A system of k Sylvester-type quaternion matrix equations with 3k+1 variables

Abstract

In this paper, we provide some solvability conditions in terms of ranks for the existence of a general solution to a system of k Sylvester-type quaternion matrix equations with 3k+1 variables AiXi+YiBi+CiZiDi+FiZi+1Gi=Ei,~i=1,k. As applications of this system, we present rank equalities as the necessary and sufficient conditions for the existence of a general solution to some systems of quaternion matrix equations AiXi+(AiXi)φ+CiZi(Ci)φ+FiZi+1(Fi)φ=Ei,~i=1,k.