Quasi Invariant Stochastic Flows of SDEs with Non-smooth Drifts on Riemannian Manifolds*

Abstract

In this article we prove that stochastic differential equation (SDE) with Sobolev drift on compact Riemannian manifold admits a unique -almost everywhere stochastic invertible flow, where is the Riemannian measure, which is quasi-invariant with respect to . In particular, we extend the well known DiPerna-Lions flows of ODEs to SDEs on Riemannian manifold.