Stochastic equations with singular drift driven by fractional Brownian motion

Abstract

We consider stochastic differential equation d Xt=b(Xt) dt +d WtH, where the drift b is either a measure or an integrable function, and WH is a d-dimensional fractional Brownian motion with Hurst parameter H∈(0,1), d∈N. For the case where b∈ Lp(Rd), p∈[1,∞] we show weak existence of solutions to this equation under the condition dp<1H-1, which is an extension of the Krylov-R\"ockner condition (2005) to the fractional case. We construct a counter-example showing optimality of this condition. If b is a Radon measure, particularly the delta measure, we prove weak existence of solutions to this equation under the optimal condition H<1d+1. We also show strong well-posedness of solutions to this equation under certain conditions. To establish these results, we utilize the stochastic sewing technique and develop a new version of the stochastic sewing lemma.