Tensor Representations for the Drinfeld Double of the Taft Algebra

Abstract

Over an algebraically closed field k of characteristic zero, the Drinfeld double Dn of the Taft algebra that is defined using a primitive nth root of unity q ∈ k for n ≥ 2 is a quasitriangular Hopf algebra. Kauffman and Radford have shown that Dn has a ribbon element if and only if n is odd, and the ribbon element is unique; however there has been no explicit description of this element. In this work, we determine the ribbon element of Dn explicitly. For any n ≥ 2, we use the R-matrix of Dn to construct an action of the Temperley-Lieb algebra TLk() with = -(q12+q-12) on the k-fold tensor power V k of any two-dimensional simple Dn-module V. This action is known to be faithful for arbitrary k ≥ 1. We show that TLk() is isomorphic to the centralizer algebra EndDn(V k) for 1 k 2n-2.