Skew-morphisms of nonabelian characteristically simple groups

Abstract

A skew-morphism of a finite group G is a permutation on G fixing the identity element, and for which there exists an integer function π on G such that (xy)=(x)π(x)(y) for all x,y∈ G. It has been known that given a skew-morphism of G, the product of with the left regular representation of G forms a permutation group on G, called the skew-product group of . The skew-morphism was introduced as an algebraic tool to investigate regular Cayley maps. In this paper, the skew-product groups are characterized, for all skew-morphisms of finite nonabelian characteristically simple groups (see Theorem 1.1) and correspondingly the Cayley maps on these groups are characterized (see Theorem 1.5).