A Wong-Zakai theorem for SDEs with singular drift

Abstract

We study stochastic differential equations (SDEs) with multiplicative Stratonovich-type noise of the form dXt = b(Xt) dt + σ(Xt) d Wt, X0=x0∈Rd, t≥0, with a possibly singular drift b∈ Lp(Rd), p>d and p≥ 2, and show that such SDEs can be approximated by random ordinary differential equations by smoothing the noise and the singular drift at the same time. We further prove a support theorem for this class of SDEs in a rather simple way using the Girsanov theorem.