim_alphas_prev\n        sqrt_one_minus_alphas = self.model.sqrt_one_minus_alphas_cumprod if use_original_steps else self.ddim_sqrt_one_minus_alphas\n        sigmas = self.model.ddim_sigmas_for_original_num_steps if use_original_steps else self.ddim_sigmas\n\n        def get_x_prev_and_pred_x0(e_t, index):\n            # select parameters corresponding to the currently considered timestep\n            a_t = torch.full((b, 1, 1, 1), alphas[index], device=device)\n            a_prev = torch.full((b, 1, 1, 1), alphas_prev[index], device=device)\n            sigma_t = torch.full((b, 1, 1, 1), sigmas[index], device=device)\n            sqrt_one_minus_at = torch.full((b, 1, 1, 1), sqrt_one_minus_alphas[index],device=device)\n\n            # current prediction for x_0\n            pred_x0 = (x - sqrt_one_minus_at * e_t) / a_t.sqrt()\n            if quantize_denoised:\n                pred_x0, _, *_ = self.model.first_stage_model.quantize(pred_x0)\n            if dynamic_threshold is not None:\n                pred_x0 = norm_thresholding(pred_x0, dynamic_threshold)\n            # direction pointing to x_t\n            dir_xt = (1. - a_prev - sigma_t**2).sqrt() * e_t\n            noise = sigma_t * noise_like(x.shape, device, repeat_noise) * temperature\n            if noise_dropout > 0.:\n                noise = torch.nn.functional.dropout(noise, p=noise_dropout)\n            x_prev = a_prev.sqrt() * pred_x0 + dir_xt + noise\n            return x_prev, pred_x0\n\n        e_t = get_model_output(x, t)\n        if len(old_eps) == 0:\n            # Pseudo Improved Euler (2nd order)\n            x_prev, pred_x0 = get_x_prev_and_pred_x0(e_t, index)\n            e_t_next = get_model_output(x_prev, t_next)\n            e_t_prime = (e_t + e_t_next) / 2\n        elif len(old_eps) == 1:\n            # 2nd order Pseudo Linear Multistep (Adams-Bashforth)\n            e_t_prime = (3 * e_t - old_eps[-1]) / 2\n        elif len(old_eps) == 2:\n            # 3nd order Pseudo Linear Multistep (Adams-Bashforth)\n            e_t_prime = (23 * e_t - 16 * old_eps[-1] + 5 * old_eps[-2]) / 12\n        elif len(old_eps) >= 3:\n            # 4nd order Pseudo Linear Multistep (Adams-Bashforth)\n            e_t_prime = (55 * e_t - 59 * old_eps[-1] + 37 * old_eps[-2] - 9 * old_eps[-3]) / 24\n\n        x_prev, pred_x0 = get_x_prev_and_pred_x0(e_t_prime, index)\n\n        return x_prev, pred_x0, e_t\n"
  },
  {
    "path": "stable-dreamfusion/ldm/models/diffusion/sampling_util.py",
    "content": "import torch\nimport numpy as np\n\n\ndef append_dims(x, target_dims):\n    \"\"\"Appends dimensions to the end of a tensor until it has target_dims dimensions.\n    From https://github.com/crowsonkb/k-diffusion/blob/master/k_diffusion/utils.py\"\"\"\n    dims_to_append = target_dims - x.ndim\n    if dims_to_append < 0:\n        raise ValueError(f'input has {x.ndim} dims but target_dims is {target_dims}, which is less')\n    return x[(...,) + (None,) * dims_to_append]\n\n\ndef renorm_thresholding(x0, value):\n    # renorm\n    pred_max = x0.max()\n    pred_min = x0.min()\n    pred_x0 = (x0 - pred_min) / (pred_max - pred_min)  # 0 ... 1\n    pred_x0 = 2 * pred_x0 - 1.  # -1 ... 1\n\n    s = torch.quantile(\n        rearrange(pred_x0, 'b ... -> b (...)').abs(),\n        value,\n        dim=-1\n    )\n    s.clamp_(min=1.0)\n    s = s.view(-1, *((1,) * (pred_x0.ndim - 1)))\n\n    # clip by threshold\n    # pred_x0 = pred_x0.clamp(-s, s) / s  # needs newer pytorch  # TODO bring back to pure-gpu with min/max\n\n    # temporary hack: numpy on cpu\n    pred_x0 = np.clip(pred_x0.cpu().numpy(), -s.cpu().numpy(), s.cpu().numpy()) / s.cpu().numpy()\n    pred_x0 = torch.tensor(pred_x0).to(self.model.device)\n\n    # re.renorm\n    pred_x0 = (pred_x0 + 1.) / 2.  # 0 ... 1\n    pred_x0 = (pred_max - pred_min) * pred_x0 + pred_min  # orig range\n    return pred_x0\n\n\ndef norm_thresholding(x0, value):\n    s = append_dims(x0.pow(2).flatten(1).mean(1).sqrt().clamp(min=value), x0.ndim)\n    return x0 * (value / s)\n\n\ndef spatial_norm_thresholding(x0, value):\n    # b c h w\n    s = x0.pow(2).mean(1, keepdim=True).sqrt().clamp(min=value)\n    return x0 * (value / s)"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/attention.py",
    "content": "from inspect import isfunction\nimport math\nimport torch\nimport torch.nn.functional as F\nfrom torch import nn, einsum\nfrom einops import rearrange, repeat\n\nfrom ldm.modules.diffusionmodules.util import checkpoint\n\n\ndef exists(val):\n    return val is not None\n\n\ndef uniq(arr):\n    return{el: True for el in arr}.keys()\n\n\ndef default(val, d):\n    if exists(val):\n        return val\n    return d() if isfunction(d) else d\n\n\ndef max_neg_value(t):\n    return -torch.finfo(t.dtype).max\n\n\ndef init_(tensor):\n    dim = tensor.shape[-1]\n    std = 1 / math.sqrt(dim)\n    tensor.uniform_(-std, std)\n    return tensor\n\n\n# feedforward\nclass GEGLU(nn.Module):\n    def __init__(self, dim_in, dim_out):\n        super().__init__()\n        self.proj = nn.Linear(dim_in, dim_out * 2)\n\n    def forward(self, x):\n        x, gate = self.proj(x).chunk(2, dim=-1)\n        return x * F.gelu(gate)\n\n\nclass FeedForward(nn.Module):\n    def __init__(self, dim, dim_out=None, mult=4, glu=False, dropout=0.):\n        super().__init__()\n        inner_dim = int(dim * mult)\n        dim_out = default(dim_out, dim)\n        project_in = nn.Sequential(\n            nn.Linear(dim, inner_dim),\n            nn.GELU()\n        ) if not glu else GEGLU(dim, inner_dim)\n\n        self.net = nn.Sequential(\n            project_in,\n            nn.Dropout(dropout),\n            nn.Linear(inner_dim, dim_out)\n        )\n\n    def forward(self, x):\n        return self.net(x)\n\n\ndef zero_module(module):\n    \"\"\"\n    Zero out the parameters of a module and return it.\n    \"\"\"\n    for p in module.parameters():\n        p.detach().zero_()\n    return module\n\n\ndef Normalize(in_channels):\n    return torch.nn.GroupNorm(num_groups=32, num_channels=in_channels, eps=1e-6, affine=True)\n\n\nclass LinearAttention(nn.Module):\n    def __init__(self, dim, heads=4, dim_head=32):\n        super().__init__()\n        self.heads = heads\n        hidden_dim = dim_head * heads\n        self.to_qkv = nn.Conv2d(dim, hidden_dim * 3, 1, bias = False)\n        self.to_out = nn.Conv2d(hidden_dim, dim, 1)\n\n    def forward(self, x):\n        b, c, h, w = x.shape\n        qkv = self.to_qkv(x)\n        q, k, v = rearrange(qkv, 'b (qkv heads c) h w -> qkv b heads c (h w)', heads = self.heads, qkv=3)\n        k = k.softmax(dim=-1)  \n        context = torch.einsum('bhdn,bhen->bhde', k, v)\n        out = torch.einsum('bhde,bhdn->bhen', context, q)\n        out = rearrange(out, 'b heads c (h w) -> b (heads c) h w', heads=self.heads, h=h, w=w)\n        return self.to_out(out)\n\n\nclass SpatialSelfAttention(nn.Module):\n    def __init__(self, in_channels):\n        super().__init__()\n        self.in_channels = in_channels\n\n        self.norm = Normalize(in_channels)\n        self.q = torch.nn.Conv2d(in_channels,\n                                 in_channels,\n                                 kernel_size=1,\n                                 stride=1,\n                                 padding=0)\n        self.k = torch.nn.Conv2d(in_channels,\n                                 in_channels,\n                                 kernel_size=1,\n                                 stride=1,\n                                 padding=0)\n        self.v = torch.nn.Conv2d(in_channels,\n                                 in_channels,\n                                 kernel_size=1,\n                                 stride=1,\n                                 padding=0)\n        self.proj_out = torch.nn.Conv2d(in_channels,\n                                        in_channels,\n                                        kernel_size=1,\n                                        stride=1,\n                                        padding=0)\n\n    def forward(self, x):\n        h_ = x\n        h_ = self.norm(h_)\n        q = self.q(h_)\n        k = self.k(h_)\n        v = self.v(h_)\n\n        # compute attention\n        b,c,h,w = q.shape\n        q = rearrange(q, 'b c h w -> b (h w) c')\n        k = rearrange(k, 'b c h w -> b c (h w)')\n        w_ = torch.einsum('bij,bjk->bik', q, k)\n\n        w_ = w_ * (int(c)**(-0.5))\n        w_ = torch.nn.functional.softmax(w_, dim=2)\n\n        # attend to values\n        v = rearrange(v, 'b c h w -> b c (h w)')\n        w_ = rearrange(w_, 'b i j -> b j i')\n        h_ = torch.einsum('bij,bjk->bik', v, w_)\n        h_ = rearrange(h_, 'b c (h w) -> b c h w', h=h)\n        h_ = self.proj_out(h_)\n\n        return x+h_\n\n\nclass CrossAttention(nn.Module):\n    def __init__(self, query_dim, context_dim=None, heads=8, dim_head=64, dropout=0.):\n        super().__init__()\n        inner_dim = dim_head * heads\n        context_dim = default(context_dim, query_dim)\n\n        self.scale = dim_head ** -0.5\n        self.heads = heads\n\n        self.to_q = nn.Linear(query_dim, inner_dim, bias=False)\n        self.to_k = nn.Linear(context_dim, inner_dim, bias=False)\n        self.to_v = nn.Linear(context_dim, inner_dim, bias=False)\n\n        self.to_out = nn.Sequential(\n            nn.Linear(inner_dim, query_dim),\n            nn.Dropout(dropout)\n        )\n\n    def forward(self, x, context=None, mask=None):\n        h = self.heads\n\n        q = self.to_q(x)\n        context = default(context, x)\n        k = self.to_k(context)\n        v = self.to_v(context)\n\n        q, k, v = map(lambda t: rearrange(t, 'b n (h d) -> (b h) n d', h=h), (q, k, v))\n\n        sim = einsum('b i d, b j d -> b i j', q, k) * self.scale\n\n        if exists(mask):\n            mask = rearrange(mask, 'b ... -> b (...)')\n            max_neg_value = -torch.finfo(sim.dtype).max\n            mask = repeat(mask, 'b j -> (b h) () j', h=h)\n            sim.masked_fill_(~mask, max_neg_value)\n\n        # attention, what we cannot get enough of\n        attn = sim.softmax(dim=-1)\n\n        out = einsum('b i j, b j d -> b i d', attn, v)\n        out = rearrange(out, '(b h) n d -> b n (h d)', h=h)\n        return self.to_out(out)\n\n\nclass BasicTransformerBlock(nn.Module):\n    def __init__(self, dim, n_heads, d_head, dropout=0., context_dim=None, gated_ff=True, checkpoint=True,\n                 disable_self_attn=False):\n        super().__init__()\n        self.disable_self_attn = disable_self_attn\n        self.attn1 = CrossAttention(query_dim=dim, heads=n_heads, dim_head=d_head, dropout=dropout,\n                                    context_dim=context_dim if self.disable_self_attn else None)  # is a self-attention if not self.disable_self_attn\n        self.ff = FeedForward(dim, dropout=dropout, glu=gated_ff)\n        self.attn2 = CrossAttention(query_dim=dim, context_dim=context_dim,\n                                    heads=n_heads, dim_head=d_head, dropout=dropout)  # is self-attn if context is none\n        self.norm1 = nn.LayerNorm(dim)\n        self.norm2 = nn.LayerNorm(dim)\n        self.norm3 = nn.LayerNorm(dim)\n        self.checkpoint = checkpoint\n\n    def forward(self, x, context=None):\n        return checkpoint(self._forward, (x, context), self.parameters(), self.checkpoint)\n\n    def _forward(self, x, context=None):\n        x = self.attn1(self.norm1(x), context=context if self.disable_self_attn else None) + x\n        x = self.attn2(self.norm2(x), context=context) + x\n        x = self.ff(self.norm3(x)) + x\n        return x\n\n\nclass SpatialTransformer(nn.Module):\n    \"\"\"\n    Transformer block for image-like data.\n    First, project the input (aka embedding)\n    and reshape to b, t, d.\n    Then apply standard transformer action.\n    Finally, reshape to image\n    \"\"\"\n    def __init__(self, in_channels, n_heads, d_head,\n                 depth=1, dropout=0., context_dim=None,\n                 disable_self_attn=False):\n        super().__init__()\n        self.in_channels = in_channels\n        inner_dim = n_heads * d_head\n        self.norm = Normalize(in_channels)\n\n        self.proj_in = nn.Conv2d(in_channels,\n                                 inner_dim,\n                                 kernel_size=1,\n                                 stride=1,\n                                 padding=0)\n\n        self.transformer_blocks = nn.ModuleList(\n            [BasicTransformerBlock(inner_dim, n_heads, d_head, dropout=dropout, context_dim=context_dim,\n                                   disable_self_attn=disable_self_attn)\n                for d in range(depth)]\n        )\n\n        self.proj_out = zero_module(nn.Conv2d(inner_dim,\n                                              in_channels,\n                                              kernel_size=1,\n                                              stride=1,\n                                              padding=0))\n\n    def forward(self, x, context=None):\n        # note: if no context is given, cross-attention defaults to self-attention\n        b, c, h, w = x.shape\n        x_in = x\n        x = self.norm(x)\n        x = self.proj_in(x)\n        x = rearrange(x, 'b c h w -> b (h w) c').contiguous()\n        for block in self.transformer_blocks:\n            x = block(x, context=context)\n        x = rearrange(x, 'b (h w) c -> b c h w', h=h, w=w).contiguous()\n        x = self.proj_out(x)\n        return x + x_in\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/diffusionmodules/__init__.py",
    "content": ""
  },
  {
    "path": "stable-dreamfusion/ldm/modules/diffusionmodules/model.py",
    "content": "# pytorch_diffusion + derived encoder decoder\nimport math\nimport torch\nimport torch.nn as nn\nimport numpy as np\nfrom einops import rearrange\n\nfrom ldm.util import instantiate_from_config\nfrom ldm.modules.attention import LinearAttention\n\n\ndef get_timestep_embedding(timesteps, embedding_dim):\n    \"\"\"\n    This matches the implementation in Denoising Diffusion Probabilistic Models:\n    From Fairseq.\n    Build sinusoidal embeddings.\n    This matches the implementation in tensor2tensor, but differs slightly\n    from the description in Section 3.5 of \"Attention Is All You Need\".\n    \"\"\"\n    assert len(timesteps.shape) == 1\n\n    half_dim = embedding_dim // 2\n    emb = math.log(10000) / (half_dim - 1)\n    emb = torch.exp(torch.arange(half_dim, dtype=torch.float32) * -emb)\n    emb = emb.to(device=timesteps.device)\n    emb = timesteps.float()[:, None] * emb[None, :]\n    emb = torch.cat([torch.sin(emb), torch.cos(emb)], dim=1)\n    if embedding_dim % 2 == 1:  # zero pad\n        emb = torch.nn.functional.pad(emb, (0,1,0,0))\n    return emb\n\n\ndef nonlinearity(x):\n    # swish\n    return x*torch.sigmoid(x)\n\n\ndef Normalize(in_channels, num_groups=32):\n    return torch.nn.GroupNorm(num_groups=num_groups, num_channels=in_channels, eps=1e-6, affine=True)\n\n\nclass Upsample(nn.Module):\n    def __init__(self, in_channels, with_conv):\n        super().__init__()\n        self.with_conv = with_conv\n        if self.with_conv:\n            self.conv = torch.nn.Conv2d(in_channels,\n                                        in_channels,\n                                        kernel_size=3,\n                                        stride=1,\n                                        padding=1)\n\n    def forward(self, x):\n        x = torch.nn.functional.interpolate(x, scale_factor=2.0, mode=\"nearest\")\n        if self.with_conv:\n            x = self.conv(x)\n        return x\n\n\nclass Downsample(nn.Module):\n    def __init__(self, in_channels, with_conv):\n        super().__init__()\n        self.with_conv = with_conv\n        if self.with_conv:\n            # no asymmetric padding in torch conv, must do it ourselves\n            self.conv = torch.nn.Conv2d(in_channels,\n                                        in_channels,\n                                        kernel_size=3,\n                                        stride=2,\n                                        padding=0)\n\n    def forward(self, x):\n        if self.with_conv:\n            pad = (0,1,0,1)\n            x = torch.nn.functional.pad(x, pad, mode=\"constant\", value=0)\n            x = self.conv(x)\n        else:\n            x = torch.nn.functional.avg_pool2d(x, kernel_size=2, stride=2)\n        return x\n\n\nclass ResnetBlock(nn.Module):\n    def __init__(self, *, in_channels, out_channels=None, conv_shortcut=False,\n                 dropout, temb_channels=512):\n        super().__init__()\n        self.in_channels = in_channels\n        out_channels = in_channels if out_channels is None else out_channels\n        self.out_channels = out_channels\n        self.use_conv_shortcut = conv_shortcut\n\n        self.norm1 = Normalize(in_channels)\n        self.conv1 = torch.nn.Conv2d(in_channels,\n                                     out_channels,\n                                     kernel_size=3,\n                                     stride=1,\n                                     padding=1)\n        if temb_channels > 0:\n            self.temb_proj = torch.nn.Linear(temb_channels,\n                                             out_channels)\n        self.norm2 = Normalize(out_channels)\n        self.dropout = torch.nn.Dropout(dropout)\n        self.conv2 = torch.nn.Conv2d(out_channels,\n                                     out_channels,\n                                     kernel_size=3,\n                                     stride=1,\n                                     padding=1)\n        if self.in_channels != self.out_channels:\n            if self.use_conv_shortcut:\n                self.conv_shortcut = torch.nn.Conv2d(in_channels,\n                                                     out_channels,\n                                                     kernel_size=3,\n                                                     stride=1,\n                                                     padding=1)\n            else:\n                self.nin_shortcut = torch.nn.Conv2d(in_channels,\n                                                    out_channels,\n                                                    kernel_size=1,\n                                                    stride=1,\n                                                    padding=0)\n\n    def forward(self, x, temb):\n        h = x\n        h = self.norm1(h)\n        h = nonlinearity(h)\n        h = self.conv1(h)\n\n        if temb is not None:\n            h = h + self.temb_proj(nonlinearity(temb))[:,:,None,None]\n\n        h = self.norm2(h)\n        h = nonlinearity(h)\n        h = self.dropout(h)\n        h = self.conv2(h)\n\n        if self.in_channels != self.out_channels:\n            if self.use_conv_shortcut:\n                x = self.conv_shortcut(x)\n            else:\n                x = self.nin_shortcut(x)\n\n        return x+h\n\n\nclass LinAttnBlock(LinearAttention):\n    \"\"\"to match AttnBlock usage\"\"\"\n    def __init__(self, in_channels):\n        super().__init__(dim=in_channels, heads=1, dim_head=in_channels)\n\n\nclass AttnBlock(nn.Module):\n    def __init__(self, in_channels):\n        super().__init__()\n        self.in_channels = in_channels\n\n        self.norm = Normalize(in_channels)\n        self.q = torch.nn.Conv2d(in_channels,\n                                 in_channels,\n                                 kernel_size=1,\n                                 stride=1,\n                                 padding=0)\n        self.k = torch.nn.Conv2d(in_channels,\n                                 in_channels,\n                                 kernel_size=1,\n                                 stride=1,\n                                 padding=0)\n        self.v = torch.nn.Conv2d(in_channels,\n                                 in_channels,\n                                 kernel_size=1,\n                                 stride=1,\n                                 padding=0)\n        self.proj_out = torch.nn.Conv2d(in_channels,\n                                        in_channels,\n                                        kernel_size=1,\n                                        stride=1,\n                                        padding=0)\n\n\n    def forward(self, x):\n        h_ = x\n        h_ = self.norm(h_)\n        q = self.q(h_)\n        k = self.k(h_)\n        v = self.v(h_)\n\n        # compute attention\n        b,c,h,w = q.shape\n        q = q.reshape(b,c,h*w)\n        q = q.permute(0,2,1)   # b,hw,c\n        k = k.reshape(b,c,h*w) # b,c,hw\n        w_ = torch.bmm(q,k)     # b,hw,hw    w[b,i,j]=sum_c q[b,i,c]k[b,c,j]\n        w_ = w_ * (int(c)**(-0.5))\n        w_ = torch.nn.functional.softmax(w_, dim=2)\n\n        # attend to values\n        v = v.reshape(b,c,h*w)\n        w_ = w_.permute(0,2,1)   # b,hw,hw (first hw of k, second of q)\n        h_ = torch.bmm(v,w_)     # b, c,hw (hw of q) h_[b,c,j] = sum_i v[b,c,i] w_[b,i,j]\n        h_ = h_.reshape(b,c,h,w)\n\n        h_ = self.proj_out(h_)\n\n        return x+h_\n\n\ndef make_attn(in_channels, attn_type=\"vanilla\"):\n    assert attn_type in [\"vanilla\", \"linear\", \"none\"], f'attn_type {attn_type} unknown'\n    print(f\"making attention of type '{attn_type}' with {in_channels} in_channels\")\n    if attn_type == \"vanilla\":\n        return AttnBlock(in_channels)\n    elif attn_type == \"none\":\n        return nn.Identity(in_channels)\n    else:\n        return LinAttnBlock(in_channels)\n\n\nclass Model(nn.Module):\n    def __init__(self, *, ch, out_ch, ch_mult=(1,2,4,8), num_res_blocks,\n                 attn_resolutions, dropout=0.0, resamp_with_conv=True, in_channels,\n                 resolution, use_timestep=True, use_linear_attn=False, attn_type=\"vanilla\"):\n        super().__init__()\n        if use_linear_attn: attn_type = \"linear\"\n        self.ch = ch\n        self.temb_ch = self.ch*4\n        self.num_resolutions = len(ch_mult)\n        self.num_res_blocks = num_res_blocks\n        self.resolution = resolution\n        self.in_channels = in_channels\n\n        self.use_timestep = use_timestep\n        if self.use_timestep:\n            # timestep embedding\n            self.temb = nn.Module()\n            self.temb.dense = nn.ModuleList([\n                torch.nn.Linear(self.ch,\n                                self.temb_ch),\n                torch.nn.Linear(self.temb_ch,\n                                self.temb_ch),\n            ])\n\n        # downsampling\n        self.conv_in = torch.nn.Conv2d(in_channels,\n                                       self.ch,\n                                       kernel_size=3,\n                                       stride=1,\n                                       padding=1)\n\n        curr_res = resolution\n        in_ch_mult = (1,)+tuple(ch_mult)\n        self.down = nn.ModuleList()\n        for i_level in range(self.num_resolutions):\n            block = nn.ModuleList()\n            attn = nn.ModuleList()\n            block_in = ch*in_ch_mult[i_level]\n            block_out = ch*ch_mult[i_level]\n            for i_block in range(self.num_res_blocks):\n                block.append(ResnetBlock(in_channels=block_in,\n                                         out_channels=block_out,\n                                         temb_channels=self.temb_ch,\n                                         dropout=dropout))\n                block_in = block_out\n                if curr_res in attn_resolutions:\n                    attn.append(make_attn(block_in, attn_type=attn_type))\n            down = nn.Module()\n            down.block = block\n            down.attn = attn\n            if i_level != self.num_resolutions-1:\n                down.downsample = Downsample(block_in, resamp_with_conv)\n                curr_res = curr_res // 2\n            self.down.append(down)\n\n        # middle\n        self.mid = nn.Module()\n        self.mid.block_1 = ResnetBlock(in_channels=block_in,\n                                       out_channels=block_in,\n                                       temb_channels=self.temb_ch,\n                                       dropout=dropout)\n        self.mid.attn_1 = make_attn(block_in, attn_type=attn_type)\n        self.mid.block_2 = ResnetBlock(in_channels=block_in,\n                                       out_channels=block_in,\n                                       temb_channels=self.temb_ch,\n                                       dropout=dropout)\n\n        # upsampling\n        self.up = nn.ModuleList()\n        for i_level in reversed(range(self.num_resolutions)):\n            block = nn.ModuleList()\n            attn = nn.ModuleList()\n            block_out = ch*ch_mult[i_level]\n            skip_in = ch*ch_mult[i_level]\n            for i_block in range(self.num_res_blocks+1):\n                if i_block == self.num_res_blocks:\n                    skip_in = ch*in_ch_mult[i_level]\n                block.append(ResnetBlock(in_channels=block_in+skip_in,\n                                         out_channels=block_out,\n                                         temb_channels=self.temb_ch,\n                                         dropout=dropout))\n                block_in = block_out\n                if curr_res in attn_resolutions:\n                    attn.append(make_attn(block_in, attn_type=attn_type))\n            up = nn.Module()\n            up.block = block\n            up.attn = attn\n            if i_level != 0:\n                up.upsample = Upsample(block_in, resamp_with_conv)\n                curr_res = curr_res * 2\n            self.up.insert(0, up) # prepend to get consistent order\n\n        # end\n        self.norm_out = Normalize(block_in)\n        self.conv_out = torch.nn.Conv2d(block_in,\n                                        out_ch,\n                                        kernel_size=3,\n                                        stride=1,\n                                        padding=1)\n\n    def forward(self, x, t=None, context=None):\n        #assert x.shape[2] == x.shape[3] == self.resolution\n        if context is not None:\n            # assume aligned context, cat along channel axis\n            x = torch.cat((x, context), dim=1)\n        if self.use_timestep:\n            # timestep embedding\n            assert t is not None\n            temb = get_timestep_embedding(t, self.ch)\n            temb = self.temb.dense[0](temb)\n            temb = nonlinearity(temb)\n            temb = self.temb.dense[1](temb)\n        else:\n            temb = None\n\n        # downsampling\n        hs = [self.conv_in(x)]\n        for i_level in range(self.num_resolutions):\n            for i_block in range(self.num_res_blocks):\n                h = self.down[i_level].block[i_block](hs[-1], temb)\n                if len(self.down[i_level].attn) > 0:\n                    h = self.down[i_level].attn[i_block](h)\n                hs.append(h)\n            if i_level != self.num_resolutions-1:\n                hs.append(self.down[i_level].downsample(hs[-1]))\n\n        # middle\n        h = hs[-1]\n        h = self.mid.block_1(h, temb)\n        h = self.mid.attn_1(h)\n        h = self.mid.block_2(h, temb)\n\n        # upsampling\n        for i_level in reversed(range(self.num_resolutions)):\n            for i_block in range(self.num_res_blocks+1):\n                h = self.up[i_level].block[i_block](\n                    torch.cat([h, hs.pop()], dim=1), temb)\n                if len(self.up[i_level].attn) > 0:\n                    h = self.up[i_level].attn[i_block](h)\n            if i_level != 0:\n                h = self.up[i_level].upsample(h)\n\n        # end\n        h = self.norm_out(h)\n        h = nonlinearity(h)\n        h = self.conv_out(h)\n        return h\n\n    def get_last_layer(self):\n        return self.conv_out.weight\n\n\nclass Encoder(nn.Module):\n    def __init__(self, *, ch, out_ch, ch_mult=(1,2,4,8), num_res_blocks,\n                 attn_resolutions, dropout=0.0, resamp_with_conv=True, in_channels,\n                 resolution, z_channels, double_z=True, use_linear_attn=False, attn_type=\"vanilla\",\n                 **ignore_kwargs):\n        super().__init__()\n        if use_linear_attn: attn_type = \"linear\"\n        self.ch = ch\n        self.temb_ch = 0\n        self.num_resolutions = len(ch_mult)\n        self.num_res_blocks = num_res_blocks\n        self.resolution = resolution\n        self.in_channels = in_channels\n\n        # downsampling\n        self.conv_in = torch.nn.Conv2d(in_channels,\n                                       self.ch,\n                                       kernel_size=3,\n                                       stride=1,\n                                       padding=1)\n\n        curr_res = resolution\n        in_ch_mult = (1,)+tuple(ch_mult)\n        self.in_ch_mult = in_ch_mult\n        self.down = nn.ModuleList()\n        for i_level in range(self.num_resolutions):\n            block = nn.ModuleList()\n            attn = nn.ModuleList()\n            block_in = ch*in_ch_mult[i_level]\n            block_out = ch*ch_mult[i_level]\n            for i_block in range(self.num_res_blocks):\n                block.append(ResnetBlock(in_channels=block_in,\n                                         out_channels=block_out,\n                                         temb_channels=self.temb_ch,\n                                         dropout=dropout))\n                block_in = block_out\n                if curr_res in attn_resolutions:\n                    attn.append(make_attn(block_in, attn_type=attn_type))\n            down = nn.Module()\n            down.block = block\n            down.attn = attn\n            if i_level != self.num_resolutions-1:\n                down.downsample = Downsample(block_in, resamp_with_conv)\n                curr_res = curr_res // 2\n            self.down.append(down)\n\n        # middle\n        self.mid = nn.Module()\n        self.mid.block_1 = ResnetBlock(in_channels=block_in,\n                                       out_channels=block_in,\n                                       temb_channels=self.temb_ch,\n                                       dropout=dropout)\n        self.mid.attn_1 = make_attn(block_in, attn_type=attn_type)\n        self.mid.block_2 = ResnetBlock(in_channels=block_in,\n                                       out_channels=block_in,\n                                       temb_channels=self.temb_ch,\n                                       dropout=dropout)\n\n        # end\n        self.norm_out = Normalize(block_in)\n        self.conv_out = torch.nn.Conv2d(block_in,\n                                        2*z_channels if double_z else z_channels,\n                                        kernel_size=3,\n                                        stride=1,\n                                        padding=1)\n\n    def forward(self, x):\n        # timestep embedding\n        temb = None\n\n        # downsampling\n        hs = [self.conv_in(x)]\n        for i_level in range(self.num_resolutions):\n            for i_block in range(self.num_res_blocks):\n                h = self.down[i_level].block[i_block](hs[-1], temb)\n                if len(self.down[i_level].attn) > 0:\n                    h = self.down[i_level].attn[i_block](h)\n                hs.append(h)\n            if i_level != self.num_resolutions-1:\n                hs.append(self.down[i_level].downsample(hs[-1]))\n\n        # middle\n        h = hs[-1]\n        h = self.mid.block_1(h, temb)\n        h = self.mid.attn_1(h)\n        h = self.mid.block_2(h, temb)\n\n        # end\n        h = self.norm_out(h)\n        h = nonlinearity(h)\n        h = self.conv_out(h)\n        return h\n\n\nclass Decoder(nn.Module):\n    def __init__(self, *, ch, out_ch, ch_mult=(1,2,4,8), num_res_blocks,\n                 attn_resolutions, dropout=0.0, resamp_with_conv=True, in_channels,\n                 resolution, z_channels, give_pre_end=False, tanh_out=False, use_linear_attn=False,\n                 attn_type=\"vanilla\", **ignorekwargs):\n        super().__init__()\n        if use_linear_attn: attn_type = \"linear\"\n        self.ch = ch\n        self.temb_ch = 0\n        self.num_resolutions = len(ch_mult)\n        self.num_res_blocks = num_res_blocks\n        self.resolution = resolution\n        self.in_channels = in_channels\n        self.give_pre_end = give_pre_end\n        self.tanh_out = tanh_out\n\n        # compute in_ch_mult, block_in and curr_res at lowest res\n        in_ch_mult = (1,)+tuple(ch_mult)\n        block_in = ch*ch_mult[self.num_resolutions-1]\n        curr_res = resolution // 2**(self.num_resolutions-1)\n        self.z_shape = (1,z_channels,curr_res,curr_res)\n        print(\"Working with z of shape {} = {} dimensions.\".format(\n            self.z_shape, np.prod(self.z_shape)))\n\n        # z to block_in\n        self.conv_in = torch.nn.Conv2d(z_channels,\n                                       block_in,\n                                       kernel_size=3,\n                                       stride=1,\n                                       padding=1)\n\n        # middle\n        self.mid = nn.Module()\n        self.mid.block_1 = ResnetBlock(in_channels=block_in,\n                                       out_channels=block_in,\n                                       temb_channels=self.temb_ch,\n                                       dropout=dropout)\n        self.mid.attn_1 = make_attn(block_in, attn_type=attn_type)\n        self.mid.block_2 = ResnetBlock(in_channels=block_in,\n                                       out_channels=block_in,\n                                       temb_channels=self.temb_ch,\n                                       dropout=dropout)\n\n        # upsampling\n        self.up = nn.ModuleList()\n        for i_level in reversed(range(self.num_resolutions)):\n            block = nn.ModuleList()\n            attn = nn.ModuleList()\n            block_out = ch*ch_mult[i_level]\n            for i_block in range(self.num_res_blocks+1):\n                block.append(ResnetBlock(in_channels=block_in,\n                                         out_channels=block_out,\n                                         temb_channels=self.temb_ch,\n                                         dropout=dropout))\n                block_in = block_out\n                if curr_res in attn_resolutions:\n                    attn.append(make_attn(block_in, attn_type=attn_type))\n            up = nn.Module()\n            up.block = block\n            up.attn = attn\n            if i_level != 0:\n                up.upsample = Upsample(block_in, resamp_with_conv)\n                curr_res = curr_res * 2\n            self.up.insert(0, up) # prepend to get consistent order\n\n        # end\n        self.norm_out = Normalize(block_in)\n        self.conv_out = torch.nn.Conv2d(block_in,\n                                        out_ch,\n                                        kernel_size=3,\n                                        stride=1,\n                                        padding=1)\n\n    def forward(self, z):\n        #assert z.shape[1:] == self.z_shape[1:]\n        self.last_z_shape = z.shape\n\n        # timestep embedding\n        temb = None\n\n        # z to block_in\n        h = self.conv_in(z)\n\n        # middle\n        h = self.mid.block_1(h, temb)\n        h = self.mid.attn_1(h)\n        h = self.mid.block_2(h, temb)\n\n        # upsampling\n        for i_level in reversed(range(self.num_resolutions)):\n            for i_block in range(self.num_res_blocks+1):\n                h = self.up[i_level].block[i_block](h, temb)\n                if len(self.up[i_level].attn) > 0:\n                    h = self.up[i_level].attn[i_block](h)\n            if i_level != 0:\n                h = self.up[i_level].upsample(h)\n\n        # end\n        if self.give_pre_end:\n            return h\n\n        h = self.norm_out(h)\n        h = nonlinearity(h)\n        h = self.conv_out(h)\n        if self.tanh_out:\n            h = torch.tanh(h)\n        return h\n\n\nclass SimpleDecoder(nn.Module):\n    def __init__(self, in_channels, out_channels, *args, **kwargs):\n        super().__init__()\n        self.model = nn.ModuleList([nn.Conv2d(in_channels, in_channels, 1),\n                                     ResnetBlock(in_channels=in_channels,\n                                                 out_channels=2 * in_channels,\n                                                 temb_channels=0, dropout=0.0),\n                                     ResnetBlock(in_channels=2 * in_channels,\n                                                out_channels=4 * in_channels,\n                                                temb_channels=0, dropout=0.0),\n                                     ResnetBlock(in_channels=4 * in_channels,\n                                                out_channels=2 * in_channels,\n                                                temb_channels=0, dropout=0.0),\n                                     nn.Conv2d(2*in_channels, in_channels, 1),\n                                     Upsample(in_channels, with_conv=True)])\n        # end\n        self.norm_out = Normalize(in_channels)\n        self.conv_out = torch.nn.Conv2d(in_channels,\n                                        out_channels,\n                                        kernel_size=3,\n                                        stride=1,\n                                        padding=1)\n\n    def forward(self, x):\n        for i, layer in enumerate(self.model):\n            if i in [1,2,3]:\n                x = layer(x, None)\n            else:\n                x = layer(x)\n\n        h = self.norm_out(x)\n        h = nonlinearity(h)\n        x = self.conv_out(h)\n        return x\n\n\nclass UpsampleDecoder(nn.Module):\n    def __init__(self, in_channels, out_channels, ch, num_res_blocks, resolution,\n                 ch_mult=(2,2), dropout=0.0):\n        super().__init__()\n        # upsampling\n        self.temb_ch = 0\n        self.num_resolutions = len(ch_mult)\n        self.num_res_blocks = num_res_blocks\n        block_in = in_channels\n        curr_res = resolution // 2 ** (self.num_resolutions - 1)\n        self.res_blocks = nn.ModuleList()\n        self.upsample_blocks = nn.ModuleList()\n        for i_level in range(self.num_resolutions):\n            res_block = []\n            block_out = ch * ch_mult[i_level]\n            for i_block in range(self.num_res_blocks + 1):\n                res_block.append(ResnetBlock(in_channels=block_in,\n                                         out_channels=block_out,\n                                         temb_channels=self.temb_ch,\n                                         dropout=dropout))\n                block_in = block_out\n            self.res_blocks.append(nn.ModuleList(res_block))\n            if i_level != self.num_resolutions - 1:\n                self.upsample_blocks.append(Upsample(block_in, True))\n                curr_res = curr_res * 2\n\n        # end\n        self.norm_out = Normalize(block_in)\n        self.conv_out = torch.nn.Conv2d(block_in,\n                                        out_channels,\n                                        kernel_size=3,\n                                        stride=1,\n                                        padding=1)\n\n    def forward(self, x):\n        # upsampling\n        h = x\n        for k, i_level in enumerate(range(self.num_resolutions)):\n            for i_block in range(self.num_res_blocks + 1):\n                h = self.res_blocks[i_level][i_block](h, None)\n            if i_level != self.num_resolutions - 1:\n                h = self.upsample_blocks[k](h)\n        h = self.norm_out(h)\n        h = nonlinearity(h)\n        h = self.conv_out(h)\n        return h\n\n\nclass LatentRescaler(nn.Module):\n    def __init__(self, factor, in_channels, mid_channels, out_channels, depth=2):\n        super().__init__()\n        # residual block, interpolate, residual block\n        self.factor = factor\n        self.conv_in = nn.Conv2d(in_channels,\n                                 mid_channels,\n                                 kernel_size=3,\n                                 stride=1,\n                                 padding=1)\n        self.res_block1 = nn.ModuleList([ResnetBlock(in_channels=mid_channels,\n                                                     out_channels=mid_channels,\n                                                     temb_channels=0,\n                                                     dropout=0.0) for _ in range(depth)])\n        self.attn = AttnBlock(mid_channels)\n        self.res_block2 = nn.ModuleList([ResnetBlock(in_channels=mid_channels,\n                                                     out_channels=mid_channels,\n                                                     temb_channels=0,\n                                                     dropout=0.0) for _ in range(depth)])\n\n        self.conv_out = nn.Conv2d(mid_channels,\n                                  out_channels,\n                                  kernel_size=1,\n                                  )\n\n    def forward(self, x):\n        x = self.conv_in(x)\n        for block in self.res_block1:\n            x = block(x, None)\n        x = torch.nn.functional.interpolate(x, size=(int(round(x.shape[2]*self.factor)), int(round(x.shape[3]*self.factor))))\n        x = self.attn(x)\n        for block in self.res_block2:\n            x = block(x, None)\n        x = self.conv_out(x)\n        return x\n\n\nclass MergedRescaleEncoder(nn.Module):\n    def __init__(self, in_channels, ch, resolution, out_ch, num_res_blocks,\n                 attn_resolutions, dropout=0.0, resamp_with_conv=True,\n                 ch_mult=(1,2,4,8), rescale_factor=1.0, rescale_module_depth=1):\n        super().__init__()\n        intermediate_chn = ch * ch_mult[-1]\n        self.encoder = Encoder(in_channels=in_channels, num_res_blocks=num_res_blocks, ch=ch, ch_mult=ch_mult,\n                               z_channels=intermediate_chn, double_z=False, resolution=resolution,\n                               attn_resolutions=attn_resolutions, dropout=dropout, resamp_with_conv=resamp_with_conv,\n                               out_ch=None)\n        self.rescaler = LatentRescaler(factor=rescale_factor, in_channels=intermediate_chn,\n                                       mid_channels=intermediate_chn, out_channels=out_ch, depth=rescale_module_depth)\n\n    def forward(self, x):\n        x = self.encoder(x)\n        x = self.rescaler(x)\n        return x\n\n\nclass MergedRescaleDecoder(nn.Module):\n    def __init__(self, z_channels, out_ch, resolution, num_res_blocks, attn_resolutions, ch, ch_mult=(1,2,4,8),\n                 dropout=0.0, resamp_with_conv=True, rescale_factor=1.0, rescale_module_depth=1):\n        super().__init__()\n        tmp_chn = z_channels*ch_mult[-1]\n        self.decoder = Decoder(out_ch=out_ch, z_channels=tmp_chn, attn_resolutions=attn_resolutions, dropout=dropout,\n                               resamp_with_conv=resamp_with_conv, in_channels=None, num_res_blocks=num_res_blocks,\n                               ch_mult=ch_mult, resolution=resolution, ch=ch)\n        self.rescaler = LatentRescaler(factor=rescale_factor, in_channels=z_channels, mid_channels=tmp_chn,\n                                       out_channels=tmp_chn, depth=rescale_module_depth)\n\n    def forward(self, x):\n        x = self.rescaler(x)\n        x = self.decoder(x)\n        return x\n\n\nclass Upsampler(nn.Module):\n    def __init__(self, in_size, out_size, in_channels, out_channels, ch_mult=2):\n        super().__init__()\n        assert out_size >= in_size\n        num_blocks = int(np.log2(out_size//in_size))+1\n        factor_up = 1.+ (out_size % in_size)\n        print(f\"Building {self.__class__.__name__} with in_size: {in_size} --> out_size {out_size} and factor {factor_up}\")\n        self.rescaler = LatentRescaler(factor=factor_up, in_channels=in_channels, mid_channels=2*in_channels,\n                                       out_channels=in_channels)\n        self.decoder = Decoder(out_ch=out_channels, resolution=out_size, z_channels=in_channels, num_res_blocks=2,\n                               attn_resolutions=[], in_channels=None, ch=in_channels,\n                               ch_mult=[ch_mult for _ in range(num_blocks)])\n\n    def forward(self, x):\n        x = self.rescaler(x)\n        x = self.decoder(x)\n        return x\n\n\nclass Resize(nn.Module):\n    def __init__(self, in_channels=None, learned=False, mode=\"bilinear\"):\n        super().__init__()\n        self.with_conv = learned\n        self.mode = mode\n        if self.with_conv:\n            print(f\"Note: {self.__class__.__name} uses learned downsampling and will ignore the fixed {mode} mode\")\n            raise NotImplementedError()\n            assert in_channels is not None\n            # no asymmetric padding in torch conv, must do it ourselves\n            self.conv = torch.nn.Conv2d(in_channels,\n                                        in_channels,\n                                        kernel_size=4,\n                                        stride=2,\n                                        padding=1)\n\n    def forward(self, x, scale_factor=1.0):\n        if scale_factor==1.0:\n            return x\n        else:\n            x = torch.nn.functional.interpolate(x, mode=self.mode, align_corners=False, scale_factor=scale_factor)\n        return x\n\nclass FirstStagePostProcessor(nn.Module):\n\n    def __init__(self, ch_mult:list, in_channels,\n                 pretrained_model:nn.Module=None,\n                 reshape=False,\n                 n_channels=None,\n                 dropout=0.,\n                 pretrained_config=None):\n        super().__init__()\n        if pretrained_config is None:\n            assert pretrained_model is not None, 'Either \"pretrained_model\" or \"pretrained_config\" must not be None'\n            self.pretrained_model = pretrained_model\n        else:\n            assert pretrained_config is not None, 'Either \"pretrained_model\" or \"pretrained_config\" must not be None'\n            self.instantiate_pretrained(pretrained_config)\n\n        self.do_reshape = reshape\n\n        if n_channels is None:\n            n_channels = self.pretrained_model.encoder.ch\n\n        self.proj_norm = Normalize(in_channels,num_groups=in_channels//2)\n        self.proj = nn.Conv2d(in_channels,n_channels,kernel_size=3,\n                            stride=1,padding=1)\n\n        blocks = []\n        downs = []\n        ch_in = n_channels\n        for m in ch_mult:\n            blocks.append(ResnetBlock(in_channels=ch_in,out_channels=m*n_channels,dropout=dropout))\n            ch_in = m * n_channels\n            downs.append(Downsample(ch_in, with_conv=False))\n\n        self.model = nn.ModuleList(blocks)\n        self.downsampler = nn.ModuleList(downs)\n\n\n    def instantiate_pretrained(self, config):\n        model = instantiate_from_config(config)\n        self.pretrained_model = model.eval()\n        # self.pretrained_model.train = False\n        for param in self.pretrained_model.parameters():\n            param.requires_grad = False\n\n\n    @torch.no_grad()\n    def encode_with_pretrained(self,x):\n        c = self.pretrained_model.encode(x)\n        if isinstance(c, DiagonalGaussianDistribution):\n            c = c.mode()\n        return  c\n\n    def forward(self,x):\n        z_fs = self.encode_with_pretrained(x)\n        z = self.proj_norm(z_fs)\n        z = self.proj(z)\n        z = nonlinearity(z)\n\n        for submodel, downmodel in zip(self.model,self.downsampler):\n            z = submodel(z,temb=None)\n            z = downmodel(z)\n\n        if self.do_reshape:\n            z = rearrange(z,'b c h w -> b (h w) c')\n        return z\n\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/diffusionmodules/openaimodel.py",
    "content": "from abc import abstractmethod\nfrom functools import partial\nimport math\nfrom typing import Iterable\n\nimport numpy as np\nimport torch as th\nimport torch.nn as nn\nimport torch.nn.functional as F\n\nfrom ldm.modules.diffusionmodules.util import (\n    checkpoint,\n    conv_nd,\n    linear,\n    avg_pool_nd,\n    zero_module,\n    normalization,\n    timestep_embedding,\n)\nfrom ldm.modules.attention import SpatialTransformer\nfrom ldm.util import exists\n\n\n# dummy replace\ndef convert_module_to_f16(x):\n    pass\n\ndef convert_module_to_f32(x):\n    pass\n\n\n## go\nclass AttentionPool2d(nn.Module):\n    \"\"\"\n    Adapted from CLIP: https://github.com/openai/CLIP/blob/main/clip/model.py\n    \"\"\"\n\n    def __init__(\n        self,\n        spacial_dim: int,\n        embed_dim: int,\n        num_heads_channels: int,\n        output_dim: int = None,\n    ):\n        super().__init__()\n        self.positional_embedding = nn.Parameter(th.randn(embed_dim, spacial_dim ** 2 + 1) / embed_dim ** 0.5)\n        self.qkv_proj = conv_nd(1, embed_dim, 3 * embed_dim, 1)\n        self.c_proj = conv_nd(1, embed_dim, output_dim or embed_dim, 1)\n        self.num_heads = embed_dim // num_heads_channels\n        self.attention = QKVAttention(self.num_heads)\n\n    def forward(self, x):\n        b, c, *_spatial = x.shape\n        x = x.reshape(b, c, -1)  # NC(HW)\n        x = th.cat([x.mean(dim=-1, keepdim=True), x], dim=-1)  # NC(HW+1)\n        x = x + self.positional_embedding[None, :, :].to(x.dtype)  # NC(HW+1)\n        x = self.qkv_proj(x)\n        x = self.attention(x)\n        x = self.c_proj(x)\n        return x[:, :, 0]\n\n\nclass TimestepBlock(nn.Module):\n    \"\"\"\n    Any module where forward() takes timestep embeddings as a second argument.\n    \"\"\"\n\n    @abstractmethod\n    def forward(self, x, emb):\n        \"\"\"\n        Apply the module to `x` given `emb` timestep embeddings.\n        \"\"\"\n\n\nclass TimestepEmbedSequential(nn.Sequential, TimestepBlock):\n    \"\"\"\n    A sequential module that passes timestep embeddings to the children that\n    support it as an extra input.\n    \"\"\"\n\n    def forward(self, x, emb, context=None):\n        for layer in self:\n            if isinstance(layer, TimestepBlock):\n                x = layer(x, emb)\n            elif isinstance(layer, SpatialTransformer):\n                x = layer(x, context)\n            else:\n                x = layer(x)\n        return x\n\n\nclass Upsample(nn.Module):\n    \"\"\"\n    An upsampling layer with an optional convolution.\n    :param channels: channels in the inputs and outputs.\n    :param use_conv: a bool determining if a convolution is applied.\n    :param dims: determines if the signal is 1D, 2D, or 3D. If 3D, then\n                 upsampling occurs in the inner-two dimensions.\n    \"\"\"\n\n    def __init__(self, channels, use_conv, dims=2, out_channels=None, padding=1):\n        super().__init__()\n        self.channels = channels\n        self.out_channels = out_channels or channels\n        self.use_conv = use_conv\n        self.dims = dims\n        if use_conv:\n            self.conv = conv_nd(dims, self.channels, self.out_channels, 3, padding=padding)\n\n    def forward(self, x):\n        assert x.shape[1] == self.channels\n        if self.dims == 3:\n            x = F.interpolate(\n                x, (x.shape[2], x.shape[3] * 2, x.shape[4] * 2), mode=\"nearest\"\n            )\n        else:\n            x = F.interpolate(x, scale_factor=2, mode=\"nearest\")\n        if self.use_conv:\n            x = self.conv(x)\n        return x\n\nclass TransposedUpsample(nn.Module):\n    'Learned 2x upsampling without padding'\n    def __init__(self, channels, out_channels=None, ks=5):\n        super().__init__()\n        self.channels = channels\n        self.out_channels = out_channels or channels\n\n        self.up = nn.ConvTranspose2d(self.channels,self.out_channels,kernel_size=ks,stride=2)\n\n    def forward(self,x):\n        return self.up(x)\n\n\nclass Downsample(nn.Module):\n    \"\"\"\n    A downsampling layer with an optional convolution.\n    :param channels: channels in the inputs and outputs.\n    :param use_conv: a bool determining if a convolution is applied.\n    :param dims: determines if the signal is 1D, 2D, or 3D. If 3D, then\n                 downsampling occurs in the inner-two dimensions.\n    \"\"\"\n\n    def __init__(self, channels, use_conv, dims=2, out_channels=None,padding=1):\n        super().__init__()\n        self.channels = channels\n        self.out_channels = out_channels or channels\n        self.use_conv = use_conv\n        self.dims = dims\n        stride = 2 if dims != 3 else (1, 2, 2)\n        if use_conv:\n            self.op = conv_nd(\n                dims, self.channels, self.out_channels, 3, stride=stride, padding=padding\n            )\n        else:\n            assert self.channels == self.out_channels\n            self.op = avg_pool_nd(dims, kernel_size=stride, stride=stride)\n\n    def forward(self, x):\n        assert x.shape[1] == self.channels\n        return self.op(x)\n\n\nclass ResBlock(TimestepBlock):\n    \"\"\"\n    A residual block that can optionally change the number of channels.\n    :param channels: the number of input channels.\n    :param emb_channels: the number of timestep embedding channels.\n    :param dropout: the rate of dropout.\n    :param out_channels: if specified, the number of out channels.\n    :param use_conv: if True and out_channels is specified, use a spatial\n        convolution instead of a smaller 1x1 convolution to change the\n        channels in the skip connection.\n    :param dims: determines if the signal is 1D, 2D, or 3D.\n    :param use_checkpoint: if True, use gradient checkpointing on this module.\n    :param up: if True, use this block for upsampling.\n    :param down: if True, use this block for downsampling.\n    \"\"\"\n\n    def __init__(\n        self,\n        channels,\n        emb_channels,\n        dropout,\n        out_channels=None,\n        use_conv=False,\n        use_scale_shift_norm=False,\n        dims=2,\n        use_checkpoint=False,\n        up=False,\n        down=False,\n    ):\n        super().__init__()\n        self.channels = channels\n        self.emb_channels = emb_channels\n        self.dropout = dropout\n        self.out_channels = out_channels or channels\n        self.use_conv = use_conv\n        self.use_checkpoint = use_checkpoint\n        self.use_scale_shift_norm = use_scale_shift_norm\n\n        self.in_layers = nn.Sequential(\n            normalization(channels),\n            nn.SiLU(),\n            conv_nd(dims, channels, self.out_channels, 3, padding=1),\n        )\n\n        self.updown = up or down\n\n        if up:\n            self.h_upd = Upsample(channels, False, dims)\n            self.x_upd = Upsample(channels, False, dims)\n        elif down:\n            self.h_upd = Downsample(channels, False, dims)\n            self.x_upd = Downsample(channels, False, dims)\n        else:\n            self.h_upd = self.x_upd = nn.Identity()\n\n        self.emb_layers = nn.Sequential(\n            nn.SiLU(),\n            linear(\n                emb_channels,\n                2 * self.out_channels if use_scale_shift_norm else self.out_channels,\n            ),\n        )\n        self.out_layers = nn.Sequential(\n            normalization(self.out_channels),\n            nn.SiLU(),\n            nn.Dropout(p=dropout),\n            zero_module(\n                conv_nd(dims, self.out_channels, self.out_channels, 3, padding=1)\n            ),\n        )\n\n        if self.out_channels == channels:\n            self.skip_connection = nn.Identity()\n        elif use_conv:\n            self.skip_connection = conv_nd(\n                dims, channels, self.out_channels, 3, padding=1\n            )\n        else:\n            self.skip_connection = conv_nd(dims, channels, self.out_channels, 1)\n\n    def forward(self, x, emb):\n        \"\"\"\n        Apply the block to a Tensor, conditioned on a timestep embedding.\n        :param x: an [N x C x ...] Tensor of features.\n        :param emb: an [N x emb_channels] Tensor of timestep embeddings.\n        :return: an [N x C x ...] Tensor of outputs.\n        \"\"\"\n        return checkpoint(\n            self._forward, (x, emb), self.parameters(), self.use_checkpoint\n        )\n\n\n    def _forward(self, x, emb):\n        if self.updown:\n            in_rest, in_conv = self.in_layers[:-1], self.in_layers[-1]\n            h = in_rest(x)\n            h = self.h_upd(h)\n            x = self.x_upd(x)\n            h = in_conv(h)\n        else:\n            h = self.in_layers(x)\n        emb_out = self.emb_layers(emb).type(h.dtype)\n        while len(emb_out.shape) < len(h.shape):\n            emb_out = emb_out[..., None]\n        if self.use_scale_shift_norm:\n            out_norm, out_rest = self.out_layers[0], self.out_layers[1:]\n            scale, shift = th.chunk(emb_out, 2, dim=1)\n            h = out_norm(h) * (1 + scale) + shift\n            h = out_rest(h)\n        else:\n            h = h + emb_out\n            h = self.out_layers(h)\n        return self.skip_connection(x) + h\n\n\nclass AttentionBlock(nn.Module):\n    \"\"\"\n    An attention block that allows spatial positions to attend to each other.\n    Originally ported from here, but adapted to the N-d case.\n    https://github.com/hojonathanho/diffusion/blob/1e0dceb3b3495bbe19116a5e1b3596cd0706c543/diffusion_tf/models/unet.py#L66.\n    \"\"\"\n\n    def __init__(\n        self,\n        channels,\n        num_heads=1,\n        num_head_channels=-1,\n        use_checkpoint=False,\n        use_new_attention_order=False,\n    ):\n        super().__init__()\n        self.channels = channels\n        if num_head_channels == -1:\n            self.num_heads = num_heads\n        else:\n            assert (\n                channels % num_head_channels == 0\n            ), f\"q,k,v channels {channels} is not divisible by num_head_channels {num_head_channels}\"\n            self.num_heads = channels // num_head_channels\n        self.use_checkpoint = use_checkpoint\n        self.norm = normalization(channels)\n        self.qkv = conv_nd(1, channels, channels * 3, 1)\n        if use_new_attention_order:\n            # split qkv before split heads\n            self.attention = QKVAttention(self.num_heads)\n        else:\n            # split heads before split qkv\n            self.attention = QKVAttentionLegacy(self.num_heads)\n\n        self.proj_out = zero_module(conv_nd(1, channels, channels, 1))\n\n    def forward(self, x):\n        return checkpoint(self._forward, (x,), self.parameters(), True)   # TODO: check checkpoint usage, is True # TODO: fix the .half call!!!\n        #return pt_checkpoint(self._forward, x)  # pytorch\n\n    def _forward(self, x):\n        b, c, *spatial = x.shape\n        x = x.reshape(b, c, -1)\n        qkv = self.qkv(self.norm(x))\n        h = self.attention(qkv)\n        h = self.proj_out(h)\n        return (x + h).reshape(b, c, *spatial)\n\n\ndef count_flops_attn(model, _x, y):\n    \"\"\"\n    A counter for the `thop` package to count the operations in an\n    attention operation.\n    Meant to be used like:\n        macs, params = thop.profile(\n            model,\n            inputs=(inputs, timestamps),\n            custom_ops={QKVAttention: QKVAttention.count_flops},\n        )\n    \"\"\"\n    b, c, *spatial = y[0].shape\n    num_spatial = int(np.prod(spatial))\n    # We perform two matmuls with the same number of ops.\n    # The first computes the weight matrix, the second computes\n    # the combination of the value vectors.\n    matmul_ops = 2 * b * (num_spatial ** 2) * c\n    model.total_ops += th.DoubleTensor([matmul_ops])\n\n\nclass QKVAttentionLegacy(nn.Module):\n    \"\"\"\n    A module which performs QKV attention. Matches legacy QKVAttention + input/output heads shaping\n    \"\"\"\n\n    def __init__(self, n_heads):\n        super().__init__()\n        self.n_heads = n_heads\n\n    def forward(self, qkv):\n        \"\"\"\n        Apply QKV attention.\n        :param qkv: an [N x (H * 3 * C) x T] tensor of Qs, Ks, and Vs.\n        :return: an [N x (H * C) x T] tensor after attention.\n        \"\"\"\n        bs, width, length = qkv.shape\n        assert width % (3 * self.n_heads) == 0\n        ch = width // (3 * self.n_heads)\n        q, k, v = qkv.reshape(bs * self.n_heads, ch * 3, length).split(ch, dim=1)\n        scale = 1 / math.sqrt(math.sqrt(ch))\n        weight = th.einsum(\n            \"bct,bcs->bts\", q * scale, k * scale\n        )  # More stable with f16 than dividing afterwards\n        weight = th.softmax(weight.float(), dim=-1).type(weight.dtype)\n        a = th.einsum(\"bts,bcs->bct\", weight, v)\n        return a.reshape(bs, -1, length)\n\n    @staticmethod\n    def count_flops(model, _x, y):\n        return count_flops_attn(model, _x, y)\n\n\nclass QKVAttention(nn.Module):\n    \"\"\"\n    A module which performs QKV attention and splits in a different order.\n    \"\"\"\n\n    def __init__(self, n_heads):\n        super().__init__()\n        self.n_heads = n_heads\n\n    def forward(self, qkv):\n        \"\"\"\n        Apply QKV attention.\n        :param qkv: an [N x (3 * H * C) x T] tensor of Qs, Ks, and Vs.\n        :return: an [N x (H * C) x T] tensor after attention.\n        \"\"\"\n        bs, width, length = qkv.shape\n        assert width % (3 * self.n_heads) == 0\n        ch = width // (3 * self.n_heads)\n        q, k, v = qkv.chunk(3, dim=1)\n        scale = 1 / math.sqrt(math.sqrt(ch))\n        weight = th.einsum(\n            \"bct,bcs->bts\",\n            (q * scale).view(bs * self.n_heads, ch, length),\n            (k * scale).view(bs * self.n_heads, ch, length),\n        )  # More stable with f16 than dividing afterwards\n        weight = th.softmax(weight.float(), dim=-1).type(weight.dtype)\n        a = th.einsum(\"bts,bcs->bct\", weight, v.reshape(bs * self.n_heads, ch, length))\n        return a.reshape(bs, -1, length)\n\n    @staticmethod\n    def count_flops(model, _x, y):\n        return count_flops_attn(model, _x, y)\n\n\nclass UNetModel(nn.Module):\n    \"\"\"\n    The full UNet model with attention and timestep embedding.\n    :param in_channels: channels in the input Tensor.\n    :param model_channels: base channel count for the model.\n    :param out_channels: channels in the output Tensor.\n    :param num_res_blocks: number of residual blocks per downsample.\n    :param attention_resolutions: a collection of downsample rates at which\n        attention will take place. May be a set, list, or tuple.\n        For example, if this contains 4, then at 4x downsampling, attention\n        will be used.\n    :param dropout: the dropout probability.\n    :param channel_mult: channel multiplier for each level of the UNet.\n    :param conv_resample: if True, use learned convolutions for upsampling and\n        downsampling.\n    :param dims: determines if the signal is 1D, 2D, or 3D.\n    :param num_classes: if specified (as an int), then this model will be\n        class-conditional with `num_classes` classes.\n    :param use_checkpoint: use gradient checkpointing to reduce memory usage.\n    :param num_heads: the number of attention heads in each attention layer.\n    :param num_heads_channels: if specified, ignore num_heads and instead use\n                               a fixed channel width per attention head.\n    :param num_heads_upsample: works with num_heads to set a different number\n                               of heads for upsampling. Deprecated.\n    :param use_scale_shift_norm: use a FiLM-like conditioning mechanism.\n    :param resblock_updown: use residual blocks for up/downsampling.\n    :param use_new_attention_order: use a different attention pattern for potentially\n                                    increased efficiency.\n    \"\"\"\n\n    def __init__(\n        self,\n        image_size,\n        in_channels,\n        model_channels,\n        out_channels,\n        num_res_blocks,\n        attention_resolutions,\n        dropout=0,\n        channel_mult=(1, 2, 4, 8),\n        conv_resample=True,\n        dims=2,\n        num_classes=None,\n        use_checkpoint=False,\n        use_fp16=False,\n        num_heads=-1,\n        num_head_channels=-1,\n        num_heads_upsample=-1,\n        use_scale_shift_norm=False,\n        resblock_updown=False,\n        use_new_attention_order=False,\n        use_spatial_transformer=False,    # custom transformer support\n        transformer_depth=1,              # custom transformer support\n        context_dim=None,                 # custom transformer support\n        n_embed=None,                     # custom support for prediction of discrete ids into codebook of first stage vq model\n        legacy=True,\n        disable_self_attentions=None,\n        num_attention_blocks=None\n    ):\n        super().__init__()\n        if use_spatial_transformer:\n            assert context_dim is not None, 'Fool!! You forgot to include the dimension of your cross-attention conditioning...'\n\n        if context_dim is not None:\n            assert use_spatial_transformer, 'Fool!! You forgot to use the spatial transformer for your cross-attention conditioning...'\n            from omegaconf.listconfig import ListConfig\n            if type(context_dim) == ListConfig:\n                context_dim = list(context_dim)\n\n        if num_heads_upsample == -1:\n            num_heads_upsample = num_heads\n\n        if num_heads == -1:\n            assert num_head_channels != -1, 'Either num_heads or num_head_channels has to be set'\n\n        if num_head_channels == -1:\n            assert num_heads != -1, 'Either num_heads or num_head_channels has to be set'\n\n        self.image_size = image_size\n        self.in_channels = in_channels\n        self.model_channels = model_channels\n        self.out_channels = out_channels\n        if isinstance(num_res_blocks, int):\n            self.num_res_blocks = len(channel_mult) * [num_res_blocks]\n        else:\n            if len(num_res_blocks) != len(channel_mult):\n                raise ValueError(\"provide num_res_blocks either as an int (globally constant) or \"\n                                 \"as a list/tuple (per-level) with the same length as channel_mult\")\n            self.num_res_blocks = num_res_blocks\n        #self.num_res_blocks = num_res_blocks\n        if disable_self_attentions is not None:\n            # should be a list of booleans, indicating whether to disable self-attention in TransformerBlocks or not\n            assert len(disable_self_attentions) == len(channel_mult)\n        if num_attention_blocks is not None:\n            assert len(num_attention_blocks) == len(self.num_res_blocks)\n            assert all(map(lambda i: self.num_res_blocks[i] >= num_attention_blocks[i], range(len(num_attention_blocks))))\n            print(f\"Constructor of UNetModel received num_attention_blocks={num_attention_blocks}. \"\n                  f\"This option has LESS priority than attention_resolutions {attention_resolutions}, \"\n                  f\"i.e., in cases where num_attention_blocks[i] > 0 but 2**i not in attention_resolutions, \"\n                  f\"attention will still not be set.\")  # todo: convert to warning\n\n        self.attention_resolutions = attention_resolutions\n        self.dropout = dropout\n        self.channel_mult = channel_mult\n        self.conv_resample = conv_resample\n        self.num_classes = num_classes\n        self.use_checkpoint = use_checkpoint\n        self.dtype = th.float16 if use_fp16 else th.float32\n        self.num_heads = num_heads\n        self.num_head_channels = num_head_channels\n        self.num_heads_upsample = num_heads_upsample\n        self.predict_codebook_ids = n_embed is not None\n\n        time_embed_dim = model_channels * 4\n        self.time_embed = nn.Sequential(\n            linear(model_channels, time_embed_dim),\n            nn.SiLU(),\n            linear(time_embed_dim, time_embed_dim),\n        )\n\n        if self.num_classes is not None:\n            self.label_emb = nn.Embedding(num_classes, time_embed_dim)\n\n        self.input_blocks = nn.ModuleList(\n            [\n                TimestepEmbedSequential(\n                    conv_nd(dims, in_channels, model_channels, 3, padding=1)\n                )\n            ]\n        )\n        self._feature_size = model_channels\n        input_block_chans = [model_channels]\n        ch = model_channels\n        ds = 1\n        for level, mult in enumerate(channel_mult):\n            for nr in range(self.num_res_blocks[level]):\n                layers = [\n                    ResBlock(\n                        ch,\n                        time_embed_dim,\n                        dropout,\n                        out_channels=mult * model_channels,\n                        dims=dims,\n                        use_checkpoint=use_checkpoint,\n                        use_scale_shift_norm=use_scale_shift_norm,\n                    )\n                ]\n                ch = mult * model_channels\n                if ds in attention_resolutions:\n                    if num_head_channels == -1:\n                        dim_head = ch // num_heads\n                    else:\n                        num_heads = ch // num_head_channels\n                        dim_head = num_head_channels\n                    if legacy:\n                        #num_heads = 1\n                        dim_head = ch // num_heads if use_spatial_transformer else num_head_channels\n                    if exists(disable_self_attentions):\n                        disabled_sa = disable_self_attentions[level]\n                    else:\n                        disabled_sa = False\n\n                    if not exists(num_attention_blocks) or nr < num_attention_blocks[level]:\n                        layers.append(\n                            AttentionBlock(\n                                ch,\n                                use_checkpoint=use_checkpoint,\n                                num_heads=num_heads,\n                                num_head_channels=dim_head,\n                                use_new_attention_order=use_new_attention_order,\n                            ) if not use_spatial_transformer else SpatialTransformer(\n                                ch, num_heads, dim_head, depth=transformer_depth, context_dim=context_dim,\n                                disable_self_attn=disabled_sa\n                            )\n                        )\n                self.input_blocks.append(TimestepEmbedSequential(*layers))\n                self._feature_size += ch\n                input_block_chans.append(ch)\n            if level != len(channel_mult) - 1:\n                out_ch = ch\n                self.input_blocks.append(\n                    TimestepEmbedSequential(\n                        ResBlock(\n                            ch,\n                            time_embed_dim,\n                            dropout,\n                            out_channels=out_ch,\n                            dims=dims,\n                            use_checkpoint=use_checkpoint,\n                            use_scale_shift_norm=use_scale_shift_norm,\n                            down=True,\n                        )\n                        if resblock_updown\n                        else Downsample(\n                            ch, conv_resample, dims=dims, out_channels=out_ch\n                        )\n                    )\n                )\n                ch = out_ch\n                input_block_chans.append(ch)\n                ds *= 2\n                self._feature_size += ch\n\n        if num_head_channels == -1:\n            dim_head = ch // num_heads\n        else:\n            num_heads = ch // num_head_channels\n            dim_head = num_head_channels\n        if legacy:\n            #num_heads = 1\n            dim_head = ch // num_heads if use_spatial_transformer else num_head_channels\n        self.middle_block = TimestepEmbedSequential(\n            ResBlock(\n                ch,\n                time_embed_dim,\n                dropout,\n                dims=dims,\n                use_checkpoint=use_checkpoint,\n                use_scale_shift_norm=use_scale_shift_norm,\n            ),\n            AttentionBlock(\n                ch,\n                use_checkpoint=use_checkpoint,\n                num_heads=num_heads,\n                num_head_channels=dim_head,\n                use_new_attention_order=use_new_attention_order,\n            ) if not use_spatial_transformer else SpatialTransformer(  # always uses a self-attn\n                            ch, num_heads, dim_head, depth=transformer_depth, context_dim=context_dim\n                        ),\n            ResBlock(\n                ch,\n                time_embed_dim,\n                dropout,\n                dims=dims,\n                use_checkpoint=use_checkpoint,\n                use_scale_shift_norm=use_scale_shift_norm,\n            ),\n        )\n        self._feature_size += ch\n\n        self.output_blocks = nn.ModuleList([])\n        for level, mult in list(enumerate(channel_mult))[::-1]:\n            for i in range(self.num_res_blocks[level] + 1):\n                ich = input_block_chans.pop()\n                layers = [\n                    ResBlock(\n                        ch + ich,\n                        time_embed_dim,\n                        dropout,\n                        out_channels=model_channels * mult,\n                        dims=dims,\n                        use_checkpoint=use_checkpoint,\n                        use_scale_shift_norm=use_scale_shift_norm,\n                    )\n                ]\n                ch = model_channels * mult\n                if ds in attention_resolutions:\n                    if num_head_channels == -1:\n                        dim_head = ch // num_heads\n                    else:\n                        num_heads = ch // num_head_channels\n                        dim_head = num_head_channels\n                    if legacy:\n                        #num_heads = 1\n                        dim_head = ch // num_heads if use_spatial_transformer else num_head_channels\n                    if exists(disable_self_attentions):\n                        disabled_sa = disable_self_attentions[level]\n                    else:\n                        disabled_sa = False\n\n                    if not exists(num_attention_blocks) or i < num_attention_blocks[level]:\n                        layers.append(\n                            AttentionBlock(\n                                ch,\n                                use_checkpoint=use_checkpoint,\n                                num_heads=num_heads_upsample,\n                                num_head_channels=dim_head,\n                                use_new_attention_order=use_new_attention_order,\n                            ) if not use_spatial_transformer else SpatialTransformer(\n                                ch, num_heads, dim_head, depth=transformer_depth, context_dim=context_dim,\n                                disable_self_attn=disabled_sa\n                            )\n                        )\n                if level and i == self.num_res_blocks[level]:\n                    out_ch = ch\n                    layers.append(\n                        ResBlock(\n                            ch,\n                            time_embed_dim,\n                            dropout,\n                            out_channels=out_ch,\n                            dims=dims,\n                            use_checkpoint=use_checkpoint,\n                            use_scale_shift_norm=use_scale_shift_norm,\n                            up=True,\n                        )\n                        if resblock_updown\n                        else Upsample(ch, conv_resample, dims=dims, out_channels=out_ch)\n                    )\n                    ds //= 2\n                self.output_blocks.append(TimestepEmbedSequential(*layers))\n                self._feature_size += ch\n\n        self.out = nn.Sequential(\n            normalization(ch),\n            nn.SiLU(),\n            zero_module(conv_nd(dims, model_channels, out_channels, 3, padding=1)),\n        )\n        if self.predict_codebook_ids:\n            self.id_predictor = nn.Sequential(\n            normalization(ch),\n            conv_nd(dims, model_channels, n_embed, 1),\n            #nn.LogSoftmax(dim=1)  # change to cross_entropy and produce non-normalized logits\n        )\n\n    def convert_to_fp16(self):\n        \"\"\"\n        Convert the torso of the model to float16.\n        \"\"\"\n        self.input_blocks.apply(convert_module_to_f16)\n        self.middle_block.apply(convert_module_to_f16)\n        self.output_blocks.apply(convert_module_to_f16)\n\n    def convert_to_fp32(self):\n        \"\"\"\n        Convert the torso of the model to float32.\n        \"\"\"\n        self.input_blocks.apply(convert_module_to_f32)\n        self.middle_block.apply(convert_module_to_f32)\n        self.output_blocks.apply(convert_module_to_f32)\n\n    def forward(self, x, timesteps=None, context=None, y=None,**kwargs):\n        \"\"\"\n        Apply the model to an input batch.\n        :param x: an [N x C x ...] Tensor of inputs.\n        :param timesteps: a 1-D batch of timesteps.\n        :param context: conditioning plugged in via crossattn\n        :param y: an [N] Tensor of labels, if class-conditional.\n        :return: an [N x C x ...] Tensor of outputs.\n        \"\"\"\n        assert (y is not None) == (\n            self.num_classes is not None\n        ), \"must specify y if and only if the model is class-conditional\"\n        hs = []\n        t_emb = timestep_embedding(timesteps, self.model_channels, repeat_only=False)\n        emb = self.time_embed(t_emb)\n\n        if self.num_classes is not None:\n            assert y.shape == (x.shape[0],)\n            emb = emb + self.label_emb(y)\n\n        h = x.type(self.dtype)\n        for module in self.input_blocks:\n            h = module(h, emb, context)\n            hs.append(h)\n        h = self.middle_block(h, emb, context)\n        for module in self.output_blocks:\n            h = th.cat([h, hs.pop()], dim=1)\n            h = module(h, emb, context)\n        h = h.type(x.dtype)\n        if self.predict_codebook_ids:\n            return self.id_predictor(h)\n        else:\n            return self.out(h)\n\n\nclass EncoderUNetModel(nn.Module):\n    \"\"\"\n    The half UNet model with attention and timestep embedding.\n    For usage, see UNet.\n    \"\"\"\n\n    def __init__(\n        self,\n        image_size,\n        in_channels,\n        model_channels,\n        out_channels,\n        num_res_blocks,\n        attention_resolutions,\n        dropout=0,\n        channel_mult=(1, 2, 4, 8),\n        conv_resample=True,\n        dims=2,\n        use_checkpoint=False,\n        use_fp16=False,\n        num_heads=1,\n        num_head_channels=-1,\n        num_heads_upsample=-1,\n        use_scale_shift_norm=False,\n        resblock_updown=False,\n        use_new_attention_order=False,\n        pool=\"adaptive\",\n        *args,\n        **kwargs\n    ):\n        super().__init__()\n\n        if num_heads_upsample == -1:\n            num_heads_upsample = num_heads\n\n        self.in_channels = in_channels\n        self.model_channels = model_channels\n        self.out_channels = out_channels\n        self.num_res_blocks = num_res_blocks\n        self.attention_resolutions = attention_resolutions\n        self.dropout = dropout\n        self.channel_mult = channel_mult\n        self.conv_resample = conv_resample\n        self.use_checkpoint = use_checkpoint\n        self.dtype = th.float16 if use_fp16 else th.float32\n        self.num_heads = num_heads\n        self.num_head_channels = num_head_channels\n        self.num_heads_upsample = num_heads_upsample\n\n        time_embed_dim = model_channels * 4\n        self.time_embed = nn.Sequential(\n            linear(model_channels, time_embed_dim),\n            nn.SiLU(),\n            linear(time_embed_dim, time_embed_dim),\n        )\n\n        self.input_blocks = nn.ModuleList(\n            [\n                TimestepEmbedSequential(\n                    conv_nd(dims, in_channels, model_channels, 3, padding=1)\n                )\n            ]\n        )\n        self._feature_size = model_channels\n        input_block_chans = [model_channels]\n        ch = model_channels\n        ds = 1\n        for level, mult in enumerate(channel_mult):\n            for _ in range(num_res_blocks):\n                layers = [\n                    ResBlock(\n                        ch,\n                        time_embed_dim,\n                        dropout,\n                        out_channels=mult * model_channels,\n                        dims=dims,\n                        use_checkpoint=use_checkpoint,\n                        use_scale_shift_norm=use_scale_shift_norm,\n                    )\n                ]\n                ch = mult * model_channels\n                if ds in attention_resolutions:\n                    layers.append(\n                        AttentionBlock(\n                            ch,\n                            use_checkpoint=use_checkpoint,\n                            num_heads=num_heads,\n                            num_head_channels=num_head_channels,\n                            use_new_attention_order=use_new_attention_order,\n                        )\n                    )\n                self.input_blocks.append(TimestepEmbedSequential(*layers))\n                self._feature_size += ch\n                input_block_chans.append(ch)\n            if level != len(channel_mult) - 1:\n                out_ch = ch\n                self.input_blocks.append(\n                    TimestepEmbedSequential(\n                        ResBlock(\n                            ch,\n                            time_embed_dim,\n                            dropout,\n                            out_channels=out_ch,\n                            dims=dims,\n                            use_checkpoint=use_checkpoint,\n                            use_scale_shift_norm=use_scale_shift_norm,\n                            down=True,\n                        )\n                        if resblock_updown\n                        else Downsample(\n                            ch, conv_resample, dims=dims, out_channels=out_ch\n                        )\n                    )\n                )\n                ch = out_ch\n                input_block_chans.append(ch)\n                ds *= 2\n                self._feature_size += ch\n\n        self.middle_block = TimestepEmbedSequential(\n            ResBlock(\n                ch,\n                time_embed_dim,\n                dropout,\n                dims=dims,\n                use_checkpoint=use_checkpoint,\n                use_scale_shift_norm=use_scale_shift_norm,\n            ),\n            AttentionBlock(\n                ch,\n                use_checkpoint=use_checkpoint,\n                num_heads=num_heads,\n                num_head_channels=num_head_channels,\n                use_new_attention_order=use_new_attention_order,\n            ),\n            ResBlock(\n                ch,\n                time_embed_dim,\n                dropout,\n                dims=dims,\n                use_checkpoint=use_checkpoint,\n                use_scale_shift_norm=use_scale_shift_norm,\n            ),\n        )\n        self._feature_size += ch\n        self.pool = pool\n        if pool == \"adaptive\":\n            self.out = nn.Sequential(\n                normalization(ch),\n                nn.SiLU(),\n                nn.AdaptiveAvgPool2d((1, 1)),\n                zero_module(conv_nd(dims, ch, out_channels, 1)),\n                nn.Flatten(),\n            )\n        elif pool == \"attention\":\n            assert num_head_channels != -1\n            self.out = nn.Sequential(\n                normalization(ch),\n                nn.SiLU(),\n                AttentionPool2d(\n                    (image_size // ds), ch, num_head_channels, out_channels\n                ),\n            )\n        elif pool == \"spatial\":\n            self.out = nn.Sequential(\n                nn.Linear(self._feature_size, 2048),\n                nn.ReLU(),\n                nn.Linear(2048, self.out_channels),\n            )\n        elif pool == \"spatial_v2\":\n            self.out = nn.Sequential(\n                nn.Linear(self._feature_size, 2048),\n                normalization(2048),\n                nn.SiLU(),\n                nn.Linear(2048, self.out_channels),\n            )\n        else:\n            raise NotImplementedError(f\"Unexpected {pool} pooling\")\n\n    def convert_to_fp16(self):\n        \"\"\"\n        Convert the torso of the model to float16.\n        \"\"\"\n        self.input_blocks.apply(convert_module_to_f16)\n        self.middle_block.apply(convert_module_to_f16)\n\n    def convert_to_fp32(self):\n        \"\"\"\n        Convert the torso of the model to float32.\n        \"\"\"\n        self.input_blocks.apply(convert_module_to_f32)\n        self.middle_block.apply(convert_module_to_f32)\n\n    def forward(self, x, timesteps):\n        \"\"\"\n        Apply the model to an input batch.\n        :param x: an [N x C x ...] Tensor of inputs.\n        :param timesteps: a 1-D batch of timesteps.\n        :return: an [N x K] Tensor of outputs.\n        \"\"\"\n        emb = self.time_embed(timestep_embedding(timesteps, self.model_channels))\n\n        results = []\n        h = x.type(self.dtype)\n        for module in self.input_blocks:\n            h = module(h, emb)\n            if self.pool.startswith(\"spatial\"):\n                results.append(h.type(x.dtype).mean(dim=(2, 3)))\n        h = self.middle_block(h, emb)\n        if self.pool.startswith(\"spatial\"):\n            results.append(h.type(x.dtype).mean(dim=(2, 3)))\n            h = th.cat(results, axis=-1)\n            return self.out(h)\n        else:\n            h = h.type(x.dtype)\n            return self.out(h)\n\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/diffusionmodules/util.py",
