On convex holes in d-dimensional point sets

Abstract

Given a finite set A ⊂eq Rd, points a1,a2,…c,a ∈ A form an -hole in A if they are the vertices of a convex polytope which contains no points of A in its interior. We construct arbitrarily large point sets in general position in Rd having no holes of size O(4dd d) or more. This improves the previously known upper bound of order dd+o(d) due to Valtr. The basic version of our construction uses a certain type of equidistributed point sets, originating from numerical analysis, known as (t,m,s)-nets or (t,s)-sequences, yielding a bound of 27d. The better bound is obtained using a variant of (t,m,s)-nets, obeying a relaxed equidistribution condition.