Convex polytopes in restricted point sets in Rd

Abstract

For a finite point set P ⊂ Rd, denote by diam(P) the ratio of the largest to the smallest distances between pairs of points in P. Let cd, α(n) be the largest integer c such that any n-point set P ⊂ Rd in general position, satisfying diam(P) < α[d]n, contains an c-point convex independent subset. We determine the asymptotics of cd, α(n) as n ∞ by showing the existence of positive constants β= β(d, α) and γ= γ(d) such that βnd-1d+1 cd, α(n) γnd-1d+1 for α≥ 2.