On the Banach-Mazur distance to cross-polytope

Abstract

Let n≥ 3, and let B1n be the standard n-dimensional cross-polytope (i.e. the convex hull of standard coordinate vectors and their negatives). We show that there exists a symmetric convex body Gm in Rn such that the Banach--Mazur distance d(B1n, Gm) satisfies d(B1n, Gm)≥ n5/9-Cn, where C>0 is a universal constant. The body Gm is obtained as a typical realization of a random polytope in Rn with 2m:=2nC vertices (for a large constant C). The result improves upon an earlier estimate of S.Szarek which gives d(B1n, Gm)≥ c n1/2 n (with a different choice of m). This shows in a strong sense that the cross-polytope (or the cube [-1,1]n) cannot be an "approximate" center of the Minkowski compactum.