The Product of a Generalized Quaternion Group And a Cyclic Group

Abstract

Let X(Q)=QC be a group, where Q is a generalized quaternion group and C is a cyclic group such that Q C=1. In this paper, X(Q) will be characterized and moreover, a complete classification for that will be given, provided C is core-free. For the reason of self-constraint, in this paper a classification of the group X(D)=DC is also given, where D is a dihedral group and C is a cyclic group such that D C=1 and C is core-free. Remind that the group X(D) was recently classified in [12], based on a number of papers on skew-morphisms of dihedral groups. In this paper, a different approach from that in [12] will be used.