Fractional-Order Operators on Nonsmooth Domains
Abstract
The fractional Laplacian , , and its generalizations to variable-coefficient -order pseudodifferential operators , are studied in -Sobolev spaces of Bessel-potential type . For a bounded open set , consider the homogeneous Dirichlet problem: in , in . We find the regularity of solutions and determine the exact Dirichlet domain (the space of solutions with ) in cases where has limited smoothness , for , . Earlier, the regularity and Dirichlet domains were determined for smooth by the second author, and the regularity was found in low-order H\"older spaces for by Ros-Oton and Serra. The -results obtained now when are new, even for . In detail, the spaces are identified as -transmission spaces , exhibiting estimates in terms of near the boundary. The result has required a new development of methods to handle nonsmooth coordinate changes for pseudodifferential operators, which have not been available before; this constitutes another main contribution of the paper.
Cite
@article{arxiv.2004.10134,
title = {Fractional-Order Operators on Nonsmooth Domains},
author = {Helmut Abels and Gerd Grubb},
journal= {arXiv preprint arXiv:2004.10134},
year = {2023}
}
Comments
52 pages. In this version some clarifications and minor corrections were done. The version is accepted for publication in "J. London Math. Soc."