On the maximum number of k-holes in point sets with no (k + 1)-hole

Abstract

The classical problem of Erdős asks for the minimum number of empty convex k-gons determined by an n-element point set in the plane. The celebrated empty hexagon theorem, proved independently by Gerken and Nicolás, shows that every sufficiently large planar point set contains a 6-hole, while Horton's famous construction shows the existence of arbitrarily large point sets with no 7-hole. In this paper, we initiate the study of the maximum number of k-holes in planar point sets with no (k+1)-hole. More precisely, for each fixed k≥ 6, let hk(n) be the maximum number of k-holes determined by a planar point set in general position, of size at most n, and with no (k+1)-hole. We prove that there are absolute constants c1,c2>0 such that (c1/k) k/3 n k/3 ≤ hk(n)≤ (c2/k) k/2 n k/2.