Edge disjoint Hamilton cycles in random digraphs of constant minimum degree
Abstract
We study the existence of directed Hamilton cycles in random digraphs with m edges where we condition on minimum in- and out-degree k+1, where k 1. Denote such a random graph by Dn,m(δ≥ k+1). Let m=cn and c ck, where ck is a sufficiently large constant. We prove that w.h.p. Dn,m(δ≥ k+1) contains k edge disjoint Hamilton cycles.
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