Stable weight updating: A key to reliable PDE solutions using deep learning

IF 4.2 2区 工程技术 Q1 ENGINEERING, MULTIDISCIPLINARY
A. Noorizadegan , R. Cavoretto , D.L. Young , C.S. Chen
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引用次数: 0

Abstract

Deep learning techniques, particularly neural networks, have revolutionized computational physics, offering powerful tools for solving complex partial differential equations (PDEs). However, ensuring stability and efficiency remains a challenge, especially in scenarios involving nonlinear and time-dependent equations. This paper introduces novel residual-based architectures, namely the Simple Highway Network and the Squared Residual Network, designed to enhance stability and accuracy in physics-informed neural networks (PINNs). These architectures augment traditional neural networks by incorporating residual connections, which facilitate smoother weight updates and improve backpropagation efficiency. Through extensive numerical experiments across various examples—including linear and nonlinear, time-dependent and independent PDEs—we demonstrate the efficacy of the proposed architectures. The Squared Residual Network, in particular, exhibits robust performance, achieving enhanced stability and accuracy compared to conventional neural networks. These findings underscore the potential of residual-based architectures in advancing deep learning for PDEs and computational physics applications.

稳定的权重更新:利用深度学习获得可靠的 PDE 解决方案的关键
深度学习技术,尤其是神经网络,已经彻底改变了计算物理学,为解决复杂的偏微分方程(PDEs)提供了强大的工具。然而,确保稳定性和效率仍然是一个挑战,尤其是在涉及非线性和时间依赖方程的情况下。本文介绍了基于残差的新型架构,即简单公路网络(Simple Highway Network)和平方残差网络(Squared Residual Network),旨在提高物理信息神经网络(PINN)的稳定性和准确性。这些架构通过加入残差连接来增强传统神经网络,从而使权重更新更平滑,并提高反向传播效率。通过对各种实例(包括线性和非线性、与时间相关和独立的 PDEs)进行广泛的数值实验,我们证明了所提架构的功效。与传统的神经网络相比,平方残差网络尤其表现出强劲的性能,实现了更高的稳定性和准确性。这些发现凸显了基于残差的架构在推进针对 PDE 和计算物理应用的深度学习方面的潜力。
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来源期刊
Engineering Analysis with Boundary Elements
Engineering Analysis with Boundary Elements 工程技术-工程:综合
CiteScore
5.50
自引率
18.20%
发文量
368
审稿时长
56 days
期刊介绍: This journal is specifically dedicated to the dissemination of the latest developments of new engineering analysis techniques using boundary elements and other mesh reduction methods. Boundary element (BEM) and mesh reduction methods (MRM) are very active areas of research with the techniques being applied to solve increasingly complex problems. The journal stresses the importance of these applications as well as their computational aspects, reliability and robustness. The main criteria for publication will be the originality of the work being reported, its potential usefulness and applications of the methods to new fields. In addition to regular issues, the journal publishes a series of special issues dealing with specific areas of current research. The journal has, for many years, provided a channel of communication between academics and industrial researchers working in mesh reduction methods Fields Covered: • Boundary Element Methods (BEM) • Mesh Reduction Methods (MRM) • Meshless Methods • Integral Equations • Applications of BEM/MRM in Engineering • Numerical Methods related to BEM/MRM • Computational Techniques • Combination of Different Methods • Advanced Formulations.
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