Density of Range Capturing Hypergraphs

Abstract

For a finite set X of points in the plane, a set S in the plane, and a positive integer k, we say that a k-element subset Y of X is captured by S if there is a homothetic copy S' of S such that X S' = Y, i.e., S' contains exactly k elements from X. A k-uniform S-capturing hypergraph H = H(X,S,k) has a vertex set X and a hyperedge set consisting of all k-element subsets of X captured by S. In case when k=2 and S is convex these graphs are planar graphs, known as convex distance function Delaunay graphs. In this paper we prove that for any k≥ 2, any X, and any convex compact set S, the number of hyperedges in H(X,S,k) is at most (2k-1)|X| - k2 + 1 - Σi=1k-1ai, where ai is the number of i-element subsets of X that can be separated from the rest of X with a straight line. In particular, this bound is independent of S and indeed the bound is tight for all "round" sets S and point sets X in general position with respect to S. This refines a general result of Buzaglo, Pinchasi and Rote stating that every pseudodisc topological hypergraph with vertex set X has O(k2|X|) hyperedges of size k or less.