On the determinant of representations of generalized symmetric groups

Abstract

In this paper we study the determinant of irreducible representations of the generalized symmetric groups Zr Sn. We give an explicit formula to compute the determinant of an irreducible representation of Zr Sn. Recently, several authors have characterized and counted the number of irreducible representations of a given finite group with nontrivial determinant. Motivated by these results, for given integer n, r an odd prime and ζ a nontrivial multiplicative character of Zr Sn with n<r, we obtain an explicit formula to compute Nζ(n), the number of irreducible representations of Zr Sn whose determinant is ζ.