Lyapunov spectrum rigidity and simultaneous linearization for random Anosov diffeomorphisms

Abstract

In this paper we study the Lyapunov spectrum rigidity for random walks of expanding maps on unit circle S1 and Anosov diffeomorphisms on d-torus Td. Let be a probability supported on the set of expanding maps on S1 or a neighborhood of a generic Anosov automorphisms on Td. If the Lyapunov spectrum of the -stationary SRB-measure coincides with the Lyapunov spectrum of the algebraic action, then we can simultaneously linearize almost every system to an affine action. Moreover, we prove the positive Lyapunov exponent rigidity for random walks of irreducible positive matrices acting on T2.