On Some Problems Related to a Simplex and a Ball

Abstract

Let C be a convex body and let S be a nondegenerate simplex in Rn. Denote by (C;S) the minimal τ>0 such that C is a subset of the simplex τ S. By α(C;S) we mean the minimal τ>0 such that C is contained in a translate of τ S. Earlier the author has proved the equalities (C;S)=(n+1)1≤ j≤ n+1 x∈ C(-λj(x))+1 \ (if C⊂ S), \ α(C;S)= Σj=1n+1 x∈ C (-λj(x))+1. Here λj are linear functions called the basic Lagrange polynomials corresponding to S. In his previous papers, the author has investigated these formulae if C=[0,1]n. The present paper is related to the case when C coincides with the unit Euclidean ball Bn=\x: \|x\|≤ 1\, where \|x\|=(Σi=1n xi2 )1/2. We establish various relations for (Bn;S) and α(Bn;S), as well as we give their geometric interpretation.