On asymptotic Lebesgue's universal covering problem
Abstract
Universal cover in En is a measurable set that contains a congruent copy of any set of diameter 1. Lebesgue's universal covering problem, posed in 1914, asks for the convex set of smallest area that serves as a universal cover in the plane (n=2). A simple universal cover in En is provided by the classical theorem of Jung, which states that any set of diameter 1 in an n-dimensional Euclidean space is contained in a ball Jn of radius n2n+2; in other words, Jn is a universal cover in En. We show that in high dimensions, Jung's ball Jn is asymptotically optimal with respect to the volume, namely, for any universal cover U ⊂ En, Vol(U) (1-o(1))n Vol(Jn).
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