Extreme ranks of a linear quaternion matrix expression subject to triple quaternion matrix equations with applications

作者:

Highlights:

摘要

In this paper, we establish the formulas of the maximal and minimal ranks of the quaternion matrix expression C4-A4XB4 where X is a variant quaternion matrix subject to quaternion matrix equations A1X=C1,XB2=C2,A3XB3=C3. As applications, we give a new necessary and sufficient condition for the existence of solutions to the system of matrix equations A1X=C1,XB2=C2,A3XB3=C3,A4XB4=C4, which was investigated by Wang [Q.W. Wang, A system of four matrix equations over von Neumann regular rings and its applications, Acta Math. Sin., 21(2) (2005) 323–334], by rank equalities. In addition, extremal ranks of the generalized Schur complement D-CA-B with respect to an inner inverse A− of A, which is a common solution to quaternion matrix equations A1X=C1,XB2=C2, are also considered. Some previous known results can be viewed as special cases of the results of this paper.

论文关键词:System of quaternion matrix equations,Minimal rank,Maximal rank,Linear matrix expression,Generalized inverse,Schur complement

论文评审过程:Available online 17 May 2007.

论文官网地址:https://doi.org/10.1016/j.amc.2007.05.018