A topological version of Furstenberg-Kesten theorem

Abstract

Let A(x): =(Ai, j(x)) be a continuous function defined on some subshift of := \0,1, ·s, m-1\N, taking d× d non-negative matrices as values and let be an ergodic σ-invariant measure on the subshift where σ is the shift map. Under the condition that A(x)A(σ x)·s A(σ-1 x) is a positive matrix for some point x in the support of and some integer 1 and that every entry function Ai,j(·) is either identically zero or bounded from below by a positive number which is independent of i and j, it is proved that for any -generic point ω∈ , the limit defining the Lyapunov exponent n ∞ n-1 \|A(ω) A(σω)·s A(σn-1ω)\| exists.

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