Large Cayley digraphs and bipartite Cayley digraphs of odd diameters

Abstract

Let Cd,k be the largest number of vertices in a Cayley digraph of degree d and diameter k, and let BCd,k be the largest order of a bipartite Cayley digraph for given d and k. For every degree d≥2 and for every odd k we construct Cayley digraphs of order 2k(d2)k and diameter at most k, where k 3, and bipartite Cayley digraphs of order 2(k-1)(d2)k-1 and diameter at most k, where k 5. These constructions yield the bounds Cd,k 2k(d2)k for odd k 3 and d 3k2k+1, and BCd,k 2(k-1)(d2)k-1 for odd k 5 and d 3k-1k-1+1. Our constructions give the best currently known bounds on the orders of large Cayley digraphs and bipartite Cayley digraphs of given degree and odd diameter k 5. In our proofs we use new techniques based on properties of group automorphisms of direct products of abelian groups.