Related papers: Learning Mechanically Driven Emergent Behavior with Message Passing Neural Networks

Learning Mechanically Driven Emergent Behavior with Message Passing Neural Networks

URL: http://arxiv.org/abs/2202.01380v1
Date: Thu, 3 Feb 2022 02:46:16 GMT
Title: Learning Mechanically Driven Emergent Behavior with Message Passing Neural Networks
Authors: Peerasait Prachaseree, Emma Lejeune
Abstract summary: We introduce the Asymmetric Buckling Columns dataset. The goal is to classify the direction of symmetry breaking under compression after the onset of instability. In addition to investigating GNN model architecture, we study the effect of different input data representation approaches.
Score: 0.0
License: http://creativecommons.org/licenses/by-sa/4.0/
Abstract: From designing architected materials to connecting mechanical behavior across scales, computational modeling is a critical tool in solid mechanics. Recently, there has been a growing interest in using machine learning to reduce the computational cost of physics-based simulations. Notably, while machine learning approaches that rely on Graph Neural Networks (GNNs) have shown success in learning mechanics, the performance of GNNs has yet to be investigated on a myriad of solid mechanics problems. In this work, we examine the ability of GNNs to predict a fundamental aspect of mechanically driven emergent behavior: the connection between a column's geometric structure and the direction that it buckles. To accomplish this, we introduce the Asymmetric Buckling Columns (ABC) dataset, a dataset comprised of three sub-datasets of asymmetric and heterogeneous column geometries where the goal is to classify the direction of symmetry breaking (left or right) under compression after the onset of instability. Because of complex local geometry, the "image-like" data representations required for implementing standard convolutional neural network based metamodels are not ideal, thus motivating the use of GNNs. In addition to investigating GNN model architecture, we study the effect of different input data representation approaches, data augmentation, and combining multiple models as an ensemble. While we were able to obtain good results, we also showed that predicting solid mechanics based emergent behavior is non-trivial. Because both our model implementation and dataset are distributed under open-source licenses, we hope that future researchers can build on our work to create enhanced mechanics-specific machine learning pipelines for capturing the behavior of complex geometric structures.

Related papers

Similarity Equivariant Graph Neural Networks for Homogenization of Metamaterials [3.6443770850509423]
Soft, porous mechanical metamaterials exhibit pattern transformations that may have important applications in soft robotics, sound reduction and biomedicine. We develop a machine learning-based approach that scales favorably to serve as a surrogate model. We show that this network is more accurate and data-efficient than graph neural networks with fewer symmetries.
arXiv Detail & Related papers (2024-04-26T12:30:32Z)
Physics-Encoded Graph Neural Networks for Deformation Prediction under Contact [87.69278096528156]
In robotics, it's crucial to understand object deformation during tactile interactions. We introduce a method using Physics-Encoded Graph Neural Networks (GNNs) for such predictions. We've made our code and dataset public to advance research in robotic simulation and grasping.
arXiv Detail & Related papers (2024-02-05T19:21:52Z)
A quatum inspired neural network for geometric modeling [14.214656118952178]
We introduce an innovative equivariant Matrix Product State (MPS)-based message-passing strategy. Our method effectively models complex many-body relationships, suppressing mean-field approximations. It seamlessly replaces the standard message-passing and layer-aggregation modules intrinsic to geometric GNNs.
arXiv Detail & Related papers (2024-01-03T15:59:35Z)
A Hitchhiker's Guide to Geometric GNNs for 3D Atomic Systems [87.30652640973317]
Recent advances in computational modelling of atomic systems represent them as geometric graphs with atoms embedded as nodes in 3D Euclidean space. Geometric Graph Neural Networks have emerged as the preferred machine learning architecture powering applications ranging from protein structure prediction to molecular simulations and material generation. This paper provides a comprehensive and self-contained overview of the field of Geometric GNNs for 3D atomic systems.
arXiv Detail & Related papers (2023-12-12T18:44:19Z)
Torsion Graph Neural Networks [21.965704710488232]
We propose TorGNN, an analytic torsion enhanced Graph Neural Network model. In our TorGNN, for each edge, a corresponding local simplicial complex is identified, then the analytic torsion is calculated. It has been found that our TorGNN can achieve superior performance on both tasks, and outperform various state-of-the-art models.
arXiv Detail & Related papers (2023-06-23T15:02:23Z)
FAENet: Frame Averaging Equivariant GNN for Materials Modeling [123.19473575281357]
We introduce a flexible framework relying on frameaveraging (SFA) to make any model E(3)-equivariant or invariant through data transformations. We prove the validity of our method theoretically and empirically demonstrate its superior accuracy and computational scalability in materials modeling.
arXiv Detail & Related papers (2023-04-28T21:48:31Z)
Sample Efficient Dynamics Learning for Symmetrical Legged Robots:Leveraging Physics Invariance and Geometric Symmetries [14.848950116410231]
This paper proposes a novel approach for learning dynamics leveraging the symmetry in the underlying robotic system. Existing frameworks that represent all data in vector space fail to consider the structured information of the robot.
arXiv Detail & Related papers (2022-10-13T19:57:46Z)
Learning Physical Dynamics with Subequivariant Graph Neural Networks [99.41677381754678]
Graph Neural Networks (GNNs) have become a prevailing tool for learning physical dynamics. Physical laws abide by symmetry, which is a vital inductive bias accounting for model generalization. Our model achieves on average over 3% enhancement in contact prediction accuracy across 8 scenarios on Physion and 2X lower rollout MSE on RigidFall.
arXiv Detail & Related papers (2022-10-13T10:00:30Z)
Learning the nonlinear dynamics of soft mechanical metamaterials with graph networks [3.609538870261841]
We propose a machine learning approach to study the dynamics of soft mechanical metamaterials. The proposed approach can significantly reduce the computational cost when compared to direct numerical simulation.
arXiv Detail & Related papers (2022-02-24T00:20:28Z)
Graph Kernel Neural Networks [53.91024360329517]
We propose to use graph kernels, i.e. kernel functions that compute an inner product on graphs, to extend the standard convolution operator to the graph domain. This allows us to define an entirely structural model that does not require computing the embedding of the input graph. Our architecture allows to plug-in any type of graph kernels and has the added benefit of providing some interpretability.
arXiv Detail & Related papers (2021-12-14T14:48:08Z)
GeoMol: Torsional Geometric Generation of Molecular 3D Conformer Ensembles [60.12186997181117]
Prediction of a molecule's 3D conformer ensemble from the molecular graph holds a key role in areas of cheminformatics and drug discovery. Existing generative models have several drawbacks including lack of modeling important molecular geometry elements. We propose GeoMol, an end-to-end, non-autoregressive and SE(3)-invariant machine learning approach to generate 3D conformers.
arXiv Detail & Related papers (2021-06-08T14:17:59Z)

This list is automatically generated from the titles and abstracts of the papers in this site.