Strong completeness for a class of stochastic differential equations with irregular coefficients

Abstract

We prove the strong completeness for a class of non-degenerate SDEs, whose coefficients are not necessarily uniformly elliptic nor locally Lipschitz continuous nor bounded. Moreover, for each t, the solution flow Ft is weakly differentiable and for each p>0 there is a positive number T(p) such that for all t<T(p), the solution flow Ft(·) belongs to the Sobolev space W1,p. The main tool for this is the approximation of the associated derivative flow equations. As an application a differential formula is also obtained.