The least-squares solutions of the matrix equation $ A^{\ast}XB+B^{\ast}X^{\ast}A = D $ and its optimal approximation

Huiting Zhang; Yuying Yuan; Sisi Li; Yongxin Yuan

doi:10.3934/math.2022203

AIMS Mathematics (Jan 2022)

The least-squares solutions of the matrix equation $ A^{\ast}XB+B^{\ast}X^{\ast}A = D $ and its optimal approximation

Huiting Zhang ,
Yuying Yuan,
Sisi Li,
Yongxin Yuan

Affiliations

Huiting Zhang: 1. School of Mathematics and Statistics, Hubei Normal University, Huangshi 435002, China
Yuying Yuan: 2. Library of Hubei Normal University, Huangshi 435002, China
Sisi Li: 1. School of Mathematics and Statistics, Hubei Normal University, Huangshi 435002, China
Yongxin Yuan: 1. School of Mathematics and Statistics, Hubei Normal University, Huangshi 435002, China

DOI: https://doi.org/10.3934/math.2022203
Journal volume & issue: Vol. 7, no. 3
pp. 3680 – 3691

Abstract

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In this paper, the least-squares solutions to the linear matrix equation $ A^{\ast}XB+B^{\ast}X^{\ast}A = D $ are discussed. By using the canonical correlation decomposition (CCD) of a pair of matrices, the general representation of the least-squares solutions to the matrix equation is derived. Moreover, the expression of the solution to the corresponding weighted optimal approximation problem is obtained.

Published in AIMS Mathematics

ISSN: 2473-6988 (Online)
Publisher: AIMS Press
Country of publisher: United States
LCC subjects: Science: Mathematics
Website: http://www.aimspress.com/journal/Math

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