On an Analogue of a Property of Singular M-matrices, for the Lyapunov and the Stein Operators
Abstract
In the setting of real square matrices, it is known that, if A is a singular irreducible M-matrix, then the only nonnegative vector that belongs to the range space of A is the zero vector. In this paper, we prove an analogue of this result for the Lyapunov and the Stein operators.
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