Rates in the Central Limit Theorem and diffusion approximation via Stein's Method

Abstract

We present a way to use Stein's method in order to bound the Wasserstein distance of order 2 between two measures and μ supported on Rd such that μ is the reversible measure of a diffusion process. In order to apply our result, we only require to have access to a stochastic process (Xt)t ≥ 0 such that Xt is drawn from for any t > 0. We then show that, whenever μ is the Gaussian measure γ, one can use a slightly different approach to bound the Wasserstein distances of order p ≥ 1 between and γ under an additional exchangeability assumption on the stochastic process (Xt)t ≥ 0. Using our results, we are able to obtain convergence rates for the multi-dimensional Central Limit Theorem in terms of Wasserstein distances of order p ≥ 2. Our results can also provide bounds for steady-state diffusion approximation, allowing us to tackle two problems appearing in the field of data analysis by giving a quantitative convergence result for invariant measures of random walks on random geometric graphs and by providing quantitative guarantees for a Monte Carlo sampling algorithm.