Area minimizing hypersurfaces modulo $p$: a geometric free-boundary problem
Abstract
We consider area minimizing -dimensional currents in complete Riemannian manifolds of dimension . For odd moduli we prove that, away from a closed rectifiable set of codimension , the current in question is, locally, the union of finitely many smooth minimal hypersurfaces coming together at a common boundary of dimension , and the result is optimal. For even such structure holds in a neighborhood of any point where at least one tangent cone has -dimensional spine. These structural results are indeed the byproduct of a theorem that proves (for any modulus) uniqueness and decay towards such tangent cones. The underlying strategy of the proof is inspired by the techniques developed by Leon Simon in "Cylindrical tangent cones and the singular set of minimal submanifolds" (J. Diff. Geom. 1993) in a class of multiplicity one stationary varifolds. The major difficulty in our setting is produced by the fact that the cones and surfaces under investigation have arbitrary multiplicities ranging from to .
Cite
@article{arxiv.2105.08135,
title = {Area minimizing hypersurfaces modulo $p$: a geometric free-boundary problem},
author = {Camillo De Lellis and Jonas Hirsch and Andrea Marchese and Luca Spolaor and Salvatore Stuvard},
journal= {arXiv preprint arXiv:2105.08135},
year = {2025}
}
Comments
98 pages, 7 figures. Comments are welcome! v4 contains several minor corrections to the arguments, and updated introduction and references