Uniqueness of Stable Processes with Drift

Abstract

Suppose that d≥1 and α∈ (1, 2). Let Y be a rotationally symmetric α-stable process on d and b a d-valued measurable function on d belonging to a certain Kato class of Y. We show that Xbt= Yt+b(Xbt) t with Xb0=x has a unique weak solution for every x∈ d. Let b=-(-)α/2 + b · ∇, which is the infinitesimal generator of Xb. Denote by C∞c(d) the space of smooth functions on d with compact support. We further show that the martingale problem for (b, C∞c(d)) has a unique solution for each initial value x∈ d.