    "content": "# adopted from\n# https://github.com/openai/improved-diffusion/blob/main/improved_diffusion/gaussian_diffusion.py\n# and\n# https://github.com/lucidrains/denoising-diffusion-pytorch/blob/7706bdfc6f527f58d33f84b7b522e61e6e3164b3/denoising_diffusion_pytorch/denoising_diffusion_pytorch.py\n# and\n# https://github.com/openai/guided-diffusion/blob/0ba878e517b276c45d1195eb29f6f5f72659a05b/guided_diffusion/nn.py\n#\n# thanks!\n\n\nimport os\nimport math\nimport torch\nimport torch.nn as nn\nimport numpy as np\nfrom einops import repeat\n\nfrom ldm.util import instantiate_from_config\n\n\ndef make_beta_schedule(schedule, n_timestep, linear_start=1e-4, linear_end=2e-2, cosine_s=8e-3):\n    if schedule == \"linear\":\n        betas = (\n                torch.linspace(linear_start ** 0.5, linear_end ** 0.5, n_timestep, dtype=torch.float64) ** 2\n        )\n\n    elif schedule == \"cosine\":\n        timesteps = (\n                torch.arange(n_timestep + 1, dtype=torch.float64) / n_timestep + cosine_s\n        )\n        alphas = timesteps / (1 + cosine_s) * np.pi / 2\n        alphas = torch.cos(alphas).pow(2)\n        alphas = alphas / alphas[0]\n        betas = 1 - alphas[1:] / alphas[:-1]\n        betas = np.clip(betas, a_min=0, a_max=0.999)\n\n    elif schedule == \"sqrt_linear\":\n        betas = torch.linspace(linear_start, linear_end, n_timestep, dtype=torch.float64)\n    elif schedule == \"sqrt\":\n        betas = torch.linspace(linear_start, linear_end, n_timestep, dtype=torch.float64) ** 0.5\n    else:\n        raise ValueError(f\"schedule '{schedule}' unknown.\")\n    return betas.numpy()\n\n\ndef make_ddim_timesteps(ddim_discr_method, num_ddim_timesteps, num_ddpm_timesteps, verbose=True):\n    if ddim_discr_method == 'uniform':\n        c = num_ddpm_timesteps // num_ddim_timesteps\n        ddim_timesteps = np.asarray(list(range(0, num_ddpm_timesteps, c)))\n    elif ddim_discr_method == 'quad':\n        ddim_timesteps = ((np.linspace(0, np.sqrt(num_ddpm_timesteps * .8), num_ddim_timesteps)) ** 2).astype(int)\n    else:\n        raise NotImplementedError(f'There is no ddim discretization method called \"{ddim_discr_method}\"')\n\n    # assert ddim_timesteps.shape[0] == num_ddim_timesteps\n    # add one to get the final alpha values right (the ones from first scale to data during sampling)\n    steps_out = ddim_timesteps + 1\n    if verbose:\n        print(f'Selected timesteps for ddim sampler: {steps_out}')\n    return steps_out\n\n\ndef make_ddim_sampling_parameters(alphacums, ddim_timesteps, eta, verbose=True):\n    # select alphas for computing the variance schedule\n    alphas = alphacums[ddim_timesteps]\n    alphas_prev = np.asarray([alphacums[0]] + alphacums[ddim_timesteps[:-1]].tolist())\n\n    # according the the formula provided in https://arxiv.org/abs/2010.02502\n    sigmas = eta * np.sqrt((1 - alphas_prev) / (1 - alphas) * (1 - alphas / alphas_prev))\n    if verbose:\n        print(f'Selected alphas for ddim sampler: a_t: {alphas}; a_(t-1): {alphas_prev}')\n        print(f'For the chosen value of eta, which is {eta}, '\n              f'this results in the following sigma_t schedule for ddim sampler {sigmas}')\n    return sigmas, alphas, alphas_prev\n\n\ndef betas_for_alpha_bar(num_diffusion_timesteps, alpha_bar, max_beta=0.999):\n    \"\"\"\n    Create a beta schedule that discretizes the given alpha_t_bar function,\n    which defines the cumulative product of (1-beta) over time from t = [0,1].\n    :param num_diffusion_timesteps: the number of betas to produce.\n    :param alpha_bar: a lambda that takes an argument t from 0 to 1 and\n                      produces the cumulative product of (1-beta) up to that\n                      part of the diffusion process.\n    :param max_beta: the maximum beta to use; use values lower than 1 to\n                     prevent singularities.\n    \"\"\"\n    betas = []\n    for i in range(num_diffusion_timesteps):\n        t1 = i / num_diffusion_timesteps\n        t2 = (i + 1) / num_diffusion_timesteps\n        betas.append(min(1 - alpha_bar(t2) / alpha_bar(t1), max_beta))\n    return np.array(betas)\n\n\ndef extract_into_tensor(a, t, x_shape):\n    b, *_ = t.shape\n    out = a.gather(-1, t)\n    return out.reshape(b, *((1,) * (len(x_shape) - 1)))\n\n\ndef checkpoint(func, inputs, params, flag):\n    \"\"\"\n    Evaluate a function without caching intermediate activations, allowing for\n    reduced memory at the expense of extra compute in the backward pass.\n    :param func: the function to evaluate.\n    :param inputs: the argument sequence to pass to `func`.\n    :param params: a sequence of parameters `func` depends on but does not\n                   explicitly take as arguments.\n    :param flag: if False, disable gradient checkpointing.\n    \"\"\"\n    if flag:\n        args = tuple(inputs) + tuple(params)\n        return CheckpointFunction.apply(func, len(inputs), *args)\n    else:\n        return func(*inputs)\n\n\nclass CheckpointFunction(torch.autograd.Function):\n    @staticmethod\n    def forward(ctx, run_function, length, *args):\n        ctx.run_function = run_function\n        ctx.input_tensors = list(args[:length])\n        ctx.input_params = list(args[length:])\n\n        with torch.no_grad():\n            output_tensors = ctx.run_function(*ctx.input_tensors)\n        return output_tensors\n\n    @staticmethod\n    def backward(ctx, *output_grads):\n        ctx.input_tensors = [x.detach().requires_grad_(True) for x in ctx.input_tensors]\n        with torch.enable_grad():\n            # Fixes a bug where the first op in run_function modifies the\n            # Tensor storage in place, which is not allowed for detach()'d\n            # Tensors.\n            shallow_copies = [x.view_as(x) for x in ctx.input_tensors]\n            output_tensors = ctx.run_function(*shallow_copies)\n        input_grads = torch.autograd.grad(\n            output_tensors,\n            ctx.input_tensors + ctx.input_params,\n            output_grads,\n            allow_unused=True,\n        )\n        del ctx.input_tensors\n        del ctx.input_params\n        del output_tensors\n        return (None, None) + input_grads\n\n\ndef timestep_embedding(timesteps, dim, max_period=10000, repeat_only=False):\n    \"\"\"\n    Create sinusoidal timestep embeddings.\n    :param timesteps: a 1-D Tensor of N indices, one per batch element.\n                      These may be fractional.\n    :param dim: the dimension of the output.\n    :param max_period: controls the minimum frequency of the embeddings.\n    :return: an [N x dim] Tensor of positional embeddings.\n    \"\"\"\n    if not repeat_only:\n        half = dim // 2\n        freqs = torch.exp(\n            -math.log(max_period) * torch.arange(start=0, end=half, dtype=torch.float32) / half\n        ).to(device=timesteps.device)\n        args = timesteps[:, None].float() * freqs[None]\n        embedding = torch.cat([torch.cos(args), torch.sin(args)], dim=-1)\n        if dim % 2:\n            embedding = torch.cat([embedding, torch.zeros_like(embedding[:, :1])], dim=-1)\n    else:\n        embedding = repeat(timesteps, 'b -> b d', d=dim)\n    return embedding\n\n\ndef zero_module(module):\n    \"\"\"\n    Zero out the parameters of a module and return it.\n    \"\"\"\n    for p in module.parameters():\n        p.detach().zero_()\n    return module\n\n\ndef scale_module(module, scale):\n    \"\"\"\n    Scale the parameters of a module and return it.\n    \"\"\"\n    for p in module.parameters():\n        p.detach().mul_(scale)\n    return module\n\n\ndef mean_flat(tensor):\n    \"\"\"\n    Take the mean over all non-batch dimensions.\n    \"\"\"\n    return tensor.mean(dim=list(range(1, len(tensor.shape))))\n\n\ndef normalization(channels):\n    \"\"\"\n    Make a standard normalization layer.\n    :param channels: number of input channels.\n    :return: an nn.Module for normalization.\n    \"\"\"\n    return GroupNorm32(32, channels)\n\n\n# PyTorch 1.7 has SiLU, but we support PyTorch 1.5.\nclass SiLU(nn.Module):\n    def forward(self, x):\n        return x * torch.sigmoid(x)\n\n\nclass GroupNorm32(nn.GroupNorm):\n    def forward(self, x):\n        return super().forward(x.float()).type(x.dtype)\n\ndef conv_nd(dims, *args, **kwargs):\n    \"\"\"\n    Create a 1D, 2D, or 3D convolution module.\n    \"\"\"\n    if dims == 1:\n        return nn.Conv1d(*args, **kwargs)\n    elif dims == 2:\n        return nn.Conv2d(*args, **kwargs)\n    elif dims == 3:\n        return nn.Conv3d(*args, **kwargs)\n    raise ValueError(f\"unsupported dimensions: {dims}\")\n\n\ndef linear(*args, **kwargs):\n    \"\"\"\n    Create a linear module.\n    \"\"\"\n    return nn.Linear(*args, **kwargs)\n\n\ndef avg_pool_nd(dims, *args, **kwargs):\n    \"\"\"\n    Create a 1D, 2D, or 3D average pooling module.\n    \"\"\"\n    if dims == 1:\n        return nn.AvgPool1d(*args, **kwargs)\n    elif dims == 2:\n        return nn.AvgPool2d(*args, **kwargs)\n    elif dims == 3:\n        return nn.AvgPool3d(*args, **kwargs)\n    raise ValueError(f\"unsupported dimensions: {dims}\")\n\n\nclass HybridConditioner(nn.Module):\n\n    def __init__(self, c_concat_config, c_crossattn_config):\n        super().__init__()\n        self.concat_conditioner = instantiate_from_config(c_concat_config)\n        self.crossattn_conditioner = instantiate_from_config(c_crossattn_config)\n\n    def forward(self, c_concat, c_crossattn):\n        c_concat = self.concat_conditioner(c_concat)\n        c_crossattn = self.crossattn_conditioner(c_crossattn)\n        return {'c_concat': [c_concat], 'c_crossattn': [c_crossattn]}\n\n\ndef noise_like(shape, device, repeat=False):\n    repeat_noise = lambda: torch.randn((1, *shape[1:]), device=device).repeat(shape[0], *((1,) * (len(shape) - 1)))\n    noise = lambda: torch.randn(shape, device=device)\n    return repeat_noise() if repeat else noise()"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/distributions/__init__.py",
    "content": ""
  },
  {
    "path": "stable-dreamfusion/ldm/modules/distributions/distributions.py",
    "content": "import torch\nimport numpy as np\n\n\nclass AbstractDistribution:\n    def sample(self):\n        raise NotImplementedError()\n\n    def mode(self):\n        raise NotImplementedError()\n\n\nclass DiracDistribution(AbstractDistribution):\n    def __init__(self, value):\n        self.value = value\n\n    def sample(self):\n        return self.value\n\n    def mode(self):\n        return self.value\n\n\nclass DiagonalGaussianDistribution(object):\n    def __init__(self, parameters, deterministic=False):\n        self.parameters = parameters\n        self.mean, self.logvar = torch.chunk(parameters, 2, dim=1)\n        self.logvar = torch.clamp(self.logvar, -30.0, 20.0)\n        self.deterministic = deterministic\n        self.std = torch.exp(0.5 * self.logvar)\n        self.var = torch.exp(self.logvar)\n        if self.deterministic:\n            self.var = self.std = torch.zeros_like(self.mean).to(device=self.parameters.device)\n\n    def sample(self):\n        x = self.mean + self.std * torch.randn(self.mean.shape).to(device=self.parameters.device)\n        return x\n\n    def kl(self, other=None):\n        if self.deterministic:\n            return torch.Tensor([0.])\n        else:\n            if other is None:\n                return 0.5 * torch.sum(torch.pow(self.mean, 2)\n                                       + self.var - 1.0 - self.logvar,\n                                       dim=[1, 2, 3])\n            else:\n                return 0.5 * torch.sum(\n                    torch.pow(self.mean - other.mean, 2) / other.var\n                    + self.var / other.var - 1.0 - self.logvar + other.logvar,\n                    dim=[1, 2, 3])\n\n    def nll(self, sample, dims=[1,2,3]):\n        if self.deterministic:\n            return torch.Tensor([0.])\n        logtwopi = np.log(2.0 * np.pi)\n        return 0.5 * torch.sum(\n            logtwopi + self.logvar + torch.pow(sample - self.mean, 2) / self.var,\n            dim=dims)\n\n    def mode(self):\n        return self.mean\n\n\ndef normal_kl(mean1, logvar1, mean2, logvar2):\n    \"\"\"\n    source: https://github.com/openai/guided-diffusion/blob/27c20a8fab9cb472df5d6bdd6c8d11c8f430b924/guided_diffusion/losses.py#L12\n    Compute the KL divergence between two gaussians.\n    Shapes are automatically broadcasted, so batches can be compared to\n    scalars, among other use cases.\n    \"\"\"\n    tensor = None\n    for obj in (mean1, logvar1, mean2, logvar2):\n        if isinstance(obj, torch.Tensor):\n            tensor = obj\n            break\n    assert tensor is not None, \"at least one argument must be a Tensor\"\n\n    # Force variances to be Tensors. Broadcasting helps convert scalars to\n    # Tensors, but it does not work for torch.exp().\n    logvar1, logvar2 = [\n        x if isinstance(x, torch.Tensor) else torch.tensor(x).to(tensor)\n        for x in (logvar1, logvar2)\n    ]\n\n    return 0.5 * (\n        -1.0\n        + logvar2\n        - logvar1\n        + torch.exp(logvar1 - logvar2)\n        + ((mean1 - mean2) ** 2) * torch.exp(-logvar2)\n    )\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/ema.py",
    "content": "import torch\nfrom torch import nn\n\n\nclass LitEma(nn.Module):\n    def __init__(self, model, decay=0.9999, use_num_upates=True):\n        super().__init__()\n        if decay < 0.0 or decay > 1.0:\n            raise ValueError('Decay must be between 0 and 1')\n\n        self.m_name2s_name = {}\n        self.register_buffer('decay', torch.tensor(decay, dtype=torch.float32))\n        self.register_buffer('num_updates', torch.tensor(0,dtype=torch.int) if use_num_upates\n                             else torch.tensor(-1,dtype=torch.int))\n\n        for name, p in model.named_parameters():\n            if p.requires_grad:\n                #remove as '.'-character is not allowed in buffers\n                s_name = name.replace('.','')\n                self.m_name2s_name.update({name:s_name})\n                self.register_buffer(s_name,p.clone().detach().data)\n\n        self.collected_params = []\n\n    def forward(self,model):\n        decay = self.decay\n\n        if self.num_updates >= 0:\n            self.num_updates += 1\n            decay = min(self.decay,(1 + self.num_updates) / (10 + self.num_updates))\n\n        one_minus_decay = 1.0 - decay\n\n        with torch.no_grad():\n            m_param = dict(model.named_parameters())\n            shadow_params = dict(self.named_buffers())\n\n            for key in m_param:\n                if m_param[key].requires_grad:\n                    sname = self.m_name2s_name[key]\n                    shadow_params[sname] = shadow_params[sname].type_as(m_param[key])\n                    shadow_params[sname].sub_(one_minus_decay * (shadow_params[sname] - m_param[key]))\n                else:\n                    assert not key in self.m_name2s_name\n\n    def copy_to(self, model):\n        m_param = dict(model.named_parameters())\n        shadow_params = dict(self.named_buffers())\n        for key in m_param:\n            if m_param[key].requires_grad:\n                m_param[key].data.copy_(shadow_params[self.m_name2s_name[key]].data)\n            else:\n                assert not key in self.m_name2s_name\n\n    def store(self, parameters):\n        \"\"\"\n        Save the current parameters for restoring later.\n        Args:\n          parameters: Iterable of `torch.nn.Parameter`; the parameters to be\n            temporarily stored.\n        \"\"\"\n        self.collected_params = [param.clone() for param in parameters]\n\n    def restore(self, parameters):\n        \"\"\"\n        Restore the parameters stored with the `store` method.\n        Useful to validate the model with EMA parameters without affecting the\n        original optimization process. Store the parameters before the\n        `copy_to` method. After validation (or model saving), use this to\n        restore the former parameters.\n        Args:\n          parameters: Iterable of `torch.nn.Parameter`; the parameters to be\n            updated with the stored parameters.\n        \"\"\"\n        for c_param, param in zip(self.collected_params, parameters):\n            param.data.copy_(c_param.data)\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/encoders/__init__.py",
    "content": ""
  },
  {
    "path": "stable-dreamfusion/ldm/modules/encoders/modules.py",
    "content": "import torch\nimport torch.nn as nn\nimport numpy as np\nfrom functools import partial\nimport kornia\n\nfrom ldm.modules.x_transformer import Encoder, TransformerWrapper  # TODO: can we directly rely on lucidrains code and simply add this as a reuirement? --> test\nfrom ldm.util import default\nimport clip\n\n\nclass AbstractEncoder(nn.Module):\n    def __init__(self):\n        super().__init__()\n\n    def encode(self, *args, **kwargs):\n        raise NotImplementedError\n\nclass IdentityEncoder(AbstractEncoder):\n\n    def encode(self, x):\n        return x\n\nclass FaceClipEncoder(AbstractEncoder):\n    def __init__(self, augment=True, retreival_key=None):\n        super().__init__()\n        self.encoder = FrozenCLIPImageEmbedder()\n        self.augment = augment\n        self.retreival_key = retreival_key\n\n    def forward(self, img):\n        encodings = []\n        with torch.no_grad():\n            x_offset = 125\n            if self.retreival_key:\n                # Assumes retrieved image are packed into the second half of channels\n                face = img[:,3:,190:440,x_offset:(512-x_offset)]\n                other = img[:,:3,...].clone()\n            else:\n                face = img[:,:,190:440,x_offset:(512-x_offset)]\n                other = img.clone()\n\n            if self.augment:\n                face = K.RandomHorizontalFlip()(face)\n\n            other[:,:,190:440,x_offset:(512-x_offset)] *= 0\n            encodings = [\n                self.encoder.encode(face),\n                self.encoder.encode(other),\n            ]\n\n        return torch.cat(encodings, dim=1)\n\n    def encode(self, img):\n        if isinstance(img, list):\n            # Uncondition\n            return torch.zeros((1, 2, 768), device=self.encoder.model.visual.conv1.weight.device)\n\n        return self(img)\n\nclass FaceIdClipEncoder(AbstractEncoder):\n    def __init__(self):\n        super().__init__()\n        self.encoder = FrozenCLIPImageEmbedder()\n        for p in self.encoder.parameters():\n            p.requires_grad = False\n        self.id = FrozenFaceEncoder(\"/home/jpinkney/code/stable-diffusion/model_ir_se50.pth\", augment=True)\n\n    def forward(self, img):\n        encodings = []\n        with torch.no_grad():\n            face = kornia.geometry.resize(img, (256, 256),\n                            interpolation='bilinear', align_corners=True)\n\n            other = img.clone()\n            other[:,:,184:452,122:396] *= 0\n            encodings = [\n                self.id.encode(face),\n                self.encoder.encode(other),\n            ]\n\n        return torch.cat(encodings, dim=1)\n\n    def encode(self, img):\n        if isinstance(img, list):\n            # Uncondition\n            return torch.zeros((1, 2, 768), device=self.encoder.model.visual.conv1.weight.device)\n\n        return self(img)\n\nclass ClassEmbedder(nn.Module):\n    def __init__(self, embed_dim, n_classes=1000, key='class'):\n        super().__init__()\n        self.key = key\n        self.embedding = nn.Embedding(n_classes, embed_dim)\n\n    def forward(self, batch, key=None):\n        if key is None:\n            key = self.key\n        # this is for use in crossattn\n        c = batch[key][:, None]\n        c = self.embedding(c)\n        return c\n\n\nclass TransformerEmbedder(AbstractEncoder):\n    \"\"\"Some transformer encoder layers\"\"\"\n    def __init__(self, n_embed, n_layer, vocab_size, max_seq_len=77, device=\"cuda\"):\n        super().__init__()\n        self.device = device\n        self.transformer = TransformerWrapper(num_tokens=vocab_size, max_seq_len=max_seq_len,\n                                              attn_layers=Encoder(dim=n_embed, depth=n_layer))\n\n    def forward(self, tokens):\n        tokens = tokens.to(self.device)  # meh\n        z = self.transformer(tokens, return_embeddings=True)\n        return z\n\n    def encode(self, x):\n        return self(x)\n\n\nclass BERTTokenizer(AbstractEncoder):\n    \"\"\" Uses a pretrained BERT tokenizer by huggingface. Vocab size: 30522 (?)\"\"\"\n    def __init__(self, device=\"cuda\", vq_interface=True, max_length=77):\n        super().__init__()\n        from transformers import BertTokenizerFast  # TODO: add to reuquirements\n        self.tokenizer = BertTokenizerFast.from_pretrained(\"bert-base-uncased\")\n        self.device = device\n        self.vq_interface = vq_interface\n        self.max_length = max_length\n\n    def forward(self, text):\n        batch_encoding = self.tokenizer(text, truncation=True, max_length=self.max_length, return_length=True,\n                                        return_overflowing_tokens=False, padding=\"max_length\", return_tensors=\"pt\")\n        tokens = batch_encoding[\"input_ids\"].to(self.device)\n        return tokens\n\n    @torch.no_grad()\n    def encode(self, text):\n        tokens = self(text)\n        if not self.vq_interface:\n            return tokens\n        return None, None, [None, None, tokens]\n\n    def decode(self, text):\n        return text\n\n\nclass BERTEmbedder(AbstractEncoder):\n    \"\"\"Uses the BERT tokenizr model and add some transformer encoder layers\"\"\"\n    def __init__(self, n_embed, n_layer, vocab_size=30522, max_seq_len=77,\n                 device=\"cuda\",use_tokenizer=True, embedding_dropout=0.0):\n        super().__init__()\n        self.use_tknz_fn = use_tokenizer\n        if self.use_tknz_fn:\n            self.tknz_fn = BERTTokenizer(vq_interface=False, max_length=max_seq_len)\n        self.device = device\n        self.transformer = TransformerWrapper(num_tokens=vocab_size, max_seq_len=max_seq_len,\n                                              attn_layers=Encoder(dim=n_embed, depth=n_layer),\n                                              emb_dropout=embedding_dropout)\n\n    def forward(self, text):\n        if self.use_tknz_fn:\n            tokens = self.tknz_fn(text)#.to(self.device)\n        else:\n            tokens = text\n        z = self.transformer(tokens, return_embeddings=True)\n        return z\n\n    def encode(self, text):\n        # output of length 77\n        return self(text)\n\n\nfrom transformers import T5Tokenizer, T5EncoderModel, CLIPTokenizer, CLIPTextModel\n\ndef disabled_train(self, mode=True):\n    \"\"\"Overwrite model.train with this function to make sure train/eval mode\n    does not change anymore.\"\"\"\n    return self\n\n\nclass FrozenT5Embedder(AbstractEncoder):\n    \"\"\"Uses the T5 transformer encoder for text\"\"\"\n    def __init__(self, version=\"google/t5-v1_1-large\", device=\"cuda\", max_length=77):  # others are google/t5-v1_1-xl and google/t5-v1_1-xxl\n        super().__init__()\n        self.tokenizer = T5Tokenizer.from_pretrained(version)\n        self.transformer = T5EncoderModel.from_pretrained(version)\n        self.device = device\n        self.max_length = max_length   # TODO: typical value?\n        self.freeze()\n\n    def freeze(self):\n        self.transformer = self.transformer.eval()\n        #self.train = disabled_train\n        for param in self.parameters():\n            param.requires_grad = False\n\n    def forward(self, text):\n        batch_encoding = self.tokenizer(text, truncation=True, max_length=self.max_length, return_length=True,\n                                        return_overflowing_tokens=False, padding=\"max_length\", return_tensors=\"pt\")\n        tokens = batch_encoding[\"input_ids\"].to(self.device)\n        outputs = self.transformer(input_ids=tokens)\n\n        z = outputs.last_hidden_state\n        return z\n\n    def encode(self, text):\n        return self(text)\n\nfrom ldm.thirdp.psp.id_loss import IDFeatures\nimport kornia.augmentation as K\n\nclass FrozenFaceEncoder(AbstractEncoder):\n    def __init__(self, model_path, augment=False):\n        super().__init__()\n        self.loss_fn = IDFeatures(model_path)\n        # face encoder is frozen\n        for p in self.loss_fn.parameters():\n            p.requires_grad = False\n        # Mapper is trainable\n        self.mapper = torch.nn.Linear(512, 768)\n        p = 0.25\n        if augment:\n            self.augment = K.AugmentationSequential(\n                K.RandomHorizontalFlip(p=0.5),\n                K.RandomEqualize(p=p),\n                # K.RandomPlanckianJitter(p=p),\n                # K.RandomPlasmaBrightness(p=p),\n                # K.RandomPlasmaContrast(p=p),\n                # K.ColorJiggle(0.02, 0.2, 0.2, p=p),\n            )\n        else:\n            self.augment = False\n\n    def forward(self, img):\n        if isinstance(img, list):\n            # Uncondition\n            return torch.zeros((1, 1, 768), device=self.mapper.weight.device)\n\n        if self.augment is not None:\n            # Transforms require 0-1\n            img = self.augment((img + 1)/2)\n            img = 2*img - 1\n\n        feat = self.loss_fn(img, crop=True)\n        feat = self.mapper(feat.unsqueeze(1))\n        return feat\n\n    def encode(self, img):\n        return self(img)\n\nclass FrozenCLIPEmbedder(AbstractEncoder):\n    \"\"\"Uses the CLIP transformer encoder for text (from huggingface)\"\"\"\n    def __init__(self, version=\"openai/clip-vit-large-patch14\", device=\"cuda\", max_length=77):  # clip-vit-base-patch32\n        super().__init__()\n        self.tokenizer = CLIPTokenizer.from_pretrained(version)\n        self.transformer = CLIPTextModel.from_pretrained(version)\n        self.device = device\n        self.max_length = max_length   # TODO: typical value?\n        self.freeze()\n\n    def freeze(self):\n        self.transformer = self.transformer.eval()\n        #self.train = disabled_train\n        for param in self.parameters():\n            param.requires_grad = False\n\n    def forward(self, text):\n        batch_encoding = self.tokenizer(text, truncation=True, max_length=self.max_length, return_length=True,\n                                        return_overflowing_tokens=False, padding=\"max_length\", return_tensors=\"pt\")\n        tokens = batch_encoding[\"input_ids\"].to(self.device)\n        outputs = self.transformer(input_ids=tokens)\n\n        z = outputs.last_hidden_state\n        return z\n\n    def encode(self, text):\n        return self(text)\n\nimport torch.nn.functional as F\nfrom transformers import CLIPVisionModel\nclass ClipImageProjector(AbstractEncoder):\n    \"\"\"\n        Uses the CLIP image encoder.\n        \"\"\"\n    def __init__(self, version=\"openai/clip-vit-large-patch14\", max_length=77):  # clip-vit-base-patch32\n        super().__init__()\n        self.model = CLIPVisionModel.from_pretrained(version)\n        self.model.train()\n        self.max_length = max_length   # TODO: typical value?\n        self.antialias = True\n        self.mapper = torch.nn.Linear(1024, 768)\n        self.register_buffer('mean', torch.Tensor([0.48145466, 0.4578275, 0.40821073]), persistent=False)\n        self.register_buffer('std', torch.Tensor([0.26862954, 0.26130258, 0.27577711]), persistent=False)\n        null_cond = self.get_null_cond(version, max_length)\n        self.register_buffer('null_cond', null_cond)\n\n    @torch.no_grad()\n    def get_null_cond(self, version, max_length):\n        device = self.mean.device\n        embedder = FrozenCLIPEmbedder(version=version, device=device, max_length=max_length)\n        null_cond = embedder([\"\"])\n        return null_cond\n\n    def preprocess(self, x):\n        # Expects inputs in the range -1, 1\n        x = kornia.geometry.resize(x, (224, 224),\n                                   interpolation='bicubic',align_corners=True,\n                                   antialias=self.antialias)\n        x = (x + 1.) / 2.\n        # renormalize according to clip\n        x = kornia.enhance.normalize(x, self.mean, self.std)\n        return x\n\n    def forward(self, x):\n        if isinstance(x, list):\n            return self.null_cond\n        # x is assumed to be in range [-1,1]\n        x = self.preprocess(x)\n        outputs = self.model(pixel_values=x)\n        last_hidden_state = outputs.last_hidden_state\n        last_hidden_state = self.mapper(last_hidden_state)\n        return F.pad(last_hidden_state, [0,0, 0,self.max_length-last_hidden_state.shape[1], 0,0])\n\n    def encode(self, im):\n        return self(im)\n\nclass ProjectedFrozenCLIPEmbedder(AbstractEncoder):\n    def __init__(self, version=\"openai/clip-vit-large-patch14\", device=\"cuda\", max_length=77):  # clip-vit-base-patch32\n        super().__init__()\n        self.embedder = FrozenCLIPEmbedder(version=version, device=device, max_length=max_length)\n        self.projection = torch.nn.Linear(768, 768)\n\n    def forward(self, text):\n        z = self.embedder(text)\n        return self.projection(z)\n\n    def encode(self, text):\n        return self(text)\n\nclass FrozenCLIPImageEmbedder(AbstractEncoder):\n    \"\"\"\n        Uses the CLIP image encoder.\n        Not actually frozen... If you want that set cond_stage_trainable=False in cfg\n        \"\"\"\n    def __init__(\n            self,\n            model='ViT-L/14',\n            jit=False,\n            device='cpu',\n            antialias=False,\n        ):\n        super().__init__()\n        self.model, _ = clip.load(name=model, device=device, jit=jit)\n        # We don't use the text part so delete it\n        del self.model.transformer\n        self.antialias = antialias\n        self.register_buffer('mean', torch.Tensor([0.48145466, 0.4578275, 0.40821073]), persistent=False)\n        self.register_buffer('std', torch.Tensor([0.26862954, 0.26130258, 0.27577711]), persistent=False)\n\n    def preprocess(self, x):\n        # Expects inputs in the range -1, 1\n        x = kornia.geometry.resize(x, (224, 224),\n                                   interpolation='bicubic',align_corners=True,\n                                   antialias=self.antialias)\n        x = (x + 1.) / 2.\n        # renormalize according to clip\n        x = kornia.enhance.normalize(x, self.mean, self.std)\n        return x\n\n    def forward(self, x):\n        # x is assumed to be in range [-1,1]\n        if isinstance(x, list):\n            # [\"\"] denotes condition dropout for ucg\n            device = self.model.visual.conv1.weight.device\n            return torch.zeros(1, 768, device=device)\n        return self.model.encode_image(self.preprocess(x)).float()\n\n    def encode(self, im):\n        return self(im).unsqueeze(1)\n\nfrom torchvision import transforms\nimport random\n\nclass FrozenCLIPImageMutliEmbedder(AbstractEncoder):\n    \"\"\"\n        Uses the CLIP image encoder.\n        Not actually frozen... If you want that set cond_stage_trainable=False in cfg\n        \"\"\"\n    def __init__(\n            self,\n            model='ViT-L/14',\n            jit=False,\n            device='cpu',\n            antialias=True,\n            max_crops=5,\n        ):\n        super().__init__()\n        self.model, _ = clip.load(name=model, device=device, jit=jit)\n        # We don't use the text part so delete it\n        del self.model.transformer\n        self.antialias = antialias\n        self.register_buffer('mean', torch.Tensor([0.48145466, 0.4578275, 0.40821073]), persistent=False)\n        self.register_buffer('std', torch.Tensor([0.26862954, 0.26130258, 0.27577711]), persistent=False)\n        self.max_crops = max_crops\n\n    def preprocess(self, x):\n\n        # Expects inputs in the range -1, 1\n        randcrop = transforms.RandomResizedCrop(224, scale=(0.085, 1.0), ratio=(1,1))\n        max_crops = self.max_crops\n        patches = []\n        crops = [randcrop(x) for _ in range(max_crops)]\n        patches.extend(crops)\n        x = torch.cat(patches, dim=0)\n        x = (x + 1.) / 2.\n        # renormalize according to clip\n        x = kornia.enhance.normalize(x, self.mean, self.std)\n        return x\n\n    def forward(self, x):\n        # x is assumed to be in range [-1,1]\n        if isinstance(x, list):\n            # [\"\"] denotes condition dropout for ucg\n            device = self.model.visual.conv1.weight.device\n            return torch.zeros(1, self.max_crops, 768, device=device)\n        batch_tokens = []\n        for im in x:\n            patches = self.preprocess(im.unsqueeze(0))\n            tokens = self.model.encode_image(patches).float()\n            for t in tokens:\n                if random.random() < 0.1:\n                    t *= 0\n            batch_tokens.append(tokens.unsqueeze(0))\n\n        return torch.cat(batch_tokens, dim=0)\n\n    def encode(self, im):\n        return self(im)\n\nclass SpatialRescaler(nn.Module):\n    def __init__(self,\n                 n_stages=1,\n                 method='bilinear',\n                 multiplier=0.5,\n                 in_channels=3,\n                 out_channels=None,\n                 bias=False):\n        super().__init__()\n        self.n_stages = n_stages\n        assert self.n_stages >= 0\n        assert method in ['nearest','linear','bilinear','trilinear','bicubic','area']\n        self.multiplier = multiplier\n        self.interpolator = partial(torch.nn.functional.interpolate, mode=method)\n        self.remap_output = out_channels is not None\n        if self.remap_output:\n            print(f'Spatial Rescaler mapping from {in_channels} to {out_channels} channels after resizing.')\n            self.channel_mapper = nn.Conv2d(in_channels,out_channels,1,bias=bias)\n\n    def forward(self,x):\n        for stage in range(self.n_stages):\n            x = self.interpolator(x, scale_factor=self.multiplier)\n\n\n        if self.remap_output:\n            x = self.channel_mapper(x)\n        return x\n\n    def encode(self, x):\n        return self(x)\n\n\nfrom ldm.util import instantiate_from_config\nfrom ldm.modules.diffusionmodules.util import make_beta_schedule, extract_into_tensor, noise_like\n\n\nclass LowScaleEncoder(nn.Module):\n    def __init__(self, model_config, linear_start, linear_end, timesteps=1000, max_noise_level=250, output_size=64,\n                 scale_factor=1.0):\n        super().__init__()\n        self.max_noise_level = max_noise_level\n        self.model = instantiate_from_config(model_config)\n        self.augmentation_schedule = self.register_schedule(timesteps=timesteps, linear_start=linear_start,\n                                                            linear_end=linear_end)\n        self.out_size = output_size\n        self.scale_factor = scale_factor\n\n    def register_schedule(self, beta_schedule=\"linear\", timesteps=1000,\n                          linear_start=1e-4, linear_end=2e-2, cosine_s=8e-3):\n        betas = make_beta_schedule(beta_schedule, timesteps, linear_start=linear_start, linear_end=linear_end,\n                                   cosine_s=cosine_s)\n        alphas = 1. - betas\n        alphas_cumprod = np.cumprod(alphas, axis=0)\n        alphas_cumprod_prev = np.append(1., alphas_cumprod[:-1])\n\n        timesteps, = betas.shape\n        self.num_timesteps = int(timesteps)\n        self.linear_start = linear_start\n        self.linear_end = linear_end\n        assert alphas_cumprod.shape[0] == self.num_timesteps, 'alphas have to be defined for each timestep'\n\n        to_torch = partial(torch.tensor, dtype=torch.float32)\n\n        self.register_buffer('betas', to_torch(betas))\n        self.register_buffer('alphas_cumprod', to_torch(alphas_cumprod))\n        self.register_buffer('alphas_cumprod_prev', to_torch(alphas_cumprod_prev))\n\n        # calculations for diffusion q(x_t | x_{t-1}) and others\n        self.register_buffer('sqrt_alphas_cumprod', to_torch(np.sqrt(alphas_cumprod)))\n        self.register_buffer('sqrt_one_minus_alphas_cumprod', to_torch(np.sqrt(1. - alphas_cumprod)))\n        self.register_buffer('log_one_minus_alphas_cumprod', to_torch(np.log(1. - alphas_cumprod)))\n        self.register_buffer('sqrt_recip_alphas_cumprod', to_torch(np.sqrt(1. / alphas_cumprod)))\n        self.register_buffer('sqrt_recipm1_alphas_cumprod', to_torch(np.sqrt(1. / alphas_cumprod - 1)))\n\n    def q_sample(self, x_start, t, noise=None):\n        noise = default(noise, lambda: torch.randn_like(x_start))\n        return (extract_into_tensor(self.sqrt_alphas_cumprod, t, x_start.shape) * x_start +\n                extract_into_tensor(self.sqrt_one_minus_alphas_cumprod, t, x_start.shape) * noise)\n\n    def forward(self, x):\n        z = self.model.encode(x).sample()\n        z = z * self.scale_factor\n        noise_level = torch.randint(0, self.max_noise_level, (x.shape[0],), device=x.device).long()\n        z = self.q_sample(z, noise_level)\n        if self.out_size is not None:\n            z = torch.nn.functional.interpolate(z, size=self.out_size, mode=\"nearest\")  # TODO: experiment with mode\n        # z = z.repeat_interleave(2, -2).repeat_interleave(2, -1)\n        return z, noise_level\n\n    def decode(self, z):\n        z = z / self.scale_factor\n        return self.model.decode(z)\n\n\nif __name__ == \"__main__\":\n    from ldm.util import count_params\n    sentences = [\"a hedgehog drinking a whiskey\", \"der mond ist aufgegangen\", \"Ein Satz mit vielen Sonderzeichen: äöü ß ?! : 'xx-y/@s'\"]\n    model = FrozenT5Embedder(version=\"google/t5-v1_1-xl\").cuda()\n    count_params(model, True)\n    z = model(sentences)\n    print(z.shape)\n\n    model = FrozenCLIPEmbedder().cuda()\n    count_params(model, True)\n    z = model(sentences)\n    print(z.shape)\n\n    print(\"done.\")\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/evaluate/adm_evaluator.py",
    "content": "import argparse\nimport io\nimport os\nimport random\nimport warnings\nimport zipfile\nfrom abc import ABC, abstractmethod\nfrom contextlib import contextmanager\nfrom functools import partial\nfrom multiprocessing import cpu_count\nfrom multiprocessing.pool import ThreadPool\nfrom typing import Iterable, Optional, Tuple\nimport yaml\n\nimport numpy as np\nimport requests\nimport tensorflow.compat.v1 as tf\nfrom scipy import linalg\nfrom tqdm.auto import tqdm\n\nINCEPTION_V3_URL = \"https://openaipublic.blob.core.windows.net/diffusion/jul-2021/ref_batches/classify_image_graph_def.pb\"\nINCEPTION_V3_PATH = \"classify_image_graph_def.pb\"\n\nFID_POOL_NAME = \"pool_3:0\"\nFID_SPATIAL_NAME = \"mixed_6/conv:0\"\n\nREQUIREMENTS = f\"This script has the following requirements: \\n\" \\\n               'tensorflow-gpu>=2.0' + \"\\n\" + 'scipy' + \"\\n\" + \"requests\" + \"\\n\" + \"tqdm\"\n\n\ndef main():\n    parser = argparse.ArgumentParser()\n    parser.add_argument(\"--ref_batch\", help=\"path to reference batch npz file\")\n    parser.add_argument(\"--sample_batch\", help=\"path to sample batch npz file\")\n    args = parser.parse_args()\n\n    config = tf.ConfigProto(\n        allow_soft_placement=True  # allows DecodeJpeg to run on CPU in Inception graph\n    )\n    config.gpu_options.allow_growth = True\n    evaluator = Evaluator(tf.Session(config=config))\n\n    print(\"warming up TensorFlow...\")\n    # This will cause TF to print a bunch of verbose stuff now rather\n    # than after the next print(), to help prevent confusion.\n    evaluator.warmup()\n\n    print(\"computing reference batch activations...\")\n    ref_acts = evaluator.read_activations(args.ref_batch)\n    print(\"computing/reading reference batch statistics...\")\n    ref_stats, ref_stats_spatial = evaluator.read_statistics(args.ref_batch, ref_acts)\n\n    print(\"computing sample batch activations...\")\n    sample_acts = evaluator.read_activations(args.sample_batch)\n    print(\"computing/reading sample batch statistics...\")\n    sample_stats, sample_stats_spatial = evaluator.read_statistics(args.sample_batch, sample_acts)\n\n    print(\"Computing evaluations...\")\n    is_ = evaluator.compute_inception_score(sample_acts[0])\n    print(\"Inception Score:\", is_)\n    fid = sample_stats.frechet_distance(ref_stats)\n    print(\"FID:\", fid)\n    sfid = sample_stats_spatial.frechet_distance(ref_stats_spatial)\n    print(\"sFID:\", sfid)\n    prec, recall = evaluator.compute_prec_recall(ref_acts[0], sample_acts[0])\n    print(\"Precision:\", prec)\n    print(\"Recall:\", recall)\n\n    savepath = '/'.join(args.sample_batch.split('/')[:-1])\n    results_file = os.path.join(savepath,'evaluation_metrics.yaml')\n    print(f'Saving evaluation results to \"{results_file}\"')\n\n    results = {\n        'IS': is_,\n        'FID': fid,\n        'sFID': sfid,\n        'Precision:':prec,\n        'Recall': recall\n    }\n\n    with open(results_file, 'w') as f:\n        yaml.dump(results, f, default_flow_style=False)\n\nclass InvalidFIDException(Exception):\n    pass\n\n\nclass FIDStatistics:\n    def __init__(self, mu: np.ndarray, sigma: np.ndarray):\n        self.mu = mu\n        self.sigma = sigma\n\n    def frechet_distance(self, other, eps=1e-6):\n        \"\"\"\n        Compute the Frechet distance between two sets of statistics.\n        \"\"\"\n        # https://github.com/bioinf-jku/TTUR/blob/73ab375cdf952a12686d9aa7978567771084da42/fid.py#L132\n        mu1, sigma1 = self.mu, self.sigma\n        mu2, sigma2 = other.mu, other.sigma\n\n        mu1 = np.atleast_1d(mu1)\n        mu2 = np.atleast_1d(mu2)\n\n        sigma1 = np.atleast_2d(sigma1)\n        sigma2 = np.atleast_2d(sigma2)\n\n        assert (\n            mu1.shape == mu2.shape\n        ), f\"Training and test mean vectors have different lengths: {mu1.shape}, {mu2.shape}\"\n        assert (\n            sigma1.shape == sigma2.shape\n        ), f\"Training and test covariances have different dimensions: {sigma1.shape}, {sigma2.shape}\"\n\n        diff = mu1 - mu2\n\n        # product might be almost singular\n        covmean, _ = linalg.sqrtm(sigma1.dot(sigma2), disp=False)\n        if not np.isfinite(covmean).all():\n            msg = (\n                \"fid calculation produces singular product; adding %s to diagonal of cov estimates\"\n                % eps\n            )\n            warnings.warn(msg)\n            offset = np.eye(sigma1.shape[0]) * eps\n            covmean = linalg.sqrtm((sigma1 + offset).dot(sigma2 + offset))\n\n        # numerical error might give slight imaginary component\n        if np.iscomplexobj(covmean):\n            if not np.allclose(np.diagonal(covmean).imag, 0, atol=1e-3):\n                m = np.max(np.abs(covmean.imag))\n                raise ValueError(\"Imaginary component {}\".format(m))\n            covmean = covmean.real\n\n        tr_covmean = np.trace(covmean)\n\n        return diff.dot(diff) + np.trace(sigma1) + np.trace(sigma2) - 2 * tr_covmean\n\n\nclass Evaluator:\n    def __init__(\n        self,\n        session,\n        batch_size=64,\n        softmax_batch_size=512,\n    ):\n        self.sess = session\n        self.batch_size = batch_size\n        self.softmax_batch_size = softmax_batch_size\n        self.manifold_estimator = ManifoldEstimator(session)\n        with self.sess.graph.as_default():\n            self.image_input = tf.placeholder(tf.float32, shape=[None, None, None, 3])\n            self.softmax_input = tf.placeholder(tf.float32, shape=[None, 2048])\n            self.pool_features, self.spatial_features = _create_feature_graph(self.image_input)\n            self.softmax = _create_softmax_graph(self.softmax_input)\n\n    def warmup(self):\n        self.compute_activations(np.zeros([1, 8, 64, 64, 3]))\n\n    def read_activations(self, npz_path: str) -> Tuple[np.ndarray, np.ndarray]:\n        with open_npz_array(npz_path, \"arr_0\") as reader:\n            return self.compute_activations(reader.read_batches(self.batch_size))\n\n    def compute_activations(self, batches: Iterable[np.ndarray],silent=False) -> Tuple[np.ndarray, np.ndarray]:\n        \"\"\"\n        Compute image features for downstream evals.\n\n        :param batches: a iterator over NHWC numpy arrays in [0, 255].\n        :return: a tuple of numpy arrays of shape [N x X], where X is a feature\n                 dimension. The tuple is (pool_3, spatial).\n        \"\"\"\n        preds = []\n        spatial_preds = []\n        it = batches if silent else tqdm(batches)\n        for batch in it:\n            batch = batch.astype(np.float32)\n            pred, spatial_pred = self.sess.run(\n                [self.pool_features, self.spatial_features], {self.image_input: batch}\n            )\n            preds.append(pred.reshape([pred.shape[0], -1]))\n            spatial_preds.append(spatial_pred.reshape([spatial_pred.shape[0], -1]))\n        return (\n            np.concatenate(preds, axis=0),\n            np.concatenate(spatial_preds, axis=0),\n        )\n\n    def read_statistics(\n        self, npz_path: str, activations: Tuple[np.ndarray, np.ndarray]\n    ) -> Tuple[FIDStatistics, FIDStatistics]:\n        obj = np.load(npz_path)\n        if \"mu\" in list(obj.keys()):\n            return FIDStatistics(obj[\"mu\"], obj[\"sigma\"]), FIDStatistics(\n                obj[\"mu_s\"], obj[\"sigma_s\"]\n            )\n        return tuple(self.compute_statistics(x) for x in activations)\n\n    def compute_statistics(self, activations: np.ndarray) -> FIDStatistics:\n        mu = np.mean(activations, axis=0)\n        sigma = np.cov(activations, rowvar=False)\n        return FIDStatistics(mu, sigma)\n\n    def compute_inception_score(self, activations: np.ndarray, split_size: int = 5000) -> float:\n        softmax_out = []\n        for i in range(0, len(activations), self.softmax_batch_size):\n            acts = activations[i : i + self.softmax_batch_size]\n            softmax_out.append(self.sess.run(self.softmax, feed_dict={self.softmax_input: acts}))\n        preds = np.concatenate(softmax_out, axis=0)\n        # https://github.com/openai/improved-gan/blob/4f5d1ec5c16a7eceb206f42bfc652693601e1d5c/inception_score/model.py#L46\n        scores = []\n        for i in range(0, len(preds), split_size):\n            part = preds[i : i + split_size]\n            kl = part * (np.log(part) - np.log(np.expand_dims(np.mean(part, 0), 0)))\n            kl = np.mean(np.sum(kl, 1))\n            scores.append(np.exp(kl))\n        return float(np.mean(scores))\n\n    def compute_prec_recall(\n        self, activations_ref: np.ndarray, activations_sample: np.ndarray\n    ) -> Tuple[float, float]:\n        radii_1 = self.manifold_estimator.manifold_radii(activations_ref)\n        radii_2 = self.manifold_estimator.manifold_radii(activations_sample)\n        pr = self.manifold_estimator.evaluate_pr(\n            activations_ref, radii_1, activations_sample, radii_2\n        )\n        return (float(pr[0][0]), float(pr[1][0]))\n\n\nclass ManifoldEstimator:\n    \"\"\"\n    A helper for comparing manifolds of feature vectors.\n\n    Adapted from https://github.com/kynkaat/improved-precision-and-recall-metric/blob/f60f25e5ad933a79135c783fcda53de30f42c9b9/precision_recall.py#L57\n    \"\"\"\n\n    def __init__(\n        self,\n        session,\n        row_batch_size=10000,\n        col_batch_size=10000,\n        nhood_sizes=(3,),\n        clamp_to_percentile=None,\n        eps=1e-5,\n    ):\n        \"\"\"\n        Estimate the manifold of given feature vectors.\n\n        :param session: the TensorFlow session.\n        :param row_batch_size: row batch size to compute pairwise distances\n                               (parameter to trade-off between memory usage and performance).\n        :param col_batch_size: column batch size to compute pairwise distances.\n        :param nhood_sizes: number of neighbors used to estimate the manifold.\n        :param clamp_to_percentile: prune hyperspheres that have radius larger than\n                                    the given percentile.\n        :param eps: small number for numerical stability.\n        \"\"\"\n        self.distance_block = DistanceBlock(session)\n        self.row_batch_size = row_batch_size\n        self.col_batch_size = col_batch_size\n        self.nhood_sizes = nhood_sizes\n        self.num_nhoods = len(nhood_sizes)\n        self.clamp_to_percentile = clamp_to_percentile\n        self.eps = eps\n\n    def warmup(self):\n        feats, radii = (\n            np.zeros([1, 2048], dtype=np.float32),\n            np.zeros([1, 1], dtype=np.float32),\n        )\n        self.evaluate_pr(feats, radii, feats, radii)\n\n    def manifold_radii(self, features: np.ndarray) -> np.ndarray:\n        num_images = len(features)\n\n        # Estimate manifold of features by calculating distances to k-NN of each sample.\n        radii = np.zeros([num_images, self.num_nhoods], dtype=np.float32)\n        distance_batch = np.zeros([self.row_batch_size, num_images], dtype=np.float32)\n        seq = np.arange(max(self.nhood_sizes) + 1, dtype=np.int32)\n\n        for begin1 in range(0, num_images, self.row_batch_size):\n            end1 = min(begin1 + self.row_batch_size, num_images)\n            row_batch = features[begin1:end1]\n\n            for begin2 in range(0, num_images, self.col_batch_size):\n                end2 = min(begin2 + self.col_batch_size, num_images)\n                col_batch = features[begin2:end2]\n\n                # Compute distances between batches.\n                distance_batch[\n                    0 : end1 - begin1, begin2:end2\n                ] = self.distance_block.pairwise_distances(row_batch, col_batch)\n\n            # Find the k-nearest neighbor from the current batch.\n            radii[begin1:end1, :] = np.concatenate(\n                [\n                    x[:, self.nhood_sizes]\n                    for x in _numpy_partition(distance_batch[0 : end1 - begin1, :], seq, axis=1)\n                ],\n                axis=0,\n            )\n\n        if self.clamp_to_percentile is not None:\n            max_distances = np.percentile(radii, self.clamp_to_percentile, axis=0)\n            radii[radii > max_distances] = 0\n        return radii\n\n    def evaluate(self, features: np.ndarray, radii: np.ndarray, eval_features: np.ndarray):\n        \"\"\"\n        Evaluate if new feature vectors are at the manifold.\n        \"\"\"\n        num_eval_images = eval_features.shape[0]\n        num_ref_images = radii.shape[0]\n        distance_batch = np.zeros([self.row_batch_size, num_ref_images], dtype=np.float32)\n        batch_predictions = np.zeros([num_eval_images, self.num_nhoods], dtype=np.int32)\n        max_realism_score = np.zeros([num_eval_images], dtype=np.float32)\n        nearest_indices = np.zeros([num_eval_images], dtype=np.int32)\n\n        for begin1 in range(0, num_eval_images, self.row_batch_size):\n            end1 = min(begin1 + self.row_batch_size, num_eval_images)\n            feature_batch = eval_features[begin1:end1]\n\n            for begin2 in range(0, num_ref_images, self.col_batch_size):\n                end2 = min(begin2 + self.col_batch_size, num_ref_images)\n                ref_batch = features[begin2:end2]\n\n                distance_batch[\n                    0 : end1 - begin1, begin2:end2\n                ] = self.distance_block.pairwise_distances(feature_batch, ref_batch)\n\n            # From the minibatch of new feature vectors, determine if they are in the estimated manifold.\n            # If a feature vector is inside a hypersphere of some reference sample, then\n            # the new sample lies at the estimated manifold.\n            # The radii of the hyperspheres are determined from distances of neighborhood size k.\n            samples_in_manifold = distance_batch[0 : end1 - begin1, :, None] <= radii\n            batch_predictions[begin1:end1] = np.any(samples_in_manifold, axis=1).astype(np.int32)\n\n            max_realism_score[begin1:end1] = np.max(\n                radii[:, 0] / (distance_batch[0 : end1 - begin1, :] + self.eps), axis=1\n            )\n            nearest_indices[begin1:end1] = np.argmin(distance_batch[0 : end1 - begin1, :], axis=1)\n\n        return {\n            \"fraction\": float(np.mean(batch_predictions)),\n            \"batch_predictions\": batch_predictions,\n            \"max_realisim_score\": max_realism_score,\n            \"nearest_indices\": nearest_indices,\n        }\n\n    def evaluate_pr(\n        self,\n        features_1: np.ndarray,\n        radii_1: np.ndarray,\n        features_2: np.ndarray,\n        radii_2: np.ndarray,\n    ) -> Tuple[np.ndarray, np.ndarray]:\n        \"\"\"\n        Evaluate precision and recall efficiently.\n\n        :param features_1: [N1 x D] feature vectors for reference batch.\n        :param radii_1: [N1 x K1] radii for reference vectors.\n        :param features_2: [N2 x D] feature vectors for the other batch.\n        :param radii_2: [N x K2] radii for other vectors.\n        :return: a tuple of arrays for (precision, recall):\n                 - precision: an np.ndarray of length K1\n                 - recall: an np.ndarray of length K2\n        \"\"\"\n        features_1_status = np.zeros([len(features_1), radii_2.shape[1]], dtype=np.bool)\n        features_2_status = np.zeros([len(features_2), radii_1.shape[1]], dtype=np.bool)\n        for begin_1 in range(0, len(features_1), self.row_batch_size):\n            end_1 = begin_1 + self.row_batch_size\n            batch_1 = features_1[begin_1:end_1]\n            for begin_2 in range(0, len(features_2), self.col_batch_size):\n                end_2 = begin_2 + self.col_batch_size\n                batch_2 = features_2[begin_2:end_2]\n                batch_1_in, batch_2_in = self.distance_block.less_thans(\n                    batch_1, radii_1[begin_1:end_1], batch_2, radii_2[begin_2:end_2]\n                )\n                features_1_status[begin_1:end_1] |= batch_1_in\n                features_2_status[begin_2:end_2] |= batch_2_in\n        return (\n            np.mean(features_2_status.astype(np.float64), axis=0),\n            np.mean(features_1_status.astype(np.float64), axis=0),\n        )\n\n\nclass DistanceBlock:\n    \"\"\"\n    Calculate pairwise distances between vectors.\n\n    Adapted from https://github.com/kynkaat/improved-precision-and-recall-metric/blob/f60f25e5ad933a79135c783fcda53de30f42c9b9/precision_recall.py#L34\n    \"\"\"\n\n    def __init__(self, session):\n        self.session = session\n\n        # Initialize TF graph to calculate pairwise distances.\n        with session.graph.as_default():\n            self._features_batch1 = tf.placeholder(tf.float32, shape=[None, None])\n            self._features_batch2 = tf.placeholder(tf.float32, shape=[None, None])\n            distance_block_16 = _batch_pairwise_distances(\n                tf.cast(self._features_batch1, tf.float16),\n                tf.cast(self._features_batch2, tf.float16),\n            )\n            self.distance_block = tf.cond(\n                tf.reduce_all(tf.math.is_finite(distance_block_16)),\n                lambda: tf.cast(distance_block_16, tf.float32),\n                lambda: _batch_pairwise_distances(self._features_batch1, self._features_batch2),\n            )\n\n            # Extra logic for less thans.\n            self._radii1 = tf.placeholder(tf.float32, shape=[None, None])\n            self._radii2 = tf.placeholder(tf.float32, shape=[None, None])\n            dist32 = tf.cast(self.distance_block, tf.float32)[..., None]\n            self._batch_1_in = tf.math.reduce_any(dist32 <= self._radii2, axis=1)\n            self._batch_2_in = tf.math.reduce_any(dist32 <= self._radii1[:, None], axis=0)\n\n    def pairwise_distances(self, U, V):\n        \"\"\"\n        Evaluate pairwise distances between two batches of feature vectors.\n        \"\"\"\n        return self.session.run(\n            self.distance_block,\n            feed_dict={self._features_batch1: U, self._features_batch2: V},\n        )\n\n    def less_thans(self, batch_1, radii_1, batch_2, radii_2):\n        return self.session.run(\n            [self._batch_1_in, self._batch_2_in],\n            feed_dict={\n                self._features_batch1: batch_1,\n                self._features_batch2: batch_2,\n                self._radii1: radii_1,\n                self._radii2: radii_2,\n            },\n        )\n\n\ndef _batch_pairwise_distances(U, V):\n    \"\"\"\n    Compute pairwise distances between two batches of feature vectors.\n    \"\"\"\n    with tf.variable_scope(\"pairwise_dist_block\"):\n        # Squared norms of each row in U and V.\n        norm_u = tf.reduce_sum(tf.square(U), 1)\n        norm_v = tf.reduce_sum(tf.square(V), 1)\n\n        # norm_u as a column and norm_v as a row vectors.\n        norm_u = tf.reshape(norm_u, [-1, 1])\n        norm_v = tf.reshape(norm_v, [1, -1])\n\n        # Pairwise squared Euclidean distances.\n        D = tf.maximum(norm_u - 2 * tf.matmul(U, V, False, True) + norm_v, 0.0)\n\n    return D\n\n\nclass NpzArrayReader(ABC):\n    @abstractmethod\n    def read_batch(self, batch_size: int) -> Optional[np.ndarray]:\n        pass\n\n    @abstractmethod\n    def remaining(self) -> int:\n        pass\n\n    def read_batches(self, batch_size: int) -> Iterable[np.ndarray]:\n        def gen_fn():\n            while True:\n                batch = self.read_batch(batch_size)\n                if batch is None:\n                    break\n                yield batch\n\n        rem = self.remaining()\n        num_batches = rem // batch_size + int(rem % batch_size != 0)\n        return BatchIterator(gen_fn, num_batches)\n\n\nclass BatchIterator:\n    def __init__(self, gen_fn, length):\n        self.gen_fn = gen_fn\n        self.length = length\n\n    def __len__(self):\n        return self.length\n\n    def __iter__(self):\n        return self.gen_fn()\n\n\nclass StreamingNpzArrayReader(NpzArrayReader):\n    def __init__(self, arr_f, shape, dtype):\n        self.arr_f = arr_f\n        self.shape = shape\n        self.dtype = dtype\n        self.idx = 0\n\n    def read_batch(self, batch_size: int) -> Optional[np.ndarray]:\n        if self.idx >= self.shape[0]:\n            return None\n\n        bs = min(batch_size, self.shape[0] - self.idx)\n        self.idx += bs\n\n        if self.dtype.itemsize == 0:\n            return np.ndarray([bs, *self.shape[1:]], dtype=self.dtype)\n\n        read_count = bs * np.prod(self.shape[1:])\n        read_size = int(read_count * self.dtype.itemsize)\n        data = _read_bytes(self.arr_f, read_size, \"array data\")\n        return np.frombuffer(data, dtype=self.dtype).reshape([bs, *self.shape[1:]])\n\n    def remaining(self) -> int:\n        return max(0, self.shape[0] - self.idx)\n\n\nclass MemoryNpzArrayReader(NpzArrayReader):\n    def __init__(self, arr):\n        self.arr = arr\n        self.idx = 0\n\n    @classmethod\n    def load(cls, path: str, arr_name: str):\n        with open(path, \"rb\") as f:\n            arr = np.load(f)[arr_name]\n        return cls(arr)\n\n    def read_batch(self, batch_size: int) -> Optional[np.ndarray]:\n        if self.idx >= self.arr.shape[0]:\n            return None\n\n        res = self.arr[self.idx : self.idx + batch_size]\n        self.idx += batch_size\n        return res\n\n    def remaining(self) -> int:\n        return max(0, self.arr.shape[0] - self.idx)\n\n\n@contextmanager\ndef open_npz_array(path: str, arr_name: str) -> NpzArrayReader:\n    with _open_npy_file(path, arr_name) as arr_f:\n        version = np.lib.format.read_magic(arr_f)\n        if version == (1, 0):\n            header = np.lib.format.read_array_header_1_0(arr_f)\n        elif version == (2, 0):\n            header = np.lib.format.read_array_header_2_0(arr_f)\n        else:\n            yield MemoryNpzArrayReader.load(path, arr_name)\n            return\n        shape, fortran, dtype = header\n        if fortran or dtype.hasobject:\n            yield MemoryNpzArrayReader.load(path, arr_name)\n        else:\n            yield StreamingNpzArrayReader(arr_f, shape, dtype)\n\n\ndef _read_bytes(fp, size, error_template=\"ran out of data\"):\n    \"\"\"\n    Copied from: https://github.com/numpy/numpy/blob/fb215c76967739268de71aa4bda55dd1b062bc2e/numpy/lib/format.py#L788-L886\n\n    Read from file-like object until size bytes are read.\n    Raises ValueError if not EOF is encountered before size bytes are read.\n    Non-blocking objects only supported if they derive from io objects.\n    Required as e.g. ZipExtFile in python 2.6 can return less data than\n    requested.\n    \"\"\"\n    data = bytes()\n    while True:\n        # io files (default in python3) return None or raise on\n        # would-block, python2 file will truncate, probably nothing can be\n        # done about that.  note that regular files can't be non-blocking\n        try:\n            r = fp.read(size - len(data))\n            data += r\n            if len(r) == 0 or len(data) == size:\n                break\n        except io.BlockingIOError:\n            pass\n    if len(data) != size:\n        msg = \"EOF: reading %s, expected %d bytes got %d\"\n        raise ValueError(msg % (error_template, size, len(data)))\n    else:\n        return data\n\n\n@contextmanager\ndef _open_npy_file(path: str, arr_name: str):\n    with open(path, \"rb\") as f:\n        with zipfile.ZipFile(f, \"r\") as zip_f:\n            if f\"{arr_name}.npy\" not in zip_f.namelist():\n                raise ValueError(f\"missing {arr_name} in npz file\")\n            with zip_f.open(f\"{arr_name}.npy\", \"r\") as arr_f:\n                yield arr_f\n\n\ndef _download_inception_model():\n    if os.path.exists(INCEPTION_V3_PATH):\n        return\n    print(\"downloading InceptionV3 model...\")\n    with requests.get(INCEPTION_V3_URL, stream=True) as r:\n        r.raise_for_status()\n        tmp_path = INCEPTION_V3_PATH + \".tmp\"\n        with open(tmp_path, \"wb\") as f:\n            for chunk in tqdm(r.iter_content(chunk_size=8192)):\n                f.write(chunk)\n        os.rename(tmp_path, INCEPTION_V3_PATH)\n\n\ndef _create_feature_graph(input_batch):\n    _download_inception_model()\n    prefix = f\"{random.randrange(2**32)}_{random.randrange(2**32)}\"\n    with open(INCEPTION_V3_PATH, \"rb\") as f:\n        graph_def = tf.GraphDef()\n        graph_def.ParseFromString(f.read())\n    pool3, spatial = tf.import_graph_def(\n        graph_def,\n        input_map={f\"ExpandDims:0\": input_batch},\n        return_elements=[FID_POOL_NAME, FID_SPATIAL_NAME],\n        name=prefix,\n    )\n    _update_shapes(pool3)\n    spatial = spatial[..., :7]\n    return pool3, spatial\n\n\ndef _create_softmax_graph(input_batch):\n    _download_inception_model()\n    prefix = f\"{random.randrange(2**32)}_{random.randrange(2**32)}\"\n    with open(INCEPTION_V3_PATH, \"rb\") as f:\n        graph_def = tf.GraphDef()\n        graph_def.ParseFromString(f.read())\n    (matmul,) = tf.import_graph_def(\n        graph_def, return_elements=[f\"softmax/logits/MatMul\"], name=prefix\n    )\n    w = matmul.inputs[1]\n    logits = tf.matmul(input_batch, w)\n    return tf.nn.softmax(logits)\n\n\ndef _update_shapes(pool3):\n    # https://github.com/bioinf-jku/TTUR/blob/73ab375cdf952a12686d9aa7978567771084da42/fid.py#L50-L63\n    ops = pool3.graph.get_operations()\n    for op in ops:\n        for o in op.outputs:\n            shape = o.get_shape()\n            if shape._dims is not None:  # pylint: disable=protected-access\n                # shape = [s.value for s in shape] TF 1.x\n                shape = [s for s in shape]  # TF 2.x\n                new_shape = []\n                for j, s in enumerate(shape):\n                    if s == 1 and j == 0:\n                        new_shape.append(None)\n                    else:\n                        new_shape.append(s)\n                o.__dict__[\"_shape_val\"] = tf.TensorShape(new_shape)\n    return pool3\n\n\ndef _numpy_partition(arr, kth, **kwargs):\n    num_workers = min(cpu_count(), len(arr))\n    chunk_size = len(arr) // num_workers\n    extra = len(arr) % num_workers\n\n    start_idx = 0\n    batches = []\n    for i in range(num_workers):\n        size = chunk_size + (1 if i < extra else 0)\n        batches.append(arr[start_idx : start_idx + size])\n        start_idx += size\n\n    with ThreadPool(num_workers) as pool:\n        return list(pool.map(partial(np.partition, kth=kth, **kwargs), batches))\n\n\nif __name__ == \"__main__\":\n    print(REQUIREMENTS)\n    main()\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/evaluate/evaluate_perceptualsim.py",
    "content": "import argparse\nimport glob\nimport os\nfrom tqdm import tqdm\nfrom collections import namedtuple\n\nimport numpy as np\nimport torch\nimport torchvision.transforms as transforms\nfrom torchvision import models\nfrom PIL import Image\n\nfrom ldm.modules.evaluate.ssim import ssim\n\n\ntransform = transforms.Compose([transforms.ToTensor()])\n\ndef normalize_tensor(in_feat, eps=1e-10):\n    norm_factor = torch.sqrt(torch.sum(in_feat ** 2, dim=1)).view(\n        in_feat.size()[0], 1, in_feat.size()[2], in_feat.size()[3]\n    )\n    return in_feat / (norm_factor.expand_as(in_feat) + eps)\n\n\ndef cos_sim(in0, in1):\n    in0_norm = normalize_tensor(in0)\n    in1_norm = normalize_tensor(in1)\n    N = in0.size()[0]\n    X = in0.size()[2]\n    Y = in0.size()[3]\n\n    return torch.mean(\n        torch.mean(\n            torch.sum(in0_norm * in1_norm, dim=1).view(N, 1, X, Y), dim=2\n        ).view(N, 1, 1, Y),\n        dim=3,\n    ).view(N)\n\n\nclass squeezenet(torch.nn.Module):\n    def __init__(self, requires_grad=False, pretrained=True):\n        super(squeezenet, self).__init__()\n        pretrained_features = models.squeezenet1_1(\n            pretrained=pretrained\n        ).features\n        self.slice1 = torch.nn.Sequential()\n        self.slice2 = torch.nn.Sequential()\n        self.slice3 = torch.nn.Sequential()\n        self.slice4 = torch.nn.Sequential()\n        self.slice5 = torch.nn.Sequential()\n        self.slice6 = torch.nn.Sequential()\n        self.slice7 = torch.nn.Sequential()\n        self.N_slices = 7\n        for x in range(2):\n            self.slice1.add_module(str(x), pretrained_features[x])\n        for x in range(2, 5):\n            self.slice2.add_module(str(x), pretrained_features[x])\n        for x in range(5, 8):\n            self.slice3.add_module(str(x), pretrained_features[x])\n        for x in range(8, 10):\n            self.slice4.add_module(str(x), pretrained_features[x])\n        for x in range(10, 11):\n            self.slice5.add_module(str(x), pretrained_features[x])\n        for x in range(11, 12):\n            self.slice6.add_module(str(x), pretrained_features[x])\n        for x in range(12, 13):\n            self.slice7.add_module(str(x), pretrained_features[x])\n        if not requires_grad:\n            for param in self.parameters():\n                param.requires_grad = False\n\n    def forward(self, X):\n        h = self.slice1(X)\n        h_relu1 = h\n        h = self.slice2(h)\n        h_relu2 = h\n        h = self.slice3(h)\n        h_relu3 = h\n        h = self.slice4(h)\n        h_relu4 = h\n        h = self.slice5(h)\n        h_relu5 = h\n        h = self.slice6(h)\n        h_relu6 = h\n        h = self.slice7(h)\n        h_relu7 = h\n        vgg_outputs = namedtuple(\n            \"SqueezeOutputs\",\n            [\"relu1\", \"relu2\", \"relu3\", \"relu4\", \"relu5\", \"relu6\", \"relu7\"],\n        )\n        out = vgg_outputs(\n            h_relu1, h_relu2, h_relu3, h_relu4, h_relu5, h_relu6, h_relu7\n        )\n\n        return out\n\n\nclass alexnet(torch.nn.Module):\n    def __init__(self, requires_grad=False, pretrained=True):\n        super(alexnet, self).__init__()\n        alexnet_pretrained_features = models.alexnet(\n            pretrained=pretrained\n        ).features\n        self.slice1 = torch.nn.Sequential()\n        self.slice2 = torch.nn.Sequential()\n        self.slice3 = torch.nn.Sequential()\n        self.slice4 = torch.nn.Sequential()\n        self.slice5 = torch.nn.Sequential()\n        self.N_slices = 5\n        for x in range(2):\n            self.slice1.add_module(str(x), alexnet_pretrained_features[x])\n        for x in range(2, 5):\n            self.slice2.add_module(str(x), alexnet_pretrained_features[x])\n        for x in range(5, 8):\n            self.slice3.add_module(str(x), alexnet_pretrained_features[x])\n        for x in range(8, 10):\n            self.slice4.add_module(str(x), alexnet_pretrained_features[x])\n        for x in range(10, 12):\n            self.slice5.add_module(str(x), alexnet_pretrained_features[x])\n        if not requires_grad:\n            for param in self.parameters():\n                param.requires_grad = False\n\n    def forward(self, X):\n        h = self.slice1(X)\n        h_relu1 = h\n        h = self.slice2(h)\n        h_relu2 = h\n        h = self.slice3(h)\n        h_relu3 = h\n        h = self.slice4(h)\n        h_relu4 = h\n        h = self.slice5(h)\n        h_relu5 = h\n        alexnet_outputs = namedtuple(\n            \"AlexnetOutputs\", [\"relu1\", \"relu2\", \"relu3\", \"relu4\", \"relu5\"]\n        )\n        out = alexnet_outputs(h_relu1, h_relu2, h_relu3, h_relu4, h_relu5)\n\n        return out\n\n\nclass vgg16(torch.nn.Module):\n    def __init__(self, requires_grad=False, pretrained=True):\n        super(vgg16, self).__init__()\n        vgg_pretrained_features = models.vgg16(pretrained=pretrained).features\n        self.slice1 = torch.nn.Sequential()\n        self.slice2 = torch.nn.Sequential()\n        self.slice3 = torch.nn.Sequential()\n        self.slice4 = torch.nn.Sequential()\n        self.slice5 = torch.nn.Sequential()\n        self.N_slices = 5\n        for x in range(4):\n            self.slice1.add_module(str(x), vgg_pretrained_features[x])\n        for x in range(4, 9):\n            self.slice2.add_module(str(x), vgg_pretrained_features[x])\n        for x in range(9, 16):\n            self.slice3.add_module(str(x), vgg_pretrained_features[x])\n        for x in range(16, 23):\n            self.slice4.add_module(str(x), vgg_pretrained_features[x])\n        for x in range(23, 30):\n            self.slice5.add_module(str(x), vgg_pretrained_features[x])\n        if not requires_grad:\n            for param in self.parameters():\n                param.requires_grad = False\n\n    def forward(self, X):\n        h = self.slice1(X)\n        h_relu1_2 = h\n        h = self.slice2(h)\n        h_relu2_2 = h\n        h = self.slice3(h)\n        h_relu3_3 = h\n        h = self.slice4(h)\n        h_relu4_3 = h\n        h = self.slice5(h)\n        h_relu5_3 = h\n        vgg_outputs = namedtuple(\n            \"VggOutputs\",\n            [\"relu1_2\", \"relu2_2\", \"relu3_3\", \"relu4_3\", \"relu5_3\"],\n        )\n        out = vgg_outputs(h_relu1_2, h_relu2_2, h_relu3_3, h_relu4_3, h_relu5_3)\n\n        return out\n\n\nclass resnet(torch.nn.Module):\n    def __init__(self, requires_grad=False, pretrained=True, num=18):\n        super(resnet, self).__init__()\n        if num == 18:\n            self.net = models.resnet18(pretrained=pretrained)\n        elif num == 34:\n            self.net = models.resnet34(pretrained=pretrained)\n        elif num == 50:\n            self.net = models.resnet50(pretrained=pretrained)\n        elif num == 101:\n            self.net = models.resnet101(pretrained=pretrained)\n        elif num == 152:\n            self.net = models.resnet152(pretrained=pretrained)\n        self.N_slices = 5\n\n        self.conv1 = self.net.conv1\n        self.bn1 = self.net.bn1\n        self.relu = self.net.relu\n        self.maxpool = self.net.maxpool\n        self.layer1 = self.net.layer1\n        self.layer2 = self.net.layer2\n        self.layer3 = self.net.layer3\n        self.layer4 = self.net.layer4\n\n    def forward(self, X):\n        h = self.conv1(X)\n        h = self.bn1(h)\n        h = self.relu(h)\n        h_relu1 = h\n        h = self.maxpool(h)\n        h = self.layer1(h)\n        h_conv2 = h\n        h = self.layer2(h)\n        h_conv3 = h\n        h = self.layer3(h)\n        h_conv4 = h\n        h = self.layer4(h)\n        h_conv5 = h\n\n        outputs = namedtuple(\n            \"Outputs\", [\"relu1\", \"conv2\", \"conv3\", \"conv4\", \"conv5\"]\n        )\n        out = outputs(h_relu1, h_conv2, h_conv3, h_conv4, h_conv5)\n\n        return out\n\n# Off-the-shelf deep network\nclass PNet(torch.nn.Module):\n    \"\"\"Pre-trained network with all channels equally weighted by default\"\"\"\n\n    def __init__(self, pnet_type=\"vgg\", pnet_rand=False, use_gpu=True):\n        super(PNet, self).__init__()\n\n        self.use_gpu = use_gpu\n\n        self.pnet_type = pnet_type\n        self.pnet_rand = pnet_rand\n\n        self.shift = torch.Tensor([-0.030, -0.088, -0.188]).view(1, 3, 1, 1)\n        self.scale = torch.Tensor([0.458, 0.448, 0.450]).view(1, 3, 1, 1)\n\n        if self.pnet_type in [\"vgg\", \"vgg16\"]:\n            self.net = vgg16(pretrained=not self.pnet_rand, requires_grad=False)\n        elif self.pnet_type == \"alex\":\n            self.net = alexnet(\n                pretrained=not self.pnet_rand, requires_grad=False\n            )\n        elif self.pnet_type[:-2] == \"resnet\":\n            self.net = resnet(\n                pretrained=not self.pnet_rand,\n                requires_grad=False,\n                num=int(self.pnet_type[-2:]),\n            )\n        elif self.pnet_type == \"squeeze\":\n            self.net = squeezenet(\n                pretrained=not self.pnet_rand, requires_grad=False\n            )\n\n        self.L = self.net.N_slices\n\n        if use_gpu:\n            self.net.cuda()\n            self.shift = self.shift.cuda()\n            self.scale = self.scale.cuda()\n\n    def forward(self, in0, in1, retPerLayer=False):\n        in0_sc = (in0 - self.shift.expand_as(in0)) / self.scale.expand_as(in0)\n        in1_sc = (in1 - self.shift.expand_as(in0)) / self.scale.expand_as(in0)\n\n        outs0 = self.net.forward(in0_sc)\n        outs1 = self.net.forward(in1_sc)\n\n        if retPerLayer:\n            all_scores = []\n        for (kk, out0) in enumerate(outs0):\n            cur_score = 1.0 - cos_sim(outs0[kk], outs1[kk])\n            if kk == 0:\n                val = 1.0 * cur_score\n            else:\n                val = val + cur_score\n            if retPerLayer:\n                all_scores += [cur_score]\n\n        if retPerLayer:\n            return (val, all_scores)\n        else:\n            return val\n\n\n\n\n# The SSIM metric\ndef ssim_metric(img1, img2, mask=None):\n    return ssim(img1, img2, mask=mask, size_average=False)\n\n\n# The PSNR metric\ndef psnr(img1, img2, mask=None,reshape=False):\n    b = img1.size(0)\n    if not (mask is None):\n        b = img1.size(0)\n        mse_err = (img1 - img2).pow(2) * mask\n        if reshape:\n            mse_err = mse_err.reshape(b, -1).sum(dim=1) / (\n                    3 * mask.reshape(b, -1).sum(dim=1).clamp(min=1)\n            )\n        else:\n            mse_err = mse_err.view(b, -1).sum(dim=1) / (\n                3 * mask.view(b, -1).sum(dim=1).clamp(min=1)\n            )\n    else:\n        if reshape:\n            mse_err = (img1 - img2).pow(2).reshape(b, -1).mean(dim=1)\n        else:\n            mse_err = (img1 - img2).pow(2).view(b, -1).mean(dim=1)\n\n    psnr = 10 * (1 / mse_err).log10()\n    return psnr\n\n\n# The perceptual similarity metric\ndef perceptual_sim(img1, img2, vgg16):\n    # First extract features\n    dist = vgg16(img1 * 2 - 1, img2 * 2 - 1)\n\n    return dist\n\ndef load_img(img_name, size=None):\n    try:\n        img = Image.open(img_name)\n\n        if type(size) == int:\n            img = img.resize((size, size))\n        elif size is not None:\n            img = img.resize((size[1], size[0]))\n\n        img = transform(img).cuda()\n        img = img.unsqueeze(0)\n    except Exception as e:\n        print(\"Failed at loading %s \" % img_name)\n        print(e)\n        img = torch.zeros(1, 3, 256, 256).cuda()\n        raise\n    return img\n\n\ndef compute_perceptual_similarity(folder, pred_img, tgt_img, take_every_other):\n\n    # Load VGG16 for feature similarity\n    vgg16 = PNet().to(\"cuda\")\n    vgg16.eval()\n    vgg16.cuda()\n\n    values_percsim = []\n    values_ssim = []\n    values_psnr = []\n    folders = os.listdir(folder)\n    for i, f in tqdm(enumerate(sorted(folders))):\n        pred_imgs = glob.glob(folder + f + \"/\" + pred_img)\n        tgt_imgs = glob.glob(folder + f + \"/\" + tgt_img)\n        assert len(tgt_imgs) == 1\n\n        perc_sim = 10000\n        ssim_sim = -10\n        psnr_sim = -10\n        for p_img in pred_imgs:\n            t_img = load_img(tgt_imgs[0])\n            p_img = load_img(p_img, size=t_img.shape[2:])\n            t_perc_sim = perceptual_sim(p_img, t_img, vgg16).item()\n            perc_sim = min(perc_sim, t_perc_sim)\n\n            ssim_sim = max(ssim_sim, ssim_metric(p_img, t_img).item())\n            psnr_sim = max(psnr_sim, psnr(p_img, t_img).item())\n\n        values_percsim += [perc_sim]\n        values_ssim += [ssim_sim]\n        values_psnr += [psnr_sim]\n\n    if take_every_other:\n        n_valuespercsim = []\n        n_valuesssim = []\n        n_valuespsnr = []\n        for i in range(0, len(values_percsim) // 2):\n            n_valuespercsim += [\n                min(values_percsim[2 * i], values_percsim[2 * i + 1])\n            ]\n            n_valuespsnr += [max(values_psnr[2 * i], values_psnr[2 * i + 1])]\n            n_valuesssim += [max(values_ssim[2 * i], values_ssim[2 * i + 1])]\n\n        values_percsim = n_valuespercsim\n        values_ssim = n_valuesssim\n        values_psnr = n_valuespsnr\n\n    avg_percsim = np.mean(np.array(values_percsim))\n    std_percsim = np.std(np.array(values_percsim))\n\n    avg_psnr = np.mean(np.array(values_psnr))\n    std_psnr = np.std(np.array(values_psnr))\n\n    avg_ssim = np.mean(np.array(values_ssim))\n    std_ssim = np.std(np.array(values_ssim))\n\n    return {\n        \"Perceptual similarity\": (avg_percsim, std_percsim),\n        \"PSNR\": (avg_psnr, std_psnr),\n        \"SSIM\": (avg_ssim, std_ssim),\n    }\n\n\ndef compute_perceptual_similarity_from_list(pred_imgs_list, tgt_imgs_list,\n                                            take_every_other,\n                                            simple_format=True):\n\n    # Load VGG16 for feature similarity\n    vgg16 = PNet().to(\"cuda\")\n    vgg16.eval()\n    vgg16.cuda()\n\n    values_percsim = []\n    values_ssim = []\n    values_psnr = []\n    equal_count = 0\n    ambig_count = 0\n    for i, tgt_img in enumerate(tqdm(tgt_imgs_list)):\n        pred_imgs = pred_imgs_list[i]\n        tgt_imgs = [tgt_img]\n        assert len(tgt_imgs) == 1\n\n        if type(pred_imgs) != list:\n            pred_imgs = [pred_imgs]\n\n        perc_sim = 10000\n        ssim_sim = -10\n        psnr_sim = -10\n        assert len(pred_imgs)>0\n        for p_img in pred_imgs:\n            t_img = load_img(tgt_imgs[0])\n            p_img = load_img(p_img, size=t_img.shape[2:])\n            t_perc_sim = perceptual_sim(p_img, t_img, vgg16).item()\n            perc_sim = min(perc_sim, t_perc_sim)\n\n            ssim_sim = max(ssim_sim, ssim_metric(p_img, t_img).item())\n            psnr_sim = max(psnr_sim, psnr(p_img, t_img).item())\n\n        values_percsim += [perc_sim]\n        values_ssim += [ssim_sim]\n        if psnr_sim != np.float(\"inf\"):\n            values_psnr += [psnr_sim]\n        else:\n            if torch.allclose(p_img, t_img):\n                equal_count += 1\n                print(\"{} equal src and wrp images.\".format(equal_count))\n            else:\n                ambig_count += 1\n                print(\"{} ambiguous src and wrp images.\".format(ambig_count))\n\n    if take_every_other:\n        n_valuespercsim = []\n        n_valuesssim = []\n        n_valuespsnr = []\n        for i in range(0, len(values_percsim) // 2):\n            n_valuespercsim += [\n                min(values_percsim[2 * i], values_percsim[2 * i + 1])\n            ]\n            n_valuespsnr += [max(values_psnr[2 * i], values_psnr[2 * i + 1])]\n            n_valuesssim += [max(values_ssim[2 * i], values_ssim[2 * i + 1])]\n\n        values_percsim = n_valuespercsim\n        values_ssim = n_valuesssim\n        values_psnr = n_valuespsnr\n\n    avg_percsim = np.mean(np.array(values_percsim))\n    std_percsim = np.std(np.array(values_percsim))\n\n    avg_psnr = np.mean(np.array(values_psnr))\n    std_psnr = np.std(np.array(values_psnr))\n\n    avg_ssim = np.mean(np.array(values_ssim))\n    std_ssim = np.std(np.array(values_ssim))\n\n    if simple_format:\n        # just to make yaml formatting readable\n        return {\n            \"Perceptual similarity\": [float(avg_percsim), float(std_percsim)],\n            \"PSNR\": [float(avg_psnr), float(std_psnr)],\n            \"SSIM\": [float(avg_ssim), float(std_ssim)],\n        }\n    else:\n        return {\n            \"Perceptual similarity\": (avg_percsim, std_percsim),\n            \"PSNR\": (avg_psnr, std_psnr),\n            \"SSIM\": (avg_ssim, std_ssim),\n        }\n\n\ndef compute_perceptual_similarity_from_list_topk(pred_imgs_list, tgt_imgs_list,\n                                                 take_every_other, resize=False):\n\n    # Load VGG16 for feature similarity\n    vgg16 = PNet().to(\"cuda\")\n    vgg16.eval()\n    vgg16.cuda()\n\n    values_percsim = []\n    values_ssim = []\n    values_psnr = []\n    individual_percsim = []\n    individual_ssim = []\n    individual_psnr = []\n    for i, tgt_img in enumerate(tqdm(tgt_imgs_list)):\n        pred_imgs = pred_imgs_list[i]\n        tgt_imgs = [tgt_img]\n        assert len(tgt_imgs) == 1\n\n        if type(pred_imgs) != list:\n            assert False\n            pred_imgs = [pred_imgs]\n\n        perc_sim = 10000\n        ssim_sim = -10\n        psnr_sim = -10\n        sample_percsim = list()\n        sample_ssim = list()\n        sample_psnr = list()\n        for p_img in pred_imgs:\n            if resize:\n                t_img = load_img(tgt_imgs[0], size=(256,256))\n            else:\n                t_img = load_img(tgt_imgs[0])\n            p_img = load_img(p_img, size=t_img.shape[2:])\n\n            t_perc_sim = perceptual_sim(p_img, t_img, vgg16).item()\n            sample_percsim.append(t_perc_sim)\n            perc_sim = min(perc_sim, t_perc_sim)\n\n            t_ssim = ssim_metric(p_img, t_img).item()\n            sample_ssim.append(t_ssim)\n            ssim_sim = max(ssim_sim, t_ssim)\n\n            t_psnr = psnr(p_img, t_img).item()\n            sample_psnr.append(t_psnr)\n            psnr_sim = max(psnr_sim, t_psnr)\n\n        values_percsim += [perc_sim]\n        values_ssim += [ssim_sim]\n        values_psnr += [psnr_sim]\n        individual_percsim.append(sample_percsim)\n        individual_ssim.append(sample_ssim)\n        individual_psnr.append(sample_psnr)\n\n    if take_every_other:\n        assert False, \"Do this later, after specifying topk to get proper results\"\n        n_valuespercsim = []\n        n_valuesssim = []\n        n_valuespsnr = []\n        for i in range(0, len(values_percsim) // 2):\n            n_valuespercsim += [\n                min(values_percsim[2 * i], values_percsim[2 * i + 1])\n            ]\n            n_valuespsnr += [max(values_psnr[2 * i], values_psnr[2 * i + 1])]\n            n_valuesssim += [max(values_ssim[2 * i], values_ssim[2 * i + 1])]\n\n        values_percsim = n_valuespercsim\n        values_ssim = n_valuesssim\n        values_psnr = n_valuespsnr\n\n    avg_percsim = np.mean(np.array(values_percsim))\n    std_percsim = np.std(np.array(values_percsim))\n\n    avg_psnr = np.mean(np.array(values_psnr))\n    std_psnr = np.std(np.array(values_psnr))\n\n    avg_ssim = np.mean(np.array(values_ssim))\n    std_ssim = np.std(np.array(values_ssim))\n\n    individual_percsim = np.array(individual_percsim)\n    individual_psnr = np.array(individual_psnr)\n    individual_ssim = np.array(individual_ssim)\n\n    return {\n        \"avg_of_best\": {\n            \"Perceptual similarity\": [float(avg_percsim), float(std_percsim)],\n            \"PSNR\": [float(avg_psnr), float(std_psnr)],\n            \"SSIM\": [float(avg_ssim), float(std_ssim)],\n        },\n        \"individual\": {\n            \"PSIM\": individual_percsim,\n            \"PSNR\": individual_psnr,\n            \"SSIM\": individual_ssim,\n        }\n    }\n\n\nif __name__ == \"__main__\":\n    args = argparse.ArgumentParser()\n    args.add_argument(\"--folder\", type=str, default=\"\")\n    args.add_argument(\"--pred_image\", type=str, default=\"\")\n    args.add_argument(\"--target_image\", type=str, default=\"\")\n    args.add_argument(\"--take_every_other\", action=\"store_true\", default=False)\n    args.add_argument(\"--output_file\", type=str, default=\"\")\n\n    opts = args.parse_args()\n\n    folder = opts.folder\n    pred_img = opts.pred_image\n    tgt_img = opts.target_image\n\n    results = compute_perceptual_similarity(\n        folder, pred_img, tgt_img, opts.take_every_other\n    )\n\n    f = open(opts.output_file, 'w')\n    for key in results:\n        print(\"%s for %s: \\n\" % (key, opts.folder))\n        print(\n            \"\\t {:0.4f} | {:0.4f} \\n\".format(results[key][0], results[key][1])\n        )\n\n        f.write(\"%s for %s: \\n\" % (key, opts.folder))\n        f.write(\n            \"\\t {:0.4f} | {:0.4f} \\n\".format(results[key][0], results[key][1])\n        )\n\n    f.close()\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/evaluate/frechet_video_distance.py",
    "content": "# coding=utf-8\n# Copyright 2022 The Google Research Authors.\n#\n# Licensed under the Apache License, Version 2.0 (the \"License\");\n# you may not use this file except in compliance with the License.\n# You may obtain a copy of the License at\n#\n#     http://www.apache.org/licenses/LICENSE-2.0\n#\n# Unless required by applicable law or agreed to in writing, software\n# distributed under the License is distributed on an \"AS IS\" BASIS,\n# WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.\n# See the License for the specific language governing permissions and\n# limitations under the License.\n\n# Lint as: python2, python3\n\"\"\"Minimal Reference implementation for the Frechet Video Distance (FVD).\n\nFVD is a metric for the quality of video generation models. It is inspired by\nthe FID (Frechet Inception Distance) used for images, but uses a different\nembedding to be better suitable for videos.\n\"\"\"\n\nfrom __future__ import absolute_import\nfrom __future__ import division\nfrom __future__ import print_function\n\n\nimport six\nimport tensorflow.compat.v1 as tf\nimport tensorflow_gan as tfgan\nimport tensorflow_hub as hub\n\n\ndef preprocess(videos, target_resolution):\n  \"\"\"Runs some preprocessing on the videos for I3D model.\n\n  Args:\n    videos: <T>[batch_size, num_frames, height, width, depth] The videos to be\n      preprocessed. We don't care about the specific dtype of the videos, it can\n      be anything that tf.image.resize_bilinear accepts. Values are expected to\n      be in the range 0-255.\n    target_resolution: (width, height): target video resolution\n\n  Returns:\n    videos: <float32>[batch_size, num_frames, height, width, depth]\n  \"\"\"\n  videos_shape = list(videos.shape)\n  all_frames = tf.reshape(videos, [-1] + videos_shape[-3:])\n  resized_videos = tf.image.resize_bilinear(all_frames, size=target_resolution)\n  target_shape = [videos_shape[0], -1] + list(target_resolution) + [3]\n  output_videos = tf.reshape(resized_videos, target_shape)\n  scaled_videos = 2. * tf.cast(output_videos, tf.float32) / 255. - 1\n  return scaled_videos\n\n\ndef _is_in_graph(tensor_name):\n  \"\"\"Checks whether a given tensor does exists in the graph.\"\"\"\n  try:\n    tf.get_default_graph().get_tensor_by_name(tensor_name)\n  except KeyError:\n    return False\n  return True\n\n\ndef create_id3_embedding(videos,warmup=False,batch_size=16):\n  \"\"\"Embeds the given videos using the Inflated 3D Convolution ne   twork.\n\n  Downloads the graph of the I3D from tf.hub and adds it to the graph on the\n  first call.\n\n  Args:\n    videos: <float32>[batch_size, num_frames, height=224, width=224, depth=3].\n      Expected range is [-1, 1].\n\n  Returns:\n    embedding: <float32>[batch_size, embedding_size]. embedding_size depends\n               on the model used.\n\n  Raises:\n    ValueError: when a provided embedding_layer is not supported.\n  \"\"\"\n\n  # batch_size = 16\n  module_spec = \"https://tfhub.dev/deepmind/i3d-kinetics-400/1\"\n\n\n  # Making sure that we import the graph separately for\n  # each different input video tensor.\n  module_name = \"fvd_kinetics-400_id3_module_\" + six.ensure_str(\n      videos.name).replace(\":\", \"_\")\n\n\n\n  assert_ops = [\n      tf.Assert(\n          tf.reduce_max(videos) <= 1.001,\n          [\"max value in frame is > 1\", videos]),\n      tf.Assert(\n          tf.reduce_min(videos) >= -1.001,\n          [\"min value in frame is < -1\", videos]),\n      tf.assert_equal(\n          tf.shape(videos)[0],\n          batch_size, [\"invalid frame batch size: \",\n                       tf.shape(videos)],\n          summarize=6),\n  ]\n  with tf.control_dependencies(assert_ops):\n    videos = tf.identity(videos)\n\n  module_scope = \"%s_apply_default/\" % module_name\n\n  # To check whether the module has already been loaded into the graph, we look\n  # for a given tensor name. If this tensor name exists, we assume the function\n  # has been called before and the graph was imported. Otherwise we import it.\n  # Note: in theory, the tensor could exist, but have wrong shapes.\n  # This will happen if create_id3_embedding is called with a frames_placehoder\n  # of wrong size/batch size, because even though that will throw a tf.Assert\n  # on graph-execution time, it will insert the tensor (with wrong shape) into\n  # the graph. This is why we need the following assert.\n  if warmup:\n      video_batch_size = int(videos.shape[0])\n      assert video_batch_size in [batch_size, -1, None], f\"Invalid batch size {video_batch_size}\"\n  tensor_name = module_scope + \"RGB/inception_i3d/Mean:0\"\n  if not _is_in_graph(tensor_name):\n    i3d_model = hub.Module(module_spec, name=module_name)\n    i3d_model(videos)\n\n  # gets the kinetics-i3d-400-logits layer\n  tensor_name = module_scope + \"RGB/inception_i3d/Mean:0\"\n  tensor = tf.get_default_graph().get_tensor_by_name(tensor_name)\n  return tensor\n\n\ndef calculate_fvd(real_activations,\n                  generated_activations):\n  \"\"\"Returns a list of ops that compute metrics as funcs of activations.\n\n  Args:\n    real_activations: <float32>[num_samples, embedding_size]\n    generated_activations: <float32>[num_samples, embedding_size]\n\n  Returns:\n    A scalar that contains the requested FVD.\n  \"\"\"\n  return tfgan.eval.frechet_classifier_distance_from_activations(\n      real_activations, generated_activations)\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/evaluate/ssim.py",
    "content": "# MIT Licence\n\n# Methods to predict the SSIM, taken from\n# https://github.com/Po-Hsun-Su/pytorch-ssim/blob/master/pytorch_ssim/__init__.py\n\nfrom math import exp\n\nimport torch\nimport torch.nn.functional as F\nfrom torch.autograd import Variable\n\ndef gaussian(window_size, sigma):\n    gauss = torch.Tensor(\n        [\n            exp(-((x - window_size // 2) ** 2) / float(2 * sigma ** 2))\n            for x in range(window_size)\n        ]\n    )\n    return gauss / gauss.sum()\n\n\ndef create_window(window_size, channel):\n    _1D_window = gaussian(window_size, 1.5).unsqueeze(1)\n    _2D_window = _1D_window.mm(_1D_window.t()).float().unsqueeze(0).unsqueeze(0)\n    window = Variable(\n        _2D_window.expand(channel, 1, window_size, window_size).contiguous()\n    )\n    return window\n\n\ndef _ssim(\n    img1, img2, window, window_size, channel, mask=None, size_average=True\n):\n    mu1 = F.conv2d(img1, window, padding=window_size // 2, groups=channel)\n    mu2 = F.conv2d(img2, window, padding=window_size // 2, groups=channel)\n\n    mu1_sq = mu1.pow(2)\n    mu2_sq = mu2.pow(2)\n    mu1_mu2 = mu1 * mu2\n\n    sigma1_sq = (\n        F.conv2d(img1 * img1, window, padding=window_size // 2, groups=channel)\n        - mu1_sq\n    )\n    sigma2_sq = (\n        F.conv2d(img2 * img2, window, padding=window_size // 2, groups=channel)\n        - mu2_sq\n    )\n    sigma12 = (\n        F.conv2d(img1 * img2, window, padding=window_size // 2, groups=channel)\n        - mu1_mu2\n    )\n\n    C1 = (0.01) ** 2\n    C2 = (0.03) ** 2\n\n    ssim_map = ((2 * mu1_mu2 + C1) * (2 * sigma12 + C2)) / (\n        (mu1_sq + mu2_sq + C1) * (sigma1_sq + sigma2_sq + C2)\n    )\n\n    if not (mask is None):\n        b = mask.size(0)\n        ssim_map = ssim_map.mean(dim=1, keepdim=True) * mask\n        ssim_map = ssim_map.view(b, -1).sum(dim=1) / mask.view(b, -1).sum(\n            dim=1\n        ).clamp(min=1)\n        return ssim_map\n\n    import pdb\n\n    pdb.set_trace\n\n    if size_average:\n        return ssim_map.mean()\n    else:\n        return ssim_map.mean(1).mean(1).mean(1)\n\n\nclass SSIM(torch.nn.Module):\n    def __init__(self, window_size=11, size_average=True):\n        super(SSIM, self).__init__()\n        self.window_size = window_size\n        self.size_average = size_average\n        self.channel = 1\n        self.window = create_window(window_size, self.channel)\n\n    def forward(self, img1, img2, mask=None):\n        (_, channel, _, _) = img1.size()\n\n        if (\n            channel == self.channel\n            and self.window.data.type() == img1.data.type()\n        ):\n            window = self.window\n        else:\n            window = create_window(self.window_size, channel)\n\n            if img1.is_cuda:\n                window = window.cuda(img1.get_device())\n            window = window.type_as(img1)\n\n            self.window = window\n            self.channel = channel\n\n        return _ssim(\n            img1,\n            img2,\n            window,\n            self.window_size,\n            channel,\n            mask,\n            self.size_average,\n        )\n\n\ndef ssim(img1, img2, window_size=11, mask=None, size_average=True):\n    (_, channel, _, _) = img1.size()\n    window = create_window(window_size, channel)\n\n    if img1.is_cuda:\n        window = window.cuda(img1.get_device())\n    window = window.type_as(img1)\n\n    return _ssim(img1, img2, window, window_size, channel, mask, size_average)\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/evaluate/torch_frechet_video_distance.py",
