亥姆霍兹方程和热方程的有限元对偶奇异函数方法

IF 0.3 Q4 MATHEMATICS, APPLIED

Journal of the Korean Society for Industrial and Applied Mathematics Pub Date : 2018-01-01 DOI:10.12941/JKSIAM.2018.22.101

Deok-Kyu Jang, Jae-Hong Pyo

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引用次数: 1

摘要

对偶奇异函数法是求解泊松方程和亥姆霍兹方程含角点最优解的一种数值算法。本文将离散离散调频法应用于求解与时间有关的热方程。由于热方程的DSFM是基于亥姆霍兹方程的DSFM，因此还需要使用ShermanMorrison公式。对于包含n个可重入角的域上的椭圆型问题，该公式需要n + 1次线性求解器。然而，热方程的DSFM只需对标准数值方法每次迭代支付一次线性求解器，并对角点奇点问题实现最优的数值精度。由于Sherman-Morrison公式应用计算比较复杂，我们通过对Sherman-Morrison方法的重新分析，引入了一个简化的公式。

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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FINITE ELEMENT DUAL SINGULAR FUNCTION METHODS FOR HELMHOLTZ AND HEAT EQUATIONS

The dual singular function method(DSFM) is a numerical algorithm to get optimal solution including corner singularities for Poisson and Helmholtz equations. In this paper, we apply DSFM to solve heat equation which is a time dependent problem. Since the DSFM for heat equation is based on DSFM for Helmholtz equation, it also need to use ShermanMorrison formula. This formula requires linear solver n + 1 times for elliptic problems on a domain including n reentrant corners. However, the DSFM for heat equation needs to pay only linear solver once per each time iteration to standard numerical method and perform optimal numerical accuracy for corner singularity problems. Because the Sherman-Morrison formula is rather complicated to apply computation, we introduce a simplified formula by reanalyzing the Sherman-Morrison method.

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来源期刊

Journal of the Korean Society for Industrial and Applied Mathematics MATHEMATICS, APPLIED-

自引率

33.30%

发文量