Relation between the T-congruence Sylvester equation and the generalized Sylvester equation

Abstract

The T-congruence Sylvester equation is the matrix equation AX+XTB=C, where A∈Rm× n, B∈Rn× m, and C∈Rm× m are given, and X∈Rn× m is to be determined. Recently, Oozawa et al. discovered a transformation that the matrix equation is equivalent to one of the well-studied matrix equations (the Lyapunov equation); however, the condition of the transformation seems to be too limited because matrices A and B are assumed to be square matrices (m=n). In this paper, two transformations are provided for rectangular matrices A and B. One of them is an extension of the result of Oozawa et al. for the case m n, and the other is a novel transformation for the case m n.