Well-posedness of supercritical SDE driven by L\'evy processes with irregular drifts

Abstract

In this paper, we study the following time-dependent stochastic differential equation (SDE) in Rd: d Xt= σt(Xt-) d Zt + bt(Xt)d t, X0=x∈ Rd, where Z is a d-dimensioanl nondegenerate α-stable-like process with α ∈(0,2) (including cylindrical case), and uniform in t≥ 0, x σt(x): Rd Rd Rd is Lipchitz and uniformly elliptic and x bt (x) is β-order H\"older continuous with β∈(1-α/2,1). Under these assumptions, we show the above SDE has a unique strong solution for every starting point x ∈ Rd. When σt (x)= Id× d, the d× d identity matrix, our result in particular gives an affirmative answer to the open problem of Priola (2015).