A Large Deviation Principle for Gibbs States on Markov Shifts at Zero Temperature

Abstract

Let A(N) be a topologically mixing countable Markov shift with the BIP property over the alphabet N and f: A(N) → R a potential satisfying the Walters condition with finite Gurevich pressure. Under suitable hypotheses, we prove the existence of a Large Deviation Principle for the family (μβ)β > 0 where each μβ is the Gibbs measure associated to the potential β f. Our main theorem generalizes from finite to countable alphabets and also to a larger class of potentials a previous result of A. Baraviera, A. O. Lopes and P. Thieullen.