On $k$-planar Graphs without Short Cycles
Abstract
We study the impact of forbidding short cycles to the edge density of -planar graphs; a -planar graph is one that can be drawn in the plane with at most crossings per edge. Specifically, we consider three settings, according to which the forbidden substructures are -cycles, -cycles or both of them (i.e., girth ). For all three settings and all , we present lower and upper bounds on the maximum number of edges in any -planar graph on vertices. Our bounds are of the form , for some explicit constant that depends on and on the setting. For general our bounds are of the form , for some explicit constant . These results are obtained by leveraging different techniques, such as the discharging method, the recently introduced density formula for non-planar graphs, and new upper bounds for the crossing number of -- and -planar graphs in combination with corresponding lower bounds based on the Crossing Lemma.
Keywords
Cite
@article{arxiv.2408.16085,
title = {On $k$-planar Graphs without Short Cycles},
author = {Michael A. Bekos and Prosenjit Bose and Aaron Büngener and Vida Dujmović and Michael Hoffmann and Michael Kaufmann and Pat Morin and Saeed Odak and Alexandra Weinberger},
journal= {arXiv preprint arXiv:2408.16085},
year = {2024}
}
Comments
Appears in the Proceedings of the 32nd International Symposium on Graph Drawing and Network Visualization (GD 2024)