Generalization of Roth's solvability criteria to systems of matrix equations

Abstract

W.E. Roth (1952) proved that the matrix equation AX-XB=C has a solution if and only if the matrices [matrixA&C\\0&Bmatrix] and [matrixA&0\\0&Bmatrix] are similar. A. Dmytryshyn and B. Kgstr\"om (2015) extended Roth's criterion to systems of matrix equations AiXi'Mi-NiXi''σi Bi=Ci (i=1,…,s) with unknown matrices X1,…,Xt, in which every Xσ is X, XT, or X*. We extend their criterion to systems of complex matrix equations that include the complex conjugation of unknown matrices. We also prove an analogous criterion for systems of quaternion matrix equations.