Classification of regular Cayley maps of skew-type three on semidihedral groups

Abstract

It is well known that every regular Cayley map M = (G,X,p) on a finite group G with respect to an inverse-closed generating set X of G and a specified cyclic permutation p on X corresponds to a skew morphism φ on G such that the restriction of φ to X is p. The skew-type of the map M is defined as the index [G: φ], which equals the number of distinct values in Z|φ| taken by the associated power function π of the skew morphism φ. In this paper, we develop a covering theory of skew morphisms and as an application we provide a classification of regular Cayley maps of skew-type three on the semidihedral groups.