English

Packing Trees into 1-planar Graphs

Computational Geometry 2019-11-06 v1 Combinatorics

Abstract

We introduce and study the 1-planar packing problem: Given kk graphs with nn vertices G1,,GkG_1, \dots, G_k, find a 1-planar graph that contains the given graphs as edge-disjoint spanning subgraphs. We mainly focus on the case when each GiG_i is a tree and k=3k=3. We prove that a triple consisting of three caterpillars or of two caterpillars and a path may not admit a 1-planar packing, while two paths and a special type of caterpillar always have one. We then study 1-planar packings with few crossings and prove that three paths (resp. cycles) admit a 1-planar packing with at most seven (resp. fourteen) crossings. We finally show that a quadruple consisting of three paths and a perfect matching with n12n \geq 12 vertices admits a 1-planar packing, while such a packing does not exist if n10n \leq 10.

Keywords

Cite

@article{arxiv.1911.01761,
  title  = {Packing Trees into 1-planar Graphs},
  author = {Felice De Luca and Emilio Di Giacomo and Seok-Hee Hong and Stephen Kobourov and William Lenhart and Giuseppe Liotta and Henk Meijer and Alessandra Tappini and Stephen Wismath},
  journal= {arXiv preprint arXiv:1911.01761},
  year   = {2019}
}
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