Toroidal grid minors and stretch in embedded graphs
Combinatorics
2019-06-06 v3
Abstract
We investigate the toroidal expanse of an embedded graph G, that is, the size of the largest toroidal grid contained in G as a minor. In the course of this work we introduce a new embedding density parameter, the stretch of an embedded graph G, and use it to bound the toroidal expanse from above and from below within a constant factor depending only on the genus and the maximum degree. We also show that these parameters are tightly related to the planar crossing number of G. As a consequence of our bounds, we derive an efficient constant factor approximation algorithm for the toroidal expanse and for the crossing number of a surface-embedded graph with bounded maximum degree.
Keywords
Cite
@article{arxiv.1403.1273,
title = {Toroidal grid minors and stretch in embedded graphs},
author = {Markus Chimani and Petr Hlineny and Gelasio Salazar},
journal= {arXiv preprint arXiv:1403.1273},
year = {2019}
}