Regularity of solutions to the fractional Cheeger-Laplacian on domains in metric spaces of bounded geometry

Autor: Gareth Speight, Nageswari Shanmugalingam, Gianmarco Giovannardi, Sylvester Eriksson-Bique, Riikka Korte
Přispěvatelé: University of Oulu, Università degli Studi di Trento, Department of Mathematics and Systems Analysis, University of Cincinnati, Aalto-yliopisto, Aalto University
Rok vydání: 2022
Předmět:
Zdroj: Journal of Differential Equations. 306:590-632
ISSN: 0022-0396
Popis: We study existence, uniqueness, and regularity properties of the Dirichlet problem related to fractional Dirichlet energy minimizers in a complete doubling metric measure space $(X,d_X,\mu_X)$ satisfying a $2$-Poincar\'e inequality. Given a bounded domain $\Omega\subset X$ with $\mu_X(X\setminus\Omega)>0$, and a function $f$ in the Besov class $B^\theta_{2,2}(X)\cap L^2(X)$, we study the problem of finding a function $u\in B^\theta_{2,2}(X)$ such that $u=f$ in $X\setminus\Omega$ and $\mathcal{E}_\theta(u,u)\le \mathcal{E}_\theta(h,h)$ whenever $h\in B^\theta_{2,2}(X)$ with $h=f$ in $X\setminus\Omega$. We show that such a solution always exists and that this solution is unique. We also show that the solution is locally H\"older continuous on $\Omega$, and satisfies a non-local maximum and strong maximum principle. Part of the results in this paper extend the work of Caffarelli and Silvestre in the Euclidean setting and Franchi and Ferrari in Carnot groups.
Comment: 42 pages, comments welcome, submitted. Revision to add crucial references and attributions to the introduction
Databáze: OpenAIRE
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