Treewidth of Outer k-Planar Graphs

Abstract

Treewidth is an important structural graph parameter that quantifies how closely a graph resembles a tree-like structure. It has applications in many algorithmic and combinatorial problems. In this paper, we study the treewidth of outer k-planar graphs, that is, graphs admitting a convex drawing (a straight-line drawing where all vertices lie on a circle) in which every edge crosses at most k other edges. We also consider the more general class of outer min-k-planar graphs, which are graphs admitting a convex drawing where for every crossing of two edges at least one of these edges is crossed at most k times. Firman, Gutowski, Kryven, Okada and Wolff [GD 2024] proved that every outer k-planar graph has treewidth at most 1.5k+2 and provided a lower bound of k+2 for even k. We establish a lower bound of 1.5k+0.5 for every odd k. Additionally, they showed that every outer min-k-planar graph has treewidth at most 3k+1. We improve this upper bound to 3 · k/2 +4. Our approach also allows us to upper bound the separation number, a parameter closely related to treewidth, of outer min-k-planar graphs by 2 · k/2 +4. This improves upon the previous bound of 2k+1 and achieves a bound with an optimal multiplicative constant.