English

$K_2$-Hamiltonian Graphs: II

Combinatorics 2024-07-19 v2 Discrete Mathematics

Abstract

In this paper we use theoretical and computational tools to continue our investigation of K2K_2-hamiltonian graphs, that is, graphs in which the removal of any pair of adjacent vertices yields a hamiltonian graph, and their interplay with K1K_1-hamiltonian graphs, that is, graphs in which every vertex-deleted subgraph is hamiltonian. Perhaps surprisingly, there exist graphs that are both K1K_1- and K2K_2-hamiltonian, yet non-hamiltonian, for example, the Petersen graph. Gr\"unbaum conjectured that every planar K1K_1-hamiltonian graph must itself be hamiltonian; Thomassen disproved this conjecture. Here we show that even planar graphs that are both K1K_1- and K2K_2-hamiltonian need not be hamiltonian, and that the number of such graphs grows at least exponentially. Motivated by results of Aldred, McKay, and Wormald, we determine for every integer nn that is not 14 or 17 whether there exists a K2K_2-hypohamiltonian, that is, non-hamiltonian and K2K_2-hamiltonian, graph of order nn, and characterise all orders for which such cubic graphs and such snarks exist. We also describe the smallest cubic planar graph which is K2K_2-hypohamiltonian, as well as the smallest planar K2K_2-hypohamiltonian graph of girth 55. We conclude with open problems and by correcting two inaccuracies from the first article.

Keywords

Cite

@article{arxiv.2311.05262,
  title  = {$K_2$-Hamiltonian Graphs: II},
  author = {Jan Goedgebeur and Jarne Renders and Gábor Wiener and Carol T. Zamfirescu},
  journal= {arXiv preprint arXiv:2311.05262},
  year   = {2024}
}

Comments

30 pages

R2 v1 2026-06-28T13:15:59.647Z