Panki Kim, Renming Song, Zoran Vondraček
Published 2014-05-01Version 1
In this paper we study the Martin boundary of open sets with respect to a large class of purely discontinuous symmetric L\'evy processes in ${\mathbb R}^d$. We show that, if $D\subset {\mathbb R}^d$ is an open set which is $\kappa$-fat at a boundary point $Q\in \partial D$, then there is exactly one Martin boundary point associated with $Q$ and this Martin boundary point is minimal.
Minimal thinness with respect to symmetric Lévy processes
On the favorite points of symmetric Lévy processes
Hitting times of points and intervals for symmetric Lévy processes
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