The Dirichlet Problem for Harmonic Functions on Compact Sets
Abstract
For any compact set we develop the theory of Jensen measures and subharmonic peak points, which form the set , to study the Dirichlet problem on . Initially we consider the space of functions on which can be uniformly approximated by functions harmonic in a neighborhood of as possible solutions. As in the classical theory, our Theorem 8.1 shows for compact sets with closed. However, in general a continuous solution cannot be expected even for continuous data on as illustrated by Theorem 8.1. Consequently, we show that the solution can be found in a class of finely harmonic functions. Moreover by Theorem 8.7, in complete analogy with the classical situation, this class is isometrically isomorphic to for all compact sets .
Cite
@article{arxiv.1004.5575,
title = {The Dirichlet Problem for Harmonic Functions on Compact Sets},
author = {Tony Perkins},
journal= {arXiv preprint arXiv:1004.5575},
year = {2015}
}
Comments
There have been a large number of changes made from the first version. They mostly consists of shortening the article and supplying additional references