求解 PDE 的新范例:多尺度神经计算

IF 3.8 2区 工程技术 Q1 ENGINEERING, MECHANICAL
Wei Suo  (, ), Weiwei Zhang  (, )
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引用次数: 0

摘要

数值模拟在求解偏微分方程(PDEs)中占主导地位,但如何在细粒度网格与低计算成本之间取得平衡是一项挑战。最近,用神经网络(NN)求解偏微分方程越来越受到关注,但成本效益和高精度仍然是一个挑战。考虑到神经网络的频谱偏差和有限差分法(FDM)中的局部逼近特性,这项研究引入了一种用于求解 PDE 的新范例,称为多尺度神经计算(MSNC)。MSNC 将解法分解为有效捕捉全局尺度的神经网络和详细描述局部尺度的有限差分法,旨在平衡成本和精度。与标准 FDM 相比,MSNC 的优势包括更高的精度(1D PDE 的 10 倍,2D PDE 的 20 倍)和更低的成本(1D PDE 的 4 倍,2D PDE 的 16 倍)。MSNC 还表现出稳定的收敛性和严格的边界条件满足,展示了 NN 和数值方法混合的潜力。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A novel paradigm for solving PDEs: multi-scale neural computing

Numerical simulation is dominant in solving partial differential equations (PDEs), but balancing fine-grained grids with low computational costs is challenging. Recently, solving PDEs with neural networks (NNs) has gained interest, yet cost-effectiveness and high accuracy remain a challenge. This work introduces a novel paradigm for solving PDEs, called multi-scale neural computing (MSNC), considering spectral bias of NNs and local approximation properties in the finite difference method (FDM). The MSNC decomposes the solution with a NN for efficient capture of global scale and the FDM for detailed description of local scale, aiming to balance costs and accuracy. Demonstrated advantages include higher accuracy (10 times for 1D PDEs, 20 times for 2D PDEs) and lower costs (4 times for 1D PDEs, 16 times for 2D PDEs) than the standard FDM. The MSNC also exhibits stable convergence and rigorous boundary condition satisfaction, showcasing the potential for hybrid of NN and numerical method.

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来源期刊
Acta Mechanica Sinica
Acta Mechanica Sinica 物理-工程:机械
CiteScore
5.60
自引率
20.00%
发文量
1807
审稿时长
4 months
期刊介绍: Acta Mechanica Sinica, sponsored by the Chinese Society of Theoretical and Applied Mechanics, promotes scientific exchanges and collaboration among Chinese scientists in China and abroad. It features high quality, original papers in all aspects of mechanics and mechanical sciences. Not only does the journal explore the classical subdivisions of theoretical and applied mechanics such as solid and fluid mechanics, it also explores recently emerging areas such as biomechanics and nanomechanics. In addition, the journal investigates analytical, computational, and experimental progresses in all areas of mechanics. Lastly, it encourages research in interdisciplinary subjects, serving as a bridge between mechanics and other branches of engineering and the sciences. In addition to research papers, Acta Mechanica Sinica publishes reviews, notes, experimental techniques, scientific events, and other special topics of interest. Related subjects » Classical Continuum Physics - Computational Intelligence and Complexity - Mechanics
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