Lattice width directions and Minkowski's 3d-theorem

Abstract

We show that the number of lattice directions in which a d-dimensional convex body in Rd has minimum width is at most 3d-1, with equality only for the regular cross-polytope. This is deduced from a sharpened version of the 3d-theorem due to Hermann Minkowski (22 June 1864--12 January 1909), for which we provide two independent proofs.