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 $\mathbb{S}1$ and Anosov diffeomorphisms on $d$-torus $\mathbb{T}d$. Let $ν$ be a probability supported on the set of expanding maps on $\mathbb{S}1$ or a neighborhood of a generic Anosov automorphisms on $\mathbb{T}d$. If the Lyapunov spectrum of the $ν$-stationary SRB-measure coincides with the Lyapunov spectrum of the algebraic action, then we can simultaneously linearize $ν$ almost every system to an affine action. Moreover, we prove the positive Lyapunov exponent rigidity for random walks of irreducible positive matrices acting on $\mathbb{T}2$.
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