We study minimal thinness in the half-space for a large class of subordinate Brownian motions. We show that the same test for the minimal thinness of a subset of below the graph of a nonnegative Lipschitz function is valid for all processes in the considered class. In the classical case of Brownian motion this test was proved by Burdzy.
est un processus de Markov sur un espace localement compact, et est une fonction excessive. Soit une famille de temps d’arrêt est -harmonique si pour tout , pour tout temps d’arrêt appartenant à . est un potentiel si sa plus grande minorante forte -harmonique est nulle. La plus grande minorante forte -harmonique de est égale à la somme de deux fonctions excessives qui sont étudiées. On déduit différentes caractérisations des -potentiels suivant les propriétés de la famille...
Let be a measurable semigroup and a -finite positive measure on a Lusin space . An -exit law for is a family of nonnegative measurable functions on which are finite -a.e. and satisfy for each
We consider some classes of Lévy processes for which the estimate of Krylov and Safonov (as in (Potential Anal.17 (2002) 375–388)) fails and thus it is not possible to use the standard iteration technique to obtain a-priori Hölder continuity estimates of harmonic functions. Despite the failure of this method, we obtain some a-priori regularity estimates of harmonic functions for these processes. Moreover, we extend results from (Probab. Theory Related Fields135 (2006) 547–575) and obtain asymptotic...