Open AccessThe η-Hermitian solutions to some systems of real quaternion matrix equations
Author(s) -
Xiang Zhang
Publication year - 2022
Publication title -
filomat
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.449
H-Index - 34
eISSN - 2406-0933
pISSN - 0354-5180
DOI - 10.2298/fil2201315z
Subject(s) - quaternion , hermitian matrix , mathematics , quaternion algebra , matrix (chemical analysis) , algebra over a field , pure mathematics , set (abstract data type) , solution set , division algebra , geometry , algebra representation , computer science , materials science , programming language , composite material
Let Hmxn be the set of all m x n matrices over the real quaternion algebra. We call that A ? Hnxn is ?-Hermitian if A = A?* where A?* = -?A*?,? ? {i,j,k},i,j,k are the quaternion units. In this paper, we derive some solvability conditions and the general solution to a system of real quaternion matrix equations. As an application, we present some necessary and sufficient conditions for the existence of an ?-Hermitian solution to some systems of real quaternion matrix equations. We also give the expressions of the general ?-Hermitian solutions to these systems when they are solvable. Some numerical examples are given to illustrate the results of this paper.