Unavoidable sets and harmonic measures living on small sets

Abstract

Given a connected open set U in Rd, d 2, a relatively closed set A in U is called unavoidable in U, if Brownian motion, starting in x∈ U A and killed when leaving U, hits A almost surely or, equivalently, if the harmonic measure for x with respect to U A has mass 1 on A. First a new criterion for unavoidable sets is proven which facilitates the construction of smaller and smaller unavoidable sets in U. Starting with an arbitrary champagne subdomain of U (which is obtained omitting a locally finite union of pairwise disjoint closed balls B(z, rz), z∈ Z, satisfying z∈ Z rz/dist(z,Uc)<1), a combination of the criterion and the existence of small nonpolar compact sets of Cantor type yields a set A on which harmonic measures for U A are living and which has Hausdorff dimension d-2 and, if d=2, logarithmic Hausdorff dimension 1. This can be done as well for Riesz potentials (isotropic α-stable processes) on Euclidean space and for censored stable processes on C1,1 open subsets. Finally, in the very general setting of a balayage space (X, W) on which the function 1 is harmonic (which covers not only large classes of second order partial differential equations, but also non-local situations as, for example, given by Riesz potentials, isotropic unimodal L\'evy processes or censored stable processes) a construction of champagne subsets X A of X with small unavoidable sets A is given which generalizes (and partially improves) recent constructions in the classical case.