    "content": "# based on https://github.com/universome/fvd-comparison/blob/master/compare_models.py; huge thanks!\nimport os\nimport numpy as np\nimport io\nimport re\nimport requests\nimport html\nimport hashlib\nimport urllib\nimport urllib.request\nimport scipy.linalg\nimport multiprocessing as mp\nimport glob\n\n\nfrom tqdm import tqdm\nfrom typing import Any, List, Tuple, Union, Dict, Callable\n\nfrom torchvision.io import read_video\nimport torch; torch.set_grad_enabled(False)\nfrom einops import rearrange\n\nfrom nitro.util import isvideo\n\ndef compute_frechet_distance(mu_sample,sigma_sample,mu_ref,sigma_ref) -> float:\n    print('Calculate frechet distance...')\n    m = np.square(mu_sample - mu_ref).sum()\n    s, _ = scipy.linalg.sqrtm(np.dot(sigma_sample, sigma_ref), disp=False) # pylint: disable=no-member\n    fid = np.real(m + np.trace(sigma_sample + sigma_ref - s * 2))\n\n    return float(fid)\n\n\ndef compute_stats(feats: np.ndarray) -> Tuple[np.ndarray, np.ndarray]:\n    mu = feats.mean(axis=0) # [d]\n    sigma = np.cov(feats, rowvar=False) # [d, d]\n\n    return mu, sigma\n\n\ndef open_url(url: str, num_attempts: int = 10, verbose: bool = True, return_filename: bool = False) -> Any:\n    \"\"\"Download the given URL and return a binary-mode file object to access the data.\"\"\"\n    assert num_attempts >= 1\n\n    # Doesn't look like an URL scheme so interpret it as a local filename.\n    if not re.match('^[a-z]+://', url):\n        return url if return_filename else open(url, \"rb\")\n\n    # Handle file URLs.  This code handles unusual file:// patterns that\n    # arise on Windows:\n    #\n    # file:///c:/foo.txt\n    #\n    # which would translate to a local '/c:/foo.txt' filename that's\n    # invalid.  Drop the forward slash for such pathnames.\n    #\n    # If you touch this code path, you should test it on both Linux and\n    # Windows.\n    #\n    # Some internet resources suggest using urllib.request.url2pathname() but\n    # but that converts forward slashes to backslashes and this causes\n    # its own set of problems.\n    if url.startswith('file://'):\n        filename = urllib.parse.urlparse(url).path\n        if re.match(r'^/[a-zA-Z]:', filename):\n            filename = filename[1:]\n        return filename if return_filename else open(filename, \"rb\")\n\n    url_md5 = hashlib.md5(url.encode(\"utf-8\")).hexdigest()\n\n    # Download.\n    url_name = None\n    url_data = None\n    with requests.Session() as session:\n        if verbose:\n            print(\"Downloading %s ...\" % url, end=\"\", flush=True)\n        for attempts_left in reversed(range(num_attempts)):\n            try:\n                with session.get(url) as res:\n                    res.raise_for_status()\n                    if len(res.content) == 0:\n                        raise IOError(\"No data received\")\n\n                    if len(res.content) < 8192:\n                        content_str = res.content.decode(\"utf-8\")\n                        if \"download_warning\" in res.headers.get(\"Set-Cookie\", \"\"):\n                            links = [html.unescape(link) for link in content_str.split('\"') if \"export=download\" in link]\n                            if len(links) == 1:\n                                url = requests.compat.urljoin(url, links[0])\n                                raise IOError(\"Google Drive virus checker nag\")\n                        if \"Google Drive - Quota exceeded\" in content_str:\n                            raise IOError(\"Google Drive download quota exceeded -- please try again later\")\n\n                    match = re.search(r'filename=\"([^\"]*)\"', res.headers.get(\"Content-Disposition\", \"\"))\n                    url_name = match[1] if match else url\n                    url_data = res.content\n                    if verbose:\n                        print(\" done\")\n                    break\n            except KeyboardInterrupt:\n                raise\n            except:\n                if not attempts_left:\n                    if verbose:\n                        print(\" failed\")\n                    raise\n                if verbose:\n                    print(\".\", end=\"\", flush=True)\n\n    # Return data as file object.\n    assert not return_filename\n    return io.BytesIO(url_data)\n\ndef load_video(ip):\n    vid, *_ = read_video(ip)\n    vid = rearrange(vid, 't h w c -> t c h w').to(torch.uint8)\n    return vid\n\ndef get_data_from_str(input_str,nprc = None):\n    assert os.path.isdir(input_str), f'Specified input folder \"{input_str}\" is not a directory'\n    vid_filelist = glob.glob(os.path.join(input_str,'*.mp4'))\n    print(f'Found {len(vid_filelist)} videos in dir {input_str}')\n\n    if nprc is None:\n        try:\n            nprc = mp.cpu_count()\n        except NotImplementedError:\n            print('WARNING: cpu_count() not avlailable, using only 1 cpu for video loading')\n            nprc = 1\n\n    pool = mp.Pool(processes=nprc)\n\n    vids = []\n    for v in tqdm(pool.imap_unordered(load_video,vid_filelist),total=len(vid_filelist),desc='Loading videos...'):\n        vids.append(v)\n\n\n    vids = torch.stack(vids,dim=0).float()\n\n    return vids\n\ndef get_stats(stats):\n    assert os.path.isfile(stats) and stats.endswith('.npz'), f'no stats found under {stats}'\n\n    print(f'Using precomputed statistics under {stats}')\n    stats = np.load(stats)\n    stats = {key: stats[key] for key in stats.files}\n\n    return stats\n\n\n\n\n@torch.no_grad()\ndef compute_fvd(ref_input, sample_input, bs=32,\n                ref_stats=None,\n                sample_stats=None,\n                nprc_load=None):\n\n\n\n    calc_stats = ref_stats is None or sample_stats is None\n\n    if calc_stats:\n\n        only_ref = sample_stats is not None\n        only_sample = ref_stats is not None\n\n\n        if isinstance(ref_input,str) and not only_sample:\n            ref_input = get_data_from_str(ref_input,nprc_load)\n\n        if isinstance(sample_input, str) and not only_ref:\n            sample_input = get_data_from_str(sample_input, nprc_load)\n\n        stats = compute_statistics(sample_input,ref_input,\n                                        device='cuda' if torch.cuda.is_available() else 'cpu',\n                                        bs=bs,\n                                        only_ref=only_ref,\n                                        only_sample=only_sample)\n\n        if only_ref:\n            stats.update(get_stats(sample_stats))\n        elif only_sample:\n            stats.update(get_stats(ref_stats))\n\n\n\n    else:\n        stats = get_stats(sample_stats)\n        stats.update(get_stats(ref_stats))\n\n    fvd = compute_frechet_distance(**stats)\n\n    return {'FVD' : fvd,}\n\n\n@torch.no_grad()\ndef compute_statistics(videos_fake, videos_real, device: str='cuda', bs=32, only_ref=False,only_sample=False) -> Dict:\n    detector_url = 'https://www.dropbox.com/s/ge9e5ujwgetktms/i3d_torchscript.pt?dl=1'\n    detector_kwargs = dict(rescale=True, resize=True, return_features=True) # Return raw features before the softmax layer.\n\n    with open_url(detector_url, verbose=False) as f:\n        detector = torch.jit.load(f).eval().to(device)\n\n\n\n    assert not (only_sample and only_ref), 'only_ref and only_sample arguments are mutually exclusive'\n\n    ref_embed, sample_embed = [], []\n\n    info = f'Computing I3D activations for FVD score with batch size {bs}'\n\n    if only_ref:\n\n        if not isvideo(videos_real):\n            # if not is video we assume to have numpy arrays pf shape (n_vids, t, h, w, c) in range [0,255]\n            videos_real = torch.from_numpy(videos_real).permute(0, 4, 1, 2, 3).float()\n            print(videos_real.shape)\n\n        if videos_real.shape[0] % bs == 0:\n            n_secs = videos_real.shape[0] // bs\n        else:\n            n_secs = videos_real.shape[0] // bs + 1\n\n        videos_real = torch.tensor_split(videos_real, n_secs, dim=0)\n\n        for ref_v in tqdm(videos_real, total=len(videos_real),desc=info):\n\n            feats_ref = detector(ref_v.to(device).contiguous(), **detector_kwargs).cpu().numpy()\n            ref_embed.append(feats_ref)\n\n    elif only_sample:\n\n        if not isvideo(videos_fake):\n            # if not is video we assume to have numpy arrays pf shape (n_vids, t, h, w, c) in range [0,255]\n            videos_fake = torch.from_numpy(videos_fake).permute(0, 4, 1, 2, 3).float()\n            print(videos_fake.shape)\n\n        if videos_fake.shape[0] % bs == 0:\n            n_secs = videos_fake.shape[0] // bs\n        else:\n            n_secs = videos_fake.shape[0] // bs + 1\n\n        videos_real = torch.tensor_split(videos_real, n_secs, dim=0)\n\n        for sample_v in tqdm(videos_fake, total=len(videos_real),desc=info):\n            feats_sample = detector(sample_v.to(device).contiguous(), **detector_kwargs).cpu().numpy()\n            sample_embed.append(feats_sample)\n\n\n    else:\n\n        if not isvideo(videos_real):\n            # if not is video we assume to have numpy arrays pf shape (n_vids, t, h, w, c) in range [0,255]\n            videos_real = torch.from_numpy(videos_real).permute(0, 4, 1, 2, 3).float()\n\n        if not isvideo(videos_fake):\n            videos_fake = torch.from_numpy(videos_fake).permute(0, 4, 1, 2, 3).float()\n\n        if videos_fake.shape[0] % bs == 0:\n            n_secs = videos_fake.shape[0] // bs\n        else:\n            n_secs = videos_fake.shape[0] // bs + 1\n\n        videos_real = torch.tensor_split(videos_real, n_secs, dim=0)\n        videos_fake = torch.tensor_split(videos_fake, n_secs, dim=0)\n\n        for ref_v, sample_v in tqdm(zip(videos_real,videos_fake),total=len(videos_fake),desc=info):\n            # print(ref_v.shape)\n            # ref_v = torch.nn.functional.interpolate(ref_v, size=(sample_v.shape[2], 256, 256), mode='trilinear', align_corners=False)\n            # sample_v = torch.nn.functional.interpolate(sample_v, size=(sample_v.shape[2], 256, 256), mode='trilinear', align_corners=False)\n\n\n            feats_sample = detector(sample_v.to(device).contiguous(), **detector_kwargs).cpu().numpy()\n            feats_ref = detector(ref_v.to(device).contiguous(), **detector_kwargs).cpu().numpy()\n            sample_embed.append(feats_sample)\n            ref_embed.append(feats_ref)\n\n    out = dict()\n    if len(sample_embed) > 0:\n        sample_embed = np.concatenate(sample_embed,axis=0)\n        mu_sample, sigma_sample = compute_stats(sample_embed)\n        out.update({'mu_sample': mu_sample,\n                    'sigma_sample': sigma_sample})\n\n    if len(ref_embed) > 0:\n        ref_embed = np.concatenate(ref_embed,axis=0)\n        mu_ref, sigma_ref = compute_stats(ref_embed)\n        out.update({'mu_ref': mu_ref,\n                    'sigma_ref': sigma_ref})\n\n\n    return out\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/image_degradation/__init__.py",
    "content": "from ldm.modules.image_degradation.bsrgan import degradation_bsrgan_variant as degradation_fn_bsr\nfrom ldm.modules.image_degradation.bsrgan_light import degradation_bsrgan_variant as degradation_fn_bsr_light\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/image_degradation/bsrgan.py",
    "content": "# -*- coding: utf-8 -*-\n\"\"\"\n# --------------------------------------------\n# Super-Resolution\n# --------------------------------------------\n#\n# Kai Zhang (cskaizhang@gmail.com)\n# https://github.com/cszn\n# From 2019/03--2021/08\n# --------------------------------------------\n\"\"\"\n\nimport numpy as np\nimport cv2\nimport torch\n\nfrom functools import partial\nimport random\nfrom scipy import ndimage\nimport scipy\nimport scipy.stats as ss\nfrom scipy.interpolate import interp2d\nfrom scipy.linalg import orth\nimport albumentations\n\nimport ldm.modules.image_degradation.utils_image as util\n\n\ndef modcrop_np(img, sf):\n    '''\n    Args:\n        img: numpy image, WxH or WxHxC\n        sf: scale factor\n    Return:\n        cropped image\n    '''\n    w, h = img.shape[:2]\n    im = np.copy(img)\n    return im[:w - w % sf, :h - h % sf, ...]\n\n\n\"\"\"\n# --------------------------------------------\n# anisotropic Gaussian kernels\n# --------------------------------------------\n\"\"\"\n\n\ndef analytic_kernel(k):\n    \"\"\"Calculate the X4 kernel from the X2 kernel (for proof see appendix in paper)\"\"\"\n    k_size = k.shape[0]\n    # Calculate the big kernels size\n    big_k = np.zeros((3 * k_size - 2, 3 * k_size - 2))\n    # Loop over the small kernel to fill the big one\n    for r in range(k_size):\n        for c in range(k_size):\n            big_k[2 * r:2 * r + k_size, 2 * c:2 * c + k_size] += k[r, c] * k\n    # Crop the edges of the big kernel to ignore very small values and increase run time of SR\n    crop = k_size // 2\n    cropped_big_k = big_k[crop:-crop, crop:-crop]\n    # Normalize to 1\n    return cropped_big_k / cropped_big_k.sum()\n\n\ndef anisotropic_Gaussian(ksize=15, theta=np.pi, l1=6, l2=6):\n    \"\"\" generate an anisotropic Gaussian kernel\n    Args:\n        ksize : e.g., 15, kernel size\n        theta : [0,  pi], rotation angle range\n        l1    : [0.1,50], scaling of eigenvalues\n        l2    : [0.1,l1], scaling of eigenvalues\n        If l1 = l2, will get an isotropic Gaussian kernel.\n    Returns:\n        k     : kernel\n    \"\"\"\n\n    v = np.dot(np.array([[np.cos(theta), -np.sin(theta)], [np.sin(theta), np.cos(theta)]]), np.array([1., 0.]))\n    V = np.array([[v[0], v[1]], [v[1], -v[0]]])\n    D = np.array([[l1, 0], [0, l2]])\n    Sigma = np.dot(np.dot(V, D), np.linalg.inv(V))\n    k = gm_blur_kernel(mean=[0, 0], cov=Sigma, size=ksize)\n\n    return k\n\n\ndef gm_blur_kernel(mean, cov, size=15):\n    center = size / 2.0 + 0.5\n    k = np.zeros([size, size])\n    for y in range(size):\n        for x in range(size):\n            cy = y - center + 1\n            cx = x - center + 1\n            k[y, x] = ss.multivariate_normal.pdf([cx, cy], mean=mean, cov=cov)\n\n    k = k / np.sum(k)\n    return k\n\n\ndef shift_pixel(x, sf, upper_left=True):\n    \"\"\"shift pixel for super-resolution with different scale factors\n    Args:\n        x: WxHxC or WxH\n        sf: scale factor\n        upper_left: shift direction\n    \"\"\"\n    h, w = x.shape[:2]\n    shift = (sf - 1) * 0.5\n    xv, yv = np.arange(0, w, 1.0), np.arange(0, h, 1.0)\n    if upper_left:\n        x1 = xv + shift\n        y1 = yv + shift\n    else:\n        x1 = xv - shift\n        y1 = yv - shift\n\n    x1 = np.clip(x1, 0, w - 1)\n    y1 = np.clip(y1, 0, h - 1)\n\n    if x.ndim == 2:\n        x = interp2d(xv, yv, x)(x1, y1)\n    if x.ndim == 3:\n        for i in range(x.shape[-1]):\n            x[:, :, i] = interp2d(xv, yv, x[:, :, i])(x1, y1)\n\n    return x\n\n\ndef blur(x, k):\n    '''\n    x: image, NxcxHxW\n    k: kernel, Nx1xhxw\n    '''\n    n, c = x.shape[:2]\n    p1, p2 = (k.shape[-2] - 1) // 2, (k.shape[-1] - 1) // 2\n    x = torch.nn.functional.pad(x, pad=(p1, p2, p1, p2), mode='replicate')\n    k = k.repeat(1, c, 1, 1)\n    k = k.view(-1, 1, k.shape[2], k.shape[3])\n    x = x.view(1, -1, x.shape[2], x.shape[3])\n    x = torch.nn.functional.conv2d(x, k, bias=None, stride=1, padding=0, groups=n * c)\n    x = x.view(n, c, x.shape[2], x.shape[3])\n\n    return x\n\n\ndef gen_kernel(k_size=np.array([15, 15]), scale_factor=np.array([4, 4]), min_var=0.6, max_var=10., noise_level=0):\n    \"\"\"\"\n    # modified version of https://github.com/assafshocher/BlindSR_dataset_generator\n    # Kai Zhang\n    # min_var = 0.175 * sf  # variance of the gaussian kernel will be sampled between min_var and max_var\n    # max_var = 2.5 * sf\n    \"\"\"\n    # Set random eigen-vals (lambdas) and angle (theta) for COV matrix\n    lambda_1 = min_var + np.random.rand() * (max_var - min_var)\n    lambda_2 = min_var + np.random.rand() * (max_var - min_var)\n    theta = np.random.rand() * np.pi  # random theta\n    noise = -noise_level + np.random.rand(*k_size) * noise_level * 2\n\n    # Set COV matrix using Lambdas and Theta\n    LAMBDA = np.diag([lambda_1, lambda_2])\n    Q = np.array([[np.cos(theta), -np.sin(theta)],\n                  [np.sin(theta), np.cos(theta)]])\n    SIGMA = Q @ LAMBDA @ Q.T\n    INV_SIGMA = np.linalg.inv(SIGMA)[None, None, :, :]\n\n    # Set expectation position (shifting kernel for aligned image)\n    MU = k_size // 2 - 0.5 * (scale_factor - 1)  # - 0.5 * (scale_factor - k_size % 2)\n    MU = MU[None, None, :, None]\n\n    # Create meshgrid for Gaussian\n    [X, Y] = np.meshgrid(range(k_size[0]), range(k_size[1]))\n    Z = np.stack([X, Y], 2)[:, :, :, None]\n\n    # Calcualte Gaussian for every pixel of the kernel\n    ZZ = Z - MU\n    ZZ_t = ZZ.transpose(0, 1, 3, 2)\n    raw_kernel = np.exp(-0.5 * np.squeeze(ZZ_t @ INV_SIGMA @ ZZ)) * (1 + noise)\n\n    # shift the kernel so it will be centered\n    # raw_kernel_centered = kernel_shift(raw_kernel, scale_factor)\n\n    # Normalize the kernel and return\n    # kernel = raw_kernel_centered / np.sum(raw_kernel_centered)\n    kernel = raw_kernel / np.sum(raw_kernel)\n    return kernel\n\n\ndef fspecial_gaussian(hsize, sigma):\n    hsize = [hsize, hsize]\n    siz = [(hsize[0] - 1.0) / 2.0, (hsize[1] - 1.0) / 2.0]\n    std = sigma\n    [x, y] = np.meshgrid(np.arange(-siz[1], siz[1] + 1), np.arange(-siz[0], siz[0] + 1))\n    arg = -(x * x + y * y) / (2 * std * std)\n    h = np.exp(arg)\n    h[h < scipy.finfo(float).eps * h.max()] = 0\n    sumh = h.sum()\n    if sumh != 0:\n        h = h / sumh\n    return h\n\n\ndef fspecial_laplacian(alpha):\n    alpha = max([0, min([alpha, 1])])\n    h1 = alpha / (alpha + 1)\n    h2 = (1 - alpha) / (alpha + 1)\n    h = [[h1, h2, h1], [h2, -4 / (alpha + 1), h2], [h1, h2, h1]]\n    h = np.array(h)\n    return h\n\n\ndef fspecial(filter_type, *args, **kwargs):\n    '''\n    python code from:\n    https://github.com/ronaldosena/imagens-medicas-2/blob/40171a6c259edec7827a6693a93955de2bd39e76/Aulas/aula_2_-_uniform_filter/matlab_fspecial.py\n    '''\n    if filter_type == 'gaussian':\n        return fspecial_gaussian(*args, **kwargs)\n    if filter_type == 'laplacian':\n        return fspecial_laplacian(*args, **kwargs)\n\n\n\"\"\"\n# --------------------------------------------\n# degradation models\n# --------------------------------------------\n\"\"\"\n\n\ndef bicubic_degradation(x, sf=3):\n    '''\n    Args:\n        x: HxWxC image, [0, 1]\n        sf: down-scale factor\n    Return:\n        bicubicly downsampled LR image\n    '''\n    x = util.imresize_np(x, scale=1 / sf)\n    return x\n\n\ndef srmd_degradation(x, k, sf=3):\n    ''' blur + bicubic downsampling\n    Args:\n        x: HxWxC image, [0, 1]\n        k: hxw, double\n        sf: down-scale factor\n    Return:\n        downsampled LR image\n    Reference:\n        @inproceedings{zhang2018learning,\n          title={Learning a single convolutional super-resolution network for multiple degradations},\n          author={Zhang, Kai and Zuo, Wangmeng and Zhang, Lei},\n          booktitle={IEEE Conference on Computer Vision and Pattern Recognition},\n          pages={3262--3271},\n          year={2018}\n        }\n    '''\n    x = ndimage.filters.convolve(x, np.expand_dims(k, axis=2), mode='wrap')  # 'nearest' | 'mirror'\n    x = bicubic_degradation(x, sf=sf)\n    return x\n\n\ndef dpsr_degradation(x, k, sf=3):\n    ''' bicubic downsampling + blur\n    Args:\n        x: HxWxC image, [0, 1]\n        k: hxw, double\n        sf: down-scale factor\n    Return:\n        downsampled LR image\n    Reference:\n        @inproceedings{zhang2019deep,\n          title={Deep Plug-and-Play Super-Resolution for Arbitrary Blur Kernels},\n          author={Zhang, Kai and Zuo, Wangmeng and Zhang, Lei},\n          booktitle={IEEE Conference on Computer Vision and Pattern Recognition},\n          pages={1671--1681},\n          year={2019}\n        }\n    '''\n    x = bicubic_degradation(x, sf=sf)\n    x = ndimage.filters.convolve(x, np.expand_dims(k, axis=2), mode='wrap')\n    return x\n\n\ndef classical_degradation(x, k, sf=3):\n    ''' blur + downsampling\n    Args:\n        x: HxWxC image, [0, 1]/[0, 255]\n        k: hxw, double\n        sf: down-scale factor\n    Return:\n        downsampled LR image\n    '''\n    x = ndimage.filters.convolve(x, np.expand_dims(k, axis=2), mode='wrap')\n    # x = filters.correlate(x, np.expand_dims(np.flip(k), axis=2))\n    st = 0\n    return x[st::sf, st::sf, ...]\n\n\ndef add_sharpening(img, weight=0.5, radius=50, threshold=10):\n    \"\"\"USM sharpening. borrowed from real-ESRGAN\n    Input image: I; Blurry image: B.\n    1. K = I + weight * (I - B)\n    2. Mask = 1 if abs(I - B) > threshold, else: 0\n    3. Blur mask:\n    4. Out = Mask * K + (1 - Mask) * I\n    Args:\n        img (Numpy array): Input image, HWC, BGR; float32, [0, 1].\n        weight (float): Sharp weight. Default: 1.\n        radius (float): Kernel size of Gaussian blur. Default: 50.\n        threshold (int):\n    \"\"\"\n    if radius % 2 == 0:\n        radius += 1\n    blur = cv2.GaussianBlur(img, (radius, radius), 0)\n    residual = img - blur\n    mask = np.abs(residual) * 255 > threshold\n    mask = mask.astype('float32')\n    soft_mask = cv2.GaussianBlur(mask, (radius, radius), 0)\n\n    K = img + weight * residual\n    K = np.clip(K, 0, 1)\n    return soft_mask * K + (1 - soft_mask) * img\n\n\ndef add_blur(img, sf=4):\n    wd2 = 4.0 + sf\n    wd = 2.0 + 0.2 * sf\n    if random.random() < 0.5:\n        l1 = wd2 * random.random()\n        l2 = wd2 * random.random()\n        k = anisotropic_Gaussian(ksize=2 * random.randint(2, 11) + 3, theta=random.random() * np.pi, l1=l1, l2=l2)\n    else:\n        k = fspecial('gaussian', 2 * random.randint(2, 11) + 3, wd * random.random())\n    img = ndimage.filters.convolve(img, np.expand_dims(k, axis=2), mode='mirror')\n\n    return img\n\n\ndef add_resize(img, sf=4):\n    rnum = np.random.rand()\n    if rnum > 0.8:  # up\n        sf1 = random.uniform(1, 2)\n    elif rnum < 0.7:  # down\n        sf1 = random.uniform(0.5 / sf, 1)\n    else:\n        sf1 = 1.0\n    img = cv2.resize(img, (int(sf1 * img.shape[1]), int(sf1 * img.shape[0])), interpolation=random.choice([1, 2, 3]))\n    img = np.clip(img, 0.0, 1.0)\n\n    return img\n\n\n# def add_Gaussian_noise(img, noise_level1=2, noise_level2=25):\n#     noise_level = random.randint(noise_level1, noise_level2)\n#     rnum = np.random.rand()\n#     if rnum > 0.6:  # add color Gaussian noise\n#         img += np.random.normal(0, noise_level / 255.0, img.shape).astype(np.float32)\n#     elif rnum < 0.4:  # add grayscale Gaussian noise\n#         img += np.random.normal(0, noise_level / 255.0, (*img.shape[:2], 1)).astype(np.float32)\n#     else:  # add  noise\n#         L = noise_level2 / 255.\n#         D = np.diag(np.random.rand(3))\n#         U = orth(np.random.rand(3, 3))\n#         conv = np.dot(np.dot(np.transpose(U), D), U)\n#         img += np.random.multivariate_normal([0, 0, 0], np.abs(L ** 2 * conv), img.shape[:2]).astype(np.float32)\n#     img = np.clip(img, 0.0, 1.0)\n#     return img\n\ndef add_Gaussian_noise(img, noise_level1=2, noise_level2=25):\n    noise_level = random.randint(noise_level1, noise_level2)\n    rnum = np.random.rand()\n    if rnum > 0.6:  # add color Gaussian noise\n        img = img + np.random.normal(0, noise_level / 255.0, img.shape).astype(np.float32)\n    elif rnum < 0.4:  # add grayscale Gaussian noise\n        img = img + np.random.normal(0, noise_level / 255.0, (*img.shape[:2], 1)).astype(np.float32)\n    else:  # add  noise\n        L = noise_level2 / 255.\n        D = np.diag(np.random.rand(3))\n        U = orth(np.random.rand(3, 3))\n        conv = np.dot(np.dot(np.transpose(U), D), U)\n        img = img + np.random.multivariate_normal([0, 0, 0], np.abs(L ** 2 * conv), img.shape[:2]).astype(np.float32)\n    img = np.clip(img, 0.0, 1.0)\n    return img\n\n\ndef add_speckle_noise(img, noise_level1=2, noise_level2=25):\n    noise_level = random.randint(noise_level1, noise_level2)\n    img = np.clip(img, 0.0, 1.0)\n    rnum = random.random()\n    if rnum > 0.6:\n        img += img * np.random.normal(0, noise_level / 255.0, img.shape).astype(np.float32)\n    elif rnum < 0.4:\n        img += img * np.random.normal(0, noise_level / 255.0, (*img.shape[:2], 1)).astype(np.float32)\n    else:\n        L = noise_level2 / 255.\n        D = np.diag(np.random.rand(3))\n        U = orth(np.random.rand(3, 3))\n        conv = np.dot(np.dot(np.transpose(U), D), U)\n        img += img * np.random.multivariate_normal([0, 0, 0], np.abs(L ** 2 * conv), img.shape[:2]).astype(np.float32)\n    img = np.clip(img, 0.0, 1.0)\n    return img\n\n\ndef add_Poisson_noise(img):\n    img = np.clip((img * 255.0).round(), 0, 255) / 255.\n    vals = 10 ** (2 * random.random() + 2.0)  # [2, 4]\n    if random.random() < 0.5:\n        img = np.random.poisson(img * vals).astype(np.float32) / vals\n    else:\n        img_gray = np.dot(img[..., :3], [0.299, 0.587, 0.114])\n        img_gray = np.clip((img_gray * 255.0).round(), 0, 255) / 255.\n        noise_gray = np.random.poisson(img_gray * vals).astype(np.float32) / vals - img_gray\n        img += noise_gray[:, :, np.newaxis]\n    img = np.clip(img, 0.0, 1.0)\n    return img\n\n\ndef add_JPEG_noise(img):\n    quality_factor = random.randint(30, 95)\n    img = cv2.cvtColor(util.single2uint(img), cv2.COLOR_RGB2BGR)\n    result, encimg = cv2.imencode('.jpg', img, [int(cv2.IMWRITE_JPEG_QUALITY), quality_factor])\n    img = cv2.imdecode(encimg, 1)\n    img = cv2.cvtColor(util.uint2single(img), cv2.COLOR_BGR2RGB)\n    return img\n\n\ndef random_crop(lq, hq, sf=4, lq_patchsize=64):\n    h, w = lq.shape[:2]\n    rnd_h = random.randint(0, h - lq_patchsize)\n    rnd_w = random.randint(0, w - lq_patchsize)\n    lq = lq[rnd_h:rnd_h + lq_patchsize, rnd_w:rnd_w + lq_patchsize, :]\n\n    rnd_h_H, rnd_w_H = int(rnd_h * sf), int(rnd_w * sf)\n    hq = hq[rnd_h_H:rnd_h_H + lq_patchsize * sf, rnd_w_H:rnd_w_H + lq_patchsize * sf, :]\n    return lq, hq\n\n\ndef degradation_bsrgan(img, sf=4, lq_patchsize=72, isp_model=None):\n    \"\"\"\n    This is the degradation model of BSRGAN from the paper\n    \"Designing a Practical Degradation Model for Deep Blind Image Super-Resolution\"\n    ----------\n    img: HXWXC, [0, 1], its size should be large than (lq_patchsizexsf)x(lq_patchsizexsf)\n    sf: scale factor\n    isp_model: camera ISP model\n    Returns\n    -------\n    img: low-quality patch, size: lq_patchsizeXlq_patchsizeXC, range: [0, 1]\n    hq: corresponding high-quality patch, size: (lq_patchsizexsf)X(lq_patchsizexsf)XC, range: [0, 1]\n    \"\"\"\n    isp_prob, jpeg_prob, scale2_prob = 0.25, 0.9, 0.25\n    sf_ori = sf\n\n    h1, w1 = img.shape[:2]\n    img = img.copy()[:w1 - w1 % sf, :h1 - h1 % sf, ...]  # mod crop\n    h, w = img.shape[:2]\n\n    if h < lq_patchsize * sf or w < lq_patchsize * sf:\n        raise ValueError(f'img size ({h1}X{w1}) is too small!')\n\n    hq = img.copy()\n\n    if sf == 4 and random.random() < scale2_prob:  # downsample1\n        if np.random.rand() < 0.5:\n            img = cv2.resize(img, (int(1 / 2 * img.shape[1]), int(1 / 2 * img.shape[0])),\n                             interpolation=random.choice([1, 2, 3]))\n        else:\n            img = util.imresize_np(img, 1 / 2, True)\n        img = np.clip(img, 0.0, 1.0)\n        sf = 2\n\n    shuffle_order = random.sample(range(7), 7)\n    idx1, idx2 = shuffle_order.index(2), shuffle_order.index(3)\n    if idx1 > idx2:  # keep downsample3 last\n        shuffle_order[idx1], shuffle_order[idx2] = shuffle_order[idx2], shuffle_order[idx1]\n\n    for i in shuffle_order:\n\n        if i == 0:\n            img = add_blur(img, sf=sf)\n\n        elif i == 1:\n            img = add_blur(img, sf=sf)\n\n        elif i == 2:\n            a, b = img.shape[1], img.shape[0]\n            # downsample2\n            if random.random() < 0.75:\n                sf1 = random.uniform(1, 2 * sf)\n                img = cv2.resize(img, (int(1 / sf1 * img.shape[1]), int(1 / sf1 * img.shape[0])),\n                                 interpolation=random.choice([1, 2, 3]))\n            else:\n                k = fspecial('gaussian', 25, random.uniform(0.1, 0.6 * sf))\n                k_shifted = shift_pixel(k, sf)\n                k_shifted = k_shifted / k_shifted.sum()  # blur with shifted kernel\n                img = ndimage.filters.convolve(img, np.expand_dims(k_shifted, axis=2), mode='mirror')\n                img = img[0::sf, 0::sf, ...]  # nearest downsampling\n            img = np.clip(img, 0.0, 1.0)\n\n        elif i == 3:\n            # downsample3\n            img = cv2.resize(img, (int(1 / sf * a), int(1 / sf * b)), interpolation=random.choice([1, 2, 3]))\n            img = np.clip(img, 0.0, 1.0)\n\n        elif i == 4:\n            # add Gaussian noise\n            img = add_Gaussian_noise(img, noise_level1=2, noise_level2=25)\n\n        elif i == 5:\n            # add JPEG noise\n            if random.random() < jpeg_prob:\n                img = add_JPEG_noise(img)\n\n        elif i == 6:\n            # add processed camera sensor noise\n            if random.random() < isp_prob and isp_model is not None:\n                with torch.no_grad():\n                    img, hq = isp_model.forward(img.copy(), hq)\n\n    # add final JPEG compression noise\n    img = add_JPEG_noise(img)\n\n    # random crop\n    img, hq = random_crop(img, hq, sf_ori, lq_patchsize)\n\n    return img, hq\n\n\n# todo no isp_model?\ndef degradation_bsrgan_variant(image, sf=4, isp_model=None):\n    \"\"\"\n    This is the degradation model of BSRGAN from the paper\n    \"Designing a Practical Degradation Model for Deep Blind Image Super-Resolution\"\n    ----------\n    sf: scale factor\n    isp_model: camera ISP model\n    Returns\n    -------\n    img: low-quality patch, size: lq_patchsizeXlq_patchsizeXC, range: [0, 1]\n    hq: corresponding high-quality patch, size: (lq_patchsizexsf)X(lq_patchsizexsf)XC, range: [0, 1]\n    \"\"\"\n    image = util.uint2single(image)\n    isp_prob, jpeg_prob, scale2_prob = 0.25, 0.9, 0.25\n    sf_ori = sf\n\n    h1, w1 = image.shape[:2]\n    image = image.copy()[:w1 - w1 % sf, :h1 - h1 % sf, ...]  # mod crop\n    h, w = image.shape[:2]\n\n    hq = image.copy()\n\n    if sf == 4 and random.random() < scale2_prob:  # downsample1\n        if np.random.rand() < 0.5:\n            image = cv2.resize(image, (int(1 / 2 * image.shape[1]), int(1 / 2 * image.shape[0])),\n                               interpolation=random.choice([1, 2, 3]))\n        else:\n            image = util.imresize_np(image, 1 / 2, True)\n        image = np.clip(image, 0.0, 1.0)\n        sf = 2\n\n    shuffle_order = random.sample(range(7), 7)\n    idx1, idx2 = shuffle_order.index(2), shuffle_order.index(3)\n    if idx1 > idx2:  # keep downsample3 last\n        shuffle_order[idx1], shuffle_order[idx2] = shuffle_order[idx2], shuffle_order[idx1]\n\n    for i in shuffle_order:\n\n        if i == 0:\n            image = add_blur(image, sf=sf)\n\n        elif i == 1:\n            image = add_blur(image, sf=sf)\n\n        elif i == 2:\n            a, b = image.shape[1], image.shape[0]\n            # downsample2\n            if random.random() < 0.75:\n                sf1 = random.uniform(1, 2 * sf)\n                image = cv2.resize(image, (int(1 / sf1 * image.shape[1]), int(1 / sf1 * image.shape[0])),\n                                   interpolation=random.choice([1, 2, 3]))\n            else:\n                k = fspecial('gaussian', 25, random.uniform(0.1, 0.6 * sf))\n                k_shifted = shift_pixel(k, sf)\n                k_shifted = k_shifted / k_shifted.sum()  # blur with shifted kernel\n                image = ndimage.filters.convolve(image, np.expand_dims(k_shifted, axis=2), mode='mirror')\n                image = image[0::sf, 0::sf, ...]  # nearest downsampling\n            image = np.clip(image, 0.0, 1.0)\n\n        elif i == 3:\n            # downsample3\n            image = cv2.resize(image, (int(1 / sf * a), int(1 / sf * b)), interpolation=random.choice([1, 2, 3]))\n            image = np.clip(image, 0.0, 1.0)\n\n        elif i == 4:\n            # add Gaussian noise\n            image = add_Gaussian_noise(image, noise_level1=2, noise_level2=25)\n\n        elif i == 5:\n            # add JPEG noise\n            if random.random() < jpeg_prob:\n                image = add_JPEG_noise(image)\n\n        # elif i == 6:\n        #     # add processed camera sensor noise\n        #     if random.random() < isp_prob and isp_model is not None:\n        #         with torch.no_grad():\n        #             img, hq = isp_model.forward(img.copy(), hq)\n\n    # add final JPEG compression noise\n    image = add_JPEG_noise(image)\n    image = util.single2uint(image)\n    example = {\"image\":image}\n    return example\n\n\n# TODO incase there is a pickle error one needs to replace a += x with a = a + x in add_speckle_noise etc...\ndef degradation_bsrgan_plus(img, sf=4, shuffle_prob=0.5, use_sharp=True, lq_patchsize=64, isp_model=None):\n    \"\"\"\n    This is an extended degradation model by combining\n    the degradation models of BSRGAN and Real-ESRGAN\n    ----------\n    img: HXWXC, [0, 1], its size should be large than (lq_patchsizexsf)x(lq_patchsizexsf)\n    sf: scale factor\n    use_shuffle: the degradation shuffle\n    use_sharp: sharpening the img\n    Returns\n    -------\n    img: low-quality patch, size: lq_patchsizeXlq_patchsizeXC, range: [0, 1]\n    hq: corresponding high-quality patch, size: (lq_patchsizexsf)X(lq_patchsizexsf)XC, range: [0, 1]\n    \"\"\"\n\n    h1, w1 = img.shape[:2]\n    img = img.copy()[:w1 - w1 % sf, :h1 - h1 % sf, ...]  # mod crop\n    h, w = img.shape[:2]\n\n    if h < lq_patchsize * sf or w < lq_patchsize * sf:\n        raise ValueError(f'img size ({h1}X{w1}) is too small!')\n\n    if use_sharp:\n        img = add_sharpening(img)\n    hq = img.copy()\n\n    if random.random() < shuffle_prob:\n        shuffle_order = random.sample(range(13), 13)\n    else:\n        shuffle_order = list(range(13))\n        # local shuffle for noise, JPEG is always the last one\n        shuffle_order[2:6] = random.sample(shuffle_order[2:6], len(range(2, 6)))\n        shuffle_order[9:13] = random.sample(shuffle_order[9:13], len(range(9, 13)))\n\n    poisson_prob, speckle_prob, isp_prob = 0.1, 0.1, 0.1\n\n    for i in shuffle_order:\n        if i == 0:\n            img = add_blur(img, sf=sf)\n        elif i == 1:\n            img = add_resize(img, sf=sf)\n        elif i == 2:\n            img = add_Gaussian_noise(img, noise_level1=2, noise_level2=25)\n        elif i == 3:\n            if random.random() < poisson_prob:\n                img = add_Poisson_noise(img)\n        elif i == 4:\n            if random.random() < speckle_prob:\n                img = add_speckle_noise(img)\n        elif i == 5:\n            if random.random() < isp_prob and isp_model is not None:\n                with torch.no_grad():\n                    img, hq = isp_model.forward(img.copy(), hq)\n        elif i == 6:\n            img = add_JPEG_noise(img)\n        elif i == 7:\n            img = add_blur(img, sf=sf)\n        elif i == 8:\n            img = add_resize(img, sf=sf)\n        elif i == 9:\n            img = add_Gaussian_noise(img, noise_level1=2, noise_level2=25)\n        elif i == 10:\n            if random.random() < poisson_prob:\n                img = add_Poisson_noise(img)\n        elif i == 11:\n            if random.random() < speckle_prob:\n                img = add_speckle_noise(img)\n        elif i == 12:\n            if random.random() < isp_prob and isp_model is not None:\n                with torch.no_grad():\n                    img, hq = isp_model.forward(img.copy(), hq)\n        else:\n            print('check the shuffle!')\n\n    # resize to desired size\n    img = cv2.resize(img, (int(1 / sf * hq.shape[1]), int(1 / sf * hq.shape[0])),\n                     interpolation=random.choice([1, 2, 3]))\n\n    # add final JPEG compression noise\n    img = add_JPEG_noise(img)\n\n    # random crop\n    img, hq = random_crop(img, hq, sf, lq_patchsize)\n\n    return img, hq\n\n\nif __name__ == '__main__':\n\tprint(\"hey\")\n\timg = util.imread_uint('utils/test.png', 3)\n\tprint(img)\n\timg = util.uint2single(img)\n\tprint(img)\n\timg = img[:448, :448]\n\th = img.shape[0] // 4\n\tprint(\"resizing to\", h)\n\tsf = 4\n\tdeg_fn = partial(degradation_bsrgan_variant, sf=sf)\n\tfor i in range(20):\n\t\tprint(i)\n\t\timg_lq = deg_fn(img)\n\t\tprint(img_lq)\n\t\timg_lq_bicubic = albumentations.SmallestMaxSize(max_size=h, interpolation=cv2.INTER_CUBIC)(image=img)[\"image\"]\n\t\tprint(img_lq.shape)\n\t\tprint(\"bicubic\", img_lq_bicubic.shape)\n\t\tprint(img_hq.shape)\n\t\tlq_nearest = cv2.resize(util.single2uint(img_lq), (int(sf * img_lq.shape[1]), int(sf * img_lq.shape[0])),\n\t\t                        interpolation=0)\n\t\tlq_bicubic_nearest = cv2.resize(util.single2uint(img_lq_bicubic), (int(sf * img_lq.shape[1]), int(sf * img_lq.shape[0])),\n\t\t                        interpolation=0)\n\t\timg_concat = np.concatenate([lq_bicubic_nearest, lq_nearest, util.single2uint(img_hq)], axis=1)\n\t\tutil.imsave(img_concat, str(i) + '.png')\n\n\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/image_degradation/bsrgan_light.py",
    "content": "# -*- coding: utf-8 -*-\nimport numpy as np\nimport cv2\nimport torch\n\nfrom functools import partial\nimport random\nfrom scipy import ndimage\nimport scipy\nimport scipy.stats as ss\nfrom scipy.interpolate import interp2d\nfrom scipy.linalg import orth\nimport albumentations\n\nimport ldm.modules.image_degradation.utils_image as util\n\n\"\"\"\n# --------------------------------------------\n# Super-Resolution\n# --------------------------------------------\n#\n# Kai Zhang (cskaizhang@gmail.com)\n# https://github.com/cszn\n# From 2019/03--2021/08\n# --------------------------------------------\n\"\"\"\n\n\ndef modcrop_np(img, sf):\n    '''\n    Args:\n        img: numpy image, WxH or WxHxC\n        sf: scale factor\n    Return:\n        cropped image\n    '''\n    w, h = img.shape[:2]\n    im = np.copy(img)\n    return im[:w - w % sf, :h - h % sf, ...]\n\n\n\"\"\"\n# --------------------------------------------\n# anisotropic Gaussian kernels\n# --------------------------------------------\n\"\"\"\n\n\ndef analytic_kernel(k):\n    \"\"\"Calculate the X4 kernel from the X2 kernel (for proof see appendix in paper)\"\"\"\n    k_size = k.shape[0]\n    # Calculate the big kernels size\n    big_k = np.zeros((3 * k_size - 2, 3 * k_size - 2))\n    # Loop over the small kernel to fill the big one\n    for r in range(k_size):\n        for c in range(k_size):\n            big_k[2 * r:2 * r + k_size, 2 * c:2 * c + k_size] += k[r, c] * k\n    # Crop the edges of the big kernel to ignore very small values and increase run time of SR\n    crop = k_size // 2\n    cropped_big_k = big_k[crop:-crop, crop:-crop]\n    # Normalize to 1\n    return cropped_big_k / cropped_big_k.sum()\n\n\ndef anisotropic_Gaussian(ksize=15, theta=np.pi, l1=6, l2=6):\n    \"\"\" generate an anisotropic Gaussian kernel\n    Args:\n        ksize : e.g., 15, kernel size\n        theta : [0,  pi], rotation angle range\n        l1    : [0.1,50], scaling of eigenvalues\n        l2    : [0.1,l1], scaling of eigenvalues\n        If l1 = l2, will get an isotropic Gaussian kernel.\n    Returns:\n        k     : kernel\n    \"\"\"\n\n    v = np.dot(np.array([[np.cos(theta), -np.sin(theta)], [np.sin(theta), np.cos(theta)]]), np.array([1., 0.]))\n    V = np.array([[v[0], v[1]], [v[1], -v[0]]])\n    D = np.array([[l1, 0], [0, l2]])\n    Sigma = np.dot(np.dot(V, D), np.linalg.inv(V))\n    k = gm_blur_kernel(mean=[0, 0], cov=Sigma, size=ksize)\n\n    return k\n\n\ndef gm_blur_kernel(mean, cov, size=15):\n    center = size / 2.0 + 0.5\n    k = np.zeros([size, size])\n    for y in range(size):\n        for x in range(size):\n            cy = y - center + 1\n            cx = x - center + 1\n            k[y, x] = ss.multivariate_normal.pdf([cx, cy], mean=mean, cov=cov)\n\n    k = k / np.sum(k)\n    return k\n\n\ndef shift_pixel(x, sf, upper_left=True):\n    \"\"\"shift pixel for super-resolution with different scale factors\n    Args:\n        x: WxHxC or WxH\n        sf: scale factor\n        upper_left: shift direction\n    \"\"\"\n    h, w = x.shape[:2]\n    shift = (sf - 1) * 0.5\n    xv, yv = np.arange(0, w, 1.0), np.arange(0, h, 1.0)\n    if upper_left:\n        x1 = xv + shift\n        y1 = yv + shift\n    else:\n        x1 = xv - shift\n        y1 = yv - shift\n\n    x1 = np.clip(x1, 0, w - 1)\n    y1 = np.clip(y1, 0, h - 1)\n\n    if x.ndim == 2:\n        x = interp2d(xv, yv, x)(x1, y1)\n    if x.ndim == 3:\n        for i in range(x.shape[-1]):\n            x[:, :, i] = interp2d(xv, yv, x[:, :, i])(x1, y1)\n\n    return x\n\n\ndef blur(x, k):\n    '''\n    x: image, NxcxHxW\n    k: kernel, Nx1xhxw\n    '''\n    n, c = x.shape[:2]\n    p1, p2 = (k.shape[-2] - 1) // 2, (k.shape[-1] - 1) // 2\n    x = torch.nn.functional.pad(x, pad=(p1, p2, p1, p2), mode='replicate')\n    k = k.repeat(1, c, 1, 1)\n    k = k.view(-1, 1, k.shape[2], k.shape[3])\n    x = x.view(1, -1, x.shape[2], x.shape[3])\n    x = torch.nn.functional.conv2d(x, k, bias=None, stride=1, padding=0, groups=n * c)\n    x = x.view(n, c, x.shape[2], x.shape[3])\n\n    return x\n\n\ndef gen_kernel(k_size=np.array([15, 15]), scale_factor=np.array([4, 4]), min_var=0.6, max_var=10., noise_level=0):\n    \"\"\"\"\n    # modified version of https://github.com/assafshocher/BlindSR_dataset_generator\n    # Kai Zhang\n    # min_var = 0.175 * sf  # variance of the gaussian kernel will be sampled between min_var and max_var\n    # max_var = 2.5 * sf\n    \"\"\"\n    # Set random eigen-vals (lambdas) and angle (theta) for COV matrix\n    lambda_1 = min_var + np.random.rand() * (max_var - min_var)\n    lambda_2 = min_var + np.random.rand() * (max_var - min_var)\n    theta = np.random.rand() * np.pi  # random theta\n    noise = -noise_level + np.random.rand(*k_size) * noise_level * 2\n\n    # Set COV matrix using Lambdas and Theta\n    LAMBDA = np.diag([lambda_1, lambda_2])\n    Q = np.array([[np.cos(theta), -np.sin(theta)],\n                  [np.sin(theta), np.cos(theta)]])\n    SIGMA = Q @ LAMBDA @ Q.T\n    INV_SIGMA = np.linalg.inv(SIGMA)[None, None, :, :]\n\n    # Set expectation position (shifting kernel for aligned image)\n    MU = k_size // 2 - 0.5 * (scale_factor - 1)  # - 0.5 * (scale_factor - k_size % 2)\n    MU = MU[None, None, :, None]\n\n    # Create meshgrid for Gaussian\n    [X, Y] = np.meshgrid(range(k_size[0]), range(k_size[1]))\n    Z = np.stack([X, Y], 2)[:, :, :, None]\n\n    # Calcualte Gaussian for every pixel of the kernel\n    ZZ = Z - MU\n    ZZ_t = ZZ.transpose(0, 1, 3, 2)\n    raw_kernel = np.exp(-0.5 * np.squeeze(ZZ_t @ INV_SIGMA @ ZZ)) * (1 + noise)\n\n    # shift the kernel so it will be centered\n    # raw_kernel_centered = kernel_shift(raw_kernel, scale_factor)\n\n    # Normalize the kernel and return\n    # kernel = raw_kernel_centered / np.sum(raw_kernel_centered)\n    kernel = raw_kernel / np.sum(raw_kernel)\n    return kernel\n\n\ndef fspecial_gaussian(hsize, sigma):\n    hsize = [hsize, hsize]\n    siz = [(hsize[0] - 1.0) / 2.0, (hsize[1] - 1.0) / 2.0]\n    std = sigma\n    [x, y] = np.meshgrid(np.arange(-siz[1], siz[1] + 1), np.arange(-siz[0], siz[0] + 1))\n    arg = -(x * x + y * y) / (2 * std * std)\n    h = np.exp(arg)\n    h[h < scipy.finfo(float).eps * h.max()] = 0\n    sumh = h.sum()\n    if sumh != 0:\n        h = h / sumh\n    return h\n\n\ndef fspecial_laplacian(alpha):\n    alpha = max([0, min([alpha, 1])])\n    h1 = alpha / (alpha + 1)\n    h2 = (1 - alpha) / (alpha + 1)\n    h = [[h1, h2, h1], [h2, -4 / (alpha + 1), h2], [h1, h2, h1]]\n    h = np.array(h)\n    return h\n\n\ndef fspecial(filter_type, *args, **kwargs):\n    '''\n    python code from:\n    https://github.com/ronaldosena/imagens-medicas-2/blob/40171a6c259edec7827a6693a93955de2bd39e76/Aulas/aula_2_-_uniform_filter/matlab_fspecial.py\n    '''\n    if filter_type == 'gaussian':\n        return fspecial_gaussian(*args, **kwargs)\n    if filter_type == 'laplacian':\n        return fspecial_laplacian(*args, **kwargs)\n\n\n\"\"\"\n# --------------------------------------------\n# degradation models\n# --------------------------------------------\n\"\"\"\n\n\ndef bicubic_degradation(x, sf=3):\n    '''\n    Args:\n        x: HxWxC image, [0, 1]\n        sf: down-scale factor\n    Return:\n        bicubicly downsampled LR image\n    '''\n    x = util.imresize_np(x, scale=1 / sf)\n    return x\n\n\ndef srmd_degradation(x, k, sf=3):\n    ''' blur + bicubic downsampling\n    Args:\n        x: HxWxC image, [0, 1]\n        k: hxw, double\n        sf: down-scale factor\n    Return:\n        downsampled LR image\n    Reference:\n        @inproceedings{zhang2018learning,\n          title={Learning a single convolutional super-resolution network for multiple degradations},\n          author={Zhang, Kai and Zuo, Wangmeng and Zhang, Lei},\n          booktitle={IEEE Conference on Computer Vision and Pattern Recognition},\n          pages={3262--3271},\n          year={2018}\n        }\n    '''\n    x = ndimage.convolve(x, np.expand_dims(k, axis=2), mode='wrap')  # 'nearest' | 'mirror'\n    x = bicubic_degradation(x, sf=sf)\n    return x\n\n\ndef dpsr_degradation(x, k, sf=3):\n    ''' bicubic downsampling + blur\n    Args:\n        x: HxWxC image, [0, 1]\n        k: hxw, double\n        sf: down-scale factor\n    Return:\n        downsampled LR image\n    Reference:\n        @inproceedings{zhang2019deep,\n          title={Deep Plug-and-Play Super-Resolution for Arbitrary Blur Kernels},\n          author={Zhang, Kai and Zuo, Wangmeng and Zhang, Lei},\n          booktitle={IEEE Conference on Computer Vision and Pattern Recognition},\n          pages={1671--1681},\n          year={2019}\n        }\n    '''\n    x = bicubic_degradation(x, sf=sf)\n    x = ndimage.convolve(x, np.expand_dims(k, axis=2), mode='wrap')\n    return x\n\n\ndef classical_degradation(x, k, sf=3):\n    ''' blur + downsampling\n    Args:\n        x: HxWxC image, [0, 1]/[0, 255]\n        k: hxw, double\n        sf: down-scale factor\n    Return:\n        downsampled LR image\n    '''\n    x = ndimage.convolve(x, np.expand_dims(k, axis=2), mode='wrap')\n    # x = filters.correlate(x, np.expand_dims(np.flip(k), axis=2))\n    st = 0\n    return x[st::sf, st::sf, ...]\n\n\ndef add_sharpening(img, weight=0.5, radius=50, threshold=10):\n    \"\"\"USM sharpening. borrowed from real-ESRGAN\n    Input image: I; Blurry image: B.\n    1. K = I + weight * (I - B)\n    2. Mask = 1 if abs(I - B) > threshold, else: 0\n    3. Blur mask:\n    4. Out = Mask * K + (1 - Mask) * I\n    Args:\n        img (Numpy array): Input image, HWC, BGR; float32, [0, 1].\n        weight (float): Sharp weight. Default: 1.\n        radius (float): Kernel size of Gaussian blur. Default: 50.\n        threshold (int):\n    \"\"\"\n    if radius % 2 == 0:\n        radius += 1\n    blur = cv2.GaussianBlur(img, (radius, radius), 0)\n    residual = img - blur\n    mask = np.abs(residual) * 255 > threshold\n    mask = mask.astype('float32')\n    soft_mask = cv2.GaussianBlur(mask, (radius, radius), 0)\n\n    K = img + weight * residual\n    K = np.clip(K, 0, 1)\n    return soft_mask * K + (1 - soft_mask) * img\n\n\ndef add_blur(img, sf=4):\n    wd2 = 4.0 + sf\n    wd = 2.0 + 0.2 * sf\n\n    wd2 = wd2/4\n    wd = wd/4\n\n    if random.random() < 0.5:\n        l1 = wd2 * random.random()\n        l2 = wd2 * random.random()\n        k = anisotropic_Gaussian(ksize=random.randint(2, 11) + 3, theta=random.random() * np.pi, l1=l1, l2=l2)\n    else:\n        k = fspecial('gaussian', random.randint(2, 4) + 3, wd * random.random())\n    img = ndimage.convolve(img, np.expand_dims(k, axis=2), mode='mirror')\n\n    return img\n\n\ndef add_resize(img, sf=4):\n    rnum = np.random.rand()\n    if rnum > 0.8:  # up\n        sf1 = random.uniform(1, 2)\n    elif rnum < 0.7:  # down\n        sf1 = random.uniform(0.5 / sf, 1)\n    else:\n        sf1 = 1.0\n    img = cv2.resize(img, (int(sf1 * img.shape[1]), int(sf1 * img.shape[0])), interpolation=random.choice([1, 2, 3]))\n    img = np.clip(img, 0.0, 1.0)\n\n    return img\n\n\n# def add_Gaussian_noise(img, noise_level1=2, noise_level2=25):\n#     noise_level = random.randint(noise_level1, noise_level2)\n#     rnum = np.random.rand()\n#     if rnum > 0.6:  # add color Gaussian noise\n#         img += np.random.normal(0, noise_level / 255.0, img.shape).astype(np.float32)\n#     elif rnum < 0.4:  # add grayscale Gaussian noise\n#         img += np.random.normal(0, noise_level / 255.0, (*img.shape[:2], 1)).astype(np.float32)\n#     else:  # add  noise\n#         L = noise_level2 / 255.\n#         D = np.diag(np.random.rand(3))\n#         U = orth(np.random.rand(3, 3))\n#         conv = np.dot(np.dot(np.transpose(U), D), U)\n#         img += np.random.multivariate_normal([0, 0, 0], np.abs(L ** 2 * conv), img.shape[:2]).astype(np.float32)\n#     img = np.clip(img, 0.0, 1.0)\n#     return img\n\ndef add_Gaussian_noise(img, noise_level1=2, noise_level2=25):\n    noise_level = random.randint(noise_level1, noise_level2)\n    rnum = np.random.rand()\n    if rnum > 0.6:  # add color Gaussian noise\n        img = img + np.random.normal(0, noise_level / 255.0, img.shape).astype(np.float32)\n    elif rnum < 0.4:  # add grayscale Gaussian noise\n        img = img + np.random.normal(0, noise_level / 255.0, (*img.shape[:2], 1)).astype(np.float32)\n    else:  # add  noise\n        L = noise_level2 / 255.\n        D = np.diag(np.random.rand(3))\n        U = orth(np.random.rand(3, 3))\n        conv = np.dot(np.dot(np.transpose(U), D), U)\n        img = img + np.random.multivariate_normal([0, 0, 0], np.abs(L ** 2 * conv), img.shape[:2]).astype(np.float32)\n    img = np.clip(img, 0.0, 1.0)\n    return img\n\n\ndef add_speckle_noise(img, noise_level1=2, noise_level2=25):\n    noise_level = random.randint(noise_level1, noise_level2)\n    img = np.clip(img, 0.0, 1.0)\n    rnum = random.random()\n    if rnum > 0.6:\n        img += img * np.random.normal(0, noise_level / 255.0, img.shape).astype(np.float32)\n    elif rnum < 0.4:\n        img += img * np.random.normal(0, noise_level / 255.0, (*img.shape[:2], 1)).astype(np.float32)\n    else:\n        L = noise_level2 / 255.\n        D = np.diag(np.random.rand(3))\n        U = orth(np.random.rand(3, 3))\n        conv = np.dot(np.dot(np.transpose(U), D), U)\n        img += img * np.random.multivariate_normal([0, 0, 0], np.abs(L ** 2 * conv), img.shape[:2]).astype(np.float32)\n    img = np.clip(img, 0.0, 1.0)\n    return img\n\n\ndef add_Poisson_noise(img):\n    img = np.clip((img * 255.0).round(), 0, 255) / 255.\n    vals = 10 ** (2 * random.random() + 2.0)  # [2, 4]\n    if random.random() < 0.5:\n        img = np.random.poisson(img * vals).astype(np.float32) / vals\n    else:\n        img_gray = np.dot(img[..., :3], [0.299, 0.587, 0.114])\n        img_gray = np.clip((img_gray * 255.0).round(), 0, 255) / 255.\n        noise_gray = np.random.poisson(img_gray * vals).astype(np.float32) / vals - img_gray\n        img += noise_gray[:, :, np.newaxis]\n    img = np.clip(img, 0.0, 1.0)\n    return img\n\n\ndef add_JPEG_noise(img):\n    quality_factor = random.randint(80, 95)\n    img = cv2.cvtColor(util.single2uint(img), cv2.COLOR_RGB2BGR)\n    result, encimg = cv2.imencode('.jpg', img, [int(cv2.IMWRITE_JPEG_QUALITY), quality_factor])\n    img = cv2.imdecode(encimg, 1)\n    img = cv2.cvtColor(util.uint2single(img), cv2.COLOR_BGR2RGB)\n    return img\n\n\ndef random_crop(lq, hq, sf=4, lq_patchsize=64):\n    h, w = lq.shape[:2]\n    rnd_h = random.randint(0, h - lq_patchsize)\n    rnd_w = random.randint(0, w - lq_patchsize)\n    lq = lq[rnd_h:rnd_h + lq_patchsize, rnd_w:rnd_w + lq_patchsize, :]\n\n    rnd_h_H, rnd_w_H = int(rnd_h * sf), int(rnd_w * sf)\n    hq = hq[rnd_h_H:rnd_h_H + lq_patchsize * sf, rnd_w_H:rnd_w_H + lq_patchsize * sf, :]\n    return lq, hq\n\n\ndef degradation_bsrgan(img, sf=4, lq_patchsize=72, isp_model=None):\n    \"\"\"\n    This is the degradation model of BSRGAN from the paper\n    \"Designing a Practical Degradation Model for Deep Blind Image Super-Resolution\"\n    ----------\n    img: HXWXC, [0, 1], its size should be large than (lq_patchsizexsf)x(lq_patchsizexsf)\n    sf: scale factor\n    isp_model: camera ISP model\n    Returns\n    -------\n    img: low-quality patch, size: lq_patchsizeXlq_patchsizeXC, range: [0, 1]\n    hq: corresponding high-quality patch, size: (lq_patchsizexsf)X(lq_patchsizexsf)XC, range: [0, 1]\n    \"\"\"\n    isp_prob, jpeg_prob, scale2_prob = 0.25, 0.9, 0.25\n    sf_ori = sf\n\n    h1, w1 = img.shape[:2]\n    img = img.copy()[:w1 - w1 % sf, :h1 - h1 % sf, ...]  # mod crop\n    h, w = img.shape[:2]\n\n    if h < lq_patchsize * sf or w < lq_patchsize * sf:\n        raise ValueError(f'img size ({h1}X{w1}) is too small!')\n\n    hq = img.copy()\n\n    if sf == 4 and random.random() < scale2_prob:  # downsample1\n        if np.random.rand() < 0.5:\n            img = cv2.resize(img, (int(1 / 2 * img.shape[1]), int(1 / 2 * img.shape[0])),\n                             interpolation=random.choice([1, 2, 3]))\n        else:\n            img = util.imresize_np(img, 1 / 2, True)\n        img = np.clip(img, 0.0, 1.0)\n        sf = 2\n\n    shuffle_order = random.sample(range(7), 7)\n    idx1, idx2 = shuffle_order.index(2), shuffle_order.index(3)\n    if idx1 > idx2:  # keep downsample3 last\n        shuffle_order[idx1], shuffle_order[idx2] = shuffle_order[idx2], shuffle_order[idx1]\n\n    for i in shuffle_order:\n\n        if i == 0:\n            img = add_blur(img, sf=sf)\n\n        elif i == 1:\n            img = add_blur(img, sf=sf)\n\n        elif i == 2:\n            a, b = img.shape[1], img.shape[0]\n            # downsample2\n            if random.random() < 0.75:\n                sf1 = random.uniform(1, 2 * sf)\n                img = cv2.resize(img, (int(1 / sf1 * img.shape[1]), int(1 / sf1 * img.shape[0])),\n                                 interpolation=random.choice([1, 2, 3]))\n            else:\n                k = fspecial('gaussian', 25, random.uniform(0.1, 0.6 * sf))\n                k_shifted = shift_pixel(k, sf)\n                k_shifted = k_shifted / k_shifted.sum()  # blur with shifted kernel\n                img = ndimage.convolve(img, np.expand_dims(k_shifted, axis=2), mode='mirror')\n                img = img[0::sf, 0::sf, ...]  # nearest downsampling\n            img = np.clip(img, 0.0, 1.0)\n\n        elif i == 3:\n            # downsample3\n            img = cv2.resize(img, (int(1 / sf * a), int(1 / sf * b)), interpolation=random.choice([1, 2, 3]))\n            img = np.clip(img, 0.0, 1.0)\n\n        elif i == 4:\n            # add Gaussian noise\n            img = add_Gaussian_noise(img, noise_level1=2, noise_level2=8)\n\n        elif i == 5:\n            # add JPEG noise\n            if random.random() < jpeg_prob:\n                img = add_JPEG_noise(img)\n\n        elif i == 6:\n            # add processed camera sensor noise\n            if random.random() < isp_prob and isp_model is not None:\n                with torch.no_grad():\n                    img, hq = isp_model.forward(img.copy(), hq)\n\n    # add final JPEG compression noise\n    img = add_JPEG_noise(img)\n\n    # random crop\n    img, hq = random_crop(img, hq, sf_ori, lq_patchsize)\n\n    return img, hq\n\n\n# todo no isp_model?\ndef degradation_bsrgan_variant(image, sf=4, isp_model=None):\n    \"\"\"\n    This is the degradation model of BSRGAN from the paper\n    \"Designing a Practical Degradation Model for Deep Blind Image Super-Resolution\"\n    ----------\n    sf: scale factor\n    isp_model: camera ISP model\n    Returns\n    -------\n    img: low-quality patch, size: lq_patchsizeXlq_patchsizeXC, range: [0, 1]\n    hq: corresponding high-quality patch, size: (lq_patchsizexsf)X(lq_patchsizexsf)XC, range: [0, 1]\n    \"\"\"\n    image = util.uint2single(image)\n    isp_prob, jpeg_prob, scale2_prob = 0.25, 0.9, 0.25\n    sf_ori = sf\n\n    h1, w1 = image.shape[:2]\n    image = image.copy()[:w1 - w1 % sf, :h1 - h1 % sf, ...]  # mod crop\n    h, w = image.shape[:2]\n\n    hq = image.copy()\n\n    if sf == 4 and random.random() < scale2_prob:  # downsample1\n        if np.random.rand() < 0.5:\n            image = cv2.resize(image, (int(1 / 2 * image.shape[1]), int(1 / 2 * image.shape[0])),\n                               interpolation=random.choice([1, 2, 3]))\n        else:\n            image = util.imresize_np(image, 1 / 2, True)\n        image = np.clip(image, 0.0, 1.0)\n        sf = 2\n\n    shuffle_order = random.sample(range(7), 7)\n    idx1, idx2 = shuffle_order.index(2), shuffle_order.index(3)\n    if idx1 > idx2:  # keep downsample3 last\n        shuffle_order[idx1], shuffle_order[idx2] = shuffle_order[idx2], shuffle_order[idx1]\n\n    for i in shuffle_order:\n\n        if i == 0:\n            image = add_blur(image, sf=sf)\n\n        # elif i == 1:\n        #     image = add_blur(image, sf=sf)\n\n        if i == 0:\n            pass\n\n        elif i == 2:\n            a, b = image.shape[1], image.shape[0]\n            # downsample2\n            if random.random() < 0.8:\n                sf1 = random.uniform(1, 2 * sf)\n                image = cv2.resize(image, (int(1 / sf1 * image.shape[1]), int(1 / sf1 * image.shape[0])),\n                                   interpolation=random.choice([1, 2, 3]))\n            else:\n                k = fspecial('gaussian', 25, random.uniform(0.1, 0.6 * sf))\n                k_shifted = shift_pixel(k, sf)\n                k_shifted = k_shifted / k_shifted.sum()  # blur with shifted kernel\n                image = ndimage.convolve(image, np.expand_dims(k_shifted, axis=2), mode='mirror')\n                image = image[0::sf, 0::sf, ...]  # nearest downsampling\n\n            image = np.clip(image, 0.0, 1.0)\n\n        elif i == 3:\n            # downsample3\n            image = cv2.resize(image, (int(1 / sf * a), int(1 / sf * b)), interpolation=random.choice([1, 2, 3]))\n            image = np.clip(image, 0.0, 1.0)\n\n        elif i == 4:\n            # add Gaussian noise\n            image = add_Gaussian_noise(image, noise_level1=1, noise_level2=2)\n\n        elif i == 5:\n            # add JPEG noise\n            if random.random() < jpeg_prob:\n                image = add_JPEG_noise(image)\n        #\n        # elif i == 6:\n        #     # add processed camera sensor noise\n        #     if random.random() < isp_prob and isp_model is not None:\n        #         with torch.no_grad():\n        #             img, hq = isp_model.forward(img.copy(), hq)\n\n    # add final JPEG compression noise\n    image = add_JPEG_noise(image)\n    image = util.single2uint(image)\n    example = {\"image\": image}\n    return example\n\n\n\n\nif __name__ == '__main__':\n    print(\"hey\")\n    img = util.imread_uint('utils/test.png', 3)\n    img = img[:448, :448]\n    h = img.shape[0] // 4\n    print(\"resizing to\", h)\n    sf = 4\n    deg_fn = partial(degradation_bsrgan_variant, sf=sf)\n    for i in range(20):\n        print(i)\n        img_hq = img\n        img_lq = deg_fn(img)[\"image\"]\n        img_hq, img_lq = util.uint2single(img_hq), util.uint2single(img_lq)\n        print(img_lq)\n        img_lq_bicubic = albumentations.SmallestMaxSize(max_size=h, interpolation=cv2.INTER_CUBIC)(image=img_hq)[\"image\"]\n        print(img_lq.shape)\n        print(\"bicubic\", img_lq_bicubic.shape)\n        print(img_hq.shape)\n        lq_nearest = cv2.resize(util.single2uint(img_lq), (int(sf * img_lq.shape[1]), int(sf * img_lq.shape[0])),\n                                interpolation=0)\n        lq_bicubic_nearest = cv2.resize(util.single2uint(img_lq_bicubic),\n                                        (int(sf * img_lq.shape[1]), int(sf * img_lq.shape[0])),\n                                        interpolation=0)\n        img_concat = np.concatenate([lq_bicubic_nearest, lq_nearest, util.single2uint(img_hq)], axis=1)\n        util.imsave(img_concat, str(i) + '.png')\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/image_degradation/utils_image.py",
    "content": "import os\nimport math\nimport random\nimport numpy as np\nimport torch\nimport cv2\nfrom torchvision.utils import make_grid\nfrom datetime import datetime\n#import matplotlib.pyplot as plt   # TODO: check with Dominik, also bsrgan.py vs bsrgan_light.py\n\n\nos.environ[\"KMP_DUPLICATE_LIB_OK\"]=\"TRUE\"\n\n\n'''\n# --------------------------------------------\n# Kai Zhang (github: https://github.com/cszn)\n# 03/Mar/2019\n# --------------------------------------------\n# https://github.com/twhui/SRGAN-pyTorch\n# https://github.com/xinntao/BasicSR\n# --------------------------------------------\n'''\n\n\nIMG_EXTENSIONS = ['.jpg', '.JPG', '.jpeg', '.JPEG', '.png', '.PNG', '.ppm', '.PPM', '.bmp', '.BMP', '.tif']\n\n\ndef is_image_file(filename):\n    return any(filename.endswith(extension) for extension in IMG_EXTENSIONS)\n\n\ndef get_timestamp():\n    return datetime.now().strftime('%y%m%d-%H%M%S')\n\n\ndef imshow(x, title=None, cbar=False, figsize=None):\n    plt.figure(figsize=figsize)\n    plt.imshow(np.squeeze(x), interpolation='nearest', cmap='gray')\n    if title:\n        plt.title(title)\n    if cbar:\n        plt.colorbar()\n    plt.show()\n\n\ndef surf(Z, cmap='rainbow', figsize=None):\n    plt.figure(figsize=figsize)\n    ax3 = plt.axes(projection='3d')\n\n    w, h = Z.shape[:2]\n    xx = np.arange(0,w,1)\n    yy = np.arange(0,h,1)\n    X, Y = np.meshgrid(xx, yy)\n    ax3.plot_surface(X,Y,Z,cmap=cmap)\n    #ax3.contour(X,Y,Z, zdim='z',offset=-2，cmap=cmap)\n    plt.show()\n\n\n'''\n# --------------------------------------------\n# get image pathes\n# --------------------------------------------\n'''\n\n\ndef get_image_paths(dataroot):\n    paths = None  # return None if dataroot is None\n    if dataroot is not None:\n        paths = sorted(_get_paths_from_images(dataroot))\n    return paths\n\n\ndef _get_paths_from_images(path):\n    assert os.path.isdir(path), '{:s} is not a valid directory'.format(path)\n    images = []\n    for dirpath, _, fnames in sorted(os.walk(path)):\n        for fname in sorted(fnames):\n            if is_image_file(fname):\n                img_path = os.path.join(dirpath, fname)\n                images.append(img_path)\n    assert images, '{:s} has no valid image file'.format(path)\n    return images\n\n\n'''\n# --------------------------------------------\n# split large images into small images \n# --------------------------------------------\n'''\n\n\ndef patches_from_image(img, p_size=512, p_overlap=64, p_max=800):\n    w, h = img.shape[:2]\n    patches = []\n    if w > p_max and h > p_max:\n        w1 = list(np.arange(0, w-p_size, p_size-p_overlap, dtype=np.int))\n        h1 = list(np.arange(0, h-p_size, p_size-p_overlap, dtype=np.int))\n        w1.append(w-p_size)\n        h1.append(h-p_size)\n#        print(w1)\n#        print(h1)\n        for i in w1:\n            for j in h1:\n                patches.append(img[i:i+p_size, j:j+p_size,:])\n    else:\n        patches.append(img)\n\n    return patches\n\n\ndef imssave(imgs, img_path):\n    \"\"\"\n    imgs: list, N images of size WxHxC\n    \"\"\"\n    img_name, ext = os.path.splitext(os.path.basename(img_path))\n\n    for i, img in enumerate(imgs):\n        if img.ndim == 3:\n            img = img[:, :, [2, 1, 0]]\n        new_path = os.path.join(os.path.dirname(img_path), img_name+str('_s{:04d}'.format(i))+'.png')\n        cv2.imwrite(new_path, img)\n\n\ndef split_imageset(original_dataroot, taget_dataroot, n_channels=3, p_size=800, p_overlap=96, p_max=1000):\n    \"\"\"\n    split the large images from original_dataroot into small overlapped images with size (p_size)x(p_size),\n    and save them into taget_dataroot; only the images with larger size than (p_max)x(p_max)\n    will be splitted.\n    Args:\n        original_dataroot:\n        taget_dataroot:\n        p_size: size of small images\n        p_overlap: patch size in training is a good choice\n        p_max: images with smaller size than (p_max)x(p_max) keep unchanged.\n    \"\"\"\n    paths = get_image_paths(original_dataroot)\n    for img_path in paths:\n        # img_name, ext = os.path.splitext(os.path.basename(img_path))\n        img = imread_uint(img_path, n_channels=n_channels)\n        patches = patches_from_image(img, p_size, p_overlap, p_max)\n        imssave(patches, os.path.join(taget_dataroot,os.path.basename(img_path)))\n        #if original_dataroot == taget_dataroot:\n        #del img_path\n\n'''\n# --------------------------------------------\n# makedir\n# --------------------------------------------\n'''\n\n\ndef mkdir(path):\n    if not os.path.exists(path):\n        os.makedirs(path)\n\n\ndef mkdirs(paths):\n    if isinstance(paths, str):\n        mkdir(paths)\n    else:\n        for path in paths:\n            mkdir(path)\n\n\ndef mkdir_and_rename(path):\n    if os.path.exists(path):\n        new_name = path + '_archived_' + get_timestamp()\n        print('Path already exists. Rename it to [{:s}]'.format(new_name))\n        os.rename(path, new_name)\n    os.makedirs(path)\n\n\n'''\n# --------------------------------------------\n# read image from path\n# opencv is fast, but read BGR numpy image\n# --------------------------------------------\n'''\n\n\n# --------------------------------------------\n# get uint8 image of size HxWxn_channles (RGB)\n# --------------------------------------------\ndef imread_uint(path, n_channels=3):\n    #  input: path\n    # output: HxWx3(RGB or GGG), or HxWx1 (G)\n    if n_channels == 1:\n        img = cv2.imread(path, 0)  # cv2.IMREAD_GRAYSCALE\n        img = np.expand_dims(img, axis=2)  # HxWx1\n    elif n_channels == 3:\n        img = cv2.imread(path, cv2.IMREAD_UNCHANGED)  # BGR or G\n        if img.ndim == 2:\n            img = cv2.cvtColor(img, cv2.COLOR_GRAY2RGB)  # GGG\n        else:\n            img = cv2.cvtColor(img, cv2.COLOR_BGR2RGB)  # RGB\n    return img\n\n\n# --------------------------------------------\n# matlab's imwrite\n# --------------------------------------------\ndef imsave(img, img_path):\n    img = np.squeeze(img)\n    if img.ndim == 3:\n        img = img[:, :, [2, 1, 0]]\n    cv2.imwrite(img_path, img)\n\ndef imwrite(img, img_path):\n    img = np.squeeze(img)\n    if img.ndim == 3:\n        img = img[:, :, [2, 1, 0]]\n    cv2.imwrite(img_path, img)\n\n\n\n# --------------------------------------------\n# get single image of size HxWxn_channles (BGR)\n# --------------------------------------------\ndef read_img(path):\n    # read image by cv2\n    # return: Numpy float32, HWC, BGR, [0,1]\n    img = cv2.imread(path, cv2.IMREAD_UNCHANGED)  # cv2.IMREAD_GRAYSCALE\n    img = img.astype(np.float32) / 255.\n    if img.ndim == 2:\n        img = np.expand_dims(img, axis=2)\n    # some images have 4 channels\n    if img.shape[2] > 3:\n        img = img[:, :, :3]\n    return img\n\n\n'''\n# --------------------------------------------\n# image format conversion\n# --------------------------------------------\n# numpy(single) <--->  numpy(unit)\n# numpy(single) <--->  tensor\n# numpy(unit)   <--->  tensor\n# --------------------------------------------\n'''\n\n\n# --------------------------------------------\n# numpy(single) [0, 1] <--->  numpy(unit)\n# --------------------------------------------\n\n\ndef uint2single(img):\n\n    return np.float32(img/255.)\n\n\ndef single2uint(img):\n\n    return np.uint8((img.clip(0, 1)*255.).round())\n\n\ndef uint162single(img):\n\n    return np.float32(img/65535.)\n\n\ndef single2uint16(img):\n\n    return np.uint16((img.clip(0, 1)*65535.).round())\n\n\n# --------------------------------------------\n# numpy(unit) (HxWxC or HxW) <--->  tensor\n# --------------------------------------------\n\n\n# convert uint to 4-dimensional torch tensor\ndef uint2tensor4(img):\n    if img.ndim == 2:\n        img = np.expand_dims(img, axis=2)\n    return torch.from_numpy(np.ascontiguousarray(img)).permute(2, 0, 1).float().div(255.).unsqueeze(0)\n\n\n# convert uint to 3-dimensional torch tensor\ndef uint2tensor3(img):\n    if img.ndim == 2:\n        img = np.expand_dims(img, axis=2)\n    return torch.from_numpy(np.ascontiguousarray(img)).permute(2, 0, 1).float().div(255.)\n\n\n# convert 2/3/4-dimensional torch tensor to uint\ndef tensor2uint(img):\n    img = img.data.squeeze().float().clamp_(0, 1).cpu().numpy()\n    if img.ndim == 3:\n        img = np.transpose(img, (1, 2, 0))\n    return np.uint8((img*255.0).round())\n\n\n# --------------------------------------------\n# numpy(single) (HxWxC) <--->  tensor\n# --------------------------------------------\n\n\n# convert single (HxWxC) to 3-dimensional torch tensor\ndef single2tensor3(img):\n    return torch.from_numpy(np.ascontiguousarray(img)).permute(2, 0, 1).float()\n\n\n# convert single (HxWxC) to 4-dimensional torch tensor\ndef single2tensor4(img):\n    return torch.from_numpy(np.ascontiguousarray(img)).permute(2, 0, 1).float().unsqueeze(0)\n\n\n# convert torch tensor to single\ndef tensor2single(img):\n    img = img.data.squeeze().float().cpu().numpy()\n    if img.ndim == 3:\n        img = np.transpose(img, (1, 2, 0))\n\n    return img\n\n# convert torch tensor to single\ndef tensor2single3(img):\n    img = img.data.squeeze().float().cpu().numpy()\n    if img.ndim == 3:\n        img = np.transpose(img, (1, 2, 0))\n    elif img.ndim == 2:\n        img = np.expand_dims(img, axis=2)\n    return img\n\n\ndef single2tensor5(img):\n    return torch.from_numpy(np.ascontiguousarray(img)).permute(2, 0, 1, 3).float().unsqueeze(0)\n\n\ndef single32tensor5(img):\n    return torch.from_numpy(np.ascontiguousarray(img)).float().unsqueeze(0).unsqueeze(0)\n\n\ndef single42tensor4(img):\n    return torch.from_numpy(np.ascontiguousarray(img)).permute(2, 0, 1, 3).float()\n\n\n# from skimage.io import imread, imsave\ndef tensor2img(tensor, out_type=np.uint8, min_max=(0, 1)):\n    '''\n    Converts a torch Tensor into an image Numpy array of BGR channel order\n    Input: 4D(B,(3/1),H,W), 3D(C,H,W), or 2D(H,W), any range, RGB channel order\n    Output: 3D(H,W,C) or 2D(H,W), [0,255], np.uint8 (default)\n    '''\n    tensor = tensor.squeeze().float().cpu().clamp_(*min_max)  # squeeze first, then clamp\n    tensor = (tensor - min_max[0]) / (min_max[1] - min_max[0])  # to range [0,1]\n    n_dim = tensor.dim()\n    if n_dim == 4:\n        n_img = len(tensor)\n        img_np = make_grid(tensor, nrow=int(math.sqrt(n_img)), normalize=False).numpy()\n        img_np = np.transpose(img_np[[2, 1, 0], :, :], (1, 2, 0))  # HWC, BGR\n    elif n_dim == 3:\n        img_np = tensor.numpy()\n        img_np = np.transpose(img_np[[2, 1, 0], :, :], (1, 2, 0))  # HWC, BGR\n    elif n_dim == 2:\n        img_np = tensor.numpy()\n    else:\n        raise TypeError(\n            'Only support 4D, 3D and 2D tensor. But received with dimension: {:d}'.format(n_dim))\n    if out_type == np.uint8:\n        img_np = (img_np * 255.0).round()\n        # Important. Unlike matlab, numpy.unit8() WILL NOT round by default.\n    return img_np.astype(out_type)\n\n\n'''\n# --------------------------------------------\n# Augmentation, flipe and/or rotate\n# --------------------------------------------\n# The following two are enough.\n# (1) augmet_img: numpy image of WxHxC or WxH\n# (2) augment_img_tensor4: tensor image 1xCxWxH\n# --------------------------------------------\n'''\n\n\ndef augment_img(img, mode=0):\n    '''Kai Zhang (github: https://github.com/cszn)\n    '''\n    if mode == 0:\n        return img\n    elif mode == 1:\n        return np.flipud(np.rot90(img))\n    elif mode == 2:\n        return np.flipud(img)\n    elif mode == 3:\n        return np.rot90(img, k=3)\n    elif mode == 4:\n        return np.flipud(np.rot90(img, k=2))\n    elif mode == 5:\n        return np.rot90(img)\n    elif mode == 6:\n        return np.rot90(img, k=2)\n    elif mode == 7:\n        return np.flipud(np.rot90(img, k=3))\n\n\ndef augment_img_tensor4(img, mode=0):\n    '''Kai Zhang (github: https://github.com/cszn)\n    '''\n    if mode == 0:\n        return img\n    elif mode == 1:\n        return img.rot90(1, [2, 3]).flip([2])\n    elif mode == 2:\n        return img.flip([2])\n    elif mode == 3:\n        return img.rot90(3, [2, 3])\n    elif mode == 4:\n        return img.rot90(2, [2, 3]).flip([2])\n    elif mode == 5:\n        return img.rot90(1, [2, 3])\n    elif mode == 6:\n        return img.rot90(2, [2, 3])\n    elif mode == 7:\n        return img.rot90(3, [2, 3]).flip([2])\n\n\ndef augment_img_tensor(img, mode=0):\n    '''Kai Zhang (github: https://github.com/cszn)\n    '''\n    img_size = img.size()\n    img_np = img.data.cpu().numpy()\n    if len(img_size) == 3:\n        img_np = np.transpose(img_np, (1, 2, 0))\n    elif len(img_size) == 4:\n        img_np = np.transpose(img_np, (2, 3, 1, 0))\n    img_np = augment_img(img_np, mode=mode)\n    img_tensor = torch.from_numpy(np.ascontiguousarray(img_np))\n    if len(img_size) == 3:\n        img_tensor = img_tensor.permute(2, 0, 1)\n    elif len(img_size) == 4:\n        img_tensor = img_tensor.permute(3, 2, 0, 1)\n\n    return img_tensor.type_as(img)\n\n\ndef augment_img_np3(img, mode=0):\n    if mode == 0:\n        return img\n    elif mode == 1:\n        return img.transpose(1, 0, 2)\n    elif mode == 2:\n        return img[::-1, :, :]\n    elif mode == 3:\n        img = img[::-1, :, :]\n        img = img.transpose(1, 0, 2)\n        return img\n    elif mode == 4:\n        return img[:, ::-1, :]\n    elif mode == 5:\n        img = img[:, ::-1, :]\n        img = img.transpose(1, 0, 2)\n        return img\n    elif mode == 6:\n        img = img[:, ::-1, :]\n        img = img[::-1, :, :]\n        return img\n    elif mode == 7:\n        img = img[:, ::-1, :]\n        img = img[::-1, :, :]\n        img = img.transpose(1, 0, 2)\n        return img\n\n\ndef augment_imgs(img_list, hflip=True, rot=True):\n    # horizontal flip OR rotate\n    hflip = hflip and random.random() < 0.5\n    vflip = rot and random.random() < 0.5\n    rot90 = rot and random.random() < 0.5\n\n    def _augment(img):\n        if hflip:\n            img = img[:, ::-1, :]\n        if vflip:\n            img = img[::-1, :, :]\n        if rot90:\n            img = img.transpose(1, 0, 2)\n        return img\n\n    return [_augment(img) for img in img_list]\n\n\n'''\n# --------------------------------------------\n# modcrop and shave\n# --------------------------------------------\n'''\n\n\ndef modcrop(img_in, scale):\n    # img_in: Numpy, HWC or HW\n    img = np.copy(img_in)\n    if img.ndim == 2:\n        H, W = img.shape\n        H_r, W_r = H % scale, W % scale\n        img = img[:H - H_r, :W - W_r]\n    elif img.ndim == 3:\n        H, W, C = img.shape\n        H_r, W_r = H % scale, W % scale\n        img = img[:H - H_r, :W - W_r, :]\n    else:\n        raise ValueError('Wrong img ndim: [{:d}].'.format(img.ndim))\n    return img\n\n\ndef shave(img_in, border=0):\n    # img_in: Numpy, HWC or HW\n    img = np.copy(img_in)\n    h, w = img.shape[:2]\n    img = img[border:h-border, border:w-border]\n    return img\n\n\n'''\n# --------------------------------------------\n# image processing process on numpy image\n# channel_convert(in_c, tar_type, img_list):\n# rgb2ycbcr(img, only_y=True):\n# bgr2ycbcr(img, only_y=True):\n# ycbcr2rgb(img):\n# --------------------------------------------\n'''\n\n\ndef rgb2ycbcr(img, only_y=True):\n    '''same as matlab rgb2ycbcr\n    only_y: only return Y channel\n    Input:\n        uint8, [0, 255]\n        float, [0, 1]\n    '''\n    in_img_type = img.dtype\n    img.astype(np.float32)\n    if in_img_type != np.uint8:\n        img *= 255.\n    # convert\n    if only_y:\n        rlt = np.dot(img, [65.481, 128.553, 24.966]) / 255.0 + 16.0\n    else:\n        rlt = np.matmul(img, [[65.481, -37.797, 112.0], [128.553, -74.203, -93.786],\n                              [24.966, 112.0, -18.214]]) / 255.0 + [16, 128, 128]\n    if in_img_type == np.uint8:\n        rlt = rlt.round()\n    else:\n        rlt /= 255.\n    return rlt.astype(in_img_type)\n\n\ndef ycbcr2rgb(img):\n    '''same as matlab ycbcr2rgb\n    Input:\n        uint8, [0, 255]\n        float, [0, 1]\n    '''\n    in_img_type = img.dtype\n    img.astype(np.float32)\n    if in_img_type != np.uint8:\n        img *= 255.\n    # convert\n    rlt = np.matmul(img, [[0.00456621, 0.00456621, 0.00456621], [0, -0.00153632, 0.00791071],\n                          [0.00625893, -0.00318811, 0]]) * 255.0 + [-222.921, 135.576, -276.836]\n    if in_img_type == np.uint8:\n        rlt = rlt.round()\n    else:\n        rlt /= 255.\n    return rlt.astype(in_img_type)\n\n\ndef bgr2ycbcr(img, only_y=True):\n    '''bgr version of rgb2ycbcr\n    only_y: only return Y channel\n    Input:\n        uint8, [0, 255]\n        float, [0, 1]\n    '''\n    in_img_type = img.dtype\n    img.astype(np.float32)\n    if in_img_type != np.uint8:\n        img *= 255.\n    # convert\n    if only_y:\n        rlt = np.dot(img, [24.966, 128.553, 65.481]) / 255.0 + 16.0\n    else:\n        rlt = np.matmul(img, [[24.966, 112.0, -18.214], [128.553, -74.203, -93.786],\n                              [65.481, -37.797, 112.0]]) / 255.0 + [16, 128, 128]\n    if in_img_type == np.uint8:\n        rlt = rlt.round()\n    else:\n        rlt /= 255.\n    return rlt.astype(in_img_type)\n\n\ndef channel_convert(in_c, tar_type, img_list):\n    # conversion among BGR, gray and y\n    if in_c == 3 and tar_type == 'gray':  # BGR to gray\n        gray_list = [cv2.cvtColor(img, cv2.COLOR_BGR2GRAY) for img in img_list]\n        return [np.expand_dims(img, axis=2) for img in gray_list]\n    elif in_c == 3 and tar_type == 'y':  # BGR to y\n        y_list = [bgr2ycbcr(img, only_y=True) for img in img_list]\n        return [np.expand_dims(img, axis=2) for img in y_list]\n    elif in_c == 1 and tar_type == 'RGB':  # gray/y to BGR\n        return [cv2.cvtColor(img, cv2.COLOR_GRAY2BGR) for img in img_list]\n    else:\n        return img_list\n\n\n'''\n# --------------------------------------------\n# metric, PSNR and SSIM\n# --------------------------------------------\n'''\n\n\n# --------------------------------------------\n# PSNR\n# --------------------------------------------\ndef calculate_psnr(img1, img2, border=0):\n    # img1 and img2 have range [0, 255]\n    #img1 = img1.squeeze()\n    #img2 = img2.squeeze()\n    if not img1.shape == img2.shape:\n        raise ValueError('Input images must have the same dimensions.')\n    h, w = img1.shape[:2]\n    img1 = img1[border:h-border, border:w-border]\n    img2 = img2[border:h-border, border:w-border]\n\n    img1 = img1.astype(np.float64)\n    img2 = img2.astype(np.float64)\n    mse = np.mean((img1 - img2)**2)\n    if mse == 0:\n        return float('inf')\n    return 20 * math.log10(255.0 / math.sqrt(mse))\n\n\n# --------------------------------------------\n# SSIM\n# --------------------------------------------\ndef calculate_ssim(img1, img2, border=0):\n    '''calculate SSIM\n    the same outputs as MATLAB's\n    img1, img2: [0, 255]\n    '''\n    #img1 = img1.squeeze()\n    #img2 = img2.squeeze()\n    if not img1.shape == img2.shape:\n        raise ValueError('Input images must have the same dimensions.')\n    h, w = img1.shape[:2]\n    img1 = img1[border:h-border, border:w-border]\n    img2 = img2[border:h-border, border:w-border]\n\n    if img1.ndim == 2:\n        return ssim(img1, img2)\n    elif img1.ndim == 3:\n        if img1.shape[2] == 3:\n            ssims = []\n            for i in range(3):\n                ssims.append(ssim(img1[:,:,i], img2[:,:,i]))\n            return np.array(ssims).mean()\n        elif img1.shape[2] == 1:\n            return ssim(np.squeeze(img1), np.squeeze(img2))\n    else:\n        raise ValueError('Wrong input image dimensions.')\n\n\ndef ssim(img1, img2):\n    C1 = (0.01 * 255)**2\n    C2 = (0.03 * 255)**2\n\n    img1 = img1.astype(np.float64)\n    img2 = img2.astype(np.float64)\n    kernel = cv2.getGaussianKernel(11, 1.5)\n    window = np.outer(kernel, kernel.transpose())\n\n    mu1 = cv2.filter2D(img1, -1, window)[5:-5, 5:-5]  # valid\n    mu2 = cv2.filter2D(img2, -1, window)[5:-5, 5:-5]\n    mu1_sq = mu1**2\n    mu2_sq = mu2**2\n    mu1_mu2 = mu1 * mu2\n    sigma1_sq = cv2.filter2D(img1**2, -1, window)[5:-5, 5:-5] - mu1_sq\n    sigma2_sq = cv2.filter2D(img2**2, -1, window)[5:-5, 5:-5] - mu2_sq\n    sigma12 = cv2.filter2D(img1 * img2, -1, window)[5:-5, 5:-5] - mu1_mu2\n\n    ssim_map = ((2 * mu1_mu2 + C1) * (2 * sigma12 + C2)) / ((mu1_sq + mu2_sq + C1) *\n                                                            (sigma1_sq + sigma2_sq + C2))\n    return ssim_map.mean()\n\n\n'''\n# --------------------------------------------\n# matlab's bicubic imresize (numpy and torch) [0, 1]\n# --------------------------------------------\n'''\n\n\n# matlab 'imresize' function, now only support 'bicubic'\ndef cubic(x):\n    absx = torch.abs(x)\n    absx2 = absx**2\n    absx3 = absx**3\n    return (1.5*absx3 - 2.5*absx2 + 1) * ((absx <= 1).type_as(absx)) + \\\n        (-0.5*absx3 + 2.5*absx2 - 4*absx + 2) * (((absx > 1)*(absx <= 2)).type_as(absx))\n\n\ndef calculate_weights_indices(in_length, out_length, scale, kernel, kernel_width, antialiasing):\n    if (scale < 1) and (antialiasing):\n        # Use a modified kernel to simultaneously interpolate and antialias- larger kernel width\n        kernel_width = kernel_width / scale\n\n    # Output-space coordinates\n    x = torch.linspace(1, out_length, out_length)\n\n    # Input-space coordinates. Calculate the inverse mapping such that 0.5\n    # in output space maps to 0.5 in input space, and 0.5+scale in output\n    # space maps to 1.5 in input space.\n    u = x / scale + 0.5 * (1 - 1 / scale)\n\n    # What is the left-most pixel that can be involved in the computation?\n    left = torch.floor(u - kernel_width / 2)\n\n    # What is the maximum number of pixels that can be involved in the\n    # computation?  Note: it's OK to use an extra pixel here; if the\n    # corresponding weights are all zero, it will be eliminated at the end\n    # of this function.\n    P = math.ceil(kernel_width) + 2\n\n    # The indices of the input pixels involved in computing the k-th output\n    # pixel are in row k of the indices matrix.\n    indices = left.view(out_length, 1).expand(out_length, P) + torch.linspace(0, P - 1, P).view(\n        1, P).expand(out_length, P)\n\n    # The weights used to compute the k-th output pixel are in row k of the\n    # weights matrix.\n    distance_to_center = u.view(out_length, 1).expand(out_length, P) - indices\n    # apply cubic kernel\n    if (scale < 1) and (antialiasing):\n        weights = scale * cubic(distance_to_center * scale)\n    else:\n        weights = cubic(distance_to_center)\n    # Normalize the weights matrix so that each row sums to 1.\n    weights_sum = torch.sum(weights, 1).view(out_length, 1)\n    weights = weights / weights_sum.expand(out_length, P)\n\n    # If a column in weights is all zero, get rid of it. only consider the first and last column.\n    weights_zero_tmp = torch.sum((weights == 0), 0)\n    if not math.isclose(weights_zero_tmp[0], 0, rel_tol=1e-6):\n        indices = indices.narrow(1, 1, P - 2)\n        weights = weights.narrow(1, 1, P - 2)\n    if not math.isclose(weights_zero_tmp[-1], 0, rel_tol=1e-6):\n        indices = indices.narrow(1, 0, P - 2)\n        weights = weights.narrow(1, 0, P - 2)\n    weights = weights.contiguous()\n    indices = indices.contiguous()\n    sym_len_s = -indices.min() + 1\n    sym_len_e = indices.max() - in_length\n    indices = indices + sym_len_s - 1\n    return weights, indices, int(sym_len_s), int(sym_len_e)\n\n\n# --------------------------------------------\n# imresize for tensor image [0, 1]\n# --------------------------------------------\ndef imresize(img, scale, antialiasing=True):\n    # Now the scale should be the same for H and W\n    # input: img: pytorch tensor, CHW or HW [0,1]\n    # output: CHW or HW [0,1] w/o round\n    need_squeeze = True if img.dim() == 2 else False\n    if need_squeeze:\n        img.unsqueeze_(0)\n    in_C, in_H, in_W = img.size()\n    out_C, out_H, out_W = in_C, math.ceil(in_H * scale), math.ceil(in_W * scale)\n    kernel_width = 4\n    kernel = 'cubic'\n\n    # Return the desired dimension order for performing the resize.  The\n    # strategy is to perform the resize first along the dimension with the\n    # smallest scale factor.\n    # Now we do not support this.\n\n    # get weights and indices\n    weights_H, indices_H, sym_len_Hs, sym_len_He = calculate_weights_indices(\n        in_H, out_H, scale, kernel, kernel_width, antialiasing)\n    weights_W, indices_W, sym_len_Ws, sym_len_We = calculate_weights_indices(\n        in_W, out_W, scale, kernel, kernel_width, antialiasing)\n    # process H dimension\n    # symmetric copying\n    img_aug = torch.FloatTensor(in_C, in_H + sym_len_Hs + sym_len_He, in_W)\n    img_aug.narrow(1, sym_len_Hs, in_H).copy_(img)\n\n    sym_patch = img[:, :sym_len_Hs, :]\n    inv_idx = torch.arange(sym_patch.size(1) - 1, -1, -1).long()\n    sym_patch_inv = sym_patch.index_select(1, inv_idx)\n    img_aug.narrow(1, 0, sym_len_Hs).copy_(sym_patch_inv)\n\n    sym_patch = img[:, -sym_len_He:, :]\n    inv_idx = torch.arange(sym_patch.size(1) - 1, -1, -1).long()\n    sym_patch_inv = sym_patch.index_select(1, inv_idx)\n    img_aug.narrow(1, sym_len_Hs + in_H, sym_len_He).copy_(sym_patch_inv)\n\n    out_1 = torch.FloatTensor(in_C, out_H, in_W)\n    kernel_width = weights_H.size(1)\n    for i in range(out_H):\n        idx = int(indices_H[i][0])\n        for j in range(out_C):\n            out_1[j, i, :] = img_aug[j, idx:idx + kernel_width, :].transpose(0, 1).mv(weights_H[i])\n\n    # process W dimension\n    # symmetric copying\n    out_1_aug = torch.FloatTensor(in_C, out_H, in_W + sym_len_Ws + sym_len_We)\n    out_1_aug.narrow(2, sym_len_Ws, in_W).copy_(out_1)\n\n    sym_patch = out_1[:, :, :sym_len_Ws]\n    inv_idx = torch.arange(sym_patch.size(2) - 1, -1, -1).long()\n    sym_patch_inv = sym_patch.index_select(2, inv_idx)\n    out_1_aug.narrow(2, 0, sym_len_Ws).copy_(sym_patch_inv)\n\n    sym_patch = out_1[:, :, -sym_len_We:]\n    inv_idx = torch.arange(sym_patch.size(2) - 1, -1, -1).long()\n    sym_patch_inv = sym_patch.index_select(2, inv_idx)\n    out_1_aug.narrow(2, sym_len_Ws + in_W, sym_len_We).copy_(sym_patch_inv)\n\n    out_2 = torch.FloatTensor(in_C, out_H, out_W)\n    kernel_width = weights_W.size(1)\n    for i in range(out_W):\n        idx = int(indices_W[i][0])\n        for j in range(out_C):\n            out_2[j, :, i] = out_1_aug[j, :, idx:idx + kernel_width].mv(weights_W[i])\n    if need_squeeze:\n        out_2.squeeze_()\n    return out_2\n\n\n# --------------------------------------------\n# imresize for numpy image [0, 1]\n# --------------------------------------------\ndef imresize_np(img, scale, antialiasing=True):\n    # Now the scale should be the same for H and W\n    # input: img: Numpy, HWC or HW [0,1]\n    # output: HWC or HW [0,1] w/o round\n    img = torch.from_numpy(img)\n    need_squeeze = True if img.dim() == 2 else False\n    if need_squeeze:\n        img.unsqueeze_(2)\n\n    in_H, in_W, in_C = img.size()\n    out_C, out_H, out_W = in_C, math.ceil(in_H * scale), math.ceil(in_W * scale)\n    kernel_width = 4\n    kernel = 'cubic'\n\n    # Return the desired dimension order for performing the resize.  The\n    # strategy is to perform the resize first along the dimension with the\n    # smallest scale factor.\n    # Now we do not support this.\n\n    # get weights and indices\n    weights_H, indices_H, sym_len_Hs, sym_len_He = calculate_weights_indices(\n        in_H, out_H, scale, kernel, kernel_width, antialiasing)\n    weights_W, indices_W, sym_len_Ws, sym_len_We = calculate_weights_indices(\n        in_W, out_W, scale, kernel, kernel_width, antialiasing)\n    # process H dimension\n    # symmetric copying\n    img_aug = torch.FloatTensor(in_H + sym_len_Hs + sym_len_He, in_W, in_C)\n    img_aug.narrow(0, sym_len_Hs, in_H).copy_(img)\n\n    sym_patch = img[:sym_len_Hs, :, :]\n    inv_idx = torch.arange(sym_patch.size(0) - 1, -1, -1).long()\n    sym_patch_inv = sym_patch.index_select(0, inv_idx)\n    img_aug.narrow(0, 0, sym_len_Hs).copy_(sym_patch_inv)\n\n    sym_patch = img[-sym_len_He:, :, :]\n    inv_idx = torch.arange(sym_patch.size(0) - 1, -1, -1).long()\n    sym_patch_inv = sym_patch.index_select(0, inv_idx)\n    img_aug.narrow(0, sym_len_Hs + in_H, sym_len_He).copy_(sym_patch_inv)\n\n    out_1 = torch.FloatTensor(out_H, in_W, in_C)\n    kernel_width = weights_H.size(1)\n    for i in range(out_H):\n        idx = int(indices_H[i][0])\n        for j in range(out_C):\n            out_1[i, :, j] = img_aug[idx:idx + kernel_width, :, j].transpose(0, 1).mv(weights_H[i])\n\n    # process W dimension\n    # symmetric copying\n    out_1_aug = torch.FloatTensor(out_H, in_W + sym_len_Ws + sym_len_We, in_C)\n    out_1_aug.narrow(1, sym_len_Ws, in_W).copy_(out_1)\n\n    sym_patch = out_1[:, :sym_len_Ws, :]\n    inv_idx = torch.arange(sym_patch.size(1) - 1, -1, -1).long()\n    sym_patch_inv = sym_patch.index_select(1, inv_idx)\n    out_1_aug.narrow(1, 0, sym_len_Ws).copy_(sym_patch_inv)\n\n    sym_patch = out_1[:, -sym_len_We:, :]\n    inv_idx = torch.arange(sym_patch.size(1) - 1, -1, -1).long()\n    sym_patch_inv = sym_patch.index_select(1, inv_idx)\n    out_1_aug.narrow(1, sym_len_Ws + in_W, sym_len_We).copy_(sym_patch_inv)\n\n    out_2 = torch.FloatTensor(out_H, out_W, in_C)\n    kernel_width = weights_W.size(1)\n    for i in range(out_W):\n        idx = int(indices_W[i][0])\n        for j in range(out_C):\n            out_2[:, i, j] = out_1_aug[:, idx:idx + kernel_width, j].mv(weights_W[i])\n    if need_squeeze:\n        out_2.squeeze_()\n\n    return out_2.numpy()\n\n\nif __name__ == '__main__':\n    print('---')\n#    img = imread_uint('test.bmp', 3)\n#    img = uint2single(img)\n#    img_bicubic = imresize_np(img, 1/4)"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/losses/__init__.py",
    "content": "from ldm.modules.losses.contperceptual import LPIPSWithDiscriminator"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/losses/contperceptual.py",
