Edge-disjoint Hamilton cycles under a bipartite-hole condition
Abstract
In 2017, McDiarmid and Yolov introduced the bipartite-hole-number α(G) and proved that δ(G) α(G) forces a Hamilton cycle. They also gave a sufficient condition for packing edge-disjoint Hamilton cycles, and asked whether this condition is sharp or can be relaxed. For integers a,k 2, let f(a,k) be the least integer d such that every graph G on at least three vertices with α(G) a and δ(G) d contains k pairwise edge-disjoint Hamilton cycles. We prove that f(a,k)=Θ(a+k+ak(k+2)). The upper bound uses a deletion lemma for the bipartite-hole-number together with the McDiarmid--Yolov Hamiltonicity theorem and a greedy packing argument. The lower bound is obtained from three extremal constructions, the logarithmic one using a sparse random auxiliary graph with no prescribed bipartite hole.
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