Thermodynamic formalism for dispersing billiards

Abstract

For any finite horizon Sinai billiard map T on the two-torus, we find t*>1 such that for each t in (0,t*) there exists a unique equilibrium state μt for - t JuT, and μt is T-adapted. (In particular, the SRB measure is the unique equilibrium state for - JuT.) We show that μt is exponentially mixing for Holder observables, and the pressure function P(t)=μ \hμ -∫ t JuT d μ\ is analytic on (0,t*). In addition, P(t) is strictly convex if and only if JuT is not μt a.e. cohomologous to a constant, while, if there exist ta tb with μta= μtb, then P(t) is affine on (0,t*). An additional sparse recurrence condition gives t 0 P(t)=P(0).