The Dirichlet Problem for Harmonic Functions on Compact Sets

Abstract

For any compact set K⊂ Rn we develop the theory of Jensen measures and subharmonic peak points, which form the set OK, to study the Dirichlet problem on K. Initially we consider the space h(K) of functions on K which can be uniformly approximated by functions harmonic in a neighborhood of K as possible solutions. As in the classical theory, our Theorem 8.1 shows C(OK) h(K) for compact sets with OK closed. However, in general a continuous solution cannot be expected even for continuous data on K 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 Cb(OK) for all compact sets K.