Lyapunov eponents and strong exponential tails for some contact Anosov flows

Abstract

For the time-one map f of a contact Anosov flow on a compact Riemann manifold M, satisfying a certain regularity condition, we show that given a Gibbs measure on M, a sufficiently large Pesin regular set P0 and an arbitrary δ ∈ (0,1), there exist positive constants C and c such that for any integer n ≥ 1, the measure of the set of those x∈ M with fk(x) P0 for at least δ n values of k = 0,1, …,n-1 does not exceed C e-cn.