2018
DOI: 10.1002/jgt.22388
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Cubic vertices in planar hypohamiltonian graphs

Abstract: Thomassen showed in 1978 that every planar hypohamiltonian graph contains a cubic vertex. Equivalently, a planar graph with minimum degree at least 4 in which every vertex‐deleted subgraph is hamiltonian, must be itself hamiltonian. By applying work of Brinkmann and the author, we extend this result in three directions. We prove that (i) every planar hypohamiltonian graph contains at least four cubic vertices, (ii) every planar almost hypohamiltonian graph contains a cubic vertex, which is not the exceptional … Show more

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Cited by 9 publications
(16 citation statements)
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References 34 publications
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“…We obtain a planar hypohamiltonian graph with at most two cubic vertices. This, however, contradicts [17,Theorem 3]. If cr(H) = 1, then we glue two copies of H ′ and are led, in the same way, to a contradiction.…”
Section: Corollary 12mentioning
confidence: 91%
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“…We obtain a planar hypohamiltonian graph with at most two cubic vertices. This, however, contradicts [17,Theorem 3]. If cr(H) = 1, then we glue two copies of H ′ and are led, in the same way, to a contradiction.…”
Section: Corollary 12mentioning
confidence: 91%
“…Thereafter, in Section 4, we give applications of Theorem 1-in particular, we (i) discuss how our results relate to the traceability of 3-connected graphs with few 3-cuts and few crossings, (ii) provide, via a toughness argument, 3-connected non-Hamiltonian and non-traceable graphs with small crossing number and few 3-cuts, (iii) show that every 3-connected graph with at most one crossing and containing at most one 3-cut is Hamiltonian (this extends a result of Thomassen [13] which extends the afore-mentioned result of Tutte [15]), and (iv) comment on hypohamiltonian graphs. The latter includes an extension of a theorem of the second author [17] which extends a theorem of Thomassen [13]. In the last section, we give tabular overviews of certain Hamiltonian properties of 3-connected graphs with few crossings and a small number of 3-cuts.…”
Section: Theorem 1 Every 4-connected Graph With Crossing Number At Momentioning
confidence: 93%
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