Optimal extensions and quotients of 2--Cayley Digraphs

Abstract

Given a finite Abelian group G and a generator subset A⊂ G of cardinality two, we consider the Cayley digraph =Cay(G,A). This digraph is called 2--Cayley digraph. An extension of is a 2--Cayley digraph, '=Cay(G',A) with G<G', such that there is some subgroup H<G' satisfying the digraph isomorphism Cay(G'/H,A)(G,A). We also call the digraph a quotient of '. Notice that the generator set does not change. A 2--Cayley digraph is called optimal when its diameter is optimal with respect to its order. In this work we define two procedures, E and Q, which generate a particular type of extensions and quotients of 2--Cayley digraphs, respectively. These procedures are used to obtain optimal quotients and extensions. Quotients obtained by procedure Q of optimal 2--Cayley digraphs are proved to be also optimal. The number of tight extensions, generated by procedure E from a given tight digraph, is characterized. Tight digraphs for which procedure E gives infinite tight extensions are also characterized. Finally, these two procedures allow the obtention of new optimal families of 2--Cayley digraphs and also the improvement of the diameter of many proposals in the literature.