Unique equilibrium states, large deviations and Lyapunov spectra for the Katok Map

Abstract

We study the thermodynamic formalism of a C∞ non-uniformly hyperbolic diffeomorphism on the 2-torus, known as the Katok map. We prove for a H\"older continuous potential with one additional condition, or the geometric t-potential t with t<1, the equilibrium state exists and is unique. We derive the level-2 large deviation principle for the equilibrium state of t. We study the multifractal spectra of the Katok map for the entropy and dimension of level sets of Lyapunov exponents.