Potential Theory of Truncated Stable Processes
Abstract
For any 0 < alpha <2, a truncated symmetric alpha-stable process is a symmetric Levy process in Rd with a Levy density given by c|x|-d-alpha 1|x|< 1 for some constant c. In this paper we study the potential theory of truncated symmetric stable processes in detail. We prove a Harnack inequality for nonnegative harmonic nonnegative functions these processes. We also establish a boundary Harnack principle for nonnegative functions which are harmonic with respect to these processes in bounded convex domains. We give an example of a non-convex domain for which the boundary Harnack principle fails.
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