Fusion Rings over Drinfeld Doubles

Abstract

The fusion rules in Repf D(G) for a finite group G can be computed in terms of character inner products. Using an explicit formula for these fusion rules, we show that Repf D(G) is multiplicity free for two infinite families of finite groups: the Dihedral groups and the Dicyclic groups. In fact, we will compute all fusion rules in these categories. Multiplicity freeness is a desired property for modular tensor categories, since it greatly simplifies the computation of F-matrices. Furthermore, we observe that the fusion rules for Dihedral groups D2n with n odd are extremely similar to the fusion rules of Type B level 2 fusion algebras of Wess-Zumino-Witten conformal field theories. Moreover, we give a proof of the fusion rule formula by using Mackey theory.