Computing interior eigenpairs in augmented Krylov subspace produced by Jacobi–Davidson correction equation

IF 0.7 4区 数学 Q3 MATHEMATICS, APPLIED
Kang-Ya Lu, Cun-Qiang Miao
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引用次数: 0

Abstract

As we know, the Jacobi–Davidson iteration method is very efficient for computing both extreme and interior eigenvalues of standard eigenvalue problems. However, the involved Jacobi–Davidson correction equation and the harmonic Rayleigh–Ritz process are more complicated and costly for computing the interior eigenvalues than those for computing the extreme eigenvalues. Thus, in this paper we adopt the originally elegant correction equation to generate the projection subspace in a skillful way, which is used to extract the desired eigenpair by the harmonic Rayleigh–Ritz process. The projection subspace, called as augmented Krylov subspace, inherits the benefits from both the standard Krylov subspace and the Jacobi–Davidson correction equation, which results in the constructed augmented Krylov subspace method being more effective than the Jacobi–Davidson method. A few numerical experiments are executed to exhibit the convergence and the competitiveness of the method.

Abstract Image

计算雅各比-戴维森修正方程产生的增强克雷洛夫子空间中的内部特征对
我们知道,雅各比-戴维森迭代法对于计算标准特征值问题的极值和内部特征值都非常有效。然而,在计算内部特征值时,所涉及的雅各比-戴维森修正方程和谐波雷利-里兹过程比计算极值特征值时更为复杂,成本也更高。因此,本文采用了原本优雅的修正方程,以巧妙的方式生成投影子空间,并通过谐波雷利-里兹过程提取所需的特征对。该投影子空间被称为增强 Krylov 子空间,它继承了标准 Krylov 子空间和 Jacobi-Davidson 修正方程的优点,因此构建的增强 Krylov 子空间方法比 Jacobi-Davidson 方法更有效。通过一些数值实验,展示了该方法的收敛性和竞争力。
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
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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