关于大石线性化伽勒金方程最小奇异值下限的说明

IF 0.7 4区 数学 Q3 MATHEMATICS, APPLIED
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引用次数: 0

摘要

摘要 大石最近发表了一篇论文,提出了线性化 Galerkin 方程系数矩阵最小奇异值的下界,而线性化 Galerkin 方程系数矩阵又是在计算具有某些平滑非线性的非线性延迟微分方程的周期解时出现的。线性化 Galerkin 方程的系数矩阵可能很大,因此计算最小奇异值的有效下界可能代价高昂。大石的方法基于一个小的左上主子矩阵的逆,随后的计算使用舒尔补集,计算成本较低。本论文删除了一些假设,并改进了边界。此外,本文还推导出一种技术,可以大幅降低总计算成本,从而可以处理无限维矩阵。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A note on Oishi’s lower bound for the smallest singular value of linearized Galerkin equations

Abstract

Recently Oishi published a paper allowing lower bounds for the minimum singular value of coefficient matrices of linearized Galerkin equations, which in turn arise in the computation of periodic solutions of nonlinear delay differential equations with some smooth nonlinearity. The coefficient matrix of linearized Galerkin equations may be large, so the computation of a valid lower bound of the smallest singular value may be costly. Oishi’s method is based on the inverse of a small upper left principal submatrix, and subsequent computations use a Schur complement with small computational cost. In this note some assumptions are removed and the bounds improved. Furthermore a technique is derived to reduce the total computationally cost significantly allowing to treat infinite dimensional matrices.

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来源期刊
CiteScore
1.50
自引率
11.10%
发文量
56
审稿时长
>12 weeks
期刊介绍: Japan Journal of Industrial and Applied Mathematics (JJIAM) is intended to provide an international forum for the expression of new ideas, as well as a site for the presentation of original research in various fields of the mathematical sciences. Consequently the most welcome types of articles are those which provide new insights into and methods for mathematical structures of various phenomena in the natural, social and industrial sciences, those which link real-world phenomena and mathematics through modeling and analysis, and those which impact the development of the mathematical sciences. The scope of the journal covers applied mathematical analysis, computational techniques and industrial mathematics.
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