Numerical analysis of physics-informed neural networks and related models in physics-informed machine learning

IF 16.3 1区 数学 Q1 MATHEMATICS Acta Numerica Pub Date : 2024-09-04 DOI:10.1017/s0962492923000089
Tim De Ryck, Siddhartha Mishra
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Abstract

Physics-informed neural networks (PINNs) and their variants have been very popular in recent years as algorithms for the numerical simulation of both forward and inverse problems for partial differential equations. This article aims to provide a comprehensive review of currently available results on the numerical analysis of PINNs and related models that constitute the backbone of physics-informed machine learning. We provide a unified framework in which analysis of the various components of the error incurred by PINNs in approximating PDEs can be effectively carried out. We present a detailed review of available results on approximation, generalization and training errors and their behaviour with respect to the type of the PDE and the dimension of the underlying domain. In particular, we elucidate the role of the regularity of the solutions and their stability to perturbations in the error analysis. Numerical results are also presented to illustrate the theory. We identify training errors as a key bottleneck which can adversely affect the overall performance of various models in physics-informed machine learning.

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物理信息机器学习中的物理信息神经网络和相关模型的数值分析
物理信息神经网络(PINNs)及其变体作为偏微分方程正演和反演问题数值模拟的算法,近年来非常流行。本文旨在全面综述目前对构成物理信息机器学习支柱的 PINNs 及其相关模型进行数值分析的成果。我们提供了一个统一的框架,在此框架下可以有效地分析 PINN 在逼近 PDE 时产生的各种误差。我们详细回顾了近似误差、泛化误差和训练误差的现有结果,以及它们与 PDE 类型和底层领域维度有关的行为。特别是,我们阐明了解的正则性及其对扰动的稳定性在误差分析中的作用。我们还给出了数值结果,以说明该理论。我们发现训练误差是一个关键瓶颈,会对物理信息机器学习中各种模型的整体性能产生不利影响。
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来源期刊
Acta Numerica
Acta Numerica MATHEMATICS-
CiteScore
26.00
自引率
0.70%
发文量
7
期刊介绍: Acta Numerica stands as the preeminent mathematics journal, ranking highest in both Impact Factor and MCQ metrics. This annual journal features a collection of review articles that showcase survey papers authored by prominent researchers in numerical analysis, scientific computing, and computational mathematics. These papers deliver comprehensive overviews of recent advances, offering state-of-the-art techniques and analyses. Encompassing the entirety of numerical analysis, the articles are crafted in an accessible style, catering to researchers at all levels and serving as valuable teaching aids for advanced instruction. The broad subject areas covered include computational methods in linear algebra, optimization, ordinary and partial differential equations, approximation theory, stochastic analysis, nonlinear dynamical systems, as well as the application of computational techniques in science and engineering. Acta Numerica also delves into the mathematical theory underpinning numerical methods, making it a versatile and authoritative resource in the field of mathematics.
期刊最新文献
Splitting methods for differential equations Adaptive finite element methods The geometry of monotone operator splitting methods Numerical analysis of physics-informed neural networks and related models in physics-informed machine learning Optimal experimental design: Formulations and computations
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