中心对称普遍可实现性

Pub Date : 2021-11-03 DOI:10.13001/ela.2021.5781

Ana Julio, Yankis R. Linares, R. Soto

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引用次数: 0

摘要

如果复数的列表$\Lambda =\{\lambda_{1},\ldots,\lambda_{n}\}$是一个入口非负矩阵$A$的谱，那么它就是可实现的。在这种情况下，$A$被认为是一个实现矩阵。如果对于$\Lambda$所允许的每一种可能的乔丹规范形式(JCF)都是可实现的，那么$\Lambda$被认为是普遍可实现的。光谱的普遍可实现性问题称为普遍可实现性问题。在这里，我们研究中心对称URP，即为给定列表$\Lambda $允许的每个JCF找到一个非负中心对称矩阵的问题。特别地，给出了中心对称URP有解的充分条件。

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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Centrosymmetric universal realizability

A list $\Lambda =\{\lambda_{1},\ldots,\lambda_{n}\}$ of complex numbers is said to be realizable, if it is the spectrum of an entrywise nonnegative matrix $A$. In this case, $A$ is said to be a realizing matrix. $\Lambda$ is said to be universally realizable, if it is realizable for each possible Jordan canonical form (JCF) allowed by $\Lambda$. The problem of the universal realizability of spectra is called the universal realizability problem (URP). Here, we study the centrosymmetric URP, that is, the problem of finding a nonnegative centrosymmetric matrix for each JCF allowed by a given list $\Lambda $. In particular, sufficient conditions for the centrosymmetric URP to have a solution are generated.

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