On ( k)-edges, crossings, and halving lines of geometric drawings of Kn

Abstract

Let P be a set of points in general position in the plane. Join all pairs of points in P with straight line segments. The number of segment-crossings in such a drawing, denoted by (P), is the rectilinear crossing number of P. A halving line of P is a line passing though two points of P that divides the rest of the points of P in (almost) half. The number of halving lines of P is denoted by h(P). Similarly, a k-edge, 0≤ k≤ n/2-1, is a line passing through two points of P and leaving exactly k points of P on one side. The number of ( k)-edges of P is denoted by E≤ k(P) . Let (n), h(n), and E≤ k(n) denote the minimum of (P), the maximum of h(P), and the minimum of E≤ k(P) , respectively, over all sets P of n points in general position in the plane. We show that the previously best known lower bound on E≤ k(n) is tight for k< (4n-2) /9 and improve it for all k≥ (4n-2) /9 . This in turn improves the lower bound on (n) from 0.37968n 4+(n3) to 277/729n4+(n3)≥ 0.37997n4+(n3). We also give the exact values of (n) and h(n) for all n≤27. Exact values were known only for n≤18 and odd n≤21 for the crossing number, and for n≤14 and odd n≤21$ for halving lines.