Closed Biconservative Hypersurfaces in Spheres
Abstract
We characterise the profile curves of non-CMC biconservative rotational hypersurfaces of space forms Nn() as p-elastic curves, for a suitable rational number p∈[1/4,1) which depends on the dimension n of the ambient space. Analysing the closure conditions of these p-elastic curves, we prove the existence of a discrete biparametric family of non-CMC closed (i.e., compact without boundary) biconservative hypersurfaces in Sn(). None of these hypersurfaces can be embedded in Sn().
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