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A characterization of rotational minimal surfaces in the de Sitter space

The generating curves of rotational minimal surfaces in the de Sitter space $\s_1^3$ are characterized as solutions of a variational problem. It is proved that these curves are the critical points of the center of mass among all curves of $\s_1^2$ with prescribed endpoints and fixed length. This extends the known properties of the catenary and the catenoid in the Euclidean setting.

preprint2022arXivOpen access
Rafael López
math.DG
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Rafael López

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