Wasserstein distance estimates for the distributions of numerical approximations to ergodic stochastic differential equations

Abstract

We present a framework that allows for the non-asymptotic study of the 2-Wasserstein distance between the invariant distribution of an ergodic stochastic differential equation and the distribution of its numerical approximation in the strongly log-concave case. This allows us to study in a unified way a number of different integrators proposed in the literature for the overdamped and underdamped Langevin dynamics. In addition, we analyse a novel splitting method for the underdamped Langevin dynamics which only requires one gradient evaluation per time step. Under an additional smoothness assumption on a d--dimensional strongly log-concave distribution with condition number , the algorithm is shown to produce with an O(5/4 d1/4ε-1/2 ) complexity samples from a distribution that, in Wasserstein distance, is at most ε>0 away from the target distribution.