Avoiding 5-circuits in a 2-factor of cubic graphs
Abstract
We show that every bridgeless cubic graph G on n vertices other than the Petersen graph has a 2-factor with at most 2(n-2)/15 circuits of length 5. An infinite family of graphs attains this bound. We also show that G has a 2-factor with at most n/5.83 odd circuits. This improves the previously known bound of n/5.41 [Lukotka, M\'acajov\'a, Maz\'ak, Skoviera: Small snarks with large oddness, arXiv:1212.3641 [cs.DM] ].
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