Digraphs with small automorphism groups that are Cayley on two nonisomorphic groups

Abstract

Let =Cay(G,S) be a Cayley digraph on a group G and let A=Aut(). The Cayley index of is |A:G|. It has previously been shown that, if p is a prime, G is a cyclic p-group and A contains a noncyclic regular subgroup, then the Cayley index of is superexponential in p. We present evidence suggesting that cyclic groups are exceptional in this respect. Specifically, we establish the contrasting result that, if p is an odd prime and G is abelian but not cyclic, and has order a power of p at least p3, then there is a Cayley digraph on G whose Cayley index is just p, and whose automorphism group contains a nonabelian regular subgroup.