M\"{o}bius Homogeneous Hypersurfaces in $\mathbb{S}^{n+1}$

Tongzhu Li; Xiang Ma; Changping Wang; Peng Wang

arXiv:2210.04732·math.DG·October 11, 2022

M\"{o}bius Homogeneous Hypersurfaces in $\mathbb{S}^{n+1}$

Tongzhu Li, Xiang Ma, Changping Wang, Peng Wang

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Abstract

Let $M (S^{n + 1})$ denote the M\"{o}bius transformation group of the $(n + 1)$ -dimensional sphere $S^{n + 1}$ . A hypersurface $x : M^{n} \to S^{n + 1}$ is called a M\"{o}bius homogeneous hypersurface if there exists a subgroup $G$ of $M (S^{n + 1})$ such that the orbit $G \cdot p = x (M^{n}), p \in x (M^{n})$ . In this paper, the M\"{o}bius homogeneous hypersurfaces are classified completely up to a M\"{o}bius transformation of $S^{n + 1}$ .

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TopicsMathematics and Applications