K2-Hamiltonian Graphs: II

Abstract

In this paper we use theoretical and computational tools to continue our investigation of K2-hamiltonian graphs, that is, graphs in which the removal of any pair of adjacent vertices yields a hamiltonian graph, and their interplay with K1-hamiltonian graphs, that is, graphs in which every vertex-deleted subgraph is hamiltonian. Perhaps surprisingly, there exist graphs that are both K1- and K2-hamiltonian, yet non-hamiltonian, for example, the Petersen graph. Gr\"unbaum conjectured that every planar K1-hamiltonian graph must itself be hamiltonian; Thomassen disproved this conjecture. Here we show that even planar graphs that are both K1- and K2-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 n that is not 14 or 17 whether there exists a K2-hypohamiltonian, that is, non-hamiltonian and K2-hamiltonian, graph of order n, and characterise all orders for which such cubic graphs and such snarks exist. We also describe the smallest cubic planar graph which is K2-hypohamiltonian, as well as the smallest planar K2-hypohamiltonian graph of girth 5. We conclude with open problems and by correcting two inaccuracies from the first article.

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