M. N. Ellingham, Emily A. Marshall, Kenta Ozeki, Shoichi Tsuchiya
Published 2016-10-20Version 1
Tutte showed that $4$-connected planar graphs are Hamiltonian, but it is well known that $3$-connected planar graphs need not be Hamiltonian. We show that $K_{2,5}$-minor-free $3$-connected planar graphs are Hamiltonian. This does not extend to $K_{2,5}$-minor-free $3$-connected graphs in general, as shown by the Petersen graph, and does not extend to $K_{2,6}$-minor-free $3$-connected planar graphs, as we show by an infinite family of examples.
Comments: 18 pages, 29 figures
Hamiltonicity of 3-arc graphs
Hamiltonicity and $σ$-hypergraphs
Hamiltonicity of $2$-block intersection graphs of ${\rm{TS}}(v,λ)$: $v\equiv 0$ or $4\pmod{12}$
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