Stability from rigidity via umbilicity
Abstract
We consider a range of geometric stability problems for hypersurfaces of spaceforms. One of the key results is an estimate relating the distance to a geodesic sphere of an embedded hypersurface with integral norms of the traceless Hessian operator of a level set function for the open set bounded by the hypersurface. As application, we give a unified treatment of many old and new stability problems arising in geometry and analysis. Those problems ask for spherical closeness of a hypersurface, given a geometric constraint. Examples include stability in Alexandroff's soap bubble theorem in space forms, Serrin's overdetermined problem, a Steklov problem involving the bi-Laplace operator and non-convex Alexandroff-Fenchel inequalities.
Cite
@article{arxiv.2103.07178,
title = {Stability from rigidity via umbilicity},
author = {Julian Scheuer},
journal= {arXiv preprint arXiv:2103.07178},
year = {2025}
}
Comments
34 pages. Major revision of the first version: More explicit exponents, relaxed restrictions on constants