Wasserstein Convergence Rate for Empirical Measures on Noncompact Manifolds

Abstract

Let Xt be the (reflecting) diffusion process generated by L:=+∇ V on a complete connected Riemannian manifold M possibly with a boundary ∂ M, where V∈ C1(M) such that μ(d x):= eV(x)d x is a probability measure. We estimate the convergence rate for the empirical measure μt:= 1 t ∫0t δXs s under the Wasserstein distance. As a typical example, when M= Rd and V(x)= c1- c2 |x|p for some constants c1∈ R, c2>0 and p>1, the explicit upper and lower bounds are present for the convergence rate, which are of sharp order when either d<4(p-1)p or d 4 and p∞.