A Ruelle Operator for continuous time Markov Chains

Abstract

We consider a generalization of the Ruelle theorem for the case of continuous time problems. We present a result which we believe is important for future use in problems in Mathematical Physics related to C*-Algebras We consider a finite state set S and a stationary continuous time Markov Chain Xt, t≥ 0, taking values on S. We denote by the set of paths w taking values on S (the elements w are locally constant with left and right limits and are also right continuous on t). We consider an infinitesimal generator L and a stationary vector p0. We denote by P the associated probability on (, B). This is the a priori probability. All functions f we consider bellow are in the set L∞ (P). From the probability P we define a Ruelle operator Lt, t≥ 0, acting on functions f: R of L∞ (P). Given V: R, such that is constant in sets of the form \X0=c\, we define a modified Ruelle operator LVt, t≥ 0. We are able to show the existence of an eigenfunction u and an eigen-probability V on associated to LtV, t≥ 0. We also show the following property for the probability V: for any integrable g∈ L∞ (P) and any real and positive t ∫ e-∫0t (V s)(.) ds [ ( LtV (g)) θt ] d V = ∫ g d V This equation generalize, for the continuous time Markov Chain, a similar one for discrete time systems (and which is quite important for understanding the KMS states of certain C*-algebras).