Quasi-invariance of the stochastic flow associated to It\o's SDE with singular time-dependent drift

Abstract

In this paper we consider the It\o SDE d Xt=d Wt+b(t,Xt)\,d t, X0=x∈ Rd, where Wt is a d-dimensional standard Wiener process and the drift coefficient b:[0,T]× Rd Rd belongs to Lq(0,T;Lp( Rd)) with p≥ 2, q>2 and dp + 2q<1. In 2005, Krylov and R\"ockner KR05 proved that the above equation has a unique strong solution Xt. Recently it was shown by Fedrizzi and Flandoli FF13b that the solution Xt is indeed a stochastic flow of homeomorphisms on Rd. We prove in the present work that the Lebesgue measure is quasi-invariant under the flow Xt.