Variants of a theorem of Macbeath in finite dimensional normed spaces
Abstract
A classical theorem of Macbeath states that for any integers d ≥ 2, n ≥ d+1, d-dimensional Euclidean balls are hardest to approximate, in terms of volume difference, by inscribed convex polytopes with n vertices. In this paper we investigate normed variants of this problem: we intend to find the extremal values of the Busemann volume, Holmes-Thompson volume, Gromov's mass and Gromov's mass* of a largest volume convex polytope with n vertices, inscribed in the unit ball of a d-dimensional normed space.
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