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Möbius Homogeneous Hypersurfaces with One Simple Principal Curvature in Sn+1 |
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| Authors: | Ya Yun CHEN Xiu JI Tong Zhu LI |
| Affiliation: | Department of Mathematics, Beijing Institute of Technology, Beijing 100081, P. R. China |
| Abstract: | Let Möb(Sn+1) denote the Möbius transformation group of Sn+1. A hypersurface f:Mn → Sn+1 is called a Möbius homogeneous hypersurface, if there exists a subgroup G ? Möb(Sn+1) such that the orbit G(p)={φ(p)|φ ∈ G}=f(Mn), p ∈ f(Mn). In this paper, we classify the Möbius homogeneous hypersurfaces in Sn+1 with at most one simple principal curvature up to a Möbius transformation. |
| Keywords: | Möbius transformation group isometric transformation group Möbius homogeneous hypersurfaces homogeneous hypersurfaces |
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