Implementation of DiffDock: Diffusion Steps, Twists, and Turns for Molecular Docking
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Updated
Sep 5, 2024 - Python
Implementation of DiffDock: Diffusion Steps, Twists, and Turns for Molecular Docking
A curated collection of resources and research related to the geometry of representations in the brain, deep networks, and beyond
E(2)-Equivariant CNNs Library for Pytorch
EquiBind: geometric deep learning for fast predictions of the 3D structure in which a small molecule binds to a protein
Geometric GNN Dojo provides unified implementations and experiments to explore the design space of Geometric Graph Neural Networks.
Implementation of E(n)-Equivariant Graph Neural Networks, in Pytorch
Equivariant Steerable CNNs Library for Pytorch https://quva-lab.github.io/escnn/
A Euclidean diffusion model for structure-based drug design.
[NeurIPS'22] Tokenized Graph Transformer (TokenGT), in PyTorch
DiffLinker: Equivariant 3D-Conditional Diffusion Model for Molecular Linker Design
Implementation of SE3-Transformers for Equivariant Self-Attention, in Pytorch. This specific repository is geared towards integration with eventual Alphafold2 replication.
Implementation of Torsional Diffusion for Molecular Conformer Generation (NeurIPS 2022)
A library for programmatically generating equivariant layers through constraint solving
Implementation of the Equiformer, SE3/E3 equivariant attention network that reaches new SOTA, and adopted for use by EquiFold for protein folding
EquiDock: geometric deep learning for fast rigid 3D protein-protein docking
Implementation of E(n)-Transformer, which incorporates attention mechanisms into Welling's E(n)-Equivariant Graph Neural Network
[ECCV 2022] Official PyTorch Code of DEVIANT: Depth Equivariant Network for Monocular 3D Object Detection
A short and easy PyTorch implementation of E(n) Equivariant Graph Neural Networks
Geom3D: Geometric Modeling on 3D Structures, NeurIPS 2023
Equivariant Transformer (ET) layers are image-to-image mappings that incorporate prior knowledge on invariances with respect to continuous transformations groups (ICML 2019). Paper: https://arxiv.org/abs/1901.11399
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