Convergence Rates in Uniform Ergodicity by Hitting Times and L2-exponential Convergence Rates

Abstract

Generally the convergence rate in exponential ergodicity λ is an upper bound for the convergence rate in uniform ergodicity for a Markov process, that is λ≥slant. In this paper, we prove that ≥slant ∈f \lambda,1/MH\, where MH is a uniform bound on the moment of the hitting time to a "compact" set H. In the case where MH can be made arbitrarily small for H large enough, we obtain that λ=. The general results are applied to Markov chains, diffusion processes and solutions to SDEs driven by symmetric stable processes.