Shortest closed curve to contain a sphere in its convex hull
Abstract
We show that in Euclidean 3-space any closed curve γ which contains the unit sphere within its convex hull has length L≥4π, and characterize the case of equality. This result generalizes the authors' recent solution to a conjecture of Zalgaller. Furthermore, for the analogous problem in n dimensions, we include the estimate L≥ Cnn by Nazarov, which is sharp up to the constant C.
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