    "content": "import torch\nimport torch.nn as nn\n\nfrom taming.modules.losses.vqperceptual import *  # TODO: taming dependency yes/no?\n\n\nclass LPIPSWithDiscriminator(nn.Module):\n    def __init__(self, disc_start, logvar_init=0.0, kl_weight=1.0, pixelloss_weight=1.0,\n                 disc_num_layers=3, disc_in_channels=3, disc_factor=1.0, disc_weight=1.0,\n                 perceptual_weight=1.0, use_actnorm=False, disc_conditional=False,\n                 disc_loss=\"hinge\"):\n\n        super().__init__()\n        assert disc_loss in [\"hinge\", \"vanilla\"]\n        self.kl_weight = kl_weight\n        self.pixel_weight = pixelloss_weight\n        self.perceptual_loss = LPIPS().eval()\n        self.perceptual_weight = perceptual_weight\n        # output log variance\n        self.logvar = nn.Parameter(torch.ones(size=()) * logvar_init)\n\n        self.discriminator = NLayerDiscriminator(input_nc=disc_in_channels,\n                                                 n_layers=disc_num_layers,\n                                                 use_actnorm=use_actnorm\n                                                 ).apply(weights_init)\n        self.discriminator_iter_start = disc_start\n        self.disc_loss = hinge_d_loss if disc_loss == \"hinge\" else vanilla_d_loss\n        self.disc_factor = disc_factor\n        self.discriminator_weight = disc_weight\n        self.disc_conditional = disc_conditional\n\n    def calculate_adaptive_weight(self, nll_loss, g_loss, last_layer=None):\n        if last_layer is not None:\n            nll_grads = torch.autograd.grad(nll_loss, last_layer, retain_graph=True)[0]\n            g_grads = torch.autograd.grad(g_loss, last_layer, retain_graph=True)[0]\n        else:\n            nll_grads = torch.autograd.grad(nll_loss, self.last_layer[0], retain_graph=True)[0]\n            g_grads = torch.autograd.grad(g_loss, self.last_layer[0], retain_graph=True)[0]\n\n        d_weight = torch.norm(nll_grads) / (torch.norm(g_grads) + 1e-4)\n        d_weight = torch.clamp(d_weight, 0.0, 1e4).detach()\n        d_weight = d_weight * self.discriminator_weight\n        return d_weight\n\n    def forward(self, inputs, reconstructions, posteriors, optimizer_idx,\n                global_step, last_layer=None, cond=None, split=\"train\",\n                weights=None):\n        rec_loss = torch.abs(inputs.contiguous() - reconstructions.contiguous())\n        if self.perceptual_weight > 0:\n            p_loss = self.perceptual_loss(inputs.contiguous(), reconstructions.contiguous())\n            rec_loss = rec_loss + self.perceptual_weight * p_loss\n\n        nll_loss = rec_loss / torch.exp(self.logvar) + self.logvar\n        weighted_nll_loss = nll_loss\n        if weights is not None:\n            weighted_nll_loss = weights*nll_loss\n        weighted_nll_loss = torch.sum(weighted_nll_loss) / weighted_nll_loss.shape[0]\n        nll_loss = torch.sum(nll_loss) / nll_loss.shape[0]\n        kl_loss = posteriors.kl()\n        kl_loss = torch.sum(kl_loss) / kl_loss.shape[0]\n\n        # now the GAN part\n        if optimizer_idx == 0:\n            # generator update\n            if cond is None:\n                assert not self.disc_conditional\n                logits_fake = self.discriminator(reconstructions.contiguous())\n            else:\n                assert self.disc_conditional\n                logits_fake = self.discriminator(torch.cat((reconstructions.contiguous(), cond), dim=1))\n            g_loss = -torch.mean(logits_fake)\n\n            if self.disc_factor > 0.0:\n                try:\n                    d_weight = self.calculate_adaptive_weight(nll_loss, g_loss, last_layer=last_layer)\n                except RuntimeError:\n                    assert not self.training\n                    d_weight = torch.tensor(0.0)\n            else:\n                d_weight = torch.tensor(0.0)\n\n            disc_factor = adopt_weight(self.disc_factor, global_step, threshold=self.discriminator_iter_start)\n            loss = weighted_nll_loss + self.kl_weight * kl_loss + d_weight * disc_factor * g_loss\n\n            log = {\"{}/total_loss\".format(split): loss.clone().detach().mean(), \"{}/logvar\".format(split): self.logvar.detach(),\n                   \"{}/kl_loss\".format(split): kl_loss.detach().mean(), \"{}/nll_loss\".format(split): nll_loss.detach().mean(),\n                   \"{}/rec_loss\".format(split): rec_loss.detach().mean(),\n                   \"{}/d_weight\".format(split): d_weight.detach(),\n                   \"{}/disc_factor\".format(split): torch.tensor(disc_factor),\n                   \"{}/g_loss\".format(split): g_loss.detach().mean(),\n                   }\n            return loss, log\n\n        if optimizer_idx == 1:\n            # second pass for discriminator update\n            if cond is None:\n                logits_real = self.discriminator(inputs.contiguous().detach())\n                logits_fake = self.discriminator(reconstructions.contiguous().detach())\n            else:\n                logits_real = self.discriminator(torch.cat((inputs.contiguous().detach(), cond), dim=1))\n                logits_fake = self.discriminator(torch.cat((reconstructions.contiguous().detach(), cond), dim=1))\n\n            disc_factor = adopt_weight(self.disc_factor, global_step, threshold=self.discriminator_iter_start)\n            d_loss = disc_factor * self.disc_loss(logits_real, logits_fake)\n\n            log = {\"{}/disc_loss\".format(split): d_loss.clone().detach().mean(),\n                   \"{}/logits_real\".format(split): logits_real.detach().mean(),\n                   \"{}/logits_fake\".format(split): logits_fake.detach().mean()\n                   }\n            return d_loss, log\n\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/losses/vqperceptual.py",
    "content": "import torch\nfrom torch import nn\nimport torch.nn.functional as F\nfrom einops import repeat\n\nfrom taming.modules.discriminator.model import NLayerDiscriminator, weights_init\nfrom taming.modules.losses.lpips import LPIPS\nfrom taming.modules.losses.vqperceptual import hinge_d_loss, vanilla_d_loss\n\n\ndef hinge_d_loss_with_exemplar_weights(logits_real, logits_fake, weights):\n    assert weights.shape[0] == logits_real.shape[0] == logits_fake.shape[0]\n    loss_real = torch.mean(F.relu(1. - logits_real), dim=[1,2,3])\n    loss_fake = torch.mean(F.relu(1. + logits_fake), dim=[1,2,3])\n    loss_real = (weights * loss_real).sum() / weights.sum()\n    loss_fake = (weights * loss_fake).sum() / weights.sum()\n    d_loss = 0.5 * (loss_real + loss_fake)\n    return d_loss\n\ndef adopt_weight(weight, global_step, threshold=0, value=0.):\n    if global_step < threshold:\n        weight = value\n    return weight\n\n\ndef measure_perplexity(predicted_indices, n_embed):\n    # src: https://github.com/karpathy/deep-vector-quantization/blob/main/model.py\n    # eval cluster perplexity. when perplexity == num_embeddings then all clusters are used exactly equally\n    encodings = F.one_hot(predicted_indices, n_embed).float().reshape(-1, n_embed)\n    avg_probs = encodings.mean(0)\n    perplexity = (-(avg_probs * torch.log(avg_probs + 1e-10)).sum()).exp()\n    cluster_use = torch.sum(avg_probs > 0)\n    return perplexity, cluster_use\n\ndef l1(x, y):\n    return torch.abs(x-y)\n\n\ndef l2(x, y):\n    return torch.pow((x-y), 2)\n\n\nclass VQLPIPSWithDiscriminator(nn.Module):\n    def __init__(self, disc_start, codebook_weight=1.0, pixelloss_weight=1.0,\n                 disc_num_layers=3, disc_in_channels=3, disc_factor=1.0, disc_weight=1.0,\n                 perceptual_weight=1.0, use_actnorm=False, disc_conditional=False,\n                 disc_ndf=64, disc_loss=\"hinge\", n_classes=None, perceptual_loss=\"lpips\",\n                 pixel_loss=\"l1\"):\n        super().__init__()\n        assert disc_loss in [\"hinge\", \"vanilla\"]\n        assert perceptual_loss in [\"lpips\", \"clips\", \"dists\"]\n        assert pixel_loss in [\"l1\", \"l2\"]\n        self.codebook_weight = codebook_weight\n        self.pixel_weight = pixelloss_weight\n        if perceptual_loss == \"lpips\":\n            print(f\"{self.__class__.__name__}: Running with LPIPS.\")\n            self.perceptual_loss = LPIPS().eval()\n        else:\n            raise ValueError(f\"Unknown perceptual loss: >> {perceptual_loss} <<\")\n        self.perceptual_weight = perceptual_weight\n\n        if pixel_loss == \"l1\":\n            self.pixel_loss = l1\n        else:\n            self.pixel_loss = l2\n\n        self.discriminator = NLayerDiscriminator(input_nc=disc_in_channels,\n                                                 n_layers=disc_num_layers,\n                                                 use_actnorm=use_actnorm,\n                                                 ndf=disc_ndf\n                                                 ).apply(weights_init)\n        self.discriminator_iter_start = disc_start\n        if disc_loss == \"hinge\":\n            self.disc_loss = hinge_d_loss\n        elif disc_loss == \"vanilla\":\n            self.disc_loss = vanilla_d_loss\n        else:\n            raise ValueError(f\"Unknown GAN loss '{disc_loss}'.\")\n        print(f\"VQLPIPSWithDiscriminator running with {disc_loss} loss.\")\n        self.disc_factor = disc_factor\n        self.discriminator_weight = disc_weight\n        self.disc_conditional = disc_conditional\n        self.n_classes = n_classes\n\n    def calculate_adaptive_weight(self, nll_loss, g_loss, last_layer=None):\n        if last_layer is not None:\n            nll_grads = torch.autograd.grad(nll_loss, last_layer, retain_graph=True)[0]\n            g_grads = torch.autograd.grad(g_loss, last_layer, retain_graph=True)[0]\n        else:\n            nll_grads = torch.autograd.grad(nll_loss, self.last_layer[0], retain_graph=True)[0]\n            g_grads = torch.autograd.grad(g_loss, self.last_layer[0], retain_graph=True)[0]\n\n        d_weight = torch.norm(nll_grads) / (torch.norm(g_grads) + 1e-4)\n        d_weight = torch.clamp(d_weight, 0.0, 1e4).detach()\n        d_weight = d_weight * self.discriminator_weight\n        return d_weight\n\n    def forward(self, codebook_loss, inputs, reconstructions, optimizer_idx,\n                global_step, last_layer=None, cond=None, split=\"train\", predicted_indices=None):\n        if not exists(codebook_loss):\n            codebook_loss = torch.tensor([0.]).to(inputs.device)\n        #rec_loss = torch.abs(inputs.contiguous() - reconstructions.contiguous())\n        rec_loss = self.pixel_loss(inputs.contiguous(), reconstructions.contiguous())\n        if self.perceptual_weight > 0:\n            p_loss = self.perceptual_loss(inputs.contiguous(), reconstructions.contiguous())\n            rec_loss = rec_loss + self.perceptual_weight * p_loss\n        else:\n            p_loss = torch.tensor([0.0])\n\n        nll_loss = rec_loss\n        #nll_loss = torch.sum(nll_loss) / nll_loss.shape[0]\n        nll_loss = torch.mean(nll_loss)\n\n        # now the GAN part\n        if optimizer_idx == 0:\n            # generator update\n            if cond is None:\n                assert not self.disc_conditional\n                logits_fake = self.discriminator(reconstructions.contiguous())\n            else:\n                assert self.disc_conditional\n                logits_fake = self.discriminator(torch.cat((reconstructions.contiguous(), cond), dim=1))\n            g_loss = -torch.mean(logits_fake)\n\n            try:\n                d_weight = self.calculate_adaptive_weight(nll_loss, g_loss, last_layer=last_layer)\n            except RuntimeError:\n                assert not self.training\n                d_weight = torch.tensor(0.0)\n\n            disc_factor = adopt_weight(self.disc_factor, global_step, threshold=self.discriminator_iter_start)\n            loss = nll_loss + d_weight * disc_factor * g_loss + self.codebook_weight * codebook_loss.mean()\n\n            log = {\"{}/total_loss\".format(split): loss.clone().detach().mean(),\n                   \"{}/quant_loss\".format(split): codebook_loss.detach().mean(),\n                   \"{}/nll_loss\".format(split): nll_loss.detach().mean(),\n                   \"{}/rec_loss\".format(split): rec_loss.detach().mean(),\n                   \"{}/p_loss\".format(split): p_loss.detach().mean(),\n                   \"{}/d_weight\".format(split): d_weight.detach(),\n                   \"{}/disc_factor\".format(split): torch.tensor(disc_factor),\n                   \"{}/g_loss\".format(split): g_loss.detach().mean(),\n                   }\n            if predicted_indices is not None:\n                assert self.n_classes is not None\n                with torch.no_grad():\n                    perplexity, cluster_usage = measure_perplexity(predicted_indices, self.n_classes)\n                log[f\"{split}/perplexity\"] = perplexity\n                log[f\"{split}/cluster_usage\"] = cluster_usage\n            return loss, log\n\n        if optimizer_idx == 1:\n            # second pass for discriminator update\n            if cond is None:\n                logits_real = self.discriminator(inputs.contiguous().detach())\n                logits_fake = self.discriminator(reconstructions.contiguous().detach())\n            else:\n                logits_real = self.discriminator(torch.cat((inputs.contiguous().detach(), cond), dim=1))\n                logits_fake = self.discriminator(torch.cat((reconstructions.contiguous().detach(), cond), dim=1))\n\n            disc_factor = adopt_weight(self.disc_factor, global_step, threshold=self.discriminator_iter_start)\n            d_loss = disc_factor * self.disc_loss(logits_real, logits_fake)\n\n            log = {\"{}/disc_loss\".format(split): d_loss.clone().detach().mean(),\n                   \"{}/logits_real\".format(split): logits_real.detach().mean(),\n                   \"{}/logits_fake\".format(split): logits_fake.detach().mean()\n                   }\n            return d_loss, log\n"
  },
  {
    "path": "stable-dreamfusion/ldm/modules/x_transformer.py",
    "content": "\"\"\"shout-out to https://github.com/lucidrains/x-transformers/tree/main/x_transformers\"\"\"\nimport torch\nfrom torch import nn, einsum\nimport torch.nn.functional as F\nfrom functools import partial\nfrom inspect import isfunction\nfrom collections import namedtuple\nfrom einops import rearrange, repeat, reduce\n\n# constants\n\nDEFAULT_DIM_HEAD = 64\n\nIntermediates = namedtuple('Intermediates', [\n    'pre_softmax_attn',\n    'post_softmax_attn'\n])\n\nLayerIntermediates = namedtuple('Intermediates', [\n    'hiddens',\n    'attn_intermediates'\n])\n\n\nclass AbsolutePositionalEmbedding(nn.Module):\n    def __init__(self, dim, max_seq_len):\n        super().__init__()\n        self.emb = nn.Embedding(max_seq_len, dim)\n        self.init_()\n\n    def init_(self):\n        nn.init.normal_(self.emb.weight, std=0.02)\n\n    def forward(self, x):\n        n = torch.arange(x.shape[1], device=x.device)\n        return self.emb(n)[None, :, :]\n\n\nclass FixedPositionalEmbedding(nn.Module):\n    def __init__(self, dim):\n        super().__init__()\n        inv_freq = 1. / (10000 ** (torch.arange(0, dim, 2).float() / dim))\n        self.register_buffer('inv_freq', inv_freq)\n\n    def forward(self, x, seq_dim=1, offset=0):\n        t = torch.arange(x.shape[seq_dim], device=x.device).type_as(self.inv_freq) + offset\n        sinusoid_inp = torch.einsum('i , j -> i j', t, self.inv_freq)\n        emb = torch.cat((sinusoid_inp.sin(), sinusoid_inp.cos()), dim=-1)\n        return emb[None, :, :]\n\n\n# helpers\n\ndef exists(val):\n    return val is not None\n\n\ndef default(val, d):\n    if exists(val):\n        return val\n    return d() if isfunction(d) else d\n\n\ndef always(val):\n    def inner(*args, **kwargs):\n        return val\n    return inner\n\n\ndef not_equals(val):\n    def inner(x):\n        return x != val\n    return inner\n\n\ndef equals(val):\n    def inner(x):\n        return x == val\n    return inner\n\n\ndef max_neg_value(tensor):\n    return -torch.finfo(tensor.dtype).max\n\n\n# keyword argument helpers\n\ndef pick_and_pop(keys, d):\n    values = list(map(lambda key: d.pop(key), keys))\n    return dict(zip(keys, values))\n\n\ndef group_dict_by_key(cond, d):\n    return_val = [dict(), dict()]\n    for key in d.keys():\n        match = bool(cond(key))\n        ind = int(not match)\n        return_val[ind][key] = d[key]\n    return (*return_val,)\n\n\ndef string_begins_with(prefix, str):\n    return str.startswith(prefix)\n\n\ndef group_by_key_prefix(prefix, d):\n    return group_dict_by_key(partial(string_begins_with, prefix), d)\n\n\ndef groupby_prefix_and_trim(prefix, d):\n    kwargs_with_prefix, kwargs = group_dict_by_key(partial(string_begins_with, prefix), d)\n    kwargs_without_prefix = dict(map(lambda x: (x[0][len(prefix):], x[1]), tuple(kwargs_with_prefix.items())))\n    return kwargs_without_prefix, kwargs\n\n\n# classes\nclass Scale(nn.Module):\n    def __init__(self, value, fn):\n        super().__init__()\n        self.value = value\n        self.fn = fn\n\n    def forward(self, x, **kwargs):\n        x, *rest = self.fn(x, **kwargs)\n        return (x * self.value, *rest)\n\n\nclass Rezero(nn.Module):\n    def __init__(self, fn):\n        super().__init__()\n        self.fn = fn\n        self.g = nn.Parameter(torch.zeros(1))\n\n    def forward(self, x, **kwargs):\n        x, *rest = self.fn(x, **kwargs)\n        return (x * self.g, *rest)\n\n\nclass ScaleNorm(nn.Module):\n    def __init__(self, dim, eps=1e-5):\n        super().__init__()\n        self.scale = dim ** -0.5\n        self.eps = eps\n        self.g = nn.Parameter(torch.ones(1))\n\n    def forward(self, x):\n        norm = torch.norm(x, dim=-1, keepdim=True) * self.scale\n        return x / norm.clamp(min=self.eps) * self.g\n\n\nclass RMSNorm(nn.Module):\n    def __init__(self, dim, eps=1e-8):\n        super().__init__()\n        self.scale = dim ** -0.5\n        self.eps = eps\n        self.g = nn.Parameter(torch.ones(dim))\n\n    def forward(self, x):\n        norm = torch.norm(x, dim=-1, keepdim=True) * self.scale\n        return x / norm.clamp(min=self.eps) * self.g\n\n\nclass Residual(nn.Module):\n    def forward(self, x, residual):\n        return x + residual\n\n\nclass GRUGating(nn.Module):\n    def __init__(self, dim):\n        super().__init__()\n        self.gru = nn.GRUCell(dim, dim)\n\n    def forward(self, x, residual):\n        gated_output = self.gru(\n            rearrange(x, 'b n d -> (b n) d'),\n            rearrange(residual, 'b n d -> (b n) d')\n        )\n\n        return gated_output.reshape_as(x)\n\n\n# feedforward\n\nclass GEGLU(nn.Module):\n    def __init__(self, dim_in, dim_out):\n        super().__init__()\n        self.proj = nn.Linear(dim_in, dim_out * 2)\n\n    def forward(self, x):\n        x, gate = self.proj(x).chunk(2, dim=-1)\n        return x * F.gelu(gate)\n\n\nclass FeedForward(nn.Module):\n    def __init__(self, dim, dim_out=None, mult=4, glu=False, dropout=0.):\n        super().__init__()\n        inner_dim = int(dim * mult)\n        dim_out = default(dim_out, dim)\n        project_in = nn.Sequential(\n            nn.Linear(dim, inner_dim),\n            nn.GELU()\n        ) if not glu else GEGLU(dim, inner_dim)\n\n        self.net = nn.Sequential(\n            project_in,\n            nn.Dropout(dropout),\n            nn.Linear(inner_dim, dim_out)\n        )\n\n    def forward(self, x):\n        return self.net(x)\n\n\n# attention.\nclass Attention(nn.Module):\n    def __init__(\n            self,\n            dim,\n            dim_head=DEFAULT_DIM_HEAD,\n            heads=8,\n            causal=False,\n            mask=None,\n            talking_heads=False,\n            sparse_topk=None,\n            use_entmax15=False,\n            num_mem_kv=0,\n            dropout=0.,\n            on_attn=False\n    ):\n        super().__init__()\n        if use_entmax15:\n            raise NotImplementedError(\"Check out entmax activation instead of softmax activation!\")\n        self.scale = dim_head ** -0.5\n        self.heads = heads\n        self.causal = causal\n        self.mask = mask\n\n        inner_dim = dim_head * heads\n\n        self.to_q = nn.Linear(dim, inner_dim, bias=False)\n        self.to_k = nn.Linear(dim, inner_dim, bias=False)\n        self.to_v = nn.Linear(dim, inner_dim, bias=False)\n        self.dropout = nn.Dropout(dropout)\n\n        # talking heads\n        self.talking_heads = talking_heads\n        if talking_heads:\n            self.pre_softmax_proj = nn.Parameter(torch.randn(heads, heads))\n            self.post_softmax_proj = nn.Parameter(torch.randn(heads, heads))\n\n        # explicit topk sparse attention\n        self.sparse_topk = sparse_topk\n\n        # entmax\n        #self.attn_fn = entmax15 if use_entmax15 else F.softmax\n        self.attn_fn = F.softmax\n\n        # add memory key / values\n        self.num_mem_kv = num_mem_kv\n        if num_mem_kv > 0:\n            self.mem_k = nn.Parameter(torch.randn(heads, num_mem_kv, dim_head))\n            self.mem_v = nn.Parameter(torch.randn(heads, num_mem_kv, dim_head))\n\n        # attention on attention\n        self.attn_on_attn = on_attn\n        self.to_out = nn.Sequential(nn.Linear(inner_dim, dim * 2), nn.GLU()) if on_attn else nn.Linear(inner_dim, dim)\n\n    def forward(\n            self,\n            x,\n            context=None,\n            mask=None,\n            context_mask=None,\n            rel_pos=None,\n            sinusoidal_emb=None,\n            prev_attn=None,\n            mem=None\n    ):\n        b, n, _, h, talking_heads, device = *x.shape, self.heads, self.talking_heads, x.device\n        kv_input = default(context, x)\n\n        q_input = x\n        k_input = kv_input\n        v_input = kv_input\n\n        if exists(mem):\n            k_input = torch.cat((mem, k_input), dim=-2)\n            v_input = torch.cat((mem, v_input), dim=-2)\n\n        if exists(sinusoidal_emb):\n            # in shortformer, the query would start at a position offset depending on the past cached memory\n            offset = k_input.shape[-2] - q_input.shape[-2]\n            q_input = q_input + sinusoidal_emb(q_input, offset=offset)\n            k_input = k_input + sinusoidal_emb(k_input)\n\n        q = self.to_q(q_input)\n        k = self.to_k(k_input)\n        v = self.to_v(v_input)\n\n        q, k, v = map(lambda t: rearrange(t, 'b n (h d) -> b h n d', h=h), (q, k, v))\n\n        input_mask = None\n        if any(map(exists, (mask, context_mask))):\n            q_mask = default(mask, lambda: torch.ones((b, n), device=device).bool())\n            k_mask = q_mask if not exists(context) else context_mask\n            k_mask = default(k_mask, lambda: torch.ones((b, k.shape[-2]), device=device).bool())\n            q_mask = rearrange(q_mask, 'b i -> b () i ()')\n            k_mask = rearrange(k_mask, 'b j -> b () () j')\n            input_mask = q_mask * k_mask\n\n        if self.num_mem_kv > 0:\n            mem_k, mem_v = map(lambda t: repeat(t, 'h n d -> b h n d', b=b), (self.mem_k, self.mem_v))\n            k = torch.cat((mem_k, k), dim=-2)\n            v = torch.cat((mem_v, v), dim=-2)\n            if exists(input_mask):\n                input_mask = F.pad(input_mask, (self.num_mem_kv, 0), value=True)\n\n        dots = einsum('b h i d, b h j d -> b h i j', q, k) * self.scale\n        mask_value = max_neg_value(dots)\n\n        if exists(prev_attn):\n            dots = dots + prev_attn\n\n        pre_softmax_attn = dots\n\n        if talking_heads:\n            dots = einsum('b h i j, h k -> b k i j', dots, self.pre_softmax_proj).contiguous()\n\n        if exists(rel_pos):\n            dots = rel_pos(dots)\n\n        if exists(input_mask):\n            dots.masked_fill_(~input_mask, mask_value)\n            del input_mask\n\n        if self.causal:\n            i, j = dots.shape[-2:]\n            r = torch.arange(i, device=device)\n            mask = rearrange(r, 'i -> () () i ()') < rearrange(r, 'j -> () () () j')\n            mask = F.pad(mask, (j - i, 0), value=False)\n            dots.masked_fill_(mask, mask_value)\n            del mask\n\n        if exists(self.sparse_topk) and self.sparse_topk < dots.shape[-1]:\n            top, _ = dots.topk(self.sparse_topk, dim=-1)\n            vk = top[..., -1].unsqueeze(-1).expand_as(dots)\n            mask = dots < vk\n            dots.masked_fill_(mask, mask_value)\n            del mask\n\n        attn = self.attn_fn(dots, dim=-1)\n        post_softmax_attn = attn\n\n        attn = self.dropout(attn)\n\n        if talking_heads:\n            attn = einsum('b h i j, h k -> b k i j', attn, self.post_softmax_proj).contiguous()\n\n        out = einsum('b h i j, b h j d -> b h i d', attn, v)\n        out = rearrange(out, 'b h n d -> b n (h d)')\n\n        intermediates = Intermediates(\n            pre_softmax_attn=pre_softmax_attn,\n            post_softmax_attn=post_softmax_attn\n        )\n\n        return self.to_out(out), intermediates\n\n\nclass AttentionLayers(nn.Module):\n    def __init__(\n            self,\n            dim,\n            depth,\n            heads=8,\n            causal=False,\n            cross_attend=False,\n            only_cross=False,\n            use_scalenorm=False,\n            use_rmsnorm=False,\n            use_rezero=False,\n            rel_pos_num_buckets=32,\n            rel_pos_max_distance=128,\n            position_infused_attn=False,\n            custom_layers=None,\n            sandwich_coef=None,\n            par_ratio=None,\n            residual_attn=False,\n            cross_residual_attn=False,\n            macaron=False,\n            pre_norm=True,\n            gate_residual=False,\n            **kwargs\n    ):\n        super().__init__()\n        ff_kwargs, kwargs = groupby_prefix_and_trim('ff_', kwargs)\n        attn_kwargs, _ = groupby_prefix_and_trim('attn_', kwargs)\n\n        dim_head = attn_kwargs.get('dim_head', DEFAULT_DIM_HEAD)\n\n        self.dim = dim\n        self.depth = depth\n        self.layers = nn.ModuleList([])\n\n        self.has_pos_emb = position_infused_attn\n        self.pia_pos_emb = FixedPositionalEmbedding(dim) if position_infused_attn else None\n        self.rotary_pos_emb = always(None)\n\n        assert rel_pos_num_buckets <= rel_pos_max_distance, 'number of relative position buckets must be less than the relative position max distance'\n        self.rel_pos = None\n\n        self.pre_norm = pre_norm\n\n        self.residual_attn = residual_attn\n        self.cross_residual_attn = cross_residual_attn\n\n        norm_class = ScaleNorm if use_scalenorm else nn.LayerNorm\n        norm_class = RMSNorm if use_rmsnorm else norm_class\n        norm_fn = partial(norm_class, dim)\n\n        norm_fn = nn.Identity if use_rezero else norm_fn\n        branch_fn = Rezero if use_rezero else None\n\n        if cross_attend and not only_cross:\n            default_block = ('a', 'c', 'f')\n        elif cross_attend and only_cross:\n            default_block = ('c', 'f')\n        else:\n            default_block = ('a', 'f')\n\n        if macaron:\n            default_block = ('f',) + default_block\n\n        if exists(custom_layers):\n            layer_types = custom_layers\n        elif exists(par_ratio):\n            par_depth = depth * len(default_block)\n            assert 1 < par_ratio <= par_depth, 'par ratio out of range'\n            default_block = tuple(filter(not_equals('f'), default_block))\n            par_attn = par_depth // par_ratio\n            depth_cut = par_depth * 2 // 3  # 2 / 3 attention layer cutoff suggested by PAR paper\n            par_width = (depth_cut + depth_cut // par_attn) // par_attn\n            assert len(default_block) <= par_width, 'default block is too large for par_ratio'\n            par_block = default_block + ('f',) * (par_width - len(default_block))\n            par_head = par_block * par_attn\n            layer_types = par_head + ('f',) * (par_depth - len(par_head))\n        elif exists(sandwich_coef):\n            assert sandwich_coef > 0 and sandwich_coef <= depth, 'sandwich coefficient should be less than the depth'\n            layer_types = ('a',) * sandwich_coef + default_block * (depth - sandwich_coef) + ('f',) * sandwich_coef\n        else:\n            layer_types = default_block * depth\n\n        self.layer_types = layer_types\n        self.num_attn_layers = len(list(filter(equals('a'), layer_types)))\n\n        for layer_type in self.layer_types:\n            if layer_type == 'a':\n                layer = Attention(dim, heads=heads, causal=causal, **attn_kwargs)\n            elif layer_type == 'c':\n                layer = Attention(dim, heads=heads, **attn_kwargs)\n            elif layer_type == 'f':\n                layer = FeedForward(dim, **ff_kwargs)\n                layer = layer if not macaron else Scale(0.5, layer)\n            else:\n                raise Exception(f'invalid layer type {layer_type}')\n\n            if isinstance(layer, Attention) and exists(branch_fn):\n                layer = branch_fn(layer)\n\n            if gate_residual:\n                residual_fn = GRUGating(dim)\n            else:\n                residual_fn = Residual()\n\n            self.layers.append(nn.ModuleList([\n                norm_fn(),\n                layer,\n                residual_fn\n            ]))\n\n    def forward(\n            self,\n            x,\n            context=None,\n            mask=None,\n            context_mask=None,\n            mems=None,\n            return_hiddens=False\n    ):\n        hiddens = []\n        intermediates = []\n        prev_attn = None\n        prev_cross_attn = None\n\n        mems = mems.copy() if exists(mems) else [None] * self.num_attn_layers\n\n        for ind, (layer_type, (norm, block, residual_fn)) in enumerate(zip(self.layer_types, self.layers)):\n            is_last = ind == (len(self.layers) - 1)\n\n            if layer_type == 'a':\n                hiddens.append(x)\n                layer_mem = mems.pop(0)\n\n            residual = x\n\n            if self.pre_norm:\n                x = norm(x)\n\n            if layer_type == 'a':\n                out, inter = block(x, mask=mask, sinusoidal_emb=self.pia_pos_emb, rel_pos=self.rel_pos,\n                                   prev_attn=prev_attn, mem=layer_mem)\n            elif layer_type == 'c':\n                out, inter = block(x, context=context, mask=mask, context_mask=context_mask, prev_attn=prev_cross_attn)\n            elif layer_type == 'f':\n                out = block(x)\n\n            x = residual_fn(out, residual)\n\n            if layer_type in ('a', 'c'):\n                intermediates.append(inter)\n\n            if layer_type == 'a' and self.residual_attn:\n                prev_attn = inter.pre_softmax_attn\n            elif layer_type == 'c' and self.cross_residual_attn:\n                prev_cross_attn = inter.pre_softmax_attn\n\n            if not self.pre_norm and not is_last:\n                x = norm(x)\n\n        if return_hiddens:\n            intermediates = LayerIntermediates(\n                hiddens=hiddens,\n                attn_intermediates=intermediates\n            )\n\n            return x, intermediates\n\n        return x\n\n\nclass Encoder(AttentionLayers):\n    def __init__(self, **kwargs):\n        assert 'causal' not in kwargs, 'cannot set causality on encoder'\n        super().__init__(causal=False, **kwargs)\n\n\n\nclass TransformerWrapper(nn.Module):\n    def __init__(\n            self,\n            *,\n            num_tokens,\n            max_seq_len,\n            attn_layers,\n            emb_dim=None,\n            max_mem_len=0.,\n            emb_dropout=0.,\n            num_memory_tokens=None,\n            tie_embedding=False,\n            use_pos_emb=True\n    ):\n        super().__init__()\n        assert isinstance(attn_layers, AttentionLayers), 'attention layers must be one of Encoder or Decoder'\n\n        dim = attn_layers.dim\n        emb_dim = default(emb_dim, dim)\n\n        self.max_seq_len = max_seq_len\n        self.max_mem_len = max_mem_len\n        self.num_tokens = num_tokens\n\n        self.token_emb = nn.Embedding(num_tokens, emb_dim)\n        self.pos_emb = AbsolutePositionalEmbedding(emb_dim, max_seq_len) if (\n                    use_pos_emb and not attn_layers.has_pos_emb) else always(0)\n        self.emb_dropout = nn.Dropout(emb_dropout)\n\n        self.project_emb = nn.Linear(emb_dim, dim) if emb_dim != dim else nn.Identity()\n        self.attn_layers = attn_layers\n        self.norm = nn.LayerNorm(dim)\n\n        self.init_()\n\n        self.to_logits = nn.Linear(dim, num_tokens) if not tie_embedding else lambda t: t @ self.token_emb.weight.t()\n\n        # memory tokens (like [cls]) from Memory Transformers paper\n        num_memory_tokens = default(num_memory_tokens, 0)\n        self.num_memory_tokens = num_memory_tokens\n        if num_memory_tokens > 0:\n            self.memory_tokens = nn.Parameter(torch.randn(num_memory_tokens, dim))\n\n            # let funnel encoder know number of memory tokens, if specified\n            if hasattr(attn_layers, 'num_memory_tokens'):\n                attn_layers.num_memory_tokens = num_memory_tokens\n\n    def init_(self):\n        nn.init.normal_(self.token_emb.weight, std=0.02)\n\n    def forward(\n            self,\n            x,\n            return_embeddings=False,\n            mask=None,\n            return_mems=False,\n            return_attn=False,\n            mems=None,\n            **kwargs\n    ):\n        b, n, device, num_mem = *x.shape, x.device, self.num_memory_tokens\n        x = self.token_emb(x)\n        x += self.pos_emb(x)\n        x = self.emb_dropout(x)\n\n        x = self.project_emb(x)\n\n        if num_mem > 0:\n            mem = repeat(self.memory_tokens, 'n d -> b n d', b=b)\n            x = torch.cat((mem, x), dim=1)\n\n            # auto-handle masking after appending memory tokens\n            if exists(mask):\n                mask = F.pad(mask, (num_mem, 0), value=True)\n\n        x, intermediates = self.attn_layers(x, mask=mask, mems=mems, return_hiddens=True, **kwargs)\n        x = self.norm(x)\n\n        mem, x = x[:, :num_mem], x[:, num_mem:]\n\n        out = self.to_logits(x) if not return_embeddings else x\n\n        if return_mems:\n            hiddens = intermediates.hiddens\n            new_mems = list(map(lambda pair: torch.cat(pair, dim=-2), zip(mems, hiddens))) if exists(mems) else hiddens\n            new_mems = list(map(lambda t: t[..., -self.max_mem_len:, :].detach(), new_mems))\n            return out, new_mems\n\n        if return_attn:\n            attn_maps = list(map(lambda t: t.post_softmax_attn, intermediates.attn_intermediates))\n            return out, attn_maps\n\n        return out\n\n"
  },
  {
    "path": "stable-dreamfusion/ldm/thirdp/psp/helpers.py",
    "content": "# https://github.com/eladrich/pixel2style2pixel\n\nfrom collections import namedtuple\nimport torch\nfrom torch.nn import Conv2d, BatchNorm2d, PReLU, ReLU, Sigmoid, MaxPool2d, AdaptiveAvgPool2d, Sequential, Module\n\n\"\"\"\nArcFace implementation from [TreB1eN](https://github.com/TreB1eN/InsightFace_Pytorch)\n\"\"\"\n\n\nclass Flatten(Module):\n\tdef forward(self, input):\n\t\treturn input.view(input.size(0), -1)\n\n\ndef l2_norm(input, axis=1):\n\tnorm = torch.norm(input, 2, axis, True)\n\toutput = torch.div(input, norm)\n\treturn output\n\n\nclass Bottleneck(namedtuple('Block', ['in_channel', 'depth', 'stride'])):\n\t\"\"\" A named tuple describing a ResNet block. \"\"\"\n\n\ndef get_block(in_channel, depth, num_units, stride=2):\n\treturn [Bottleneck(in_channel, depth, stride)] + [Bottleneck(depth, depth, 1) for i in range(num_units - 1)]\n\n\ndef get_blocks(num_layers):\n\tif num_layers == 50:\n\t\tblocks = [\n\t\t\tget_block(in_channel=64, depth=64, num_units=3),\n\t\t\tget_block(in_channel=64, depth=128, num_units=4),\n\t\t\tget_block(in_channel=128, depth=256, num_units=14),\n\t\t\tget_block(in_channel=256, depth=512, num_units=3)\n\t\t]\n\telif num_layers == 100:\n\t\tblocks = [\n\t\t\tget_block(in_channel=64, depth=64, num_units=3),\n\t\t\tget_block(in_channel=64, depth=128, num_units=13),\n\t\t\tget_block(in_channel=128, depth=256, num_units=30),\n\t\t\tget_block(in_channel=256, depth=512, num_units=3)\n\t\t]\n\telif num_layers == 152:\n\t\tblocks = [\n\t\t\tget_block(in_channel=64, depth=64, num_units=3),\n\t\t\tget_block(in_channel=64, depth=128, num_units=8),\n\t\t\tget_block(in_channel=128, depth=256, num_units=36),\n\t\t\tget_block(in_channel=256, depth=512, num_units=3)\n\t\t]\n\telse:\n\t\traise ValueError(\"Invalid number of layers: {}. Must be one of [50, 100, 152]\".format(num_layers))\n\treturn blocks\n\n\nclass SEModule(Module):\n\tdef __init__(self, channels, reduction):\n\t\tsuper(SEModule, self).__init__()\n\t\tself.avg_pool = AdaptiveAvgPool2d(1)\n\t\tself.fc1 = Conv2d(channels, channels // reduction, kernel_size=1, padding=0, bias=False)\n\t\tself.relu = ReLU(inplace=True)\n\t\tself.fc2 = Conv2d(channels // reduction, channels, kernel_size=1, padding=0, bias=False)\n\t\tself.sigmoid = Sigmoid()\n\n\tdef forward(self, x):\n\t\tmodule_input = x\n\t\tx = self.avg_pool(x)\n\t\tx = self.fc1(x)\n\t\tx = self.relu(x)\n\t\tx = self.fc2(x)\n\t\tx = self.sigmoid(x)\n\t\treturn module_input * x\n\n\nclass bottleneck_IR(Module):\n\tdef __init__(self, in_channel, depth, stride):\n\t\tsuper(bottleneck_IR, self).__init__()\n\t\tif in_channel == depth:\n\t\t\tself.shortcut_layer = MaxPool2d(1, stride)\n\t\telse:\n\t\t\tself.shortcut_layer = Sequential(\n\t\t\t\tConv2d(in_channel, depth, (1, 1), stride, bias=False),\n\t\t\t\tBatchNorm2d(depth)\n\t\t\t)\n\t\tself.res_layer = Sequential(\n\t\t\tBatchNorm2d(in_channel),\n\t\t\tConv2d(in_channel, depth, (3, 3), (1, 1), 1, bias=False), PReLU(depth),\n\t\t\tConv2d(depth, depth, (3, 3), stride, 1, bias=False), BatchNorm2d(depth)\n\t\t)\n\n\tdef forward(self, x):\n\t\tshortcut = self.shortcut_layer(x)\n\t\tres = self.res_layer(x)\n\t\treturn res + shortcut\n\n\nclass bottleneck_IR_SE(Module):\n\tdef __init__(self, in_channel, depth, stride):\n\t\tsuper(bottleneck_IR_SE, self).__init__()\n\t\tif in_channel == depth:\n\t\t\tself.shortcut_layer = MaxPool2d(1, stride)\n\t\telse:\n\t\t\tself.shortcut_layer = Sequential(\n\t\t\t\tConv2d(in_channel, depth, (1, 1), stride, bias=False),\n\t\t\t\tBatchNorm2d(depth)\n\t\t\t)\n\t\tself.res_layer = Sequential(\n\t\t\tBatchNorm2d(in_channel),\n\t\t\tConv2d(in_channel, depth, (3, 3), (1, 1), 1, bias=False),\n\t\t\tPReLU(depth),\n\t\t\tConv2d(depth, depth, (3, 3), stride, 1, bias=False),\n\t\t\tBatchNorm2d(depth),\n\t\t\tSEModule(depth, 16)\n\t\t)\n\n\tdef forward(self, x):\n\t\tshortcut = self.shortcut_layer(x)\n\t\tres = self.res_layer(x)\n\t\treturn res + shortcut"
  },
  {
    "path": "stable-dreamfusion/ldm/thirdp/psp/id_loss.py",
    "content": "# https://github.com/eladrich/pixel2style2pixel\nimport torch\nfrom torch import nn\nfrom ldm.thirdp.psp.model_irse import Backbone\n\n\nclass IDFeatures(nn.Module):\n    def __init__(self, model_path):\n        super(IDFeatures, self).__init__()\n        print('Loading ResNet ArcFace')\n        self.facenet = Backbone(input_size=112, num_layers=50, drop_ratio=0.6, mode='ir_se')\n        self.facenet.load_state_dict(torch.load(model_path, map_location=\"cpu\"))\n        self.face_pool = torch.nn.AdaptiveAvgPool2d((112, 112))\n        self.facenet.eval()\n\n    def forward(self, x, crop=False):\n        # Not sure of the image range here\n        if crop:\n            x = torch.nn.functional.interpolate(x, (256, 256), mode=\"area\")\n            x = x[:, :, 35:223, 32:220]\n        x = self.face_pool(x)\n        x_feats = self.facenet(x)\n        return x_feats\n"
  },
  {
    "path": "stable-dreamfusion/ldm/thirdp/psp/model_irse.py",
    "content": "# https://github.com/eladrich/pixel2style2pixel\n\nfrom torch.nn import Linear, Conv2d, BatchNorm1d, BatchNorm2d, PReLU, Dropout, Sequential, Module\nfrom ldm.thirdp.psp.helpers import get_blocks, Flatten, bottleneck_IR, bottleneck_IR_SE, l2_norm\n\n\"\"\"\nModified Backbone implementation from [TreB1eN](https://github.com/TreB1eN/InsightFace_Pytorch)\n\"\"\"\n\n\nclass Backbone(Module):\n\tdef __init__(self, input_size, num_layers, mode='ir', drop_ratio=0.4, affine=True):\n\t\tsuper(Backbone, self).__init__()\n\t\tassert input_size in [112, 224], \"input_size should be 112 or 224\"\n\t\tassert num_layers in [50, 100, 152], \"num_layers should be 50, 100 or 152\"\n\t\tassert mode in ['ir', 'ir_se'], \"mode should be ir or ir_se\"\n\t\tblocks = get_blocks(num_layers)\n\t\tif mode == 'ir':\n\t\t\tunit_module = bottleneck_IR\n\t\telif mode == 'ir_se':\n\t\t\tunit_module = bottleneck_IR_SE\n\t\tself.input_layer = Sequential(Conv2d(3, 64, (3, 3), 1, 1, bias=False),\n\t\t\t\t\t\t\t\t\t  BatchNorm2d(64),\n\t\t\t\t\t\t\t\t\t  PReLU(64))\n\t\tif input_size == 112:\n\t\t\tself.output_layer = Sequential(BatchNorm2d(512),\n\t\t\t                               Dropout(drop_ratio),\n\t\t\t                               Flatten(),\n\t\t\t                               Linear(512 * 7 * 7, 512),\n\t\t\t                               BatchNorm1d(512, affine=affine))\n\t\telse:\n\t\t\tself.output_layer = Sequential(BatchNorm2d(512),\n\t\t\t                               Dropout(drop_ratio),\n\t\t\t                               Flatten(),\n\t\t\t                               Linear(512 * 14 * 14, 512),\n\t\t\t                               BatchNorm1d(512, affine=affine))\n\n\t\tmodules = []\n\t\tfor block in blocks:\n\t\t\tfor bottleneck in block:\n\t\t\t\tmodules.append(unit_module(bottleneck.in_channel,\n\t\t\t\t\t\t\t\t\t\t   bottleneck.depth,\n\t\t\t\t\t\t\t\t\t\t   bottleneck.stride))\n\t\tself.body = Sequential(*modules)\n\n\tdef forward(self, x):\n\t\tx = self.input_layer(x)\n\t\tx = self.body(x)\n\t\tx = self.output_layer(x)\n\t\treturn l2_norm(x)\n\n\ndef IR_50(input_size):\n\t\"\"\"Constructs a ir-50 model.\"\"\"\n\tmodel = Backbone(input_size, num_layers=50, mode='ir', drop_ratio=0.4, affine=False)\n\treturn model\n\n\ndef IR_101(input_size):\n\t\"\"\"Constructs a ir-101 model.\"\"\"\n\tmodel = Backbone(input_size, num_layers=100, mode='ir', drop_ratio=0.4, affine=False)\n\treturn model\n\n\ndef IR_152(input_size):\n\t\"\"\"Constructs a ir-152 model.\"\"\"\n\tmodel = Backbone(input_size, num_layers=152, mode='ir', drop_ratio=0.4, affine=False)\n\treturn model\n\n\ndef IR_SE_50(input_size):\n\t\"\"\"Constructs a ir_se-50 model.\"\"\"\n\tmodel = Backbone(input_size, num_layers=50, mode='ir_se', drop_ratio=0.4, affine=False)\n\treturn model\n\n\ndef IR_SE_101(input_size):\n\t\"\"\"Constructs a ir_se-101 model.\"\"\"\n\tmodel = Backbone(input_size, num_layers=100, mode='ir_se', drop_ratio=0.4, affine=False)\n\treturn model\n\n\ndef IR_SE_152(input_size):\n\t\"\"\"Constructs a ir_se-152 model.\"\"\"\n\tmodel = Backbone(input_size, num_layers=152, mode='ir_se', drop_ratio=0.4, affine=False)\n\treturn model"
  },
  {
    "path": "stable-dreamfusion/ldm/util.py",
    "content": "import importlib\n\nimport torchvision\nimport torch\nfrom torch import optim\nimport numpy as np\n\nfrom inspect import isfunction\nfrom PIL import Image, ImageDraw, ImageFont\n\nimport os\nimport numpy as np\nimport matplotlib.pyplot as plt\nfrom PIL import Image\nimport torch\nimport time\nimport cv2\n\nimport PIL\n\ndef pil_rectangle_crop(im):\n    width, height = im.size   # Get dimensions\n    \n    if width <= height:\n        left = 0\n        right = width\n        top = (height - width)/2\n        bottom = (height + width)/2\n    else:\n        \n        top = 0\n        bottom = height\n        left = (width - height) / 2\n        bottom = (width + height) / 2\n\n    # Crop the center of the image\n    im = im.crop((left, top, right, bottom))\n    return im\n\n\ndef log_txt_as_img(wh, xc, size=10):\n    # wh a tuple of (width, height)\n    # xc a list of captions to plot\n    b = len(xc)\n    txts = list()\n    for bi in range(b):\n        txt = Image.new(\"RGB\", wh, color=\"white\")\n        draw = ImageDraw.Draw(txt)\n        font = ImageFont.truetype('data/DejaVuSans.ttf', size=size)\n        nc = int(40 * (wh[0] / 256))\n        lines = \"\\n\".join(xc[bi][start:start + nc] for start in range(0, len(xc[bi]), nc))\n\n        try:\n            draw.text((0, 0), lines, fill=\"black\", font=font)\n        except UnicodeEncodeError:\n            print(\"Cant encode string for logging. Skipping.\")\n\n        txt = np.array(txt).transpose(2, 0, 1) / 127.5 - 1.0\n        txts.append(txt)\n    txts = np.stack(txts)\n    txts = torch.tensor(txts)\n    return txts\n\n\ndef ismap(x):\n    if not isinstance(x, torch.Tensor):\n        return False\n    return (len(x.shape) == 4) and (x.shape[1] > 3)\n\n\ndef isimage(x):\n    if not isinstance(x,torch.Tensor):\n        return False\n    return (len(x.shape) == 4) and (x.shape[1] == 3 or x.shape[1] == 1)\n\n\ndef exists(x):\n    return x is not None\n\n\ndef default(val, d):\n    if exists(val):\n        return val\n    return d() if isfunction(d) else d\n\n\ndef mean_flat(tensor):\n    \"\"\"\n    https://github.com/openai/guided-diffusion/blob/27c20a8fab9cb472df5d6bdd6c8d11c8f430b924/guided_diffusion/nn.py#L86\n    Take the mean over all non-batch dimensions.\n    \"\"\"\n    return tensor.mean(dim=list(range(1, len(tensor.shape))))\n\n\ndef count_params(model, verbose=False):\n    total_params = sum(p.numel() for p in model.parameters())\n    if verbose:\n        print(f\"{model.__class__.__name__} has {total_params*1.e-6:.2f} M params.\")\n    return total_params\n\n\ndef instantiate_from_config(config):\n    if not \"target\" in config:\n        if config == '__is_first_stage__':\n            return None\n        elif config == \"__is_unconditional__\":\n            return None\n        raise KeyError(\"Expected key `target` to instantiate.\")\n    return get_obj_from_str(config[\"target\"])(**config.get(\"params\", dict()))\n\n\ndef get_obj_from_str(string, reload=False):\n    module, cls = string.rsplit(\".\", 1)\n    if reload:\n        module_imp = importlib.import_module(module)\n        importlib.reload(module_imp)\n    return getattr(importlib.import_module(module, package=None), cls)\n\n\nclass AdamWwithEMAandWings(optim.Optimizer):\n    # credit to https://gist.github.com/crowsonkb/65f7265353f403714fce3b2595e0b298\n    def __init__(self, params, lr=1.e-3, betas=(0.9, 0.999), eps=1.e-8,  # TODO: check hyperparameters before using\n                 weight_decay=1.e-2, amsgrad=False, ema_decay=0.9999,   # ema decay to match previous code\n                 ema_power=1., param_names=()):\n        \"\"\"AdamW that saves EMA versions of the parameters.\"\"\"\n        if not 0.0 <= lr:\n            raise ValueError(\"Invalid learning rate: {}\".format(lr))\n        if not 0.0 <= eps:\n            raise ValueError(\"Invalid epsilon value: {}\".format(eps))\n        if not 0.0 <= betas[0] < 1.0:\n            raise ValueError(\"Invalid beta parameter at index 0: {}\".format(betas[0]))\n        if not 0.0 <= betas[1] < 1.0:\n            raise ValueError(\"Invalid beta parameter at index 1: {}\".format(betas[1]))\n        if not 0.0 <= weight_decay:\n            raise ValueError(\"Invalid weight_decay value: {}\".format(weight_decay))\n        if not 0.0 <= ema_decay <= 1.0:\n            raise ValueError(\"Invalid ema_decay value: {}\".format(ema_decay))\n        defaults = dict(lr=lr, betas=betas, eps=eps,\n                        weight_decay=weight_decay, amsgrad=amsgrad, ema_decay=ema_decay,\n                        ema_power=ema_power, param_names=param_names)\n        super().__init__(params, defaults)\n\n    def __setstate__(self, state):\n        super().__setstate__(state)\n        for group in self.param_groups:\n            group.setdefault('amsgrad', False)\n\n    @torch.no_grad()\n    def step(self, closure=None):\n        \"\"\"Performs a single optimization step.\n        Args:\n            closure (callable, optional): A closure that reevaluates the model\n                and returns the loss.\n        \"\"\"\n        loss = None\n        if closure is not None:\n            with torch.enable_grad():\n                loss = closure()\n\n        for group in self.param_groups:\n            params_with_grad = []\n            grads = []\n            exp_avgs = []\n            exp_avg_sqs = []\n            ema_params_with_grad = []\n            state_sums = []\n            max_exp_avg_sqs = []\n            state_steps = []\n            amsgrad = group['amsgrad']\n            beta1, beta2 = group['betas']\n            ema_decay = group['ema_decay']\n            ema_power = group['ema_power']\n\n            for p in group['params']:\n                if p.grad is None:\n                    continue\n                params_with_grad.append(p)\n                if p.grad.is_sparse:\n                    raise RuntimeError('AdamW does not support sparse gradients')\n                grads.append(p.grad)\n\n                state = self.state[p]\n\n                # State initialization\n                if len(state) == 0:\n                    state['step'] = 0\n                    # Exponential moving average of gradient values\n                    state['exp_avg'] = torch.zeros_like(p, memory_format=torch.preserve_format)\n                    # Exponential moving average of squared gradient values\n                    state['exp_avg_sq'] = torch.zeros_like(p, memory_format=torch.preserve_format)\n                    if amsgrad:\n                        # Maintains max of all exp. moving avg. of sq. grad. values\n                        state['max_exp_avg_sq'] = torch.zeros_like(p, memory_format=torch.preserve_format)\n                    # Exponential moving average of parameter values\n                    state['param_exp_avg'] = p.detach().float().clone()\n\n                exp_avgs.append(state['exp_avg'])\n                exp_avg_sqs.append(state['exp_avg_sq'])\n                ema_params_with_grad.append(state['param_exp_avg'])\n\n                if amsgrad:\n                    max_exp_avg_sqs.append(state['max_exp_avg_sq'])\n\n                # update the steps for each param group update\n                state['step'] += 1\n                # record the step after step update\n                state_steps.append(state['step'])\n\n            optim._functional.adamw(params_with_grad,\n                    grads,\n                    exp_avgs,\n                    exp_avg_sqs,\n                    max_exp_avg_sqs,\n                    state_steps,\n                    amsgrad=amsgrad,\n                    beta1=beta1,\n                    beta2=beta2,\n                    lr=group['lr'],\n                    weight_decay=group['weight_decay'],\n                    eps=group['eps'],\n                    maximize=False)\n\n            cur_ema_decay = min(ema_decay, 1 - state['step'] ** -ema_power)\n            for param, ema_param in zip(params_with_grad, ema_params_with_grad):\n                ema_param.mul_(cur_ema_decay).add_(param.float(), alpha=1 - cur_ema_decay)\n\n        return loss"
  },
  {
    "path": "stable-dreamfusion/main.py",
    "content": "import torch\nimport argparse\nimport pandas as pd\nimport sys\n\nfrom nerf.provider import NeRFDataset\nfrom nerf.utils import *\n\n# torch.autograd.set_detect_anomaly(True)\n\nif __name__ == '__main__':\n    # See https://stackoverflow.com/questions/27433316/how-to-get-argparse-to-read-arguments-from-a-file-with-an-option-rather-than-pre\n    class LoadFromFile (argparse.Action):\n        def __call__ (self, parser, namespace, values, option_string = None):\n            with values as f:\n                # parse arguments in the file and store them in the target namespace\n                parser.parse_args(f.read().split(), namespace)\n\n    parser = argparse.ArgumentParser()\n    parser.add_argument('--file', type=open, action=LoadFromFile, help=\"specify a file filled with more arguments\")\n    parser.add_argument('--text', default=None, help=\"text prompt\")\n    parser.add_argument('--negative', default='', type=str, help=\"negative text prompt\")\n    parser.add_argument('-O', action='store_true', help=\"equals --fp16 --cuda_ray\")\n    parser.add_argument('-O2', action='store_true', help=\"equals --backbone vanilla\")\n    parser.add_argument('--test', action='store_true', help=\"test mode\")\n    parser.add_argument('--six_views', action='store_true', help=\"six_views mode: save the images of the six views\")\n    parser.add_argument('--eval_interval', type=int, default=1, help=\"evaluate on the valid set every interval epochs\")\n    parser.add_argument('--test_interval', type=int, default=100, help=\"test on the test set every interval epochs\")\n    parser.add_argument('--workspace', type=str, default='workspace')\n    parser.add_argument('--seed', default=None)\n\n    parser.add_argument('--image', default=None, help=\"image prompt\")\n    parser.add_argument('--image_config', default=None, help=\"image config csv\")\n\n    parser.add_argument('--known_view_interval', type=int, default=4, help=\"train default view with RGB loss every & iters, only valid if --image is not None.\")\n\n    parser.add_argument('--IF', action='store_true', help=\"experimental: use DeepFloyd IF as the guidance model for nerf stage\")\n\n    parser.add_argument('--guidance', type=str, nargs='*', default=['SD'], help='guidance model')\n    parser.add_argument('--guidance_scale', type=float, default=100, help=\"diffusion model classifier-free guidance scale\")\n\n    parser.add_argument('--save_mesh', action='store_true', help=\"export an obj mesh with texture\")\n    parser.add_argument('--mcubes_resolution', type=int, default=256, help=\"mcubes resolution for extracting mesh\")\n    parser.add_argument('--decimate_target', type=int, default=5e4, help=\"target face number for mesh decimation\")\n\n    parser.add_argument('--dmtet', action='store_true', help=\"use dmtet finetuning\")\n    parser.add_argument('--tet_grid_size', type=int, default=128, help=\"tet grid size\")\n    parser.add_argument('--init_with', type=str, default='', help=\"ckpt to init dmtet\")\n    parser.add_argument('--lock_geo', action='store_true', help=\"disable dmtet to learn geometry\")\n\n    ## Perp-Neg options\n    parser.add_argument('--perpneg', action='store_true', help=\"use perp_neg\")\n    parser.add_argument('--negative_w', type=float, default=-2, help=\"scale of the weight of the negative prompt, the larger the better at avoiding janus problem, but may cause flat faces, vary between 0 to -4\")\n    parser.add_argument('--front_decay_factor', type=float, default=2, help=\"decay factor for the front prompt\")\n    parser.add_argument('--side_decay_factor', type=float, default=10, help=\"decay factor for the side prompt\")\n\n    ### training options\n    parser.add_argument('--iters', type=int, default=10000, help=\"training iters\")\n    parser.add_argument('--lr', type=float, default=1e-3, help=\"max learning rate\")\n    parser.add_argument('--ckpt', type=str, default='latest', help=\"possible options are ['latest', 'scratch', 'best', 'latest_model']\")\n    parser.add_argument('--cuda_ray', action='store_true', help=\"use CUDA raymarching instead of pytorch\")\n    parser.add_argument('--taichi_ray', action='store_true', help=\"use taichi raymarching\")\n    parser.add_argument('--max_steps', type=int, default=1024, help=\"max num steps sampled per ray (only valid when using --cuda_ray)\")\n    parser.add_argument('--num_steps', type=int, default=64, help=\"num steps sampled per ray (only valid when not using --cuda_ray)\")\n    parser.add_argument('--upsample_steps', type=int, default=32, help=\"num steps up-sampled per ray (only valid when not using --cuda_ray)\")\n    parser.add_argument('--update_extra_interval', type=int, default=16, help=\"iter interval to update extra status (only valid when using --cuda_ray)\")\n    parser.add_argument('--max_ray_batch', type=int, default=4096, help=\"batch size of rays at inference to avoid OOM (only valid when not using --cuda_ray)\")\n    parser.add_argument('--latent_iter_ratio', type=float, default=0.2, help=\"training iters that only use albedo shading\")\n    parser.add_argument('--albedo_iter_ratio', type=float, default=0, help=\"training iters that only use albedo shading\")\n    parser.add_argument('--min_ambient_ratio', type=float, default=0.1, help=\"minimum ambient ratio to use in lambertian shading\")\n    parser.add_argument('--textureless_ratio', type=float, default=0.2, help=\"ratio of textureless shading\")\n    parser.add_argument('--jitter_pose', action='store_true', help=\"add jitters to the randomly sampled camera poses\")\n    parser.add_argument('--jitter_center', type=float, default=0.2, help=\"amount of jitter to add to sampled camera pose's center (camera location)\")\n    parser.add_argument('--jitter_target', type=float, default=0.2, help=\"amount of jitter to add to sampled camera pose's target (i.e. 'look-at')\")\n    parser.add_argument('--jitter_up', type=float, default=0.02, help=\"amount of jitter to add to sampled camera pose's up-axis (i.e. 'camera roll')\")\n    parser.add_argument('--uniform_sphere_rate', type=float, default=0, help=\"likelihood of sampling camera location uniformly on the sphere surface area\")\n    parser.add_argument('--grad_clip', type=float, default=-1, help=\"clip grad of all grad to this limit, negative value disables it\")\n    parser.add_argument('--grad_clip_rgb', type=float, default=-1, help=\"clip grad of rgb space grad to this limit, negative value disables it\")\n    # model options\n    parser.add_argument('--bg_radius', type=float, default=1.4, help=\"if positive, use a background model at sphere(bg_radius)\")\n    parser.add_argument('--density_activation', type=str, default='exp', choices=['softplus', 'exp'], help=\"density activation function\")\n    parser.add_argument('--density_thresh', type=float, default=10, help=\"threshold for density grid to be occupied\")\n    parser.add_argument('--blob_density', type=float, default=5, help=\"max (center) density for the density blob\")\n    parser.add_argument('--blob_radius', type=float, default=0.2, help=\"control the radius for the density blob\")\n    # network backbone\n    parser.add_argument('--backbone', type=str, default='grid', choices=['grid_tcnn', 'grid', 'vanilla', 'grid_taichi'], help=\"nerf backbone\")\n    parser.add_argument('--optim', type=str, default='adan', choices=['adan', 'adam'], help=\"optimizer\")\n    parser.add_argument('--sd_version', type=str, default='2.1', choices=['1.5', '2.0', '2.1'], help=\"stable diffusion version\")\n    parser.add_argument('--hf_key', type=str, default=None, help=\"hugging face Stable diffusion model key\")\n    # try this if CUDA OOM\n    parser.add_argument('--fp16', action='store_true', help=\"use float16 for training\")\n    parser.add_argument('--vram_O', action='store_true', help=\"optimization for low VRAM usage\")\n    # rendering resolution in training, increase these for better quality / decrease these if CUDA OOM even if --vram_O enabled.\n    parser.add_argument('--w', type=int, default=64, help=\"render width for NeRF in training\")\n    parser.add_argument('--h', type=int, default=64, help=\"render height for NeRF in training\")\n    parser.add_argument('--known_view_scale', type=float, default=1.5, help=\"multiply --h/w by this for known view rendering\")\n    parser.add_argument('--known_view_noise_scale', type=float, default=2e-3, help=\"random camera noise added to rays_o and rays_d\")\n    parser.add_argument('--dmtet_reso_scale', type=float, default=8, help=\"multiply --h/w by this for dmtet finetuning\")\n    parser.add_argument('--batch_size', type=int, default=1, help=\"images to render per batch using NeRF\")\n\n    ### dataset options\n    parser.add_argument('--bound', type=float, default=1, help=\"assume the scene is bounded in box(-bound, bound)\")\n    parser.add_argument('--dt_gamma', type=float, default=0, help=\"dt_gamma (>=0) for adaptive ray marching. set to 0 to disable, >0 to accelerate rendering (but usually with worse quality)\")\n    parser.add_argument('--min_near', type=float, default=0.01, help=\"minimum near distance for camera\")\n\n    parser.add_argument('--radius_range', type=float, nargs='*', default=[3.0, 3.5], help=\"training camera radius range\")\n    parser.add_argument('--theta_range', type=float, nargs='*', default=[45, 105], help=\"training camera range along the polar angles (i.e. up and down). See advanced.md for details.\")\n    parser.add_argument('--phi_range', type=float, nargs='*', default=[-180, 180], help=\"training camera range along the azimuth angles (i.e. left and right). See advanced.md for details.\")\n    parser.add_argument('--fovy_range', type=float, nargs='*', default=[10, 30], help=\"training camera fovy range\")\n\n    parser.add_argument('--default_radius', type=float, default=3.2, help=\"radius for the default view\")\n    parser.add_argument('--default_polar', type=float, default=90, help=\"polar for the default view\")\n    parser.add_argument('--default_azimuth', type=float, default=0, help=\"azimuth for the default view\")\n    parser.add_argument('--default_fovy', type=float, default=20, help=\"fovy for the default view\")\n\n    parser.add_argument('--progressive_view', action='store_true', help=\"progressively expand view sampling range from default to full\")\n    parser.add_argument('--progressive_view_init_ratio', type=float, default=0.2, help=\"initial ratio of final range, used for progressive_view\")\n    \n    parser.add_argument('--progressive_level', action='store_true', help=\"progressively increase gridencoder's max_level\")\n\n    parser.add_argument('--angle_overhead', type=float, default=30, help=\"[0, angle_overhead] is the overhead region\")\n    parser.add_argument('--angle_front', type=float, default=60, help=\"[0, angle_front] is the front region, [180, 180+angle_front] the back region, otherwise the side region.\")\n    parser.add_argument('--t_range', type=float, nargs='*', default=[0.02, 0.98], help=\"stable diffusion time steps range\")\n    parser.add_argument('--dont_override_stuff',action='store_true', help=\"Don't override t_range, etc.\")\n\n\n    ### regularizations\n    parser.add_argument('--lambda_entropy', type=float, default=1e-3, help=\"loss scale for alpha entropy\")\n    parser.add_argument('--lambda_opacity', type=float, default=0, help=\"loss scale for alpha value\")\n    parser.add_argument('--lambda_orient', type=float, default=1e-2, help=\"loss scale for orientation\")\n    parser.add_argument('--lambda_tv', type=float, default=0, help=\"loss scale for total variation\")\n    parser.add_argument('--lambda_wd', type=float, default=0, help=\"loss scale\")\n\n    parser.add_argument('--lambda_mesh_normal', type=float, default=0.5, help=\"loss scale for mesh normal smoothness\")\n    parser.add_argument('--lambda_mesh_laplacian', type=float, default=0.5, help=\"loss scale for mesh laplacian\")\n\n    parser.add_argument('--lambda_guidance', type=float, default=1, help=\"loss scale for SDS\")\n    parser.add_argument('--lambda_rgb', type=float, default=1000, help=\"loss scale for RGB\")\n    parser.add_argument('--lambda_mask', type=float, default=500, help=\"loss scale for mask (alpha)\")\n    parser.add_argument('--lambda_normal', type=float, default=0, help=\"loss scale for normal map\")\n    parser.add_argument('--lambda_depth', type=float, default=10, help=\"loss scale for relative depth\")\n    parser.add_argument('--lambda_2d_normal_smooth', type=float, default=0, help=\"loss scale for 2D normal image smoothness\")\n    parser.add_argument('--lambda_3d_normal_smooth', type=float, default=0, help=\"loss scale for 3D normal image smoothness\")\n\n    ### debugging options\n    parser.add_argument('--save_guidance', action='store_true', help=\"save images of the per-iteration NeRF renders, added noise, denoised (i.e. guidance), fully-denoised. Useful for debugging, but VERY SLOW and takes lots of memory!\")\n    parser.add_argument('--save_guidance_interval', type=int, default=10, help=\"save guidance every X step\")\n\n    ### GUI options\n    parser.add_argument('--gui', action='store_true', help=\"start a GUI\")\n    parser.add_argument('--W', type=int, default=800, help=\"GUI width\")\n    parser.add_argument('--H', type=int, default=800, help=\"GUI height\")\n    parser.add_argument('--radius', type=float, default=5, help=\"default GUI camera radius from center\")\n    parser.add_argument('--fovy', type=float, default=20, help=\"default GUI camera fovy\")\n    parser.add_argument('--light_theta', type=float, default=60, help=\"default GUI light direction in [0, 180], corresponding to elevation [90, -90]\")\n    parser.add_argument('--light_phi', type=float, default=0, help=\"default GUI light direction in [0, 360), azimuth\")\n    parser.add_argument('--max_spp', type=int, default=1, help=\"GUI rendering max sample per pixel\")\n\n    parser.add_argument('--zero123_config', type=str, default='./pretrained/zero123/sd-objaverse-finetune-c_concat-256.yaml', help=\"config file for zero123\")\n    parser.add_argument('--zero123_ckpt', type=str, default='./pretrained/zero123/105000.ckpt', help=\"ckpt for zero123\")\n    parser.add_argument('--zero123_grad_scale', type=str, default='angle', help=\"whether to scale the gradients based on 'angle' or 'None'\")\n\n    parser.add_argument('--dataset_size_train', type=int, default=100, help=\"Length of train dataset i.e. # of iterations per epoch\")\n    parser.add_argument('--dataset_size_valid', type=int, default=8, help=\"# of frames to render in the turntable video in validation\")\n    parser.add_argument('--dataset_size_test', type=int, default=100, help=\"# of frames to render in the turntable video at test time\")\n\n    parser.add_argument('--exp_start_iter', type=int, default=None, help=\"start iter # for experiment, to calculate progressive_view and progressive_level\")\n    parser.add_argument('--exp_end_iter', type=int, default=None, help=\"end iter # for experiment, to calculate progressive_view and progressive_level\")\n\n    opt = parser.parse_args()\n\n    if opt.O:\n        opt.fp16 = True\n        opt.cuda_ray = True\n\n    elif opt.O2:\n        opt.fp16 = True\n        opt.backbone = 'vanilla'\n        opt.progressive_level = True\n\n    if opt.IF:\n        if 'SD' in opt.guidance:\n            opt.guidance.remove('SD')\n            opt.guidance.append('IF')\n        opt.latent_iter_ratio = 0 # must not do as_latent\n\n    opt.images, opt.ref_radii, opt.ref_polars, opt.ref_azimuths, opt.zero123_ws = [], [], [], [], []\n    opt.default_zero123_w = 1\n\n    opt.exp_start_iter = opt.exp_start_iter or 0\n    opt.exp_end_iter = opt.exp_end_iter or opt.iters\n\n    # parameters for image-conditioned generation\n    if opt.image is not None or opt.image_config is not None:\n\n        if opt.text is None:\n            # use zero123 guidance model when only providing image\n            opt.guidance = ['zero123']\n            if not opt.dont_override_stuff:\n                opt.fovy_range = [opt.default_fovy, opt.default_fovy] # fix fov as zero123 doesn't support changing fov\n                opt.guidance_scale = 5\n                opt.lambda_3d_normal_smooth = 10\n        else:\n            # use stable-diffusion when providing both text and image\n            opt.guidance = ['SD', 'clip']\n            \n            if not opt.dont_override_stuff:\n                opt.guidance_scale = 10\n                opt.t_range = [0.2, 0.6]\n                opt.known_view_interval = 2\n                opt.lambda_3d_normal_smooth = 20\n            opt.bg_radius = -1\n\n        # smoothness\n        opt.lambda_entropy = 1\n        opt.lambda_orient = 1\n\n        # latent warmup is not needed\n        opt.latent_iter_ratio = 0\n        if not opt.dont_override_stuff:\n            opt.albedo_iter_ratio = 0\n            \n            # make shape init more stable\n            opt.progressive_view = True\n            opt.progressive_level = True\n\n        if opt.image is not None:\n            opt.images += [opt.image]\n            opt.ref_radii += [opt.default_radius]\n            opt.ref_polars += [opt.default_polar]\n            opt.ref_azimuths += [opt.default_azimuth]\n            opt.zero123_ws += [opt.default_zero123_w]\n\n        if opt.image_config is not None:\n            # for multiview (zero123)\n            conf = pd.read_csv(opt.image_config, skipinitialspace=True)\n            opt.images += list(conf.image)\n            opt.ref_radii += list(conf.radius)\n            opt.ref_polars += list(conf.polar)\n            opt.ref_azimuths += list(conf.azimuth)\n            opt.zero123_ws += list(conf.zero123_weight)\n            if opt.image is None:\n                opt.default_radius = opt.ref_radii[0]\n                opt.default_polar = opt.ref_polars[0]\n                opt.default_azimuth = opt.ref_azimuths[0]\n                opt.default_zero123_w = opt.zero123_ws[0]\n\n    # reset to None\n    if len(opt.images) == 0:\n        opt.images = None\n\n    # default parameters for finetuning\n    if opt.dmtet:\n\n        opt.h = int(opt.h * opt.dmtet_reso_scale)\n        opt.w = int(opt.w * opt.dmtet_reso_scale)\n        opt.known_view_scale = 1\n\n        if not opt.dont_override_stuff:            \n            opt.t_range = [0.02, 0.50] # ref: magic3D\n\n        if opt.images is not None:\n\n            opt.lambda_normal = 0\n            opt.lambda_depth = 0\n\n            if opt.text is not None and not opt.dont_override_stuff:\n                opt.t_range = [0.20, 0.50]\n\n        # assume finetuning\n        opt.latent_iter_ratio = 0\n        opt.albedo_iter_ratio = 0\n        opt.progressive_view = False\n        # opt.progressive_level = False\n\n    # record full range for progressive view expansion\n    if opt.progressive_view:\n        if not opt.dont_override_stuff:\n            # disable as they disturb progressive view\n            opt.jitter_pose = False\n            \n        opt.uniform_sphere_rate = 0\n        # back up full range\n        opt.full_radius_range = opt.radius_range\n        opt.full_theta_range = opt.theta_range\n        opt.full_phi_range = opt.phi_range\n        opt.full_fovy_range = opt.fovy_range\n\n    if opt.backbone == 'vanilla':\n        from nerf.network import NeRFNetwork\n    elif opt.backbone == 'grid':\n        from nerf.network_grid import NeRFNetwork\n    elif opt.backbone == 'grid_tcnn':\n        from nerf.network_grid_tcnn import NeRFNetwork\n    elif opt.backbone == 'grid_taichi':\n        opt.cuda_ray = False\n        opt.taichi_ray = True\n        import taichi as ti\n        from nerf.network_grid_taichi import NeRFNetwork\n        taichi_half2_opt = True\n        taichi_init_args = {\"arch\": ti.cuda, \"device_memory_GB\": 4.0}\n        if taichi_half2_opt:\n            taichi_init_args[\"half2_vectorization\"] = True\n        ti.init(**taichi_init_args)\n    else:\n        raise NotImplementedError(f'--backbone {opt.backbone} is not implemented!')\n\n    print(opt)\n\n    if opt.seed is not None:\n        seed_everything(int(opt.seed))\n\n    device = torch.device('cuda' if torch.cuda.is_available() else 'cpu')\n\n    model = NeRFNetwork(opt).to(device)\n\n    if opt.dmtet and opt.init_with != '':\n        if opt.init_with.endswith('.pth'):\n            # load pretrained weights to init dmtet\n            state_dict = torch.load(opt.init_with, map_location=device)\n            model.load_state_dict(state_dict['model'], strict=False)\n            if opt.cuda_ray:\n                model.mean_density = state_dict['mean_density']\n            model.init_tet()\n        else:\n            # assume a mesh to init dmtet (experimental, not working well now!)\n            import trimesh\n            mesh = trimesh.load(opt.init_with, force='mesh', skip_material=True, process=False)\n            model.init_tet(mesh=mesh)\n\n    print(model)\n\n    if opt.six_views:\n        guidance = None # no need to load guidance model at test\n\n        trainer = Trainer(' '.join(sys.argv), 'df', opt, model, guidance, device=device, workspace=opt.workspace, fp16=opt.fp16, use_checkpoint=opt.ckpt)\n\n        test_loader = NeRFDataset(opt, device=device, type='six_views', H=opt.H, W=opt.W, size=6).dataloader(batch_size=1)\n        trainer.test(test_loader, write_video=False)\n\n        if opt.save_mesh:\n            trainer.save_mesh()\n\n    elif opt.test:\n        guidance = None # no need to load guidance model at test\n\n        trainer = Trainer(' '.join(sys.argv), 'df', opt, model, guidance, device=device, workspace=opt.workspace, fp16=opt.fp16, use_checkpoint=opt.ckpt)\n\n        if opt.gui:\n            from nerf.gui import NeRFGUI\n            gui = NeRFGUI(opt, trainer)\n            gui.render()\n\n        else:\n            test_loader = NeRFDataset(opt, device=device, type='test', H=opt.H, W=opt.W, size=opt.dataset_size_test).dataloader(batch_size=1)\n            trainer.test(test_loader)\n\n            if opt.save_mesh:\n                trainer.save_mesh()\n\n    else:\n\n        train_loader = NeRFDataset(opt, device=device, type='train', H=opt.h, W=opt.w, size=opt.dataset_size_train * opt.batch_size).dataloader()\n\n        if opt.optim == 'adan':\n            from optimizer import Adan\n            # Adan usually requires a larger LR\n            optimizer = lambda model: Adan(model.get_params(5 * opt.lr), eps=1e-8, weight_decay=2e-5, max_grad_norm=5.0, foreach=False)\n        else: # adam\n            optimizer = lambda model: torch.optim.Adam(model.get_params(opt.lr), betas=(0.9, 0.99), eps=1e-15)\n\n        if opt.backbone == 'vanilla':\n            scheduler = lambda optimizer: optim.lr_scheduler.LambdaLR(optimizer, lambda iter: 0.1 ** min(iter / opt.iters, 1))\n        else:\n            scheduler = lambda optimizer: optim.lr_scheduler.LambdaLR(optimizer, lambda iter: 1) # fixed\n            # scheduler = lambda optimizer: optim.lr_scheduler.LambdaLR(optimizer, lambda iter: 0.1 ** min(iter / opt.iters, 1))\n\n        guidance = nn.ModuleDict()\n\n        if 'SD' in opt.guidance:\n            from guidance.sd_utils import StableDiffusion\n            guidance['SD'] = StableDiffusion(device, opt.fp16, opt.vram_O, opt.sd_version, opt.hf_key, opt.t_range)\n\n        if 'IF' in opt.guidance:\n            from guidance.if_utils import IF\n            guidance['IF'] = IF(device, opt.vram_O, opt.t_range)\n\n        if 'zero123' in opt.guidance:\n            from guidance.zero123_utils import Zero123\n            guidance['zero123'] = Zero123(device=device, fp16=opt.fp16, config=opt.zero123_config, ckpt=opt.zero123_ckpt, vram_O=opt.vram_O, t_range=opt.t_range, opt=opt)\n\n        if 'clip' in opt.guidance:\n            from guidance.clip_utils import CLIP\n            guidance['clip'] = CLIP(device)\n\n        trainer = Trainer(' '.join(sys.argv), 'df', opt, model, guidance, device=device, workspace=opt.workspace, optimizer=optimizer, ema_decay=0.95, fp16=opt.fp16, lr_scheduler=scheduler, use_checkpoint=opt.ckpt, scheduler_update_every_step=True)\n\n        trainer.default_view_data = train_loader._data.get_default_view_data()\n\n        if opt.gui:\n            from nerf.gui import NeRFGUI\n            gui = NeRFGUI(opt, trainer, train_loader)\n            gui.render()\n\n        else:\n            valid_loader = NeRFDataset(opt, device=device, type='val', H=opt.H, W=opt.W, size=opt.dataset_size_valid).dataloader(batch_size=1)\n            test_loader = NeRFDataset(opt, device=device, type='test', H=opt.H, W=opt.W, size=opt.dataset_size_test).dataloader(batch_size=1)\n\n            max_epoch = np.ceil(opt.iters / len(train_loader)).astype(np.int32)\n            trainer.train(train_loader, valid_loader, test_loader, max_epoch)\n\n            if opt.save_mesh:\n                trainer.save_mesh()\n"
  },
  {
    "path": "stable-dreamfusion/meshutils.py",
    "content": "import numpy as np\nimport pymeshlab as pml\n\ndef poisson_mesh_reconstruction(points, normals=None):\n    # points/normals: [N, 3] np.ndarray\n\n    import open3d as o3d\n\n    pcd = o3d.geometry.PointCloud()\n    pcd.points = o3d.utility.Vector3dVector(points)\n\n    # outlier removal\n    pcd, ind = pcd.remove_statistical_outlier(nb_neighbors=20, std_ratio=10)\n\n    # normals\n    if normals is None:\n        pcd.estimate_normals()\n    else:\n        pcd.normals = o3d.utility.Vector3dVector(normals[ind])\n\n    # visualize\n    o3d.visualization.draw_geometries([pcd], point_show_normal=False)\n    \n    mesh, densities = o3d.geometry.TriangleMesh.create_from_point_cloud_poisson(pcd, depth=9)\n    vertices_to_remove = densities < np.quantile(densities, 0.1)\n    mesh.remove_vertices_by_mask(vertices_to_remove)\n\n    # visualize\n    o3d.visualization.draw_geometries([mesh])\n\n    vertices = np.asarray(mesh.vertices)\n    triangles = np.asarray(mesh.triangles)\n\n    print(f'[INFO] poisson mesh reconstruction: {points.shape} --> {vertices.shape} / {triangles.shape}')\n\n    return vertices, triangles\n    \n\ndef decimate_mesh(verts, faces, target, backend='pymeshlab', remesh=False, optimalplacement=True):\n    # optimalplacement: default is True, but for flat mesh must turn False to prevent spike artifect.\n\n    _ori_vert_shape = verts.shape\n    _ori_face_shape = faces.shape\n\n    if backend == 'pyfqmr':\n        import pyfqmr\n        solver = pyfqmr.Simplify()\n        solver.setMesh(verts, faces)\n        solver.simplify_mesh(target_count=target, preserve_border=False, verbose=False)\n        verts, faces, normals = solver.getMesh()\n    else:\n        \n        m = pml.Mesh(verts, faces)\n        ms = pml.MeshSet()\n        ms.add_mesh(m, 'mesh') # will copy!\n\n        # filters\n        # ms.meshing_decimation_clustering(threshold=pml.Percentage(1))\n        ms.meshing_decimation_quadric_edge_collapse(targetfacenum=int(target), optimalplacement=optimalplacement)\n\n        if remesh:\n            # ms.apply_coord_taubin_smoothing()\n            ms.meshing_isotropic_explicit_remeshing(iterations=3, targetlen=pml.Percentage(1))\n\n        # extract mesh\n        m = ms.current_mesh()\n        verts = m.vertex_matrix()\n        faces = m.face_matrix()\n\n    print(f'[INFO] mesh decimation: {_ori_vert_shape} --> {verts.shape}, {_ori_face_shape} --> {faces.shape}')\n\n    return verts, faces\n\n\ndef clean_mesh(verts, faces, v_pct=1, min_f=8, min_d=5, repair=True, remesh=True, remesh_size=0.01):\n    # verts: [N, 3]\n    # faces: [N, 3]\n\n    _ori_vert_shape = verts.shape\n    _ori_face_shape = faces.shape\n\n    m = pml.Mesh(verts, faces)\n    ms = pml.MeshSet()\n    ms.add_mesh(m, 'mesh') # will copy!\n\n    # filters\n    ms.meshing_remove_unreferenced_vertices() # verts not refed by any faces\n\n    if v_pct > 0:\n        ms.meshing_merge_close_vertices(threshold=pml.Percentage(v_pct)) # 1/10000 of bounding box diagonal\n\n    ms.meshing_remove_duplicate_faces() # faces defined by the same verts\n    ms.meshing_remove_null_faces() # faces with area == 0\n\n    if min_d > 0:\n        ms.meshing_remove_connected_component_by_diameter(mincomponentdiag=pml.Percentage(min_d))\n    \n    if min_f > 0:\n        ms.meshing_remove_connected_component_by_face_number(mincomponentsize=min_f)\n\n    if repair:\n        # ms.meshing_remove_t_vertices(method=0, threshold=40, repeat=True)\n        ms.meshing_repair_non_manifold_edges(method=0)\n        ms.meshing_repair_non_manifold_vertices(vertdispratio=0)\n    \n    if remesh:\n        # ms.apply_coord_taubin_smoothing()\n        ms.meshing_isotropic_explicit_remeshing(iterations=3, targetlen=pml.AbsoluteValue(remesh_size))\n\n    # extract mesh\n    m = ms.current_mesh()\n    verts = m.vertex_matrix()\n    faces = m.face_matrix()\n\n    print(f'[INFO] mesh cleaning: {_ori_vert_shape} --> {verts.shape}, {_ori_face_shape} --> {faces.shape}')\n\n    return verts, faces    "
  },
  {
    "path": "stable-dreamfusion/nerf/gui.py",
    "content": "import math\nimport torch\nimport numpy as np\nimport dearpygui.dearpygui as dpg\nfrom scipy.spatial.transform import Rotation as R\n\nfrom nerf.utils import *\n\n\nclass OrbitCamera:\n    def __init__(self, W, H, r=2, fovy=60):\n        self.W = W\n        self.H = H\n        self.radius = r # camera distance from center\n        self.fovy = fovy # in degree\n        self.center = np.array([0, 0, 0], dtype=np.float32) # look at this point\n        self.rot = R.from_matrix(np.eye(3))\n        self.up = np.array([0, 1, 0], dtype=np.float32) # need to be normalized!\n        self.near = 0.001\n        self.far = 1000\n\n    # pose\n    @property\n    def pose(self):\n        # first move camera to radius\n        res = np.eye(4, dtype=np.float32)\n        res[2, 3] = self.radius\n        # rotate\n        rot = np.eye(4, dtype=np.float32)\n        rot[:3, :3] = self.rot.as_matrix()\n        res = rot @ res\n        # translate\n        res[:3, 3] -= self.center\n        return res\n    \n    # intrinsics\n    @property\n    def intrinsics(self):\n        focal = self.H / (2 * np.tan(np.deg2rad(self.fovy) / 2))\n        return np.array([focal, focal, self.W // 2, self.H // 2])\n\n    @property\n    def mvp(self):\n        focal = self.H / (2 * np.tan(np.deg2rad(self.fovy) / 2))\n        projection = np.array([\n            [2*focal/self.W, 0, 0, 0], \n            [0, -2*focal/self.H, 0, 0],\n            [0, 0, -(self.far+self.near)/(self.far-self.near), -(2*self.far*self.near)/(self.far-self.near)],\n            [0, 0, -1, 0]\n        ], dtype=np.float32)\n\n        return projection @ np.linalg.inv(self.pose) # [4, 4]\n    \n    def orbit(self, dx, dy):\n        # rotate along camera up/side axis!\n        side = self.rot.as_matrix()[:3, 0] # why this is side --> ? # already normalized.\n        rotvec_x = self.up * np.deg2rad(-0.1 * dx)\n        rotvec_y = side * np.deg2rad(-0.1 * dy)\n        self.rot = R.from_rotvec(rotvec_x) * R.from_rotvec(rotvec_y) * self.rot\n\n    def scale(self, delta):\n        self.radius *= 1.1 ** (-delta)\n\n    def pan(self, dx, dy, dz=0):\n        # pan in camera coordinate system (careful on the sensitivity!)\n        self.center += 0.0005 * self.rot.as_matrix()[:3, :3] @ np.array([dx, -dy, dz])\n\n\nclass NeRFGUI:\n    def __init__(self, opt, trainer, loader=None, debug=True):\n        self.opt = opt # shared with the trainer's opt to support in-place modification of rendering parameters.\n        self.W = opt.W\n        self.H = opt.H\n        self.cam = OrbitCamera(opt.W, opt.H, r=opt.radius, fovy=opt.fovy)\n        self.debug = debug\n        self.bg_color = torch.ones(3, dtype=torch.float32) # default white bg\n        self.training = False\n        self.step = 0 # training step \n\n        self.trainer = trainer\n        self.loader = loader\n        self.render_buffer = np.zeros((self.W, self.H, 3), dtype=np.float32)\n        self.need_update = True # camera moved, should reset accumulation\n        self.spp = 1 # sample per pixel\n        self.light_dir = np.array([opt.light_theta, opt.light_phi])\n        self.ambient_ratio = 1.0\n        self.mode = 'image' # choose from ['image', 'depth']\n        self.shading = 'albedo'\n\n        self.dynamic_resolution = True if not self.opt.dmtet else False\n        self.downscale = 1\n        self.train_steps = 16\n\n        dpg.create_context()\n        self.register_dpg()\n        self.test_step()\n        \n\n    def __del__(self):\n        dpg.destroy_context()\n\n\n    def train_step(self):\n\n        starter, ender = torch.cuda.Event(enable_timing=True), torch.cuda.Event(enable_timing=True)\n        starter.record()\n\n        outputs = self.trainer.train_gui(self.loader, step=self.train_steps)\n\n        ender.record()\n        torch.cuda.synchronize()\n        t = starter.elapsed_time(ender)\n\n        self.step += self.train_steps\n        self.need_update = True\n\n        dpg.set_value(\"_log_train_time\", f'{t:.4f}ms ({int(1000/t)} FPS)')\n        dpg.set_value(\"_log_train_log\", f'step = {self.step: 5d} (+{self.train_steps: 2d}), loss = {outputs[\"loss\"]:.4f}, lr = {outputs[\"lr\"]:.5f}')\n\n        # dynamic train steps\n        # max allowed train time per-frame is 500 ms\n        full_t = t / self.train_steps * 16\n        train_steps = min(16, max(4, int(16 * 500 / full_t)))\n        if train_steps > self.train_steps * 1.2 or train_steps < self.train_steps * 0.8:\n            self.train_steps = train_steps\n\n\n    def prepare_buffer(self, outputs):\n        if self.mode == 'image':\n            return outputs['image'].astype(np.float32)\n        else:\n            depth = outputs['depth'].astype(np.float32)\n            depth = (depth - depth.min()) / (depth.max() - depth.min() + 1e-6)\n            return np.expand_dims(depth, -1).repeat(3, -1)\n\n    \n    def test_step(self):\n\n        if self.need_update or self.spp < self.opt.max_spp:\n        \n            starter, ender = torch.cuda.Event(enable_timing=True), torch.cuda.Event(enable_timing=True)\n            starter.record()\n\n            outputs = self.trainer.test_gui(self.cam.pose, self.cam.intrinsics, self.cam.mvp, self.W, self.H, self.bg_color, self.spp, self.downscale, self.light_dir, self.ambient_ratio, self.shading)\n\n            ender.record()\n            torch.cuda.synchronize()\n            t = starter.elapsed_time(ender)\n\n            # update dynamic resolution\n            if self.dynamic_resolution:\n                # max allowed infer time per-frame is 200 ms\n                full_t = t / (self.downscale ** 2)\n                downscale = min(1, max(1/4, math.sqrt(200 / full_t)))\n                if downscale > self.downscale * 1.2 or downscale < self.downscale * 0.8:\n                    self.downscale = downscale\n\n            if self.need_update:\n                self.render_buffer = self.prepare_buffer(outputs)\n                self.spp = 1\n                self.need_update = False\n            else:\n                self.render_buffer = (self.render_buffer * self.spp + self.prepare_buffer(outputs)) / (self.spp + 1)\n                self.spp += 1\n\n            dpg.set_value(\"_log_infer_time\", f'{t:.4f}ms ({int(1000/t)} FPS)')\n            dpg.set_value(\"_log_resolution\", f'{int(self.downscale * self.W)}x{int(self.downscale * self.H)}')\n            dpg.set_value(\"_log_spp\", self.spp)\n            dpg.set_value(\"_texture\", self.render_buffer)\n\n        \n    def register_dpg(self):\n\n        ### register texture \n\n        with dpg.texture_registry(show=False):\n            dpg.add_raw_texture(self.W, self.H, self.render_buffer, format=dpg.mvFormat_Float_rgb, tag=\"_texture\")\n\n        ### register window\n\n        # the rendered image, as the primary window\n        with dpg.window(tag=\"_primary_window\", width=self.W, height=self.H):\n\n            # add the texture\n            dpg.add_image(\"_texture\")\n\n        dpg.set_primary_window(\"_primary_window\", True)\n\n        # control window\n        with dpg.window(label=\"Control\", tag=\"_control_window\", width=400, height=300):\n\n            # text prompt\n            if self.opt.text is not None:\n                dpg.add_text(\"text: \" + self.opt.text, tag=\"_log_prompt_text\")\n            \n            if self.opt.negative != '':\n                dpg.add_text(\"negative text: \" + self.opt.negative, tag=\"_log_prompt_negative_text\")\n\n            # button theme\n            with dpg.theme() as theme_button:\n                with dpg.theme_component(dpg.mvButton):\n                    dpg.add_theme_color(dpg.mvThemeCol_Button, (23, 3, 18))\n                    dpg.add_theme_color(dpg.mvThemeCol_ButtonHovered, (51, 3, 47))\n                    dpg.add_theme_color(dpg.mvThemeCol_ButtonActive, (83, 18, 83))\n                    dpg.add_theme_style(dpg.mvStyleVar_FrameRounding, 5)\n                    dpg.add_theme_style(dpg.mvStyleVar_FramePadding, 3, 3)\n\n            # time\n            if not self.opt.test:\n                with dpg.group(horizontal=True):\n                    dpg.add_text(\"Train time: \")\n                    dpg.add_text(\"no data\", tag=\"_log_train_time\")                    \n\n            with dpg.group(horizontal=True):\n                dpg.add_text(\"Infer time: \")\n                dpg.add_text(\"no data\", tag=\"_log_infer_time\")\n            \n            with dpg.group(horizontal=True):\n                dpg.add_text(\"SPP: \")\n                dpg.add_text(\"1\", tag=\"_log_spp\")\n\n            # train button\n            if not self.opt.test:\n                with dpg.collapsing_header(label=\"Train\", default_open=True):\n                    with dpg.group(horizontal=True):\n                        dpg.add_text(\"Train: \")\n\n                        def callback_train(sender, app_data):\n                            if self.training:\n                                self.training = False\n                                dpg.configure_item(\"_button_train\", label=\"start\")\n                            else:\n                                self.training = True\n                                dpg.configure_item(\"_button_train\", label=\"stop\")\n\n                        dpg.add_button(label=\"start\", tag=\"_button_train\", callback=callback_train)\n                        dpg.bind_item_theme(\"_button_train\", theme_button)\n\n                        def callback_reset(sender, app_data):\n                            @torch.no_grad()\n                            def weight_reset(m: nn.Module):\n                                reset_parameters = getattr(m, \"reset_parameters\", None)\n                                if callable(reset_parameters):\n                                    m.reset_parameters()\n                            self.trainer.model.apply(fn=weight_reset)\n                            self.trainer.model.reset_extra_state() # for cuda_ray density_grid and step_counter\n                            self.need_update = True\n\n                        dpg.add_button(label=\"reset\", tag=\"_button_reset\", callback=callback_reset)\n                        dpg.bind_item_theme(\"_button_reset\", theme_button)\n\n\n                    with dpg.group(horizontal=True):\n                        dpg.add_text(\"Checkpoint: \")\n\n                        def callback_save(sender, app_data):\n                            self.trainer.save_checkpoint(full=True, best=False)\n                            dpg.set_value(\"_log_ckpt\", \"saved \" + os.path.basename(self.trainer.stats[\"checkpoints\"][-1]))\n                            self.trainer.epoch += 1 # use epoch to indicate different calls.\n\n                        dpg.add_button(label=\"save\", tag=\"_button_save\", callback=callback_save)\n                        dpg.bind_item_theme(\"_button_save\", theme_button)\n\n                        dpg.add_text(\"\", tag=\"_log_ckpt\")\n\n                    # save mesh\n                    with dpg.group(horizontal=True):\n                        dpg.add_text(\"Marching Cubes: \")\n\n                        def callback_mesh(sender, app_data):\n                            self.trainer.save_mesh()\n                            dpg.set_value(\"_log_mesh\", \"saved \" + f'{self.trainer.name}_{self.trainer.epoch}.ply')\n                            self.trainer.epoch += 1 # use epoch to indicate different calls.\n\n                        dpg.add_button(label=\"mesh\", tag=\"_button_mesh\", callback=callback_mesh)\n                        dpg.bind_item_theme(\"_button_mesh\", theme_button)\n\n                        dpg.add_text(\"\", tag=\"_log_mesh\")                        \n\n                    with dpg.group(horizontal=True):\n                        dpg.add_text(\"\", tag=\"_log_train_log\")\n\n            \n            # rendering options\n            with dpg.collapsing_header(label=\"Options\", default_open=True):\n\n                # dynamic rendering resolution\n                with dpg.group(horizontal=True):\n\n                    def callback_set_dynamic_resolution(sender, app_data):\n                        if self.dynamic_resolution:\n                            self.dynamic_resolution = False\n                            self.downscale = 1\n                        else:\n                            self.dynamic_resolution = True\n                        self.need_update = True\n\n                    dpg.add_checkbox(label=\"dynamic resolution\", default_value=self.dynamic_resolution, callback=callback_set_dynamic_resolution)\n                    dpg.add_text(f\"{self.W}x{self.H}\", tag=\"_log_resolution\")\n\n                # mode combo\n                def callback_change_mode(sender, app_data):\n                    self.mode = app_data\n                    self.need_update = True\n                \n                dpg.add_combo(('image', 'depth'), label='mode', default_value=self.mode, callback=callback_change_mode)\n\n                # bg_color picker\n                def callback_change_bg(sender, app_data):\n                    self.bg_color = torch.tensor(app_data[:3], dtype=torch.float32) # only need RGB in [0, 1]\n                    self.need_update = True\n\n                dpg.add_color_edit((255, 255, 255), label=\"Background Color\", width=200, tag=\"_color_editor\", no_alpha=True, callback=callback_change_bg)\n\n                # fov slider\n                def callback_set_fovy(sender, app_data):\n                    self.cam.fovy = app_data\n                    self.need_update = True\n\n                dpg.add_slider_int(label=\"FoV (vertical)\", min_value=1, max_value=120, format=\"%d deg\", default_value=self.cam.fovy, callback=callback_set_fovy)\n\n                # dt_gamma slider\n                def callback_set_dt_gamma(sender, app_data):\n                    self.opt.dt_gamma = app_data\n                    self.need_update = True\n\n                dpg.add_slider_float(label=\"dt_gamma\", min_value=0, max_value=0.1, format=\"%.5f\", default_value=self.opt.dt_gamma, callback=callback_set_dt_gamma)\n\n                # max_steps slider\n                def callback_set_max_steps(sender, app_data):\n                    self.opt.max_steps = app_data\n                    self.need_update = True\n\n                dpg.add_slider_int(label=\"max steps\", min_value=1, max_value=1024, format=\"%d\", default_value=self.opt.max_steps, callback=callback_set_max_steps)\n\n                # aabb slider\n                def callback_set_aabb(sender, app_data, user_data):\n                    # user_data is the dimension for aabb (xmin, ymin, zmin, xmax, ymax, zmax)\n                    self.trainer.model.aabb_infer[user_data] = app_data\n\n                    # also change train aabb ? [better not...]\n                    #self.trainer.model.aabb_train[user_data] = app_data\n\n                    self.need_update = True\n\n                dpg.add_separator()\n                dpg.add_text(\"Axis-aligned bounding box:\")\n\n                with dpg.group(horizontal=True):\n                    dpg.add_slider_float(label=\"x\", width=150, min_value=-self.opt.bound, max_value=0, format=\"%.2f\", default_value=-self.opt.bound, callback=callback_set_aabb, user_data=0)\n                    dpg.add_slider_float(label=\"\", width=150, min_value=0, max_value=self.opt.bound, format=\"%.2f\", default_value=self.opt.bound, callback=callback_set_aabb, user_data=3)\n\n                with dpg.group(horizontal=True):\n                    dpg.add_slider_float(label=\"y\", width=150, min_value=-self.opt.bound, max_value=0, format=\"%.2f\", default_value=-self.opt.bound, callback=callback_set_aabb, user_data=1)\n                    dpg.add_slider_float(label=\"\", width=150, min_value=0, max_value=self.opt.bound, format=\"%.2f\", default_value=self.opt.bound, callback=callback_set_aabb, user_data=4)\n\n                with dpg.group(horizontal=True):\n                    dpg.add_slider_float(label=\"z\", width=150, min_value=-self.opt.bound, max_value=0, format=\"%.2f\", default_value=-self.opt.bound, callback=callback_set_aabb, user_data=2)\n                    dpg.add_slider_float(label=\"\", width=150, min_value=0, max_value=self.opt.bound, format=\"%.2f\", default_value=self.opt.bound, callback=callback_set_aabb, user_data=5)\n\n                # light dir\n                def callback_set_light_dir(sender, app_data, user_data):\n                    self.light_dir[user_data] = app_data\n                    self.need_update = True\n\n                dpg.add_separator()\n                dpg.add_text(\"Plane Light Direction:\")\n\n                with dpg.group(horizontal=True):\n                    dpg.add_slider_float(label=\"theta\", min_value=0, max_value=180, format=\"%.2f\", default_value=self.opt.light_theta, callback=callback_set_light_dir, user_data=0)\n\n                with dpg.group(horizontal=True):\n                    dpg.add_slider_float(label=\"phi\", min_value=0, max_value=360, format=\"%.2f\", default_value=self.opt.light_phi, callback=callback_set_light_dir, user_data=1)\n\n                # ambient ratio\n                def callback_set_abm_ratio(sender, app_data):\n                    self.ambient_ratio = app_data\n                    self.need_update = True\n\n                dpg.add_slider_float(label=\"ambient\", min_value=0, max_value=1.0, format=\"%.5f\", default_value=self.ambient_ratio, callback=callback_set_abm_ratio)\n\n                # shading mode\n                def callback_change_shading(sender, app_data):\n                    self.shading = app_data\n                    self.need_update = True\n                \n                dpg.add_combo(('albedo', 'lambertian', 'textureless', 'normal'), label='shading', default_value=self.shading, callback=callback_change_shading)\n\n\n            # debug info\n            if self.debug:\n                with dpg.collapsing_header(label=\"Debug\"):\n                    # pose\n                    dpg.add_separator()\n                    dpg.add_text(\"Camera Pose:\")\n                    dpg.add_text(str(self.cam.pose), tag=\"_log_pose\")\n\n\n        ### register camera handler\n\n        def callback_camera_drag_rotate(sender, app_data):\n\n            if not dpg.is_item_focused(\"_primary_window\"):\n                return\n\n            dx = app_data[1]\n            dy = app_data[2]\n\n            self.cam.orbit(dx, dy)\n            self.need_update = True\n\n            if self.debug:\n                dpg.set_value(\"_log_pose\", str(self.cam.pose))\n\n\n        def callback_camera_wheel_scale(sender, app_data):\n\n            if not dpg.is_item_focused(\"_primary_window\"):\n                return\n\n            delta = app_data\n\n            self.cam.scale(delta)\n            self.need_update = True\n\n            if self.debug:\n                dpg.set_value(\"_log_pose\", str(self.cam.pose))\n\n\n        def callback_camera_drag_pan(sender, app_data):\n\n            if not dpg.is_item_focused(\"_primary_window\"):\n                return\n\n            dx = app_data[1]\n            dy = app_data[2]\n\n            self.cam.pan(dx, dy)\n            self.need_update = True\n\n            if self.debug:\n                dpg.set_value(\"_log_pose\", str(self.cam.pose))\n\n\n        with dpg.handler_registry():\n            dpg.add_mouse_drag_handler(button=dpg.mvMouseButton_Left, callback=callback_camera_drag_rotate)\n            dpg.add_mouse_wheel_handler(callback=callback_camera_wheel_scale)\n            dpg.add_mouse_drag_handler(button=dpg.mvMouseButton_Right, callback=callback_camera_drag_pan)\n\n        \n        dpg.create_viewport(title='torch-ngp', width=self.W, height=self.H, resizable=False)\n        \n        # TODO: seems dearpygui doesn't support resizing texture...\n        # def callback_resize(sender, app_data):\n        #     self.W = app_data[0]\n        #     self.H = app_data[1]\n        #     # how to reload texture ???\n\n        # dpg.set_viewport_resize_callback(callback_resize)\n\n        ### global theme\n        with dpg.theme() as theme_no_padding:\n            with dpg.theme_component(dpg.mvAll):\n                # set all padding to 0 to avoid scroll bar\n                dpg.add_theme_style(dpg.mvStyleVar_WindowPadding, 0, 0, category=dpg.mvThemeCat_Core)\n                dpg.add_theme_style(dpg.mvStyleVar_FramePadding, 0, 0, category=dpg.mvThemeCat_Core)\n                dpg.add_theme_style(dpg.mvStyleVar_CellPadding, 0, 0, category=dpg.mvThemeCat_Core)\n        \n        dpg.bind_item_theme(\"_primary_window\", theme_no_padding)\n\n        dpg.setup_dearpygui()\n\n        #dpg.show_metrics()\n\n        dpg.show_viewport()\n\n\n    def render(self):\n\n        while dpg.is_dearpygui_running():\n            # update texture every frame\n            if self.training:\n                self.train_step()\n            self.test_step()\n            dpg.render_dearpygui_frame()"
