Willmore超曲面与极值超曲面的谱特征

Abstract

Abstract:

Let $M$ be a Willmore (or extremal) hypersurface in $S^{n+1}$ with the same squared length of the second fundamental form of Willmore torus $W_{m,n-m}$ (or Clifford torus $C_{m,n-m}$ ). In this article the authors proved that if $Spec^p(M)=Spec^p(W_{m,n-m})$ (or $Spec^p(M)=Spec^p(C_{m,n-m})$ ) for $p=0,1,2$ , then $M$ is $W_{m,n-m}$ (or $C_{m,m}$ ).

Key words: Spectrum, Laplace operator, Extremal hypersurface, Willmore hypersurface, The second fundamental form

CLC Number:

O186.12

Yang Dengyun, Zhang Jinguo, Tao Yongqian. Spectral Geometry of Willmore and Extremal Hypersurfaces[J].Acta mathematica scientia,Series A, 2023, 43(1): 35-42.

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References 12

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Spectral Geometry of Willmore and Extremal Hypersurfaces

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