NeuFENet:带参数 PDE 理论边界的神经有限元解决方案

IF 8.7 2区 工程技术 Q1 Mathematics Engineering with Computers Pub Date : 2024-04-10 DOI:10.1007/s00366-024-01955-7
Biswajit Khara, Aditya Balu, Ameya Joshi, Soumik Sarkar, Chinmay Hegde, Adarsh Krishnamurthy, Baskar Ganapathysubramanian
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引用次数: 0

摘要

我们考虑采用基于网格的方法来训练神经网络,以便对参数偏微分方程(PDE)的解进行现场预测。这种方法与当前的 "神经 PDE 求解器 "方法形成鲜明对比,后者采用基于拼位的方法对 PDE 的解进行点预测。这种方法的优势在于可以自然地强制执行不同的边界条件,并且易于引用成熟的 PDE 理论--包括数值稳定性和收敛性分析--来获得我们所提出的神经网络在离散域中的容量边界。我们使用基于参数椭圆 PDE 的有限元法 (FEM) 的加权 Galerkin 损失函数,探索了基于网格的策略(NeuFENet)。加权 Galerkin 损失(FEM 损失)类似于能量函数,它能产生改进的解,满足先验网格收敛,并能模拟 Dirichlet 和 Neumann 边界条件。我们从理论上证明了收敛结果,并通过实验说明了类似于用于有限元求解 PDE 的网格收敛分析的收敛结果。这些结果表明,基于网格的神经网络方法是解决具有理论边界的参数 PDE 的一种有前途的方法。
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NeuFENet: neural finite element solutions with theoretical bounds for parametric PDEs

We consider a mesh-based approach for training a neural network to produce field predictions of solutions to parametric partial differential equations (PDEs). This approach contrasts current approaches for “neural PDE solvers” that employ collocation-based methods to make pointwise predictions of solutions to PDEs. This approach has the advantage of naturally enforcing different boundary conditions as well as ease of invoking well-developed PDE theory—including analysis of numerical stability and convergence—to obtain capacity bounds for our proposed neural networks in discretized domains. We explore our mesh-based strategy, called NeuFENet, using a weighted Galerkin loss function based on the Finite Element Method (FEM) on a parametric elliptic PDE. The weighted Galerkin loss (FEM loss) is similar to an energy functional that produces improved solutions, satisfies a priori mesh convergence, and can model Dirichlet and Neumann boundary conditions. We prove theoretically, and illustrate with experiments, convergence results analogous to mesh convergence analysis deployed in finite element solutions to PDEs. These results suggest that a mesh-based neural network approach serves as a promising approach for solving parametric PDEs with theoretical bounds.

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来源期刊
Engineering with Computers
Engineering with Computers 工程技术-工程:机械
CiteScore
16.50
自引率
2.30%
发文量
203
审稿时长
9 months
期刊介绍: Engineering with Computers is an international journal dedicated to simulation-based engineering. It features original papers and comprehensive reviews on technologies supporting simulation-based engineering, along with demonstrations of operational simulation-based engineering systems. The journal covers various technical areas such as adaptive simulation techniques, engineering databases, CAD geometry integration, mesh generation, parallel simulation methods, simulation frameworks, user interface technologies, and visualization techniques. It also encompasses a wide range of application areas where engineering technologies are applied, spanning from automotive industry applications to medical device design.
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