  },
  {
    "path": "stable-dreamfusion/nerf/network.py",
    "content": "import torch\nimport torch.nn as nn\nimport torch.nn.functional as F\n\nfrom activation import trunc_exp\nfrom .renderer import NeRFRenderer\n\nimport numpy as np\nfrom encoding import get_encoder\n\nfrom .utils import safe_normalize\n\n# TODO: not sure about the details...\nclass ResBlock(nn.Module):\n    def __init__(self, dim_in, dim_out, bias=True):\n        super().__init__()\n        self.dim_in = dim_in\n        self.dim_out = dim_out\n\n        self.dense = nn.Linear(self.dim_in, self.dim_out, bias=bias)\n        self.norm = nn.LayerNorm(self.dim_out)\n        self.activation = nn.SiLU(inplace=True)\n\n        if self.dim_in != self.dim_out:\n            self.skip = nn.Linear(self.dim_in, self.dim_out, bias=False)\n        else:\n            self.skip = None\n\n    def forward(self, x):\n        # x: [B, C]\n        identity = x\n\n        out = self.dense(x)\n        out = self.norm(out)\n\n        if self.skip is not None:\n            identity = self.skip(identity)\n\n        out += identity\n        out = self.activation(out)\n\n        return out\n\nclass BasicBlock(nn.Module):\n    def __init__(self, dim_in, dim_out, bias=True):\n        super().__init__()\n        self.dim_in = dim_in\n        self.dim_out = dim_out\n\n        self.dense = nn.Linear(self.dim_in, self.dim_out, bias=bias)\n        self.activation = nn.ReLU(inplace=True)\n\n    def forward(self, x):\n        # x: [B, C]\n\n        out = self.dense(x)\n        out = self.activation(out)\n\n        return out    \n\nclass MLP(nn.Module):\n    def __init__(self, dim_in, dim_out, dim_hidden, num_layers, bias=True, block=BasicBlock):\n        super().__init__()\n        self.dim_in = dim_in\n        self.dim_out = dim_out\n        self.dim_hidden = dim_hidden\n        self.num_layers = num_layers\n\n        net = []\n        for l in range(num_layers):\n            if l == 0:\n                net.append(BasicBlock(self.dim_in, self.dim_hidden, bias=bias))\n            elif l != num_layers - 1:\n                net.append(block(self.dim_hidden, self.dim_hidden, bias=bias))\n            else:\n                net.append(nn.Linear(self.dim_hidden, self.dim_out, bias=bias))\n\n        self.net = nn.ModuleList(net)\n        \n    \n    def forward(self, x):\n\n        for l in range(self.num_layers):\n            x = self.net[l](x)\n            \n        return x\n\n\nclass NeRFNetwork(NeRFRenderer):\n    def __init__(self, \n                 opt,\n                 num_layers=5, # 5 in paper\n                 hidden_dim=64, # 128 in paper\n                 num_layers_bg=2, # 3 in paper\n                 hidden_dim_bg=32, # 64 in paper\n                 encoding='frequency_torch', # pure pytorch\n                 ):\n        \n        super().__init__(opt)\n\n        self.num_layers = num_layers\n        self.hidden_dim = hidden_dim\n        self.encoder, self.in_dim = get_encoder(encoding, input_dim=3, multires=12)\n        self.sigma_net = MLP(self.in_dim, 4, hidden_dim, num_layers, bias=True, block=ResBlock)\n\n        self.density_activation = trunc_exp if self.opt.density_activation == 'exp' else F.softplus\n\n        # background network\n        if self.opt.bg_radius > 0:\n            self.num_layers_bg = num_layers_bg   \n            self.hidden_dim_bg = hidden_dim_bg\n            self.encoder_bg, self.in_dim_bg = get_encoder(encoding, input_dim=3, multires=4)\n            self.bg_net = MLP(self.in_dim_bg, 3, hidden_dim_bg, num_layers_bg, bias=True)\n            \n        else:\n            self.bg_net = None\n\n    def common_forward(self, x):\n        # x: [N, 3], in [-bound, bound]\n\n        # sigma\n        enc = self.encoder(x, bound=self.bound, max_level=self.max_level)\n\n        h = self.sigma_net(enc)\n\n        sigma = self.density_activation(h[..., 0] + self.density_blob(x))\n        albedo = torch.sigmoid(h[..., 1:])\n\n        return sigma, albedo\n    \n    # ref: https://github.com/zhaofuq/Instant-NSR/blob/main/nerf/network_sdf.py#L192\n    def finite_difference_normal(self, x, epsilon=1e-2):\n        # x: [N, 3]\n        dx_pos, _ = self.common_forward((x + torch.tensor([[epsilon, 0.00, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dx_neg, _ = self.common_forward((x + torch.tensor([[-epsilon, 0.00, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dy_pos, _ = self.common_forward((x + torch.tensor([[0.00, epsilon, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dy_neg, _ = self.common_forward((x + torch.tensor([[0.00, -epsilon, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dz_pos, _ = self.common_forward((x + torch.tensor([[0.00, 0.00, epsilon]], device=x.device)).clamp(-self.bound, self.bound))\n        dz_neg, _ = self.common_forward((x + torch.tensor([[0.00, 0.00, -epsilon]], device=x.device)).clamp(-self.bound, self.bound))\n        \n        normal = torch.stack([\n            0.5 * (dx_pos - dx_neg) / epsilon, \n            0.5 * (dy_pos - dy_neg) / epsilon, \n            0.5 * (dz_pos - dz_neg) / epsilon\n        ], dim=-1)\n\n        return -normal\n    \n    def normal(self, x):\n    \n        with torch.enable_grad():\n            with torch.cuda.amp.autocast(enabled=False):\n                x.requires_grad_(True)\n                sigma, albedo = self.common_forward(x)\n                # query gradient\n                normal = - torch.autograd.grad(torch.sum(sigma), x, create_graph=True)[0] # [N, 3]\n        \n        # normal = self.finite_difference_normal(x)\n        normal = safe_normalize(normal)\n        normal = torch.nan_to_num(normal)\n\n        return normal\n        \n    def forward(self, x, d, l=None, ratio=1, shading='albedo'):\n        # x: [N, 3], in [-bound, bound]\n        # d: [N, 3], view direction, nomalized in [-1, 1]\n        # l: [3], plane light direction, nomalized in [-1, 1]\n        # ratio: scalar, ambient ratio, 1 == no shading (albedo only), 0 == only shading (textureless)\n\n        if shading == 'albedo':\n            # no need to query normal\n            sigma, color = self.common_forward(x)\n            normal = None\n        \n        else:\n            # query normal\n\n            # sigma, albedo = self.common_forward(x)\n            # normal = self.normal(x)\n        \n            with torch.enable_grad():\n                with torch.cuda.amp.autocast(enabled=False):\n                    x.requires_grad_(True)\n                    sigma, albedo = self.common_forward(x)\n                    # query gradient\n                    normal = - torch.autograd.grad(torch.sum(sigma), x, create_graph=True)[0] # [N, 3]\n            normal = safe_normalize(normal)\n            normal = torch.nan_to_num(normal)\n\n            # lambertian shading\n            lambertian = ratio + (1 - ratio) * (normal * l).sum(-1).clamp(min=0) # [N,]\n\n            if shading == 'textureless':\n                color = lambertian.unsqueeze(-1).repeat(1, 3)\n            elif shading == 'normal':\n                color = (normal + 1) / 2\n            else: # 'lambertian'\n                color = albedo * lambertian.unsqueeze(-1)\n            \n        return sigma, color, normal\n\n      \n    def density(self, x):\n        # x: [N, 3], in [-bound, bound]\n        \n        sigma, albedo = self.common_forward(x)\n        \n        return {\n            'sigma': sigma,\n            'albedo': albedo,\n        }\n\n\n    def background(self, d):\n\n        h = self.encoder_bg(d) # [N, C]\n        \n        h = self.bg_net(h)\n\n        # sigmoid activation for rgb\n        rgbs = torch.sigmoid(h)\n\n        return rgbs\n\n    # optimizer utils\n    def get_params(self, lr):\n\n        params = [\n            # {'params': self.encoder.parameters(), 'lr': lr * 10},\n            {'params': self.sigma_net.parameters(), 'lr': lr},\n        ]        \n\n        if self.opt.bg_radius > 0:\n            # params.append({'params': self.encoder_bg.parameters(), 'lr': lr * 10})\n            params.append({'params': self.bg_net.parameters(), 'lr': lr})\n        \n        if self.opt.dmtet and not self.opt.lock_geo:\n            params.append({'params': self.sdf, 'lr': lr})\n            params.append({'params': self.deform, 'lr': lr})\n\n        return params"
  },
  {
    "path": "stable-dreamfusion/nerf/network_grid.py",
    "content": "import torch\nimport torch.nn as nn\nimport torch.nn.functional as F\n\nfrom activation import trunc_exp, biased_softplus\nfrom .renderer import NeRFRenderer\n\nimport numpy as np\nfrom encoding import get_encoder\n\nfrom .utils import safe_normalize\n\nclass MLP(nn.Module):\n    def __init__(self, dim_in, dim_out, dim_hidden, num_layers, bias=True):\n        super().__init__()\n        self.dim_in = dim_in\n        self.dim_out = dim_out\n        self.dim_hidden = dim_hidden\n        self.num_layers = num_layers\n\n        net = []\n        for l in range(num_layers):\n            net.append(nn.Linear(self.dim_in if l == 0 else self.dim_hidden, self.dim_out if l == num_layers - 1 else self.dim_hidden, bias=bias))\n\n        self.net = nn.ModuleList(net)\n    \n    def forward(self, x):\n        for l in range(self.num_layers):\n            x = self.net[l](x)\n            if l != self.num_layers - 1:\n                x = F.relu(x, inplace=True)\n        return x\n\n\nclass NeRFNetwork(NeRFRenderer):\n    def __init__(self, \n                 opt,\n                 num_layers=3,\n                 hidden_dim=64,\n                 num_layers_bg=2,\n                 hidden_dim_bg=32,\n                 ):\n        \n        super().__init__(opt)\n\n        self.num_layers = num_layers\n        self.hidden_dim = hidden_dim\n\n        self.encoder, self.in_dim = get_encoder('hashgrid', input_dim=3, log2_hashmap_size=19, desired_resolution=2048 * self.bound, interpolation='smoothstep')\n\n        self.sigma_net = MLP(self.in_dim, 4, hidden_dim, num_layers, bias=True)\n        # self.normal_net = MLP(self.in_dim, 3, hidden_dim, num_layers, bias=True)\n\n        self.density_activation = trunc_exp if self.opt.density_activation == 'exp' else biased_softplus\n\n        # background network\n        if self.opt.bg_radius > 0:\n            self.num_layers_bg = num_layers_bg   \n            self.hidden_dim_bg = hidden_dim_bg\n            \n            # use a very simple network to avoid it learning the prompt...\n            self.encoder_bg, self.in_dim_bg = get_encoder('frequency', input_dim=3, multires=6)\n            self.bg_net = MLP(self.in_dim_bg, 3, hidden_dim_bg, num_layers_bg, bias=True)\n            \n        else:\n            self.bg_net = None\n\n    def common_forward(self, x):\n\n        # sigma\n        enc = self.encoder(x, bound=self.bound, max_level=self.max_level)\n\n        h = self.sigma_net(enc)\n\n        sigma = self.density_activation(h[..., 0] + self.density_blob(x))\n        albedo = torch.sigmoid(h[..., 1:])\n\n        return sigma, albedo\n    \n    # ref: https://github.com/zhaofuq/Instant-NSR/blob/main/nerf/network_sdf.py#L192\n    def finite_difference_normal(self, x, epsilon=1e-2):\n        # x: [N, 3]\n        dx_pos, _ = self.common_forward((x + torch.tensor([[epsilon, 0.00, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dx_neg, _ = self.common_forward((x + torch.tensor([[-epsilon, 0.00, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dy_pos, _ = self.common_forward((x + torch.tensor([[0.00, epsilon, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dy_neg, _ = self.common_forward((x + torch.tensor([[0.00, -epsilon, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dz_pos, _ = self.common_forward((x + torch.tensor([[0.00, 0.00, epsilon]], device=x.device)).clamp(-self.bound, self.bound))\n        dz_neg, _ = self.common_forward((x + torch.tensor([[0.00, 0.00, -epsilon]], device=x.device)).clamp(-self.bound, self.bound))\n        \n        normal = torch.stack([\n            0.5 * (dx_pos - dx_neg) / epsilon, \n            0.5 * (dy_pos - dy_neg) / epsilon, \n            0.5 * (dz_pos - dz_neg) / epsilon\n        ], dim=-1)\n\n        return -normal\n\n    def normal(self, x):\n        normal = self.finite_difference_normal(x)\n        normal = safe_normalize(normal)\n        normal = torch.nan_to_num(normal)\n        return normal\n    \n    def forward(self, x, d, l=None, ratio=1, shading='albedo'):\n        # x: [N, 3], in [-bound, bound]\n        # d: [N, 3], view direction, nomalized in [-1, 1]\n        # l: [3], plane light direction, nomalized in [-1, 1]\n        # ratio: scalar, ambient ratio, 1 == no shading (albedo only), 0 == only shading (textureless)\n\n        sigma, albedo = self.common_forward(x)\n\n        if shading == 'albedo':\n            normal = None\n            color = albedo\n        \n        else: # lambertian shading\n\n            # normal = self.normal_net(enc)\n            normal = self.normal(x)\n\n            lambertian = ratio + (1 - ratio) * (normal * l).sum(-1).clamp(min=0) # [N,]\n\n            if shading == 'textureless':\n                color = lambertian.unsqueeze(-1).repeat(1, 3)\n            elif shading == 'normal':\n                color = (normal + 1) / 2\n            else: # 'lambertian'\n                color = albedo * lambertian.unsqueeze(-1)\n            \n        return sigma, color, normal\n\n      \n    def density(self, x):\n        # x: [N, 3], in [-bound, bound]\n        \n        sigma, albedo = self.common_forward(x)\n        \n        return {\n            'sigma': sigma,\n            'albedo': albedo,\n        }\n\n\n    def background(self, d):\n\n        h = self.encoder_bg(d) # [N, C]\n        \n        h = self.bg_net(h)\n\n        # sigmoid activation for rgb\n        rgbs = torch.sigmoid(h)\n\n        return rgbs\n\n    # optimizer utils\n    def get_params(self, lr):\n\n        params = [\n            {'params': self.encoder.parameters(), 'lr': lr * 10},\n            {'params': self.sigma_net.parameters(), 'lr': lr},\n            # {'params': self.normal_net.parameters(), 'lr': lr},\n        ]        \n\n        if self.opt.bg_radius > 0:\n            # params.append({'params': self.encoder_bg.parameters(), 'lr': lr * 10})\n            params.append({'params': self.bg_net.parameters(), 'lr': lr})\n        \n        if self.opt.dmtet and not self.opt.lock_geo:\n            params.append({'params': self.sdf, 'lr': lr})\n            params.append({'params': self.deform, 'lr': lr})\n\n        return params"
  },
  {
    "path": "stable-dreamfusion/nerf/network_grid_taichi.py",
    "content": "import torch\nimport torch.nn as nn\nimport torch.nn.functional as F\n\nfrom activation import trunc_exp\nfrom .renderer import NeRFRenderer\n\nimport numpy as np\nfrom encoding import get_encoder\n\nfrom .utils import safe_normalize\n\nclass MLP(nn.Module):\n    def __init__(self, dim_in, dim_out, dim_hidden, num_layers, bias=True):\n        super().__init__()\n        self.dim_in = dim_in\n        self.dim_out = dim_out\n        self.dim_hidden = dim_hidden\n        self.num_layers = num_layers\n\n        net = []\n        for l in range(num_layers):\n            net.append(nn.Linear(self.dim_in if l == 0 else self.dim_hidden, self.dim_out if l == num_layers - 1 else self.dim_hidden, bias=bias))\n\n        self.net = nn.ModuleList(net)\n    \n    def forward(self, x):\n        for l in range(self.num_layers):\n            x = self.net[l](x)\n            if l != self.num_layers - 1:\n                x = F.relu(x, inplace=True)\n        return x\n\n\nclass NeRFNetwork(NeRFRenderer):\n    def __init__(self, \n                 opt,\n                 num_layers=2,\n                 hidden_dim=32,\n                 num_layers_bg=2,\n                 hidden_dim_bg=16,\n                 ):\n        \n        super().__init__(opt)\n\n        self.num_layers = num_layers\n        self.hidden_dim = hidden_dim\n\n        self.encoder, self.in_dim = get_encoder('hashgrid_taichi', input_dim=3, log2_hashmap_size=19, desired_resolution=2048 * self.bound, interpolation='smoothstep')\n\n        self.sigma_net = MLP(self.in_dim, 4, hidden_dim, num_layers, bias=True)\n        # self.normal_net = MLP(self.in_dim, 3, hidden_dim, num_layers, bias=True)\n\n        self.density_activation = trunc_exp if self.opt.density_activation == 'exp' else F.softplus\n\n        # background network\n        if self.opt.bg_radius > 0:\n            self.num_layers_bg = num_layers_bg\n            self.hidden_dim_bg = hidden_dim_bg\n            # use a very simple network to avoid it learning the prompt...\n            self.encoder_bg, self.in_dim_bg = get_encoder('frequency_torch', input_dim=3, multires=4) # TODO: freq encoder can be replaced by a Taichi implementation\n            self.bg_net = MLP(self.in_dim_bg, 3, hidden_dim_bg, num_layers_bg, bias=True)\n            \n        else:\n            self.bg_net = None\n\n    def common_forward(self, x):\n\n        # sigma\n        enc = self.encoder(x, bound=self.bound)\n\n        h = self.sigma_net(enc)\n\n        sigma = self.density_activation(h[..., 0] + self.density_blob(x))\n        albedo = torch.sigmoid(h[..., 1:])\n\n        return sigma, albedo\n    \n    # ref: https://github.com/zhaofuq/Instant-NSR/blob/main/nerf/network_sdf.py#L192\n    def finite_difference_normal(self, x, epsilon=1e-2):\n        # x: [N, 3]\n        dx_pos, _ = self.common_forward((x + torch.tensor([[epsilon, 0.00, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dx_neg, _ = self.common_forward((x + torch.tensor([[-epsilon, 0.00, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dy_pos, _ = self.common_forward((x + torch.tensor([[0.00, epsilon, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dy_neg, _ = self.common_forward((x + torch.tensor([[0.00, -epsilon, 0.00]], device=x.device)).clamp(-self.bound, self.bound))\n        dz_pos, _ = self.common_forward((x + torch.tensor([[0.00, 0.00, epsilon]], device=x.device)).clamp(-self.bound, self.bound))\n        dz_neg, _ = self.common_forward((x + torch.tensor([[0.00, 0.00, -epsilon]], device=x.device)).clamp(-self.bound, self.bound))\n        \n        normal = torch.stack([\n            0.5 * (dx_pos - dx_neg) / epsilon, \n            0.5 * (dy_pos - dy_neg) / epsilon, \n            0.5 * (dz_pos - dz_neg) / epsilon\n        ], dim=-1)\n\n        return -normal\n    \n    def normal(self, x):\n        normal = self.finite_difference_normal(x)\n        normal = safe_normalize(normal)\n        normal = torch.nan_to_num(normal)\n        return normal\n    \n    def forward(self, x, d, l=None, ratio=1, shading='albedo'):\n        # x: [N, 3], in [-bound, bound]\n        # d: [N, 3], view direction, nomalized in [-1, 1]\n        # l: [3], plane light direction, nomalized in [-1, 1]\n        # ratio: scalar, ambient ratio, 1 == no shading (albedo only), 0 == only shading (textureless)\n\n        sigma, albedo = self.common_forward(x)\n\n        if shading == 'albedo':\n            normal = None\n            color = albedo\n        \n        else: # lambertian shading\n            # normal = self.normal_net(enc)\n            normal = self.normal(x)\n\n            lambertian = ratio + (1 - ratio) * (normal * l).sum(-1).clamp(min=0) # [N,]\n\n            if shading == 'textureless':\n                color = lambertian.unsqueeze(-1).repeat(1, 3)\n            elif shading == 'normal':\n                color = (normal + 1) / 2\n            else: # 'lambertian'\n                color = albedo * lambertian.unsqueeze(-1)\n            \n        return sigma, color, normal\n\n      \n    def density(self, x):\n        # x: [N, 3], in [-bound, bound]\n        \n        sigma, albedo = self.common_forward(x)\n        \n        return {\n            'sigma': sigma,\n            'albedo': albedo,\n        }\n\n\n    def background(self, d):\n\n        h = self.encoder_bg(d) # [N, C]\n        \n        h = self.bg_net(h)\n\n        # sigmoid activation for rgb\n        rgbs = torch.sigmoid(h)\n\n        return rgbs\n\n    # optimizer utils\n    def get_params(self, lr):\n\n        params = [\n            {'params': self.encoder.parameters(), 'lr': lr * 10},\n            {'params': self.sigma_net.parameters(), 'lr': lr},\n            # {'params': self.normal_net.parameters(), 'lr': lr},\n        ]        \n\n        if self.opt.bg_radius > 0:\n            # params.append({'params': self.encoder_bg.parameters(), 'lr': lr * 10})\n            params.append({'params': self.bg_net.parameters(), 'lr': lr})\n        \n        if self.opt.dmtet and not self.opt.lock_geo:\n            params.append({'params': self.sdf, 'lr': lr})\n            params.append({'params': self.deform, 'lr': lr})\n\n        return params"
  },
  {
    "path": "stable-dreamfusion/nerf/network_grid_tcnn.py",
    "content": "import torch\nimport torch.nn as nn\nimport torch.nn.functional as F\n\nfrom activation import trunc_exp, biased_softplus\nfrom .renderer import NeRFRenderer\n\nimport numpy as np\nfrom encoding import get_encoder\n\nfrom .utils import safe_normalize\n\nimport tinycudann as tcnn\n\nclass MLP(nn.Module):\n    def __init__(self, dim_in, dim_out, dim_hidden, num_layers, bias=True):\n        super().__init__()\n        self.dim_in = dim_in\n        self.dim_out = dim_out\n        self.dim_hidden = dim_hidden\n        self.num_layers = num_layers\n\n        net = []\n        for l in range(num_layers):\n            net.append(nn.Linear(self.dim_in if l == 0 else self.dim_hidden, self.dim_out if l == num_layers - 1 else self.dim_hidden, bias=bias))\n\n        self.net = nn.ModuleList(net)\n    \n    def forward(self, x):\n        for l in range(self.num_layers):\n            x = self.net[l](x)\n            if l != self.num_layers - 1:\n                x = F.relu(x, inplace=True)\n        return x\n\n\nclass NeRFNetwork(NeRFRenderer):\n    def __init__(self, \n                 opt,\n                 num_layers=3,\n                 hidden_dim=64,\n                 num_layers_bg=2,\n                 hidden_dim_bg=32,\n                 ):\n        \n        super().__init__(opt)\n\n        self.num_layers = num_layers\n        self.hidden_dim = hidden_dim\n\n        self.encoder = tcnn.Encoding(\n            n_input_dims=3,\n            encoding_config={\n                \"otype\": \"HashGrid\",\n                \"n_levels\": 16,\n                \"n_features_per_level\": 2,\n                \"log2_hashmap_size\": 19,\n                \"base_resolution\": 16,\n                \"interpolation\": \"Smoothstep\",\n                \"per_level_scale\": np.exp2(np.log2(2048 * self.bound / 16) / (16 - 1)),\n            },\n            dtype=torch.float32, # ENHANCE: default float16 seems unstable...\n        )\n        self.in_dim = self.encoder.n_output_dims\n        # use torch MLP, as tcnn MLP doesn't impl second-order derivative\n        self.sigma_net = MLP(self.in_dim, 4, hidden_dim, num_layers, bias=True)\n\n        self.density_activation = trunc_exp if self.opt.density_activation == 'exp' else biased_softplus\n\n        # background network\n        if self.opt.bg_radius > 0:\n            self.num_layers_bg = num_layers_bg   \n            self.hidden_dim_bg = hidden_dim_bg\n            \n            # use a very simple network to avoid it learning the prompt...\n            self.encoder_bg, self.in_dim_bg = get_encoder('frequency', input_dim=3, multires=6)\n            self.bg_net = MLP(self.in_dim_bg, 3, hidden_dim_bg, num_layers_bg, bias=True)\n            \n        else:\n            self.bg_net = None\n\n    def common_forward(self, x):\n\n        # sigma\n        enc = self.encoder((x + self.bound) / (2 * self.bound)).float()\n        h = self.sigma_net(enc)\n\n        sigma = self.density_activation(h[..., 0] + self.density_blob(x))\n        albedo = torch.sigmoid(h[..., 1:])\n\n        return sigma, albedo\n    \n    def normal(self, x):\n    \n        with torch.enable_grad():\n            with torch.cuda.amp.autocast(enabled=False):\n                x.requires_grad_(True)\n                sigma, albedo = self.common_forward(x)\n                # query gradient\n                normal = - torch.autograd.grad(torch.sum(sigma), x, create_graph=True)[0] # [N, 3]\n        \n        # normal = self.finite_difference_normal(x)\n        normal = safe_normalize(normal)\n        normal = torch.nan_to_num(normal)\n\n        return normal\n    \n    def forward(self, x, d, l=None, ratio=1, shading='albedo'):\n        # x: [N, 3], in [-bound, bound]\n        # d: [N, 3], view direction, nomalized in [-1, 1]\n        # l: [3], plane light direction, nomalized in [-1, 1]\n        # ratio: scalar, ambient ratio, 1 == no shading (albedo only), 0 == only shading (textureless)\n\n\n        if shading == 'albedo':\n            sigma, albedo = self.common_forward(x)\n            normal = None\n            color = albedo\n        \n        else: # lambertian shading\n            with torch.enable_grad():\n                with torch.cuda.amp.autocast(enabled=False):\n                    x.requires_grad_(True)\n                    sigma, albedo = self.common_forward(x)\n                    normal = - torch.autograd.grad(torch.sum(sigma), x, create_graph=True)[0] # [N, 3]\n            normal = safe_normalize(normal)\n            normal = torch.nan_to_num(normal)\n\n            lambertian = ratio + (1 - ratio) * (normal * l).sum(-1).clamp(min=0) # [N,]\n\n            if shading == 'textureless':\n                color = lambertian.unsqueeze(-1).repeat(1, 3)\n            elif shading == 'normal':\n                color = (normal + 1) / 2\n            else: # 'lambertian'\n                color = albedo * lambertian.unsqueeze(-1)\n            \n        return sigma, color, normal\n\n      \n    def density(self, x):\n        # x: [N, 3], in [-bound, bound]\n        \n        sigma, albedo = self.common_forward(x)\n        \n        return {\n            'sigma': sigma,\n            'albedo': albedo,\n        }\n\n\n    def background(self, d):\n\n        h = self.encoder_bg(d) # [N, C]\n        \n        h = self.bg_net(h)\n\n        # sigmoid activation for rgb\n        rgbs = torch.sigmoid(h)\n\n        return rgbs\n\n    # optimizer utils\n    def get_params(self, lr):\n\n        params = [\n            {'params': self.encoder.parameters(), 'lr': lr * 10},\n            {'params': self.sigma_net.parameters(), 'lr': lr},\n        ]        \n\n        if self.opt.bg_radius > 0:\n            params.append({'params': self.bg_net.parameters(), 'lr': lr})\n        \n        if self.opt.dmtet and not self.opt.lock_geo:\n            params.append({'params': self.sdf, 'lr': lr})\n            params.append({'params': self.deform, 'lr': lr})\n\n        return params"
  },
  {
    "path": "stable-dreamfusion/nerf/provider.py",
    "content": "import os\nimport cv2\nimport glob\nimport json\nimport tqdm\nimport random\nimport numpy as np\nfrom scipy.spatial.transform import Slerp, Rotation\n\nimport trimesh\n\nimport torch\nimport torch.nn.functional as F\nfrom torch.utils.data import DataLoader\n\nfrom .utils import get_rays, safe_normalize\n\nDIR_COLORS = np.array([\n    [255, 0, 0, 255], # front\n    [0, 255, 0, 255], # side\n    [0, 0, 255, 255], # back\n    [255, 255, 0, 255], # side\n    [255, 0, 255, 255], # overhead\n    [0, 255, 255, 255], # bottom\n], dtype=np.uint8)\n\ndef visualize_poses(poses, dirs, size=0.1):\n    # poses: [B, 4, 4], dirs: [B]\n\n    axes = trimesh.creation.axis(axis_length=4)\n    sphere = trimesh.creation.icosphere(radius=1)\n    objects = [axes, sphere]\n\n    for pose, dir in zip(poses, dirs):\n        # a camera is visualized with 8 line segments.\n        pos = pose[:3, 3]\n        a = pos + size * pose[:3, 0] + size * pose[:3, 1] - size * pose[:3, 2]\n        b = pos - size * pose[:3, 0] + size * pose[:3, 1] - size * pose[:3, 2]\n        c = pos - size * pose[:3, 0] - size * pose[:3, 1] - size * pose[:3, 2]\n        d = pos + size * pose[:3, 0] - size * pose[:3, 1] - size * pose[:3, 2]\n\n        segs = np.array([[pos, a], [pos, b], [pos, c], [pos, d], [a, b], [b, c], [c, d], [d, a]])\n        segs = trimesh.load_path(segs)\n\n        # different color for different dirs\n        segs.colors = DIR_COLORS[[dir]].repeat(len(segs.entities), 0)\n\n        objects.append(segs)\n\n    trimesh.Scene(objects).show()\n\ndef get_view_direction(thetas, phis, overhead, front):\n    #                   phis: [B,];          thetas: [B,]\n    # front = 0             [-front/2, front/2)\n    # side (cam left) = 1   [front/2, 180-front/2)\n    # back = 2              [180-front/2, 180+front/2)\n    # side (cam right) = 3  [180+front/2, 360-front/2)\n    # top = 4               [0, overhead]\n    # bottom = 5            [180-overhead, 180]\n    res = torch.zeros(thetas.shape[0], dtype=torch.long)\n    # first determine by phis\n    phis = phis % (2 * np.pi)\n    res[(phis < front / 2) | (phis >= 2 * np.pi - front / 2)] = 0\n    res[(phis >= front / 2) & (phis < np.pi - front / 2)] = 1\n    res[(phis >= np.pi - front / 2) & (phis < np.pi + front / 2)] = 2\n    res[(phis >= np.pi + front / 2) & (phis < 2 * np.pi - front / 2)] = 3\n    # override by thetas\n    res[thetas <= overhead] = 4\n    res[thetas >= (np.pi - overhead)] = 5\n    return res\n\n\ndef rand_poses(size, device, opt, radius_range=[1, 1.5], theta_range=[0, 120], phi_range=[0, 360], return_dirs=False, angle_overhead=30, angle_front=60, uniform_sphere_rate=0.5):\n    ''' generate random poses from an orbit camera\n    Args:\n        size: batch size of generated poses.\n        device: where to allocate the output.\n        radius: camera radius\n        theta_range: [min, max], should be in [0, pi]\n        phi_range: [min, max], should be in [0, 2 * pi]\n    Return:\n        poses: [size, 4, 4]\n    '''\n\n    theta_range = np.array(theta_range) / 180 * np.pi\n    phi_range = np.array(phi_range) / 180 * np.pi\n    angle_overhead = angle_overhead / 180 * np.pi\n    angle_front = angle_front / 180 * np.pi\n\n    radius = torch.rand(size, device=device) * (radius_range[1] - radius_range[0]) + radius_range[0]\n\n    if random.random() < uniform_sphere_rate:\n        unit_centers = F.normalize(\n            torch.stack([\n                torch.randn(size, device=device),\n                torch.abs(torch.randn(size, device=device)),\n                torch.randn(size, device=device),\n            ], dim=-1), p=2, dim=1\n        )\n        thetas = torch.acos(unit_centers[:,1])\n        phis = torch.atan2(unit_centers[:,0], unit_centers[:,2])\n        phis[phis < 0] += 2 * np.pi\n        centers = unit_centers * radius.unsqueeze(-1)\n    else:\n        thetas = torch.rand(size, device=device) * (theta_range[1] - theta_range[0]) + theta_range[0]\n        phis = torch.rand(size, device=device) * (phi_range[1] - phi_range[0]) + phi_range[0]\n        phis[phis < 0] += 2 * np.pi\n\n        centers = torch.stack([\n            radius * torch.sin(thetas) * torch.sin(phis),\n            radius * torch.cos(thetas),\n            radius * torch.sin(thetas) * torch.cos(phis),\n        ], dim=-1) # [B, 3]\n\n    targets = 0\n\n    # jitters\n    if opt.jitter_pose:\n        jit_center = opt.jitter_center # 0.015  # was 0.2\n        jit_target = opt.jitter_target\n        centers += torch.rand_like(centers) * jit_center - jit_center/2.0\n        targets += torch.randn_like(centers) * jit_target\n\n    # lookat\n    forward_vector = safe_normalize(centers - targets)\n    up_vector = torch.FloatTensor([0, 1, 0]).to(device).unsqueeze(0).repeat(size, 1)\n    right_vector = safe_normalize(torch.cross(forward_vector, up_vector, dim=-1))\n\n    if opt.jitter_pose:\n        up_noise = torch.randn_like(up_vector) * opt.jitter_up\n    else:\n        up_noise = 0\n\n    up_vector = safe_normalize(torch.cross(right_vector, forward_vector, dim=-1) + up_noise)\n\n    poses = torch.eye(4, dtype=torch.float, device=device).unsqueeze(0).repeat(size, 1, 1)\n    poses[:, :3, :3] = torch.stack((right_vector, up_vector, forward_vector), dim=-1)\n    poses[:, :3, 3] = centers\n\n    if return_dirs:\n        dirs = get_view_direction(thetas, phis, angle_overhead, angle_front)\n    else:\n        dirs = None\n\n    # back to degree\n    thetas = thetas / np.pi * 180\n    phis = phis / np.pi * 180\n\n    return poses, dirs, thetas, phis, radius\n\n\ndef circle_poses(device, radius=torch.tensor([3.2]), theta=torch.tensor([60]), phi=torch.tensor([0]), return_dirs=False, angle_overhead=30, angle_front=60):\n\n    theta = theta / 180 * np.pi\n    phi = phi / 180 * np.pi\n    angle_overhead = angle_overhead / 180 * np.pi\n    angle_front = angle_front / 180 * np.pi\n\n    centers = torch.stack([\n        radius * torch.sin(theta) * torch.sin(phi),\n        radius * torch.cos(theta),\n        radius * torch.sin(theta) * torch.cos(phi),\n    ], dim=-1) # [B, 3]\n\n    # lookat\n    forward_vector = safe_normalize(centers)\n    up_vector = torch.FloatTensor([0, 1, 0]).to(device).unsqueeze(0).repeat(len(centers), 1)\n    right_vector = safe_normalize(torch.cross(forward_vector, up_vector, dim=-1))\n    up_vector = safe_normalize(torch.cross(right_vector, forward_vector, dim=-1))\n\n    poses = torch.eye(4, dtype=torch.float, device=device).unsqueeze(0).repeat(len(centers), 1, 1)\n    poses[:, :3, :3] = torch.stack((right_vector, up_vector, forward_vector), dim=-1)\n    poses[:, :3, 3] = centers\n\n    if return_dirs:\n        dirs = get_view_direction(theta, phi, angle_overhead, angle_front)\n    else:\n        dirs = None\n\n    return poses, dirs\n\n\nclass NeRFDataset:\n    def __init__(self, opt, device, type='train', H=256, W=256, size=100):\n        super().__init__()\n\n        self.opt = opt\n        self.device = device\n        self.type = type # train, val, test\n\n        self.H = H\n        self.W = W\n        self.size = size\n\n        self.training = self.type in ['train', 'all']\n\n        self.cx = self.H / 2\n        self.cy = self.W / 2\n\n        self.near = self.opt.min_near\n        self.far = 1000 # infinite\n\n        # [debug] visualize poses\n        # poses, dirs, _, _, _ = rand_poses(100, self.device, opt, radius_range=self.opt.radius_range, angle_overhead=self.opt.angle_overhead, angle_front=self.opt.angle_front, jitter=self.opt.jitter_pose, uniform_sphere_rate=1)\n        # visualize_poses(poses.detach().cpu().numpy(), dirs.detach().cpu().numpy())\n\n    def get_default_view_data(self):\n\n        H = int(self.opt.known_view_scale * self.H)\n        W = int(self.opt.known_view_scale * self.W)\n        cx = H / 2\n        cy = W / 2\n\n        radii = torch.FloatTensor(self.opt.ref_radii).to(self.device)\n        thetas = torch.FloatTensor(self.opt.ref_polars).to(self.device)\n        phis = torch.FloatTensor(self.opt.ref_azimuths).to(self.device)\n        poses, dirs = circle_poses(self.device, radius=radii, theta=thetas, phi=phis, return_dirs=True, angle_overhead=self.opt.angle_overhead, angle_front=self.opt.angle_front)\n        fov = self.opt.default_fovy\n        focal = H / (2 * np.tan(np.deg2rad(fov) / 2))\n        intrinsics = np.array([focal, focal, cx, cy])\n\n        projection = torch.tensor([\n            [2*focal/W, 0, 0, 0],\n            [0, -2*focal/H, 0, 0],\n            [0, 0, -(self.far+self.near)/(self.far-self.near), -(2*self.far*self.near)/(self.far-self.near)],\n            [0, 0, -1, 0]\n        ], dtype=torch.float32, device=self.device).unsqueeze(0).repeat(len(radii), 1, 1)\n\n        mvp = projection @ torch.inverse(poses) # [B, 4, 4]\n\n        # sample a low-resolution but full image\n        rays = get_rays(poses, intrinsics, H, W, -1)\n\n        data = {\n            'H': H,\n            'W': W,\n            'rays_o': rays['rays_o'],\n            'rays_d': rays['rays_d'],\n            'dir': dirs,\n            'mvp': mvp,\n            'polar': self.opt.ref_polars,\n            'azimuth': self.opt.ref_azimuths,\n            'radius': self.opt.ref_radii,\n        }\n\n        return data\n\n    def collate(self, index):\n\n        B = len(index)\n\n        if self.training:\n            # random pose on the fly\n            poses, dirs, thetas, phis, radius = rand_poses(B, self.device, self.opt, radius_range=self.opt.radius_range, theta_range=self.opt.theta_range, phi_range=self.opt.phi_range, return_dirs=True, angle_overhead=self.opt.angle_overhead, angle_front=self.opt.angle_front, uniform_sphere_rate=self.opt.uniform_sphere_rate)\n\n            # random focal\n            fov = random.random() * (self.opt.fovy_range[1] - self.opt.fovy_range[0]) + self.opt.fovy_range[0]\n\n        elif self.type == 'six_views':\n            # six views\n            thetas_six = [90, 90,  90,  90, 1e-3, 179.999]\n            phis_six =   [ 0, 90, 180, -90,    0,       0]\n            thetas = torch.FloatTensor([thetas_six[index[0]]]).to(self.device)\n            phis = torch.FloatTensor([phis_six[index[0]]]).to(self.device)\n            radius = torch.FloatTensor([self.opt.default_radius]).to(self.device)\n            poses, dirs = circle_poses(self.device, radius=radius, theta=thetas, phi=phis, return_dirs=True, angle_overhead=self.opt.angle_overhead, angle_front=self.opt.angle_front)\n\n            # fixed focal\n            fov = self.opt.default_fovy\n\n        else:\n            # circle pose\n            thetas = torch.FloatTensor([self.opt.default_polar]).to(self.device)\n            phis = torch.FloatTensor([(index[0] / self.size) * 360]).to(self.device)\n            radius = torch.FloatTensor([self.opt.default_radius]).to(self.device)\n            poses, dirs = circle_poses(self.device, radius=radius, theta=thetas, phi=phis, return_dirs=True, angle_overhead=self.opt.angle_overhead, angle_front=self.opt.angle_front)\n\n            # fixed focal\n            fov = self.opt.default_fovy\n\n        focal = self.H / (2 * np.tan(np.deg2rad(fov) / 2))\n        intrinsics = np.array([focal, focal, self.cx, self.cy])\n\n        projection = torch.tensor([\n            [2*focal/self.W, 0, 0, 0],\n            [0, -2*focal/self.H, 0, 0],\n            [0, 0, -(self.far+self.near)/(self.far-self.near), -(2*self.far*self.near)/(self.far-self.near)],\n            [0, 0, -1, 0]\n        ], dtype=torch.float32, device=self.device).unsqueeze(0)\n\n        mvp = projection @ torch.inverse(poses) # [1, 4, 4]\n\n        # sample a low-resolution but full image\n        rays = get_rays(poses, intrinsics, self.H, self.W, -1)\n\n        # delta polar/azimuth/radius to default view\n        delta_polar = thetas - self.opt.default_polar\n        delta_azimuth = phis - self.opt.default_azimuth\n        delta_azimuth[delta_azimuth > 180] -= 360 # range in [-180, 180]\n        delta_radius = radius - self.opt.default_radius\n\n        data = {\n            'H': self.H,\n            'W': self.W,\n            'rays_o': rays['rays_o'],\n            'rays_d': rays['rays_d'],\n            'dir': dirs,\n            'mvp': mvp,\n            'polar': delta_polar,\n            'azimuth': delta_azimuth,\n            'radius': delta_radius,\n        }\n\n        return data\n\n    def dataloader(self, batch_size=None):\n        batch_size = batch_size or self.opt.batch_size\n        loader = DataLoader(list(range(self.size)), batch_size=batch_size, collate_fn=self.collate, shuffle=self.training, num_workers=0)\n        loader._data = self\n        return loader"
  },
  {
    "path": "stable-dreamfusion/nerf/renderer.py",
    "content": "import os\nimport math\nimport cv2\nimport trimesh\nimport numpy as np\n\nimport torch\nimport torch.nn as nn\nimport torch.nn.functional as F\n\nimport nvdiffrast.torch as dr\n\nimport mcubes\nimport raymarching\nfrom meshutils import decimate_mesh, clean_mesh, poisson_mesh_reconstruction\nfrom .utils import custom_meshgrid, safe_normalize\n\n\ndef sample_pdf(bins, weights, n_samples, det=False):\n    # This implementation is from NeRF\n    # bins: [B, T], old_z_vals\n    # weights: [B, T - 1], bin weights.\n    # return: [B, n_samples], new_z_vals\n\n    # Get pdf\n    weights = weights + 1e-5  # prevent nans\n    pdf = weights / torch.sum(weights, -1, keepdim=True)\n    cdf = torch.cumsum(pdf, -1)\n    cdf = torch.cat([torch.zeros_like(cdf[..., :1]), cdf], -1)\n    # Take uniform samples\n    if det:\n        u = torch.linspace(0. + 0.5 / n_samples, 1. - 0.5 / n_samples, steps=n_samples).to(weights.device)\n        u = u.expand(list(cdf.shape[:-1]) + [n_samples])\n    else:\n        u = torch.rand(list(cdf.shape[:-1]) + [n_samples]).to(weights.device)\n\n    # Invert CDF\n    u = u.contiguous()\n    inds = torch.searchsorted(cdf, u, right=True)\n    below = torch.max(torch.zeros_like(inds - 1), inds - 1)\n    above = torch.min((cdf.shape[-1] - 1) * torch.ones_like(inds), inds)\n    inds_g = torch.stack([below, above], -1)  # (B, n_samples, 2)\n\n    matched_shape = [inds_g.shape[0], inds_g.shape[1], cdf.shape[-1]]\n    cdf_g = torch.gather(cdf.unsqueeze(1).expand(matched_shape), 2, inds_g)\n    bins_g = torch.gather(bins.unsqueeze(1).expand(matched_shape), 2, inds_g)\n\n    denom = (cdf_g[..., 1] - cdf_g[..., 0])\n    denom = torch.where(denom < 1e-5, torch.ones_like(denom), denom)\n    t = (u - cdf_g[..., 0]) / denom\n    samples = bins_g[..., 0] + t * (bins_g[..., 1] - bins_g[..., 0])\n\n    return samples\n\n@torch.cuda.amp.autocast(enabled=False)\ndef near_far_from_bound(rays_o, rays_d, bound, type='cube', min_near=0.05):\n    # rays: [B, N, 3], [B, N, 3]\n    # bound: int, radius for ball or half-edge-length for cube\n    # return near [B, N, 1], far [B, N, 1]\n\n    radius = rays_o.norm(dim=-1, keepdim=True)\n\n    if type == 'sphere':\n        near = radius - bound # [B, N, 1]\n        far = radius + bound\n\n    elif type == 'cube':\n        tmin = (-bound - rays_o) / (rays_d + 1e-15) # [B, N, 3]\n        tmax = (bound - rays_o) / (rays_d + 1e-15)\n        near = torch.where(tmin < tmax, tmin, tmax).max(dim=-1, keepdim=True)[0]\n        far = torch.where(tmin > tmax, tmin, tmax).min(dim=-1, keepdim=True)[0]\n        # if far < near, means no intersection, set both near and far to inf (1e9 here)\n        mask = far < near\n        near[mask] = 1e9\n        far[mask] = 1e9\n        # restrict near to a minimal value\n        near = torch.clamp(near, min=min_near)\n\n    return near, far\n\n\ndef plot_pointcloud(pc, color=None):\n    # pc: [N, 3]\n    # color: [N, 3/4]\n    print('[visualize points]', pc.shape, pc.dtype, pc.min(0), pc.max(0))\n    pc = trimesh.PointCloud(pc, color)\n    # axis\n    axes = trimesh.creation.axis(axis_length=4)\n    # sphere\n    sphere = trimesh.creation.icosphere(radius=1)\n    trimesh.Scene([pc, axes, sphere]).show()\n\n\nclass DMTet():\n    def __init__(self, device):\n        self.device = device\n        self.triangle_table = torch.tensor([\n            [-1, -1, -1, -1, -1, -1],\n            [ 1,  0,  2, -1, -1, -1],\n            [ 4,  0,  3, -1, -1, -1],\n            [ 1,  4,  2,  1,  3,  4],\n            [ 3,  1,  5, -1, -1, -1],\n            [ 2,  3,  0,  2,  5,  3],\n            [ 1,  4,  0,  1,  5,  4],\n            [ 4,  2,  5, -1, -1, -1],\n            [ 4,  5,  2, -1, -1, -1],\n            [ 4,  1,  0,  4,  5,  1],\n            [ 3,  2,  0,  3,  5,  2],\n            [ 1,  3,  5, -1, -1, -1],\n            [ 4,  1,  2,  4,  3,  1],\n            [ 3,  0,  4, -1, -1, -1],\n            [ 2,  0,  1, -1, -1, -1],\n            [-1, -1, -1, -1, -1, -1]\n        ], dtype=torch.long, device=device)\n        self.num_triangles_table = torch.tensor([0,1,1,2,1,2,2,1,1,2,2,1,2,1,1,0], dtype=torch.long, device=device)\n        self.base_tet_edges = torch.tensor([0,1,0,2,0,3,1,2,1,3,2,3], dtype=torch.long, device=device)\n    \n    def sort_edges(self, edges_ex2):\n        with torch.no_grad():\n            order = (edges_ex2[:,0] > edges_ex2[:,1]).long()\n            order = order.unsqueeze(dim=1)\n\n            a = torch.gather(input=edges_ex2, index=order, dim=1)      \n            b = torch.gather(input=edges_ex2, index=1-order, dim=1)  \n\n        return torch.stack([a, b],-1)\n\n    def __call__(self, pos_nx3, sdf_n, tet_fx4):\n        # pos_nx3: [N, 3]\n        # sdf_n:   [N]\n        # tet_fx4: [F, 4]\n\n        with torch.no_grad():\n            occ_n = sdf_n > 0\n            occ_fx4 = occ_n[tet_fx4.reshape(-1)].reshape(-1,4)\n            occ_sum = torch.sum(occ_fx4, -1) # [F,]\n            valid_tets = (occ_sum>0) & (occ_sum<4)\n            occ_sum = occ_sum[valid_tets]\n\n            # find all vertices\n            all_edges = tet_fx4[valid_tets][:,self.base_tet_edges].reshape(-1,2)\n            all_edges = self.sort_edges(all_edges)\n            unique_edges, idx_map = torch.unique(all_edges,dim=0, return_inverse=True)  \n            \n            unique_edges = unique_edges.long()\n            mask_edges = occ_n[unique_edges.reshape(-1)].reshape(-1,2).sum(-1) == 1\n            mapping = torch.ones((unique_edges.shape[0]), dtype=torch.long, device=self.device) * -1\n            mapping[mask_edges] = torch.arange(mask_edges.sum(), dtype=torch.long,device=self.device)\n            idx_map = mapping[idx_map] # map edges to verts\n\n            interp_v = unique_edges[mask_edges]\n\n        edges_to_interp = pos_nx3[interp_v.reshape(-1)].reshape(-1,2,3)\n        edges_to_interp_sdf = sdf_n[interp_v.reshape(-1)].reshape(-1,2,1)\n        edges_to_interp_sdf[:,-1] *= -1\n\n        denominator = edges_to_interp_sdf.sum(1,keepdim = True)\n\n        edges_to_interp_sdf = torch.flip(edges_to_interp_sdf, [1])/denominator\n        verts = (edges_to_interp * edges_to_interp_sdf).sum(1)\n\n        idx_map = idx_map.reshape(-1,6)\n\n        v_id = torch.pow(2, torch.arange(4, dtype=torch.long, device=self.device))\n        tetindex = (occ_fx4[valid_tets] * v_id.unsqueeze(0)).sum(-1)\n        num_triangles = self.num_triangles_table[tetindex]\n\n        # Generate triangle indices\n        faces = torch.cat((\n            torch.gather(input=idx_map[num_triangles == 1], dim=1, index=self.triangle_table[tetindex[num_triangles == 1]][:, :3]).reshape(-1,3),\n            torch.gather(input=idx_map[num_triangles == 2], dim=1, index=self.triangle_table[tetindex[num_triangles == 2]][:, :6]).reshape(-1,3),\n        ), dim=0)\n\n        return verts, faces\n\ndef compute_edge_to_face_mapping(attr_idx):\n    with torch.no_grad():\n        # Get unique edges\n        # Create all edges, packed by triangle\n        all_edges = torch.cat((\n            torch.stack((attr_idx[:, 0], attr_idx[:, 1]), dim=-1),\n            torch.stack((attr_idx[:, 1], attr_idx[:, 2]), dim=-1),\n            torch.stack((attr_idx[:, 2], attr_idx[:, 0]), dim=-1),\n        ), dim=-1).view(-1, 2)\n\n        # Swap edge order so min index is always first\n        order = (all_edges[:, 0] > all_edges[:, 1]).long().unsqueeze(dim=1)\n        sorted_edges = torch.cat((\n            torch.gather(all_edges, 1, order),\n            torch.gather(all_edges, 1, 1 - order)\n        ), dim=-1)\n\n        # Elliminate duplicates and return inverse mapping\n        unique_edges, idx_map = torch.unique(sorted_edges, dim=0, return_inverse=True)\n\n        tris = torch.arange(attr_idx.shape[0]).repeat_interleave(3).cuda()\n\n        tris_per_edge = torch.zeros((unique_edges.shape[0], 2), dtype=torch.int64).cuda()\n\n        # Compute edge to face table\n        mask0 = order[:,0] == 0\n        mask1 = order[:,0] == 1\n        tris_per_edge[idx_map[mask0], 0] = tris[mask0]\n        tris_per_edge[idx_map[mask1], 1] = tris[mask1]\n\n        return tris_per_edge\n\n@torch.cuda.amp.autocast(enabled=False)\ndef normal_consistency(face_normals, t_pos_idx):\n\n    tris_per_edge = compute_edge_to_face_mapping(t_pos_idx)\n\n    # Fetch normals for both faces sharind an edge\n    n0 = face_normals[tris_per_edge[:, 0], :]\n    n1 = face_normals[tris_per_edge[:, 1], :]\n\n    # Compute error metric based on normal difference\n    term = torch.clamp(torch.sum(n0 * n1, -1, keepdim=True), min=-1.0, max=1.0)\n    term = (1.0 - term)\n\n    return torch.mean(torch.abs(term))\n\n\ndef laplacian_uniform(verts, faces):\n\n    V = verts.shape[0]\n    F = faces.shape[0]\n\n    # Neighbor indices\n    ii = faces[:, [1, 2, 0]].flatten()\n    jj = faces[:, [2, 0, 1]].flatten()\n    adj = torch.stack([torch.cat([ii, jj]), torch.cat([jj, ii])], dim=0).unique(dim=1)\n    adj_values = torch.ones(adj.shape[1], device=verts.device, dtype=torch.float)\n\n    # Diagonal indices\n    diag_idx = adj[0]\n\n    # Build the sparse matrix\n    idx = torch.cat((adj, torch.stack((diag_idx, diag_idx), dim=0)), dim=1)\n    values = torch.cat((-adj_values, adj_values))\n\n    # The coalesce operation sums the duplicate indices, resulting in the\n    # correct diagonal\n    return torch.sparse_coo_tensor(idx, values, (V,V)).coalesce()\n\n\n@torch.cuda.amp.autocast(enabled=False)\ndef laplacian_smooth_loss(verts, faces):\n    with torch.no_grad():\n        L = laplacian_uniform(verts, faces.long())\n    loss = L.mm(verts)\n    loss = loss.norm(dim=1)\n    loss = loss.mean()\n    return loss\n\n\nclass NeRFRenderer(nn.Module):\n    def __init__(self, opt):\n        super().__init__()\n\n        self.opt = opt\n        self.bound = opt.bound\n        self.cascade = 1 + math.ceil(math.log2(opt.bound))\n        self.grid_size = 128\n        self.max_level = None\n        self.dmtet = opt.dmtet\n        self.cuda_ray = opt.cuda_ray\n        self.taichi_ray = opt.taichi_ray\n        self.min_near = opt.min_near\n        self.density_thresh = opt.density_thresh\n\n        # prepare aabb with a 6D tensor (xmin, ymin, zmin, xmax, ymax, zmax)\n        # NOTE: aabb (can be rectangular) is only used to generate points, we still rely on bound (always cubic) to calculate density grid and hashing.\n        aabb_train = torch.FloatTensor([-opt.bound, -opt.bound, -opt.bound, opt.bound, opt.bound, opt.bound])\n        aabb_infer = aabb_train.clone()\n        self.register_buffer('aabb_train', aabb_train)\n        self.register_buffer('aabb_infer', aabb_infer)\n\n        self.glctx = None\n\n        # extra state for cuda raymarching\n        if self.cuda_ray:\n            # density grid\n            density_grid = torch.zeros([self.cascade, self.grid_size ** 3]) # [CAS, H * H * H]\n            density_bitfield = torch.zeros(self.cascade * self.grid_size ** 3 // 8, dtype=torch.uint8) # [CAS * H * H * H // 8]\n            self.register_buffer('density_grid', density_grid)\n            self.register_buffer('density_bitfield', density_bitfield)\n            self.mean_density = 0\n            self.iter_density = 0\n        \n        if self.opt.dmtet:\n            # load dmtet vertices\n            tets = np.load('tets/{}_tets.npz'.format(self.opt.tet_grid_size))\n            self.verts = - torch.tensor(tets['vertices'], dtype=torch.float32, device='cuda') * 2 # covers [-1, 1]\n            self.indices  = torch.tensor(tets['indices'], dtype=torch.long, device='cuda')\n            self.tet_scale = torch.tensor([1, 1, 1], dtype=torch.float32, device='cuda')\n            self.dmtet = DMTet('cuda')\n\n            # vert sdf and deform\n            sdf = torch.nn.Parameter(torch.zeros_like(self.verts[..., 0]), requires_grad=True)\n            self.register_parameter('sdf', sdf)\n            deform = torch.nn.Parameter(torch.zeros_like(self.verts), requires_grad=True)\n            self.register_parameter('deform', deform)\n\n            edges = torch.tensor([0,1, 0,2, 0,3, 1,2, 1,3, 2,3], dtype=torch.long, device=\"cuda\") # six edges for each tetrahedron.\n            all_edges = self.indices[:,edges].reshape(-1,2) # [M * 6, 2]\n            all_edges_sorted = torch.sort(all_edges, dim=1)[0]\n            self.all_edges = torch.unique(all_edges_sorted, dim=0)\n\n            if self.opt.h <= 2048 and self.opt.w <= 2048:\n                self.glctx = dr.RasterizeCudaContext()\n            else:\n                self.glctx = dr.RasterizeGLContext()\n        \n        if self.taichi_ray:\n            from einops import rearrange\n            from taichi_modules import RayMarcherTaichi\n            from taichi_modules import VolumeRendererTaichi\n            from taichi_modules import RayAABBIntersector as RayAABBIntersectorTaichi\n            from taichi_modules import raymarching_test as raymarching_test_taichi\n            from taichi_modules import composite_test as composite_test_fw\n            from taichi_modules import packbits as packbits_taichi\n            self.rearrange = rearrange\n            self.packbits_taichi = packbits_taichi\n            self.ray_aabb_intersector = RayAABBIntersectorTaichi\n            self.raymarching_test_taichi = raymarching_test_taichi\n            self.composite_test_fw = composite_test_fw\n            self.ray_marching = RayMarcherTaichi(batch_size=4096) # TODO: hard encoded batch size\n            self.volume_render = VolumeRendererTaichi(batch_size=4096) # TODO: hard encoded batch size\n            # density grid\n            density_grid = torch.zeros([self.cascade, self.grid_size ** 3]) # [CAS, H * H * H]\n            density_bitfield = torch.zeros(self.cascade * self.grid_size ** 3 // 8, dtype=torch.uint8) # [CAS * H * H * H // 8]\n            self.register_buffer('density_grid', density_grid)\n            self.register_buffer('density_bitfield', density_bitfield)\n            self.mean_density = 0\n            self.iter_density = 0\n    \n    @torch.no_grad()\n    def density_blob(self, x):\n        # x: [B, N, 3]\n        \n        d = (x ** 2).sum(-1)\n        \n        if self.opt.density_activation == 'exp':\n            g = self.opt.blob_density * torch.exp(- d / (2 * self.opt.blob_radius ** 2))\n        else:\n            g = self.opt.blob_density * (1 - torch.sqrt(d) / self.opt.blob_radius)\n\n        return g\n    \n    def forward(self, x, d):\n        raise NotImplementedError()\n\n    def density(self, x):\n        raise NotImplementedError()\n\n    def reset_extra_state(self):\n        if not (self.cuda_ray or self.taichi_ray):\n            return \n        # density grid\n        self.density_grid.zero_()\n        self.mean_density = 0\n        self.iter_density = 0\n\n    @torch.no_grad()\n    def export_mesh(self, path, resolution=None, decimate_target=-1, S=128):\n\n        if self.opt.dmtet:\n\n            sdf = self.sdf\n            deform = torch.tanh(self.deform) / self.opt.tet_grid_size\n\n            vertices, triangles = self.dmtet(self.verts + deform, sdf, self.indices)\n\n            vertices = vertices.detach().cpu().numpy()\n            triangles = triangles.detach().cpu().numpy()\n\n        else:\n\n            if resolution is None:\n                resolution = self.grid_size\n\n            if self.cuda_ray:\n                density_thresh = min(self.mean_density, self.density_thresh) \\\n                    if np.greater(self.mean_density, 0) else self.density_thresh\n            else:\n                density_thresh = self.density_thresh\n            \n            # TODO: use a larger thresh to extract a surface mesh from the density field, but this value is very empirical...\n            if self.opt.density_activation == 'softplus':\n                density_thresh = density_thresh * 25\n            \n            sigmas = np.zeros([resolution, resolution, resolution], dtype=np.float32)\n\n            # query\n            X = torch.linspace(-1, 1, resolution).split(S)\n            Y = torch.linspace(-1, 1, resolution).split(S)\n            Z = torch.linspace(-1, 1, resolution).split(S)\n\n            for xi, xs in enumerate(X):\n                for yi, ys in enumerate(Y):\n                    for zi, zs in enumerate(Z):\n                        xx, yy, zz = custom_meshgrid(xs, ys, zs)\n                        pts = torch.cat([xx.reshape(-1, 1), yy.reshape(-1, 1), zz.reshape(-1, 1)], dim=-1) # [S, 3]\n                        val = self.density(pts.to(self.aabb_train.device))\n                        sigmas[xi * S: xi * S + len(xs), yi * S: yi * S + len(ys), zi * S: zi * S + len(zs)] = val['sigma'].reshape(len(xs), len(ys), len(zs)).detach().cpu().numpy() # [S, 1] --> [x, y, z]\n\n            print(f'[INFO] marching cubes thresh: {density_thresh} ({sigmas.min()} ~ {sigmas.max()})')\n\n            vertices, triangles = mcubes.marching_cubes(sigmas, density_thresh)\n            vertices = vertices / (resolution - 1.0) * 2 - 1\n\n        # clean\n        vertices = vertices.astype(np.float32)\n        triangles = triangles.astype(np.int32)\n        vertices, triangles = clean_mesh(vertices, triangles, remesh=True, remesh_size=0.01)\n        \n        # decimation\n        if decimate_target > 0 and triangles.shape[0] > decimate_target:\n            vertices, triangles = decimate_mesh(vertices, triangles, decimate_target)\n\n        v = torch.from_numpy(vertices).contiguous().float().to(self.aabb_train.device)\n        f = torch.from_numpy(triangles).contiguous().int().to(self.aabb_train.device)\n\n        # mesh = trimesh.Trimesh(vertices, triangles, process=False) # important, process=True leads to seg fault...\n        # mesh.export(os.path.join(path, f'mesh.ply'))\n\n        def _export(v, f, h0=2048, w0=2048, ssaa=1, name=''):\n            # v, f: torch Tensor\n            device = v.device\n            v_np = v.cpu().numpy() # [N, 3]\n            f_np = f.cpu().numpy() # [M, 3]\n\n            print(f'[INFO] running xatlas to unwrap UVs for mesh: v={v_np.shape} f={f_np.shape}')\n\n            # unwrap uvs\n            import xatlas\n            import nvdiffrast.torch as dr\n            from sklearn.neighbors import NearestNeighbors\n            from scipy.ndimage import binary_dilation, binary_erosion\n\n            atlas = xatlas.Atlas()\n            atlas.add_mesh(v_np, f_np)\n            chart_options = xatlas.ChartOptions()\n            chart_options.max_iterations = 4 # for faster unwrap...\n            atlas.generate(chart_options=chart_options)\n            vmapping, ft_np, vt_np = atlas[0] # [N], [M, 3], [N, 2]\n\n            # vmapping, ft_np, vt_np = xatlas.parametrize(v_np, f_np) # [N], [M, 3], [N, 2]\n\n            vt = torch.from_numpy(vt_np.astype(np.float32)).float().to(device)\n            ft = torch.from_numpy(ft_np.astype(np.int64)).int().to(device)\n\n            # render uv maps\n            uv = vt * 2.0 - 1.0 # uvs to range [-1, 1]\n            uv = torch.cat((uv, torch.zeros_like(uv[..., :1]), torch.ones_like(uv[..., :1])), dim=-1) # [N, 4]\n\n            if ssaa > 1:\n                h = int(h0 * ssaa)\n                w = int(w0 * ssaa)\n            else:\n                h, w = h0, w0\n            \n            if self.glctx is None:\n                if h <= 2048 and w <= 2048:\n                    self.glctx = dr.RasterizeCudaContext()\n                else:\n                    self.glctx = dr.RasterizeGLContext()\n\n            rast, _ = dr.rasterize(self.glctx, uv.unsqueeze(0), ft, (h, w)) # [1, h, w, 4]\n            xyzs, _ = dr.interpolate(v.unsqueeze(0), rast, f) # [1, h, w, 3]\n            mask, _ = dr.interpolate(torch.ones_like(v[:, :1]).unsqueeze(0), rast, f) # [1, h, w, 1]\n\n            # masked query \n            xyzs = xyzs.view(-1, 3)\n            mask = (mask > 0).view(-1)\n            \n            feats = torch.zeros(h * w, 3, device=device, dtype=torch.float32)\n\n            if mask.any():\n                xyzs = xyzs[mask] # [M, 3]\n\n                # batched inference to avoid OOM\n                all_feats = []\n                head = 0\n                while head < xyzs.shape[0]:\n                    tail = min(head + 640000, xyzs.shape[0])\n                    results_ = self.density(xyzs[head:tail])\n                    all_feats.append(results_['albedo'].float())\n                    head += 640000\n\n                feats[mask] = torch.cat(all_feats, dim=0)\n            \n            feats = feats.view(h, w, -1)\n            mask = mask.view(h, w)\n\n            # quantize [0.0, 1.0] to [0, 255]\n            feats = feats.cpu().numpy()\n            feats = (feats * 255).astype(np.uint8)\n\n            ### NN search as an antialiasing ...\n            mask = mask.cpu().numpy()\n\n            inpaint_region = binary_dilation(mask, iterations=3)\n            inpaint_region[mask] = 0\n\n            search_region = mask.copy()\n            not_search_region = binary_erosion(search_region, iterations=2)\n            search_region[not_search_region] = 0\n\n            search_coords = np.stack(np.nonzero(search_region), axis=-1)\n            inpaint_coords = np.stack(np.nonzero(inpaint_region), axis=-1)\n\n            knn = NearestNeighbors(n_neighbors=1, algorithm='kd_tree').fit(search_coords)\n            _, indices = knn.kneighbors(inpaint_coords)\n\n            feats[tuple(inpaint_coords.T)] = feats[tuple(search_coords[indices[:, 0]].T)]\n\n            feats = cv2.cvtColor(feats, cv2.COLOR_RGB2BGR)\n\n            # do ssaa after the NN search, in numpy\n            if ssaa > 1:\n                feats = cv2.resize(feats, (w0, h0), interpolation=cv2.INTER_LINEAR)\n\n            cv2.imwrite(os.path.join(path, f'{name}albedo.png'), feats)\n\n            # save obj (v, vt, f /)\n            obj_file = os.path.join(path, f'{name}mesh.obj')\n            mtl_file = os.path.join(path, f'{name}mesh.mtl')\n\n            print(f'[INFO] writing obj mesh to {obj_file}')\n            with open(obj_file, \"w\") as fp:\n                fp.write(f'mtllib {name}mesh.mtl \\n')\n                \n                print(f'[INFO] writing vertices {v_np.shape}')\n                for v in v_np:\n                    fp.write(f'v {v[0]} {v[1]} {v[2]} \\n')\n            \n                print(f'[INFO] writing vertices texture coords {vt_np.shape}')\n                for v in vt_np:\n                    fp.write(f'vt {v[0]} {1 - v[1]} \\n') \n\n                print(f'[INFO] writing faces {f_np.shape}')\n                fp.write(f'usemtl mat0 \\n')\n                for i in range(len(f_np)):\n                    fp.write(f\"f {f_np[i, 0] + 1}/{ft_np[i, 0] + 1} {f_np[i, 1] + 1}/{ft_np[i, 1] + 1} {f_np[i, 2] + 1}/{ft_np[i, 2] + 1} \\n\")\n\n            with open(mtl_file, \"w\") as fp:\n                fp.write(f'newmtl mat0 \\n')\n                fp.write(f'Ka 1.000000 1.000000 1.000000 \\n')\n                fp.write(f'Kd 1.000000 1.000000 1.000000 \\n')\n                fp.write(f'Ks 0.000000 0.000000 0.000000 \\n')\n                fp.write(f'Tr 1.000000 \\n')\n                fp.write(f'illum 1 \\n')\n                fp.write(f'Ns 0.000000 \\n')\n                fp.write(f'map_Kd {name}albedo.png \\n')\n\n        _export(v, f)\n\n    def run(self, rays_o, rays_d, light_d=None, ambient_ratio=1.0, shading='albedo', bg_color=None, perturb=False, **kwargs):\n        # rays_o, rays_d: [B, N, 3]\n        # bg_color: [BN, 3] in range [0, 1]\n        # return: image: [B, N, 3], depth: [B, N]\n\n        prefix = rays_o.shape[:-1]\n        rays_o = rays_o.contiguous().view(-1, 3)\n        rays_d = rays_d.contiguous().view(-1, 3)\n\n        N = rays_o.shape[0] # N = B * N, in fact\n        device = rays_o.device\n\n        results = {}\n\n        # choose aabb\n        aabb = self.aabb_train if self.training else self.aabb_infer\n\n        # sample steps\n        # nears, fars = raymarching.near_far_from_aabb(rays_o, rays_d, aabb, self.min_near)\n        # nears.unsqueeze_(-1)\n        # fars.unsqueeze_(-1)\n        nears, fars = near_far_from_bound(rays_o, rays_d, self.bound, type='sphere', min_near=self.min_near)\n\n        # random sample light_d if not provided\n        if light_d is None:\n            # gaussian noise around the ray origin, so the light always face the view dir (avoid dark face)\n            light_d = safe_normalize(rays_o + torch.randn(3, device=rays_o.device)) # [N, 3]\n\n        #print(f'nears = {nears.min().item()} ~ {nears.max().item()}, fars = {fars.min().item()} ~ {fars.max().item()}')\n\n        z_vals = torch.linspace(0.0, 1.0, self.opt.num_steps, device=device).unsqueeze(0) # [1, T]\n        z_vals = z_vals.expand((N, self.opt.num_steps)) # [N, T]\n        z_vals = nears + (fars - nears) * z_vals # [N, T], in [nears, fars]\n\n        # perturb z_vals\n        sample_dist = (fars - nears) / self.opt.num_steps\n        if perturb:\n            z_vals = z_vals + (torch.rand(z_vals.shape, device=device) - 0.5) * sample_dist\n            #z_vals = z_vals.clamp(nears, fars) # avoid out of bounds xyzs.\n\n        # generate xyzs\n        xyzs = rays_o.unsqueeze(-2) + rays_d.unsqueeze(-2) * z_vals.unsqueeze(-1) # [N, 1, 3] * [N, T, 1] -> [N, T, 3]\n        xyzs = torch.min(torch.max(xyzs, aabb[:3]), aabb[3:]) # a manual clip.\n\n        #plot_pointcloud(xyzs.reshape(-1, 3).detach().cpu().numpy())\n\n        # query SDF and RGB\n        density_outputs = self.density(xyzs.reshape(-1, 3))\n\n        #sigmas = density_outputs['sigma'].view(N, self.opt.num_steps) # [N, T]\n        for k, v in density_outputs.items():\n            density_outputs[k] = v.view(N, self.opt.num_steps, -1)\n\n        # upsample z_vals (nerf-like)\n        if self.opt.upsample_steps > 0:\n            with torch.no_grad():\n\n                deltas = z_vals[..., 1:] - z_vals[..., :-1] # [N, T-1]\n                deltas = torch.cat([deltas, sample_dist * torch.ones_like(deltas[..., :1])], dim=-1)\n\n                alphas = 1 - torch.exp(-deltas * density_outputs['sigma'].squeeze(-1)) # [N, T]\n                alphas_shifted = torch.cat([torch.ones_like(alphas[..., :1]), 1 - alphas + 1e-15], dim=-1) # [N, T+1]\n                weights = alphas * torch.cumprod(alphas_shifted, dim=-1)[..., :-1] # [N, T]\n\n                # sample new z_vals\n                z_vals_mid = (z_vals[..., :-1] + 0.5 * deltas[..., :-1]) # [N, T-1]\n                new_z_vals = sample_pdf(z_vals_mid, weights[:, 1:-1], self.opt.upsample_steps, det=not self.training).detach() # [N, t]\n\n                new_xyzs = rays_o.unsqueeze(-2) + rays_d.unsqueeze(-2) * new_z_vals.unsqueeze(-1) # [N, 1, 3] * [N, t, 1] -> [N, t, 3]\n                new_xyzs = torch.min(torch.max(new_xyzs, aabb[:3]), aabb[3:]) # a manual clip.\n\n            # only forward new points to save computation\n            new_density_outputs = self.density(new_xyzs.reshape(-1, 3))\n            #new_sigmas = new_density_outputs['sigma'].view(N, self.opt.upsample_steps) # [N, t]\n            for k, v in new_density_outputs.items():\n                new_density_outputs[k] = v.view(N, self.opt.upsample_steps, -1)\n\n            # re-order\n            z_vals = torch.cat([z_vals, new_z_vals], dim=1) # [N, T+t]\n            z_vals, z_index = torch.sort(z_vals, dim=1)\n\n            xyzs = torch.cat([xyzs, new_xyzs], dim=1) # [N, T+t, 3]\n            xyzs = torch.gather(xyzs, dim=1, index=z_index.unsqueeze(-1).expand_as(xyzs))\n\n            for k in density_outputs:\n                tmp_output = torch.cat([density_outputs[k], new_density_outputs[k]], dim=1)\n                density_outputs[k] = torch.gather(tmp_output, dim=1, index=z_index.unsqueeze(-1).expand_as(tmp_output))\n\n        deltas = z_vals[..., 1:] - z_vals[..., :-1] # [N, T+t-1]\n        deltas = torch.cat([deltas, sample_dist * torch.ones_like(deltas[..., :1])], dim=-1)\n        alphas = 1 - torch.exp(-deltas * density_outputs['sigma'].squeeze(-1)) # [N, T+t]\n        alphas_shifted = torch.cat([torch.ones_like(alphas[..., :1]), 1 - alphas + 1e-15], dim=-1) # [N, T+t+1]\n        weights = alphas * torch.cumprod(alphas_shifted, dim=-1)[..., :-1] # [N, T+t]\n\n        dirs = rays_d.view(-1, 1, 3).expand_as(xyzs)\n        light_d = light_d.view(-1, 1, 3).expand_as(xyzs)\n        for k, v in density_outputs.items():\n            density_outputs[k] = v.view(-1, v.shape[-1])\n\n        dirs = safe_normalize(dirs)\n        sigmas, rgbs, normals = self(xyzs.reshape(-1, 3), dirs.reshape(-1, 3), light_d.reshape(-1, 3), ratio=ambient_ratio, shading=shading)\n        rgbs = rgbs.view(N, -1, 3) # [N, T+t, 3]\n        if normals is not None:\n            normals = normals.view(N, -1, 3)\n\n        # calculate weight_sum (mask)\n        weights_sum = weights.sum(dim=-1) # [N]\n        \n        # calculate depth \n        depth = torch.sum(weights * z_vals, dim=-1)\n\n        # calculate color\n        image = torch.sum(weights.unsqueeze(-1) * rgbs, dim=-2) # [N, 3], in [0, 1]\n\n        # mix background color\n        if bg_color is None:\n            if self.opt.bg_radius > 0:\n                # use the bg model to calculate bg_color\n                bg_color = self.background(rays_d) # [N, 3]\n            else:\n                bg_color = 1\n            \n        image = image + (1 - weights_sum).unsqueeze(-1) * bg_color\n\n        image = image.view(*prefix, 3)\n        depth = depth.view(*prefix)\n        weights_sum = weights_sum.reshape(*prefix)\n\n        if self.training:\n            if self.opt.lambda_orient > 0 and normals is not None:\n                # orientation loss\n                loss_orient = weights.detach() * (normals * dirs).sum(-1).clamp(min=0) ** 2\n                results['loss_orient'] = loss_orient.sum(-1).mean()\n            \n            if self.opt.lambda_3d_normal_smooth > 0 and normals is not None:\n                normals_perturb = self.normal(xyzs + torch.randn_like(xyzs) * 1e-2)\n                results['loss_normal_perturb'] = (normals - normals_perturb).abs().mean()\n            \n            if (self.opt.lambda_2d_normal_smooth > 0 or self.opt.lambda_normal > 0) and normals is not None:\n                normal_image = torch.sum(weights.unsqueeze(-1) * (normals + 1) / 2, dim=-2) # [N, 3], in [0, 1]\n                results['normal_image'] = normal_image\n        \n        results['image'] = image\n        results['depth'] = depth\n        results['weights'] = weights\n        results['weights_sum'] = weights_sum\n\n        return results\n\n\n    def run_cuda(self, rays_o, rays_d, light_d=None, ambient_ratio=1.0, shading='albedo', bg_color=None, perturb=False, T_thresh=1e-4, binarize=False, **kwargs):\n        # rays_o, rays_d: [B, N, 3]\n        # return: image: [B, N, 3], depth: [B, N]\n\n        prefix = rays_o.shape[:-1]\n        rays_o = rays_o.contiguous().view(-1, 3)\n        rays_d = rays_d.contiguous().view(-1, 3)\n\n        N = rays_o.shape[0] # B * N, in fact\n        device = rays_o.device\n\n        # pre-calculate near far\n        nears, fars = raymarching.near_far_from_aabb(rays_o, rays_d, self.aabb_train if self.training else self.aabb_infer)\n\n        # random sample light_d if not provided\n        if light_d is None:\n            # gaussian noise around the ray origin, so the light always face the view dir (avoid dark face)\n            light_d = safe_normalize(rays_o + torch.randn(3, device=rays_o.device)) # [N, 3]\n\n        results = {}\n\n        if self.training:\n            xyzs, dirs, ts, rays = raymarching.march_rays_train(rays_o, rays_d, self.bound, self.density_bitfield, self.cascade, self.grid_size, nears, fars, perturb, self.opt.dt_gamma, self.opt.max_steps)\n            dirs = safe_normalize(dirs)\n\n            if light_d.shape[0] > 1:\n                flatten_rays = raymarching.flatten_rays(rays, xyzs.shape[0]).long()\n                light_d = light_d[flatten_rays]\n            \n            sigmas, rgbs, normals = self(xyzs, dirs, light_d, ratio=ambient_ratio, shading=shading)\n            weights, weights_sum, depth, image = raymarching.composite_rays_train(sigmas, rgbs, ts, rays, T_thresh, binarize)\n            \n            # normals related regularizations\n            if self.opt.lambda_orient > 0 and normals is not None:\n                # orientation loss \n                loss_orient = weights.detach() * (normals * dirs).sum(-1).clamp(min=0) ** 2\n                results['loss_orient'] = loss_orient.mean()\n            \n            if self.opt.lambda_3d_normal_smooth > 0 and normals is not None:\n                normals_perturb = self.normal(xyzs + torch.randn_like(xyzs) * 1e-2)\n                results['loss_normal_perturb'] = (normals - normals_perturb).abs().mean()\n            \n            if (self.opt.lambda_2d_normal_smooth > 0 or self.opt.lambda_normal > 0) and normals is not None:\n                _, _, _, normal_image = raymarching.composite_rays_train(sigmas.detach(), (normals + 1) / 2, ts, rays, T_thresh, binarize)\n                results['normal_image'] = normal_image\n            \n            # weights normalization\n            results['weights'] = weights\n\n        else:\n           \n            # allocate outputs \n            dtype = torch.float32\n            \n            weights_sum = torch.zeros(N, dtype=dtype, device=device)\n            depth = torch.zeros(N, dtype=dtype, device=device)\n            image = torch.zeros(N, 3, dtype=dtype, device=device)\n            \n            n_alive = N\n            rays_alive = torch.arange(n_alive, dtype=torch.int32, device=device) # [N]\n            rays_t = nears.clone() # [N]\n\n            step = 0\n            \n            while step < self.opt.max_steps: # hard coded max step\n\n                # count alive rays \n                n_alive = rays_alive.shape[0]\n\n                # exit loop\n                if n_alive <= 0:\n                    break\n\n                # decide compact_steps\n                n_step = max(min(N // n_alive, 8), 1)\n\n                xyzs, dirs, ts = raymarching.march_rays(n_alive, n_step, rays_alive, rays_t, rays_o, rays_d, self.bound, self.density_bitfield, self.cascade, self.grid_size, nears, fars, perturb if step == 0 else False, self.opt.dt_gamma, self.opt.max_steps)\n                dirs = safe_normalize(dirs)\n                sigmas, rgbs, normals = self(xyzs, dirs, light_d, ratio=ambient_ratio, shading=shading)\n                raymarching.composite_rays(n_alive, n_step, rays_alive, rays_t, sigmas, rgbs, ts, weights_sum, depth, image, T_thresh, binarize)\n\n                rays_alive = rays_alive[rays_alive >= 0]\n                #print(f'step = {step}, n_step = {n_step}, n_alive = {n_alive}, xyzs: {xyzs.shape}')\n\n                step += n_step\n\n        # mix background color\n        if bg_color is None:\n            if self.opt.bg_radius > 0:\n                # use the bg model to calculate bg_color\n                bg_color = self.background(rays_d) # [N, 3]\n            else:\n                bg_color = 1\n\n        image = image + (1 - weights_sum).unsqueeze(-1) * bg_color\n        image = image.view(*prefix, 3)\n\n        depth = depth.view(*prefix)\n\n        weights_sum = weights_sum.reshape(*prefix)\n\n        results['image'] = image\n        results['depth'] = depth\n        results['weights_sum'] = weights_sum\n        \n        return results\n\n    @torch.no_grad()\n    def init_tet(self, mesh=None):\n\n        if mesh is not None:\n            # normalize mesh\n            scale = 0.8 / np.array(mesh.bounds[1] - mesh.bounds[0]).max()\n            center = np.array(mesh.bounds[1] + mesh.bounds[0]) / 2\n            mesh.vertices = (mesh.vertices - center) * scale\n\n            # init scale\n            # self.tet_scale = torch.from_numpy(np.abs(mesh.vertices).max(axis=0) + 1e-1).to(self.verts.dtype).cuda()\n            self.tet_scale = torch.from_numpy(np.array([np.abs(mesh.vertices).max()]) + 1e-1).to(self.verts.dtype).cuda()\n            self.verts = self.verts * self.tet_scale\n\n            # init sdf\n            import cubvh\n            BVH = cubvh.cuBVH(mesh.vertices, mesh.faces)\n            sdf, _, _ = BVH.signed_distance(self.verts, return_uvw=False, mode='watertight')\n            sdf *= -10 # INNER is POSITIVE, also make it stronger\n            self.sdf.data += sdf.to(self.sdf.data.dtype).clamp(-1, 1)\n\n        else:\n\n            if self.cuda_ray:\n                density_thresh = min(self.mean_density, self.density_thresh)\n            else:\n                density_thresh = self.density_thresh\n        \n            if self.opt.density_activation == 'softplus':\n                density_thresh = density_thresh * 25\n\n            # init scale\n            sigma = self.density(self.verts)['sigma'] # verts covers [-1, 1] now\n            mask = sigma > density_thresh\n            valid_verts = self.verts[mask]\n            self.tet_scale = valid_verts.abs().amax(dim=0) + 1e-1\n            self.verts = self.verts * self.tet_scale\n\n            # init sigma\n            sigma = self.density(self.verts)['sigma'] # new verts\n            self.sdf.data += (sigma - density_thresh).clamp(-1, 1)\n\n        print(f'[INFO] init dmtet: scale = {self.tet_scale}')\n\n\n    def run_dmtet(self, rays_o, rays_d, mvp, h, w, light_d=None, ambient_ratio=1.0, shading='albedo', bg_color=None, **kwargs):\n        # mvp: [B, 4, 4]\n\n        device = mvp.device\n        campos = rays_o[:, 0, :] # only need one ray per batch\n\n        # random sample light_d if not provided\n        if light_d is None:\n            # gaussian noise around the ray origin, so the light always face the view dir (avoid dark face)\n            light_d = safe_normalize(campos + torch.randn_like(campos)).view(-1, 1, 1, 3) # [B, 1, 1, 3]\n\n        results = {}\n\n        # get mesh\n        sdf = self.sdf\n        deform = torch.tanh(self.deform) / self.opt.tet_grid_size\n\n        verts, faces = self.dmtet(self.verts + deform, sdf, self.indices)\n\n        # get normals\n        i0, i1, i2 = faces[:, 0], faces[:, 1], faces[:, 2]\n        v0, v1, v2 = verts[i0, :], verts[i1, :], verts[i2, :]\n\n        faces = faces.int()\n        \n        face_normals = torch.cross(v1 - v0, v2 - v0)\n        face_normals = safe_normalize(face_normals)\n        \n        vn = torch.zeros_like(verts)\n        vn.scatter_add_(0, i0[:, None].repeat(1,3), face_normals)\n        vn.scatter_add_(0, i1[:, None].repeat(1,3), face_normals)\n        vn.scatter_add_(0, i2[:, None].repeat(1,3), face_normals)\n\n        vn = torch.where(torch.sum(vn * vn, -1, keepdim=True) > 1e-20, vn, torch.tensor([0.0, 0.0, 1.0], dtype=torch.float32, device=vn.device))\n\n        # rasterization\n        verts_clip = torch.bmm(F.pad(verts, pad=(0, 1), mode='constant', value=1.0).unsqueeze(0).repeat(mvp.shape[0], 1, 1), \n                               mvp.permute(0,2,1)).float()  # [B, N, 4]\n        rast, rast_db = dr.rasterize(self.glctx, verts_clip, faces, (h, w))\n        \n        alpha = (rast[..., 3:] > 0).float()\n        xyzs, _ = dr.interpolate(verts.unsqueeze(0), rast, faces) # [B, H, W, 3]\n        normal, _ = dr.interpolate(vn.unsqueeze(0).contiguous(), rast, faces)\n        normal = safe_normalize(normal)\n\n        xyzs = xyzs.view(-1, 3)\n        mask = (rast[..., 3:] > 0).view(-1).detach()\n\n        # do the lighting here since we have normal from mesh now.\n        albedo = torch.zeros_like(xyzs, dtype=torch.float32)\n        if mask.any():\n            masked_albedo = self.density(xyzs[mask])['albedo']\n            albedo[mask] = masked_albedo.float()\n        albedo = albedo.view(-1, h, w, 3)\n\n        # these two modes lead to no parameters to optimize if using --lock_geo.\n        if self.opt.lock_geo and shading in ['textureless', 'normal']:\n            shading = 'lambertian'\n\n        if shading == 'albedo':\n            color = albedo\n        elif shading == 'textureless':\n            lambertian = ambient_ratio + (1 - ambient_ratio)  * (normal * light_d).sum(-1).float().clamp(min=0)\n            color = lambertian.unsqueeze(-1).repeat(1, 1, 1, 3)\n        elif shading == 'normal':\n            color = (normal + 1) / 2\n        else: # 'lambertian'\n            lambertian = ambient_ratio + (1 - ambient_ratio)  * (normal * light_d).sum(-1).float().clamp(min=0)\n            color = albedo * lambertian.unsqueeze(-1)\n\n        color = dr.antialias(color, rast, verts_clip, faces).clamp(0, 1) # [B, H, W, 3]\n        alpha = dr.antialias(alpha, rast, verts_clip, faces).clamp(0, 1) # [B, H, W, 1]\n\n        # mix background color\n        if bg_color is None:\n            if self.opt.bg_radius > 0:\n                # use the bg model to calculate bg_color\n                bg_color = self.background(rays_d) # [N, 3]\n            else:\n                bg_color = 1\n        \n        if torch.is_tensor(bg_color) and len(bg_color.shape) > 1:\n            bg_color = bg_color.view(-1, h, w, 3)\n        \n        depth = rast[:, :, :, [2]] # [B, H, W]\n        color = color + (1 - alpha) * bg_color\n\n        results['depth'] = depth        \n        results['image'] = color\n        results['weights_sum'] = alpha.squeeze(-1)\n\n        if self.opt.lambda_2d_normal_smooth > 0 or self.opt.lambda_normal > 0:\n            normal_image = dr.antialias((normal + 1) / 2, rast, verts_clip, faces).clamp(0, 1) # [B, H, W, 3]\n            results['normal_image'] = normal_image\n        \n        # regularizations\n        if self.training:\n            if self.opt.lambda_mesh_normal > 0:\n                results['normal_loss'] = normal_consistency(face_normals, faces)\n            if self.opt.lambda_mesh_laplacian > 0:\n                results['lap_loss'] = laplacian_smooth_loss(verts, faces)\n\n        return results\n\n    def run_taichi(self, rays_o, rays_d, light_d=None, ambient_ratio=1.0, shading='albedo', bg_color=None, perturb=False, T_thresh=1e-4, **kwargs):\n        # rays_o, rays_d: [B, N, 3], assumes B == 1\n        # return: image: [B, N, 3], depth: [B, N]\n\n        prefix = rays_o.shape[:-1]\n        rays_o = rays_o.contiguous().view(-1, 3)\n        rays_d = rays_d.contiguous().view(-1, 3)\n\n        N = rays_o.shape[0] # N = B * N, in fact\n        device = rays_o.device\n\n        # pre-calculate near far\n        exp_step_factor = kwargs.get('exp_step_factor', 0.)\n        MAX_SAMPLES = 1024\n        NEAR_DISTANCE = 0.01\n        center = torch.zeros(1, 3)\n        half_size = torch.ones(1, 3)\n        _, hits_t, _ = self.ray_aabb_intersector.apply(rays_o, rays_d, center, half_size, 1)\n        hits_t[(hits_t[:, 0, 0] >= 0) & (hits_t[:, 0, 0] < NEAR_DISTANCE), 0, 0] = NEAR_DISTANCE\n\n        # TODO: should sample different light_d for each batch... but taichi end doesn't have a flatten_ray implemented currently...\n        # random sample light_d if not provided\n        if light_d is None:\n            # gaussian noise around the ray origin, so the light always face the view dir (avoid dark face)\n            light_d = (rays_o[0] + torch.randn(3, device=device, dtype=torch.float))\n            light_d = safe_normalize(light_d)\n\n        results = {}\n\n        if self.training:\n            rays_a, xyzs, dirs, deltas, ts, _ = self.ray_marching(rays_o, rays_d, hits_t[:, 0], self.density_bitfield, self.cascade, self.bound, exp_step_factor, self.grid_size, MAX_SAMPLES)\n            dirs = safe_normalize(dirs)\n            # plot_pointcloud(xyzs.reshape(-1, 3).detach().cpu().numpy())\n            sigmas, rgbs, normals = self(xyzs, dirs, light_d, ratio=ambient_ratio, shading=shading)\n            _, weights_sum, depth, image, weights = self.volume_render(sigmas, rgbs, deltas, ts, rays_a, kwargs.get('T_threshold', 1e-4))\n            \n            # normals related regularizations\n            if self.opt.lambda_orient > 0 and normals is not None:\n                # orientation loss \n                loss_orient = weights.detach() * (normals * dirs).sum(-1).clamp(min=0) ** 2\n                results['loss_orient'] = loss_orient.mean()\n            \n            if self.opt.lambda_3d_normal_smooth > 0 and normals is not None:\n                normals_perturb = self.normal(xyzs + torch.randn_like(xyzs) * 1e-2)\n                results['loss_normal_perturb'] = (normals - normals_perturb).abs().mean()\n            \n            if (self.opt.lambda_2d_normal_smooth > 0 or self.opt.lambda_normal > 0) and normals is not None:\n                _, _, _, normal_image, _ = self.volume_render(sigmas.detach(), (normals + 1) / 2, deltas, ts, rays_a, kwargs.get('T_threshold', 1e-4))\n                results['normal_image'] = normal_image\n            \n            # weights normalization\n            results['weights'] = weights\n\n        else:\n        \n            # allocate outputs \n            dtype = torch.float32\n            \n            weights_sum = torch.zeros(N, dtype=dtype, device=device)\n            depth = torch.zeros(N, dtype=dtype, device=device)\n            image = torch.zeros(N, 3, dtype=dtype, device=device)\n            \n            n_alive = N\n            rays_alive = torch.arange(n_alive, dtype=torch.int32, device=device) # [N]\n            rays_t = hits_t[:, 0, 0]\n            step = 0\n            \n            min_samples = 1 if exp_step_factor == 0 else 4\n\n            while step < self.opt.max_steps: # hard coded max step\n\n                # count alive rays \n                n_alive = rays_alive.shape[0]\n\n                # exit loop\n                if n_alive <= 0:\n                    break\n\n                # decide compact_steps\n                # n_step = max(min(N // n_alive, 8), 1)\n                n_step = max(min(N // n_alive, 64), min_samples)\n\n                xyzs, dirs, deltas, ts, N_eff_samples = \\\n                self.raymarching_test_taichi(rays_o, rays_d, hits_t[:, 0], rays_alive,\n                                    self.density_bitfield, self.cascade,\n                                    self.bound, exp_step_factor,\n                                    self.grid_size, MAX_SAMPLES, n_step)\n\n                xyzs = self.rearrange(xyzs, 'n1 n2 c -> (n1 n2) c')\n                dirs = self.rearrange(dirs, 'n1 n2 c -> (n1 n2) c')\n                dirs = safe_normalize(dirs)\n                valid_mask = ~torch.all(dirs == 0, dim=1)\n                if valid_mask.sum() == 0:\n                    break\n\n                sigmas = torch.zeros(len(xyzs), device=device)\n                rgbs = torch.zeros(len(xyzs), 3, device=device)\n                normals = torch.zeros(len(xyzs), 3, device=device)\n\n                sigmas[valid_mask], _rgbs, normals = self(xyzs[valid_mask], dirs[valid_mask], light_d, ratio=ambient_ratio, shading=shading)\n                rgbs[valid_mask] = _rgbs.float()\n                sigmas = self.rearrange(sigmas, '(n1 n2) -> n1 n2', n2=n_step)\n                rgbs = self.rearrange(rgbs, '(n1 n2) c -> n1 n2 c', n2=n_step)\n                if normals is not None:\n                    normals = self.rearrange(normals, '(n1 n2) c -> n1 n2 c', n2=n_step)\n\n                self.composite_test_fw(sigmas, rgbs, deltas, ts, hits_t[:,0], rays_alive,\n                                    kwargs.get('T_threshold', 1e-4), N_eff_samples,\n                                    weights_sum, depth, image)\n\n                rays_alive = rays_alive[rays_alive >= 0]\n\n                step += n_step\n\n        # mix background color\n        if bg_color is None:\n            if self.opt.bg_radius > 0:\n                # use the bg model to calculate bg_color\n                bg_color = self.background(rays_d) # [N, 3]\n            else:\n                bg_color = 1\n\n        image = image + self.rearrange(1 - weights_sum, 'n -> n 1') * bg_color\n        image = image.view(*prefix, 3)\n\n        depth = depth.view(*prefix)\n\n        weights_sum = weights_sum.reshape(*prefix)\n\n        results['image'] = image\n        results['depth'] = depth\n        results['weights_sum'] = weights_sum\n        \n        return results\n\n\n    @torch.no_grad()\n    def update_extra_state(self, decay=0.95, S=128):\n        # call before each epoch to update extra states.\n\n        if not (self.cuda_ray or self.taichi_ray):\n            return \n        \n        ### update density grid\n        tmp_grid = - torch.ones_like(self.density_grid)\n        \n        X = torch.arange(self.grid_size, dtype=torch.int32, device=self.aabb_train.device).split(S)\n        Y = torch.arange(self.grid_size, dtype=torch.int32, device=self.aabb_train.device).split(S)\n        Z = torch.arange(self.grid_size, dtype=torch.int32, device=self.aabb_train.device).split(S)\n\n        for xs in X:\n            for ys in Y:\n                for zs in Z:\n                    \n                    # construct points\n                    xx, yy, zz = custom_meshgrid(xs, ys, zs)\n                    coords = torch.cat([xx.reshape(-1, 1), yy.reshape(-1, 1), zz.reshape(-1, 1)], dim=-1) # [N, 3], in [0, 128)\n                    indices = raymarching.morton3D(coords).long() # [N]\n                    xyzs = 2 * coords.float() / (self.grid_size - 1) - 1 # [N, 3] in [-1, 1]\n\n                    # cascading\n                    for cas in range(self.cascade):\n                        bound = min(2 ** cas, self.bound)\n                        half_grid_size = bound / self.grid_size\n                        # scale to current cascade's resolution\n                        cas_xyzs = xyzs * (bound - half_grid_size)\n                        # add noise in [-hgs, hgs]\n                        cas_xyzs += (torch.rand_like(cas_xyzs) * 2 - 1) * half_grid_size\n                        # query density\n                        sigmas = self.density(cas_xyzs)['sigma'].reshape(-1).detach()\n                        # assign \n                        tmp_grid[cas, indices] = sigmas\n        # ema update\n        valid_mask = self.density_grid >= 0\n        self.density_grid[valid_mask] = torch.maximum(self.density_grid[valid_mask] * decay, tmp_grid[valid_mask])\n        self.mean_density = torch.mean(self.density_grid[valid_mask]).item()\n        self.iter_density += 1\n\n        # convert to bitfield\n        density_thresh = min(self.mean_density, self.density_thresh)\n        if self.cuda_ray:\n            self.density_bitfield = raymarching.packbits(self.density_grid, density_thresh, self.density_bitfield)\n        elif self.taichi_ray:\n            self.packbits_taichi(self.density_grid.reshape(-1).contiguous(), density_thresh, self.density_bitfield)\n\n        # print(f'[density grid] min={self.density_grid.min().item():.4f}, max={self.density_grid.max().item():.4f}, mean={self.mean_density:.4f}, occ_rate={(self.density_grid > density_thresh).sum() / (128**3 * self.cascade):.3f}')\n\n\n    def render(self, rays_o, rays_d, mvp, h, w, staged=False, max_ray_batch=4096, **kwargs):\n        # rays_o, rays_d: [B, N, 3]\n        # return: pred_rgb: [B, N, 3]\n        B, N = rays_o.shape[:2]\n        device = rays_o.device\n\n        if self.dmtet:\n            results = self.run_dmtet(rays_o, rays_d, mvp, h, w, **kwargs)\n        elif self.cuda_ray:\n            results = self.run_cuda(rays_o, rays_d, **kwargs)\n        elif self.taichi_ray:\n            results = self.run_taichi(rays_o, rays_d, **kwargs)\n        else:\n            if staged:\n                depth = torch.empty((B, N), device=device)\n                image = torch.empty((B, N, 3), device=device)\n                weights_sum = torch.empty((B, N), device=device)\n\n                for b in range(B):\n                    head = 0\n                    while head < N:\n                        tail = min(head + max_ray_batch, N)\n                        results_ = self.run(rays_o[b:b+1, head:tail], rays_d[b:b+1, head:tail], **kwargs)\n                        depth[b:b+1, head:tail] = results_['depth']\n                        weights_sum[b:b+1, head:tail] = results_['weights_sum']\n                        image[b:b+1, head:tail] = results_['image']\n                        head += max_ray_batch\n                \n                results = {}\n                results['depth'] = depth\n                results['image'] = image\n                results['weights_sum'] = weights_sum\n\n            else:\n                results = self.run(rays_o, rays_d, **kwargs)\n\n        return results\n"
