A generalization of Tutte’s theorem on Hamiltonian cycles in planar graphs |
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| Authors: | Jochen Harant Stefan Senitsch |
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| Affiliation: | Department of Mathematics, Technical University of Ilmenau, D-98684 Ilmenau, Germany |
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| Abstract: | In 1956, W.T. Tutte proved that a 4-connected planar graph is hamiltonian. Moreover, in 1997, D.P. Sanders extended this to the result that a 4-connected planar graph contains a hamiltonian cycle through any two of its edges. We prove that a planar graph G has a cycle containing a given subset X of its vertex set and any two prescribed edges of the subgraph of G induced by X if |X|≥3 and if X is 4-connected in G. If X=V(G) then Sanders’ result follows. |
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| Keywords: | Planar graph Hamiltonian cycle |
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