Champagne subregions with unavoidable bubbles
Analysis of PDEs
2012-06-19 v2
Abstract
A champagne subregion of a connected open set in , , is obtained omitting pairwise disjoint closed balls , , the bubbles, where is a locally finite set in . The union of these balls may be unavoidable, that is, Brownian motion, starting in and killed when leaving , may hit almost surely or, equivalently, may have harmonic measure one for . Recent publications by Gardiner/Ghergu () and by Pres () give rather sharp answers to the question how small such a set may be, when is the unit ball. In this paper, using a new criterion for unavoidable sets and a straightforward approach, much stronger results are obtained, results which hold as well for an arbitrary open set .
Cite
@article{arxiv.1206.1514,
title = {Champagne subregions with unavoidable bubbles},
author = {Wolfhard Hansen and Ivan Netuka},
journal= {arXiv preprint arXiv:1206.1514},
year = {2012}
}
Comments
10 pages