  },
  {
    "path": "stable-dreamfusion/nerf/utils.py",
    "content": "import os\nimport gc\nimport glob\nimport tqdm\nimport math\nimport imageio\nimport psutil\nfrom pathlib import Path\nimport random\nimport shutil\nimport warnings\nimport tensorboardX\n\nimport numpy as np\n\nimport time\n\nimport cv2\nimport matplotlib.pyplot as plt\n\nimport torch\nimport torch.nn as nn\nimport torch.optim as optim\nimport torch.nn.functional as F\nimport torch.distributed as dist\nimport torchvision.transforms.functional as TF\nfrom torchmetrics import PearsonCorrCoef\n\nfrom rich.console import Console\nfrom torch_ema import ExponentialMovingAverage\n\nfrom packaging import version as pver\n\ndef adjust_text_embeddings(embeddings, azimuth, opt):\n    text_z_list = []\n    weights_list = []\n    K = 0\n    for b in range(azimuth.shape[0]):\n        text_z_, weights_ = get_pos_neg_text_embeddings(embeddings, azimuth[b], opt)\n        K = max(K, weights_.shape[0])\n        text_z_list.append(text_z_)\n        weights_list.append(weights_)\n\n    # Interleave text_embeddings from different dirs to form a batch\n    text_embeddings = []\n    for i in range(K):\n        for text_z in text_z_list:\n            # if uneven length, pad with the first embedding\n            text_embeddings.append(text_z[i] if i < len(text_z) else text_z[0])\n    text_embeddings = torch.stack(text_embeddings, dim=0) # [B * K, 77, 768]\n\n    # Interleave weights from different dirs to form a batch\n    weights = []\n    for i in range(K):\n        for weights_ in weights_list:\n            weights.append(weights_[i] if i < len(weights_) else torch.zeros_like(weights_[0]))\n    weights = torch.stack(weights, dim=0) # [B * K]\n    return text_embeddings, weights\n\ndef get_pos_neg_text_embeddings(embeddings, azimuth_val, opt):\n    if azimuth_val >= -90 and azimuth_val < 90:\n        if azimuth_val >= 0:\n            r = 1 - azimuth_val / 90\n        else:\n            r = 1 + azimuth_val / 90\n        start_z = embeddings['front']\n        end_z = embeddings['side']\n        # if random.random() < 0.3:\n        #     r = r + random.gauss(0, 0.08)\n        pos_z = r * start_z + (1 - r) * end_z\n        text_z = torch.cat([pos_z, embeddings['front'], embeddings['side']], dim=0)\n        if r > 0.8:\n            front_neg_w = 0.0\n        else:\n            front_neg_w = math.exp(-r * opt.front_decay_factor) * opt.negative_w\n        if r < 0.2:\n            side_neg_w = 0.0\n        else:\n            side_neg_w = math.exp(-(1-r) * opt.side_decay_factor) * opt.negative_w\n\n        weights = torch.tensor([1.0, front_neg_w, side_neg_w])\n    else:\n        if azimuth_val >= 0:\n            r = 1 - (azimuth_val - 90) / 90\n        else:\n            r = 1 + (azimuth_val + 90) / 90\n        start_z = embeddings['side']\n        end_z = embeddings['back']\n        # if random.random() < 0.3:\n        #     r = r + random.gauss(0, 0.08)\n        pos_z = r * start_z + (1 - r) * end_z\n        text_z = torch.cat([pos_z, embeddings['side'], embeddings['front']], dim=0)\n        front_neg_w = opt.negative_w \n        if r > 0.8:\n            side_neg_w = 0.0\n        else:\n            side_neg_w = math.exp(-r * opt.side_decay_factor) * opt.negative_w / 2\n\n        weights = torch.tensor([1.0, side_neg_w, front_neg_w])\n    return text_z, weights.to(text_z.device)\n\ndef custom_meshgrid(*args):\n    # ref: https://pytorch.org/docs/stable/generated/torch.meshgrid.html?highlight=meshgrid#torch.meshgrid\n    if pver.parse(torch.__version__) < pver.parse('1.10'):\n        return torch.meshgrid(*args)\n    else:\n        return torch.meshgrid(*args, indexing='ij')\n\ndef safe_normalize(x, eps=1e-20):\n    return x / torch.sqrt(torch.clamp(torch.sum(x * x, -1, keepdim=True), min=eps))\n\n@torch.cuda.amp.autocast(enabled=False)\ndef get_rays(poses, intrinsics, H, W, N=-1, error_map=None):\n    ''' get rays\n    Args:\n        poses: [B, 4, 4], cam2world\n        intrinsics: [4]\n        H, W, N: int\n        error_map: [B, 128 * 128], sample probability based on training error\n    Returns:\n        rays_o, rays_d: [B, N, 3]\n        inds: [B, N]\n    '''\n\n    device = poses.device\n    B = poses.shape[0]\n    fx, fy, cx, cy = intrinsics\n\n    i, j = custom_meshgrid(torch.linspace(0, W-1, W, device=device), torch.linspace(0, H-1, H, device=device))\n    i = i.t().reshape([1, H*W]).expand([B, H*W]) + 0.5\n    j = j.t().reshape([1, H*W]).expand([B, H*W]) + 0.5\n\n    results = {}\n\n    if N > 0:\n        N = min(N, H*W)\n\n        if error_map is None:\n            inds = torch.randint(0, H*W, size=[N], device=device) # may duplicate\n            inds = inds.expand([B, N])\n        else:\n\n            # weighted sample on a low-reso grid\n            inds_coarse = torch.multinomial(error_map.to(device), N, replacement=False) # [B, N], but in [0, 128*128)\n\n            # map to the original resolution with random perturb.\n            inds_x, inds_y = inds_coarse // 128, inds_coarse % 128 # `//` will throw a warning in torch 1.10... anyway.\n            sx, sy = H / 128, W / 128\n            inds_x = (inds_x * sx + torch.rand(B, N, device=device) * sx).long().clamp(max=H - 1)\n            inds_y = (inds_y * sy + torch.rand(B, N, device=device) * sy).long().clamp(max=W - 1)\n            inds = inds_x * W + inds_y\n\n            results['inds_coarse'] = inds_coarse # need this when updating error_map\n\n        i = torch.gather(i, -1, inds)\n        j = torch.gather(j, -1, inds)\n\n        results['inds'] = inds\n\n    else:\n        inds = torch.arange(H*W, device=device).expand([B, H*W])\n\n    zs = - torch.ones_like(i)\n    xs = - (i - cx) / fx * zs\n    ys = (j - cy) / fy * zs\n    directions = torch.stack((xs, ys, zs), dim=-1)\n    # directions = safe_normalize(directions)\n    rays_d = directions @ poses[:, :3, :3].transpose(-1, -2) # (B, N, 3)\n\n    rays_o = poses[..., :3, 3] # [B, 3]\n    rays_o = rays_o[..., None, :].expand_as(rays_d) # [B, N, 3]\n\n    results['rays_o'] = rays_o\n    results['rays_d'] = rays_d\n\n    return results\n\n\ndef seed_everything(seed):\n    random.seed(seed)\n    os.environ['PYTHONHASHSEED'] = str(seed)\n    np.random.seed(seed)\n    torch.manual_seed(seed)\n    torch.cuda.manual_seed(seed)\n    #torch.backends.cudnn.deterministic = True\n    #torch.backends.cudnn.benchmark = True\n\n\n@torch.jit.script\ndef linear_to_srgb(x):\n    return torch.where(x < 0.0031308, 12.92 * x, 1.055 * x ** 0.41666 - 0.055)\n\n\n@torch.jit.script\ndef srgb_to_linear(x):\n    return torch.where(x < 0.04045, x / 12.92, ((x + 0.055) / 1.055) ** 2.4)\n\n\nclass Trainer(object):\n    def __init__(self,\n\t\t         argv, # command line args\n                 name, # name of this experiment\n                 opt, # extra conf\n                 model, # network\n                 guidance, # guidance network\n                 criterion=None, # loss function, if None, assume inline implementation in train_step\n                 optimizer=None, # optimizer\n                 ema_decay=None, # if use EMA, set the decay\n                 lr_scheduler=None, # scheduler\n                 metrics=[], # metrics for evaluation, if None, use val_loss to measure performance, else use the first metric.\n                 local_rank=0, # which GPU am I\n                 world_size=1, # total num of GPUs\n                 device=None, # device to use, usually setting to None is OK. (auto choose device)\n                 mute=False, # whether to mute all print\n                 fp16=False, # amp optimize level\n                 max_keep_ckpt=2, # max num of saved ckpts in disk\n                 workspace='workspace', # workspace to save logs & ckpts\n                 best_mode='min', # the smaller/larger result, the better\n                 use_loss_as_metric=True, # use loss as the first metric\n                 report_metric_at_train=False, # also report metrics at training\n                 use_checkpoint=\"latest\", # which ckpt to use at init time\n                 use_tensorboardX=True, # whether to use tensorboard for logging\n                 scheduler_update_every_step=False, # whether to call scheduler.step() after every train step\n                 ):\n\n        self.argv = argv\n        self.name = name\n        self.opt = opt\n        self.mute = mute\n        self.metrics = metrics\n        self.local_rank = local_rank\n        self.world_size = world_size\n        self.workspace = workspace\n        self.ema_decay = ema_decay\n        self.fp16 = fp16\n        self.best_mode = best_mode\n        self.use_loss_as_metric = use_loss_as_metric\n        self.report_metric_at_train = report_metric_at_train\n        self.max_keep_ckpt = max_keep_ckpt\n        self.use_checkpoint = use_checkpoint\n        self.use_tensorboardX = use_tensorboardX\n        self.time_stamp = time.strftime(\"%Y-%m-%d_%H-%M-%S\")\n        self.scheduler_update_every_step = scheduler_update_every_step\n        self.device = device if device is not None else torch.device(f'cuda:{local_rank}' if torch.cuda.is_available() else 'cpu')\n        self.console = Console()\n\n        model.to(self.device)\n        if self.world_size > 1:\n            model = torch.nn.SyncBatchNorm.convert_sync_batchnorm(model)\n            model = torch.nn.parallel.DistributedDataParallel(model, device_ids=[local_rank])\n        self.model = model\n\n        # guide model\n        self.guidance = guidance\n        self.embeddings = {}\n\n        # text prompt / images\n        if self.guidance is not None:\n            for key in self.guidance:\n                for p in self.guidance[key].parameters():\n                    p.requires_grad = False\n                self.embeddings[key] = {}\n            self.prepare_embeddings()\n\n        if isinstance(criterion, nn.Module):\n            criterion.to(self.device)\n        self.criterion = criterion\n\n        if self.opt.images is not None:\n            self.pearson = PearsonCorrCoef().to(self.device)\n\n        if optimizer is None:\n            self.optimizer = optim.Adam(self.model.parameters(), lr=0.001, weight_decay=5e-4) # naive adam\n        else:\n            self.optimizer = optimizer(self.model)\n\n        if lr_scheduler is None:\n            self.lr_scheduler = optim.lr_scheduler.LambdaLR(self.optimizer, lr_lambda=lambda epoch: 1) # fake scheduler\n        else:\n            self.lr_scheduler = lr_scheduler(self.optimizer)\n\n        if ema_decay is not None:\n            self.ema = ExponentialMovingAverage(self.model.parameters(), decay=ema_decay)\n        else:\n            self.ema = None\n\n        self.scaler = torch.cuda.amp.GradScaler(enabled=self.fp16)\n\n        # variable init\n        self.total_train_t = 0\n        self.epoch = 0\n        self.global_step = 0\n        self.local_step = 0\n        self.stats = {\n            \"loss\": [],\n            \"valid_loss\": [],\n            \"results\": [], # metrics[0], or valid_loss\n            \"checkpoints\": [], # record path of saved ckpt, to automatically remove old ckpt\n            \"best_result\": None,\n        }\n\n        # auto fix\n        if len(metrics) == 0 or self.use_loss_as_metric:\n            self.best_mode = 'min'\n\n        # workspace prepare\n        self.log_ptr = None\n        if self.workspace is not None:\n            os.makedirs(self.workspace, exist_ok=True)\n            self.log_path = os.path.join(workspace, f\"log_{self.name}.txt\")\n            self.log_ptr = open(self.log_path, \"a+\")\n\n            self.ckpt_path = os.path.join(self.workspace, 'checkpoints')\n            self.best_path = f\"{self.ckpt_path}/{self.name}.pth\"\n            os.makedirs(self.ckpt_path, exist_ok=True)\n\n            # Save a copy of image_config in the experiment workspace\n            if opt.image_config is not None:\n                shutil.copyfile(opt.image_config, os.path.join(self.workspace, os.path.basename(opt.image_config)))\n\n            # Save a copy of images in the experiment workspace\n            if opt.images is not None:\n                for image_file in opt.images:\n                    shutil.copyfile(image_file, os.path.join(self.workspace, os.path.basename(image_file)))\n\n        self.log(f'[INFO] Cmdline: {self.argv}')\n        self.log(f'[INFO] opt: {self.opt}')\n        self.log(f'[INFO] Trainer: {self.name} | {self.time_stamp} | {self.device} | {\"fp16\" if self.fp16 else \"fp32\"} | {self.workspace}')\n        self.log(f'[INFO] #parameters: {sum([p.numel() for p in model.parameters() if p.requires_grad])}')\n\n        if self.workspace is not None:\n            if self.use_checkpoint == \"scratch\":\n                self.log(\"[INFO] Training from scratch ...\")\n            elif self.use_checkpoint == \"latest\":\n                self.log(\"[INFO] Loading latest checkpoint ...\")\n                self.load_checkpoint()\n            elif self.use_checkpoint == \"latest_model\":\n                self.log(\"[INFO] Loading latest checkpoint (model only)...\")\n                self.load_checkpoint(model_only=True)\n            elif self.use_checkpoint == \"best\":\n                if os.path.exists(self.best_path):\n                    self.log(\"[INFO] Loading best checkpoint ...\")\n                    self.load_checkpoint(self.best_path)\n                else:\n                    self.log(f\"[INFO] {self.best_path} not found, loading latest ...\")\n                    self.load_checkpoint()\n            else: # path to ckpt\n                self.log(f\"[INFO] Loading {self.use_checkpoint} ...\")\n                self.load_checkpoint(self.use_checkpoint)\n\n    # calculate the text embs.\n    @torch.no_grad()\n    def prepare_embeddings(self):\n\n        # text embeddings (stable-diffusion)\n        if self.opt.text is not None:\n\n            if 'SD' in self.guidance:\n                self.embeddings['SD']['default'] = self.guidance['SD'].get_text_embeds([self.opt.text])\n                self.embeddings['SD']['uncond'] = self.guidance['SD'].get_text_embeds([self.opt.negative])\n\n                for d in ['front', 'side', 'back']:\n                    self.embeddings['SD'][d] = self.guidance['SD'].get_text_embeds([f\"{self.opt.text}, {d} view\"])\n\n            if 'IF' in self.guidance:\n                self.embeddings['IF']['default'] = self.guidance['IF'].get_text_embeds([self.opt.text])\n                self.embeddings['IF']['uncond'] = self.guidance['IF'].get_text_embeds([self.opt.negative])\n\n                for d in ['front', 'side', 'back']:\n                    self.embeddings['IF'][d] = self.guidance['IF'].get_text_embeds([f\"{self.opt.text}, {d} view\"])\n\n            if 'clip' in self.guidance:\n                self.embeddings['clip']['text'] = self.guidance['clip'].get_text_embeds(self.opt.text)\n\n        if self.opt.images is not None:\n\n            h = int(self.opt.known_view_scale * self.opt.h)\n            w = int(self.opt.known_view_scale * self.opt.w)\n\n            # load processed image\n            for image in self.opt.images:\n                assert image.endswith('_rgba.png') # the rest of this code assumes that the _rgba image has been passed.\n            rgbas = [cv2.cvtColor(cv2.imread(image, cv2.IMREAD_UNCHANGED), cv2.COLOR_BGRA2RGBA) for image in self.opt.images]\n            rgba_hw = np.stack([cv2.resize(rgba, (w, h), interpolation=cv2.INTER_AREA).astype(np.float32) / 255 for rgba in rgbas])\n            rgb_hw = rgba_hw[..., :3] * rgba_hw[..., 3:] + (1 - rgba_hw[..., 3:])\n            self.rgb = torch.from_numpy(rgb_hw).permute(0,3,1,2).contiguous().to(self.device)\n            self.mask = torch.from_numpy(rgba_hw[..., 3] > 0.5).to(self.device)\n            print(f'[INFO] dataset: load image prompt {self.opt.images} {self.rgb.shape}')\n\n            # load depth\n            depth_paths = [image.replace('_rgba.png', '_depth.png') for image in self.opt.images]\n            depths = [cv2.imread(depth_path, cv2.IMREAD_UNCHANGED) for depth_path in depth_paths]\n            depth = np.stack([cv2.resize(depth, (w, h), interpolation=cv2.INTER_AREA) for depth in depths])\n            self.depth = torch.from_numpy(depth.astype(np.float32) / 255).to(self.device)  # TODO: this should be mapped to FP16\n            print(f'[INFO] dataset: load depth prompt {depth_paths} {self.depth.shape}')\n\n            # load normal   # TODO: don't load if normal loss is 0\n            normal_paths = [image.replace('_rgba.png', '_normal.png') for image in self.opt.images]\n            normals = [cv2.imread(normal_path, cv2.IMREAD_UNCHANGED) for normal_path in normal_paths]\n            normal = np.stack([cv2.resize(normal, (w, h), interpolation=cv2.INTER_AREA) for normal in normals])\n            self.normal = torch.from_numpy(normal.astype(np.float32) / 255).to(self.device)\n            print(f'[INFO] dataset: load normal prompt {normal_paths} {self.normal.shape}')\n\n            # encode embeddings for zero123\n            if 'zero123' in self.guidance:\n                rgba_256 = np.stack([cv2.resize(rgba, (256, 256), interpolation=cv2.INTER_AREA).astype(np.float32) / 255 for rgba in rgbas])\n                rgbs_256 = rgba_256[..., :3] * rgba_256[..., 3:] + (1 - rgba_256[..., 3:])\n                rgb_256 = torch.from_numpy(rgbs_256).permute(0,3,1,2).contiguous().to(self.device)\n                guidance_embeds = self.guidance['zero123'].get_img_embeds(rgb_256)\n                self.embeddings['zero123']['default'] = {\n                    'zero123_ws' : self.opt.zero123_ws,\n                    'c_crossattn' : guidance_embeds[0],\n                    'c_concat' : guidance_embeds[1],\n                    'ref_polars' : self.opt.ref_polars,\n                    'ref_azimuths' : self.opt.ref_azimuths,\n                    'ref_radii' : self.opt.ref_radii,\n                }\n\n            if 'clip' in self.guidance:\n                self.embeddings['clip']['image'] = self.guidance['clip'].get_img_embeds(self.rgb)\n\n\n    def __del__(self):\n        if self.log_ptr:\n            self.log_ptr.close()\n\n\n    def log(self, *args, **kwargs):\n        if self.local_rank == 0:\n            if not self.mute:\n                #print(*args)\n                self.console.print(*args, **kwargs)\n            if self.log_ptr:\n                print(*args, file=self.log_ptr)\n                self.log_ptr.flush() # write immediately to file\n\n    ### ------------------------------\n\n    def train_step(self, data, save_guidance_path:Path=None):\n        \"\"\"\n            Args:\n                save_guidance_path: an image that combines the NeRF render, the added latent noise,\n                    the denoised result and optionally the fully-denoised image.\n        \"\"\"\n\n        # perform RGBD loss instead of SDS if is image-conditioned\n        do_rgbd_loss = self.opt.images is not None and \\\n            (self.global_step % self.opt.known_view_interval == 0)\n\n        # override random camera with fixed known camera\n        if do_rgbd_loss:\n            data = self.default_view_data\n\n        # experiment iterations ratio\n        # i.e. what proportion of this experiment have we completed (in terms of iterations) so far?\n        exp_iter_ratio = (self.global_step - self.opt.exp_start_iter) / (self.opt.exp_end_iter - self.opt.exp_start_iter)\n\n        # progressively relaxing view range\n        if self.opt.progressive_view:\n            r = min(1.0, self.opt.progressive_view_init_ratio + 2.0*exp_iter_ratio)\n            self.opt.phi_range = [self.opt.default_azimuth * (1 - r) + self.opt.full_phi_range[0] * r,\n                                  self.opt.default_azimuth * (1 - r) + self.opt.full_phi_range[1] * r]\n            self.opt.theta_range = [self.opt.default_polar * (1 - r) + self.opt.full_theta_range[0] * r,\n                                    self.opt.default_polar * (1 - r) + self.opt.full_theta_range[1] * r]\n            self.opt.radius_range = [self.opt.default_radius * (1 - r) + self.opt.full_radius_range[0] * r,\n                                    self.opt.default_radius * (1 - r) + self.opt.full_radius_range[1] * r]\n            self.opt.fovy_range = [self.opt.default_fovy * (1 - r) + self.opt.full_fovy_range[0] * r,\n                                    self.opt.default_fovy * (1 - r) + self.opt.full_fovy_range[1] * r]\n\n        # progressively increase max_level\n        if self.opt.progressive_level:\n            self.model.max_level = min(1.0, 0.25 + 2.0*exp_iter_ratio)\n\n        rays_o = data['rays_o'] # [B, N, 3]\n        rays_d = data['rays_d'] # [B, N, 3]\n        mvp = data['mvp'] # [B, 4, 4]\n\n        B, N = rays_o.shape[:2]\n        H, W = data['H'], data['W']\n\n        # When ref_data has B images > opt.batch_size\n        if B > self.opt.batch_size:\n            # choose batch_size images out of those B images\n            choice = torch.randperm(B)[:self.opt.batch_size]\n            B = self.opt.batch_size\n            rays_o = rays_o[choice]\n            rays_d = rays_d[choice]\n            mvp = mvp[choice]\n\n        if do_rgbd_loss:\n            ambient_ratio = 1.0\n            shading = 'lambertian' # use lambertian instead of albedo to get normal\n            as_latent = False\n            binarize = False\n            bg_color = torch.rand((B * N, 3), device=rays_o.device)\n\n            # add camera noise to avoid grid-like artifact\n            if self.opt.known_view_noise_scale > 0:\n                noise_scale = self.opt.known_view_noise_scale #* (1 - self.global_step / self.opt.iters)\n                rays_o = rays_o + torch.randn(3, device=self.device) * noise_scale\n                rays_d = rays_d + torch.randn(3, device=self.device) * noise_scale\n\n        elif exp_iter_ratio <= self.opt.latent_iter_ratio:\n            ambient_ratio = 1.0\n            shading = 'normal'\n            as_latent = True\n            binarize = False\n            bg_color = None\n\n        else:\n            if exp_iter_ratio <= self.opt.albedo_iter_ratio:\n                ambient_ratio = 1.0\n                shading = 'albedo'\n            else:\n                # random shading\n                ambient_ratio = self.opt.min_ambient_ratio + (1.0-self.opt.min_ambient_ratio) * random.random()\n                rand = random.random()\n                if rand >= (1.0 - self.opt.textureless_ratio):\n                    shading = 'textureless'\n                else:\n                    shading = 'lambertian'\n\n            as_latent = False\n\n            # random weights binarization (like mobile-nerf) [NOT WORKING NOW]\n            # binarize_thresh = min(0.5, -0.5 + self.global_step / self.opt.iters)\n            # binarize = random.random() < binarize_thresh\n            binarize = False\n\n            # random background\n            rand = random.random()\n            if self.opt.bg_radius > 0 and rand > 0.5:\n                bg_color = None # use bg_net\n            else:\n                bg_color = torch.rand(3).to(self.device) # single color random bg\n\n        outputs = self.model.render(rays_o, rays_d, mvp, H, W, staged=False, perturb=True, bg_color=bg_color, ambient_ratio=ambient_ratio, shading=shading, binarize=binarize)\n        pred_depth = outputs['depth'].reshape(B, 1, H, W)\n        pred_mask = outputs['weights_sum'].reshape(B, 1, H, W)\n        if 'normal_image' in outputs:\n            pred_normal = outputs['normal_image'].reshape(B, H, W, 3)\n\n        if as_latent:\n            # abuse normal & mask as latent code for faster geometry initialization (ref: fantasia3D)\n            pred_rgb = torch.cat([outputs['image'], outputs['weights_sum'].unsqueeze(-1)], dim=-1).reshape(B, H, W, 4).permute(0, 3, 1, 2).contiguous() # [B, 4, H, W]\n        else:\n            pred_rgb = outputs['image'].reshape(B, H, W, 3).permute(0, 3, 1, 2).contiguous() # [B, 3, H, W]\n\n        # known view loss\n        if do_rgbd_loss:\n            gt_mask = self.mask # [B, H, W]\n            gt_rgb = self.rgb   # [B, 3, H, W]\n            gt_normal = self.normal # [B, H, W, 3]\n            gt_depth = self.depth   # [B, H, W]\n\n            if len(gt_rgb) > self.opt.batch_size:\n                gt_mask = gt_mask[choice]\n                gt_rgb = gt_rgb[choice]\n                gt_normal = gt_normal[choice]\n                gt_depth = gt_depth[choice]\n\n            # color loss\n            gt_rgb = gt_rgb * gt_mask[:, None].float() + bg_color.reshape(B, H, W, 3).permute(0,3,1,2).contiguous() * (1 - gt_mask[:, None].float())\n            loss = self.opt.lambda_rgb * F.mse_loss(pred_rgb, gt_rgb)\n\n            # mask loss\n            loss = loss + self.opt.lambda_mask * F.mse_loss(pred_mask[:, 0], gt_mask.float())\n\n            # normal loss\n            if self.opt.lambda_normal > 0 and 'normal_image' in outputs:\n                valid_gt_normal = 1 - 2 * gt_normal[gt_mask] # [B, 3]\n                valid_pred_normal = 2 * pred_normal[gt_mask] - 1 # [B, 3]\n\n                lambda_normal = self.opt.lambda_normal * min(1, self.global_step / self.opt.iters)\n                loss = loss + lambda_normal * (1 - F.cosine_similarity(valid_pred_normal, valid_gt_normal).mean())\n\n            # relative depth loss\n            if self.opt.lambda_depth > 0:\n                valid_gt_depth = gt_depth[gt_mask] # [B,]\n                valid_pred_depth = pred_depth[:, 0][gt_mask] # [B,]\n                lambda_depth = self.opt.lambda_depth * min(1, self.global_step / self.opt.iters)\n                loss = loss + lambda_depth * (1 - self.pearson(valid_pred_depth, valid_gt_depth))\n\n                # # scale-invariant\n                # with torch.no_grad():\n                #     A = torch.cat([valid_gt_depth, torch.ones_like(valid_gt_depth)], dim=-1) # [B, 2]\n                #     X = torch.linalg.lstsq(A, valid_pred_depth).solution # [2, 1]\n                #     valid_gt_depth = A @ X # [B, 1]\n                # lambda_depth = self.opt.lambda_depth #* min(1, self.global_step / self.opt.iters)\n                # loss = loss + lambda_depth * F.mse_loss(valid_pred_depth, valid_gt_depth)\n\n        # novel view loss\n        else:\n\n            loss = 0\n\n            if 'SD' in self.guidance:\n                # interpolate text_z\n                azimuth = data['azimuth'] # [-180, 180]\n\n                # ENHANCE: remove loop to handle batch size > 1\n                text_z = [self.embeddings['SD']['uncond']] * azimuth.shape[0]\n                if self.opt.perpneg:\n\n                    text_z_comp, weights = adjust_text_embeddings(self.embeddings['SD'], azimuth, self.opt)\n                    text_z.append(text_z_comp)\n\n                else:                \n                    for b in range(azimuth.shape[0]):\n                        if azimuth[b] >= -90 and azimuth[b] < 90:\n                            if azimuth[b] >= 0:\n                                r = 1 - azimuth[b] / 90\n                            else:\n                                r = 1 + azimuth[b] / 90\n                            start_z = self.embeddings['SD']['front']\n                            end_z = self.embeddings['SD']['side']\n                        else:\n                            if azimuth[b] >= 0:\n                                r = 1 - (azimuth[b] - 90) / 90\n                            else:\n                                r = 1 + (azimuth[b] + 90) / 90\n                            start_z = self.embeddings['SD']['side']\n                            end_z = self.embeddings['SD']['back']\n                        text_z.append(r * start_z + (1 - r) * end_z)\n\n                text_z = torch.cat(text_z, dim=0)\n                if self.opt.perpneg:\n                    loss = loss + self.guidance['SD'].train_step_perpneg(text_z, weights, pred_rgb, as_latent=as_latent, guidance_scale=self.opt.guidance_scale, grad_scale=self.opt.lambda_guidance,\n                                                    save_guidance_path=save_guidance_path)\n                else:\n                    loss = loss + self.guidance['SD'].train_step(text_z, pred_rgb, as_latent=as_latent, guidance_scale=self.opt.guidance_scale, grad_scale=self.opt.lambda_guidance,\n                                                                save_guidance_path=save_guidance_path)\n\n            if 'IF' in self.guidance:\n                # interpolate text_z\n                azimuth = data['azimuth'] # [-180, 180]\n\n                # ENHANCE: remove loop to handle batch size > 1\n                text_z = [self.embeddings['IF']['uncond']] * azimuth.shape[0]\n                if self.opt.perpneg:\n                    text_z_comp, weights = adjust_text_embeddings(self.embeddings['IF'], azimuth, self.opt)\n                    text_z.append(text_z_comp)\n                else:\n                    for b in range(azimuth.shape[0]):\n                        if azimuth[b] >= -90 and azimuth[b] < 90:\n                            if azimuth[b] >= 0:\n                                r = 1 - azimuth[b] / 90\n                            else:\n                                r = 1 + azimuth[b] / 90\n                            start_z = self.embeddings['IF']['front']\n                            end_z = self.embeddings['IF']['side']\n                        else:\n                            if azimuth[b] >= 0:\n                                r = 1 - (azimuth[b] - 90) / 90\n                            else:\n                                r = 1 + (azimuth[b] + 90) / 90\n                            start_z = self.embeddings['IF']['side']\n                            end_z = self.embeddings['IF']['back']\n                        text_z.append(r * start_z + (1 - r) * end_z)\n\n                text_z = torch.cat(text_z, dim=0)\n\n                if self.opt.perpneg:\n                    loss = loss + self.guidance['IF'].train_step_perpneg(text_z, weights, pred_rgb, guidance_scale=self.opt.guidance_scale, grad_scale=self.opt.lambda_guidance)\n                else:\n                    loss = loss + self.guidance['IF'].train_step(text_z, pred_rgb, guidance_scale=self.opt.guidance_scale, grad_scale=self.opt.lambda_guidance)\n                    \n            if 'zero123' in self.guidance:\n\n                polar = data['polar']\n                azimuth = data['azimuth']\n                radius = data['radius']\n\n                loss = loss + self.guidance['zero123'].train_step(self.embeddings['zero123']['default'], pred_rgb, polar, azimuth, radius, guidance_scale=self.opt.guidance_scale,\n                                                                  as_latent=as_latent, grad_scale=self.opt.lambda_guidance, save_guidance_path=save_guidance_path)\n\n            if 'clip' in self.guidance:\n\n                # empirical, far view should apply smaller CLIP loss\n                lambda_guidance = 10 * (1 - abs(azimuth) / 180) * self.opt.lambda_guidance\n\n                loss = loss + self.guidance['clip'].train_step(self.embeddings['clip'], pred_rgb, grad_scale=lambda_guidance)\n\n        # regularizations\n        if not self.opt.dmtet:\n\n            if self.opt.lambda_opacity > 0:\n                loss_opacity = (outputs['weights_sum'] ** 2).mean()\n                loss = loss + self.opt.lambda_opacity * loss_opacity\n\n            if self.opt.lambda_entropy > 0:\n                alphas = outputs['weights'].clamp(1e-5, 1 - 1e-5)\n                # alphas = alphas ** 2 # skewed entropy, favors 0 over 1\n                loss_entropy = (- alphas * torch.log2(alphas) - (1 - alphas) * torch.log2(1 - alphas)).mean()\n                lambda_entropy = self.opt.lambda_entropy * min(1, 2 * self.global_step / self.opt.iters)\n                loss = loss + lambda_entropy * loss_entropy\n\n            if self.opt.lambda_2d_normal_smooth > 0 and 'normal_image' in outputs:\n                # pred_vals = outputs['normal_image'].reshape(B, H, W, 3).permute(0, 3, 1, 2).contiguous()\n                # smoothed_vals = TF.gaussian_blur(pred_vals.detach(), kernel_size=9)\n                # loss_smooth = F.mse_loss(pred_vals, smoothed_vals)\n                # total-variation\n                loss_smooth = (pred_normal[:, 1:, :, :] - pred_normal[:, :-1, :, :]).square().mean() + \\\n                              (pred_normal[:, :, 1:, :] - pred_normal[:, :, :-1, :]).square().mean()\n                loss = loss + self.opt.lambda_2d_normal_smooth * loss_smooth\n\n            if self.opt.lambda_orient > 0 and 'loss_orient' in outputs:\n                loss_orient = outputs['loss_orient']\n                loss = loss + self.opt.lambda_orient * loss_orient\n\n            if self.opt.lambda_3d_normal_smooth > 0 and 'loss_normal_perturb' in outputs:\n                loss_normal_perturb = outputs['loss_normal_perturb']\n                loss = loss + self.opt.lambda_3d_normal_smooth * loss_normal_perturb\n\n        else:\n\n            if self.opt.lambda_mesh_normal > 0:\n                loss = loss + self.opt.lambda_mesh_normal * outputs['normal_loss']\n\n            if self.opt.lambda_mesh_laplacian > 0:\n                loss = loss + self.opt.lambda_mesh_laplacian * outputs['lap_loss']\n\n        return pred_rgb, pred_depth, loss\n\n    def post_train_step(self):\n\n        # unscale grad before modifying it!\n        # ref: https://pytorch.org/docs/stable/notes/amp_examples.html#gradient-clipping\n        self.scaler.unscale_(self.optimizer)\n\n        # clip grad\n        if self.opt.grad_clip >= 0:\n            torch.nn.utils.clip_grad_value_(self.model.parameters(), self.opt.grad_clip)\n\n        if not self.opt.dmtet and self.opt.backbone == 'grid':\n\n            if self.opt.lambda_tv > 0:\n                lambda_tv = min(1.0, self.global_step / (0.5 * self.opt.iters)) * self.opt.lambda_tv\n                self.model.encoder.grad_total_variation(lambda_tv, None, self.model.bound)\n            if self.opt.lambda_wd > 0:\n                self.model.encoder.grad_weight_decay(self.opt.lambda_wd)\n\n    def eval_step(self, data):\n\n        rays_o = data['rays_o'] # [B, N, 3]\n        rays_d = data['rays_d'] # [B, N, 3]\n        mvp = data['mvp']\n\n        B, N = rays_o.shape[:2]\n        H, W = data['H'], data['W']\n\n        shading = data['shading'] if 'shading' in data else 'albedo'\n        ambient_ratio = data['ambient_ratio'] if 'ambient_ratio' in data else 1.0\n        light_d = data['light_d'] if 'light_d' in data else None\n\n        outputs = self.model.render(rays_o, rays_d, mvp, H, W, staged=True, perturb=False, bg_color=None, light_d=light_d, ambient_ratio=ambient_ratio, shading=shading)\n        pred_rgb = outputs['image'].reshape(B, H, W, 3)\n        pred_depth = outputs['depth'].reshape(B, H, W)\n\n        # dummy\n        loss = torch.zeros([1], device=pred_rgb.device, dtype=pred_rgb.dtype)\n\n        return pred_rgb, pred_depth, loss\n\n    def test_step(self, data, bg_color=None, perturb=False):\n        rays_o = data['rays_o'] # [B, N, 3]\n        rays_d = data['rays_d'] # [B, N, 3]\n        mvp = data['mvp']\n\n        B, N = rays_o.shape[:2]\n        H, W = data['H'], data['W']\n\n        if bg_color is not None:\n            bg_color = bg_color.to(rays_o.device)\n\n        shading = data['shading'] if 'shading' in data else 'albedo'\n        ambient_ratio = data['ambient_ratio'] if 'ambient_ratio' in data else 1.0\n        light_d = data['light_d'] if 'light_d' in data else None\n\n        outputs = self.model.render(rays_o, rays_d, mvp, H, W, staged=True, perturb=perturb, light_d=light_d, ambient_ratio=ambient_ratio, shading=shading, bg_color=bg_color)\n\n        pred_rgb = outputs['image'].reshape(B, H, W, 3)\n        pred_depth = outputs['depth'].reshape(B, H, W)\n\n        return pred_rgb, pred_depth, None\n\n    def save_mesh(self, loader=None, save_path=None):\n\n        if save_path is None:\n            save_path = os.path.join(self.workspace, 'mesh')\n\n        self.log(f\"==> Saving mesh to {save_path}\")\n\n        os.makedirs(save_path, exist_ok=True)\n\n        self.model.export_mesh(save_path, resolution=self.opt.mcubes_resolution, decimate_target=self.opt.decimate_target)\n\n        self.log(f\"==> Finished saving mesh.\")\n\n    ### ------------------------------\n\n    def train(self, train_loader, valid_loader, test_loader, max_epochs):\n\n        if self.use_tensorboardX and self.local_rank == 0:\n            self.writer = tensorboardX.SummaryWriter(os.path.join(self.workspace, \"run\", self.name))\n\n        start_t = time.time()\n\n        for epoch in range(self.epoch + 1, max_epochs + 1):\n            self.epoch = epoch\n\n            self.train_one_epoch(train_loader, max_epochs)\n\n            if self.workspace is not None and self.local_rank == 0:\n                self.save_checkpoint(full=True, best=False)\n\n            if self.epoch % self.opt.eval_interval == 0:\n                self.evaluate_one_epoch(valid_loader)\n                self.save_checkpoint(full=False, best=True)\n\n            if self.epoch % self.opt.test_interval == 0 or self.epoch == max_epochs:\n                self.test(test_loader)\n\n        end_t = time.time()\n\n        self.total_train_t = end_t - start_t + self.total_train_t\n\n        self.log(f\"[INFO] training takes {(self.total_train_t)/ 60:.4f} minutes.\")\n\n        if self.use_tensorboardX and self.local_rank == 0:\n            self.writer.close()\n\n    def evaluate(self, loader, name=None):\n        self.use_tensorboardX, use_tensorboardX = False, self.use_tensorboardX\n        self.evaluate_one_epoch(loader, name)\n        self.use_tensorboardX = use_tensorboardX\n\n    def test(self, loader, save_path=None, name=None, write_video=True):\n\n        if save_path is None:\n            save_path = os.path.join(self.workspace, 'results')\n\n        if name is None:\n            name = f'{self.name}_ep{self.epoch:04d}'\n\n        os.makedirs(save_path, exist_ok=True)\n\n        self.log(f\"==> Start Test, save results to {save_path}\")\n\n        pbar = tqdm.tqdm(total=len(loader) * loader.batch_size, bar_format='{percentage:3.0f}% {n_fmt}/{total_fmt} [{elapsed}<{remaining}, {rate_fmt}]')\n        self.model.eval()\n\n        if write_video:\n            all_preds = []\n            all_preds_depth = []\n\n        with torch.no_grad():\n\n            for i, data in enumerate(loader):\n\n                with torch.cuda.amp.autocast(enabled=self.fp16):\n                    preds, preds_depth, _ = self.test_step(data)\n\n                pred = preds[0].detach().cpu().numpy()\n                pred = (pred * 255).astype(np.uint8)\n\n                pred_depth = preds_depth[0].detach().cpu().numpy()\n                pred_depth = (pred_depth - pred_depth.min()) / (pred_depth.max() - pred_depth.min() + 1e-6)\n                pred_depth = (pred_depth * 255).astype(np.uint8)\n\n                if write_video:\n                    all_preds.append(pred)\n                    all_preds_depth.append(pred_depth)\n                else:\n                    cv2.imwrite(os.path.join(save_path, f'{name}_{i:04d}_rgb.png'), cv2.cvtColor(pred, cv2.COLOR_RGB2BGR))\n                    cv2.imwrite(os.path.join(save_path, f'{name}_{i:04d}_depth.png'), pred_depth)\n\n                pbar.update(loader.batch_size)\n\n        if write_video:\n            all_preds = np.stack(all_preds, axis=0)\n            all_preds_depth = np.stack(all_preds_depth, axis=0)\n\n            imageio.mimwrite(os.path.join(save_path, f'{name}_rgb.mp4'), all_preds, fps=25, quality=8, macro_block_size=1)\n            imageio.mimwrite(os.path.join(save_path, f'{name}_depth.mp4'), all_preds_depth, fps=25, quality=8, macro_block_size=1)\n\n        self.log(f\"==> Finished Test.\")\n\n    # [GUI] train text step.\n    def train_gui(self, train_loader, step=16):\n\n        self.model.train()\n\n        total_loss = torch.tensor([0], dtype=torch.float32, device=self.device)\n\n        loader = iter(train_loader)\n\n        for _ in range(step):\n\n            # mimic an infinite loop dataloader (in case the total dataset is smaller than step)\n            try:\n                data = next(loader)\n            except StopIteration:\n                loader = iter(train_loader)\n                data = next(loader)\n\n            # update grid every 16 steps\n            if self.model.cuda_ray and self.global_step % self.opt.update_extra_interval == 0:\n                with torch.cuda.amp.autocast(enabled=self.fp16):\n                    self.model.update_extra_state()\n\n            self.global_step += 1\n\n            self.optimizer.zero_grad()\n\n            with torch.cuda.amp.autocast(enabled=self.fp16):\n                pred_rgbs, pred_depths, loss = self.train_step(data)\n\n            self.scaler.scale(loss).backward()\n            self.post_train_step()\n            self.scaler.step(self.optimizer)\n            self.scaler.update()\n\n            if self.scheduler_update_every_step:\n                self.lr_scheduler.step()\n\n            total_loss += loss.detach()\n\n        if self.ema is not None:\n            self.ema.update()\n\n        average_loss = total_loss.item() / step\n\n        if not self.scheduler_update_every_step:\n            if isinstance(self.lr_scheduler, torch.optim.lr_scheduler.ReduceLROnPlateau):\n                self.lr_scheduler.step(average_loss)\n            else:\n                self.lr_scheduler.step()\n\n        outputs = {\n            'loss': average_loss,\n            'lr': self.optimizer.param_groups[0]['lr'],\n        }\n\n        return outputs\n\n\n    # [GUI] test on a single image\n    def test_gui(self, pose, intrinsics, mvp, W, H, bg_color=None, spp=1, downscale=1, light_d=None, ambient_ratio=1.0, shading='albedo'):\n\n        # render resolution (may need downscale to for better frame rate)\n        rH = int(H * downscale)\n        rW = int(W * downscale)\n        intrinsics = intrinsics * downscale\n\n        pose = torch.from_numpy(pose).unsqueeze(0).to(self.device)\n        mvp = torch.from_numpy(mvp).unsqueeze(0).to(self.device)\n\n        rays = get_rays(pose, intrinsics, rH, rW, -1)\n\n        # from degree theta/phi to 3D normalized vec\n        light_d = np.deg2rad(light_d)\n        light_d = np.array([\n            np.sin(light_d[0]) * np.sin(light_d[1]),\n            np.cos(light_d[0]),\n            np.sin(light_d[0]) * np.cos(light_d[1]),\n        ], dtype=np.float32)\n        light_d = torch.from_numpy(light_d).to(self.device)\n\n        data = {\n            'rays_o': rays['rays_o'],\n            'rays_d': rays['rays_d'],\n            'mvp': mvp,\n            'H': rH,\n            'W': rW,\n            'light_d': light_d,\n            'ambient_ratio': ambient_ratio,\n            'shading': shading,\n        }\n\n        self.model.eval()\n\n        if self.ema is not None:\n            self.ema.store()\n            self.ema.copy_to()\n\n        with torch.no_grad():\n            with torch.cuda.amp.autocast(enabled=self.fp16):\n                # here spp is used as perturb random seed!\n                preds, preds_depth, _ = self.test_step(data, bg_color=bg_color, perturb=False if spp == 1 else spp)\n\n        if self.ema is not None:\n            self.ema.restore()\n\n        # interpolation to the original resolution\n        if downscale != 1:\n            # have to permute twice with torch...\n            preds = F.interpolate(preds.permute(0, 3, 1, 2), size=(H, W), mode='nearest').permute(0, 2, 3, 1).contiguous()\n            preds_depth = F.interpolate(preds_depth.unsqueeze(1), size=(H, W), mode='nearest').squeeze(1)\n\n        outputs = {\n            'image': preds[0].detach().cpu().numpy(),\n            'depth': preds_depth[0].detach().cpu().numpy(),\n        }\n\n        return outputs\n\n    def train_one_epoch(self, loader, max_epochs):\n        self.log(f\"==> [{time.strftime('%Y-%m-%d_%H-%M-%S')}] Start Training {self.workspace} Epoch {self.epoch}/{max_epochs}, lr={self.optimizer.param_groups[0]['lr']:.6f} ...\")\n\n        total_loss = 0\n        if self.local_rank == 0 and self.report_metric_at_train:\n            for metric in self.metrics:\n                metric.clear()\n\n        self.model.train()\n\n        # distributedSampler: must call set_epoch() to shuffle indices across multiple epochs\n        # ref: https://pytorch.org/docs/stable/data.html\n        if self.world_size > 1:\n            loader.sampler.set_epoch(self.epoch)\n\n        if self.local_rank == 0:\n            pbar = tqdm.tqdm(total=len(loader) * loader.batch_size, bar_format='{desc}: {percentage:3.0f}% {n_fmt}/{total_fmt} [{elapsed}<{remaining}, {rate_fmt}]')\n\n        self.local_step = 0\n\n        if self.opt.save_guidance:\n            save_guidance_folder = Path(self.workspace) / 'guidance'\n            save_guidance_folder.mkdir(parents=True, exist_ok=True)\n\n        for data in loader:\n\n            # update grid every 16 steps\n            if (self.model.cuda_ray or self.model.taichi_ray) and self.global_step % self.opt.update_extra_interval == 0:\n                with torch.cuda.amp.autocast(enabled=self.fp16):\n                    self.model.update_extra_state()\n\n            self.local_step += 1\n            self.global_step += 1\n\n            self.optimizer.zero_grad()\n\n            with torch.cuda.amp.autocast(enabled=self.fp16):\n                if self.opt.save_guidance and (self.global_step % self.opt.save_guidance_interval == 0):\n                    save_guidance_path = save_guidance_folder / f'step_{self.global_step:07d}.png'\n                else:\n                    save_guidance_path = None\n                pred_rgbs, pred_depths, loss = self.train_step(data, save_guidance_path=save_guidance_path)\n\n            # hooked grad clipping for RGB space\n            if self.opt.grad_clip_rgb >= 0:\n                def _hook(grad):\n                    if self.opt.fp16:\n                        # correctly handle the scale\n                        grad_scale = self.scaler._get_scale_async()\n                        return grad.clamp(grad_scale * -self.opt.grad_clip_rgb, grad_scale * self.opt.grad_clip_rgb)\n                    else:\n                        return grad.clamp(-self.opt.grad_clip_rgb, self.opt.grad_clip_rgb)\n                pred_rgbs.register_hook(_hook)\n                # pred_rgbs.retain_grad()\n\n            self.scaler.scale(loss).backward()\n\n            self.post_train_step()\n            self.scaler.step(self.optimizer)\n            self.scaler.update()\n\n            if self.scheduler_update_every_step:\n                self.lr_scheduler.step()\n\n            loss_val = loss.item()\n            total_loss += loss_val\n\n            if self.local_rank == 0:\n                # if self.report_metric_at_train:\n                #     for metric in self.metrics:\n                #         metric.update(preds, truths)\n\n                if self.use_tensorboardX:\n                    self.writer.add_scalar(\"train/loss\", loss_val, self.global_step)\n                    self.writer.add_scalar(\"train/lr\", self.optimizer.param_groups[0]['lr'], self.global_step)\n\n                if self.scheduler_update_every_step:\n                    pbar.set_description(f\"loss={loss_val:.4f} ({total_loss/self.local_step:.4f}), lr={self.optimizer.param_groups[0]['lr']:.6f}\")\n                else:\n                    pbar.set_description(f\"loss={loss_val:.4f} ({total_loss/self.local_step:.4f})\")\n                pbar.update(loader.batch_size)\n\n        if self.ema is not None:\n            self.ema.update()\n\n        average_loss = total_loss / self.local_step\n        self.stats[\"loss\"].append(average_loss)\n\n        if self.local_rank == 0:\n            pbar.close()\n            if self.report_metric_at_train:\n                for metric in self.metrics:\n                    self.log(metric.report(), style=\"red\")\n                    if self.use_tensorboardX:\n                        metric.write(self.writer, self.epoch, prefix=\"train\")\n                    metric.clear()\n\n        if not self.scheduler_update_every_step:\n            if isinstance(self.lr_scheduler, torch.optim.lr_scheduler.ReduceLROnPlateau):\n                self.lr_scheduler.step(average_loss)\n            else:\n                self.lr_scheduler.step()\n\n        cpu_mem, gpu_mem = get_CPU_mem(), get_GPU_mem()[0]\n        self.log(f\"==> [{time.strftime('%Y-%m-%d_%H-%M-%S')}] Finished Epoch {self.epoch}/{max_epochs}. CPU={cpu_mem:.1f}GB, GPU={gpu_mem:.1f}GB.\")\n\n\n    def evaluate_one_epoch(self, loader, name=None):\n        self.log(f\"++> Evaluate {self.workspace} at epoch {self.epoch} ...\")\n\n        if name is None:\n            name = f'{self.name}_ep{self.epoch:04d}'\n\n        total_loss = 0\n        if self.local_rank == 0:\n            for metric in self.metrics:\n                metric.clear()\n\n        self.model.eval()\n\n        if self.ema is not None:\n            self.ema.store()\n            self.ema.copy_to()\n\n        if self.local_rank == 0:\n            pbar = tqdm.tqdm(total=len(loader) * loader.batch_size, bar_format='{desc}: {percentage:3.0f}% {n_fmt}/{total_fmt} [{elapsed}<{remaining}, {rate_fmt}]')\n\n        with torch.no_grad():\n            self.local_step = 0\n\n            for data in loader:\n                self.local_step += 1\n\n                with torch.cuda.amp.autocast(enabled=self.fp16):\n                    preds, preds_depth, loss = self.eval_step(data)\n\n                # all_gather/reduce the statistics (NCCL only support all_*)\n                if self.world_size > 1:\n                    dist.all_reduce(loss, op=dist.ReduceOp.SUM)\n                    loss = loss / self.world_size\n\n                    preds_list = [torch.zeros_like(preds).to(self.device) for _ in range(self.world_size)] # [[B, ...], [B, ...], ...]\n                    dist.all_gather(preds_list, preds)\n                    preds = torch.cat(preds_list, dim=0)\n\n                    preds_depth_list = [torch.zeros_like(preds_depth).to(self.device) for _ in range(self.world_size)] # [[B, ...], [B, ...], ...]\n                    dist.all_gather(preds_depth_list, preds_depth)\n                    preds_depth = torch.cat(preds_depth_list, dim=0)\n\n                loss_val = loss.item()\n                total_loss += loss_val\n\n                # only rank = 0 will perform evaluation.\n                if self.local_rank == 0:\n\n                    # save image\n                    save_path = os.path.join(self.workspace, 'validation', f'{name}_{self.local_step:04d}_rgb.png')\n                    save_path_depth = os.path.join(self.workspace, 'validation', f'{name}_{self.local_step:04d}_depth.png')\n\n                    #self.log(f\"==> Saving validation image to {save_path}\")\n                    os.makedirs(os.path.dirname(save_path), exist_ok=True)\n\n                    pred = preds[0].detach().cpu().numpy()\n                    pred = (pred * 255).astype(np.uint8)\n\n                    pred_depth = preds_depth[0].detach().cpu().numpy()\n                    pred_depth = (pred_depth - pred_depth.min()) / (pred_depth.max() - pred_depth.min() + 1e-6)\n                    pred_depth = (pred_depth * 255).astype(np.uint8)\n\n                    cv2.imwrite(save_path, cv2.cvtColor(pred, cv2.COLOR_RGB2BGR))\n                    cv2.imwrite(save_path_depth, pred_depth)\n\n                    pbar.set_description(f\"loss={loss_val:.4f} ({total_loss/self.local_step:.4f})\")\n                    pbar.update(loader.batch_size)\n\n\n        average_loss = total_loss / self.local_step\n        self.stats[\"valid_loss\"].append(average_loss)\n\n        if self.local_rank == 0:\n            pbar.close()\n            if not self.use_loss_as_metric and len(self.metrics) > 0:\n                result = self.metrics[0].measure()\n                self.stats[\"results\"].append(result if self.best_mode == 'min' else - result) # if max mode, use -result\n            else:\n                self.stats[\"results\"].append(average_loss) # if no metric, choose best by min loss\n\n            for metric in self.metrics:\n                self.log(metric.report(), style=\"blue\")\n                if self.use_tensorboardX:\n                    metric.write(self.writer, self.epoch, prefix=\"evaluate\")\n                metric.clear()\n\n        if self.ema is not None:\n            self.ema.restore()\n\n        self.log(f\"++> Evaluate epoch {self.epoch} Finished.\")\n\n    def save_checkpoint(self, name=None, full=False, best=False):\n\n        if name is None:\n            name = f'{self.name}_ep{self.epoch:04d}'\n\n        state = {\n            'epoch': self.epoch,\n            'global_step': self.global_step,\n            'stats': self.stats,\n        }\n\n        if self.model.cuda_ray:\n            state['mean_density'] = self.model.mean_density\n\n        if self.opt.dmtet:\n            state['tet_scale'] = self.model.tet_scale.cpu().numpy()\n\n        if full:\n            state['optimizer'] = self.optimizer.state_dict()\n            state['lr_scheduler'] = self.lr_scheduler.state_dict()\n            state['scaler'] = self.scaler.state_dict()\n            if self.ema is not None:\n                state['ema'] = self.ema.state_dict()\n\n        if not best:\n\n            state['model'] = self.model.state_dict()\n\n            file_path = f\"{name}.pth\"\n\n            self.stats[\"checkpoints\"].append(file_path)\n\n            if len(self.stats[\"checkpoints\"]) > self.max_keep_ckpt:\n                old_ckpt = os.path.join(self.ckpt_path, self.stats[\"checkpoints\"].pop(0))\n                if os.path.exists(old_ckpt):\n                    os.remove(old_ckpt)\n\n            torch.save(state, os.path.join(self.ckpt_path, file_path))\n\n        else:\n            if len(self.stats[\"results\"]) > 0:\n                # always save best since loss cannot reflect performance.\n                if True:\n                    # self.log(f\"[INFO] New best result: {self.stats['best_result']} --> {self.stats['results'][-1]}\")\n                    # self.stats[\"best_result\"] = self.stats[\"results\"][-1]\n\n                    # save ema results\n                    if self.ema is not None:\n                        self.ema.store()\n                        self.ema.copy_to()\n\n                    state['model'] = self.model.state_dict()\n\n                    if self.ema is not None:\n                        self.ema.restore()\n\n                    torch.save(state, self.best_path)\n            else:\n                self.log(f\"[WARN] no evaluated results found, skip saving best checkpoint.\")\n\n    def load_checkpoint(self, checkpoint=None, model_only=False):\n        if checkpoint is None:\n            checkpoint_list = sorted(glob.glob(f'{self.ckpt_path}/*.pth'))\n            if checkpoint_list:\n                checkpoint = checkpoint_list[-1]\n                self.log(f\"[INFO] Latest checkpoint is {checkpoint}\")\n            else:\n                self.log(\"[WARN] No checkpoint found, model randomly initialized.\")\n                return\n\n        checkpoint_dict = torch.load(checkpoint, map_location=self.device)\n\n        if 'model' not in checkpoint_dict:\n            self.model.load_state_dict(checkpoint_dict)\n            self.log(\"[INFO] loaded model.\")\n            return\n\n        missing_keys, unexpected_keys = self.model.load_state_dict(checkpoint_dict['model'], strict=False)\n        self.log(\"[INFO] loaded model.\")\n        if len(missing_keys) > 0:\n            self.log(f\"[WARN] missing keys: {missing_keys}\")\n        if len(unexpected_keys) > 0:\n            self.log(f\"[WARN] unexpected keys: {unexpected_keys}\")\n\n        if self.ema is not None and 'ema' in checkpoint_dict:\n            try:\n                self.ema.load_state_dict(checkpoint_dict['ema'])\n                self.log(\"[INFO] loaded EMA.\")\n            except:\n                self.log(\"[WARN] failed to loaded EMA.\")\n\n        if self.model.cuda_ray:\n            if 'mean_density' in checkpoint_dict:\n                self.model.mean_density = checkpoint_dict['mean_density']\n\n        if self.opt.dmtet:\n            if 'tet_scale' in checkpoint_dict:\n                new_scale = torch.from_numpy(checkpoint_dict['tet_scale']).to(self.device)\n                self.model.verts *= new_scale / self.model.tet_scale\n                self.model.tet_scale = new_scale\n\n        if model_only:\n            return\n\n        self.stats = checkpoint_dict['stats']\n        self.epoch = checkpoint_dict['epoch']\n        self.global_step = checkpoint_dict['global_step']\n        self.log(f\"[INFO] load at epoch {self.epoch}, global step {self.global_step}\")\n\n        if self.optimizer and 'optimizer' in checkpoint_dict:\n            try:\n                self.optimizer.load_state_dict(checkpoint_dict['optimizer'])\n                self.log(\"[INFO] loaded optimizer.\")\n            except:\n                self.log(\"[WARN] Failed to load optimizer.\")\n\n        if self.lr_scheduler and 'lr_scheduler' in checkpoint_dict:\n            try:\n                self.lr_scheduler.load_state_dict(checkpoint_dict['lr_scheduler'])\n                self.log(\"[INFO] loaded scheduler.\")\n            except:\n                self.log(\"[WARN] Failed to load scheduler.\")\n\n        if self.scaler and 'scaler' in checkpoint_dict:\n            try:\n                self.scaler.load_state_dict(checkpoint_dict['scaler'])\n                self.log(\"[INFO] loaded scaler.\")\n            except:\n                self.log(\"[WARN] Failed to load scaler.\")\n\n\ndef get_CPU_mem():\n    return psutil.Process(os.getpid()).memory_info().rss /1024**3\n\n\ndef get_GPU_mem():\n    num = torch.cuda.device_count()\n    mem, mems = 0, []\n    for i in range(num):\n        mem_free, mem_total = torch.cuda.mem_get_info(i)\n        mems.append(int(((mem_total - mem_free)/1024**3)*1000)/1000)\n        mem += mems[-1]\n    return mem, mems\n"
  },
  {
    "path": "stable-dreamfusion/optimizer.py",
    "content": "# Copyright 2022 Garena Online Private Limited\n#\n# Licensed under the Apache License, Version 2.0 (the \"License\");\n# you may not use this file except in compliance with the License.\n# You may obtain a copy of the License at\n#\n#     http://www.apache.org/licenses/LICENSE-2.0\n#\n# Unless required by applicable law or agreed to in writing, software\n# distributed under the License is distributed on an \"AS IS\" BASIS,\n# WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.\n# See the License for the specific language governing permissions and\n# limitations under the License.\n\nimport math\nfrom typing import List\n\nimport torch\nfrom torch import Tensor\nfrom torch.optim.optimizer import Optimizer\n\n\nclass Adan(Optimizer):\n    \"\"\"\n    Implements a pytorch variant of Adan\n    Adan was proposed in\n    Adan: Adaptive Nesterov Momentum Algorithm for\n        Faster Optimizing Deep Models[J].arXiv preprint arXiv:2208.06677, 2022.\n    https://arxiv.org/abs/2208.06677\n    Arguments:\n        params (iterable): iterable of parameters to optimize or\n            dicts defining parameter groups.\n        lr (float, optional): learning rate. (default: 1e-3)\n        betas (Tuple[float, float, flot], optional): coefficients used for\n            first- and second-order moments. (default: (0.98, 0.92, 0.99))\n        eps (float, optional): term added to the denominator to improve\n            numerical stability. (default: 1e-8)\n        weight_decay (float, optional): decoupled weight decay\n            (L2 penalty) (default: 0)\n        max_grad_norm (float, optional): value used to clip\n            global grad norm (default: 0.0 no clip)\n        no_prox (bool): how to perform the decoupled weight decay\n            (default: False)\n        foreach (bool): if True would use torch._foreach implementation.\n            It's faster but uses slightly more memory. (default: True)\n    \"\"\"\n    def __init__(self,\n                 params,\n                 lr=1e-3,\n                 betas=(0.98, 0.92, 0.99),\n                 eps=1e-8,\n                 weight_decay=0.0,\n                 max_grad_norm=0.0,\n                 no_prox=False,\n                 foreach: bool = True):\n        if not 0.0 <= max_grad_norm:\n            raise ValueError('Invalid Max grad norm: {}'.format(max_grad_norm))\n        if not 0.0 <= lr:\n            raise ValueError('Invalid learning rate: {}'.format(lr))\n        if not 0.0 <= eps:\n            raise ValueError('Invalid epsilon value: {}'.format(eps))\n        if not 0.0 <= betas[0] < 1.0:\n            raise ValueError('Invalid beta parameter at index 0: {}'.format(\n                betas[0]))\n        if not 0.0 <= betas[1] < 1.0:\n            raise ValueError('Invalid beta parameter at index 1: {}'.format(\n                betas[1]))\n        if not 0.0 <= betas[2] < 1.0:\n            raise ValueError('Invalid beta parameter at index 2: {}'.format(\n                betas[2]))\n        defaults = dict(lr=lr,\n                        betas=betas,\n                        eps=eps,\n                        weight_decay=weight_decay,\n                        max_grad_norm=max_grad_norm,\n                        no_prox=no_prox,\n                        foreach=foreach)\n        super().__init__(params, defaults)\n\n    def __setstate__(self, state):\n        super(Adan, self).__setstate__(state)\n        for group in self.param_groups:\n            group.setdefault('no_prox', False)\n\n    @torch.no_grad()\n    def restart_opt(self):\n        for group in self.param_groups:\n            group['step'] = 0\n            for p in group['params']:\n                if p.requires_grad:\n                    state = self.state[p]\n                    # State initialization\n\n                    # Exponential moving average of gradient values\n                    state['exp_avg'] = torch.zeros_like(p)\n                    # Exponential moving average of squared gradient values\n                    state['exp_avg_sq'] = torch.zeros_like(p)\n                    # Exponential moving average of gradient difference\n                    state['exp_avg_diff'] = torch.zeros_like(p)\n\n    @torch.no_grad()\n    def step(self, closure=None):\n        \"\"\"Performs a single optimization step.\"\"\"\n\n        loss = None\n        if closure is not None:\n            with torch.enable_grad():\n                loss = closure()\n\n        if self.defaults['max_grad_norm'] > 0:\n            device = self.param_groups[0]['params'][0].device\n            global_grad_norm = torch.zeros(1, device=device)\n\n            max_grad_norm = torch.tensor(self.defaults['max_grad_norm'],\n                                         device=device)\n            for group in self.param_groups:\n\n                for p in group['params']:\n                    if p.grad is not None:\n                        grad = p.grad\n                        global_grad_norm.add_(grad.pow(2).sum())\n\n            global_grad_norm = torch.sqrt(global_grad_norm)\n\n            clip_global_grad_norm = torch.clamp(\n                max_grad_norm / (global_grad_norm + group['eps']),\n                max=1.0).item()\n        else:\n            clip_global_grad_norm = 1.0\n\n        for group in self.param_groups:\n            params_with_grad = []\n            grads = []\n            exp_avgs = []\n            exp_avg_sqs = []\n            exp_avg_diffs = []\n            neg_pre_grads = []\n\n            beta1, beta2, beta3 = group['betas']\n            # assume same step across group now to simplify things\n            # per parameter step can be easily support\n            # by making it tensor, or pass list into kernel\n            if 'step' in group:\n                group['step'] += 1\n            else:\n                group['step'] = 1\n\n            bias_correction1 = 1.0 - beta1**group['step']\n            bias_correction2 = 1.0 - beta2**group['step']\n            bias_correction3 = 1.0 - beta3**group['step']\n\n            for p in group['params']:\n                if p.grad is None:\n                    continue\n                params_with_grad.append(p)\n                grads.append(p.grad)\n\n                state = self.state[p]\n                if len(state) == 0:\n                    state['exp_avg'] = torch.zeros_like(p)\n                    state['exp_avg_sq'] = torch.zeros_like(p)\n                    state['exp_avg_diff'] = torch.zeros_like(p)\n\n                if 'neg_pre_grad' not in state or group['step'] == 1:\n                    state['neg_pre_grad'] = p.grad.clone().mul_(\n                        -clip_global_grad_norm)\n\n                exp_avgs.append(state['exp_avg'])\n                exp_avg_sqs.append(state['exp_avg_sq'])\n                exp_avg_diffs.append(state['exp_avg_diff'])\n                neg_pre_grads.append(state['neg_pre_grad'])\n\n            kwargs = dict(\n                params=params_with_grad,\n                grads=grads,\n                exp_avgs=exp_avgs,\n                exp_avg_sqs=exp_avg_sqs,\n                exp_avg_diffs=exp_avg_diffs,\n                neg_pre_grads=neg_pre_grads,\n                beta1=beta1,\n                beta2=beta2,\n                beta3=beta3,\n                bias_correction1=bias_correction1,\n                bias_correction2=bias_correction2,\n                bias_correction3_sqrt=math.sqrt(bias_correction3),\n                lr=group['lr'],\n                weight_decay=group['weight_decay'],\n                eps=group['eps'],\n                no_prox=group['no_prox'],\n                clip_global_grad_norm=clip_global_grad_norm,\n            )\n\n            if group['foreach']:\n                _multi_tensor_adan(**kwargs)\n            else:\n                _single_tensor_adan(**kwargs)\n\n        return loss\n\n\ndef _single_tensor_adan(\n    params: List[Tensor],\n    grads: List[Tensor],\n    exp_avgs: List[Tensor],\n    exp_avg_sqs: List[Tensor],\n    exp_avg_diffs: List[Tensor],\n    neg_pre_grads: List[Tensor],\n    *,\n    beta1: float,\n    beta2: float,\n    beta3: float,\n    bias_correction1: float,\n    bias_correction2: float,\n    bias_correction3_sqrt: float,\n    lr: float,\n    weight_decay: float,\n    eps: float,\n    no_prox: bool,\n    clip_global_grad_norm: Tensor,\n):\n    for i, param in enumerate(params):\n        grad = grads[i]\n        exp_avg = exp_avgs[i]\n        exp_avg_sq = exp_avg_sqs[i]\n        exp_avg_diff = exp_avg_diffs[i]\n        neg_grad_or_diff = neg_pre_grads[i]\n\n        grad.mul_(clip_global_grad_norm)\n\n        # for memory saving, we use `neg_grad_or_diff`\n        # to get some temp variable in a inplace way\n        neg_grad_or_diff.add_(grad)\n\n        exp_avg.mul_(beta1).add_(grad, alpha=1 - beta1)  # m_t\n        exp_avg_diff.mul_(beta2).add_(neg_grad_or_diff,\n                                      alpha=1 - beta2)  # diff_t\n\n        neg_grad_or_diff.mul_(beta2).add_(grad)\n        exp_avg_sq.mul_(beta3).addcmul_(neg_grad_or_diff,\n                                        neg_grad_or_diff,\n                                        value=1 - beta3)  # n_t\n\n        denom = ((exp_avg_sq).sqrt() / bias_correction3_sqrt).add_(eps)\n        step_size_diff = lr * beta2 / bias_correction2\n        step_size = lr / bias_correction1\n\n        if no_prox:\n            param.mul_(1 - lr * weight_decay)\n            param.addcdiv_(exp_avg, denom, value=-step_size)\n            param.addcdiv_(exp_avg_diff, denom, value=-step_size_diff)\n        else:\n            param.addcdiv_(exp_avg, denom, value=-step_size)\n            param.addcdiv_(exp_avg_diff, denom, value=-step_size_diff)\n            param.div_(1 + lr * weight_decay)\n\n        neg_grad_or_diff.zero_().add_(grad, alpha=-1.0)\n\n\ndef _multi_tensor_adan(\n    params: List[Tensor],\n    grads: List[Tensor],\n    exp_avgs: List[Tensor],\n    exp_avg_sqs: List[Tensor],\n    exp_avg_diffs: List[Tensor],\n    neg_pre_grads: List[Tensor],\n    *,\n    beta1: float,\n    beta2: float,\n    beta3: float,\n    bias_correction1: float,\n    bias_correction2: float,\n    bias_correction3_sqrt: float,\n    lr: float,\n    weight_decay: float,\n    eps: float,\n    no_prox: bool,\n    clip_global_grad_norm: Tensor,\n):\n    if len(params) == 0:\n        return\n\n    torch._foreach_mul_(grads, clip_global_grad_norm)\n\n    # for memory saving, we use `neg_pre_grads`\n    # to get some temp variable in a inplace way\n    torch._foreach_add_(neg_pre_grads, grads)\n\n    torch._foreach_mul_(exp_avgs, beta1)\n    torch._foreach_add_(exp_avgs, grads, alpha=1 - beta1)  # m_t\n\n    torch._foreach_mul_(exp_avg_diffs, beta2)\n    torch._foreach_add_(exp_avg_diffs, neg_pre_grads,\n                        alpha=1 - beta2)  # diff_t\n\n    torch._foreach_mul_(neg_pre_grads, beta2)\n    torch._foreach_add_(neg_pre_grads, grads)\n    torch._foreach_mul_(exp_avg_sqs, beta3)\n    torch._foreach_addcmul_(exp_avg_sqs,\n                            neg_pre_grads,\n                            neg_pre_grads,\n                            value=1 - beta3)  # n_t\n\n    denom = torch._foreach_sqrt(exp_avg_sqs)\n    torch._foreach_div_(denom, bias_correction3_sqrt)\n    torch._foreach_add_(denom, eps)\n\n    step_size_diff = lr * beta2 / bias_correction2\n    step_size = lr / bias_correction1\n\n    if no_prox:\n        torch._foreach_mul_(params, 1 - lr * weight_decay)\n        torch._foreach_addcdiv_(params, exp_avgs, denom, value=-step_size)\n        torch._foreach_addcdiv_(params,\n                                exp_avg_diffs,\n                                denom,\n                                value=-step_size_diff)\n    else:\n        torch._foreach_addcdiv_(params, exp_avgs, denom, value=-step_size)\n        torch._foreach_addcdiv_(params,\n                                exp_avg_diffs,\n                                denom,\n                                value=-step_size_diff)\n        torch._foreach_div_(params, 1 + lr * weight_decay)\n    torch._foreach_zero_(neg_pre_grads)\n    torch._foreach_add_(neg_pre_grads, grads, alpha=-1.0)"
  },
  {
    "path": "stable-dreamfusion/preprocess_image.py",
    "content": "import os\nimport sys\nimport cv2\nimport argparse\nimport numpy as np\nimport matplotlib.pyplot as plt\n\nimport torch\nimport torch.nn as nn\nimport torch.nn.functional as F\nfrom torchvision import transforms\nfrom PIL import Image\n\nclass BackgroundRemoval():\n    def __init__(self, device='cuda'):\n\n        from carvekit.api.high import HiInterface\n        self.interface = HiInterface(\n            object_type=\"object\",  # Can be \"object\" or \"hairs-like\".\n            batch_size_seg=5,\n            batch_size_matting=1,\n            device=device,\n            seg_mask_size=640,  # Use 640 for Tracer B7 and 320 for U2Net\n            matting_mask_size=2048,\n            trimap_prob_threshold=231,\n            trimap_dilation=30,\n            trimap_erosion_iters=5,\n            fp16=True,\n        )\n\n    @torch.no_grad()\n    def __call__(self, image):\n        # image: [H, W, 3] array in [0, 255].\n        image = Image.fromarray(image)\n\n        image = self.interface([image])[0]\n        image = np.array(image)\n\n        return image\n\nclass BLIP2():\n    def __init__(self, device='cuda'):\n        self.device = device\n        from transformers import AutoProcessor, Blip2ForConditionalGeneration\n        self.processor = AutoProcessor.from_pretrained(\"Salesforce/blip2-opt-2.7b\")\n        self.model = Blip2ForConditionalGeneration.from_pretrained(\"Salesforce/blip2-opt-2.7b\", torch_dtype=torch.float16).to(device)\n\n    @torch.no_grad()\n    def __call__(self, image):\n        image = Image.fromarray(image)\n        inputs = self.processor(image, return_tensors=\"pt\").to(self.device, torch.float16)\n\n        generated_ids = self.model.generate(**inputs, max_new_tokens=20)\n        generated_text = self.processor.batch_decode(generated_ids, skip_special_tokens=True)[0].strip()\n\n        return generated_text\n\n\nclass DPT():\n    def __init__(self, task='depth', device='cuda'):\n\n        self.task = task\n        self.device = device\n\n        from dpt import DPTDepthModel\n\n        if task == 'depth':\n            path = 'pretrained/omnidata/omnidata_dpt_depth_v2.ckpt'\n            self.model = DPTDepthModel(backbone='vitb_rn50_384')\n            self.aug = transforms.Compose([\n                transforms.Resize((384, 384)),\n                transforms.ToTensor(),\n                transforms.Normalize(mean=0.5, std=0.5)\n            ])\n\n        else: # normal\n            path = 'pretrained/omnidata/omnidata_dpt_normal_v2.ckpt'\n            self.model = DPTDepthModel(backbone='vitb_rn50_384', num_channels=3)\n            self.aug = transforms.Compose([\n                transforms.Resize((384, 384)),\n                transforms.ToTensor()\n            ])\n\n        # load model\n        checkpoint = torch.load(path, map_location='cpu')\n        if 'state_dict' in checkpoint:\n            state_dict = {}\n            for k, v in checkpoint['state_dict'].items():\n                state_dict[k[6:]] = v\n        else:\n            state_dict = checkpoint\n        self.model.load_state_dict(state_dict)\n        self.model.eval().to(device)\n\n\n    @torch.no_grad()\n    def __call__(self, image):\n        # image: np.ndarray, uint8, [H, W, 3]\n        H, W = image.shape[:2]\n        image = Image.fromarray(image)\n\n        image = self.aug(image).unsqueeze(0).to(self.device)\n\n        if self.task == 'depth':\n            depth = self.model(image).clamp(0, 1)\n            depth = F.interpolate(depth.unsqueeze(1), size=(H, W), mode='bicubic', align_corners=False)\n            depth = depth.squeeze(1).cpu().numpy()\n            return depth\n        else:\n            normal = self.model(image).clamp(0, 1)\n            normal = F.interpolate(normal, size=(H, W), mode='bicubic', align_corners=False)\n            normal = normal.cpu().numpy()\n            return normal\n\n\n\nif __name__ == '__main__':\n\n    parser = argparse.ArgumentParser()\n    parser.add_argument('path', type=str, help=\"path to image (png, jpeg, etc.)\")\n    parser.add_argument('--size', default=256, type=int, help=\"output resolution\")\n    parser.add_argument('--border_ratio', default=0.2, type=float, help=\"output border ratio\")\n    parser.add_argument('--recenter', type=bool, default=True, help=\"recenter, potentially not helpful for multiview zero123\")\n    parser.add_argument('--dont_recenter', dest='recenter', action='store_false')\n    opt = parser.parse_args()\n\n    out_dir = os.path.dirname(opt.path)\n    out_rgba = os.path.join(out_dir, os.path.basename(opt.path).split('.')[0] + '_rgba.png')\n    out_depth = os.path.join(out_dir, os.path.basename(opt.path).split('.')[0] + '_depth.png')\n    out_normal = os.path.join(out_dir, os.path.basename(opt.path).split('.')[0] + '_normal.png')\n    out_caption = os.path.join(out_dir, os.path.basename(opt.path).split('.')[0] + '_caption.txt')\n\n    # load image\n    print(f'[INFO] loading image...')\n    image = cv2.imread(opt.path, cv2.IMREAD_UNCHANGED)\n    if image.shape[-1] == 4:\n        image = cv2.cvtColor(image, cv2.COLOR_BGRA2RGB)\n    else:\n        image = cv2.cvtColor(image, cv2.COLOR_BGR2RGB)\n\n    # carve background\n    print(f'[INFO] background removal...')\n    carved_image = BackgroundRemoval()(image) # [H, W, 4]\n    mask = carved_image[..., -1] > 0\n\n    # predict depth\n    print(f'[INFO] depth estimation...')\n    dpt_depth_model = DPT(task='depth')\n    depth = dpt_depth_model(image)[0]\n    depth[mask] = (depth[mask] - depth[mask].min()) / (depth[mask].max() - depth[mask].min() + 1e-9)\n    depth[~mask] = 0\n    depth = (depth * 255).astype(np.uint8)\n    del dpt_depth_model\n\n    # predict normal\n    print(f'[INFO] normal estimation...')\n    dpt_normal_model = DPT(task='normal')\n    normal = dpt_normal_model(image)[0]\n    normal = (normal * 255).astype(np.uint8).transpose(1, 2, 0)\n    normal[~mask] = 0\n    del dpt_normal_model\n\n    # recenter\n    if opt.recenter:\n        print(f'[INFO] recenter...')\n        final_rgba = np.zeros((opt.size, opt.size, 4), dtype=np.uint8)\n        final_depth = np.zeros((opt.size, opt.size), dtype=np.uint8)\n        final_normal = np.zeros((opt.size, opt.size, 3), dtype=np.uint8)\n\n        coords = np.nonzero(mask)\n        x_min, x_max = coords[0].min(), coords[0].max()\n        y_min, y_max = coords[1].min(), coords[1].max()\n        h = x_max - x_min\n        w = y_max - y_min\n        desired_size = int(opt.size * (1 - opt.border_ratio))\n        scale = desired_size / max(h, w)\n        h2 = int(h * scale)\n        w2 = int(w * scale)\n        x2_min = (opt.size - h2) // 2\n        x2_max = x2_min + h2\n        y2_min = (opt.size - w2) // 2\n        y2_max = y2_min + w2\n        final_rgba[x2_min:x2_max, y2_min:y2_max] = cv2.resize(carved_image[x_min:x_max, y_min:y_max], (w2, h2), interpolation=cv2.INTER_AREA)\n        final_depth[x2_min:x2_max, y2_min:y2_max] = cv2.resize(depth[x_min:x_max, y_min:y_max], (w2, h2), interpolation=cv2.INTER_AREA)\n        final_normal[x2_min:x2_max, y2_min:y2_max] = cv2.resize(normal[x_min:x_max, y_min:y_max], (w2, h2), interpolation=cv2.INTER_AREA)\n\n    else:\n        final_rgba = carved_image\n        final_depth = depth\n        final_normal = normal\n\n    # write output\n    cv2.imwrite(out_rgba, cv2.cvtColor(final_rgba, cv2.COLOR_RGBA2BGRA))\n    cv2.imwrite(out_depth, final_depth)\n    cv2.imwrite(out_normal, final_normal)\n\n    # predict caption (it's too slow... use your brain instead)\n    # print(f'[INFO] captioning...')\n    # blip2 = BLIP2()\n    # caption = blip2(image)\n    # with open(out_caption, 'w') as f:\n    #     f.write(caption)\n\n"
  },
  {
    "path": "stable-dreamfusion/pretrained/zero123/sd-objaverse-finetune-c_concat-256.yaml",
    "content": "model:\n  base_learning_rate: 1.0e-04\n  target: ldm.models.diffusion.ddpm.LatentDiffusion\n  params:\n    linear_start: 0.00085\n    linear_end: 0.0120\n    num_timesteps_cond: 1\n    log_every_t: 200\n    timesteps: 1000\n    first_stage_key: \"image_target\"\n    cond_stage_key: \"image_cond\"\n    image_size: 32\n    channels: 4\n    cond_stage_trainable: false   # Note: different from the one we trained before\n    conditioning_key: hybrid\n    monitor: val/loss_simple_ema\n    scale_factor: 0.18215\n\n    scheduler_config: # 10000 warmup steps\n      target: ldm.lr_scheduler.LambdaLinearScheduler\n      params:\n        warm_up_steps: [ 100 ]\n        cycle_lengths: [ 10000000000000 ] # incredibly large number to prevent corner cases\n        f_start: [ 1.e-6 ]\n        f_max: [ 1. ]\n        f_min: [ 1. ]\n\n    unet_config:\n      target: ldm.modules.diffusionmodules.openaimodel.UNetModel\n      params:\n        image_size: 32 # unused\n        in_channels: 8\n        out_channels: 4\n        model_channels: 320\n        attention_resolutions: [ 4, 2, 1 ]\n        num_res_blocks: 2\n        channel_mult: [ 1, 2, 4, 4 ]\n        num_heads: 8\n        use_spatial_transformer: True\n        transformer_depth: 1\n        context_dim: 768\n        use_checkpoint: True\n        legacy: False\n\n    first_stage_config:\n      target: ldm.models.autoencoder.AutoencoderKL\n      params:\n        embed_dim: 4\n        monitor: val/rec_loss\n        ddconfig:\n          double_z: true\n          z_channels: 4\n          resolution: 256\n          in_channels: 3\n          out_ch: 3\n          ch: 128\n          ch_mult:\n          - 1\n          - 2\n          - 4\n          - 4\n          num_res_blocks: 2\n          attn_resolutions: []\n          dropout: 0.0\n        lossconfig:\n          target: torch.nn.Identity\n\n    cond_stage_config:\n      target: ldm.modules.encoders.modules.FrozenCLIPImageEmbedder\n\n\n# data:\n#   target: ldm.data.simple.ObjaverseDataModuleFromConfig\n#   params:\n#     root_dir: 'views_whole_sphere'\n#     batch_size: 192\n#     num_workers: 16\n#     total_view: 4\n#     train:\n#       validation: False\n#       image_transforms:\n#         size: 256\n\n#     validation:\n#       validation: True\n#       image_transforms:\n#         size: 256\n\n\n# lightning:\n#   find_unused_parameters: false\n#   metrics_over_trainsteps_checkpoint: True\n#   modelcheckpoint:\n#     params:\n#       every_n_train_steps: 5000\n#   callbacks:\n#     image_logger:\n#       target: main.ImageLogger\n#       params:\n#         batch_frequency: 500\n#         max_images: 32\n#         increase_log_steps: False\n#         log_first_step: True\n#         log_images_kwargs:\n#           use_ema_scope: False\n#           inpaint: False\n#           plot_progressive_rows: False\n#           plot_diffusion_rows: False\n#           N: 32\n#           unconditional_scale: 3.0\n#           unconditional_label: [\"\"]\n\n#   trainer:\n#     benchmark: True\n#     val_check_interval: 5000000 # really sorry\n#     num_sanity_val_steps: 0\n#     accumulate_grad_batches: 1\n"
