Equilibrium States, Zero Temperature Limits and Entropy Continuity for Almost-Additive Potentials

Abstract

This paper is devoted to study the equilibrium states for almost-additive potentials defined over topologically mixing countable Markov shifts (that is a non-compact space) without the big images and preimages (BIP) property. Let be an almost-additive and summable potential with bounded variation potential. We prove that there exists an unique equilibrium state μt for each t>1 and there exists an accumulation point μ∞ for the family (μt)t>1 as t∞. We also obtain that the Gurevich pressure PG(t) is C1 on (1,∞) and the Kolmogorov-Sinai entropy h(μt) is continuous at (1,∞). As two applications, we extend completely the results for the zero temperature limit [J. Stat. Phys. ,155 (2014),pp. 23-46] and entropy continuity at infinity [J. Stat. Phys., 126 (2007),pp. 315-324] beyond the finitely primitive case. We also extend the result [Trans. Amer. Math. Soc., 370 (2018), pp. 8451-8465] for almost-additive potentials.