$2$-Layer $k$-Planar Graphs: Density, Crossing Lemma, Relationships, and Pathwidth
Abstract
The -layer drawing model is a well-established paradigm to visualize bipartite graphs. Several beyond-planar graph classes have been studied under this model. Surprisingly, however, the fundamental class of -planar graphs has been considered only for in this context. We provide several contributions that address this gap in the literature. First, we show tight density bounds for the classes of -layer -planar graphs with . Based on these results, we provide a Crossing Lemma for -layer -planar graphs, which then implies a general density bound for -layer -planar graphs. We prove this bound to be almost optimal with a corresponding lower bound construction. Finally, we study relationships between -planarity and -quasiplanarity in the -layer model and show that -layer -planar graphs have pathwidth at most .
Cite
@article{arxiv.2008.09329,
title = {$2$-Layer $k$-Planar Graphs: Density, Crossing Lemma, Relationships, and Pathwidth},
author = {Patrizio Angelini and Giordano Da Lozzo and Henry Förster and Thomas Schneck},
journal= {arXiv preprint arXiv:2008.09329},
year = {2020}
}
Comments
Appears in the Proceedings of the 28th International Symposium on Graph Drawing and Network Visualization (GD 2020)