English

A strict maximum principle for nonlocal minimal surfaces

Analysis of PDEs 2024-12-02 v2

Abstract

In the setting of fractional minimal surfaces, we prove that if two nonlocal minimal sets are one included in the other and share a common boundary point, then they must necessarily coincide. This strict maximum principle is not obvious, since the surfaces may touch at an irregular point, therefore a suitable blow-up analysis must be combined with a bespoke regularity theory to obtain this result. For the classical case, an analogous result was proved by Leon Simon. Our proof also relies on a Harnack Inequality for nonlocal minimal surfaces that has been recently introduced by Xavier Cabr\'e and Matteo Cozzi and which can be seen as a fractional counterpart of a classical result by Enrico Bombieri and Enrico Giusti. In our setting, an additional difficulty comes from the analysis of the corresponding nonlocal integral equation on a hypersurface, which presents a remainder whose sign and fine properties need to be carefully addressed.

Keywords

Cite

@article{arxiv.2308.01697,
  title  = {A strict maximum principle for nonlocal minimal surfaces},
  author = {Serena Dipierro and Ovidiu Savin and Enrico Valdinoci},
  journal= {arXiv preprint arXiv:2308.01697},
  year   = {2024}
}
R2 v1 2026-06-28T11:47:15.595Z