Counting Hamiltonian cycles in 2-tiled graphs
Abstract
In 1930, Kuratowski showed that and are the only two minor-minimal non-planar graphs. Robertson and Seymour extended finiteness of the set of forbidden minors for any surface. \v{S}ir\'{a}\v{n} and Kochol showed that there are infinitely many -crossing-critical graphs for any , even if restricted to simple -connected graphs. Recently, -crossing-critical graphs have been completely characterized by Bokal, Oporowski, Richter, and Salazar. We present a simplified description of large 2-crossing-critical graphs and use this simplification to count Hamiltonian cycles in such graphs. We generalize this approach to an algorithm counting Hamiltonian cycles in all 2-tiled graphs, thus extending the results of Bodro\v{z}a-Panti\'c, Kwong, Doroslova\v{c}ki, and Panti\'c for .
Keywords
Cite
@article{arxiv.2102.07985,
title = {Counting Hamiltonian cycles in 2-tiled graphs},
author = {Alen Vegi Kalamar and Tadej Žerak and Drago Bokal},
journal= {arXiv preprint arXiv:2102.07985},
year = {2021}
}
Comments
19 pages