Extending EP matrices by means of recent generalized inverses

arXiv - MATH - Rings and Algebras Pub Date : 2024-01-17 DOI:arxiv-2401.09106
D. E. Ferreyra, F. E. Levis, A. N. Priori, N. Thome
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引用次数: 0

Abstract

It is well known that a square complex matrix is called EP if it commutes with its Moore-Penrose inverse. In this paper, new classes of matrices which extend this concept are characterized. For that, we consider commutative equalities given by matrices of arbitrary index and generalized inverses recently investigated in the literature. More specifically, these classes are characterized by expressions of type $A^mX=XA^m$, where $X$ is an outer inverse of a given complex square matrix $A$ and $m$ is an arbitrary positive integer. The relationships between the different classes of matrices are also analyzed. Finally, a picture presents an overview of the overall studied classes.
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通过最近的广义倒数扩展 EP 矩阵
众所周知,如果一个正方形复矩阵与其摩尔-彭罗斯逆矩阵相乘,则该矩阵被称为 EP。本文描述了扩展这一概念的新类矩阵。为此,我们考虑了由任意指数矩阵和文献中最近研究的广义逆矩阵给出的交换不等式。更具体地说,这些类别由 $A^mX=XA^m$ 类型的表达式表征,其中 $X$ 是给定复方阵 $A$ 的外逆,$m$ 是任意正整数。本文还分析了不同类别矩阵之间的关系。
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arXiv - MATH - Rings and Algebras
arXiv - MATH - Rings and Algebras
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