Transportation-information inequalities for Markov processes

Abstract

In this paper, one investigates the following type of transportation-information TcI inequalities: α(Tc(,μ)) I(|μ) for all probability measures on some metric space (, d), where μ is a given probability measure, Tc(,μ) is the transportation cost from to μ with respect to some cost function c(x,y) on 2, I(|μ) is the Fisher-Donsker-Varadhan information of with respect to μ and α: [0,∞) [0,∞] is some left continuous increasing function. Using large deviation techniques, it is shown that TcI is equivalent to some concentration inequality for the occupation measure of a μ-reversible ergodic Markov process related to I(·|μ), a counterpart of the characterizations of transportation-entropy inequalities, recently obtained by Gozlan and L\'eonard in the i.i.d. case . Tensorization properties of TcI are also derived.