Compatible 4-Holes in Point Sets

Abstract

Counting interior-disjoint empty convex polygons in a point set is a typical Erdos-Szekeres-type problem. We study this problem for 4-gons. Let P be a set of n points in the plane and in general position. A subset Q of P, with four points, is called a 4-hole in P if Q is in convex position and its convex hull does not contain any point of P in its interior. Two 4-holes in P are compatible if their interiors are disjoint. We show that P contains at least 5n/11 - 1 pairwise compatible 4-holes. This improves the lower bound of 2(n-2)/5 which is implied by a result of Sakai and Urrutia (2007).