Lyapunov exponents for products of matrices

Abstract

Let M=(M1,…, Mk) be a tuple of real d× d matrices. Under certain irreducibility assumptions, we give checkable criteria for deciding whether M possesses the following property: there exist two constants λ∈ R and C>0 such that for any n∈ N and any i1, …, in ∈ \1,…, k\, either Mi1 ·s Min= 0 or C-1 eλ n ≤ \| Mi1 ·s Min \| ≤ C eλ n, where \|·\| is a matrix norm. The proof is based on symbolic dynamics and the thermodynamic formalism for matrix products. As applications, we are able to check the absolute continuity of a class of overlapping self-similar measures on R, the absolute continuity of certain self-affine measures in Rd and the dimensional regularity of a class of sofic affine-invariant sets in the plane.