  },
  {
    "path": "stable-dreamfusion/raymarching/__init__.py",
    "content": "from .raymarching import *"
  },
  {
    "path": "stable-dreamfusion/raymarching/backend.py",
    "content": "import os\nfrom torch.utils.cpp_extension import load\n\n_src_path = os.path.dirname(os.path.abspath(__file__))\n\nnvcc_flags = [\n    '-O3', '-std=c++14',\n    '-U__CUDA_NO_HALF_OPERATORS__', '-U__CUDA_NO_HALF_CONVERSIONS__', '-U__CUDA_NO_HALF2_OPERATORS__',\n]\n\nif os.name == \"posix\":\n    c_flags = ['-O3', '-std=c++14']\nelif os.name == \"nt\":\n    c_flags = ['/O2', '/std:c++17']\n\n    # find cl.exe\n    def find_cl_path():\n        import glob\n        for program_files in [r\"C:\\\\Program Files (x86)\", r\"C:\\\\Program Files\"]:\n            for edition in [\"Enterprise\", \"Professional\", \"BuildTools\", \"Community\"]:\n                paths = sorted(glob.glob(r\"%s\\\\Microsoft Visual Studio\\\\*\\\\%s\\\\VC\\\\Tools\\\\MSVC\\\\*\\\\bin\\\\Hostx64\\\\x64\" % (program_files, edition)), reverse=True)\n                if paths:\n                    return paths[0]\n\n    # If cl.exe is not on path, try to find it.\n    if os.system(\"where cl.exe >nul 2>nul\") != 0:\n        cl_path = find_cl_path()\n        if cl_path is None:\n            raise RuntimeError(\"Could not locate a supported Microsoft Visual C++ installation\")\n        os.environ[\"PATH\"] += \";\" + cl_path\n\n_backend = load(name='_raymarching',\n                extra_cflags=c_flags,\n                extra_cuda_cflags=nvcc_flags,\n                sources=[os.path.join(_src_path, 'src', f) for f in [\n                    'raymarching.cu',\n                    'bindings.cpp',\n                ]],\n                )\n\n__all__ = ['_backend']"
  },
  {
    "path": "stable-dreamfusion/raymarching/raymarching.py",
    "content": "import numpy as np\nimport time\n\nimport torch\nimport torch.nn as nn\nfrom torch.autograd import Function\nfrom torch.cuda.amp import custom_bwd, custom_fwd\n\n# lazy building: \n# `import raymarching` will not immediately build the extension, only if you actually call any functions.\n\nBACKEND = None\n\ndef get_backend():\n    global BACKEND\n\n    if BACKEND is None:\n        try:\n            import _raymarching as _backend\n        except ImportError:\n            from .backend import _backend\n\n        BACKEND = _backend\n    \n    return BACKEND\n\n# ----------------------------------------\n# utils\n# ----------------------------------------\n\nclass _near_far_from_aabb(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32)\n    def forward(ctx, rays_o, rays_d, aabb, min_near=0.2):\n        ''' near_far_from_aabb, CUDA implementation\n        Calculate rays' intersection time (near and far) with aabb\n        Args:\n            rays_o: float, [N, 3]\n            rays_d: float, [N, 3]\n            aabb: float, [6], (xmin, ymin, zmin, xmax, ymax, zmax)\n            min_near: float, scalar\n        Returns:\n            nears: float, [N]\n            fars: float, [N]\n        '''\n        if not rays_o.is_cuda: rays_o = rays_o.cuda()\n        if not rays_d.is_cuda: rays_d = rays_d.cuda()\n\n        rays_o = rays_o.contiguous().view(-1, 3)\n        rays_d = rays_d.contiguous().view(-1, 3)\n\n        N = rays_o.shape[0] # num rays\n\n        nears = torch.empty(N, dtype=rays_o.dtype, device=rays_o.device)\n        fars = torch.empty(N, dtype=rays_o.dtype, device=rays_o.device)\n\n        get_backend().near_far_from_aabb(rays_o, rays_d, aabb, N, min_near, nears, fars)\n\n        return nears, fars\n\nnear_far_from_aabb = _near_far_from_aabb.apply\n\n\nclass _sph_from_ray(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32)\n    def forward(ctx, rays_o, rays_d, radius):\n        ''' sph_from_ray, CUDA implementation\n        get spherical coordinate on the background sphere from rays.\n        Assume rays_o are inside the Sphere(radius).\n        Args:\n            rays_o: [N, 3]\n            rays_d: [N, 3]\n            radius: scalar, float\n        Return:\n            coords: [N, 2], in [-1, 1], theta and phi on a sphere. (further-surface)\n        '''\n        if not rays_o.is_cuda: rays_o = rays_o.cuda()\n        if not rays_d.is_cuda: rays_d = rays_d.cuda()\n\n        rays_o = rays_o.contiguous().view(-1, 3)\n        rays_d = rays_d.contiguous().view(-1, 3)\n\n        N = rays_o.shape[0] # num rays\n\n        coords = torch.empty(N, 2, dtype=rays_o.dtype, device=rays_o.device)\n\n        get_backend().sph_from_ray(rays_o, rays_d, radius, N, coords)\n\n        return coords\n\nsph_from_ray = _sph_from_ray.apply\n\n\nclass _morton3D(Function):\n    @staticmethod\n    def forward(ctx, coords):\n        ''' morton3D, CUDA implementation\n        Args:\n            coords: [N, 3], int32, in [0, 128) (for some reason there is no uint32 tensor in torch...) \n            TODO: check if the coord range is valid! (current 128 is safe)\n        Returns:\n            indices: [N], int32, in [0, 128^3)\n            \n        '''\n        if not coords.is_cuda: coords = coords.cuda()\n        \n        N = coords.shape[0]\n\n        indices = torch.empty(N, dtype=torch.int32, device=coords.device)\n        \n        get_backend().morton3D(coords.int(), N, indices)\n\n        return indices\n\nmorton3D = _morton3D.apply\n\nclass _morton3D_invert(Function):\n    @staticmethod\n    def forward(ctx, indices):\n        ''' morton3D_invert, CUDA implementation\n        Args:\n            indices: [N], int32, in [0, 128^3)\n        Returns:\n            coords: [N, 3], int32, in [0, 128)\n            \n        '''\n        if not indices.is_cuda: indices = indices.cuda()\n        \n        N = indices.shape[0]\n\n        coords = torch.empty(N, 3, dtype=torch.int32, device=indices.device)\n        \n        get_backend().morton3D_invert(indices.int(), N, coords)\n\n        return coords\n\nmorton3D_invert = _morton3D_invert.apply\n\n\nclass _packbits(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32)\n    def forward(ctx, grid, thresh, bitfield=None):\n        ''' packbits, CUDA implementation\n        Pack up the density grid into a bit field to accelerate ray marching.\n        Args:\n            grid: float, [C, H * H * H], assume H % 2 == 0\n            thresh: float, threshold\n        Returns:\n            bitfield: uint8, [C, H * H * H / 8]\n        '''\n        if not grid.is_cuda: grid = grid.cuda()\n        grid = grid.contiguous()\n\n        C = grid.shape[0]\n        H3 = grid.shape[1]\n        N = C * H3 // 8\n\n        if bitfield is None:\n            bitfield = torch.empty(N, dtype=torch.uint8, device=grid.device)\n\n        get_backend().packbits(grid, N, thresh, bitfield)\n\n        return bitfield\n\npackbits = _packbits.apply\n\n\nclass _flatten_rays(Function):\n    @staticmethod\n    def forward(ctx, rays, M):\n        ''' flatten rays\n        Args:\n            rays: [N, 2], all rays' (point_offset, point_count),\n            M: scalar, int, count of points (we cannot get this info from rays unfortunately...)\n        Returns:\n            res: [M], flattened ray index.\n        '''\n        if not rays.is_cuda: rays = rays.cuda()\n        rays = rays.contiguous()\n\n        N = rays.shape[0]\n\n        res = torch.zeros(M, dtype=torch.int, device=rays.device)\n\n        get_backend().flatten_rays(rays, N, M, res)\n\n        return res\n\nflatten_rays = _flatten_rays.apply\n\n# ----------------------------------------\n# train functions\n# ----------------------------------------\n\nclass _march_rays_train(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32)\n    def forward(ctx, rays_o, rays_d, bound, density_bitfield, C, H, nears, fars, perturb=False, dt_gamma=0, max_steps=1024, contract=False):\n        ''' march rays to generate points (forward only)\n        Args:\n            rays_o/d: float, [N, 3]\n            bound: float, scalar\n            density_bitfield: uint8: [CHHH // 8]\n            C: int\n            H: int\n            nears/fars: float, [N]\n            step_counter: int32, (2), used to count the actual number of generated points.\n            mean_count: int32, estimated mean steps to accelerate training. (but will randomly drop rays if the actual point count exceeded this threshold.)\n            perturb: bool\n            align: int, pad output so its size is dividable by align, set to -1 to disable.\n            force_all_rays: bool, ignore step_counter and mean_count, always calculate all rays. Useful if rendering the whole image, instead of some rays.\n            dt_gamma: float, called cone_angle in instant-ngp, exponentially accelerate ray marching if > 0. (very significant effect, but generally lead to worse performance)\n            max_steps: int, max number of sampled points along each ray, also affect min_stepsize.\n        Returns:\n            xyzs: float, [M, 3], all generated points' coords. (all rays concated, need to use `rays` to extract points belonging to each ray)\n            dirs: float, [M, 3], all generated points' view dirs.\n            ts: float, [M, 2], all generated points' ts.\n            rays: int32, [N, 2], all rays' (point_offset, point_count), e.g., xyzs[rays[i, 0]:(rays[i, 0] + rays[i, 1])] --> points belonging to rays[i, 0]\n        '''\n\n        if not rays_o.is_cuda: rays_o = rays_o.cuda()\n        if not rays_d.is_cuda: rays_d = rays_d.cuda()\n        if not density_bitfield.is_cuda: density_bitfield = density_bitfield.cuda()\n        \n        rays_o = rays_o.float().contiguous().view(-1, 3)\n        rays_d = rays_d.float().contiguous().view(-1, 3)\n        density_bitfield = density_bitfield.contiguous()\n\n        N = rays_o.shape[0] # num rays\n        \n        step_counter = torch.zeros(1, dtype=torch.int32, device=rays_o.device) # point counter, ray counter\n        \n        if perturb:\n            noises = torch.rand(N, dtype=rays_o.dtype, device=rays_o.device)\n        else:\n            noises = torch.zeros(N, dtype=rays_o.dtype, device=rays_o.device)\n        \n        # first pass: write rays, get total number of points M to render\n        rays = torch.empty(N, 2, dtype=torch.int32, device=rays_o.device) # id, offset, num_steps\n        get_backend().march_rays_train(rays_o, rays_d, density_bitfield, bound, contract, dt_gamma, max_steps, N, C, H, nears, fars, None, None, None, rays, step_counter, noises)\n\n        # allocate based on M\n        M = step_counter.item()\n        # print(M, N)\n        # print(rays[:, 0].max())\n\n        xyzs = torch.zeros(M, 3, dtype=rays_o.dtype, device=rays_o.device)\n        dirs = torch.zeros(M, 3, dtype=rays_o.dtype, device=rays_o.device)\n        ts = torch.zeros(M, 2, dtype=rays_o.dtype, device=rays_o.device)\n\n        # second pass: write outputs\n        get_backend().march_rays_train(rays_o, rays_d, density_bitfield, bound, contract, dt_gamma, max_steps, N, C, H, nears, fars, xyzs, dirs, ts, rays, step_counter, noises)\n\n        return xyzs, dirs, ts, rays\n\nmarch_rays_train = _march_rays_train.apply\n\n\nclass _composite_rays_train(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32)\n    def forward(ctx, sigmas, rgbs, ts, rays, T_thresh=1e-4, binarize=False):\n        ''' composite rays' rgbs, according to the ray marching formula.\n        Args:\n            rgbs: float, [M, 3]\n            sigmas: float, [M,]\n            ts: float, [M, 2]\n            rays: int32, [N, 3]\n        Returns:\n            weights: float, [M]\n            weights_sum: float, [N,], the alpha channel\n            depth: float, [N, ], the Depth\n            image: float, [N, 3], the RGB channel (after multiplying alpha!)\n        '''\n        \n        sigmas = sigmas.float().contiguous()\n        rgbs = rgbs.float().contiguous()\n\n        M = sigmas.shape[0]\n        N = rays.shape[0]\n\n        weights = torch.zeros(M, dtype=sigmas.dtype, device=sigmas.device) # may leave unmodified, so init with 0\n        weights_sum = torch.empty(N, dtype=sigmas.dtype, device=sigmas.device)\n\n        depth = torch.empty(N, dtype=sigmas.dtype, device=sigmas.device)\n        image = torch.empty(N, 3, dtype=sigmas.dtype, device=sigmas.device)\n\n        get_backend().composite_rays_train_forward(sigmas, rgbs, ts, rays, M, N, T_thresh, binarize, weights, weights_sum, depth, image)\n\n        ctx.save_for_backward(sigmas, rgbs, ts, rays, weights_sum, depth, image)\n        ctx.dims = [M, N, T_thresh, binarize]\n\n        return weights, weights_sum, depth, image\n    \n    @staticmethod\n    @custom_bwd\n    def backward(ctx, grad_weights, grad_weights_sum, grad_depth, grad_image):\n        \n        grad_weights = grad_weights.contiguous()\n        grad_weights_sum = grad_weights_sum.contiguous()\n        grad_depth = grad_depth.contiguous()\n        grad_image = grad_image.contiguous()\n\n        sigmas, rgbs, ts, rays, weights_sum, depth, image = ctx.saved_tensors\n        M, N, T_thresh, binarize = ctx.dims\n   \n        grad_sigmas = torch.zeros_like(sigmas)\n        grad_rgbs = torch.zeros_like(rgbs)\n\n        get_backend().composite_rays_train_backward(grad_weights, grad_weights_sum, grad_depth, grad_image, sigmas, rgbs, ts, rays, weights_sum, depth, image, M, N, T_thresh, binarize, grad_sigmas, grad_rgbs)\n\n        return grad_sigmas, grad_rgbs, None, None, None, None\n\n\ncomposite_rays_train = _composite_rays_train.apply\n\n# ----------------------------------------\n# infer functions\n# ----------------------------------------\n\nclass _march_rays(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32)\n    def forward(ctx, n_alive, n_step, rays_alive, rays_t, rays_o, rays_d, bound, density_bitfield, C, H, near, far, perturb=False, dt_gamma=0, max_steps=1024, contract=False):\n        ''' march rays to generate points (forward only, for inference)\n        Args:\n            n_alive: int, number of alive rays\n            n_step: int, how many steps we march\n            rays_alive: int, [N], the alive rays' IDs in N (N >= n_alive, but we only use first n_alive)\n            rays_t: float, [N], the alive rays' time, we only use the first n_alive.\n            rays_o/d: float, [N, 3]\n            bound: float, scalar\n            density_bitfield: uint8: [CHHH // 8]\n            C: int\n            H: int\n            nears/fars: float, [N]\n            align: int, pad output so its size is dividable by align, set to -1 to disable.\n            perturb: bool/int, int > 0 is used as the random seed.\n            dt_gamma: float, called cone_angle in instant-ngp, exponentially accelerate ray marching if > 0. (very significant effect, but generally lead to worse performance)\n            max_steps: int, max number of sampled points along each ray, also affect min_stepsize.\n        Returns:\n            xyzs: float, [n_alive * n_step, 3], all generated points' coords\n            dirs: float, [n_alive * n_step, 3], all generated points' view dirs.\n            ts: float, [n_alive * n_step, 2], all generated points' ts\n        '''\n        \n        if not rays_o.is_cuda: rays_o = rays_o.cuda()\n        if not rays_d.is_cuda: rays_d = rays_d.cuda()\n        \n        rays_o = rays_o.float().contiguous().view(-1, 3)\n        rays_d = rays_d.float().contiguous().view(-1, 3)\n\n        M = n_alive * n_step\n        \n        xyzs = torch.zeros(M, 3, dtype=rays_o.dtype, device=rays_o.device)\n        dirs = torch.zeros(M, 3, dtype=rays_o.dtype, device=rays_o.device)\n        ts = torch.zeros(M, 2, dtype=rays_o.dtype, device=rays_o.device) # 2 vals, one for rgb, one for depth\n\n        if perturb:\n            # torch.manual_seed(perturb) # test_gui uses spp index as seed\n            noises = torch.rand(n_alive, dtype=rays_o.dtype, device=rays_o.device)\n        else:\n            noises = torch.zeros(n_alive, dtype=rays_o.dtype, device=rays_o.device)\n\n        get_backend().march_rays(n_alive, n_step, rays_alive, rays_t, rays_o, rays_d, bound, contract, dt_gamma, max_steps, C, H, density_bitfield, near, far, xyzs, dirs, ts, noises)\n\n        return xyzs, dirs, ts\n\nmarch_rays = _march_rays.apply\n\n\nclass _composite_rays(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32) # need to cast sigmas & rgbs to float\n    def forward(ctx, n_alive, n_step, rays_alive, rays_t, sigmas, rgbs, ts, weights_sum, depth, image, T_thresh=1e-2, binarize=False):\n        ''' composite rays' rgbs, according to the ray marching formula. (for inference)\n        Args:\n            n_alive: int, number of alive rays\n            n_step: int, how many steps we march\n            rays_alive: int, [n_alive], the alive rays' IDs in N (N >= n_alive)\n            rays_t: float, [N], the alive rays' time\n            sigmas: float, [n_alive * n_step,]\n            rgbs: float, [n_alive * n_step, 3]\n            ts: float, [n_alive * n_step, 2]\n        In-place Outputs:\n            weights_sum: float, [N,], the alpha channel\n            depth: float, [N,], the depth value\n            image: float, [N, 3], the RGB channel (after multiplying alpha!)\n        '''\n        sigmas = sigmas.float().contiguous()\n        rgbs = rgbs.float().contiguous()\n        get_backend().composite_rays(n_alive, n_step, T_thresh, binarize, rays_alive, rays_t, sigmas, rgbs, ts, weights_sum, depth, image)\n        return tuple()\n\n\ncomposite_rays = _composite_rays.apply"
  },
  {
    "path": "stable-dreamfusion/raymarching/setup.py",
    "content": "import os\nfrom setuptools import setup\nfrom torch.utils.cpp_extension import BuildExtension, CUDAExtension\n\n_src_path = os.path.dirname(os.path.abspath(__file__))\n\nnvcc_flags = [\n    '-O3', '-std=c++14',\n    '-U__CUDA_NO_HALF_OPERATORS__', '-U__CUDA_NO_HALF_CONVERSIONS__', '-U__CUDA_NO_HALF2_OPERATORS__',\n]\n\nif os.name == \"posix\":\n    c_flags = ['-O3', '-std=c++14']\nelif os.name == \"nt\":\n    c_flags = ['/O2', '/std:c++17']\n\n    # find cl.exe\n    def find_cl_path():\n        import glob\n        for program_files in [r\"C:\\\\Program Files (x86)\", r\"C:\\\\Program Files\"]:\n            for edition in [\"Enterprise\", \"Professional\", \"BuildTools\", \"Community\"]:\n                paths = sorted(glob.glob(r\"%s\\\\Microsoft Visual Studio\\\\*\\\\%s\\\\VC\\\\Tools\\\\MSVC\\\\*\\\\bin\\\\Hostx64\\\\x64\" % (program_files, edition)), reverse=True)\n                if paths:\n                    return paths[0]\n\n    # If cl.exe is not on path, try to find it.\n    if os.system(\"where cl.exe >nul 2>nul\") != 0:\n        cl_path = find_cl_path()\n        if cl_path is None:\n            raise RuntimeError(\"Could not locate a supported Microsoft Visual C++ installation\")\n        os.environ[\"PATH\"] += \";\" + cl_path\n\n'''\nUsage:\n\npython setup.py build_ext --inplace # build extensions locally, do not install (only can be used from the parent directory)\n\npython setup.py install # build extensions and install (copy) to PATH.\npip install . # ditto but better (e.g., dependency & metadata handling)\n\npython setup.py develop # build extensions and install (symbolic) to PATH.\npip install -e . # ditto but better (e.g., dependency & metadata handling)\n\n'''\nsetup(\n    name='raymarching', # package name, import this to use python API\n    ext_modules=[\n        CUDAExtension(\n            name='_raymarching', # extension name, import this to use CUDA API\n            sources=[os.path.join(_src_path, 'src', f) for f in [\n                'raymarching.cu',\n                'bindings.cpp',\n            ]],\n            extra_compile_args={\n                'cxx': c_flags,\n                'nvcc': nvcc_flags,\n            }\n        ),\n    ],\n    cmdclass={\n        'build_ext': BuildExtension,\n    }\n)"
  },
  {
    "path": "stable-dreamfusion/raymarching/src/bindings.cpp",
    "content": "#include <torch/extension.h>\n\n#include \"raymarching.h\"\n\nPYBIND11_MODULE(TORCH_EXTENSION_NAME, m) {\n    // utils\n    m.def(\"flatten_rays\", &flatten_rays, \"flatten_rays (CUDA)\");\n    m.def(\"packbits\", &packbits, \"packbits (CUDA)\");\n    m.def(\"near_far_from_aabb\", &near_far_from_aabb, \"near_far_from_aabb (CUDA)\");\n    m.def(\"sph_from_ray\", &sph_from_ray, \"sph_from_ray (CUDA)\");\n    m.def(\"morton3D\", &morton3D, \"morton3D (CUDA)\");\n    m.def(\"morton3D_invert\", &morton3D_invert, \"morton3D_invert (CUDA)\");\n    // train\n    m.def(\"march_rays_train\", &march_rays_train, \"march_rays_train (CUDA)\");\n    m.def(\"composite_rays_train_forward\", &composite_rays_train_forward, \"composite_rays_train_forward (CUDA)\");\n    m.def(\"composite_rays_train_backward\", &composite_rays_train_backward, \"composite_rays_train_backward (CUDA)\");\n    // infer\n    m.def(\"march_rays\", &march_rays, \"march rays (CUDA)\");\n    m.def(\"composite_rays\", &composite_rays, \"composite rays (CUDA)\");\n}"
  },
  {
    "path": "stable-dreamfusion/raymarching/src/raymarching.cu",
    "content": "#include <cuda.h>\n#include <cuda_fp16.h>\n#include <cuda_runtime.h>\n\n#include <ATen/cuda/CUDAContext.h>\n#include <torch/torch.h>\n\n#include <cstdio>\n#include <stdint.h>\n#include <stdexcept>\n#include <limits>\n\n#define CHECK_CUDA(x) TORCH_CHECK(x.device().is_cuda(), #x \" must be a CUDA tensor\")\n#define CHECK_CONTIGUOUS(x) TORCH_CHECK(x.is_contiguous(), #x \" must be a contiguous tensor\")\n#define CHECK_IS_INT(x) TORCH_CHECK(x.scalar_type() == at::ScalarType::Int, #x \" must be an int tensor\")\n#define CHECK_IS_FLOATING(x) TORCH_CHECK(x.scalar_type() == at::ScalarType::Float || x.scalar_type() == at::ScalarType::Half || x.scalar_type() == at::ScalarType::Double, #x \" must be a floating tensor\")\n\n\ninline constexpr __device__ float SQRT3() { return 1.7320508075688772f; }\ninline constexpr __device__ float RSQRT3() { return 0.5773502691896258f; }\ninline constexpr __device__ float PI() { return 3.141592653589793f; }\ninline constexpr __device__ float RPI() { return 0.3183098861837907f; }\n\n\ntemplate <typename T>\ninline __host__ __device__ T div_round_up(T val, T divisor) {\n    return (val + divisor - 1) / divisor;\n}\n\ninline __host__ __device__ float signf(const float x) {\n    return copysignf(1.0, x);\n}\n\ninline __host__ __device__ float clamp(const float x, const float min, const float max) {\n    return fminf(max, fmaxf(min, x));\n}\n\ninline __host__ __device__ void swapf(float& a, float& b) {\n    float c = a; a = b; b = c;\n}\n\ninline __device__ int mip_from_pos(const float x, const float y, const float z, const float max_cascade) {\n    const float mx = fmaxf(fabsf(x), fmaxf(fabsf(y), fabsf(z)));\n    int exponent;\n    frexpf(mx, &exponent); // [0, 0.5) --> -1, [0.5, 1) --> 0, [1, 2) --> 1, [2, 4) --> 2, ...\n    return fminf(max_cascade - 1, fmaxf(0, exponent));\n}\n\ninline __device__ int mip_from_dt(const float dt, const float H, const float max_cascade) {\n    const float mx = dt * H * 0.5;\n    int exponent;\n    frexpf(mx, &exponent);\n    return fminf(max_cascade - 1, fmaxf(0, exponent));\n}\n\ninline __host__ __device__ uint32_t __expand_bits(uint32_t v)\n{\n\tv = (v * 0x00010001u) & 0xFF0000FFu;\n\tv = (v * 0x00000101u) & 0x0F00F00Fu;\n\tv = (v * 0x00000011u) & 0xC30C30C3u;\n\tv = (v * 0x00000005u) & 0x49249249u;\n\treturn v;\n}\n\ninline __host__ __device__ uint32_t __morton3D(uint32_t x, uint32_t y, uint32_t z)\n{\n\tuint32_t xx = __expand_bits(x);\n\tuint32_t yy = __expand_bits(y);\n\tuint32_t zz = __expand_bits(z);\n\treturn xx | (yy << 1) | (zz << 2);\n}\n\ninline __host__ __device__ uint32_t __morton3D_invert(uint32_t x)\n{\n\tx = x & 0x49249249;\n\tx = (x | (x >> 2)) & 0xc30c30c3;\n\tx = (x | (x >> 4)) & 0x0f00f00f;\n\tx = (x | (x >> 8)) & 0xff0000ff;\n\tx = (x | (x >> 16)) & 0x0000ffff;\n\treturn x;\n}\n\n\n////////////////////////////////////////////////////\n/////////////           utils          /////////////\n////////////////////////////////////////////////////\n\n// rays_o/d: [N, 3]\n// nears/fars: [N]\n// scalar_t should always be float in use.\ntemplate <typename scalar_t>\n__global__ void kernel_near_far_from_aabb(\n    const scalar_t * __restrict__ rays_o,\n    const scalar_t * __restrict__ rays_d,\n    const scalar_t * __restrict__ aabb,\n    const uint32_t N,\n    const float min_near,\n    scalar_t * nears, scalar_t * fars\n) {\n    // parallel per ray\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= N) return;\n\n    // locate\n    rays_o += n * 3;\n    rays_d += n * 3;\n\n    const float ox = rays_o[0], oy = rays_o[1], oz = rays_o[2];\n    const float dx = rays_d[0], dy = rays_d[1], dz = rays_d[2];\n    const float rdx = 1 / dx, rdy = 1 / dy, rdz = 1 / dz;\n\n    // get near far (assume cube scene)\n    float near = (aabb[0] - ox) * rdx;\n    float far = (aabb[3] - ox) * rdx;\n    if (near > far) swapf(near, far);\n\n    float near_y = (aabb[1] - oy) * rdy;\n    float far_y = (aabb[4] - oy) * rdy;\n    if (near_y > far_y) swapf(near_y, far_y);\n\n    if (near > far_y || near_y > far) {\n        nears[n] = fars[n] = std::numeric_limits<scalar_t>::max();\n        return;\n    }\n\n    if (near_y > near) near = near_y;\n    if (far_y < far) far = far_y;\n\n    float near_z = (aabb[2] - oz) * rdz;\n    float far_z = (aabb[5] - oz) * rdz;\n    if (near_z > far_z) swapf(near_z, far_z);\n\n    if (near > far_z || near_z > far) {\n        nears[n] = fars[n] = std::numeric_limits<scalar_t>::max();\n        return;\n    }\n\n    if (near_z > near) near = near_z;\n    if (far_z < far) far = far_z;\n\n    if (near < min_near) near = min_near;\n\n    nears[n] = near;\n    fars[n] = far;\n}\n\n\nvoid near_far_from_aabb(const at::Tensor rays_o, const at::Tensor rays_d, const at::Tensor aabb, const uint32_t N, const float min_near, at::Tensor nears, at::Tensor fars) {\n\n    static constexpr uint32_t N_THREAD = 128;\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    rays_o.scalar_type(), \"near_far_from_aabb\", ([&] {\n        kernel_near_far_from_aabb<<<div_round_up(N, N_THREAD), N_THREAD>>>(rays_o.data_ptr<scalar_t>(), rays_d.data_ptr<scalar_t>(), aabb.data_ptr<scalar_t>(), N, min_near, nears.data_ptr<scalar_t>(), fars.data_ptr<scalar_t>());\n    }));\n}\n\n\n// rays_o/d: [N, 3]\n// radius: float\n// coords: [N, 2]\ntemplate <typename scalar_t>\n__global__ void kernel_sph_from_ray(\n    const scalar_t * __restrict__ rays_o,\n    const scalar_t * __restrict__ rays_d,\n    const float radius,\n    const uint32_t N,\n    scalar_t * coords\n) {\n    // parallel per ray\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= N) return;\n\n    // locate\n    rays_o += n * 3;\n    rays_d += n * 3;\n    coords += n * 2;\n\n    const float ox = rays_o[0], oy = rays_o[1], oz = rays_o[2];\n    const float dx = rays_d[0], dy = rays_d[1], dz = rays_d[2];\n    // const float rdx = 1 / dx, rdy = 1 / dy, rdz = 1 / dz;\n\n    // solve t from || o + td || = radius\n    const float A = dx * dx + dy * dy + dz * dz;\n    const float B = ox * dx + oy * dy + oz * dz; // in fact B / 2\n    const float C = ox * ox + oy * oy + oz * oz - radius * radius;\n\n    const float t = (- B + sqrtf(B * B - A * C)) / A; // always use the larger solution (positive)\n\n    // solve theta, phi (assume y is the up axis)\n    const float x = ox + t * dx, y = oy + t * dy, z = oz + t * dz;\n    const float theta = atan2(sqrtf(x * x + z * z), y); // [0, PI)\n    const float phi = atan2(z, x); // [-PI, PI)\n\n    // normalize to [-1, 1]\n    coords[0] = 2 * theta * RPI() - 1;\n    coords[1] = phi * RPI();\n}\n\n\nvoid sph_from_ray(const at::Tensor rays_o, const at::Tensor rays_d, const float radius, const uint32_t N, at::Tensor coords) {\n\n    static constexpr uint32_t N_THREAD = 128;\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    rays_o.scalar_type(), \"sph_from_ray\", ([&] {\n        kernel_sph_from_ray<<<div_round_up(N, N_THREAD), N_THREAD>>>(rays_o.data_ptr<scalar_t>(), rays_d.data_ptr<scalar_t>(), radius, N, coords.data_ptr<scalar_t>());\n    }));\n}\n\n\n// coords: int32, [N, 3]\n// indices: int32, [N]\n__global__ void kernel_morton3D(\n    const int * __restrict__ coords,\n    const uint32_t N,\n    int * indices\n) {\n    // parallel\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= N) return;\n\n    // locate\n    coords += n * 3;\n    indices[n] = __morton3D(coords[0], coords[1], coords[2]);\n}\n\n\nvoid morton3D(const at::Tensor coords, const uint32_t N, at::Tensor indices) {\n    static constexpr uint32_t N_THREAD = 128;\n    kernel_morton3D<<<div_round_up(N, N_THREAD), N_THREAD>>>(coords.data_ptr<int>(), N, indices.data_ptr<int>());\n}\n\n\n// indices: int32, [N]\n// coords: int32, [N, 3]\n__global__ void kernel_morton3D_invert(\n    const int * __restrict__ indices,\n    const uint32_t N,\n    int * coords\n) {\n    // parallel\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= N) return;\n\n    // locate\n    coords += n * 3;\n\n    const int ind = indices[n];\n\n    coords[0] = __morton3D_invert(ind >> 0);\n    coords[1] = __morton3D_invert(ind >> 1);\n    coords[2] = __morton3D_invert(ind >> 2);\n}\n\n\nvoid morton3D_invert(const at::Tensor indices, const uint32_t N, at::Tensor coords) {\n    static constexpr uint32_t N_THREAD = 128;\n    kernel_morton3D_invert<<<div_round_up(N, N_THREAD), N_THREAD>>>(indices.data_ptr<int>(), N, coords.data_ptr<int>());\n}\n\n\n// grid: float, [C, H, H, H]\n// N: int, C * H * H * H / 8\n// density_thresh: float\n// bitfield: uint8, [N]\ntemplate <typename scalar_t>\n__global__ void kernel_packbits(\n    const scalar_t * __restrict__ grid,\n    const uint32_t N,\n    const float density_thresh,\n    uint8_t * bitfield\n) {\n    // parallel per byte\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= N) return;\n\n    // locate\n    grid += n * 8;\n\n    uint8_t bits = 0;\n\n    #pragma unroll\n    for (uint8_t i = 0; i < 8; i++) {\n        bits |= (grid[i] > density_thresh) ? ((uint8_t)1 << i) : 0;\n    }\n\n    bitfield[n] = bits;\n}\n\n\nvoid packbits(const at::Tensor grid, const uint32_t N, const float density_thresh, at::Tensor bitfield) {\n\n    static constexpr uint32_t N_THREAD = 128;\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    grid.scalar_type(), \"packbits\", ([&] {\n        kernel_packbits<<<div_round_up(N, N_THREAD), N_THREAD>>>(grid.data_ptr<scalar_t>(), N, density_thresh, bitfield.data_ptr<uint8_t>());\n    }));\n}\n\n\n__global__ void kernel_flatten_rays(\n    const int * __restrict__ rays,\n    const uint32_t N, const uint32_t M,\n    int * res\n) {\n    // parallel per ray\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= N) return;\n\n    // locate\n    uint32_t offset = rays[n * 2];\n    uint32_t num_steps = rays[n * 2 + 1];\n\n    // write to res\n    res += offset;\n    for (int i = 0; i < num_steps; i++) res[i] = n;\n}\n\nvoid flatten_rays(const at::Tensor rays, const uint32_t N, const uint32_t M, at::Tensor res) {\n\n    static constexpr uint32_t N_THREAD = 128;\n\n    kernel_flatten_rays<<<div_round_up(N, N_THREAD), N_THREAD>>>(rays.data_ptr<int>(), N, M, res.data_ptr<int>());\n}\n\n////////////////////////////////////////////////////\n/////////////         training         /////////////\n////////////////////////////////////////////////////\n\n// rays_o/d: [N, 3]\n// grid: [CHHH / 8]\n// xyzs, dirs, ts: [M, 3], [M, 3], [M, 2]\n// dirs: [M, 3]\n// rays: [N, 3], idx, offset, num_steps\ntemplate <typename scalar_t>\n__global__ void kernel_march_rays_train(\n    const scalar_t * __restrict__ rays_o,\n    const scalar_t * __restrict__ rays_d,  \n    const uint8_t * __restrict__ grid,\n    const float bound, const bool contract,\n    const float dt_gamma, const uint32_t max_steps,\n    const uint32_t N, const uint32_t C, const uint32_t H,\n    const scalar_t* __restrict__ nears, \n    const scalar_t* __restrict__ fars,\n    scalar_t * xyzs, scalar_t * dirs, scalar_t * ts,\n    int * rays,\n    int * counter,\n    const scalar_t* __restrict__ noises\n) {\n    // parallel per ray\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= N) return;\n\n    // is first pass running.\n    const bool first_pass = (xyzs == nullptr);\n\n    // locate\n    rays_o += n * 3;\n    rays_d += n * 3;\n    rays += n * 2;\n\n    uint32_t num_steps = max_steps;\n\n    if (!first_pass) {\n        uint32_t point_index = rays[0];\n        num_steps = rays[1];\n        xyzs += point_index * 3;\n        dirs += point_index * 3;\n        ts += point_index * 2;\n    }\n\n    // ray marching\n    const float ox = rays_o[0], oy = rays_o[1], oz = rays_o[2];\n    const float dx = rays_d[0], dy = rays_d[1], dz = rays_d[2];\n    const float rdx = 1 / dx, rdy = 1 / dy, rdz = 1 / dz;\n    const float rH = 1 / (float)H;\n    const float H3 = H * H * H;\n\n    const float near = nears[n];\n    const float far = fars[n];\n    const float noise = noises[n];\n\n    const float dt_min = 2 * SQRT3() / max_steps;\n    const float dt_max = 2 * SQRT3() * bound / H;\n    // const float dt_max = 1e10f;\n    \n    float t0 = near;\n    t0 += clamp(t0 * dt_gamma, dt_min, dt_max) * noise;\n    float t = t0;\n    uint32_t step = 0;\n\n    //if (t < far) printf(\"valid ray %d t=%f near=%f far=%f \\n\", n, t, near, far);\n    \n    while (t < far && step < num_steps) {\n        // current point\n        const float x = clamp(ox + t * dx, -bound, bound);\n        const float y = clamp(oy + t * dy, -bound, bound);\n        const float z = clamp(oz + t * dz, -bound, bound);\n\n        float dt = clamp(t * dt_gamma, dt_min, dt_max);\n\n        // get mip level\n        const int level = max(mip_from_pos(x, y, z, C), mip_from_dt(dt, H, C)); // range in [0, C - 1]\n\n        const float mip_bound = fminf(scalbnf(1.0f, level), bound);\n        const float mip_rbound = 1 / mip_bound;\n\n        // contraction\n        float cx = x, cy = y, cz = z;\n        const float mag = fmaxf(fabsf(x), fmaxf(fabsf(y), fabsf(z)));\n        if (contract && mag > 1) {\n            // L-INF norm\n            const float Linf_scale = (2 - 1 / mag) / mag;\n            cx *= Linf_scale;\n            cy *= Linf_scale;\n            cz *= Linf_scale;\n        }\n        \n        // convert to nearest grid position\n        const int nx = clamp(0.5 * (cx * mip_rbound + 1) * H, 0.0f, (float)(H - 1));\n        const int ny = clamp(0.5 * (cy * mip_rbound + 1) * H, 0.0f, (float)(H - 1));\n        const int nz = clamp(0.5 * (cz * mip_rbound + 1) * H, 0.0f, (float)(H - 1));\n\n        const uint32_t index = level * H3 + __morton3D(nx, ny, nz);\n        const bool occ = grid[index / 8] & (1 << (index % 8));\n\n        // if occpuied, advance a small step, and write to output\n        //if (n == 0) printf(\"t=%f density=%f vs thresh=%f step=%d\\n\", t, density, density_thresh, step);\n\n        if (occ) {\n            step++;\n            t += dt;\n            if (!first_pass) {\n                xyzs[0] = cx; // write contracted coordinates!\n                xyzs[1] = cy;\n                xyzs[2] = cz;\n                dirs[0] = dx;\n                dirs[1] = dy;\n                dirs[2] = dz;\n                ts[0] = t;\n                ts[1] = dt;\n                xyzs += 3;\n                dirs += 3;\n                ts += 2;\n            }\n        // contraction case: cannot apply voxel skipping.\n        } else if (contract && mag > 1) {\n            t += dt;\n        // else, skip a large step (basically skip a voxel grid)\n        } else {\n            // calc distance to next voxel\n            const float tx = (((nx + 0.5f + 0.5f * signf(dx)) * rH * 2 - 1) * mip_bound - cx) * rdx;\n            const float ty = (((ny + 0.5f + 0.5f * signf(dy)) * rH * 2 - 1) * mip_bound - cy) * rdy;\n            const float tz = (((nz + 0.5f + 0.5f * signf(dz)) * rH * 2 - 1) * mip_bound - cz) * rdz;\n\n            const float tt = t + fmaxf(0.0f, fminf(tx, fminf(ty, tz)));\n            // step until next voxel\n            do { \n                dt = clamp(t * dt_gamma, dt_min, dt_max);\n                t += dt;\n            } while (t < tt);\n        }\n    }\n\n    //printf(\"[n=%d] step=%d, near=%f, far=%f, dt=%f, num_steps=%f\\n\", n, step, near, far, dt_min, (far - near) / dt_min);\n\n    // write rays\n    if (first_pass) {\n        uint32_t point_index = atomicAdd(counter, step);\n        rays[0] = point_index;\n        rays[1] = step;\n    }\n}\n\nvoid march_rays_train(const at::Tensor rays_o, const at::Tensor rays_d, const at::Tensor grid, const float bound, const bool contract, const float dt_gamma, const uint32_t max_steps, const uint32_t N, const uint32_t C, const uint32_t H, const at::Tensor nears, const at::Tensor fars, at::optional<at::Tensor> xyzs, at::optional<at::Tensor> dirs, at::optional<at::Tensor> ts, at::Tensor rays, at::Tensor counter, at::Tensor noises) {\n\n    static constexpr uint32_t N_THREAD = 128;\n    \n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    rays_o.scalar_type(), \"march_rays_train\", ([&] {\n        kernel_march_rays_train<<<div_round_up(N, N_THREAD), N_THREAD>>>(rays_o.data_ptr<scalar_t>(), rays_d.data_ptr<scalar_t>(), grid.data_ptr<uint8_t>(), bound, contract, dt_gamma, max_steps, N, C, H, nears.data_ptr<scalar_t>(), fars.data_ptr<scalar_t>(),\n            xyzs.has_value() ? xyzs.value().data_ptr<scalar_t>() : nullptr,\n            dirs.has_value() ? dirs.value().data_ptr<scalar_t>() : nullptr,\n            ts.has_value() ? ts.value().data_ptr<scalar_t>() : nullptr,\n            rays.data_ptr<int>(), counter.data_ptr<int>(), noises.data_ptr<scalar_t>());\n    }));\n}\n\n\n// sigmas: [M]\n// rgbs: [M, 3]\n// ts: [M, 2]\n// rays: [N, 2], offset, num_steps\n// weights: [M]\n// weights_sum: [N], final pixel alpha\n// depth: [N,]\n// image: [N, 3]\ntemplate <typename scalar_t>\n__global__ void kernel_composite_rays_train_forward(\n    const scalar_t * __restrict__ sigmas,\n    const scalar_t * __restrict__ rgbs,  \n    const scalar_t * __restrict__ ts,\n    const int * __restrict__ rays,\n    const uint32_t M, const uint32_t N, const float T_thresh, const bool binarize,\n    scalar_t * weights,\n    scalar_t * weights_sum,\n    scalar_t * depth,\n    scalar_t * image\n) {\n    // parallel per ray\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= N) return;\n\n    // locate \n    uint32_t offset = rays[n * 2];\n    uint32_t num_steps = rays[n * 2 + 1];\n\n    // empty ray, or ray that exceed max step count.\n    if (num_steps == 0 || offset + num_steps > M) {\n        weights_sum[n] = 0;\n        depth[n] = 0;\n        image[n * 3] = 0;\n        image[n * 3 + 1] = 0;\n        image[n * 3 + 2] = 0;\n        return;\n    }\n\n    ts += offset * 2;\n    weights += offset;\n    sigmas += offset;\n    rgbs += offset * 3;\n\n    // accumulate \n    uint32_t step = 0;\n\n    float T = 1.0f;\n    float r = 0, g = 0, b = 0, ws = 0, d = 0;\n\n    while (step < num_steps) {\n\n        const float real_alpha = 1.0f - __expf(- sigmas[0] * ts[1]);\n        const float alpha = binarize ? (real_alpha > 0.5 ? 1.0 : 0.0) : real_alpha;\n        const float weight = alpha * T;\n\n        weights[0] = weight;\n\n        r += weight * rgbs[0];\n        g += weight * rgbs[1];\n        b += weight * rgbs[2];\n        ws += weight;\n        d += weight * ts[0];\n        \n        T *= 1.0f - alpha;\n\n        // minimal remained transmittence\n        if (T < T_thresh) break;\n\n        //printf(\"[n=%d] num_steps=%d, alpha=%f, w=%f, T=%f, sum_dt=%f, d=%f\\n\", n, step, alpha, weight, T, sum_delta, d);\n\n        // locate\n        weights++;\n        sigmas++;\n        rgbs += 3;\n        ts += 2;\n\n        step++;\n    }\n\n    //printf(\"[n=%d] rgb=(%f, %f, %f), d=%f\\n\", n, r, g, b, d);\n\n    // write\n    weights_sum[n] = ws; // weights_sum\n    depth[n] = d;\n    image[n * 3] = r;\n    image[n * 3 + 1] = g;\n    image[n * 3 + 2] = b;\n}\n\n\nvoid composite_rays_train_forward(const at::Tensor sigmas, const at::Tensor rgbs, const at::Tensor ts, const at::Tensor rays, const uint32_t M, const uint32_t N, const float T_thresh, const bool binarize, at::Tensor weights, at::Tensor weights_sum, at::Tensor depth, at::Tensor image) {\n\n    static constexpr uint32_t N_THREAD = 128;\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    sigmas.scalar_type(), \"composite_rays_train_forward\", ([&] {\n        kernel_composite_rays_train_forward<<<div_round_up(N, N_THREAD), N_THREAD>>>(sigmas.data_ptr<scalar_t>(), rgbs.data_ptr<scalar_t>(), ts.data_ptr<scalar_t>(), rays.data_ptr<int>(), M, N, T_thresh, binarize, weights.data_ptr<scalar_t>(), weights_sum.data_ptr<scalar_t>(), depth.data_ptr<scalar_t>(), image.data_ptr<scalar_t>());\n    }));\n}\n\n\n// grad_weights: [M,]\n// grad_weights_sum: [N,]\n// grad_image: [N, 3]\n// grad_depth: [N,]\n// sigmas: [M]\n// rgbs: [M, 3]\n// ts: [M, 2]\n// rays: [N, 2], offset, num_steps\n// weights_sum: [N,], weights_sum here \n// image: [N, 3]\n// grad_sigmas: [M]\n// grad_rgbs: [M, 3]\ntemplate <typename scalar_t>\n__global__ void kernel_composite_rays_train_backward(\n    const scalar_t * __restrict__ grad_weights,\n    const scalar_t * __restrict__ grad_weights_sum,\n    const scalar_t * __restrict__ grad_depth,\n    const scalar_t * __restrict__ grad_image,\n    const scalar_t * __restrict__ sigmas,\n    const scalar_t * __restrict__ rgbs, \n    const scalar_t * __restrict__ ts,\n    const int * __restrict__ rays,\n    const scalar_t * __restrict__ weights_sum,\n    const scalar_t * __restrict__ depth,\n    const scalar_t * __restrict__ image,\n    const uint32_t M, const uint32_t N, const float T_thresh, const bool binarize,\n    scalar_t * grad_sigmas,\n    scalar_t * grad_rgbs\n) {\n    // parallel per ray\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= N) return;\n\n    // locate \n    uint32_t offset = rays[n * 2];\n    uint32_t num_steps = rays[n * 2 + 1];\n\n    if (num_steps == 0 || offset + num_steps > M) return;\n\n    grad_weights += offset;\n    grad_weights_sum += n;\n    grad_depth += n;\n    grad_image += n * 3;\n    weights_sum += n;\n    depth += n;\n    image += n * 3;\n    sigmas += offset;\n    rgbs += offset * 3;\n    ts += offset * 2;\n    grad_sigmas += offset;\n    grad_rgbs += offset * 3;\n\n    // accumulate \n    uint32_t step = 0;\n    \n    float T = 1.0f;\n    const float r_final = image[0], g_final = image[1], b_final = image[2], ws_final = weights_sum[0], d_final = depth[0];\n    float r = 0, g = 0, b = 0, ws = 0, d = 0;\n\n    while (step < num_steps) {\n        \n        const float real_alpha = 1.0f - __expf(- sigmas[0] * ts[1]);\n        const float alpha = binarize ? (real_alpha > 0.5 ? 1.0 : 0.0) : real_alpha;\n        const float weight = alpha * T;\n\n        r += weight * rgbs[0];\n        g += weight * rgbs[1];\n        b += weight * rgbs[2];\n        ws += weight;\n        d += weight * ts[0];\n\n        T *= 1.0f - alpha;\n        \n        // check https://note.kiui.moe/others/nerf_gradient/ for the gradient calculation.\n        // write grad_rgbs\n        grad_rgbs[0] = grad_image[0] * weight;\n        grad_rgbs[1] = grad_image[1] * weight;\n        grad_rgbs[2] = grad_image[2] * weight;\n\n        // write grad_sigmas\n        grad_sigmas[0] = ts[1] * (\n            grad_image[0] * (T * rgbs[0] - (r_final - r)) + \n            grad_image[1] * (T * rgbs[1] - (g_final - g)) + \n            grad_image[2] * (T * rgbs[2] - (b_final - b)) +\n            (grad_weights_sum[0] + grad_weights[0]) * (T - (ws_final - ws)) + \n            grad_depth[0] * (T * ts[0] - (d_final - d))\n        );\n\n        //printf(\"[n=%d] num_steps=%d, T=%f, grad_sigmas=%f, r_final=%f, r=%f\\n\", n, step, T, grad_sigmas[0], r_final, r);\n        // minimal remained transmittence\n        if (T < T_thresh) break;\n        \n        // locate\n        sigmas++;\n        rgbs += 3;\n        ts += 2;\n        grad_weights++;\n        grad_sigmas++;\n        grad_rgbs += 3;\n\n        step++;\n    }\n}\n\n\nvoid composite_rays_train_backward(const at::Tensor grad_weights, const at::Tensor grad_weights_sum, const at::Tensor grad_depth, const at::Tensor grad_image, const at::Tensor sigmas, const at::Tensor rgbs, const at::Tensor ts, const at::Tensor rays, const at::Tensor weights_sum, const at::Tensor depth, const at::Tensor image, const uint32_t M, const uint32_t N, const float T_thresh, const bool binarize, at::Tensor grad_sigmas, at::Tensor grad_rgbs) {\n\n    static constexpr uint32_t N_THREAD = 128;\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    grad_image.scalar_type(), \"composite_rays_train_backward\", ([&] {\n        kernel_composite_rays_train_backward<<<div_round_up(N, N_THREAD), N_THREAD>>>(grad_weights.data_ptr<scalar_t>(), grad_weights_sum.data_ptr<scalar_t>(), grad_depth.data_ptr<scalar_t>(), grad_image.data_ptr<scalar_t>(), sigmas.data_ptr<scalar_t>(), rgbs.data_ptr<scalar_t>(), ts.data_ptr<scalar_t>(), rays.data_ptr<int>(), weights_sum.data_ptr<scalar_t>(), depth.data_ptr<scalar_t>(), image.data_ptr<scalar_t>(), M, N, T_thresh, binarize, grad_sigmas.data_ptr<scalar_t>(), grad_rgbs.data_ptr<scalar_t>());\n    }));\n}\n\n\n////////////////////////////////////////////////////\n/////////////          infernce        /////////////\n////////////////////////////////////////////////////\n\ntemplate <typename scalar_t>\n__global__ void kernel_march_rays(\n    const uint32_t n_alive, \n    const uint32_t n_step, \n    const int* __restrict__ rays_alive, \n    const scalar_t* __restrict__ rays_t, \n    const scalar_t* __restrict__ rays_o, \n    const scalar_t* __restrict__ rays_d, \n    const float bound, const bool contract,\n    const float dt_gamma, const uint32_t max_steps,\n    const uint32_t C, const uint32_t H,\n    const uint8_t * __restrict__ grid,\n    const scalar_t* __restrict__ nears,\n    const scalar_t* __restrict__ fars,\n    scalar_t* xyzs, scalar_t* dirs, scalar_t* ts,\n    const scalar_t* __restrict__ noises\n) {\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= n_alive) return;\n\n    const int index = rays_alive[n]; // ray id\n    const float noise = noises[n];\n    \n    // locate\n    rays_o += index * 3;\n    rays_d += index * 3;\n    xyzs += n * n_step * 3;\n    dirs += n * n_step * 3;\n    ts += n * n_step * 2;\n    \n    const float ox = rays_o[0], oy = rays_o[1], oz = rays_o[2];\n    const float dx = rays_d[0], dy = rays_d[1], dz = rays_d[2];\n    const float rdx = 1 / dx, rdy = 1 / dy, rdz = 1 / dz;\n    const float rH = 1 / (float)H;\n    const float H3 = H * H * H;\n    \n    const float near = nears[index], far = fars[index];\n\n    const float dt_min = 2 * SQRT3() / max_steps;\n    const float dt_max = 2 * SQRT3() * bound / H;\n    // const float dt_max = 1e10f;\n\n    // march for n_step steps, record points\n    float t = rays_t[index];\n    t += clamp(t * dt_gamma, dt_min, dt_max) * noise;\n    uint32_t step = 0;\n\n    while (t < far && step < n_step) {\n        // current point\n        const float x = clamp(ox + t * dx, -bound, bound);\n        const float y = clamp(oy + t * dy, -bound, bound);\n        const float z = clamp(oz + t * dz, -bound, bound);\n\n        float dt = clamp(t * dt_gamma, dt_min, dt_max);\n\n        // get mip level\n        const int level = max(mip_from_pos(x, y, z, C), mip_from_dt(dt, H, C)); // range in [0, C - 1]\n\n        const float mip_bound = fminf(scalbnf(1, level), bound);\n        const float mip_rbound = 1 / mip_bound;\n        \n        // contraction\n        float cx = x, cy = y, cz = z;\n        const float mag = fmaxf(fabsf(x), fmaxf(fabsf(y), fabsf(z)));\n        if (contract && mag > 1) {\n            // L-INF norm\n            const float Linf_scale = (2 - 1 / mag) / mag;\n            cx *= Linf_scale;\n            cy *= Linf_scale;\n            cz *= Linf_scale;\n        }\n        \n        // convert to nearest grid position\n        const int nx = clamp(0.5 * (cx * mip_rbound + 1) * H, 0.0f, (float)(H - 1));\n        const int ny = clamp(0.5 * (cy * mip_rbound + 1) * H, 0.0f, (float)(H - 1));\n        const int nz = clamp(0.5 * (cz * mip_rbound + 1) * H, 0.0f, (float)(H - 1));\n\n        const uint32_t index = level * H3 + __morton3D(nx, ny, nz);\n        const bool occ = grid[index / 8] & (1 << (index % 8));\n\n        // if occpuied, advance a small step, and write to output\n        if (occ) {\n            // write step\n            xyzs[0] = cx;\n            xyzs[1] = cy;\n            xyzs[2] = cz;\n            dirs[0] = dx;\n            dirs[1] = dy;\n            dirs[2] = dz;\n            // calc dt\n            t += dt;\n            ts[0] = t;\n            ts[1] = dt;\n            // step\n            xyzs += 3;\n            dirs += 3;\n            ts += 2;\n            step++;\n\n        // contraction case\n        } else if (contract && mag > 1) {\n            t += dt;\n        // else, skip a large step (basically skip a voxel grid)\n        } else {\n            // calc distance to next voxel\n            const float tx = (((nx + 0.5f + 0.5f * signf(dx)) * rH * 2 - 1) * mip_bound - cx) * rdx;\n            const float ty = (((ny + 0.5f + 0.5f * signf(dy)) * rH * 2 - 1) * mip_bound - cy) * rdy;\n            const float tz = (((nz + 0.5f + 0.5f * signf(dz)) * rH * 2 - 1) * mip_bound - cz) * rdz;\n            const float tt = t + fmaxf(0.0f, fminf(tx, fminf(ty, tz)));\n            // step until next voxel\n            do { \n                dt = clamp(t * dt_gamma, dt_min, dt_max);\n                t += dt;\n            } while (t < tt);\n        }\n    }\n}\n\n\nvoid march_rays(const uint32_t n_alive, const uint32_t n_step, const at::Tensor rays_alive, const at::Tensor rays_t, const at::Tensor rays_o, const at::Tensor rays_d, const float bound, const bool contract, const float dt_gamma, const uint32_t max_steps, const uint32_t C, const uint32_t H, const at::Tensor grid, const at::Tensor near, const at::Tensor far, at::Tensor xyzs, at::Tensor dirs, at::Tensor ts, at::Tensor noises) {\n    static constexpr uint32_t N_THREAD = 128;\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    rays_o.scalar_type(), \"march_rays\", ([&] {\n        kernel_march_rays<<<div_round_up(n_alive, N_THREAD), N_THREAD>>>(n_alive, n_step, rays_alive.data_ptr<int>(), rays_t.data_ptr<scalar_t>(), rays_o.data_ptr<scalar_t>(), rays_d.data_ptr<scalar_t>(), bound, contract, dt_gamma, max_steps, C, H, grid.data_ptr<uint8_t>(), near.data_ptr<scalar_t>(), far.data_ptr<scalar_t>(), xyzs.data_ptr<scalar_t>(), dirs.data_ptr<scalar_t>(), ts.data_ptr<scalar_t>(), noises.data_ptr<scalar_t>());\n    }));\n}\n\n\ntemplate <typename scalar_t>\n__global__ void kernel_composite_rays(\n    const uint32_t n_alive, \n    const uint32_t n_step, \n    const float T_thresh, const bool binarize,\n    int* rays_alive, \n    scalar_t* rays_t, \n    const scalar_t* __restrict__ sigmas, \n    const scalar_t* __restrict__ rgbs, \n    const scalar_t* __restrict__ ts, \n    scalar_t* weights_sum, scalar_t* depth, scalar_t* image\n) {\n    const uint32_t n = threadIdx.x + blockIdx.x * blockDim.x;\n    if (n >= n_alive) return;\n\n    const int index = rays_alive[n]; // ray id\n    \n    // locate \n    sigmas += n * n_step;\n    rgbs += n * n_step * 3;\n    ts += n * n_step * 2;\n    \n    rays_t += index;\n    weights_sum += index;\n    depth += index;\n    image += index * 3;\n\n    float t;\n    float d = depth[0], r = image[0], g = image[1], b = image[2], weight_sum = weights_sum[0];\n\n    // accumulate \n    uint32_t step = 0;\n    while (step < n_step) {\n        \n        // ray is terminated if t == 0\n        if (ts[0] == 0) break;\n        \n        const float real_alpha = 1.0f - __expf(- sigmas[0] * ts[1]);\n        const float alpha = binarize ? (real_alpha > 0.5 ? 1.0 : 0.0) : real_alpha;\n\n        /* \n        T_0 = 1; T_i = \\prod_{j=0}^{i-1} (1 - alpha_j)\n        w_i = alpha_i * T_i\n        --> \n        T_i = 1 - \\sum_{j=0}^{i-1} w_j\n        */\n        const float T = 1 - weight_sum;\n        const float weight = alpha * T;\n        weight_sum += weight;\n\n        t = ts[0];\n        d += weight * t; // real depth\n        r += weight * rgbs[0];\n        g += weight * rgbs[1];\n        b += weight * rgbs[2];\n\n        //printf(\"[n=%d] num_steps=%d, alpha=%f, w=%f, T=%f, sum_dt=%f, d=%f\\n\", n, step, alpha, weight, T, sum_delta, d);\n\n        // ray is terminated if T is too small\n        // use a larger bound to further accelerate inference\n        if (T < T_thresh) break;\n\n        // locate\n        sigmas++;\n        rgbs += 3;\n        ts += 2;\n        step++;\n    }\n\n    //printf(\"[n=%d] rgb=(%f, %f, %f), d=%f\\n\", n, r, g, b, d);\n\n    // rays_alive = -1 means ray is terminated early.\n    if (step < n_step) {\n        rays_alive[n] = -1;\n    } else {\n        rays_t[0] = t;\n    }\n\n    weights_sum[0] = weight_sum; // this is the thing I needed!\n    depth[0] = d;\n    image[0] = r;\n    image[1] = g;\n    image[2] = b;\n}\n\n\nvoid composite_rays(const uint32_t n_alive, const uint32_t n_step, const float T_thresh, const bool binarize, at::Tensor rays_alive, at::Tensor rays_t, at::Tensor sigmas, at::Tensor rgbs, at::Tensor ts, at::Tensor weights, at::Tensor depth, at::Tensor image) {\n    static constexpr uint32_t N_THREAD = 128;\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    image.scalar_type(), \"composite_rays\", ([&] {\n        kernel_composite_rays<<<div_round_up(n_alive, N_THREAD), N_THREAD>>>(n_alive, n_step, T_thresh, binarize, rays_alive.data_ptr<int>(), rays_t.data_ptr<scalar_t>(), sigmas.data_ptr<scalar_t>(), rgbs.data_ptr<scalar_t>(), ts.data_ptr<scalar_t>(), weights.data_ptr<scalar_t>(), depth.data_ptr<scalar_t>(), image.data_ptr<scalar_t>());\n    }));\n}"
  },
  {
    "path": "stable-dreamfusion/raymarching/src/raymarching.h",
    "content": "#pragma once\n\n#include <stdint.h>\n#include <torch/torch.h>\n\n\nvoid near_far_from_aabb(const at::Tensor rays_o, const at::Tensor rays_d, const at::Tensor aabb, const uint32_t N, const float min_near, at::Tensor nears, at::Tensor fars);\nvoid sph_from_ray(const at::Tensor rays_o, const at::Tensor rays_d, const float radius, const uint32_t N, at::Tensor coords);\nvoid morton3D(const at::Tensor coords, const uint32_t N, at::Tensor indices);\nvoid morton3D_invert(const at::Tensor indices, const uint32_t N, at::Tensor coords);\nvoid packbits(const at::Tensor grid, const uint32_t N, const float density_thresh, at::Tensor bitfield);\nvoid flatten_rays(const at::Tensor rays, const uint32_t N, const uint32_t M, at::Tensor res);\n\nvoid march_rays_train(const at::Tensor rays_o, const at::Tensor rays_d, const at::Tensor grid, const float bound, const bool contract, const float dt_gamma, const uint32_t max_steps, const uint32_t N, const uint32_t C, const uint32_t H, const at::Tensor nears, const at::Tensor fars, at::optional<at::Tensor> xyzs, at::optional<at::Tensor> dirs, at::optional<at::Tensor> ts, at::Tensor rays, at::Tensor counter, at::Tensor noises);\nvoid composite_rays_train_forward(const at::Tensor sigmas, const at::Tensor rgbs, const at::Tensor ts, const at::Tensor rays, const uint32_t M, const uint32_t N, const float T_thresh, const bool binarize, at::Tensor weights, at::Tensor weights_sum, at::Tensor depth, at::Tensor image);\nvoid composite_rays_train_backward(const at::Tensor grad_weights, const at::Tensor grad_weights_sum, const at::Tensor grad_depth, const at::Tensor grad_image, const at::Tensor sigmas, const at::Tensor rgbs, const at::Tensor ts, const at::Tensor rays, const at::Tensor weights_sum, const at::Tensor depth, const at::Tensor image, const uint32_t M, const uint32_t N, const float T_thresh, const bool binarize, at::Tensor grad_sigmas, at::Tensor grad_rgbs);\n\nvoid march_rays(const uint32_t n_alive, const uint32_t n_step, const at::Tensor rays_alive, const at::Tensor rays_t, const at::Tensor rays_o, const at::Tensor rays_d, const float bound, const bool contract, const float dt_gamma, const uint32_t max_steps, const uint32_t C, const uint32_t H, const at::Tensor grid, const at::Tensor nears, const at::Tensor fars, at::Tensor xyzs, at::Tensor dirs, at::Tensor ts, at::Tensor noises);\nvoid composite_rays(const uint32_t n_alive, const uint32_t n_step, const float T_thresh, const bool binarize, at::Tensor rays_alive, at::Tensor rays_t, at::Tensor sigmas, at::Tensor rgbs, at::Tensor ts, at::Tensor weights_sum, at::Tensor depth, at::Tensor image);"
  },
  {
    "path": "stable-dreamfusion/readme.md",
    "content": "# Stable-Dreamfusion + Perp-Neg\n\nA pytorch implementation of the text-to-3D model **Perp-Neg + Dreamfusion**, \n\nplease use the scripts in \nscripts/run_if2_perpneg.sh to run the Stable DreamFusion + PerpNeg to avoid the Janus problem.\n\n\nThis code is manily based on [Stable-DreamFusion](https://github.com/ashawkey/stable-dreamfusion) \n"
  },
  {
    "path": "stable-dreamfusion/requirements.txt",
    "content": "tqdm\nrich\nninja\nnumpy\npandas\nscipy\nscikit-learn\nmatplotlib\nopencv-python\nimageio\nimageio-ffmpeg\n\ntorch\ntorch-ema\neinops\ntensorboard\ntensorboardX\n\n# for gui\ndearpygui\n\n# for grid_tcnn\n# git+https://github.com/NVlabs/tiny-cuda-nn/#subdirectory=bindings/torch\n\n# for stable-diffusion\nhuggingface_hub\ndiffusers >= 0.9.0\naccelerate\ntransformers\n\n# for dmtet and mesh export\nxatlas\ntrimesh\nPyMCubes\npymeshlab\ngit+https://github.com/NVlabs/nvdiffrast/\n\n# for zero123\ncarvekit-colab\nomegaconf\npytorch-lightning\ntaming-transformers-rom1504\nkornia\ngit+https://github.com/openai/CLIP.git\n\n# for omnidata\ngdown\n\n# for dpt\ntimm\n\n# for remote debugging\ndebugpy-run\n\n# for deepfloyd if\nsentencepiece\n"
  },
  {
    "path": "stable-dreamfusion/scripts/install_ext.sh",
    "content": "pip install ./raymarching\npip install ./shencoder\npip install ./freqencoder\npip install ./gridencoder"
  },
  {
    "path": "stable-dreamfusion/scripts/res64.args",
    "content": "-O --vram_O --w 64 --h 64"
  },
  {
    "path": "stable-dreamfusion/scripts/run.sh",
    "content": "#! /bin/bash\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"a DSLR photo of a delicious hamburger\" --workspace trial_hamburger --iters 5000\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"a DSLR photo of a delicious hamburger\" --workspace trial2_hamburger --dmtet --iters 5000 --init_with trial_hamburger/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"a highly detailed stone bust of Theodoros Kolokotronis\" --workspace trial_stonehead --iters 5000\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"a highly detailed stone bust of Theodoros Kolokotronis\" --workspace trial2_stonehead --dmtet --iters 5000 --init_with trial_stonehead/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"an astronaut, full body\" --workspace trial_astronaut --iters 5000\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"an astronaut, full body\" --workspace trial2_astronaut --dmtet --iters 5000 --init_with trial_astronaut/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"a DSLR photo of a squirrel-octopus hybrid\" --workspace trial_squrrel_octopus --iters 5000\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"a DSLR photo of a squirrel-octopus hybrid\" --workspace trial2_squrrel_octopus --dmtet --iters 5000 --init_with trial_squrrel_octopus/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"a baby bunny sitting on top of a stack of pancakes\" --workspace trial_rabbit_pancake --iters 5000\nCUDA_VISIBLE_DEVICES=1 python main.py -O --text \"a metal bunny sitting on top of a stack of chocolate cookies\" --workspace trial2_rabbit_pancake --dmtet --iters 5000 --init_with trial_rabbit_pancake/checkpoints/df.pth"
  },
  {
    "path": "stable-dreamfusion/scripts/run2.sh",
    "content": "#! /bin/bash\n\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a DSLR photo of a shiba inu playing golf wearing tartan golf clothes and hat\" --workspace trial_shiba --iters 10000\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a DSLR photo of a shiba inu playing golf wearing tartan golf clothes and hat\" --workspace trial2_shiba --dmtet --iters 5000 --init_with trial_shiba/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a banana peeling itself\" --workspace trial_banana --iters 10000\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a banana peeling itself\" --workspace trial2_banana --dmtet --iters 5000 --init_with trial_banana/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a capybara wearing a top hat, low poly\" --workspace trial_capybara --iters 10000\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a capybara wearing a top hat, low poly\" --workspace trial2_capybara --dmtet --iters 5000 --init_with trial_capybara/checkpoints/df.pth"
  },
  {
    "path": "stable-dreamfusion/scripts/run3.sh",
    "content": "#! /bin/bash\n\nCUDA_VISIBLE_DEVICES=7 python main.py -O --text \"ironman, full body\" --workspace trial_ironman --iters 10000\nCUDA_VISIBLE_DEVICES=7 python main.py -O --text \"ironman, full body\" --workspace trial2_ironman --dmtet --iters 5000 --init_with trial_ironman/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=7 python main.py -O --text \"a DSLR photo of an ice cream sundae\" --workspace trial_icecream --iters 10000\nCUDA_VISIBLE_DEVICES=7 python main.py -O --text \"a DSLR photo of an ice cream sundae\" --workspace trial2_icecream --dmtet --iters 5000 --init_with trial_icecream/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=7 python main.py -O --text \"a DSLR photo of a kingfisher bird\" --workspace trial_bird --iters 10000\nCUDA_VISIBLE_DEVICES=7 python main.py -O --text \"a DSLR photo of a kingfisher bird\" --workspace trial2_bird --dmtet --iters 5000 --init_with trial_bird/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=7 python main.py -O --text \"a car made of sushi\" --workspace trial_sushi --iters 10000\nCUDA_VISIBLE_DEVICES=7 python main.py -O --text \"a car made of sushi\" --workspace trial2_sushi --dmtet --iters 5000 --init_with trial_sushi/checkpoints/df.pth\n"
  },
  {
    "path": "stable-dreamfusion/scripts/run4.sh",
    "content": "#! /bin/bash\n\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a rabbit, animated movie character, high detail 3d model\" --workspace trial_rabbit2 --iters 10000\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a rabbit, animated movie character, high detail 3d model\" --workspace trial2_rabbit2 --dmtet --iters 5000 --init_with trial_rabbit2/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a corgi dog, highly detailed 3d model\" --workspace trial_corgi --iters 10000\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"a corgi dog, highly detailed 3d model\" --workspace trial2_corgi --dmtet --iters 5000 --init_with trial_corgi/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \" a small saguaro cactus planted in a clay pot\" --workspace trial_cactus --iters 10000\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \" a small saguaro cactus planted in a clay pot\" --workspace trial2_cactus --dmtet --iters 5000 --init_with trial_cactus/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"the leaning tower of Pisa\" --workspace trial_pisa --iters 10000\nCUDA_VISIBLE_DEVICES=5 python main.py -O --text \"the leaning tower of Pisa\" --workspace trial2_pisa --dmtet --iters 5000 --init_with trial_pisa/checkpoints/df.pth"
  },
  {
    "path": "stable-dreamfusion/scripts/run5.sh",
    "content": "#! /bin/bash\n\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"Perched blue jay bird\" --workspace trial_jay --iters 10000\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"Perched blue jay bird\" --workspace trial2_jay --dmtet --iters 5000 --init_with trial_jay/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"angel statue wings out\" --workspace trial_angle --iters 10000\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"angel statue wings out\" --workspace trial2_angle --dmtet --iters 5000 --init_with trial_angle/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"devil statue\" --workspace trial_devil --iters 10000\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"devil statue\" --workspace trial2_devil --dmtet --iters 5000 --init_with trial_devil/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"Einstein statue\" --workspace trial_einstein --iters 10000\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"Einstein statue\" --workspace trial2_einstein --dmtet --iters 5000 --init_with trial_einstein/checkpoints/df.pth\n"
  },
  {
    "path": "stable-dreamfusion/scripts/run6.sh",
    "content": "#! /bin/bash\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a baby bunny sitting on top of a stack of pancakes\" --workspace trial_rabbit_pancake --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a metal bunny sitting on top of a stack of chocolate cookies\" --workspace trial2_rabbit_pancake --dmtet --iters 5000 --init_with trial_rabbit_pancake/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a DSLR photo of a blue jay standing on a large basket of rainbow macarons\" --workspace trial_jay --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a DSLR photo of a blue jay standing on a large basket of rainbow macarons\" --workspace trial2_jay --dmtet --iters 5000 --init_with trial_jay/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a DSLR photo of a fox taking a photograph using a DSLR\" --workspace trial_fox --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a DSLR photo of a fox taking a photograph using a DSLR\" --workspace trial2_fox --dmtet --iters 5000 --init_with trial_fox/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a DSLR photo of a peacock on a surfboard\" --workspace trial_peacock --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a DSLR photo of a peacock on a surfboard\" --workspace trial2_peacock --dmtet --iters 5000 --init_with trial_peacock/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a flower made out of metal\" --workspace trial_metal_flower --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a flower made out of metal\" --workspace trial2_metal_flower --dmtet --iters 5000 --init_with trial_metal_flower/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a zoomed out DSLR photo of an egg cracked open with a newborn chick hatching out of it\" --workspace trial_chicken --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --text \"a zoomed out DSLR photo of an egg cracked open with a newborn chick hatching out of it\" --workspace trial2_chicken --dmtet --iters 5000 --init_with trial_chicken/checkpoints/df.pth"
  },
  {
    "path": "stable-dreamfusion/scripts/run_if.sh",
    "content": "#! /bin/bash\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a baby bunny sitting on top of a stack of pancakes\" --workspace trial_if_rabbit_pancake --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a metal bunny sitting on top of a stack of chocolate cookies\" --workspace trial_if2_rabbit_pancake --dmtet --iters 5000 --init_with trial_if_rabbit_pancake/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a DSLR photo of a blue jay standing on a large basket of rainbow macarons\" --workspace trial_if_jay --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a DSLR photo of a blue jay standing on a large basket of rainbow macarons\" --workspace trial_if2_jay --dmtet --iters 5000 --init_with trial_if_jay/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a DSLR photo of a fox taking a photograph using a DSLR\" --workspace trial_if_fox --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a DSLR photo of a fox taking a photograph using a DSLR\" --workspace trial_if2_fox --dmtet --iters 5000 --init_with trial_if_fox/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a DSLR photo of a peacock on a surfboard\" --workspace trial_if_peacock --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a DSLR photo of a peacock on a surfboard\" --workspace trial_if2_peacock --dmtet --iters 5000 --init_with trial_if_peacock/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a flower made out of metal\" --workspace trial_if_metal_flower --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a flower made out of metal\" --workspace trial_if2_metal_flower --dmtet --iters 5000 --init_with trial_if_metal_flower/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a zoomed out DSLR photo of an egg cracked open with a newborn chick hatching out of it\" --workspace trial_if_chicken --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=2 python main.py -O --text \"a zoomed out DSLR photo of an egg cracked open with a newborn chick hatching out of it\" --workspace trial_if2_chicken --dmtet --iters 5000 --init_with trial_if_chicken/checkpoints/df.pth"
  },
  {
    "path": "stable-dreamfusion/scripts/run_if2.sh",
    "content": "#! /bin/bash\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a corgi taking a selfie\" --workspace trial_if_corgi --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a corgi taking a selfie\" --workspace trial_if2_corgi --dmtet --iters 5000 --init_with trial_if_corgi/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a DSLR photo of a ghost eating a hamburger\" --workspace trial_if_ghost --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a DSLR photo of a ghost eating a hamburger\" --workspace trial_if2_ghost --dmtet --iters 5000 --init_with trial_if_ghost/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a DSLR photo of an origami motorcycle\" --workspace trial_if_motor --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a DSLR photo of an origami motorcycle\" --workspace trial_if2_motor --dmtet --iters 5000 --init_with trial_if_motor/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a DSLR photo of a Space Shuttle\" --workspace trial_if_spaceshuttle --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a DSLR photo of a Space Shuttle\" --workspace trial_if2_spaceshuttle --dmtet --iters 5000 --init_with trial_if_spaceshuttle/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a palm tree, low poly 3d model\" --workspace trial_if_palm --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a palm tree, low poly 3d model\" --workspace trial_if2_palm --dmtet --iters 5000 --init_with trial_if_palm/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a zoomed out DSLR photo of a marble bust of a cat, a real mouse is sitting on its head\" --workspace trial_if_cat_mouse --iters 5000 --IF\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a zoomed out DSLR photo of a marble bust of a cat, a real mouse is sitting on its head\" --workspace trial_if2_cat_mouse --dmtet --iters 5000 --init_with trial_if_cat_mouse/checkpoints/df.pth"
  },
  {
    "path": "stable-dreamfusion/scripts/run_if2_perpneg.sh",
    "content": "#! /bin/bash\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a lion bust\" --workspace trial_perpneg_if_lion --iters 5000 --IF --batch_size 1 --perpneg\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a DSLR photo of a lion\" --workspace trial_perpneg_if2_lion_p --dmtet --iters 5000 --perpneg --init_with trial_perpneg_if_lion/checkpoints/df.pth\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a DSLR photo of a lion\" --workspace trial_perpneg_if2_lion_nop --dmtet --iters 5000 --init_with trial_perpneg_if_lion/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a tiger cub\" --workspace trial_perpneg_if_tiger --iters 5000 --IF --batch_size 1 --perpneg\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"tiger\" --workspace trial_perpneg_if2_tiger_p --dmtet --iters 5000 --perpneg --init_with trial_perpneg_if_tiger/checkpoints/df.pth\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"tiger\" --workspace trial_perpneg_if2_tiger_nop --dmtet --iters 5000 --init_with trial_perpneg_if_tiger/checkpoints/df.pth\n\n# larger negative weight is used for the following command because the defult negative weight of -2 is not enough to make the diffusion model to produce the views as desired\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"a shiba dog wearing sunglasses\" --workspace trial_perpneg_if_shiba --iters 5000 --IF --batch_size 1 --perpneg --negative_w -3.0\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"shiba wearing sunglasses\"  --workspace trial_perpneg_if2_shiba_p --dmtet --iters 5000 --perpneg --negative_w -3.0 --init_with trial_perpneg_if_shiba/checkpoints/df.pth\nCUDA_VISIBLE_DEVICES=3 python main.py -O --text \"shiba wearing sunglasses\" --workspace trial_perpneg_if2_shiba_nop --dmtet --iters 5000 --init_with trial_perpneg_if_shiba/checkpoints/df.pth\n\n"
  },
  {
    "path": "stable-dreamfusion/scripts/run_image.sh",
    "content": "# zero123 backend (single object, images like 3d model rendering)\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/teddy_rgba.png --workspace trial_image_teddy --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/teddy_rgba.png --workspace trial2_image_teddy --iters 5000 --dmtet --init_with trial_image_teddy/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/catstatue_rgba.png --workspace trial_image_catstatue --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/catstatue_rgba.png --workspace trial2_image_catstatue --iters 5000 --dmtet --init_with trial_image_catstatue/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/firekeeper_rgba.png --workspace trial_image_firekeeper --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/firekeeper_rgba.png --workspace trial2_image_firekeeper --iters 5000 --dmtet --init_with trial_image_firekeeper/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/hamburger_rgba.png --workspace trial_image_hamburger --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/hamburger_rgba.png --workspace trial2_image_hamburger --iters 5000 --dmtet --init_with trial_image_hamburger/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/corgi_rgba.png --workspace trial_image_corgi --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/corgi_rgba.png --workspace trial2_image_corgi --iters 5000 --dmtet --init_with trial_image_corgi/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/cactus_rgba.png --workspace trial_image_cactus --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/cactus_rgba.png --workspace trial2_image_cactus --iters 5000 --dmtet --init_with trial_image_cactus/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/cake_rgba.png --workspace trial_image_cake --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image data/cake_rgba.png --workspace trial2_image_cake --iters 5000 --dmtet --init_with trial_image_cake/checkpoints/df.pth\n\n# CUDA_VISIBLE_DEVICES=6 python main.py -O --image data/warrior_rgba.png --workspace trial_image_warrior --iters 5000\n# CUDA_VISIBLE_DEVICES=6 python main.py -O --image data/warrior_rgba.png --workspace trial2_image_warrior --iters 5000 --dmtet --init_with trial_image_warrior/checkpoints/df.pth"
  },
  {
    "path": "stable-dreamfusion/scripts/run_image_anya.sh",
    "content": "# Phase 1 - barely fits in A100 40GB.\n# Conclusion: results in concave-ish face, no neck, excess hair in the back\nCUDA_VISIBLE_DEVICES=0 python main.py -O --image data/anya_front_rgba.png --workspace trial_anya_1_refimage \\\n  --iters 10000 --save_guidance --save_guidance_interval 10 --ckpt scratch --batch_size 2 --test_interval 2 \\\n  --h 128 --w 128 --zero123_grad_scale None\n\n# Phase 2 - barely fits in A100 40GB.\n# 20X smaller lambda_3d_normal_smooth, --known_view_interval 2, 3X LR\n# Much higher jitter to increase disparity (and eliminate some of the flatness)... not too high either (to avoid cropping the face)\nCUDA_VISIBLE_DEVICES=0 python main.py -O --image data/anya_front_rgba.png --workspace trial_anya_1_refimage_B_GPU2_reproduction1_GPU2 \\\n  --text \"A DSLR 3D photo of a cute anime schoolgirl stands proudly with her arms in the air, pink hair ( unreal engine 5 trending on Artstation Ghibli 4k )\" \\\n  --iters 12500 --ckpt trial_anya_1_refimage/checkpoints/df_ep0100.pth --save_guidance --save_guidance_interval 1 \\\n  --h 256 --w 256 --albedo_iter_ratio 0.0 --t_range 0.2 0.6 --batch_size 4 --radius_range 2.2 2.6 --test_interval 2 \\\n  --vram_O --guidance_scale 10 --jitter_pose --jitter_center 0.1 --jitter_target 0.1 --jitter_up 0.05 \\\n  --known_view_noise_scale 0 --lambda_depth 0 --lr 0.003 --progressive_view --known_view_interval 2 --dont_override_stuff --lambda_3d_normal_smooth 1 \\\n  --exp_start_iter 10000 --exp_end_iter 12500\n\n# Phase 3 - increase resolution to 512\n# Disable textureless since they can cause catastrophic divergence\n# Since radius range is inconsistent, increase it, and reduce the jitter to avoid excessively cropped renders.\n# Learning rate may be set too high, since `--batch_size 1`.\nCUDA_VISIBLE_DEVICES=0 python main.py -O --image data/anya_front_rgba.png --workspace trial_anya_1_refimage_B_GPU2_reproduction1_GPU2_refinedGPU2 \\\n  --text \"A DSLR 3D photo of a cute anime schoolgirl stands proudly with her arms in the air, pink hair ( unreal engine 5 trending on Artstation Ghibli 4k )\" \\\n  --iters 25000 --ckpt trial_anya_1_refimage_B_GPU2_reproduction1_GPU2/checkpoints/df_ep0125.pth  --save_guidance --save_guidance_interval 1 \\\n  --h 512 --w 512 --albedo_iter_ratio 0.0 --t_range 0.0 0.5 --batch_size 1 --radius_range 3.2 3.6 --test_interval 2 \\\n  --vram_O --guidance_scale 10 --jitter_pose --jitter_center 0.015 --jitter_target 0.015 --jitter_up 0.05 \\\n  --known_view_noise_scale 0 --lambda_depth 0 --lr 0.003 --known_view_interval 2 --dont_override_stuff --lambda_3d_normal_smooth 0.5 --textureless_ratio 0.0 --min_ambient_ratio 0.3 \\\n  --exp_start_iter 12500 --exp_end_iter 25000\n\n# Generate 6 views\nCUDA_VISIBLE_DEVICES=0 python main.py -O --image data/anya_front_rgba.png --ckpt trial_anya_1_refimage_B_GPU2_reproduction1_GPU2_refinedGPU2/checkpoints/df_ep0250.pth --six_views\n\n# Phase 4 - untested, need to adjust\n# CUDA_VISIBLE_DEVICES=0 python main.py -O --image data/anya_front_rgba.png --workspace trial_anya_1_refimage --iters 5000 --dmtet --init_with trial_anya_1_refimage/checkpoints/df.pth\n\n"
  },
  {
    "path": "stable-dreamfusion/scripts/run_image_hard_examples.sh",
    "content": "bash scripts/run_image_procedure.sh 0 30 90 anya_front \"A DSLR 3D photo of a cute anime schoolgirl stands proudly with her arms in the air, pink hair ( unreal engine 5 trending on Artstation Ghibli 4k )\"\nbash scripts/run_image_procedure.sh 1 30 70 baby_phoenix_on_ice \"A DSLR 3D photo of an adorable baby phoenix made in Swarowski crystal highly detailed intricate concept art 8K ( unreal engine 5 trending on Artstation )\"\nbash scripts/run_image_procedure.sh 2 30 90 bollywood_actress \"A DSLR 3D photo of a beautiful bollywood indian actress, pretty eyes, full body shot composition, sunny outdoor, seen from far away ( highly detailed intricate 8K unreal engine 5 trending on Artstation )\"\nbash scripts/run_image_procedure.sh 3 30 40 beach_house_1 \"A DSLR 3D photo of a very beautiful small house on a beach ( highly detailed intricate 8K unreal engine 5 trending on Artstation )\"\nbash scripts/run_image_procedure.sh 4 30 60 beach_house_2 \"A DSLR 3D photo of a very beautiful high-tech small house with solar panels and wildflowers on a beach ( highly detailed intricate 8K unreal engine 5 trending on Artstation )\"\nbash scripts/run_image_procedure.sh 5 30 90 mona_lisa \"A DSLR 3D photo of a beautiful young woman dressed like Mona Lisa ( highly detailed intricate 8K unreal engine 5 trending on Artstation )\"\nbash scripts/run_image_procedure.sh 6 30 80 futuristic_car \"A DSLR 3D photo of a crazily futuristic electric car ( highly detailed intricate 8K unreal engine 5 trending on Artstation )\"\n# the church ruins probably require a wider field of view... e.g. 90 degrees, maybe even more... so may not work with Zero123 etc.\nbash scripts/run_image_procedure.sh 7 30 90 church_ruins \"A DSLR 3D photo of the remains of an isolated old church ruin covered in ivy ( highly detailed intricate 8K unreal engine 5 trending on Artstation )\"\n\n# young woman dressed like mona lisa"
  },
  {
    "path": "stable-dreamfusion/scripts/run_image_procedure.sh",
    "content": "# Perform a 2D-to-3D reconstruction, similar to the Anya case study: https://github.com/ashawkey/stable-dreamfusion/issues/263\n# Args:\n#    bash scripts/run_image_procedure.sh GPU_ID guidance_interval image_name \"prompt\"\n# e.g.:\n#    bash scripts/run_image_procedure 1 30 baby_phoenix_on_ice \"An adorable baby phoenix made in Swarowski crystal highly detailed intricated concept art 8K\"\nGPU_ID=$1\nGUIDANCE_INTERVAL=$2\nDEFAULT_POLAR=$3\nPREFIX=$4\nPROMPT=$5\nEPOCHS1=100\nEPOCHS2=200\nEPOCHS3=300\nIMAGE=data/$PREFIX.png\nIMAGE_RGBA=data/${PREFIX}_rgba.png\nWS_PH1=trial_$PREFIX-ph1\nWS_PH2=trial_$PREFIX-ph2\nWS_PH3=trial_$PREFIX-ph3\nCKPT1=$WS_PH1/checkpoints/df_ep0${EPOCHS1}.pth\nCKPT2=$WS_PH2/checkpoints/df_ep0${EPOCHS2}.pth\nCKPT3=$WS_PH3/checkpoints/df_ep0${EPOCHS3}.pth\n\n# Can uncomment to clear up trial folders. Be careful - mistakes could erase important work!\n# rm -r $WS_PH1 $WS_PH2 $WS_PH3\n\n# Preprocess\nif [ ! -f $IMAGE_RGBA ]\nthen\n    python preprocess_image.py $IMAGE\nfi\n\nif [ ! -f $CKPT1 ]\nthen\n    # Phase 1 - zero123-guidance\n    # WARNING: claforte: constantly runs out of VRAM with resolution of 128x128 and batch_size 2... no longer able to reproduce Anya result because of this...\n    #   I added these to try to reduce mem usage, but this might degrade the quality... `--lambda_depth 0 --lambda_3d_normal_smooth 0`\n    # Remove: --ckpt scratch\n    CUDA_VISIBLE_DEVICES=$GPU_ID python main.py -O --image $IMAGE_RGBA --workspace $WS_PH1 --default_polar $DEFAULT_POLAR \\\n      --iters ${EPOCHS1}00 --save_guidance --save_guidance_interval $GUIDANCE_INTERVAL --batch_size 1 --test_interval 2 \\\n      --h 96 --w 96 --zero123_grad_scale None --lambda_3d_normal_smooth 0 --dont_override_stuff \\\n      --fovy_range 20 20 --guidance_scale 5 \nfi\n\nGUIDANCE_INTERVAL=7\nif [ ! -f $CKPT2 ]\nthen\n  # Phase 2 - SD-guidance at 256x256\n  CUDA_VISIBLE_DEVICES=$GPU_ID python main.py -O --image $IMAGE_RGBA --workspace $WS_PH2 \\\n    --text \"${PROMPT}\" --default_polar $DEFAULT_POLAR \\\n    --iters ${EPOCHS2}00 --ckpt $CKPT1 --save_guidance --save_guidance_interval 7 \\\n    --h 128 --w 128 --albedo_iter_ratio 0.0 --t_range 0.2 0.6 --batch_size 4 --radius_range 2.2 2.6 --test_interval 2 \\\n    --vram_O --guidance_scale 10 --jitter_pose --jitter_center 0.1 --jitter_target 0.1 --jitter_up 0.05 \\\n    --known_view_noise_scale 0 --lambda_depth 0 --lr 0.003 --progressive_view --progressive_view_init_ratio 0.05 --known_view_interval 2 --dont_override_stuff --lambda_3d_normal_smooth 1 --textureless_ratio 0.0 --min_ambient_ratio 0.3 \\\n    --exp_start_iter ${EPOCHS1}00 --exp_end_iter ${EPOCHS2}00\nfi\n\nif [ ! -f $CKPT3 ]\nthen\n  # # Phase 3 - increase resolution to 512\n  CUDA_VISIBLE_DEVICES=$GPU_ID python main.py -O --image $IMAGE_RGBA --workspace $WS_PH3 \\\n    --text \"${PROMPT}\" --default_polar $DEFAULT_POLAR \\\n    --iters ${EPOCHS3}00 --ckpt $CKPT2  --save_guidance --save_guidance_interval 7 \\\n    --h 512 --w 512 --albedo_iter_ratio 0.0 --t_range 0.0 0.5 --batch_size 1 --radius_range 3.2 3.6 --test_interval 2 \\\n    --vram_O --guidance_scale 10 --jitter_pose --jitter_center 0.015 --jitter_target 0.015 --jitter_up 0.05 \\\n    --known_view_noise_scale 0 --lambda_depth 0 --lr 0.003 --known_view_interval 2 --dont_override_stuff --lambda_3d_normal_smooth 0.5 --textureless_ratio 0.0 --min_ambient_ratio 0.3 \\\n    --exp_start_iter ${EPOCHS2}00 --exp_end_iter ${EPOCHS3}00\nfi\n\n# Generate 6 views\nCUDA_VISIBLE_DEVICES=$GPU_ID python main.py -O --image $IMAGE_RGBA --ckpt $CKPT3 --six_views\n\n"
  },
  {
    "path": "stable-dreamfusion/scripts/run_image_text.sh",
    "content": "# sd backend (realistic images)\n\nCUDA_VISIBLE_DEVICES=4 python main.py -O --image data/teddy_rgba.png --text \"a brown teddy bear sitting on a ground\" --workspace trial_imagetext_teddy --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --image data/teddy_rgba.png --text \"a brown teddy bear sitting on a ground\" --workspace trial2_imagetext_teddy --iters 10000 --dmtet --init_with trial_imagetext_teddy/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=4 python main.py -O --image data/corgi_rgba.png --text \"a corgi running\" --workspace trial_imagetext_corgi --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --image data/corgi_rgba.png --text \"a corgi running\" --workspace trial2_imagetext_corgi --iters 10000 --dmtet --init_with trial_imagetext_corgi/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=4 python main.py -O --image data/hamburger_rgba.png --text \"a DSLR photo of a delicious hamburger\" --workspace trial_imagetext_hamburger --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --image data/hamburger_rgba.png --text \"a DSLR photo of a delicious hamburger\" --workspace trial2_imagetext_hamburger --iters 10000 --dmtet --init_with trial_imagetext_hamburger/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=4 python main.py -O --image data/cactus_rgba.png --text \"a potted cactus plant\" --workspace trial_imagetext_cactus --iters 5000\nCUDA_VISIBLE_DEVICES=4 python main.py -O --image data/cactus_rgba.png --text \"a potted cactus plant\" --workspace trial2_imagetext_cactus --iters 10000 --dmtet --init_with trial_imagetext_cactus/checkpoints/df.pth\n"
  },
  {
    "path": "stable-dreamfusion/scripts/run_images.sh",
    "content": "# zero123 backend (single object, images like 3d model rendering)\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image_config config/corgi.csv --workspace trial_images_corgi --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image_config config/corgi.csv --workspace trial2_images_corgi --iters 10000 --dmtet --init_with trial_images_corgi/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image_config config/car.csv --workspace trial_images_car --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image_config config/car.csv --workspace trial2_images_car --iters 10000 --dmtet --init_with trial_images_car/checkpoints/df.pth\n\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image_config config/anya.csv --workspace trial_images_anya --iters 5000\nCUDA_VISIBLE_DEVICES=6 python main.py -O --image_config config/anya.csv --workspace trial2_images_anya --iters 10000 --dmtet --init_with trial_images_anya/checkpoints/df.pth"
  },
  {
    "path": "stable-dreamfusion/shencoder/__init__.py",
    "content": "from .sphere_harmonics import SHEncoder"
  },
  {
    "path": "stable-dreamfusion/shencoder/backend.py",
    "content": "import os\nfrom torch.utils.cpp_extension import load\n\n_src_path = os.path.dirname(os.path.abspath(__file__))\n\nnvcc_flags = [\n    '-O3', '-std=c++14',\n    '-U__CUDA_NO_HALF_OPERATORS__', '-U__CUDA_NO_HALF_CONVERSIONS__', '-U__CUDA_NO_HALF2_OPERATORS__',\n]\n\nif os.name == \"posix\":\n    c_flags = ['-O3', '-std=c++14']\nelif os.name == \"nt\":\n    c_flags = ['/O2', '/std:c++17']\n\n    # find cl.exe\n    def find_cl_path():\n        import glob\n        for program_files in [r\"C:\\\\Program Files (x86)\", r\"C:\\\\Program Files\"]:\n            for edition in [\"Enterprise\", \"Professional\", \"BuildTools\", \"Community\"]:\n                paths = sorted(glob.glob(r\"%s\\\\Microsoft Visual Studio\\\\*\\\\%s\\\\VC\\\\Tools\\\\MSVC\\\\*\\\\bin\\\\Hostx64\\\\x64\" % (program_files, edition)), reverse=True)\n                if paths:\n                    return paths[0]\n\n    # If cl.exe is not on path, try to find it.\n    if os.system(\"where cl.exe >nul 2>nul\") != 0:\n        cl_path = find_cl_path()\n        if cl_path is None:\n            raise RuntimeError(\"Could not locate a supported Microsoft Visual C++ installation\")\n        os.environ[\"PATH\"] += \";\" + cl_path\n\n_backend = load(name='_sh_encoder',\n                extra_cflags=c_flags,\n                extra_cuda_cflags=nvcc_flags,\n                sources=[os.path.join(_src_path, 'src', f) for f in [\n                    'shencoder.cu',\n                    'bindings.cpp',\n                ]],\n                )\n\n__all__ = ['_backend']"
  },
  {
    "path": "stable-dreamfusion/shencoder/setup.py",
    "content": "import os\nfrom setuptools import setup\nfrom torch.utils.cpp_extension import BuildExtension, CUDAExtension\n\n_src_path = os.path.dirname(os.path.abspath(__file__))\n\nnvcc_flags = [\n    '-O3', '-std=c++14',\n    '-U__CUDA_NO_HALF_OPERATORS__', '-U__CUDA_NO_HALF_CONVERSIONS__', '-U__CUDA_NO_HALF2_OPERATORS__',\n]\n\nif os.name == \"posix\":\n    c_flags = ['-O3', '-std=c++14']\nelif os.name == \"nt\":\n    c_flags = ['/O2', '/std:c++17']\n\n    # find cl.exe\n    def find_cl_path():\n        import glob\n        for program_files in [r\"C:\\\\Program Files (x86)\", r\"C:\\\\Program Files\"]:\n            for edition in [\"Enterprise\", \"Professional\", \"BuildTools\", \"Community\"]:\n                paths = sorted(glob.glob(r\"%s\\\\Microsoft Visual Studio\\\\*\\\\%s\\\\VC\\\\Tools\\\\MSVC\\\\*\\\\bin\\\\Hostx64\\\\x64\" % (program_files, edition)), reverse=True)\n                if paths:\n                    return paths[0]\n\n    # If cl.exe is not on path, try to find it.\n    if os.system(\"where cl.exe >nul 2>nul\") != 0:\n        cl_path = find_cl_path()\n        if cl_path is None:\n            raise RuntimeError(\"Could not locate a supported Microsoft Visual C++ installation\")\n        os.environ[\"PATH\"] += \";\" + cl_path\n\nsetup(\n    name='shencoder', # package name, import this to use python API\n    ext_modules=[\n        CUDAExtension(\n            name='_shencoder', # extension name, import this to use CUDA API\n            sources=[os.path.join(_src_path, 'src', f) for f in [\n                'shencoder.cu',\n                'bindings.cpp',\n            ]],\n            extra_compile_args={\n                'cxx': c_flags,\n                'nvcc': nvcc_flags,\n            }\n        ),\n    ],\n    cmdclass={\n        'build_ext': BuildExtension,\n    }\n)"
