Solving Dirichlet problem on unbounded uniform domains by using sphericalization techniques

Abstract

Within the setting of metric spaces equipped with a doubling measure and supporting a p-Poincar\'e inequality, establishing existence of solutions to Dirichlet problem in a bounded domain in such a metric space is accomplished via direct methods of calculus of variation and the use of a Maz'ya type inequality, which is a consequence of the Poincar\'e inequality. However, when the domain and its boundary are unbounded, such a method is unavailable. In this paper, using the technique of sphericalization developed in the prior paper~[32], we establish the existence of solutions to the Dirichlet boundary value problem for p-harmonic functions in unbounded uniform domains with unbounded boundary when 1<p<∞. We also explore the issue of whether such solutions are unique by considering p-parabolicity and p-hyperbolicity properties of the domain.