On almost hypohamiltonian graphs
Abstract
A graph is almost hypohamiltonian (a.h.) if is non-hamiltonian, there exists a vertex in such that is non-hamiltonian, and is hamiltonian for every vertex in . The second author asked in [J. Graph Theory 79 (2015) 63--81] for all orders for which a.h. graphs exist. Here we solve this problem. To this end, we present a specialised algorithm which generates complete sets of a.h. graphs for various orders. Furthermore, we show that the smallest cubic a.h. graphs have order 26. We provide a lower bound for the order of the smallest planar a.h. graph and improve the upper bound for the order of the smallest planar a.h. graph containing a cubic vertex. We also determine the smallest planar a.h. graphs of girth 5, both in the general and cubic case. Finally, we extend a result of Steffen on snarks and improve two bounds on longest paths and longest cycles in polyhedral graphs due to Jooyandeh, McKay, {\"O}sterg{\aa}rd, Pettersson, and the second author.
Keywords
Cite
@article{arxiv.1606.06577,
title = {On almost hypohamiltonian graphs},
author = {Jan Goedgebeur and Carol T. Zamfirescu},
journal= {arXiv preprint arXiv:1606.06577},
year = {2023}
}
Comments
18 pages. arXiv admin note: text overlap with arXiv:1602.07171