Topological Pressure for Locally Compact Metrizable Systems

Abstract

It is widely known that when X is compact Hausdorff, and when T: X X and f: X R are continuous, equation* P(T,f) = μ: Radon probability ( hμ(T) + ∫ f\, dμ ), equation* where P(T,f) is the "topological pressure" and hμ(T) is the measure theoretic entropy of T with respect to μ. This result is known as "variational principle". We generalize the concept of "topological pressure" for the case where X is a separable locally compact metric space. Our definitions are quite similar to those used in the compact case. Our main result is the validity of the "variational principle".