The p-widths of a surface
Abstract
The -widths of a closed Riemannian manifold are a nonlinear analogue of the spectrum of its Laplace--Beltrami operator, which corresponds to areas of a certain min-max sequence of possibly singular minimal submanifolds. We show that the -widths of any closed Riemannian two-manifold correspond to a union of closed immersed geodesics, rather than simply geodesic nets. We then prove optimality of the sweepouts of the round two-sphere constructed from the zero set of homogeneous polynomials, showing that the -widths of the round sphere are attained by great circles. As a result, we find the universal constant in the Liokumovich--Marques--Neves--Weyl law for surfaces to be . En route to calculating the -widths of the round two-sphere, we prove two additional new results: a bumpy metrics theorem for stationary geodesic nets with fixed edge lengths, and that, generically, stationary geodesic nets with bounded mass and bounded singular set have Lusternik--Schnirelmann category zero.
Cite
@article{arxiv.2107.11684,
title = {The p-widths of a surface},
author = {Otis Chodosh and Christos Mantoulidis},
journal= {arXiv preprint arXiv:2107.11684},
year = {2023}
}
Comments
Final version, to appear in Publ. Math. Inst. Hautes \'Etudes Sci