Semi-continuity of Oseledets flags and Pesin sets with exponentially small tails

Abstract

Let f be an invertible transitive subshift of finite type over a bilateral symbol space X, let μ be a Gibbs measure for f determined by a H\"older continuous potential on X, and let A be an invertible continuous linear cocycle over f acting on a continuous d-bundle E over X with Lyapunov exponents λk < λk-1 < … < λ1 such that A-1 is continuous as well. We prove that if the Oseledets flags Fj(x) = Ej(x) Ej-1(x) ·s E1(x) depend upper semi-continuously on x ∈ X, then there exists a Pesin set with exponentially small tails for μ.

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