Minimum degree edge-disjoint Hamilton cycles in random directed graphs

Abstract

In this paper we consider the problem of finding ``as many edge-disjoint Hamilton cycles as possible'' in the binomial random digraph Dn,p. We show that a typical Dn,p contains precisely the minimum between the minimum out- and in-degrees many edge-disjoint Hamilton cycles, given that p≥ 15 n/n, which is optimal up to a factor of poly n. Our proof provides a randomized algorithm to generate the cycles and uses a novel idea of generating Dn,p in a sophisticated way that enables us to control some key properties, and on an ``online sprinkling'' idea as was introduced by Ferber and Vu.

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