Anders Björn, Jana Björn, Visa Latvala
Published 2021-06-25Version 1
We initiate the study of fine $p$-(super)minimizers, associated with $p$-harmonic functions, on finely open sets in metric spaces, where $1 < p < \infty$. After having developed their basic theory, we obtain the $p$-fine continuity of the solution of the Dirichlet problem on a finely open set with continuous Sobolev boundary values, as a by-product of similar pointwise results. These results are new also on unweighted $\mathbf{R}^n$. We build this theory in a complete metric space equipped with a doubling measure supporting a $p$-Poincar\'e inequality.
The Cartan, Choquet and Kellogg properties for the fine topology on metric spaces
Maximal $L^2$ regularity for Dirichlet problems in Hilbert spaces
Sweeping and the Dirichlet problem at the Martin boundary of a fine domain
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