A Hybrid Neural-Network and MAC Scheme for Stokes Interface Problems

IF 1.2 4区数学 Q2 MATHEMATICS, APPLIED

East Asian Journal on Applied Mathematics Pub Date : 2024-05-01 DOI:10.4208/eajam.2024-006.060424

Che-Chia Chang,Chen-Yang Dai,Wei-Fan Hu,Te-Sheng Lin, Ming-Chih Lai

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引用次数: 0

Abstract

In this paper, we present a hybrid neural-network and MAC (Marker-And-Cell) scheme for solving Stokes equations with singular forces on an embedded interface in regular domains. As known, the solution variables (the pressure and velocity) exhibit non-smooth behaviors across the interface so extra discretization efforts must be paid near the interface in order to have small order of local truncation errors in finite difference schemes. The present hybrid approach avoids such additional difficulty. It combines the expressive power of neural networks with the convergence of finite difference schemes to ease the code implementation and to achieve good accuracy at the same time. The key idea is to decompose the solution into singular and regular parts. The neural network learning machinery incorporating the given jump conditions finds the singular part solution, while the standard MAC scheme is used to obtain the regular part solution with associated boundary conditions. The two- and three-dimensional numerical results show that the present hybrid method converges with second-order accuracy for the velocity and first-order accuracy for the pressure, and it is comparable with the traditional immersed interface method in literature.

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针对斯托克斯接口问题的混合神经网络和 MAC 方案

本文提出了一种混合神经网络和 MAC（标记和单元）方案，用于求解规则域中嵌入界面上具有奇异力的斯托克斯方程。众所周知，求解变量（压力和速度）在整个界面上表现出非光滑行为，因此必须在界面附近付出额外的离散化努力，以便在有限差分方案中获得小阶的局部截断误差。本混合方法避免了这种额外的困难。它将神经网络的表现力与有限差分方案的收敛性结合起来，既简化了代码执行，又达到了良好的精度。其关键思路是将解分解为奇异和规则部分。神经网络学习机制结合给定的跃迁条件找到奇异部分解，而标准 MAC 方案则用于获得带有相关边界条件的规则部分解。二维和三维数值结果表明，本混合方法的速度收敛精度为二阶，压力收敛精度为一阶，与文献中的传统沉浸界面方法不相上下。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

East Asian Journal on Applied Mathematics MATHEMATICS, APPLIED-

CiteScore

2.60

自引率

8.30%

发文量

期刊介绍： The East Asian Journal on Applied Mathematics (EAJAM) aims at promoting study and research in Applied Mathematics in East Asia. It is the editorial policy of EAJAM to accept refereed papers in all active areas of Applied Mathematics and related Mathematical Sciences. Novel applications of Mathematics in real situations are especially welcome. Substantial survey papers on topics of exceptional interest will also be published occasionally.