Stochastic transport equation with bounded and Dini continuous drift

Abstract

The results established by Flandoli, Gubinelli and Priola ( Invent. Math. 180 (2010) 1--53) for stochastic transport equation with bounded and H\"older continuous drift are generalized to bounded and Dini continuous drift. The uniqueness of L∞-solutions is established by the It\o--Tanaka trick partially solving the uniqueness problem, which is still open, for stochastic transport equation with only bounded measurable drift. Moreover the existence and uniqueness of stochastic diffeomorphisms flows for a stochastic differential equation with bounded and Dini continuous drift is obtained.