On a Simplex Inscribed in a Ball

Abstract

Let Bn be the n-dimensional unit ball given by the inequality \|x\|≤ 1, where \|x\| is the standard Euclid norm in Rn. For an n-dimensional nondegenerate simplex S, we denote by E the ellipsoid of minimum volume which contains S. Suppose S⊂ Bn, 0≤ m≤ n-1. Let G be any m-dimensional face of S and let H be the opposite (n-m-1)-dimensional face. Denote by g and h the centers of gravity of G and H respectively. Define y as the intersection point of the line passing from g to h with the boundary of E. Let us call the face G suitable if y∈ Bn. Earlier it was proved that each simplex S⊂ Bn has a suitable face of any dimension ≤ n-1. We show the following. Let S be inscribed in Bn. If some vertex of S is suitable, then there exists a suitable face of any dimension ≤ n-1 which contains this vertex.