On $(\le k)$-edges, crossings, and halving lines of geometric drawings of $K_n$

TL;DR

This paper improves bounds on the number of certain geometric configurations in point sets, such as crossings and halving lines, and determines exact values for small point sets, advancing understanding of geometric graph properties.

Contribution

It tightens lower bounds on the number of (k)-edges and crossing numbers, and provides exact values for these metrics for all point sets up to 27 points.

Findings

Improved lower bounds on k-edges for larger k.

Enhanced lower bounds on rectilinear crossing numbers.

Exact values of crossing number and halving lines for n ;27.

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 $\crg(P)$, is the \emph{rectilinear crossing number} of $P$. A \emph{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 $k$\emph{-edge}, $0\leq k\leq n/2-1$, is a line passing through two points of $P$ and leaving exactly $k$ points of $P$ on one side. The number of $(\le k)$-edges of $P$ is denoted by $E_{\leq k}(P) $. Let $\rcr(n)$, $h(n)$, and $E_{\leq k}(n) $ denote the minimum of $\crg(P)$, the maximum of $h(P)$, and the minimum of $E_{\leq 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 $E_{\leq k}(n)$ is tight for $k<\lceil (4n-2) /9\rceil $ and improve it for all $k\geq \lceil (4n-2) /9 \rceil $. This in turn improves the lower bound on $\rcr(n)$ from $0.37968\binom{n} {4}+\Theta(n^{3})$ to {277/729}\binom{n}{4}+\Theta(n^{3})\geq 0.37997\binom{n}{4}+\Theta(n^{3})$. We also give the exact values of $\rcr(n)$ and $h(n) $ for all $n\leq27$. Exact values were known only for $n\leq18$ and odd $n\leq21$ for the crossing number, and for $n\leq14$ and odd $n\leq21$ for halving lines.