论文信息 - The geometry of canal surfaces and the length of curves in de Sitter space

The geometry of canal surfaces and the length of curves in de Sitter space

We find the minimal value of the length in de Sitter space of closed space-like curves with non-vanishing non-space-like geodesic curvature vector. These curves are in correspondence with closed almost-regular canal surfaces, and their length is a natural magnitude in conformal geometry. As an application, we get a lower bound for the total conformal torsion of closed space curves.

Gil Solanes | R. Langevin | G. Solanes | R'emi Langevin

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