Higher Regularity for the fractional thin obstacle problem
Analysis of PDEs
2016-05-24 v1
Abstract
In this article we investigate the higher regularity properties of the regular free boundary in the fractional thin obstacle problem. Relying on a Hodograph-Legendre transform, we show that for smooth or analytic obstacles the regular free boundary is smooth or analytic, respectively. This leads to the analysis of a fully nonlinear, degenerate (sub)elliptic operator which we identify as a (fully nonlinear) perturbation of the fractional Baouendi-Grushin Laplacian. Using its intrinsic geometry and adapted function spaces, we invoke the analytic implicit function theorem to deduce analyticity of the regular free boundary.
Cite
@article{arxiv.1605.06662,
title = {Higher Regularity for the fractional thin obstacle problem},
author = {Herbert Koch and Angkana Rüland and Wenhui Shi},
journal= {arXiv preprint arXiv:1605.06662},
year = {2016}
}
Comments
79 pages