Limit behavior of the invariant measure for Langevin dynamics

Abstract

In this manuscript, we consider the Langevin dynamics on Rd with an overdamped vector field and driven by multiplicative Brownian noise of small amplitude ε, ε>0. Under suitable assumptions on the vector field and the diffusion coefficient, it is well-known that it possesses a unique invariant probability measure με. As ε tends to zero, we prove that the probability measure εd/2 με(εd x) converges in the p-Wasserstein distance for p∈ [1,2] to a Gaussian measure with zero-mean vector and non-degenerate covariance matrix which solves a Lyapunov matrix equation. Moreover, the error term is estimated. We emphasize that generically no explicit formula for με can be found.