English

Rigidity of minimal submanifolds in space forms

Differential Geometry 2020-07-29 v1

Abstract

In this paper, we consider the rigidity for an n(4)n(\geq 4)-dimensional submanfolds MnM^n with parallel mean curvature in the space form Mcn+p{\mathbb M}^{n+p}_c when the integral Ricci curvature of MM has some bound. We prove that, if c+H2>0c+H^2>0 and Ricλn/2<ϵ(n,c,λ,H)\|\mathrm{Ric}_{-}^\lambda\|_{n/2}< \epsilon(n,c, \lambda, H) for λ\lambda satisfying n2n1(c+H2)<λc+H2 \frac{n-2}{n-1} (c+H^2) < \lambda \le c+H^2, then MM is the totally umbilical sphere Sn(1c+H2)\mathbb{S}^n(\tfrac{1}{\sqrt{c+H^2}}). Here HH is the norm of the parallel mean curvature of MM, and ϵ(n,c,λ,H)\epsilon(n,c,\lambda, H) is a positive constant depending only on n,c,λn, c,\lambda and HH. This extends some of the earlier work of [15] from pointwise Ricci curvature lower bound to inetgral Ricci curvature lower bound.

Keywords

Cite

@article{arxiv.1801.08994,
  title  = {Rigidity of minimal submanifolds in space forms},
  author = {Hang Chen and Guofang Wei},
  journal= {arXiv preprint arXiv:1801.08994},
  year   = {2020}
}

Comments

9 pages

R2 v1 2026-06-22T23:58:58.799Z