Solution to a problem of Bollob\'as and H\"aggkvist on Hamilton cycles in regular graphs
Abstract
We prove that, for large n, every 3-connected D-regular graph on n vertices with D ≥ n/4 is Hamiltonian. This is best possible and confirms a conjecture posed independently by Bollob\'as and H\"aggkvist in the 1970s. The proof builds on a structural decomposition result proved recently by the same authors.
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