Normal Cayley digraphs of cyclic groups with CI-property

Abstract

A Cayley (di)graph Cay(G,S) of a group G with respect to a subset S of G is called normal if the right regular representation of G is a normal subgroup in the full automorphism group of Cay(G,S), and is called a CI-(di)graph if for every T⊂eq G, Cay(G,S) Cay(G,T) implies that there is σ∈ Aut(G) such that Sσ=T. We call a group G a NDCI-group if all normal Cayley digraphs of G are CI-digraphs, and a NCI-group if all normal Cayley graphs of G are CI-graphs, respectively. In this paper, we prove that a cyclic group of order n is a NDCI-group if and only if 8 n, and is a NCI-group if and only if either n=8 or 8 n.