Alexandrov theorem for general nonlocal curvatures: The geometric impact of the kernel

For a general radially symmetric, non-increasing, non-negative kernel h is an element of L1loc(Rd), we study the rigidity of measurable sets in Rd with constant nonlocal h-mean curvature. Under a suitable improved integrability assumption on h, we prove that these sets are finite unions of equal balls, as soon as they satisfy a natural nondegeneracy condition. Both the radius of the balls and their mutual distance can be controlled from below in terms of suitable parameters depending explicitly on the measure of the level sets of h. In the simplest, common case, in which h is positive, bounded and decreasing, our result implies that any bounded open set or any bounded measurable set with finite perimeter which has constant nonlocal h-mean curvature has to be a ball. (c) 2022 Elsevier Masson SAS. All rights reserved.

Automated summary

In this study, we investigate the rigidity problem of measurable sets with constant nonlocal h-mean curvature. It is shown that under certain conditions, these sets can be characterized as finite unions of equal balls, and the radius and mutual distance of these balls can be controlled by suitable parameters.