Exponential Convergence in Lp-Wasserstein Distance for Diffusion Processes without Uniformly Dissipative Drift

Abstract

By adopting the coupling by reflection and choosing an auxiliary function which is convex near infinity, we establish the exponential convergence of diffusion semigroups (Pt)t0 with respect to the standard Lp-Wasserstein distance for all p∈[1,∞). In particular, we show that for the It\o stochastic differential equation Xt= Bt+b(Xt)\, t, if the drift term b satisfies that for any x,y∈d, b(x)-b(y),x-y cases K1|x-y|2,& |x-y| L; -K2|x-y|2,& |x-y|> L cases holds with some positive constants K1, K2 and L>0, then there is a constant λ:=λ(K1,K2,L)>0 such that for all p∈[1,∞), t>0 and x,y∈d, Wp(δx Pt,δy Pt)≤ Ce-λ t/p cases |x-y|1/p, & if |x-y| 1; |x-y|, & if |x-y|> 1. cases where C:=C(K1,K2,L,p) is a positive constant. This improves the main result in Eberle where the exponential convergence is only proved for the L1-Wasserstein distance.