{"title":"Perturbation Analysis on T-Eigenvalues of Third-Order Tensors","authors":"Changxin Mo, Weiyang Ding, Yimin Wei","doi":"10.1007/s10957-024-02444-z","DOIUrl":null,"url":null,"abstract":"<p>This paper concentrates on perturbation theory concerning the tensor T-eigenvalues within the framework of tensor-tensor multiplication. Notably, it serves as a cornerstone for the extension of semidefinite programming into the domain of tensor fields, referred to as T-semidefinite programming. The analytical perturbation analysis delves into the sensitivity of T-eigenvalues for third-order tensors with square frontal slices, marking the first main part of this study. Three classical results from the matrix domain into the tensor domain are extended. Firstly, this paper presents the Gershgorin disc theorem for tensors, demonstrating the confinement of all T-eigenvalues within a union of Gershgorin discs. Afterward, generalizations of the Bauer-Fike theorem are provided, each applicable to different cases involving tensors, including those that are F-diagonalizable and those that are not. Lastly, the Kahan theorem is presented, addressing the perturbation of a Hermite tensor by any tensors. Additionally, the analysis establishes connections between the T-eigenvalue problem and various optimization problems. The second main part of the paper focuses on tensor pseudospectra theory, presenting four equivalent definitions to characterize tensor <span>\\(\\varepsilon \\)</span>-pseudospectra. Accompanied by a thorough analysis of their properties and illustrative visualizations, this section also explores the application of tensor <span>\\(\\varepsilon \\)</span>-pseudospectra in identifying more T-positive definite tensors.</p>","PeriodicalId":50100,"journal":{"name":"Journal of Optimization Theory and Applications","volume":"19 1","pages":""},"PeriodicalIF":1.6000,"publicationDate":"2024-05-10","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Journal of Optimization Theory and Applications","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1007/s10957-024-02444-z","RegionNum":3,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"MATHEMATICS, APPLIED","Score":null,"Total":0}
引用次数: 0
Abstract
This paper concentrates on perturbation theory concerning the tensor T-eigenvalues within the framework of tensor-tensor multiplication. Notably, it serves as a cornerstone for the extension of semidefinite programming into the domain of tensor fields, referred to as T-semidefinite programming. The analytical perturbation analysis delves into the sensitivity of T-eigenvalues for third-order tensors with square frontal slices, marking the first main part of this study. Three classical results from the matrix domain into the tensor domain are extended. Firstly, this paper presents the Gershgorin disc theorem for tensors, demonstrating the confinement of all T-eigenvalues within a union of Gershgorin discs. Afterward, generalizations of the Bauer-Fike theorem are provided, each applicable to different cases involving tensors, including those that are F-diagonalizable and those that are not. Lastly, the Kahan theorem is presented, addressing the perturbation of a Hermite tensor by any tensors. Additionally, the analysis establishes connections between the T-eigenvalue problem and various optimization problems. The second main part of the paper focuses on tensor pseudospectra theory, presenting four equivalent definitions to characterize tensor \(\varepsilon \)-pseudospectra. Accompanied by a thorough analysis of their properties and illustrative visualizations, this section also explores the application of tensor \(\varepsilon \)-pseudospectra in identifying more T-positive definite tensors.
本文在张量-张量乘法的框架内,集中研究了有关张量 T 特征值的扰动理论。值得注意的是,它是将半有限编程扩展到张量域(称为 T-半有限编程)的基石。分析性扰动分析深入探讨了具有正方形前切片的三阶张量的 T 特征值的敏感性,这是本研究的第一个主要部分。本文将三个经典结果从矩阵域扩展到了张量域。首先,本文提出了张量的格什高林圆盘定理,证明了所有 T 特征值都被限制在格什高林圆盘的联合体中。随后,对鲍尔-费克定理进行了概括,每种概括都适用于涉及张量的不同情况,包括可对角化和不可对角化的张量。最后,介绍了卡汉定理,该定理解决了任何张量对赫米特张量的扰动问题。此外,分析还建立了 T 特征值问题与各种优化问题之间的联系。论文的第二大部分集中于张量伪谱理论,提出了四个等价定义来描述张量(\varepsilon \)伪谱的特征。伴随着对其特性的深入分析和可视化说明,这一部分还探讨了张量伪谱在识别更多 T 正定张量中的应用。
期刊介绍:
The Journal of Optimization Theory and Applications is devoted to the publication of carefully selected regular papers, invited papers, survey papers, technical notes, book notices, and forums that cover mathematical optimization techniques and their applications to science and engineering. Typical theoretical areas include linear, nonlinear, mathematical, and dynamic programming. Among the areas of application covered are mathematical economics, mathematical physics and biology, and aerospace, chemical, civil, electrical, and mechanical engineering.