We study the double obstacle problem for p-harmonic functions on arbitrary bounded nonopen sets E in quite general metric spaces. The Dirichlet and single obstacle problems are included as special cases. We obtain Adams' criterion for the solubility of the single obstacle problem and establish connections with fine potential theory. We also study when the minimal p-weak upper gradient of a function remains minimal when restricted to a nonopen subset. Most of the results are new for open E (apart from those which are trivial in this case) and also on R^n.
The obstacle and Dirichlet problems associated with p-harmonic functions in unbounded sets in Rn and metric spaces
The Cartan, Choquet and Kellogg properties for the fine topology on metric spaces
On uniqueness results for Dirichlet problems of elliptic systems without DeGiorgi-Nash-Moser regularity
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