预条件张量格式求解stein张量方程的共轭梯度平方和双共轭梯度稳定方法

IF 1.8 3区数学 Q1 MATHEMATICS Numerical Linear Algebra with Applications Pub Date : 2023-05-10 DOI:10.1002/nla.2502

Yuhan Chen, Chenliang Li

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引用次数: 0

摘要

本文讨论了控制理论中的高阶Stein张量方程的求解问题。共轭梯度平方（CGS）方法和双共轭梯度稳定（BiCGSTAB）方法是求解线性系统的有吸引力的方法。与大型矩阵方程相比，等效张量方程需要更少的存储空间和计算成本。因此，我们提出了求解高阶Stein张量方程的CGS和BiCGSTAB方法的张量格式。此外，给出了最近Kronecker乘积预条件，并研究了预条件张量格式的方法。最后，通过算例验证了新方法的可行性和有效性。

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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Preconditioned tensor format conjugate gradient squared and biconjugate gradient stabilized methods for solving stein tensor equations

This article is concerned with solving the high order Stein tensor equation arising in control theory. The conjugate gradient squared (CGS) method and the biconjugate gradient stabilized (BiCGSTAB) method are attractive methods for solving linear systems. Compared with the large‐scale matrix equation, the equivalent tensor equation needs less storage space and computational costs. Therefore, we present the tensor formats of CGS and BiCGSTAB methods for solving high order Stein tensor equations. Moreover, a nearest Kronecker product preconditioner is given and the preconditioned tensor format methods are studied. Finally, the feasibility and effectiveness of the new methods are verified by some numerical examples.

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来源期刊

Numerical Linear Algebra with Applications 数学-数学

CiteScore

3.40

自引率

2.30%

发文量

审稿时长

12 months

期刊介绍： Manuscripts submitted to Numerical Linear Algebra with Applications should include large-scale broad-interest applications in which challenging computational results are integral to the approach investigated and analysed. Manuscripts that, in the Editor’s view, do not satisfy these conditions will not be accepted for review. Numerical Linear Algebra with Applications receives submissions in areas that address developing, analysing and applying linear algebra algorithms for solving problems arising in multilinear (tensor) algebra, in statistics, such as Markov Chains, as well as in deterministic and stochastic modelling of large-scale networks, algorithm development, performance analysis or related computational aspects. Topics covered include: Standard and Generalized Conjugate Gradients, Multigrid and Other Iterative Methods; Preconditioning Methods; Direct Solution Methods; Numerical Methods for Eigenproblems; Newton-like Methods for Nonlinear Equations; Parallel and Vectorizable Algorithms in Numerical Linear Algebra; Application of Methods of Numerical Linear Algebra in Science, Engineering and Economics.