Thermodynamics of the Katok Map

Abstract

We effect thermodynamical formalism for the non-uniformly hyperbolic C∞ map of the two dimensional torus known as the Katok map. It is a slowdown of a linear Anosov map near the origin and it is a local (but not small) perturbation. We prove the existence of equilibrium measures for any continuous potential function and obtain uniqueness of equilibrium measures associated to the geometric t-potential t=-t |df|Eu(x)| for any t∈(t0,∞), t≠ 1 where Eu(x) denotes the unstable direction. We show that t0 tends to -∞ as the size of the perturbation tends to zero. Finally, we establish exponential decay of correlations as well as the Central Limit Theorem for the equilibrium measures associated to t for all values of t∈ (t0, 1).