Calculus of Variations and Geometric Measure Theory

B. Barrios - A. Figalli - X. Ros-Oton

Global regularity for the free boundary in the obstacle problem for the fractional Laplacian

created by figalli on 04 May 2017
modified on 19 Aug 2024

[BibTeX]

Published Paper

Inserted: 4 may 2017
Last Updated: 19 aug 2024

Journal: Amer. J. Math.
Year: 2018

Abstract:

We study the regularity of the free boundary in the obstacle problem for the fractional Laplacian under the assumption that the obstacle $\varphi$ satisfies $\Delta \varphi\leq 0$ near the contact region. Our main result establishes that the free boundary consists of a set of regular points, which is known to be a $(n-1)$-dimensional $C^{1,\alpha}$ manifold by the results of Caffarelli-Salsa-Silvestre, and a set of singular points, which we prove to be contained in a union of $k$-dimensional $C^1$-submanifold, $k=0,\ldots,n-1$.

Such a complete result on the structure of the free boundary was known only in the case of the classical Laplacian, and it is new even for the Signorini problem (which corresponds to the particular case of the $\frac12$-fractional Laplacian). A key ingredient behind our results is the validity of a new non-degeneracy condition $\sup_{B_r(x_0)}(u-\varphi)\geq c\,r^2$, valid at all free boundary points $x_0$.


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