A Characterization of hyperbolic potentials of rational maps

Abstract

Consider a rational map f of degree at least 2 acting on its Julia set J(f), a H\"older continuous potential φ: J(f)→ and the pressure P(f,φ). In the case where J(f)φ<P(f,phi), the uniqueness and stochastic properties of the corresponding equilibrium states have been extensively studied. In this paper we characterize those potentials φ for which this property is satisfied for some iterate of f$, in terms of the expanding properties of the corresponding equilibrium states. A direct consequence of this result is that for a nonuniformly hyperbolic rational map every H\"older continuous potential has a unique equilibrium state and that this measure is exponentially mixing.