Probability Distance Estimates Between Diffusion Processes and Applications to Singular McKean-Vlasov SDEs

Abstract

The Lk-Wasserstein distance Wk (k 1) and the probability distance W induced by a concave function , are estimated between different diffusion processes with singular coefficients. As applications, the well-posedness, probability distance estimates and the log-Harnack inequality are derived for McKean-Vlasov SDEs with multiplicative distribution dependent noise, where the coefficients are singular in time-space variables and (Wk+W)-Lipschitz continuous in the distribution variable. This improves existing results derived in the literature under the Wk-Lipschitz or derivative conditions in the distribution variable.