On diregular digraphs with degree two and excess three

Abstract

Moore digraphs, that is digraphs with out-degree d, diameter k and order equal to the Moore bound M(d,k) = 1 + d + d2 + … +dk, arise in the study of optimal network topologies. In an attempt to find digraphs with a `Moore-like' structure, attention has recently been devoted to the study of small digraphs with minimum out-degree d such that between any pair of vertices u,v there is at most one directed path of length ≤ k from u to v; such a digraph has order M(d,k)+ε for some small excess ε . Sillasen et al. have shown that there are no digraphs with out-degree two and excess one. The present author has classified all digraphs with out-degree two and excess two. In this paper it is proven that there are no diregular digraphs with out-degree two and excess three for k ≥ 3, thereby providing the first classification of digraphs with order three away from the Moore bound for a fixed out-degree.