Level-2 IFS Thermodynamic Formalism: Gibbs probabilities in the space of probabilities and the push-forward map

Abstract

We will denote by M the space of Borel probabilities on the symbolic space =\1,2...,m\N. M is equipped Monge-Kantorovich metric. We consider here the push-forward map T:M M as a dynamical system. The space of Borel probabilities on M is denoted by M. Given a continuous function A: M R, an a priori probability 0 on M, and a certain convolution operation acting on pairs of probabilities on M, we define an associated Level-2 IFS Ruelle operator. We show the existence of an eigenfunction and an eigenprobability ∈M for such an operator. Under a normalization condition for A, we show the existence of some T-invariant probabilities ∈M. We are able to define the variational entropy of such and a related maximization pressure problem associated to A. In some particular examples, we show how to get eigenprobabilities solutions on M for the Level-2 Thermodynamic Formalism problem from eigenprobabilities on M for the classical (Level-1) Thermodynamic Formalism. These examples highlight the fact that our approach is a natural generalization of the classic case.