Conditioned limit theorems for hyperbolic dynamical systems
Abstract
Let ( X, T) be a subshift of finite type equipped with the Gibbs measure and let f be a real-valued H\"older continuous function on X such that (f) = 0. Consider the Birkhoff sums Sn f = Σk=0n-1 f Tk, n≥ 1. For any t ∈ R, denote by τtf the first time when the sum t+ Sn f leaves the positive half-line for some n≥ 1. By analogy with the case of random walks with independent identically distributed increments, we study the asymptotic as n∞ of the probabilities (x∈ X: τtf(x)>n) and (x∈ X: τtf(x)=n) . We also establish integral and local type limit theorems for the sum t+ Sn f(x) conditioned on the set \ x ∈ X: τtf(x)>n \.
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