Stochastic flows for H\"older drifts and transport/continuity equations with noise

Abstract

We prove existence of a stochastic flow of diffeomorphisms generated by SDEs with drift in Lqt C0, αx for any q ∈ [2, ∞) and α ∈ (0, 1). This result is achieved using a Zvonkin-type transformation for the SDE. As a key intermediate step, well-posedness and optimal regularity for a class of parabolic PDEs related to the transformation is established. Using the existence of a differentiable stochastic flow, we prove well-posedness of BVloc-solutions of stochastic transport equations and weak solutions of stochastic continuity equations with so-called transport noise and velocity fields in Lqt C0, αx. For both equations, solutions may fail to be unique in the deterministic setting.