On the Uncrossed Number of Graphs

TL;DR

This paper determines the exact uncrossed numbers for complete and complete bipartite graphs, provides a lower bound based on graph parameters, and proves NP-hardness of related crossing number problems.

Contribution

It offers the first exact values for uncrossed numbers of specific graph classes and establishes computational complexity results for crossing number determination.

Findings

Exact uncrossed numbers for complete graphs

Exact uncrossed numbers for complete bipartite graphs

NP-hardness of the crossing number problem

Abstract

Visualizing a graph $G$ in the plane nicely, for example, without crossings, is unfortunately not always possible. To address this problem, Masa\v{r}\'ik and Hlin\v{e}n\'y [GD 2023] recently asked for each edge of $G$ to be drawn without crossings while allowing multiple different drawings of $G$. More formally, a collection $\mathcal{D}$ of drawings of $G$ is uncrossed if, for each edge $e$ of $G$, there is a drawing in $\mathcal{D}$ such that $e$ is uncrossed. The uncrossed number $\mathrm{unc}(G)$ of $G$ is then the minimum number of drawings in some uncrossed collection of $G$. No exact values of the uncrossed numbers have been determined yet, not even for simple graph classes. In this paper, we provide the exact values for uncrossed numbers of complete and complete bipartite graphs, partly confirming and partly refuting a conjecture posed by Hlin\v{e}n\'y and Masa\v{r}\'ik. We also present a strong general lower bound on $\mathrm{unc}(G)$ in terms of the number of vertices and edges of $G$. Moreover, we prove NP-hardness of the related problem of determining the edge crossing number of a graph $G$, which is the smallest number of edges of $G$ taken over all drawings of $G$ that participate in a crossing. This problem was posed as open by Schaefer in his book [Crossing Numbers of Graphs 2018].