Counting Hamilton decompositions of oriented graphs

Abstract

A Hamilton cycle in a directed graph G is a cycle that passes through every vertex of G. A Hamiltonian decomposition of G is a partition of its edge set into disjoint Hamilton cycles. In the late 60s Kelly conjectured that every regular tournament has a Hamilton decomposition. This conjecture was recently settled by K\"uhn and Osthus, who proved more generally that every r-regular n-vertex oriented graph G (without antiparallel edges) with r=cn for some fixed c>3/8 has a Hamiltonian decomposition, provided n=n(c) is sufficiently large. In this paper we address the natural question of estimating the number of such decompositions of G and show that this number is n(1-o(1))cn2. In addition, we also obtain a new and much simpler proof for the approximate version of Kelly's conjecture.