A construction of a 32-tough plane triangulation with no 2-factor

Abstract

In 1956, Tutte proved the celebrated theorem that every 4-connected planar graph is hamiltonian. This result implies that every more than 32-tough planar graph on at least three vertices is hamiltonian and so has a 2-factor. Owens in 1999 constructed non-hamiltonian maximal planar graphs of toughness arbitrarily close to 32 and asked whether there exists a maximal non-hamiltonian planar graph of toughness exactly 32. In fact, the graphs Owens constructed do not even contain a 2-factor. Thus the toughness of exactly 32 is the only case left in asking the existence of 2-factors in tough planar graphs. This question was also asked by Bauer, Broersma, and Schmeichel in a survey. In this paper, we close this gap by constructing a maximal 32-tough plane graph with no 2-factor, answering the question asked by Owens as well as by Bauer, Broersma, and Schmeichel.

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