A uniform estimate for rate functions in large deviations

Abstract

Given H\"older continuous functions f and on a sub-shift of finite type A+ such that is not cohomologous to a constant, the classical large deviation principle holds (OP, Kif, Y) with a rate function I≥ 0 such that I (p) = 0 iff p = ∫ \, d μ, where μ = μf is the equilibrium state of f. In this paper we derive a uniform estimate from below for I for p outside an interval containing = ∫ \, dμ, which depends only on the sub-shift, the function f, the norm ||∞, the H\"older constant of and the integral . Similar results can be derived in the same way e.g. for Axiom A diffeomorphisms on basic sets.