A thermodynamic formalism for continuous time Markov chains with values on the Bernoulli Space: entropy, pressure and large deviations

Abstract

Through this paper we analyze the ergodic properties of continuous time Markov chains with values on the one-dimensional spin lattice 1,...,dN (also known as the Bernoulli space). Initially, we consider as the infinitesimal generator the operator L= LA -I, where LA is a discrete time Ruelle operator (transfer operator), and A:1,...,dN R is a given fixed Lipschitz function. The associated continuous time stationary Markov chain will define thea prioriprobability. Given a Lipschitz interaction V:\1,...,d\ N R, we are interested in Gibbs (equilibrium) state for such V. This will be another continuous time stationary Markov chain. In order to analyze this problem we will use a continuous time Ruelle operator (transfer operator) naturally associated to V. Among other things we will show that a continuous time Perron-Frobenius Theorem is true in the case V is a Lipschitz function. We also introduce an entropy, which is negative, and we consider a variational principle of pressure. Finally, we analyze large deviations properties for the empirical measure in the continuous time setting using results by Y. Kifer.