Approximation of convex bodies by polytopes with respect to minimal width and diameter

Abstract

Denote by Kd the family of convex bodies in Ed and by w(C) the minimal width of C ∈ Kd. We ask for the greatest number n ( Kd) such that every C ∈ Kd contains a polytope P with at most n vertices for which n ( Kd) ≤ w(P)w(C). We give a lower estimate of n ( Kd) for n ≥ 2d based on estimates of the smallest radius of n2 antipodal pairs of spherical caps that cover the unit sphere of Ed. We show that 3 ( K2) ≥ 1 2(3- 3), and n ( K2) ≥ π 2 n/2 for every n ≥ 4. We also consider the dual question of estimating the smallest number n ( Kd) such that every C ∈ Kd there exists a polytope P ⊃ C with at most n facets for which diam(P) diam(C) ≤ n ( Kd). We give an upper bound of n ( Kd) for n ≥ 2d. In particular, n ( K2) ≤ 1/ π 2 n/2 for n ≥ 4.