English

Unavoidable sets and harmonic measures living on small sets

Analysis of PDEs 2017-05-17 v2

Abstract

Given a connected open set UU\ne\emptyset in Rd R^d, d2d\ge 2, a relatively closed set AA in UU is called \emph{unavoidable in UU}, if Brownian motion, starting in xUAx\in U\setminus A and killed when leaving UU, hits AA almost surely or, equivalently, if the harmonic measure for xx with respect to UAU\setminus A has mass 11 on AA. First a new criterion for unavoidable sets is proven which facilitates the construction of smaller and smaller unavoidable sets in UU. Starting with an arbitrary champagne subdomain of UU (which is obtained omitting a locally finite union of pairwise disjoint closed balls B(z,rz)\overline B(z, r_z), zZz\in Z, satisfying supzZrz/\mboxdist(z,Uc)<1\sup_{z\in Z} r_z/\mbox{dist}(z,U^c)<1), a combination of the criterion and the existence of small nonpolar compact sets of Cantor type yields a set AA on which harmonic measures for UAU\setminus A are living and which has Hausdorff dimension d2d-2 and, if d=2d=2, logarithmic Hausdorff dimension 11. This can be done as well for Riesz potentials (isotropic α\alpha-stable processes) on Euclidean space and for censored stable processes on C1,1C^{1,1} open subsets. Finally, in the very general setting of a balayage space (X,W)(X,\mathcal W) on which the function 11 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 XAX\setminus A of XX with small unavoidable sets AA is given which generalizes (and partially improves) recent constructions in the classical case.

Keywords

Cite

@article{arxiv.1306.5433,
  title  = {Unavoidable sets and harmonic measures living on small sets},
  author = {Wolfhard Hansen and Ivan Netuka},
  journal= {arXiv preprint arXiv:1306.5433},
  year   = {2017}
}

Comments

27 pages, 2 figures

R2 v1 2026-06-22T00:38:48.831Z