一类奇异Hermitian矩阵特征值反问题的溶解性存在性

Emmanuel Akweittey, Kwasi Baah Gyamfi, Gabriel Obed Fosu
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引用次数: 1

摘要

本文讨论了一类特征值反问题的秩大于或等于4的奇异厄米矩阵。具体地说,我们研究如何从一个规定的谱生成n × n的秩4和秩5的奇异厄米矩阵。在每种情况下都给出了数值例子来说明这些场景。证明了给定一个规定的谱基准并与之相乘,则n × n秩为r的奇异厄米特矩阵的特征值反问题的溶解度存在。
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Solubility Existence of Inverse Eigenvalue Problem for a Class of Singular Hermitian Matrices
In this article, we discuss singular Hermitian matrices of rank greater or equal to four for an inverse eigenvalue problem. Specifically, we look into how to generate n by n singular Hermitian matrices of ranks four and five from a prescribed spectrum. Numerical examples are presented in each case to illustrate these scenarios. It was established that given a prescribed spectral datum and it multiplies, then the solubility of the inverse eigenvalue problem for n by n singular Hermitian matrices of rank r exists.
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