Convergence rates for the p-Wasserstein distance of the empirical measures of an ergodic Markov process

Abstract

Let X:=(Xt)t≥ 0 be an ergodic Markov process on d, and p>0. We derive upper bounds of the p-Wasserstein distance between the invariant measure and the empirical measures of the Markov process X. For this we assume, e.g.\ that the transition semigroup of X is exponentially contractive in terms of the 1-Wasserstein distance, or that the iterated Poincar\'e inequality holds together with certain moment conditions on the invariant measure. Typical examples include diffusions and underdamped Langevin dynamics.

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