Generalized quaternion groups with the m-DCI property

Abstract

A Cayley digraph Cay(G,S) of a finite group G with respect to a subset S of G is said to be a CI-digraph if for every Cayley digraph Cay(G,T) isomorphic to Cay(G,S), there exists an automorphism σ of G such that Sσ=T. A finite group G is said to have the m-DCI property for some positive integer m if all m-valent Cayley digraphs of G are CI-digraphs, and is said to be a DCI-group if G has the m-DCI property for all 1≤ m≤ |G|. Let Q4n be a generalized quaternion group of order 4n with an integer n≥ 3, and let Q4n have the m-DCI property for some 1 ≤ m≤ 2n-1. It is shown in this paper that n is odd, and n is not divisible by p2 for any prime p≤ m-1. Furthermore, if n≥ 3 is a power of a prime p, then Q4n has the m-DCI property if and only if p is odd, and either n=p or 1≤ m≤ p.