Can an infinite left-product of nonnegative matrices be expressed in terms of infinite left-products of stochastic ones?

Abstract

If a left-product Mn... M1 of square complex matrices converges to a nonnull limit when n∞ and if the Mn belong to a finite set, it is clear that there exists an integer n0 such that the Mn, n n0, have a common right-eigenvector V for the eigenvalue 1. Now suppose that the Mn are nonnegative and that V has positive entries. Denoting by the diagonal matrix whose diagonal entries are the entries of V, the stochastic matrices Sn=-1Mn satisfy Mn... Mn0= Sn... Sn0-1, so the problem of the convergence of Mn... M1 reduces to the one of Sn... Sn0. In this paper we still suppose that the Mn are nonnegative but we do not suppose that V has positive entries. The first section details the case of the 2×2 matrices, and the last gives a first approach in the case of d× d matrices.