On -groups and -groups

Abstract

Let G be a finite group and S be a subset of G. A bi-Cayley graph (G,S) is a simple and an undirected graph with vertex-set G×\1,2\ and edge-set \\(g,1),(sg,2)\ g∈ G, s∈ S\. A bi-Cayley graph (G,S) is called a -graph if for any bi-Cayley graph (G,T), whenever (G,S)(G,T) we have T=gSσ for some g∈ G and σ∈(G). A group G is called a -group if every bi-Cayley graph of G is a -graph. In this paper, we showed that every -group is a -group, which gives a positive answer to a conjecture proposed by Arezoomand and Taeri in arezoomand1. Also we proved that there is no any non-Abelian 4--simple group. In addition all -groups of order 2p, p a prime, are characterized.