On finding strong approximate inverses for tensors

IF 1.8 3区 数学 Q1 MATHEMATICS Numerical Linear Algebra with Applications Pub Date : 2022-07-13 DOI:10.1002/nla.2460
Eisa Khosravi Dehdezi, S. Karimi
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引用次数: 1

Abstract

This article investigates a fast and highly efficient algorithm to find the strong approximation inverse of an invertible tensor. The convergence analysis shows that the proposed method is of ten order of convergence using only six tensor–tensor multiplications per iteration. Also, we obtain a bound for the perturbation error in each iteration. We show that the proposed algorithm can be used for finding the Moore–Penrose and outer inverses of tensors. We obtain the relationship between the singular values of an arbitrary tensor 𝒜 and eigenvalues of the 𝒜∗⋆N𝒜 . We give the computational complexity of our algorithm and prove the theoretical aspects of the article. The generalized Moore–Penrose inverse of tensors is defined. As an application, we use the iteration obtained by the algorithm as preconditioning of the Krylov subspace methods to solve the multilinear system 𝒜⋆N𝒳=ℬ . Several numerical experiments are proposed to show the effectiveness and accuracy of the method. Finally, we give some concluding remarks.
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关于张量的强近似逆的求法
本文研究了一种快速高效的求可逆张量的强近似逆的算法。收敛性分析表明,该方法每次迭代只需6次张量-张量乘法,具有十阶收敛性。同时,得到了每次迭代扰动误差的界。我们证明了该算法可以用于求张量的Moore-Penrose逆和外逆。我们得到了任意张量的奇异值与该张量的特征值之间的关系。我们给出了算法的计算复杂度,并对本文的理论方面进行了证明。定义了张量的广义Moore-Penrose逆。作为应用,我们使用该算法得到的迭代作为Krylov子空间方法的前置条件来求解多元线性系统(方程组):通过数值实验验证了该方法的有效性和准确性。最后,结束语。
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来源期刊
CiteScore
3.40
自引率
2.30%
发文量
50
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.
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