Xin Zhou
Published 2019-01-04Version 1
We prove that in a closed manifold of dimension between 3 and 7 with a bumpy metric, the min-max minimal hypersurfaces associated with the volume spectrum introduced by Gromov, Guth, Marques-Neves, are two-sided and have multiplicity one. This confirms a conjecture by Marques-Neves. We prove that in a bumpy metric each volume spectrum is realized by the min-max value of certain relative homotopy class of sweepouts of boundaries of Caccioppoli sets. The main result follows by approximating such min-max value using the min-max theory for hypersurfaces with prescribed mean curvature established by the author with Zhu.
Comments: 40 pages; comments welcome
On the Multiplicity One Conjecture for Mean Curvature Flows of surfaces
Remark on a conjecture of conformal transformations of Riemannian manifolds
Existence of four minimal spheres in $S^3$ with a bumpy metric
![QR code for arXiv:1901.01173 [math.DG]](http://oss.arxitics.com/images/favicon.svg)