On Weak Solutions of SDEs with Singular Time-Dependent Drift and Driven by Stable Processes

Abstract

Let d 2. In this paper, we study weak solutions for the following type of stochastic differential equation \[ dXt=dSt+b(s+t, Xt)dt, X0=x, \] where (s,x)∈ R+ × Rd is the initial starting point, b: R+ × Rd Rd is measurable, and S=(St)t 0 is a d-dimensional α-stable process with index α ∈ (1,2). We show that if the α-stable process S is non-degenerate and b ∈ Lloc∞(R+;L∞(Rd))+ Llocq(R+;Lp(Rd)) for some p,q>0 with d/ p+α/q <α-1, then the above SDE has a unique weak solution for every starting point (s,x)∈ R+ × Rd.