  },
  {
    "path": "stable-dreamfusion/shencoder/sphere_harmonics.py",
    "content": "import numpy as np\n\nimport torch\nimport torch.nn as nn\nfrom torch.autograd import Function\nfrom torch.autograd.function import once_differentiable\nfrom torch.cuda.amp import custom_bwd, custom_fwd \n\ntry:\n    import _shencoder as _backend\nexcept ImportError:\n    from .backend import _backend\n\nclass _sh_encoder(Function):\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32) # force float32 for better precision\n    def forward(ctx, inputs, degree, calc_grad_inputs=False):\n        # inputs: [B, input_dim], float in [-1, 1]\n        # RETURN: [B, F], float\n\n        inputs = inputs.contiguous()\n        B, input_dim = inputs.shape # batch size, coord dim\n        output_dim = degree ** 2\n        \n        outputs = torch.empty(B, output_dim, dtype=inputs.dtype, device=inputs.device)\n\n        if calc_grad_inputs:\n            dy_dx = torch.empty(B, input_dim * output_dim, dtype=inputs.dtype, device=inputs.device)\n        else:\n            dy_dx = None\n\n        _backend.sh_encode_forward(inputs, outputs, B, input_dim, degree, dy_dx)\n\n        ctx.save_for_backward(inputs, dy_dx)\n        ctx.dims = [B, input_dim, degree]\n\n        return outputs\n    \n    @staticmethod\n    #@once_differentiable\n    @custom_bwd\n    def backward(ctx, grad):\n        # grad: [B, C * C]\n\n        inputs, dy_dx = ctx.saved_tensors\n\n        if dy_dx is not None:\n            grad = grad.contiguous()\n            B, input_dim, degree = ctx.dims\n            grad_inputs = torch.zeros_like(inputs)\n            _backend.sh_encode_backward(grad, inputs, B, input_dim, degree, dy_dx, grad_inputs)\n            return grad_inputs, None, None\n        else:\n            return None, None, None\n\n\n\nsh_encode = _sh_encoder.apply\n\n\nclass SHEncoder(nn.Module):\n    def __init__(self, input_dim=3, degree=4):\n        super().__init__()\n\n        self.input_dim = input_dim # coord dims, must be 3\n        self.degree = degree # 0 ~ 4\n        self.output_dim = degree ** 2\n\n        assert self.input_dim == 3, \"SH encoder only support input dim == 3\"\n        assert self.degree > 0 and self.degree <= 8, \"SH encoder only supports degree in [1, 8]\"\n        \n    def __repr__(self):\n        return f\"SHEncoder: input_dim={self.input_dim} degree={self.degree}\"\n    \n    def forward(self, inputs, size=1):\n        # inputs: [..., input_dim], normalized real world positions in [-size, size]\n        # return: [..., degree^2]\n\n        inputs = inputs / size # [-1, 1]\n\n        prefix_shape = list(inputs.shape[:-1])\n        inputs = inputs.reshape(-1, self.input_dim)\n\n        outputs = sh_encode(inputs, self.degree, inputs.requires_grad)\n        outputs = outputs.reshape(prefix_shape + [self.output_dim])\n\n        return outputs"
  },
  {
    "path": "stable-dreamfusion/shencoder/src/bindings.cpp",
    "content": "#include <torch/extension.h>\n\n#include \"shencoder.h\"\n\nPYBIND11_MODULE(TORCH_EXTENSION_NAME, m) {\n    m.def(\"sh_encode_forward\", &sh_encode_forward, \"SH encode forward (CUDA)\");\n    m.def(\"sh_encode_backward\", &sh_encode_backward, \"SH encode backward (CUDA)\");\n}"
  },
  {
    "path": "stable-dreamfusion/shencoder/src/shencoder.cu",
    "content": "#include <stdint.h>\n\n#include <cuda.h>\n#include <cuda_fp16.h>\n#include <cuda_runtime.h>\n\n#include <ATen/cuda/CUDAContext.h>\n#include <torch/torch.h>\n\n#include <algorithm>\n#include <stdexcept>\n\n#include <cstdio>\n\n\n#define CHECK_CUDA(x) TORCH_CHECK(x.device().is_cuda(), #x \" must be a CUDA tensor\")\n#define CHECK_CONTIGUOUS(x) TORCH_CHECK(x.is_contiguous(), #x \" must be a contiguous tensor\")\n#define CHECK_IS_INT(x) TORCH_CHECK(x.scalar_type() == at::ScalarType::Int, #x \" must be an int tensor\")\n#define CHECK_IS_FLOATING(x) TORCH_CHECK(x.scalar_type() == at::ScalarType::Float || x.scalar_type() == at::ScalarType::Half || x.scalar_type() == at::ScalarType::Double, #x \" must be a floating tensor\")\n\n\ntemplate <typename T>\n__host__ __device__ T div_round_up(T val, T divisor) {\n\treturn (val + divisor - 1) / divisor;\n}\n\ntemplate <typename scalar_t>\n__global__ void kernel_sh(\n    const scalar_t * __restrict__ inputs, \n    scalar_t * outputs, \n    uint32_t B, uint32_t D, uint32_t C,\n    scalar_t * dy_dx\n) {\n\tconst uint32_t b = threadIdx.x + blockIdx.x * blockDim.x;\n\tif (b >= B) return;\n\n\tconst uint32_t C2 = C * C;\n\n\t// locate\n\tinputs += b * D;\n\toutputs += b * C2;\n\n\tscalar_t x = inputs[0], y = inputs[1], z = inputs[2];\n\n\tscalar_t xy=x*y, xz=x*z, yz=y*z, x2=x*x, y2=y*y, z2=z*z, xyz=xy*z;\n\tscalar_t x4=x2*x2, y4=y2*y2, z4=z2*z2;\n\tscalar_t x6=x4*x2, y6=y4*y2, z6=z4*z2;\n\n\tauto write_sh = [&]() {\n\t\toutputs[0] = 0.28209479177387814f ;                          // 1/(2*sqrt(pi))\n\t\tif (C <= 1) { return; }\n\t\toutputs[1] = -0.48860251190291987f*y ;                               // -sqrt(3)*y/(2*sqrt(pi))\n\t\toutputs[2] = 0.48860251190291987f*z ;                                // sqrt(3)*z/(2*sqrt(pi))\n\t\toutputs[3] = -0.48860251190291987f*x ;                               // -sqrt(3)*x/(2*sqrt(pi))\n\t\tif (C <= 2) { return; }\n\t\toutputs[4] = 1.0925484305920792f*xy ;                                // sqrt(15)*xy/(2*sqrt(pi))\n\t\toutputs[5] = -1.0925484305920792f*yz ;                               // -sqrt(15)*yz/(2*sqrt(pi))\n\t\toutputs[6] = 0.94617469575755997f*z2 - 0.31539156525251999f ;                         // sqrt(5)*(3*z2 - 1)/(4*sqrt(pi))\n\t\toutputs[7] = -1.0925484305920792f*xz ;                               // -sqrt(15)*xz/(2*sqrt(pi))\n\t\toutputs[8] = 0.54627421529603959f*x2 - 0.54627421529603959f*y2 ;                              // sqrt(15)*(x2 - y2)/(4*sqrt(pi))\n\t\tif (C <= 3) { return; }\n\t\toutputs[9] = 0.59004358992664352f*y*(-3.0f*x2 + y2) ;                         // sqrt(70)*y*(-3*x2 + y2)/(8*sqrt(pi))\n\t\toutputs[10] = 2.8906114426405538f*xy*z ;                             // sqrt(105)*xy*z/(2*sqrt(pi))\n\t\toutputs[11] = 0.45704579946446572f*y*(1.0f - 5.0f*z2) ;                                // sqrt(42)*y*(1 - 5*z2)/(8*sqrt(pi))\n\t\toutputs[12] = 0.3731763325901154f*z*(5.0f*z2 - 3.0f) ;                         // sqrt(7)*z*(5*z2 - 3)/(4*sqrt(pi))\n\t\toutputs[13] = 0.45704579946446572f*x*(1.0f - 5.0f*z2) ;                                // sqrt(42)*x*(1 - 5*z2)/(8*sqrt(pi))\n\t\toutputs[14] = 1.4453057213202769f*z*(x2 - y2) ;                              // sqrt(105)*z*(x2 - y2)/(4*sqrt(pi))\n\t\toutputs[15] = 0.59004358992664352f*x*(-x2 + 3.0f*y2) ;                                // sqrt(70)*x*(-x2 + 3*y2)/(8*sqrt(pi))\n\t\tif (C <= 4) { return; }\n\t\toutputs[16] = 2.5033429417967046f*xy*(x2 - y2) ;                             // 3*sqrt(35)*xy*(x2 - y2)/(4*sqrt(pi))\n\t\toutputs[17] = 1.7701307697799304f*yz*(-3.0f*x2 + y2) ;                                // 3*sqrt(70)*yz*(-3*x2 + y2)/(8*sqrt(pi))\n\t\toutputs[18] = 0.94617469575756008f*xy*(7.0f*z2 - 1.0f) ;                               // 3*sqrt(5)*xy*(7*z2 - 1)/(4*sqrt(pi))\n\t\toutputs[19] = 0.66904654355728921f*yz*(3.0f - 7.0f*z2) ;                               // 3*sqrt(10)*yz*(3 - 7*z2)/(8*sqrt(pi))\n\t\toutputs[20] = -3.1735664074561294f*z2 + 3.7024941420321507f*z4 + 0.31735664074561293f ;                                // 3*(-30*z2 + 35*z4 + 3)/(16*sqrt(pi))\n\t\toutputs[21] = 0.66904654355728921f*xz*(3.0f - 7.0f*z2) ;                               // 3*sqrt(10)*xz*(3 - 7*z2)/(8*sqrt(pi))\n\t\toutputs[22] = 0.47308734787878004f*(x2 - y2)*(7.0f*z2 - 1.0f) ;                                // 3*sqrt(5)*(x2 - y2)*(7*z2 - 1)/(8*sqrt(pi))\n\t\toutputs[23] = 1.7701307697799304f*xz*(-x2 + 3.0f*y2) ;                                // 3*sqrt(70)*xz*(-x2 + 3*y2)/(8*sqrt(pi))\n\t\toutputs[24] = -3.7550144126950569f*x2*y2 + 0.62583573544917614f*x4 + 0.62583573544917614f*y4 ;                         // 3*sqrt(35)*(-6*x2*y2 + x4 + y4)/(16*sqrt(pi))\n\t\tif (C <= 5) { return; }\n\t\toutputs[25] = 0.65638205684017015f*y*(10.0f*x2*y2 - 5.0f*x4 - y4) ;                            // 3*sqrt(154)*y*(10*x2*y2 - 5*x4 - y4)/(32*sqrt(pi))\n\t\toutputs[26] = 8.3026492595241645f*xy*z*(x2 - y2) ;                           // 3*sqrt(385)*xy*z*(x2 - y2)/(4*sqrt(pi))\n\t\toutputs[27] = -0.48923829943525038f*y*(3.0f*x2 - y2)*(9.0f*z2 - 1.0f) ;                         // -sqrt(770)*y*(3*x2 - y2)*(9*z2 - 1)/(32*sqrt(pi))\n\t\toutputs[28] = 4.7935367849733241f*xy*z*(3.0f*z2 - 1.0f) ;                              // sqrt(1155)*xy*z*(3*z2 - 1)/(4*sqrt(pi))\n\t\toutputs[29] = 0.45294665119569694f*y*(14.0f*z2 - 21.0f*z4 - 1.0f) ;                             // sqrt(165)*y*(14*z2 - 21*z4 - 1)/(16*sqrt(pi))\n\t\toutputs[30] = 0.1169503224534236f*z*(-70.0f*z2 + 63.0f*z4 + 15.0f) ;                            // sqrt(11)*z*(-70*z2 + 63*z4 + 15)/(16*sqrt(pi))\n\t\toutputs[31] = 0.45294665119569694f*x*(14.0f*z2 - 21.0f*z4 - 1.0f) ;                             // sqrt(165)*x*(14*z2 - 21*z4 - 1)/(16*sqrt(pi))\n\t\toutputs[32] = 2.3967683924866621f*z*(x2 - y2)*(3.0f*z2 - 1.0f) ;                               // sqrt(1155)*z*(x2 - y2)*(3*z2 - 1)/(8*sqrt(pi))\n\t\toutputs[33] = -0.48923829943525038f*x*(x2 - 3.0f*y2)*(9.0f*z2 - 1.0f) ;                         // -sqrt(770)*x*(x2 - 3*y2)*(9*z2 - 1)/(32*sqrt(pi))\n\t\toutputs[34] = 2.0756623148810411f*z*(-6.0f*x2*y2 + x4 + y4) ;                         // 3*sqrt(385)*z*(-6*x2*y2 + x4 + y4)/(16*sqrt(pi))\n\t\toutputs[35] = 0.65638205684017015f*x*(10.0f*x2*y2 - x4 - 5.0f*y4) ;                            // 3*sqrt(154)*x*(10*x2*y2 - x4 - 5*y4)/(32*sqrt(pi))\n\t\tif (C <= 6) { return; }\n\t\toutputs[36] = 1.3663682103838286f*xy*(-10.0f*x2*y2 + 3.0f*x4 + 3.0f*y4) ;                               // sqrt(6006)*xy*(-10*x2*y2 + 3*x4 + 3*y4)/(32*sqrt(pi))\n\t\toutputs[37] = 2.3666191622317521f*yz*(10.0f*x2*y2 - 5.0f*x4 - y4) ;                            // 3*sqrt(2002)*yz*(10*x2*y2 - 5*x4 - y4)/(32*sqrt(pi))\n\t\toutputs[38] = 2.0182596029148963f*xy*(x2 - y2)*(11.0f*z2 - 1.0f) ;                             // 3*sqrt(91)*xy*(x2 - y2)*(11*z2 - 1)/(8*sqrt(pi))\n\t\toutputs[39] = -0.92120525951492349f*yz*(3.0f*x2 - y2)*(11.0f*z2 - 3.0f) ;                               // -sqrt(2730)*yz*(3*x2 - y2)*(11*z2 - 3)/(32*sqrt(pi))\n\t\toutputs[40] = 0.92120525951492349f*xy*(-18.0f*z2 + 33.0f*z4 + 1.0f) ;                           // sqrt(2730)*xy*(-18*z2 + 33*z4 + 1)/(32*sqrt(pi))\n\t\toutputs[41] = 0.58262136251873131f*yz*(30.0f*z2 - 33.0f*z4 - 5.0f) ;                            // sqrt(273)*yz*(30*z2 - 33*z4 - 5)/(16*sqrt(pi))\n\t\toutputs[42] = 6.6747662381009842f*z2 - 20.024298714302954f*z4 + 14.684485723822165f*z6 - 0.31784601133814211f ;                         // sqrt(13)*(105*z2 - 315*z4 + 231*z6 - 5)/(32*sqrt(pi))\n\t\toutputs[43] = 0.58262136251873131f*xz*(30.0f*z2 - 33.0f*z4 - 5.0f) ;                            // sqrt(273)*xz*(30*z2 - 33*z4 - 5)/(16*sqrt(pi))\n\t\toutputs[44] = 0.46060262975746175f*(x2 - y2)*(11.0f*z2*(3.0f*z2 - 1.0f) - 7.0f*z2 + 1.0f) ;                               // sqrt(2730)*(x2 - y2)*(11*z2*(3*z2 - 1) - 7*z2 + 1)/(64*sqrt(pi))\n\t\toutputs[45] = -0.92120525951492349f*xz*(x2 - 3.0f*y2)*(11.0f*z2 - 3.0f) ;                               // -sqrt(2730)*xz*(x2 - 3*y2)*(11*z2 - 3)/(32*sqrt(pi))\n\t\toutputs[46] = 0.50456490072872406f*(11.0f*z2 - 1.0f)*(-6.0f*x2*y2 + x4 + y4) ;                          // 3*sqrt(91)*(11*z2 - 1)*(-6*x2*y2 + x4 + y4)/(32*sqrt(pi))\n\t\toutputs[47] = 2.3666191622317521f*xz*(10.0f*x2*y2 - x4 - 5.0f*y4) ;                            // 3*sqrt(2002)*xz*(10*x2*y2 - x4 - 5*y4)/(32*sqrt(pi))\n\t\toutputs[48] = 10.247761577878714f*x2*y4 - 10.247761577878714f*x4*y2 + 0.6831841051919143f*x6 - 0.6831841051919143f*y6 ;                         // sqrt(6006)*(15*x2*y4 - 15*x4*y2 + x6 - y6)/(64*sqrt(pi))\n\t\tif (C <= 7) { return; }\n\t\toutputs[49] = 0.70716273252459627f*y*(-21.0f*x2*y4 + 35.0f*x4*y2 - 7.0f*x6 + y6) ;                              // 3*sqrt(715)*y*(-21*x2*y4 + 35*x4*y2 - 7*x6 + y6)/(64*sqrt(pi))\n\t\toutputs[50] = 5.2919213236038001f*xy*z*(-10.0f*x2*y2 + 3.0f*x4 + 3.0f*y4) ;                             // 3*sqrt(10010)*xy*z*(-10*x2*y2 + 3*x4 + 3*y4)/(32*sqrt(pi))\n\t\toutputs[51] = -0.51891557872026028f*y*(13.0f*z2 - 1.0f)*(-10.0f*x2*y2 + 5.0f*x4 + y4) ;                          // -3*sqrt(385)*y*(13*z2 - 1)*(-10*x2*y2 + 5*x4 + y4)/(64*sqrt(pi))\n\t\toutputs[52] = 4.1513246297620823f*xy*z*(x2 - y2)*(13.0f*z2 - 3.0f) ;                           // 3*sqrt(385)*xy*z*(x2 - y2)*(13*z2 - 3)/(8*sqrt(pi))\n\t\toutputs[53] = -0.15645893386229404f*y*(3.0f*x2 - y2)*(13.0f*z2*(11.0f*z2 - 3.0f) - 27.0f*z2 + 3.0f) ;                              // -3*sqrt(35)*y*(3*x2 - y2)*(13*z2*(11*z2 - 3) - 27*z2 + 3)/(64*sqrt(pi))\n\t\toutputs[54] = 0.44253269244498261f*xy*z*(-110.0f*z2 + 143.0f*z4 + 15.0f) ;                              // 3*sqrt(70)*xy*z*(-110*z2 + 143*z4 + 15)/(32*sqrt(pi))\n\t\toutputs[55] = 0.090331607582517306f*y*(-135.0f*z2 + 495.0f*z4 - 429.0f*z6 + 5.0f) ;                              // sqrt(105)*y*(-135*z2 + 495*z4 - 429*z6 + 5)/(64*sqrt(pi))\n\t\toutputs[56] = 0.068284276912004949f*z*(315.0f*z2 - 693.0f*z4 + 429.0f*z6 - 35.0f) ;                              // sqrt(15)*z*(315*z2 - 693*z4 + 429*z6 - 35)/(32*sqrt(pi))\n\t\toutputs[57] = 0.090331607582517306f*x*(-135.0f*z2 + 495.0f*z4 - 429.0f*z6 + 5.0f) ;                              // sqrt(105)*x*(-135*z2 + 495*z4 - 429*z6 + 5)/(64*sqrt(pi))\n\t\toutputs[58] = 0.07375544874083044f*z*(x2 - y2)*(143.0f*z2*(3.0f*z2 - 1.0f) - 187.0f*z2 + 45.0f) ;                         // sqrt(70)*z*(x2 - y2)*(143*z2*(3*z2 - 1) - 187*z2 + 45)/(64*sqrt(pi))\n\t\toutputs[59] = -0.15645893386229404f*x*(x2 - 3.0f*y2)*(13.0f*z2*(11.0f*z2 - 3.0f) - 27.0f*z2 + 3.0f) ;                              // -3*sqrt(35)*x*(x2 - 3*y2)*(13*z2*(11*z2 - 3) - 27*z2 + 3)/(64*sqrt(pi))\n\t\toutputs[60] = 1.0378311574405206f*z*(13.0f*z2 - 3.0f)*(-6.0f*x2*y2 + x4 + y4) ;                         // 3*sqrt(385)*z*(13*z2 - 3)*(-6*x2*y2 + x4 + y4)/(32*sqrt(pi))\n\t\toutputs[61] = -0.51891557872026028f*x*(13.0f*z2 - 1.0f)*(-10.0f*x2*y2 + x4 + 5.0f*y4) ;                          // -3*sqrt(385)*x*(13*z2 - 1)*(-10*x2*y2 + x4 + 5*y4)/(64*sqrt(pi))\n\t\toutputs[62] = 2.6459606618019f*z*(15.0f*x2*y4 - 15.0f*x4*y2 + x6 - y6) ;                               // 3*sqrt(10010)*z*(15*x2*y4 - 15*x4*y2 + x6 - y6)/(64*sqrt(pi))\n\t\toutputs[63] = 0.70716273252459627f*x*(-35.0f*x2*y4 + 21.0f*x4*y2 - x6 + 7.0f*y6) ;                              // 3*sqrt(715)*x*(-35*x2*y4 + 21*x4*y2 - x6 + 7*y6)/(64*sqrt(pi))\n\t};\n\n\twrite_sh();\n\n\tif (dy_dx) {\n\t\tscalar_t *dx = dy_dx + b * D * C2;\n\t\tscalar_t *dy = dx + C2;\n\t\tscalar_t *dz = dy + C2;\n\n\t\tauto write_sh_dx = [&]() {\n\t\t\tdx[0] = 0.0f ;                             // 0\n\t\t\tif (C <= 1) { return; }\n\t\t\tdx[1] = 0.0f ;                             // 0\n\t\t\tdx[2] = 0.0f ;                             // 0\n\t\t\tdx[3] = -0.48860251190291992f ;                          // -sqrt(3)/(2*sqrt(pi))\n\t\t\tif (C <= 2) { return; }\n\t\t\tdx[4] = 1.0925484305920792f*y ;                          // sqrt(15)*y/(2*sqrt(pi))\n\t\t\tdx[5] = 0.0f ;                             // 0\n\t\t\tdx[6] = 0.0f ;                             // 0\n\t\t\tdx[7] = -1.0925484305920792f*z ;                         // -sqrt(15)*z/(2*sqrt(pi))\n\t\t\tdx[8] = 1.0925484305920792f*x ;                          // sqrt(15)*x/(2*sqrt(pi))\n\t\t\tif (C <= 3) { return; }\n\t\t\tdx[9] = -3.5402615395598609f*xy ;                                // -3*sqrt(70)*xy/(4*sqrt(pi))\n\t\t\tdx[10] = 2.8906114426405538f*yz ;                                // sqrt(105)*yz/(2*sqrt(pi))\n\t\t\tdx[11] = 0.0f ;                            // 0\n\t\t\tdx[12] = 0.0f ;                            // 0\n\t\t\tdx[13] = 0.45704579946446572f - 2.2852289973223288f*z2 ;                          // sqrt(42)*(1 - 5*z2)/(8*sqrt(pi))\n\t\t\tdx[14] = 2.8906114426405538f*xz ;                                // sqrt(105)*xz/(2*sqrt(pi))\n\t\t\tdx[15] = -1.7701307697799304f*x2 + 1.7701307697799304f*y2 ;                               // 3*sqrt(70)*(-x2 + y2)/(8*sqrt(pi))\n\t\t\tif (C <= 4) { return; }\n\t\t\tdx[16] = 2.5033429417967046f*y*(3.0f*x2 - y2) ;                           // 3*sqrt(35)*y*(3*x2 - y2)/(4*sqrt(pi))\n\t\t\tdx[17] = -10.620784618679583f*xy*z ;                             // -9*sqrt(70)*xy*z/(4*sqrt(pi))\n\t\t\tdx[18] = 0.94617469575756008f*y*(7.0f*z2 - 1.0f) ;                         // 3*sqrt(5)*y*(7*z2 - 1)/(4*sqrt(pi))\n\t\t\tdx[19] = 0.0f ;                            // 0\n\t\t\tdx[20] = 0.0f ;                            // 0\n\t\t\tdx[21] = 0.66904654355728921f*z*(3.0f - 7.0f*z2) ;                         // 3*sqrt(10)*z*(3 - 7*z2)/(8*sqrt(pi))\n\t\t\tdx[22] = 0.94617469575756008f*x*(7.0f*z2 - 1.0f) ;                         // 3*sqrt(5)*x*(7*z2 - 1)/(4*sqrt(pi))\n\t\t\tdx[23] = 5.3103923093397913f*z*(-x2 + y2) ;                              // 9*sqrt(70)*z*(-x2 + y2)/(8*sqrt(pi))\n\t\t\tdx[24] = 2.5033429417967046f*x*(x2 - 3.0f*y2) ;                           // 3*sqrt(35)*x*(x2 - 3*y2)/(4*sqrt(pi))\n\t\t\tif (C <= 5) { return; }\n\t\t\tdx[25] = 13.127641136803401f*xy*(-x2 + y2) ;                             // 15*sqrt(154)*xy*(-x2 + y2)/(8*sqrt(pi))\n\t\t\tdx[26] = 8.3026492595241645f*yz*(3.0f*x2 - y2) ;                          // 3*sqrt(385)*yz*(3*x2 - y2)/(4*sqrt(pi))\n\t\t\tdx[27] = 2.9354297966115022f*xy*(1.0f - 9.0f*z2) ;                         // 3*sqrt(770)*xy*(1 - 9*z2)/(16*sqrt(pi))\n\t\t\tdx[28] = 4.7935367849733241f*yz*(3.0f*z2 - 1.0f) ;                         // sqrt(1155)*yz*(3*z2 - 1)/(4*sqrt(pi))\n\t\t\tdx[29] = 0.0f ;                            // 0\n\t\t\tdx[30] = 0.0f ;                            // 0\n\t\t\tdx[31] = 6.3412531167397574f*z2 - 9.5118796751096362f*z4 - 0.45294665119569694f ;                          // sqrt(165)*(14*z2 - 21*z4 - 1)/(16*sqrt(pi))\n\t\t\tdx[32] = 4.7935367849733241f*xz*(3.0f*z2 - 1.0f) ;                         // sqrt(1155)*xz*(3*z2 - 1)/(4*sqrt(pi))\n\t\t\tdx[33] = -13.209434084751759f*x2*z2 + 1.4677148983057511f*x2 + 13.209434084751759f*y2*z2 - 1.4677148983057511f*y2 ;                         // 3*sqrt(770)*(-9*x2*z2 + x2 + 9*y2*z2 - y2)/(32*sqrt(pi))\n\t\t\tdx[34] = 8.3026492595241645f*xz*(x2 - 3.0f*y2) ;                          // 3*sqrt(385)*xz*(x2 - 3*y2)/(4*sqrt(pi))\n\t\t\tdx[35] = 19.6914617052051f*x2*y2 - 3.2819102842008503f*x4 - 3.2819102842008503f*y4 ;                               // 15*sqrt(154)*(6*x2*y2 - x4 - y4)/(32*sqrt(pi))\n\t\t\tif (C <= 6) { return; }\n\t\t\tdx[36] = 4.0991046311514854f*y*(-10.0f*x2*y2 + 5.0f*x4 + y4) ;                             // 3*sqrt(6006)*y*(-10*x2*y2 + 5*x4 + y4)/(32*sqrt(pi))\n\t\t\tdx[37] = 47.332383244635047f*xy*z*(-x2 + y2) ;                           // 15*sqrt(2002)*xy*z*(-x2 + y2)/(8*sqrt(pi))\n\t\t\tdx[38] = 2.0182596029148963f*y*(3.0f*x2 - y2)*(11.0f*z2 - 1.0f) ;                           // 3*sqrt(91)*y*(3*x2 - y2)*(11*z2 - 1)/(8*sqrt(pi))\n\t\t\tdx[39] = 5.5272315570895412f*xy*z*(3.0f - 11.0f*z2) ;                              // 3*sqrt(2730)*xy*z*(3 - 11*z2)/(16*sqrt(pi))\n\t\t\tdx[40] = 0.92120525951492349f*y*(-18.0f*z2 + 33.0f*z4 + 1.0f) ;                             // sqrt(2730)*y*(-18*z2 + 33*z4 + 1)/(32*sqrt(pi))\n\t\t\tdx[41] = 0.0f ;                            // 0\n\t\t\tdx[42] = 0.0f ;                            // 0\n\t\t\tdx[43] = 0.58262136251873131f*z*(30.0f*z2 - 33.0f*z4 - 5.0f) ;                              // sqrt(273)*z*(30*z2 - 33*z4 - 5)/(16*sqrt(pi))\n\t\t\tdx[44] = 0.92120525951492349f*x*(-18.0f*z2 + 33.0f*z4 + 1.0f) ;                             // sqrt(2730)*x*(-18*z2 + 33*z4 + 1)/(32*sqrt(pi))\n\t\t\tdx[45] = -2.7636157785447706f*z*(x2 - y2)*(11.0f*z2 - 3.0f) ;                              // -3*sqrt(2730)*z*(x2 - y2)*(11*z2 - 3)/(32*sqrt(pi))\n\t\t\tdx[46] = 2.0182596029148963f*x*(x2 - 3.0f*y2)*(11.0f*z2 - 1.0f) ;                           // 3*sqrt(91)*x*(x2 - 3*y2)*(11*z2 - 1)/(8*sqrt(pi))\n\t\t\tdx[47] = 11.833095811158762f*z*(6.0f*x2*y2 - x4 - y4) ;                           // 15*sqrt(2002)*z*(6*x2*y2 - x4 - y4)/(32*sqrt(pi))\n\t\t\tdx[48] = 4.0991046311514854f*x*(-10.0f*x2*y2 + x4 + 5.0f*y4) ;                             // 3*sqrt(6006)*x*(-10*x2*y2 + x4 + 5*y4)/(32*sqrt(pi))\n\t\t\tif (C <= 7) { return; }\n\t\t\tdx[49] = 9.9002782553443485f*xy*(10.0f*x2*y2 - 3.0f*x4 - 3.0f*y4) ;                         // 21*sqrt(715)*xy*(10*x2*y2 - 3*x4 - 3*y4)/(32*sqrt(pi))\n\t\t\tdx[50] = 15.875763970811402f*yz*(-10.0f*x2*y2 + 5.0f*x4 + y4) ;                            // 9*sqrt(10010)*yz*(-10*x2*y2 + 5*x4 + y4)/(32*sqrt(pi))\n\t\t\tdx[51] = -10.378311574405206f*xy*(x2 - y2)*(13.0f*z2 - 1.0f) ;                             // -15*sqrt(385)*xy*(x2 - y2)*(13*z2 - 1)/(16*sqrt(pi))\n\t\t\tdx[52] = 4.1513246297620823f*yz*(3.0f*x2 - y2)*(13.0f*z2 - 3.0f) ;                          // 3*sqrt(385)*yz*(3*x2 - y2)*(13*z2 - 3)/(8*sqrt(pi))\n\t\t\tdx[53] = 0.93875360317376422f*xy*(66.0f*z2 - 143.0f*z4 - 3.0f) ;                            // 9*sqrt(35)*xy*(66*z2 - 143*z4 - 3)/(32*sqrt(pi))\n\t\t\tdx[54] = 0.44253269244498261f*yz*(-110.0f*z2 + 143.0f*z4 + 15.0f) ;                         // 3*sqrt(70)*yz*(-110*z2 + 143*z4 + 15)/(32*sqrt(pi))\n\t\t\tdx[55] = 0.0f ;                            // 0\n\t\t\tdx[56] = 0.0f ;                            // 0\n\t\t\tdx[57] = -12.194767023639836f*z2 + 44.714145753346067f*z4 - 38.752259652899923f*z6 + 0.45165803791258652f ;                         // sqrt(105)*(-135*z2 + 495*z4 - 429*z6 + 5)/(64*sqrt(pi))\n\t\t\tdx[58] = 0.44253269244498261f*xz*(-110.0f*z2 + 143.0f*z4 + 15.0f) ;                         // 3*sqrt(70)*xz*(-110*z2 + 143*z4 + 15)/(32*sqrt(pi))\n\t\t\tdx[59] = 30.97886890473422f*x2*z2 - 67.120882626924143f*x2*z4 - 1.4081304047606462f*x2 - 30.97886890473422f*y2*z2 + 67.120882626924143f*y2*z4 + 1.4081304047606462f*y2 ;                              // 9*sqrt(35)*(66*x2*z2 - 143*x2*z4 - 3*x2 - 66*y2*z2 + 143*y2*z4 + 3*y2)/(64*sqrt(pi))\n\t\t\tdx[60] = 4.1513246297620823f*xz*(x2 - 3.0f*y2)*(13.0f*z2 - 3.0f) ;                          // 3*sqrt(385)*xz*(x2 - 3*y2)*(13*z2 - 3)/(8*sqrt(pi))\n\t\t\tdx[61] = -0.51891557872026028f*(13.0f*z2 - 1.0f)*(-10.0f*x2*y2 + 4.0f*x2*(x2 - 5.0f*y2) + x4 + 5.0f*y4) ;                              // -3*sqrt(385)*(13*z2 - 1)*(-10*x2*y2 + 4*x2*(x2 - 5*y2) + x4 + 5*y4)/(64*sqrt(pi))\n\t\t\tdx[62] = 15.875763970811402f*xz*(-10.0f*x2*y2 + x4 + 5.0f*y4) ;                            // 9*sqrt(10010)*xz*(-10*x2*y2 + x4 + 5*y4)/(32*sqrt(pi))\n\t\t\tdx[63] = -74.252086915082614f*x2*y4 + 74.252086915082614f*x4*y2 - 4.9501391276721742f*x6 + 4.9501391276721742f*y6 ;                         // 21*sqrt(715)*(-15*x2*y4 + 15*x4*y2 - x6 + y6)/(64*sqrt(pi))\n\t\t};\n\n\t\tauto write_sh_dy = [&]() {\n\t\t\tdy[0] = 0.0f ;                             // 0\n\t\t\tif (C <= 1) { return; }\n\t\t\tdy[1] = -0.48860251190291992f ;                          // -sqrt(3)/(2*sqrt(pi))\n\t\t\tdy[2] = 0.0f ;                             // 0\n\t\t\tdy[3] = 0.0f ;                             // 0\n\t\t\tif (C <= 2) { return; }\n\t\t\tdy[4] = 1.0925484305920792f*x ;                          // sqrt(15)*x/(2*sqrt(pi))\n\t\t\tdy[5] = -1.0925484305920792f*z ;                         // -sqrt(15)*z/(2*sqrt(pi))\n\t\t\tdy[6] = 0.0f ;                             // 0\n\t\t\tdy[7] = 0.0f ;                             // 0\n\t\t\tdy[8] = -1.0925484305920792f*y ;                         // -sqrt(15)*y/(2*sqrt(pi))\n\t\t\tif (C <= 3) { return; }\n\t\t\tdy[9] = -1.7701307697799304f*x2 + 1.7701307697799304f*y2 ;                                // 3*sqrt(70)*(-x2 + y2)/(8*sqrt(pi))\n\t\t\tdy[10] = 2.8906114426405538f*xz ;                                // sqrt(105)*xz/(2*sqrt(pi))\n\t\t\tdy[11] = 0.45704579946446572f - 2.2852289973223288f*z2 ;                          // sqrt(42)*(1 - 5*z2)/(8*sqrt(pi))\n\t\t\tdy[12] = 0.0f ;                            // 0\n\t\t\tdy[13] = 0.0f ;                            // 0\n\t\t\tdy[14] = -2.8906114426405538f*yz ;                               // -sqrt(105)*yz/(2*sqrt(pi))\n\t\t\tdy[15] = 3.5402615395598609f*xy ;                                // 3*sqrt(70)*xy/(4*sqrt(pi))\n\t\t\tif (C <= 4) { return; }\n\t\t\tdy[16] = 2.5033429417967046f*x*(x2 - 3.0f*y2) ;                           // 3*sqrt(35)*x*(x2 - 3*y2)/(4*sqrt(pi))\n\t\t\tdy[17] = 5.3103923093397913f*z*(-x2 + y2) ;                              // 9*sqrt(70)*z*(-x2 + y2)/(8*sqrt(pi))\n\t\t\tdy[18] = 0.94617469575756008f*x*(7.0f*z2 - 1.0f) ;                         // 3*sqrt(5)*x*(7*z2 - 1)/(4*sqrt(pi))\n\t\t\tdy[19] = 0.66904654355728921f*z*(3.0f - 7.0f*z2) ;                         // 3*sqrt(10)*z*(3 - 7*z2)/(8*sqrt(pi))\n\t\t\tdy[20] = 0.0f ;                            // 0\n\t\t\tdy[21] = 0.0f ;                            // 0\n\t\t\tdy[22] = 0.94617469575756008f*y*(1.0f - 7.0f*z2) ;                         // 3*sqrt(5)*y*(1 - 7*z2)/(4*sqrt(pi))\n\t\t\tdy[23] = 10.620784618679583f*xy*z ;                              // 9*sqrt(70)*xy*z/(4*sqrt(pi))\n\t\t\tdy[24] = 2.5033429417967046f*y*(-3.0f*x2 + y2) ;                          // 3*sqrt(35)*y*(-3*x2 + y2)/(4*sqrt(pi))\n\t\t\tif (C <= 5) { return; }\n\t\t\tdy[25] = 19.6914617052051f*x2*y2 - 3.2819102842008503f*x4 - 3.2819102842008503f*y4 ;                               // 15*sqrt(154)*(6*x2*y2 - x4 - y4)/(32*sqrt(pi))\n\t\t\tdy[26] = 8.3026492595241645f*xz*(x2 - 3.0f*y2) ;                          // 3*sqrt(385)*xz*(x2 - 3*y2)/(4*sqrt(pi))\n\t\t\tdy[27] = -1.4677148983057511f*(x2 - y2)*(9.0f*z2 - 1.0f) ;                         // -3*sqrt(770)*(x2 - y2)*(9*z2 - 1)/(32*sqrt(pi))\n\t\t\tdy[28] = 4.7935367849733241f*xz*(3.0f*z2 - 1.0f) ;                         // sqrt(1155)*xz*(3*z2 - 1)/(4*sqrt(pi))\n\t\t\tdy[29] = 6.3412531167397574f*z2 - 9.5118796751096362f*z4 - 0.45294665119569694f ;                          // sqrt(165)*(14*z2 - 21*z4 - 1)/(16*sqrt(pi))\n\t\t\tdy[30] = 0.0f ;                            // 0\n\t\t\tdy[31] = 0.0f ;                            // 0\n\t\t\tdy[32] = 4.7935367849733241f*yz*(1.0f - 3.0f*z2) ;                         // sqrt(1155)*yz*(1 - 3*z2)/(4*sqrt(pi))\n\t\t\tdy[33] = 2.9354297966115022f*xy*(9.0f*z2 - 1.0f) ;                         // 3*sqrt(770)*xy*(9*z2 - 1)/(16*sqrt(pi))\n\t\t\tdy[34] = 8.3026492595241645f*yz*(-3.0f*x2 + y2) ;                         // 3*sqrt(385)*yz*(-3*x2 + y2)/(4*sqrt(pi))\n\t\t\tdy[35] = 13.127641136803401f*xy*(x2 - y2) ;                              // 15*sqrt(154)*xy*(x2 - y2)/(8*sqrt(pi))\n\t\t\tif (C <= 6) { return; }\n\t\t\tdy[36] = 4.0991046311514854f*x*(-10.0f*x2*y2 + x4 + 5.0f*y4) ;                             // 3*sqrt(6006)*x*(-10*x2*y2 + x4 + 5*y4)/(32*sqrt(pi))\n\t\t\tdy[37] = 11.833095811158762f*z*(6.0f*x2*y2 - x4 - y4) ;                           // 15*sqrt(2002)*z*(6*x2*y2 - x4 - y4)/(32*sqrt(pi))\n\t\t\tdy[38] = 2.0182596029148963f*x*(x2 - 3.0f*y2)*(11.0f*z2 - 1.0f) ;                           // 3*sqrt(91)*x*(x2 - 3*y2)*(11*z2 - 1)/(8*sqrt(pi))\n\t\t\tdy[39] = -2.7636157785447706f*z*(x2 - y2)*(11.0f*z2 - 3.0f) ;                              // -3*sqrt(2730)*z*(x2 - y2)*(11*z2 - 3)/(32*sqrt(pi))\n\t\t\tdy[40] = 0.92120525951492349f*x*(-18.0f*z2 + 33.0f*z4 + 1.0f) ;                             // sqrt(2730)*x*(-18*z2 + 33*z4 + 1)/(32*sqrt(pi))\n\t\t\tdy[41] = 0.58262136251873131f*z*(30.0f*z2 - 33.0f*z4 - 5.0f) ;                              // sqrt(273)*z*(30*z2 - 33*z4 - 5)/(16*sqrt(pi))\n\t\t\tdy[42] = 0.0f ;                            // 0\n\t\t\tdy[43] = 0.0f ;                            // 0\n\t\t\tdy[44] = 0.92120525951492349f*y*(18.0f*z2 - 33.0f*z4 - 1.0f) ;                              // sqrt(2730)*y*(18*z2 - 33*z4 - 1)/(32*sqrt(pi))\n\t\t\tdy[45] = 5.5272315570895412f*xy*z*(11.0f*z2 - 3.0f) ;                              // 3*sqrt(2730)*xy*z*(11*z2 - 3)/(16*sqrt(pi))\n\t\t\tdy[46] = -2.0182596029148963f*y*(3.0f*x2 - y2)*(11.0f*z2 - 1.0f) ;                          // -3*sqrt(91)*y*(3*x2 - y2)*(11*z2 - 1)/(8*sqrt(pi))\n\t\t\tdy[47] = 47.332383244635047f*xy*z*(x2 - y2) ;                            // 15*sqrt(2002)*xy*z*(x2 - y2)/(8*sqrt(pi))\n\t\t\tdy[48] = 4.0991046311514854f*y*(10.0f*x2*y2 - 5.0f*x4 - y4) ;                              // 3*sqrt(6006)*y*(10*x2*y2 - 5*x4 - y4)/(32*sqrt(pi))\n\t\t\tif (C <= 7) { return; }\n\t\t\tdy[49] = -74.252086915082614f*x2*y4 + 74.252086915082614f*x4*y2 - 4.9501391276721742f*x6 + 4.9501391276721742f*y6 ;                         // 21*sqrt(715)*(-15*x2*y4 + 15*x4*y2 - x6 + y6)/(64*sqrt(pi))\n\t\t\tdy[50] = 15.875763970811402f*xz*(-10.0f*x2*y2 + x4 + 5.0f*y4) ;                            // 9*sqrt(10010)*xz*(-10*x2*y2 + x4 + 5*y4)/(32*sqrt(pi))\n\t\t\tdy[51] = 0.51891557872026028f*(13.0f*z2 - 1.0f)*(10.0f*x2*y2 - 5.0f*x4 + 4.0f*y2*(5.0f*x2 - y2) - y4) ;                                // 3*sqrt(385)*(13*z2 - 1)*(10*x2*y2 - 5*x4 + 4*y2*(5*x2 - y2) - y4)/(64*sqrt(pi))\n\t\t\tdy[52] = 4.1513246297620823f*xz*(x2 - 3.0f*y2)*(13.0f*z2 - 3.0f) ;                          // 3*sqrt(385)*xz*(x2 - 3*y2)*(13*z2 - 3)/(8*sqrt(pi))\n\t\t\tdy[53] = -0.46937680158688211f*(x2 - y2)*(13.0f*z2*(11.0f*z2 - 3.0f) - 27.0f*z2 + 3.0f) ;                             // -9*sqrt(35)*(x2 - y2)*(13*z2*(11*z2 - 3) - 27*z2 + 3)/(64*sqrt(pi))\n\t\t\tdy[54] = 0.44253269244498261f*xz*(-110.0f*z2 + 143.0f*z4 + 15.0f) ;                         // 3*sqrt(70)*xz*(-110*z2 + 143*z4 + 15)/(32*sqrt(pi))\n\t\t\tdy[55] = -12.194767023639836f*z2 + 44.714145753346067f*z4 - 38.752259652899923f*z6 + 0.45165803791258652f ;                         // sqrt(105)*(-135*z2 + 495*z4 - 429*z6 + 5)/(64*sqrt(pi))\n\t\t\tdy[56] = 0.0f ;                            // 0\n\t\t\tdy[57] = 0.0f ;                            // 0\n\t\t\tdy[58] = 0.44253269244498261f*yz*(110.0f*z2 - 143.0f*z4 - 15.0f) ;                          // 3*sqrt(70)*yz*(110*z2 - 143*z4 - 15)/(32*sqrt(pi))\n\t\t\tdy[59] = 0.93875360317376422f*xy*(-66.0f*z2 + 143.0f*z4 + 3.0f) ;                           // 9*sqrt(35)*xy*(-66*z2 + 143*z4 + 3)/(32*sqrt(pi))\n\t\t\tdy[60] = -4.1513246297620823f*yz*(3.0f*x2 - y2)*(13.0f*z2 - 3.0f) ;                         // -3*sqrt(385)*yz*(3*x2 - y2)*(13*z2 - 3)/(8*sqrt(pi))\n\t\t\tdy[61] = 10.378311574405206f*xy*(x2 - y2)*(13.0f*z2 - 1.0f) ;                              // 15*sqrt(385)*xy*(x2 - y2)*(13*z2 - 1)/(16*sqrt(pi))\n\t\t\tdy[62] = 15.875763970811402f*yz*(10.0f*x2*y2 - 5.0f*x4 - y4) ;                             // 9*sqrt(10010)*yz*(10*x2*y2 - 5*x4 - y4)/(32*sqrt(pi))\n\t\t\tdy[63] = 9.9002782553443485f*xy*(-10.0f*x2*y2 + 3.0f*x4 + 3.0f*y4) ;                                // 21*sqrt(715)*xy*(-10*x2*y2 + 3*x4 + 3*y4)/(32*sqrt(pi))\n\t\t};\n\n\t\tauto write_sh_dz = [&]() {\n\t\t\tdz[0] = 0.0f ;                             // 0\n\t\t\tif (C <= 1) { return; }\n\t\t\tdz[1] = 0.0f ;                             // 0\n\t\t\tdz[2] = 0.48860251190291992f ;                           // sqrt(3)/(2*sqrt(pi))\n\t\t\tdz[3] = 0.0f ;                             // 0\n\t\t\tif (C <= 2) { return; }\n\t\t\tdz[4] = 0.0f ;                             // 0\n\t\t\tdz[5] = -1.0925484305920792f*y ;                         // -sqrt(15)*y/(2*sqrt(pi))\n\t\t\tdz[6] = 1.8923493915151202f*z ;                          // 3*sqrt(5)*z/(2*sqrt(pi))\n\t\t\tdz[7] = -1.0925484305920792f*x ;                         // -sqrt(15)*x/(2*sqrt(pi))\n\t\t\tdz[8] = 0.0f ;                             // 0\n\t\t\tif (C <= 3) { return; }\n\t\t\tdz[9] = 0.0f ;                             // 0\n\t\t\tdz[10] = 2.8906114426405538f*xy ;                                // sqrt(105)*xy/(2*sqrt(pi))\n\t\t\tdz[11] = -4.5704579946446566f*yz ;                               // -5*sqrt(42)*yz/(4*sqrt(pi))\n\t\t\tdz[12] = 5.597644988851731f*z2 - 1.1195289977703462f ;                            // 3*sqrt(7)*(5*z2 - 1)/(4*sqrt(pi))\n\t\t\tdz[13] = -4.5704579946446566f*xz ;                               // -5*sqrt(42)*xz/(4*sqrt(pi))\n\t\t\tdz[14] = 1.4453057213202769f*x2 - 1.4453057213202769f*y2 ;                                // sqrt(105)*(x2 - y2)/(4*sqrt(pi))\n\t\t\tdz[15] = 0.0f ;                            // 0\n\t\t\tif (C <= 4) { return; }\n\t\t\tdz[16] = 0.0f ;                            // 0\n\t\t\tdz[17] = 1.7701307697799304f*y*(-3.0f*x2 + y2) ;                          // 3*sqrt(70)*y*(-3*x2 + y2)/(8*sqrt(pi))\n\t\t\tdz[18] = 13.246445740605839f*xy*z ;                              // 21*sqrt(5)*xy*z/(2*sqrt(pi))\n\t\t\tdz[19] = 2.0071396306718676f*y*(1.0f - 7.0f*z2) ;                          // 9*sqrt(10)*y*(1 - 7*z2)/(8*sqrt(pi))\n\t\t\tdz[20] = 14.809976568128603f*pow(z, 3) - 6.3471328149122579f*z ;                          // (105*z**3 - 45*z)/(4*sqrt(pi))\n\t\t\tdz[21] = 2.0071396306718676f*x*(1.0f - 7.0f*z2) ;                          // 9*sqrt(10)*x*(1 - 7*z2)/(8*sqrt(pi))\n\t\t\tdz[22] = 6.6232228703029197f*z*(x2 - y2) ;                               // 21*sqrt(5)*z*(x2 - y2)/(4*sqrt(pi))\n\t\t\tdz[23] = 1.7701307697799304f*x*(-x2 + 3.0f*y2) ;                          // 3*sqrt(70)*x*(-x2 + 3*y2)/(8*sqrt(pi))\n\t\t\tdz[24] = 0.0f ;                            // 0\n\t\t\tif (C <= 5) { return; }\n\t\t\tdz[25] = 0.0f ;                            // 0\n\t\t\tdz[26] = 8.3026492595241645f*xy*(x2 - y2) ;                              // 3*sqrt(385)*xy*(x2 - y2)/(4*sqrt(pi))\n\t\t\tdz[27] = 8.8062893898345074f*yz*(-3.0f*x2 + y2) ;                         // 9*sqrt(770)*yz*(-3*x2 + y2)/(16*sqrt(pi))\n\t\t\tdz[28] = 4.7935367849733241f*xy*(9.0f*z2 - 1.0f) ;                         // sqrt(1155)*xy*(9*z2 - 1)/(4*sqrt(pi))\n\t\t\tdz[29] = 12.682506233479513f*yz*(1.0f - 3.0f*z2) ;                         // 7*sqrt(165)*yz*(1 - 3*z2)/(4*sqrt(pi))\n\t\t\tdz[30] = -24.559567715218954f*z2 + 36.839351572828434f*z4 + 1.754254836801354f ;                           // 15*sqrt(11)*(-14*z2 + 21*z4 + 1)/(16*sqrt(pi))\n\t\t\tdz[31] = 12.682506233479513f*xz*(1.0f - 3.0f*z2) ;                         // 7*sqrt(165)*xz*(1 - 3*z2)/(4*sqrt(pi))\n\t\t\tdz[32] = 2.3967683924866621f*(x2 - y2)*(9.0f*z2 - 1.0f) ;                          // sqrt(1155)*(x2 - y2)*(9*z2 - 1)/(8*sqrt(pi))\n\t\t\tdz[33] = 8.8062893898345074f*xz*(-x2 + 3.0f*y2) ;                         // 9*sqrt(770)*xz*(-x2 + 3*y2)/(16*sqrt(pi))\n\t\t\tdz[34] = -12.453973889286246f*x2*y2 + 2.0756623148810411f*x4 + 2.0756623148810411f*y4 ;                            // 3*sqrt(385)*(-6*x2*y2 + x4 + y4)/(16*sqrt(pi))\n\t\t\tdz[35] = 0.0f ;                            // 0\n\t\t\tif (C <= 6) { return; }\n\t\t\tdz[36] = 0.0f ;                            // 0\n\t\t\tdz[37] = 2.3666191622317521f*y*(10.0f*x2*y2 - 5.0f*x4 - y4) ;                              // 3*sqrt(2002)*y*(10*x2*y2 - 5*x4 - y4)/(32*sqrt(pi))\n\t\t\tdz[38] = 44.401711264127719f*xy*z*(x2 - y2) ;                            // 33*sqrt(91)*xy*z*(x2 - y2)/(4*sqrt(pi))\n\t\t\tdz[39] = -2.7636157785447706f*y*(3.0f*x2 - y2)*(11.0f*z2 - 1.0f) ;                          // -3*sqrt(2730)*y*(3*x2 - y2)*(11*z2 - 1)/(32*sqrt(pi))\n\t\t\tdz[40] = 11.054463114179082f*xy*z*(11.0f*z2 - 3.0f) ;                              // 3*sqrt(2730)*xy*z*(11*z2 - 3)/(8*sqrt(pi))\n\t\t\tdz[41] = 2.9131068125936568f*y*(18.0f*z2 - 33.0f*z4 - 1.0f) ;                               // 5*sqrt(273)*y*(18*z2 - 33*z4 - 1)/(16*sqrt(pi))\n\t\t\tdz[42] = 2.6699064952403937f*z*(-30.0f*z2 + 33.0f*z4 + 5.0f) ;                              // 21*sqrt(13)*z*(-30*z2 + 33*z4 + 5)/(16*sqrt(pi))\n\t\t\tdz[43] = 2.9131068125936568f*x*(18.0f*z2 - 33.0f*z4 - 1.0f) ;                               // 5*sqrt(273)*x*(18*z2 - 33*z4 - 1)/(16*sqrt(pi))\n\t\t\tdz[44] = 5.5272315570895412f*z*(x2 - y2)*(11.0f*z2 - 3.0f) ;                               // 3*sqrt(2730)*z*(x2 - y2)*(11*z2 - 3)/(16*sqrt(pi))\n\t\t\tdz[45] = -2.7636157785447706f*x*(x2 - 3.0f*y2)*(11.0f*z2 - 1.0f) ;                          // -3*sqrt(2730)*x*(x2 - 3*y2)*(11*z2 - 1)/(32*sqrt(pi))\n\t\t\tdz[46] = 11.10042781603193f*z*(-6.0f*x2*y2 + x4 + y4) ;                           // 33*sqrt(91)*z*(-6*x2*y2 + x4 + y4)/(16*sqrt(pi))\n\t\t\tdz[47] = 2.3666191622317521f*x*(10.0f*x2*y2 - x4 - 5.0f*y4) ;                              // 3*sqrt(2002)*x*(10*x2*y2 - x4 - 5*y4)/(32*sqrt(pi))\n\t\t\tdz[48] = 0.0f ;                            // 0\n\t\t\tif (C <= 7) { return; }\n\t\t\tdz[49] = 0.0f ;                            // 0\n\t\t\tdz[50] = 5.2919213236038001f*xy*(-10.0f*x2*y2 + 3.0f*x4 + 3.0f*y4) ;                                // 3*sqrt(10010)*xy*(-10*x2*y2 + 3*x4 + 3*y4)/(32*sqrt(pi))\n\t\t\tdz[51] = 13.491805046726766f*yz*(10.0f*x2*y2 - 5.0f*x4 - y4) ;                             // 39*sqrt(385)*yz*(10*x2*y2 - 5*x4 - y4)/(32*sqrt(pi))\n\t\t\tdz[52] = 12.453973889286248f*xy*(x2 - y2)*(13.0f*z2 - 1.0f) ;                              // 9*sqrt(385)*xy*(x2 - y2)*(13*z2 - 1)/(8*sqrt(pi))\n\t\t\tdz[53] = -6.8841930899409371f*yz*(3.0f*x2 - y2)*(13.0f*z2 - 3.0f) ;                         // -33*sqrt(35)*yz*(3*x2 - y2)*(13*z2 - 3)/(16*sqrt(pi))\n\t\t\tdz[54] = 2.2126634622249131f*xy*(-66.0f*z2 + 143.0f*z4 + 3.0f) ;                            // 15*sqrt(70)*xy*(-66*z2 + 143*z4 + 3)/(32*sqrt(pi))\n\t\t\tdz[55] = 1.6259689364853116f*yz*(110.0f*z2 - 143.0f*z4 - 15.0f) ;                           // 9*sqrt(105)*yz*(110*z2 - 143*z4 - 15)/(32*sqrt(pi))\n\t\t\tdz[56] = 64.528641681844675f*z2 - 236.60501950009714f*z4 + 205.05768356675085f*z6 - 2.3899496919201733f ;                           // 7*sqrt(15)*(135*z2 - 495*z4 + 429*z6 - 5)/(32*sqrt(pi))\n\t\t\tdz[57] = 1.6259689364853116f*xz*(110.0f*z2 - 143.0f*z4 - 15.0f) ;                           // 9*sqrt(105)*xz*(110*z2 - 143*z4 - 15)/(32*sqrt(pi))\n\t\t\tdz[58] = 0.07375544874083044f*(x2 - y2)*(143.0f*z2*(3.0f*z2 - 1.0f) + 132.0f*z2*(13.0f*z2 - 5.0f) - 187.0f*z2 + 45.0f) ;                         // sqrt(70)*(x2 - y2)*(143*z2*(3*z2 - 1) + 132*z2*(13*z2 - 5) - 187*z2 + 45)/(64*sqrt(pi))\n\t\t\tdz[59] = -6.8841930899409371f*xz*(x2 - 3.0f*y2)*(13.0f*z2 - 3.0f) ;                         // -33*sqrt(35)*xz*(x2 - 3*y2)*(13*z2 - 3)/(16*sqrt(pi))\n\t\t\tdz[60] = 3.1134934723215619f*(13.0f*z2 - 1.0f)*(-6.0f*x2*y2 + x4 + y4) ;                            // 9*sqrt(385)*(13*z2 - 1)*(-6*x2*y2 + x4 + y4)/(32*sqrt(pi))\n\t\t\tdz[61] = 13.491805046726766f*xz*(10.0f*x2*y2 - x4 - 5.0f*y4) ;                             // 39*sqrt(385)*xz*(10*x2*y2 - x4 - 5*y4)/(32*sqrt(pi))\n\t\t\tdz[62] = 39.6894099270285f*x2*y4 - 39.6894099270285f*x4*y2 + 2.6459606618019f*x6 - 2.6459606618019f*y6 ;                            // 3*sqrt(10010)*(15*x2*y4 - 15*x4*y2 + x6 - y6)/(64*sqrt(pi))\n\t\t\tdz[63] = 0.0f ;                            // 0\n\t\t};\n\t\twrite_sh_dx();\n\t\twrite_sh_dy();\n\t\twrite_sh_dz();\n\t}\n}\n\n\ntemplate <typename scalar_t>\n__global__ void kernel_sh_backward(\n    const scalar_t * __restrict__ grad,\n\tconst scalar_t * __restrict__ inputs,\n    uint32_t B, uint32_t D, uint32_t C,\n    const scalar_t * __restrict__ dy_dx,\n    scalar_t * grad_inputs\n) {\n\tconst uint32_t t = threadIdx.x + blockIdx.x * blockDim.x;\n\tconst uint32_t b = t / D;\n\tif (b >= B) return;\n\n\tconst uint32_t d = t - b * D;\n\tconst uint32_t C2 = C * C;\n\n\t// locate\n\tgrad += b * C2;\n\tdy_dx += b * D * C2 + d * C2;\n\n\tfor (int ch = 0; ch < C2; ch++) {\n\t\tgrad_inputs[t] += grad[ch] * dy_dx[ch];\n\t\t//printf(\"t=%d, b=%d, d=%d, ch=%d, grad=%f (+= %f * %f)\\n\", t, b, d, ch, grad_inputs[t], grad[ch], dy_dx[ch]);\n\t}\n\n}\n\n// inputs: [B, D], float, in [0, 1]\n// outputs: [B, L * C], float\ntemplate <typename scalar_t>\nvoid sh_encode_forward_cuda(const scalar_t *inputs, scalar_t *outputs, const uint32_t B, const uint32_t D, const uint32_t C, scalar_t *dy_dx) {\n\tstatic constexpr uint32_t N_THREADS = 256;\n\tkernel_sh<scalar_t><<<div_round_up(B, N_THREADS), N_THREADS>>>(inputs, outputs, B, D, C, dy_dx);\n}\n\n\ntemplate <typename scalar_t>\nvoid sh_encode_backward_cuda(const scalar_t *grad, const scalar_t *inputs, const uint32_t B, const uint32_t D, const uint32_t C, scalar_t *dy_dx, scalar_t *grad_inputs) {\n\tstatic constexpr uint32_t N_THREADS = 256;\n\tkernel_sh_backward<scalar_t><<<div_round_up(B * D, N_THREADS), N_THREADS>>>(grad, inputs, B, D, C, dy_dx, grad_inputs);\n}\n\n\nvoid sh_encode_forward(at::Tensor inputs, at::Tensor outputs, const uint32_t B, const uint32_t D, const uint32_t C, at::optional<at::Tensor> dy_dx) {\n    CHECK_CUDA(inputs);\n    CHECK_CUDA(outputs);\n    // CHECK_CUDA(dy_dx);\n    \n    CHECK_CONTIGUOUS(inputs);\n    CHECK_CONTIGUOUS(outputs);\n    // CHECK_CONTIGUOUS(dy_dx);\n\n    CHECK_IS_FLOATING(inputs);\n    CHECK_IS_FLOATING(outputs);\n    // CHECK_IS_FLOATING(dy_dx);\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    inputs.scalar_type(), \"sh_encode_forward_cuda\", ([&] {\n\t\tsh_encode_forward_cuda<scalar_t>(inputs.data_ptr<scalar_t>(), outputs.data_ptr<scalar_t>(), B, D, C, dy_dx.has_value() ? dy_dx.value().data_ptr<scalar_t>() : nullptr);\n    }));\t\n}\n\nvoid sh_encode_backward(at::Tensor grad, at::Tensor inputs, const uint32_t B, const uint32_t D, const uint32_t C, at::Tensor dy_dx, at::Tensor grad_inputs) {    \n    CHECK_CUDA(grad);\n    CHECK_CUDA(inputs);\n    CHECK_CUDA(dy_dx);\n    CHECK_CUDA(grad_inputs);\n    \n    CHECK_CONTIGUOUS(grad);\n    CHECK_CONTIGUOUS(inputs);\n    CHECK_CONTIGUOUS(dy_dx);\n    CHECK_CONTIGUOUS(grad_inputs);\n\n    CHECK_IS_FLOATING(grad);\n    CHECK_IS_FLOATING(inputs);\n    CHECK_IS_FLOATING(dy_dx);\n    CHECK_IS_FLOATING(grad_inputs);\n\n    AT_DISPATCH_FLOATING_TYPES_AND_HALF(\n    grad.scalar_type(), \"sh_encode_backward_cuda\", ([&] {\n    \tsh_encode_backward_cuda<scalar_t>(grad.data_ptr<scalar_t>(), inputs.data_ptr<scalar_t>(), B, D, C, dy_dx.data_ptr<scalar_t>(), grad_inputs.data_ptr<scalar_t>());\n    }));\t\n}"
  },
  {
    "path": "stable-dreamfusion/shencoder/src/shencoder.h",
    "content": "# pragma once\n\n#include <stdint.h>\n#include <torch/torch.h>\n\n// inputs: [B, D], float, in [-1, 1]\n// outputs: [B, F], float\n\nvoid sh_encode_forward(at::Tensor inputs, at::Tensor outputs, const uint32_t B, const uint32_t D, const uint32_t C, at::optional<at::Tensor> dy_dx);\nvoid sh_encode_backward(at::Tensor grad, at::Tensor inputs, const uint32_t B, const uint32_t D, const uint32_t C, at::Tensor dy_dx, at::Tensor grad_inputs);"
  },
  {
    "path": "stable-dreamfusion/taichi_modules/__init__.py",
    "content": "from .ray_march import RayMarcherTaichi, raymarching_test\nfrom .volume_train import VolumeRendererTaichi\nfrom .intersection import RayAABBIntersector\nfrom .volume_render_test import composite_test\nfrom .utils import packbits"
  },
  {
    "path": "stable-dreamfusion/taichi_modules/hash_encoder.py",
    "content": "import numpy as np\nimport taichi as ti\nimport torch\nfrom taichi.math import uvec3\nfrom torch.cuda.amp import custom_bwd, custom_fwd\n\nfrom .utils import (data_type, ti2torch, ti2torch_grad, ti2torch_grad_vec,\n                    ti2torch_vec, torch2ti, torch2ti_grad, torch2ti_grad_vec,\n                    torch2ti_vec, torch_type)\n\nhalf2 = ti.types.vector(n=2, dtype=ti.f16)\n\n\n@ti.kernel\ndef random_initialize(data: ti.types.ndarray()):\n    for I in ti.grouped(data):\n        data[I] = (ti.random() * 2.0 - 1.0) * 1e-4\n\n\n@ti.kernel\ndef ti_copy(data1: ti.template(), data2: ti.template()):\n    for I in ti.grouped(data1):\n        data1[I] = data2[I]\n\n\n@ti.kernel\ndef ti_copy_array(data1: ti.types.ndarray(), data2: ti.types.ndarray()):\n    for I in ti.grouped(data1):\n        data1[I] = data2[I]\n\n\n@ti.kernel\ndef ti_copy_field_array(data1: ti.template(), data2: ti.types.ndarray()):\n    for I in ti.grouped(data1):\n        data1[I] = data2[I]\n\n\n@ti.func\ndef fast_hash(pos_grid_local):\n    result = ti.uint32(0)\n    # primes = uvec3(ti.uint32(1), ti.uint32(1958374283), ti.uint32(2654435761))\n    primes = uvec3(ti.uint32(1), ti.uint32(2654435761), ti.uint32(805459861))\n    for i in ti.static(range(3)):\n        result ^= ti.uint32(pos_grid_local[i]) * primes[i]\n    return result\n\n\n@ti.func\ndef under_hash(pos_grid_local, resolution):\n    result = ti.uint32(0)\n    stride = ti.uint32(1)\n    for i in ti.static(range(3)):\n        result += ti.uint32(pos_grid_local[i] * stride)\n        stride *= resolution\n    return result\n\n\n@ti.func\ndef grid_pos2hash_index(indicator, pos_grid_local, resolution, map_size):\n    hash_result = ti.uint32(0)\n    if indicator == 1:\n        hash_result = under_hash(pos_grid_local, resolution)\n    else:\n        hash_result = fast_hash(pos_grid_local)\n\n    return hash_result % map_size\n\n\n@ti.kernel\ndef hash_encode_kernel(\n        xyzs: ti.template(), table: ti.template(),\n        xyzs_embedding: ti.template(), hash_map_indicator: ti.template(),\n        hash_map_sizes_field: ti.template(), offsets: ti.template(), B: ti.i32,\n        per_level_scale: ti.f32):\n\n    # get hash table embedding\n    ti.loop_config(block_dim=16)\n    for i, level in ti.ndrange(B, 16):\n        xyz = ti.Vector([xyzs[i, 0], xyzs[i, 1], xyzs[i, 2]])\n\n        scale = 16 * ti.exp(level * ti.log(per_level_scale)) - 1.0\n        resolution = ti.cast(ti.ceil(scale), ti.uint32) + 1\n\n        offset = offsets[level] * 2\n\n        pos = xyz * scale + 0.5\n        pos_grid_uint = ti.cast(ti.floor(pos), ti.uint32)\n        pos -= pos_grid_uint\n\n        indicator = hash_map_indicator[level]\n        map_size = hash_map_sizes_field[level]\n\n        local_feature_0 = 0.0\n        local_feature_1 = 0.0\n\n        for idx in ti.static(range(8)):\n            w = 1.\n            pos_grid_local = uvec3(0)\n\n            for d in ti.static(range(3)):\n                if (idx & (1 << d)) == 0:\n                    pos_grid_local[d] = pos_grid_uint[d]\n                    w *= 1 - pos[d]\n                else:\n                    pos_grid_local[d] = pos_grid_uint[d] + 1\n                    w *= pos[d]\n\n            index = grid_pos2hash_index(indicator, pos_grid_local, resolution,\n                                        map_size)\n            index_table = offset + index * 2\n            index_table_int = ti.cast(index_table, ti.int32)\n            local_feature_0 += w * table[index_table_int]\n            local_feature_1 += w * table[index_table_int + 1]\n\n        xyzs_embedding[i, level * 2] = local_feature_0\n        xyzs_embedding[i, level * 2 + 1] = local_feature_1\n\n\n@ti.kernel\ndef hash_encode_kernel_half2(\n        xyzs: ti.template(), table: ti.template(),\n        xyzs_embedding: ti.template(), hash_map_indicator: ti.template(),\n        hash_map_sizes_field: ti.template(), offsets: ti.template(), B: ti.i32,\n        per_level_scale: ti.f16):\n\n    # get hash table embedding\n    ti.loop_config(block_dim=32)\n    for i, level in ti.ndrange(B, 16):\n        xyz = ti.Vector([xyzs[i, 0], xyzs[i, 1], xyzs[i, 2]])\n\n        scale = 16 * ti.exp(level * ti.log(per_level_scale)) - 1.0\n        resolution = ti.cast(ti.ceil(scale), ti.uint32) + 1\n\n        offset = offsets[level]\n\n        pos = xyz * scale + 0.5\n        pos_grid_uint = ti.cast(ti.floor(pos), ti.uint32)\n        pos -= pos_grid_uint\n\n        indicator = hash_map_indicator[level]\n        map_size = hash_map_sizes_field[level]\n\n        local_feature = half2(0.0)\n        for idx in ti.static(range(8)):\n            w = ti.f32(1.0)\n            pos_grid_local = uvec3(0)\n\n            for d in ti.static(range(3)):\n                if (idx & (1 << d)) == 0:\n                    pos_grid_local[d] = pos_grid_uint[d]\n                    w *= 1 - pos[d]\n                else:\n                    pos_grid_local[d] = pos_grid_uint[d] + 1\n                    w *= pos[d]\n\n            index = grid_pos2hash_index(indicator, pos_grid_local, resolution,\n                                        map_size)\n\n            index_table = offset + index\n            index_table_int = ti.cast(index_table, ti.int32)\n\n            local_feature += w * table[index_table_int]\n        xyzs_embedding[i, level] = local_feature\n\n\nclass HashEncoderTaichi(torch.nn.Module):\n\n    def __init__(self,\n                 b=1.3195079565048218,\n                 batch_size=8192,\n                 data_type=data_type,\n                 half2_opt=False):\n        super(HashEncoderTaichi, self).__init__()\n\n        self.per_level_scale = b\n        if batch_size < 2048:\n            batch_size = 2048\n\n        # per_level_scale = 1.3195079565048218\n        print(\"per_level_scale: \", b)\n        self.offsets = ti.field(ti.i32, shape=(16, ))\n        self.hash_map_sizes_field = ti.field(ti.uint32, shape=(16, ))\n        self.hash_map_indicator = ti.field(ti.i32, shape=(16, ))\n        base_res = 16\n        max_params = 2**19\n        offset_ = 0\n        hash_map_sizes = []\n        for i in range(16):\n            resolution = int(\n                np.ceil(base_res * np.exp(i * np.log(self.per_level_scale)) -\n                        1.0)) + 1\n            params_in_level = resolution**3\n            params_in_level = int(resolution**\n                                  3) if params_in_level % 8 == 0 else int(\n                                      (params_in_level + 8 - 1) / 8) * 8\n            params_in_level = min(max_params, params_in_level)\n            self.offsets[i] = offset_\n            hash_map_sizes.append(params_in_level)\n            self.hash_map_indicator[\n                i] = 1 if resolution**3 <= params_in_level else 0\n            offset_ += params_in_level\n        print(\"offset_: \", offset_)\n        size = np.uint32(np.array(hash_map_sizes))\n        self.hash_map_sizes_field.from_numpy(size)\n\n        self.total_hash_size = offset_ * 2\n        print(\"total_hash_size: \", self.total_hash_size)\n\n        self.hash_table = torch.nn.Parameter(torch.zeros(self.total_hash_size,\n                                                         dtype=torch_type),\n                                             requires_grad=True)\n        random_initialize(self.hash_table)\n\n        if half2_opt:\n            assert self.total_hash_size % 2 == 0\n            self.parameter_fields = half2.field(shape=(self.total_hash_size //\n                                                       2, ),\n                                                needs_grad=True)\n            self.output_fields = half2.field(shape=(batch_size * 1024, 16),\n                                             needs_grad=True)\n\n            self.torch2ti = torch2ti_vec\n            self.ti2torch = ti2torch_vec\n            self.ti2torch_grad = ti2torch_grad_vec\n            self.torch2ti_grad = torch2ti_grad_vec\n\n            self._hash_encode_kernel = hash_encode_kernel_half2\n        else:\n            self.parameter_fields = ti.field(data_type,\n                                             shape=(self.total_hash_size, ),\n                                             needs_grad=True)\n            self.output_fields = ti.field(dtype=data_type,\n                                          shape=(batch_size * 1024, 32),\n                                          needs_grad=True)\n            self.torch2ti = torch2ti\n            self.ti2torch = ti2torch\n            self.ti2torch_grad = ti2torch_grad\n            self.torch2ti_grad = torch2ti_grad\n\n            self._hash_encode_kernel = hash_encode_kernel\n\n        self.input_fields = ti.field(dtype=data_type,\n                                     shape=(batch_size * 1024, 3),\n                                     needs_grad=True)\n        self.output_dim = 32 # the output dim: num levels (16) x level num (2)\n        self.register_buffer(\n            'hash_grad', torch.zeros(self.total_hash_size, dtype=torch_type))\n        self.register_buffer(\n            'output_embedding',\n            torch.zeros(batch_size * 1024, 32, dtype=torch_type))\n\n        class _module_function(torch.autograd.Function):\n\n            @staticmethod\n            @custom_fwd(cast_inputs=torch_type)\n            def forward(ctx, input_pos, params):\n                output_embedding = self.output_embedding[:input_pos.\n                                                         shape[0]].contiguous(\n                                                         )\n                torch2ti(self.input_fields, input_pos.contiguous())\n                self.torch2ti(self.parameter_fields, params.contiguous())\n\n                self._hash_encode_kernel(\n                    self.input_fields,\n                    self.parameter_fields,\n                    self.output_fields,\n                    self.hash_map_indicator,\n                    self.hash_map_sizes_field,\n                    self.offsets,\n                    input_pos.shape[0],\n                    self.per_level_scale,\n                )\n                self.ti2torch(self.output_fields, output_embedding)\n\n                return output_embedding\n\n            @staticmethod\n            @custom_bwd\n            def backward(ctx, doutput):\n\n                self.zero_grad()\n\n                self.torch2ti_grad(self.output_fields, doutput.contiguous())\n                self._hash_encode_kernel.grad(\n                    self.input_fields,\n                    self.parameter_fields,\n                    self.output_fields,\n                    self.hash_map_indicator,\n                    self.hash_map_sizes_field,\n                    self.offsets,\n                    doutput.shape[0],\n                    self.per_level_scale,\n                )\n                self.ti2torch_grad(self.parameter_fields,\n                                   self.hash_grad.contiguous())\n                return None, self.hash_grad\n\n        self._module_function = _module_function\n\n    def zero_grad(self):\n        self.parameter_fields.grad.fill(0.)\n\n    def forward(self, positions, bound=1):\n        positions = (positions + bound) / (2 * bound) \n        return self._module_function.apply(positions, self.hash_table)\n"
  },
  {
    "path": "stable-dreamfusion/taichi_modules/intersection.py",
    "content": "import taichi as ti\nimport torch\nfrom taichi.math import vec3\nfrom torch.cuda.amp import custom_fwd\n\nfrom .utils import NEAR_DISTANCE\n\n\n@ti.kernel\ndef simple_ray_aabb_intersec_taichi_forward(\n        hits_t: ti.types.ndarray(ndim=2),\n        rays_o: ti.types.ndarray(ndim=2),\n        rays_d: ti.types.ndarray(ndim=2),\n        centers: ti.types.ndarray(ndim=2),\n        half_sizes: ti.types.ndarray(ndim=2)):\n\n    for r in ti.ndrange(hits_t.shape[0]):\n        ray_o = vec3([rays_o[r, 0], rays_o[r, 1], rays_o[r, 2]])\n        ray_d = vec3([rays_d[r, 0], rays_d[r, 1], rays_d[r, 2]])\n        inv_d = 1.0 / ray_d\n\n        center = vec3([centers[0, 0], centers[0, 1], centers[0, 2]])\n        half_size = vec3(\n            [half_sizes[0, 0], half_sizes[0, 1], half_sizes[0, 1]])\n\n        t_min = (center - half_size - ray_o) * inv_d\n        t_max = (center + half_size - ray_o) * inv_d\n\n        _t1 = ti.min(t_min, t_max)\n        _t2 = ti.max(t_min, t_max)\n        t1 = _t1.max()\n        t2 = _t2.min()\n\n        if t2 > 0.0:\n            hits_t[r, 0, 0] = ti.max(t1, NEAR_DISTANCE)\n            hits_t[r, 0, 1] = t2\n\n\nclass RayAABBIntersector(torch.autograd.Function):\n    \"\"\"\n    Computes the intersections of rays and axis-aligned voxels.\n\n    Inputs:\n        rays_o: (N_rays, 3) ray origins\n        rays_d: (N_rays, 3) ray directions\n        centers: (N_voxels, 3) voxel centers\n        half_sizes: (N_voxels, 3) voxel half sizes\n        max_hits: maximum number of intersected voxels to keep for one ray\n                  (for a cubic scene, this is at most 3*N_voxels^(1/3)-2)\n\n    Outputs:\n        hits_cnt: (N_rays) number of hits for each ray\n        (followings are from near to far)\n        hits_t: (N_rays, max_hits, 2) hit t's (-1 if no hit)\n        hits_voxel_idx: (N_rays, max_hits) hit voxel indices (-1 if no hit)\n    \"\"\"\n\n    @staticmethod\n    @custom_fwd(cast_inputs=torch.float32)\n    def forward(ctx, rays_o, rays_d, center, half_size, max_hits):\n        hits_t = (torch.zeros(\n            rays_o.size(0), 1, 2, device=rays_o.device, dtype=torch.float32) -\n                  1).contiguous()\n\n        simple_ray_aabb_intersec_taichi_forward(hits_t, rays_o, rays_d, center,\n                                                half_size)\n\n        return None, hits_t, None\n"
  },
  {
    "path": "stable-dreamfusion/taichi_modules/ray_march.py",
    "content": "import taichi as ti\nimport torch\nfrom taichi.math import vec3\nfrom torch.cuda.amp import custom_fwd\n\nfrom .utils import __morton3D, calc_dt, mip_from_dt, mip_from_pos\n\n\n@ti.kernel\ndef raymarching_train(rays_o: ti.types.ndarray(ndim=2),\n                      rays_d: ti.types.ndarray(ndim=2),\n                      hits_t: ti.types.ndarray(ndim=2),\n                      density_bitfield: ti.types.ndarray(ndim=1),\n                      noise: ti.types.ndarray(ndim=1),\n                      counter: ti.types.ndarray(ndim=1),\n                      rays_a: ti.types.ndarray(ndim=2),\n                      xyzs: ti.types.ndarray(ndim=2),\n                      dirs: ti.types.ndarray(ndim=2),\n                      deltas: ti.types.ndarray(ndim=1),\n                      ts: ti.types.ndarray(ndim=1), cascades: int,\n                      grid_size: int, scale: float, exp_step_factor: float,\n                      max_samples: float):\n\n    # ti.loop_config(block_dim=256)\n    for r in noise:\n        ray_o = vec3(rays_o[r, 0], rays_o[r, 1], rays_o[r, 2])\n        ray_d = vec3(rays_d[r, 0], rays_d[r, 1], rays_d[r, 2])\n        d_inv = 1.0 / ray_d\n\n        t1, t2 = hits_t[r, 0], hits_t[r, 1]\n\n        grid_size3 = grid_size**3\n        grid_size_inv = 1.0 / grid_size\n\n        if t1 >= 0:\n            dt = calc_dt(t1, exp_step_factor, grid_size, scale)\n            t1 += dt * noise[r]\n\n        t = t1\n        N_samples = 0\n\n        while (0 <= t) & (t < t2) & (N_samples < max_samples):\n            xyz = ray_o + t * ray_d\n            dt = calc_dt(t, exp_step_factor, grid_size, scale)\n            mip = ti.max(mip_from_pos(xyz, cascades),\n                         mip_from_dt(dt, grid_size, cascades))\n\n            # mip_bound = 0.5\n            # mip_bound = ti.min(ti.pow(2., mip - 1), scale)\n            mip_bound = scale\n            mip_bound_inv = 1 / mip_bound\n\n            nxyz = ti.math.clamp(0.5 * (xyz * mip_bound_inv + 1) * grid_size,\n                                 0.0, grid_size - 1.0)\n            # nxyz = ti.ceil(nxyz)\n\n            idx = mip * grid_size3 + __morton3D(ti.cast(nxyz, ti.u32))\n            occ = density_bitfield[ti.u32(idx // 8)] & (1 << ti.u32(idx % 8))\n            # idx = __morton3D(ti.cast(nxyz, ti.uint32))\n            # occ = density_bitfield[mip, idx//8] & (1 << ti.cast(idx%8, ti.uint32))\n\n            if occ:\n                t += dt\n                N_samples += 1\n            else:\n                # t += dt\n                txyz = (((nxyz + 0.5 + 0.5 * ti.math.sign(ray_d)) *\n                         grid_size_inv * 2 - 1) * mip_bound - xyz) * d_inv\n\n                t_target = t + ti.max(0, txyz.min())\n                t += calc_dt(t, exp_step_factor, grid_size, scale)\n                while t < t_target:\n                    t += calc_dt(t, exp_step_factor, grid_size, scale)\n\n        start_idx = ti.atomic_add(counter[0], N_samples)\n        ray_count = ti.atomic_add(counter[1], 1)\n\n        rays_a[ray_count, 0] = r\n        rays_a[ray_count, 1] = start_idx\n        rays_a[ray_count, 2] = N_samples\n\n        t = t1\n        samples = 0\n\n        while (t < t2) & (samples < N_samples):\n            xyz = ray_o + t * ray_d\n            dt = calc_dt(t, exp_step_factor, grid_size, scale)\n            mip = ti.max(mip_from_pos(xyz, cascades),\n                         mip_from_dt(dt, grid_size, cascades))\n\n            # mip_bound = 0.5\n            # mip_bound = ti.min(ti.pow(2., mip - 1), scale)\n            mip_bound = scale\n            mip_bound_inv = 1 / mip_bound\n\n            nxyz = ti.math.clamp(0.5 * (xyz * mip_bound_inv + 1) * grid_size,\n                                 0.0, grid_size - 1.0)\n            # nxyz = ti.ceil(nxyz)\n\n            idx = mip * grid_size3 + __morton3D(ti.cast(nxyz, ti.u32))\n            occ = density_bitfield[ti.u32(idx // 8)] & (1 << ti.u32(idx % 8))\n            # idx = __morton3D(ti.cast(nxyz, ti.uint32))\n            # occ = density_bitfield[mip, idx//8] & (1 << ti.cast(idx%8, ti.uint32))\n\n            if occ:\n                s = start_idx + samples\n                xyzs[s, 0] = xyz[0]\n                xyzs[s, 1] = xyz[1]\n                xyzs[s, 2] = xyz[2]\n                dirs[s, 0] = ray_d[0]\n                dirs[s, 1] = ray_d[1]\n                dirs[s, 2] = ray_d[2]\n                ts[s] = t\n                deltas[s] = dt\n                t += dt\n                samples += 1\n            else:\n                # t += dt\n                txyz = (((nxyz + 0.5 + 0.5 * ti.math.sign(ray_d)) *\n                         grid_size_inv * 2 - 1) * mip_bound - xyz) * d_inv\n\n                t_target = t + ti.max(0, txyz.min())\n                t += calc_dt(t, exp_step_factor, grid_size, scale)\n                while t < t_target:\n                    t += calc_dt(t, exp_step_factor, grid_size, scale)\n\n\n@ti.kernel\ndef raymarching_train_backword(segments: ti.types.ndarray(ndim=2),\n                               ts: ti.types.ndarray(ndim=1),\n                               dL_drays_o: ti.types.ndarray(ndim=2),\n                               dL_drays_d: ti.types.ndarray(ndim=2),\n                               dL_dxyzs: ti.types.ndarray(ndim=2),\n                               dL_ddirs: ti.types.ndarray(ndim=2)):\n\n    for s in segments:\n        index = segments[s]\n        dxyz = dL_dxyzs[index]\n        ddir = dL_ddirs[index]\n\n        dL_drays_o[s] = dxyz\n        dL_drays_d[s] = dxyz * ts[index] + ddir\n\n\nclass RayMarcherTaichi(torch.nn.Module):\n\n    def __init__(self, batch_size=8192):\n        super(RayMarcherTaichi, self).__init__()\n\n        self.register_buffer('rays_a',\n                             torch.zeros(batch_size, 3, dtype=torch.int32))\n        self.register_buffer(\n            'xyzs', torch.zeros(batch_size * 1024, 3, dtype=torch.float32))\n        self.register_buffer(\n            'dirs', torch.zeros(batch_size * 1024, 3, dtype=torch.float32))\n        self.register_buffer(\n            'deltas', torch.zeros(batch_size * 1024, dtype=torch.float32))\n        self.register_buffer(\n            'ts', torch.zeros(batch_size * 1024, dtype=torch.float32))\n\n        # self.register_buffer('dL_drays_o', torch.zeros(batch_size, dtype=torch.float32))\n        # self.register_buffer('dL_drays_d', torch.zeros(batch_size, dtype=torch.float32))\n\n        class _module_function(torch.autograd.Function):\n\n            @staticmethod\n            @custom_fwd(cast_inputs=torch.float32)\n            def forward(ctx, rays_o, rays_d, hits_t, density_bitfield,\n                        cascades, scale, exp_step_factor, grid_size,\n                        max_samples):\n                # noise to perturb the first sample of each ray\n                noise = torch.rand_like(rays_o[:, 0])\n                counter = torch.zeros(2,\n                                      device=rays_o.device,\n                                      dtype=torch.int32)\n\n                raymarching_train(\\\n                    rays_o, rays_d,\n                    hits_t.contiguous(),\n                    density_bitfield, noise, counter,\n                    self.rays_a.contiguous(),\n                    self.xyzs.contiguous(),\n                    self.dirs.contiguous(),\n                    self.deltas.contiguous(),\n                    self.ts.contiguous(),\n                    cascades, grid_size, scale,\n                    exp_step_factor, max_samples)\n\n                # ti.sync()\n\n                total_samples = counter[0]  # total samples for all rays\n                # remove redundant output\n                xyzs = self.xyzs[:total_samples]\n                dirs = self.dirs[:total_samples]\n                deltas = self.deltas[:total_samples]\n                ts = self.ts[:total_samples]\n\n                return self.rays_a, xyzs, dirs, deltas, ts, total_samples\n\n                # @staticmethod\n                # @custom_bwd\n                # def backward(ctx, dL_drays_a, dL_dxyzs, dL_ddirs, dL_ddeltas, dL_dts,\n                #              dL_dtotal_samples):\n                #     rays_a, ts = ctx.saved_tensors\n                #     # rays_a = rays_a.contiguous()\n                #     ts = ts.contiguous()\n                #     segments = torch.cat([rays_a[:, 1], rays_a[-1:, 1] + rays_a[-1:, 2]])\n                #     dL_drays_o = torch.zeros_like(rays_a[:, 0])\n                #     dL_drays_d = torch.zeros_like(rays_a[:, 0])\n                #     raymarching_train_backword(segments.contiguous(), ts, dL_drays_o,\n                #                                dL_drays_d, dL_dxyzs, dL_ddirs)\n                #     # ti.sync()\n                #     # dL_drays_o = segment_csr(dL_dxyzs, segments)\n                #     # dL_drays_d = \\\n                #     #     segment_csr(dL_dxyzs*rearrange(ts, 'n -> n 1')+dL_ddirs, segments)\n\n                #     return dL_drays_o, dL_drays_d, None, None, None, None, None, None, None\n\n        self._module_function = _module_function\n\n    def forward(self, rays_o, rays_d, hits_t, density_bitfield, cascades,\n                scale, exp_step_factor, grid_size, max_samples):\n        return self._module_function.apply(rays_o, rays_d, hits_t,\n                                           density_bitfield, cascades, scale,\n                                           exp_step_factor, grid_size,\n                                           max_samples)\n\n\n@ti.kernel\ndef raymarching_test_kernel(\n        rays_o: ti.types.ndarray(ndim=2),\n        rays_d: ti.types.ndarray(ndim=2),\n        hits_t: ti.types.ndarray(ndim=2),\n        alive_indices: ti.types.ndarray(ndim=1),\n        density_bitfield: ti.types.ndarray(ndim=1),\n        cascades: int,\n        grid_size: int,\n        scale: float,\n        exp_step_factor: float,\n        N_samples: int,\n        max_samples: int,\n        xyzs: ti.types.ndarray(ndim=2),\n        dirs: ti.types.ndarray(ndim=2),\n        deltas: ti.types.ndarray(ndim=1),\n        ts: ti.types.ndarray(ndim=1),\n        N_eff_samples: ti.types.ndarray(ndim=1),\n):\n\n    for n in alive_indices:\n        r = alive_indices[n]\n        grid_size3 = grid_size**3\n        grid_size_inv = 1.0 / grid_size\n\n        ray_o = vec3(rays_o[r, 0], rays_o[r, 1], rays_o[r, 2])\n        ray_d = vec3(rays_d[r, 0], rays_d[r, 1], rays_d[r, 2])\n        d_inv = 1.0 / ray_d\n\n        t = hits_t[r, 0]\n        t2 = hits_t[r, 1]\n\n        s = 0\n\n        while (0 <= t) & (t < t2) & (s < N_samples):\n            xyz = ray_o + t * ray_d\n            dt = calc_dt(t, exp_step_factor, grid_size, scale)\n            mip = ti.max(mip_from_pos(xyz, cascades),\n                         mip_from_dt(dt, grid_size, cascades))\n\n            # mip_bound = 0.5\n            # mip_bound = ti.min(ti.pow(2., mip - 1), scale)\n            mip_bound = scale\n            mip_bound_inv = 1 / mip_bound\n\n            nxyz = ti.math.clamp(0.5 * (xyz * mip_bound_inv + 1) * grid_size,\n                                 0.0, grid_size - 1.0)\n            # nxyz = ti.ceil(nxyz)\n\n            idx = mip * grid_size3 + __morton3D(ti.cast(nxyz, ti.u32))\n            occ = density_bitfield[ti.u32(idx // 8)] & (1 << ti.u32(idx % 8))\n\n            if occ:\n                xyzs[n, s, 0] = xyz[0]\n                xyzs[n, s, 1] = xyz[1]\n                xyzs[n, s, 2] = xyz[2]\n                dirs[n, s, 0] = ray_d[0]\n                dirs[n, s, 1] = ray_d[1]\n                dirs[n, s, 2] = ray_d[2]\n                ts[n, s] = t\n                deltas[n, s] = dt\n                t += dt\n                hits_t[r, 0] = t\n                s += 1\n\n            else:\n                txyz = (((nxyz + 0.5 + 0.5 * ti.math.sign(ray_d)) *\n                         grid_size_inv * 2 - 1) * mip_bound - xyz) * d_inv\n\n                t_target = t + ti.max(0, txyz.min())\n                t += calc_dt(t, exp_step_factor, grid_size, scale)\n                while t < t_target:\n                    t += calc_dt(t, exp_step_factor, grid_size, scale)\n\n        N_eff_samples[n] = s\n\n\ndef raymarching_test(rays_o, rays_d, hits_t, alive_indices, density_bitfield,\n                     cascades, scale, exp_step_factor, grid_size, max_samples,\n                     N_samples):\n\n    N_rays = alive_indices.size(0)\n    xyzs = torch.zeros(N_rays,\n                       N_samples,\n                       3,\n                       device=rays_o.device,\n                       dtype=rays_o.dtype)\n    dirs = torch.zeros(N_rays,\n                       N_samples,\n                       3,\n                       device=rays_o.device,\n                       dtype=rays_o.dtype)\n    deltas = torch.zeros(N_rays,\n                         N_samples,\n                         device=rays_o.device,\n                         dtype=rays_o.dtype)\n    ts = torch.zeros(N_rays,\n                     N_samples,\n                     device=rays_o.device,\n                     dtype=rays_o.dtype)\n    N_eff_samples = torch.zeros(N_rays,\n                                device=rays_o.device,\n                                dtype=torch.int32)\n\n    raymarching_test_kernel(rays_o, rays_d, hits_t, alive_indices,\n                            density_bitfield, cascades, grid_size, scale,\n                            exp_step_factor, N_samples, max_samples, xyzs,\n                            dirs, deltas, ts, N_eff_samples)\n\n    # ti.sync()\n\n    return xyzs, dirs, deltas, ts, N_eff_samples\n"
  },
  {
    "path": "stable-dreamfusion/taichi_modules/utils.py",
    "content": "import taichi as ti\nimport torch\nfrom taichi.math import uvec3\n\ntaichi_block_size = 128\n\ndata_type = ti.f32\ntorch_type = torch.float32\n\nMAX_SAMPLES = 1024\nNEAR_DISTANCE = 0.01\nSQRT3 = 1.7320508075688772\nSQRT3_MAX_SAMPLES = SQRT3 / 1024\nSQRT3_2 = 1.7320508075688772 * 2\n\n\n@ti.func\ndef scalbn(x, exponent):\n    return x * ti.math.pow(2, exponent)\n\n\n@ti.func\ndef calc_dt(t, exp_step_factor, grid_size, scale):\n    return ti.math.clamp(t * exp_step_factor, SQRT3_MAX_SAMPLES,\n                         SQRT3_2 * scale / grid_size)\n\n\n@ti.func\ndef frexp_bit(x):\n    exponent = 0\n    if x != 0.0:\n        # frac = ti.abs(x)\n        bits = ti.bit_cast(x, ti.u32)\n        exponent = ti.i32((bits & ti.u32(0x7f800000)) >> 23) - 127\n        # exponent = (ti.i32(bits & ti.u32(0x7f800000)) >> 23) - 127\n        bits &= ti.u32(0x7fffff)\n        bits |= ti.u32(0x3f800000)\n        frac = ti.bit_cast(bits, ti.f32)\n        if frac < 0.5:\n            exponent -= 1\n        elif frac > 1.0:\n            exponent += 1\n    return exponent\n\n\n@ti.func\ndef mip_from_pos(xyz, cascades):\n    mx = ti.abs(xyz).max()\n    # _, exponent = _frexp(mx)\n    exponent = frexp_bit(ti.f32(mx)) + 1\n    # frac, exponent = ti.frexp(ti.f32(mx))\n    return ti.min(cascades - 1, ti.max(0, exponent))\n\n\n@ti.func\ndef mip_from_dt(dt, grid_size, cascades):\n    # _, exponent = _frexp(dt*grid_size)\n    exponent = frexp_bit(ti.f32(dt * grid_size))\n    # frac, exponent = ti.frexp(ti.f32(dt*grid_size))\n    return ti.min(cascades - 1, ti.max(0, exponent))\n\n\n@ti.func\ndef __expand_bits(v):\n    v = (v * ti.uint32(0x00010001)) & ti.uint32(0xFF0000FF)\n    v = (v * ti.uint32(0x00000101)) & ti.uint32(0x0F00F00F)\n    v = (v * ti.uint32(0x00000011)) & ti.uint32(0xC30C30C3)\n    v = (v * ti.uint32(0x00000005)) & ti.uint32(0x49249249)\n    return v\n\n\n@ti.func\ndef __morton3D(xyz):\n    xyz = __expand_bits(xyz)\n    return xyz[0] | (xyz[1] << 1) | (xyz[2] << 2)\n\n\n@ti.func\ndef __morton3D_invert(x):\n    x = x & (0x49249249)\n    x = (x | (x >> 2)) & ti.uint32(0xc30c30c3)\n    x = (x | (x >> 4)) & ti.uint32(0x0f00f00f)\n    x = (x | (x >> 8)) & ti.uint32(0xff0000ff)\n    x = (x | (x >> 16)) & ti.uint32(0x0000ffff)\n    return ti.int32(x)\n\n\n@ti.kernel\ndef morton3D_invert_kernel(indices: ti.types.ndarray(ndim=1),\n                           coords: ti.types.ndarray(ndim=2)):\n    for i in indices:\n        ind = ti.uint32(indices[i])\n        coords[i, 0] = __morton3D_invert(ind >> 0)\n        coords[i, 1] = __morton3D_invert(ind >> 1)\n        coords[i, 2] = __morton3D_invert(ind >> 2)\n\n\ndef morton3D_invert(indices):\n    coords = torch.zeros(indices.size(0),\n                         3,\n                         device=indices.device,\n                         dtype=torch.int32)\n    morton3D_invert_kernel(indices.contiguous(), coords)\n    ti.sync()\n    return coords\n\n\n@ti.kernel\ndef morton3D_kernel(xyzs: ti.types.ndarray(ndim=2),\n                    indices: ti.types.ndarray(ndim=1)):\n    for s in indices:\n        xyz = uvec3([xyzs[s, 0], xyzs[s, 1], xyzs[s, 2]])\n        indices[s] = ti.cast(__morton3D(xyz), ti.int32)\n\n\ndef morton3D(coords1):\n    indices = torch.zeros(coords1.size(0),\n                          device=coords1.device,\n                          dtype=torch.int32)\n    morton3D_kernel(coords1.contiguous(), indices)\n    ti.sync()\n    return indices\n\n\n@ti.kernel\ndef packbits(density_grid: ti.types.ndarray(ndim=1),\n             density_threshold: float,\n             density_bitfield: ti.types.ndarray(ndim=1)):\n\n    for n in density_bitfield:\n        bits = ti.uint8(0)\n\n        for i in ti.static(range(8)):\n            bits |= (ti.uint8(1) << i) if (\n                density_grid[8 * n + i] > density_threshold) else ti.uint8(0)\n\n        density_bitfield[n] = bits\n\n\n@ti.kernel\ndef torch2ti(field: ti.template(), data: ti.types.ndarray()):\n    for I in ti.grouped(data):\n        field[I] = data[I]\n\n\n@ti.kernel\ndef ti2torch(field: ti.template(), data: ti.types.ndarray()):\n    for I in ti.grouped(data):\n        data[I] = field[I]\n\n\n@ti.kernel\ndef ti2torch_grad(field: ti.template(), grad: ti.types.ndarray()):\n    for I in ti.grouped(grad):\n        grad[I] = field.grad[I]\n\n\n@ti.kernel\ndef torch2ti_grad(field: ti.template(), grad: ti.types.ndarray()):\n    for I in ti.grouped(grad):\n        field.grad[I] = grad[I]\n\n\n@ti.kernel\ndef torch2ti_vec(field: ti.template(), data: ti.types.ndarray()):\n    for I in range(data.shape[0] // 2):\n        field[I] = ti.Vector([data[I * 2], data[I * 2 + 1]])\n\n\n@ti.kernel\ndef ti2torch_vec(field: ti.template(), data: ti.types.ndarray()):\n    for i, j in ti.ndrange(data.shape[0], data.shape[1] // 2):\n        data[i, j * 2] = field[i, j][0]\n        data[i, j * 2 + 1] = field[i, j][1]\n\n\n@ti.kernel\ndef ti2torch_grad_vec(field: ti.template(), grad: ti.types.ndarray()):\n    for I in range(grad.shape[0] // 2):\n        grad[I * 2] = field.grad[I][0]\n        grad[I * 2 + 1] = field.grad[I][1]\n\n\n@ti.kernel\ndef torch2ti_grad_vec(field: ti.template(), grad: ti.types.ndarray()):\n    for i, j in ti.ndrange(grad.shape[0], grad.shape[1] // 2):\n        field.grad[i, j][0] = grad[i, j * 2]\n        field.grad[i, j][1] = grad[i, j * 2 + 1]\n\n\ndef extract_model_state_dict(ckpt_path,\n                             model_name='model',\n                             prefixes_to_ignore=[]):\n    checkpoint = torch.load(ckpt_path, map_location='cpu')\n    checkpoint_ = {}\n    if 'state_dict' in checkpoint:  # if it's a pytorch-lightning checkpoint\n        checkpoint = checkpoint['state_dict']\n    for k, v in checkpoint.items():\n        if not k.startswith(model_name):\n            continue\n        k = k[len(model_name) + 1:]\n        for prefix in prefixes_to_ignore:\n            if k.startswith(prefix):\n                break\n        else:\n            checkpoint_[k] = v\n    return checkpoint_\n\n\ndef load_ckpt(model, ckpt_path, model_name='model', prefixes_to_ignore=[]):\n    if not ckpt_path:\n        return\n    model_dict = model.state_dict()\n    checkpoint_ = extract_model_state_dict(ckpt_path, model_name,\n                                           prefixes_to_ignore)\n    model_dict.update(checkpoint_)\n    model.load_state_dict(model_dict)\n\ndef depth2img(depth):\n    depth = (depth - depth.min()) / (depth.max() - depth.min())\n    depth_img = cv2.applyColorMap((depth * 255).astype(np.uint8),\n                                  cv2.COLORMAP_TURBO)\n\n    return depth_img"
  },
  {
    "path": "stable-dreamfusion/taichi_modules/volume_render_test.py",
    "content": "import taichi as ti\n\n\n@ti.kernel\ndef composite_test(\n    sigmas: ti.types.ndarray(ndim=2), rgbs: ti.types.ndarray(ndim=3),\n    deltas: ti.types.ndarray(ndim=2), ts: ti.types.ndarray(ndim=2),\n    hits_t: ti.types.ndarray(ndim=2),\n    alive_indices: ti.types.ndarray(ndim=1), T_threshold: float,\n    N_eff_samples: ti.types.ndarray(ndim=1),\n    opacity: ti.types.ndarray(ndim=1),\n    depth: ti.types.ndarray(ndim=1), rgb: ti.types.ndarray(ndim=2)):\n\n    for n in alive_indices:\n        samples = N_eff_samples[n]\n        if samples == 0:\n            alive_indices[n] = -1\n        else:\n            r = alive_indices[n]\n\n            T = 1 - opacity[r]\n\n            rgb_temp_0 = 0.0\n            rgb_temp_1 = 0.0\n            rgb_temp_2 = 0.0\n            depth_temp = 0.0\n            opacity_temp = 0.0\n\n            for s in range(samples):\n                a = 1.0 - ti.exp(-sigmas[n, s] * deltas[n, s])\n                w = a * T\n\n                rgb_temp_0 += w * rgbs[n, s, 0]\n                rgb_temp_1 += w * rgbs[n, s, 1]\n                rgb_temp_2 += w * rgbs[n, s, 2]\n                depth[r] += w * ts[n, s]\n                opacity[r] += w\n                T *= 1.0 - a\n\n                if T <= T_threshold:\n                    alive_indices[n] = -1\n                    break\n\n            rgb[r, 0] += rgb_temp_0\n            rgb[r, 1] += rgb_temp_1\n            rgb[r, 2] += rgb_temp_2\n            depth[r] += depth_temp\n            opacity[r] += opacity_temp\n"
  },
  {
    "path": "stable-dreamfusion/taichi_modules/volume_train.py",
    "content": "import taichi as ti\nimport torch\nfrom torch.cuda.amp import custom_bwd, custom_fwd\n\nfrom .utils import (data_type, ti2torch, ti2torch_grad, torch2ti,\n                    torch2ti_grad, torch_type)\n\n\n@ti.kernel\ndef composite_train_fw_array(\n        sigmas: ti.types.ndarray(),\n        rgbs: ti.types.ndarray(),\n        deltas: ti.types.ndarray(),\n        ts: ti.types.ndarray(),\n        rays_a: ti.types.ndarray(),\n        T_threshold: float,\n        total_samples: ti.types.ndarray(),\n        opacity: ti.types.ndarray(),\n        depth: ti.types.ndarray(),\n        rgb: ti.types.ndarray(),\n        ws: ti.types.ndarray(),\n):\n\n    for n in opacity:\n        ray_idx = rays_a[n, 0]\n        start_idx = rays_a[n, 1]\n        N_samples = rays_a[n, 2]\n\n        T = 1.0\n        samples = 0\n        while samples < N_samples:\n            s = start_idx + samples\n            a = 1.0 - ti.exp(-sigmas[s] * deltas[s])\n            w = a * T\n\n            rgb[ray_idx, 0] += w * rgbs[s, 0]\n            rgb[ray_idx, 1] += w * rgbs[s, 1]\n            rgb[ray_idx, 2] += w * rgbs[s, 2]\n            depth[ray_idx] += w * ts[s]\n            opacity[ray_idx] += w\n            ws[s] = w\n            T *= 1.0 - a\n\n            # if T<T_threshold:\n            #     break\n            samples += 1\n\n        total_samples[ray_idx] = samples\n\n\n@ti.kernel\ndef composite_train_fw(sigmas: ti.template(), rgbs: ti.template(),\n                       deltas: ti.template(), ts: ti.template(),\n                       rays_a: ti.template(), T_threshold: float,\n                       T: ti.template(), total_samples: ti.template(),\n                       opacity: ti.template(), depth: ti.template(),\n                       rgb: ti.template(), ws: ti.template()):\n\n    ti.loop_config(block_dim=256)\n    for n in opacity:\n        ray_idx = ti.i32(rays_a[n, 0])\n        start_idx = ti.i32(rays_a[n, 1])\n        N_samples = ti.i32(rays_a[n, 2])\n\n        rgb[ray_idx, 0] = 0.0\n        rgb[ray_idx, 1] = 0.0\n        rgb[ray_idx, 2] = 0.0\n        depth[ray_idx] = 0.0\n        opacity[ray_idx] = 0.0\n        total_samples[ray_idx] = 0\n\n        T[start_idx] = 1.0\n        # T_ = 1.0\n        # samples = 0\n        # while samples<N_samples:\n        for sample_ in range(N_samples):\n            # T_ = T[ray_idx, samples]\n            s = start_idx + sample_\n            T_ = T[s]\n            if T_ > T_threshold:\n                # s = start_idx + sample_\n                a = 1.0 - ti.exp(-sigmas[s] * deltas[s])\n                w = a * T_\n                rgb[ray_idx, 0] += w * rgbs[s, 0]\n                rgb[ray_idx, 1] += w * rgbs[s, 1]\n                rgb[ray_idx, 2] += w * rgbs[s, 2]\n                depth[ray_idx] += w * ts[s]\n                opacity[ray_idx] += w\n                ws[s] = w\n                # T_ *= (1.0-a)\n                T[s + 1] = T_ * (1.0 - a)\n                # if T[s+1]>=T_threshold:\n                # samples += 1\n                total_samples[ray_idx] += 1\n            else:\n                T[s + 1] = 0.0\n\n        # total_samples[ray_idx] = N_samples\n\n\n@ti.kernel\ndef check_value(\n        fields: ti.template(),\n        array: ti.types.ndarray(),\n        checker: ti.types.ndarray(),\n):\n    for I in ti.grouped(array):\n        if fields[I] == array[I]:\n            checker[I] = 1\n\n\nclass VolumeRendererTaichi(torch.nn.Module):\n\n    def __init__(self, batch_size=8192, data_type=data_type):\n        super(VolumeRendererTaichi, self).__init__()\n        # samples level\n        self.sigmas_fields = ti.field(dtype=data_type,\n                                      shape=(batch_size * 1024, ),\n                                      needs_grad=True)\n        self.rgbs_fields = ti.field(dtype=data_type,\n                                    shape=(batch_size * 1024, 3),\n                                    needs_grad=True)\n        self.deltas_fields = ti.field(dtype=data_type,\n                                      shape=(batch_size * 1024, ),\n                                      needs_grad=True)\n        self.ts_fields = ti.field(dtype=data_type,\n                                  shape=(batch_size * 1024, ),\n                                  needs_grad=True)\n        self.ws_fields = ti.field(dtype=data_type,\n                                  shape=(batch_size * 1024, ),\n                                  needs_grad=True)\n        self.T = ti.field(dtype=data_type,\n                          shape=(batch_size * 1024),\n                          needs_grad=True)\n\n        # rays level\n        self.rays_a_fields = ti.field(dtype=ti.i64, shape=(batch_size, 3))\n        self.total_samples_fields = ti.field(dtype=ti.i64,\n                                             shape=(batch_size, ))\n        self.opacity_fields = ti.field(dtype=data_type,\n                                       shape=(batch_size, ),\n                                       needs_grad=True)\n        self.depth_fields = ti.field(dtype=data_type,\n                                     shape=(batch_size, ),\n                                     needs_grad=True)\n        self.rgb_fields = ti.field(dtype=data_type,\n                                   shape=(batch_size, 3),\n                                   needs_grad=True)\n\n        # preallocate tensor\n        self.register_buffer('total_samples',\n                             torch.zeros(batch_size, dtype=torch.int64))\n        self.register_buffer('rgb', torch.zeros(batch_size,\n                                                3,\n                                                dtype=torch_type))\n        self.register_buffer('opacity',\n                             torch.zeros(batch_size, dtype=torch_type))\n        self.register_buffer('depth', torch.zeros(batch_size,\n                                                  dtype=torch_type))\n        self.register_buffer('ws',\n                             torch.zeros(batch_size * 1024, dtype=torch_type))\n\n        self.register_buffer('sigma_grad',\n                             torch.zeros(batch_size * 1024, dtype=torch_type))\n        self.register_buffer(\n            'rgb_grad', torch.zeros(batch_size * 1024, 3, dtype=torch_type))\n\n        class _module_function(torch.autograd.Function):\n\n            @staticmethod\n            @custom_fwd(cast_inputs=torch_type)\n            def forward(ctx, sigmas, rgbs, deltas, ts, rays_a, T_threshold):\n                # If no output gradient is provided, no need to\n                # automatically materialize it as torch.zeros.\n\n                ctx.T_threshold = T_threshold\n                ctx.samples_size = sigmas.shape[0]\n\n                ws = self.ws[:sigmas.shape[0]]\n\n                torch2ti(self.sigmas_fields, sigmas.contiguous())\n                torch2ti(self.rgbs_fields, rgbs.contiguous())\n                torch2ti(self.deltas_fields, deltas.contiguous())\n                torch2ti(self.ts_fields, ts.contiguous())\n                torch2ti(self.rays_a_fields, rays_a.contiguous())\n                composite_train_fw(self.sigmas_fields, self.rgbs_fields,\n                                   self.deltas_fields, self.ts_fields,\n                                   self.rays_a_fields, T_threshold, self.T,\n                                   self.total_samples_fields,\n                                   self.opacity_fields, self.depth_fields,\n                                   self.rgb_fields, self.ws_fields)\n                ti2torch(self.total_samples_fields, self.total_samples)\n                ti2torch(self.opacity_fields, self.opacity)\n                ti2torch(self.depth_fields, self.depth)\n                ti2torch(self.rgb_fields, self.rgb)\n\n\n                return self.total_samples.sum(\n                ), self.opacity, self.depth, self.rgb, ws\n\n            @staticmethod\n            @custom_bwd\n            def backward(ctx, dL_dtotal_samples, dL_dopacity, dL_ddepth,\n                         dL_drgb, dL_dws):\n\n                T_threshold = ctx.T_threshold\n                samples_size = ctx.samples_size\n\n                sigma_grad = self.sigma_grad[:samples_size].contiguous()\n                rgb_grad = self.rgb_grad[:samples_size].contiguous()\n\n                self.zero_grad()\n\n                torch2ti_grad(self.opacity_fields, dL_dopacity.contiguous())\n                torch2ti_grad(self.depth_fields, dL_ddepth.contiguous())\n                torch2ti_grad(self.rgb_fields, dL_drgb.contiguous())\n                torch2ti_grad(self.ws_fields, dL_dws.contiguous())\n                composite_train_fw.grad(self.sigmas_fields, self.rgbs_fields,\n                                        self.deltas_fields, self.ts_fields,\n                                        self.rays_a_fields, T_threshold,\n                                        self.T, self.total_samples_fields,\n                                        self.opacity_fields, self.depth_fields,\n                                        self.rgb_fields, self.ws_fields)\n                ti2torch_grad(self.sigmas_fields, sigma_grad)\n                ti2torch_grad(self.rgbs_fields, rgb_grad)\n\n                return sigma_grad, rgb_grad, None, None, None, None\n\n        self._module_function = _module_function\n\n    def zero_grad(self):\n        self.sigmas_fields.grad.fill(0.)\n        self.rgbs_fields.grad.fill(0.)\n        self.T.grad.fill(0.)\n\n\n    def forward(self, sigmas, rgbs, deltas, ts, rays_a, T_threshold):\n        return self._module_function.apply(sigmas, rgbs, deltas, ts, rays_a,\n                                           T_threshold)\n"
  },
  {
    "path": "stable-dreamfusion/tets/README.md",
    "content": "Place the tet grid files in this folder. \nWe provide a few example grids. See the main README.md for a download link.\n\nYou can also generate your own grids using https://github.com/crawforddoran/quartet \nPlease see the `generate_tets.py` script for an example. \n\n"
  },
  {
    "path": "stable-dreamfusion/tets/generate_tets.py",
    "content": "# Copyright (c) 2020-2022 NVIDIA CORPORATION & AFFILIATES. All rights reserved. \n#\n# NVIDIA CORPORATION, its affiliates and licensors retain all intellectual\n# property and proprietary rights in and to this material, related\n# documentation and any modifications thereto. Any use, reproduction, \n# disclosure or distribution of this material and related documentation \n# without an express license agreement from NVIDIA CORPORATION or \n# its affiliates is strictly prohibited.\n\nimport os\nimport numpy as np\n\n\n'''\nThis code segment shows how to use Quartet: https://github.com/crawforddoran/quartet, \nto generate a tet grid \n1) Download, compile and run Quartet as described in the link above. Example usage `quartet meshes/cube.obj 0.5 cube_5.tet`\n2) Run the function below to generate a file `cube_32_tet.tet`\n'''\n\ndef generate_tetrahedron_grid_file(res=32, root='..'):\n    frac = 1.0 / res\n    command = 'cd %s/quartet; ' % (root) + \\\n                './quartet_release meshes/cube.obj %f meshes/cube_%f_tet.tet -s meshes/cube_boundary_%f.obj' % (frac, res, res)\n    os.system(command)\n\n\n'''\nThis code segment shows how to convert from a quartet .tet file to compressed npz file\n'''\ndef convert_from_quartet_to_npz(quartetfile = 'cube_32_tet.tet', npzfile = '32_tets.npz'):\n\n    file1 = open(quartetfile, 'r')\n    header = file1.readline()\n    numvertices = int(header.split(\" \")[1])\n    numtets     = int(header.split(\" \")[2])\n    print(numvertices, numtets)\n\n    # load vertices\n    vertices = np.loadtxt(quartetfile, skiprows=1, max_rows=numvertices)\n    vertices = vertices - 0.5\n    print(vertices.shape, vertices.min(), vertices.max())\n\n    # load indices\n    indices = np.loadtxt(quartetfile, dtype=int, skiprows=1+numvertices, max_rows=numtets)\n    print(indices.shape)\n\n    np.savez_compressed(npzfile, vertices=vertices, indices=indices)\n\nif __name__ == '__main__':\n    import argparse\n    parser = argparse.ArgumentParser()\n    parser.add_argument('--res', type=int, default=32)\n    parser.add_argument('--root', type=str, default='..')\n    args = parser.parse_args()\n\n    generate_tetrahedron_grid_file(res=args.res, root=args.root)\n    convert_from_quartet_to_npz(quartetfile=os.path.join(args.root, 'quartet', 'meshes', f'cube_{args.res}.000000_tet.tet'), npzfile=os.path.join('./tets', f'{args.res}_tets.npz'))"
  }
]