On Equal Point Separation by Planar Cell Decompositions

Abstract

In this paper, we investigate the problem of separating a set X of points in R2 with an arrangement of K lines such that each cell contains an asymptotically equal number of points (up to a constant ratio). We consider a property of curves called the stabbing number, defined to be the maximum countable number of intersections possible between the curve and a line in the plane. We show that large subsets of X lying on Jordan curves of low stabbing number are an obstacle to equal separation. We further discuss Jordan curves of minimal stabbing number containing X. Our results generalize recent bounds on the Erdos-Szekeres Conjecture, showing that for fixed d and sufficiently large n, if |X| 2cdn/d + o(n) with cd = 1 + O(1d), then there exists a subset of n points lying on a Jordan curve with stabbing number at most d.