English

$2$-Layer $k$-Planar Graphs: Density, Crossing Lemma, Relationships, and Pathwidth

Discrete Mathematics 2020-08-24 v1 Computational Geometry Data Structures and Algorithms

Abstract

The 22-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 kk-planar graphs has been considered only for k=1k=1 in this context. We provide several contributions that address this gap in the literature. First, we show tight density bounds for the classes of 22-layer kk-planar graphs with k{2,3,4,5}k\in\{2,3,4,5\}. Based on these results, we provide a Crossing Lemma for 22-layer kk-planar graphs, which then implies a general density bound for 22-layer kk-planar graphs. We prove this bound to be almost optimal with a corresponding lower bound construction. Finally, we study relationships between kk-planarity and hh-quasiplanarity in the 22-layer model and show that 22-layer kk-planar graphs have pathwidth at most k+1k+1.

Keywords

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)

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