Strong solution for stochastic transport equations with irregular drift: existence and non-existence

Abstract

We prove some existence, uniqueness and non-existence results of stochastic strong solutions for a class of stochastic transport equations with a q-integrable (in time), bounded and α-H\"older continuous (in space) drift coefficient. More precisely, we show that for a Sobolev differentiable initial condition, there exists a unique stochastic strong solution when α>2/q, while for α+1<2/q with spatial dimension higher than one, we can choose proper initial data and drift coefficients so that there is no stochastic strong solutions.