Hamiltonian degree sequences in digraphs

Abstract

We show that for each η>0 every digraph G of sufficiently large order n is Hamiltonian if its out- and indegree sequences d+1 ... d+n and d- 1 ... d-n satisfy (i) d+i ≥ i+ η n or d-n-i- η n ≥ n-i and (ii) d-i ≥ i+ η n or d+n-i- η n ≥ n-i for all i < n/2. This gives an approximate solution to a problem of Nash-Williams concerning a digraph analogue of Chv\'atal's theorem. In fact, we prove the stronger result that such digraphs G are pancyclic.