Harnack Inequalities for Symmetric Stable Levy Processes

Abstract

In this paper we consider Harnack inequalities with respect to a symmetric α-stable L\'evy process X in Rd, α ∈ (0,2), d≥ 2. We study the example from the article bg-sz-1. There, the authors have associated the Harnack inequality with the relative Kato condition, which is a condition on the L\'evy measure. By checking the condition, in the case α ∈ (0,1), they have established that the Harnack inequality does not hold. We give an alternative proof of this fact, using the setting of bg-sz-1. We define the harmonic functions explicitly. For a given starting point of the process, we examine the probability of hitting a certain set at the first exit time of a unit ball. Moreover, we also examine the weak Harnack inequality for a certain class of symmetric α-stable L\'evy processes. We consider a symmetric α-stable L\'evy process, α ∈ (0,2), for which a spherical part μ of the L\'evy measure is a spectral measure. In addition, we assume that μ is absolutely continuous with respect to the uniform measure σ on the sphere and impose certain bounds on the corresponding density. Eventually, we show that the weak Harnack inequality holds.