M\"obius Homogeneous Hypersurfaces in Sn+1
Abstract
Let M(Sn+1) denote the M\"obius transformation group of the (n+1)-dimensional sphere Sn+1. A hypersurface x:Mn Sn+1 is called a M\"obius homogeneous hypersurface if there exists a subgroup G of M(Sn+1) such that the orbit G· p=x(Mn), p∈ x(Mn). In this paper, the M\"obius homogeneous hypersurfaces are classified completely up to a M\"obius transformation of Sn+1.
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