Generalized quaternion NCI-groups, NNN-groups and NNND-groups

Abstract

A Cayley (di)graph (G,S) of a finite group G is called CI if, for every Cayley (di)graph (G,T) of G, (G,S) (G,T) implies that Sσ=T for some σ∈ (G). The group G is called an NDCI-group (resp. NCI-group) if every normal Cayley digraph (resp. graph) of G is CI. It was shown that the generalized quaternion group 4n of order 4n (n≥ 2) is an NDCI-group if and only if either n=2 or n is odd, but its NCI-group classification has been left as an open question. In this paper, we solve the question and prove that 4n is an NCI-group for every n≥ 2. A normal Cayley (di)graph of a group G is called NNN if its automorphism group contains a non-normal regular subgroup isomorphic to G, and G is called an NNND-group (resp. NNN-group) if it admits an NNN Cayley digraph (resp. graph). In this paper, we show that 4n is not an NNN-group for every n≥ 2, and is an NNND-group if and only if n≥ 6 and n is even.