A new inequality about matrix products and a Berger-Wang formula

Abstract

We prove an inequality relating the norm of a product of matrices An·s A1 with the spectral radii of subproducts Aj·s Ai with 1≤ i≤ j≤ n. Among the consequences of this inequality, we obtain the classical Berger-Wang formula as an immediate corollary, and give an easier proof of a characterization of the upper Lyapunov exponent due to I. Morris. As main ingredient for the proof of this result, we prove that for a large enough n, the product An·s A1 is zero under the hypothesis that Aj·s Ai are nilpotent for all 1≤ i ≤ j≤ n.