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Index of Minimal Hypersurfaces in Real Projective Spaces

  • Published:2024-01-09 Issue: Volume: Page:
  • ISSN:1073-7928
  • Container-title:International Mathematics Research Notices
  • language:en
  • Short-container-title:

Author:

Chen Shuli1

Affiliation:

1. Department of Mathematics, Stanford University , 450 Jane Stanford Way, Bldg 380, Stanford, CA 94305, USA

Abstract

Abstract We prove that for an embedded unstable one-sided minimal hypersurface of the $(n+1)$-dimensional real projective space, the Morse index is at least $n+2$, and this bound is attained by the cubic isoparametric minimal hypersurfaces. We also show that there exist closed embedded two-sided minimal surfaces in the 3-dimensional real projective space of each odd index by computing the index of the Lawson surfaces.

Publisher

Oxford University Press (OUP)

Subject

General Mathematics

Reference25 articles.

1. Bubbling analysis and geometric convergence results for free boundary minimal surfaces;Ambrozio;J. Éc. Polytech. Math.,2019

2. Comparing the Morse index and the first Betti number of minimal hypersurfaces;Ambrozio;J. Differential Geom.,2018

3. A unique continuation theorem for solutions of elliptic partial differential equations or inequalities of second order;Aronszajn;J. Math. Pures Appl. (9),1956

4. Minimal hypersurfaces with low index in the real projective space;Batista;Nonlinear Anal.,2022

5. Familles de surfaces isoparamétriques dans les espaces à courbure constante;Cartan;Ann. Mat. Pur. Appl. Ser. IV,1938
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