SDE driven by cylindrical α-stable process with distributional drift

Abstract

For α ∈ (1,2), we study the following stochastic differential equation driven by a non-degenerate symmetric α-stable process in Rd: align* d Xt=b(t,Xt) d t+σ(t,Xt-) d Lt(α),\ \ X0 =x ∈ Rd, align* where b belongs to L∞(R+;C-β(Rd)) with some β∈(0,α-1), and Cβ denotes a Besov space (see Definition (2.2) below). The coefficient σ:R+× Rd Rd Rd is a measurable matrix-valued function. The noise Lt(α)=(Lt(α),1,...,Lt(α),d) consists of independent 1-dimensional symmetric α-stable processes, and is referred to as a cylindrical α-stable process. We establish the well-posedness of weak solutions to the SDE, and provide quantitative stability estimates with respect to the drift coefficients.