Braid group approach to the derivation of universal Å matrices
arXiv:q-alg/9712038 · doi:10.1088/0305-4470/29/18/031
Abstract
A new method for deriving universal Å matrices from braid group representation is discussed. In this case, universal Å operators can be defined and expressed in terms of products of braid group generators. The advantage of this method is that matrix elements of Å are rank independent, and leaves multiplicity problem concerning coproducts of the corresponding quantum groups untouched. As examples, Å matrix elements of $[1]\times [1]$, $[2]\times [2]$, $[1^{2}]\times [1^{2}]$, and $[21]\times [21]$ with multiplicity two for $A_{n}$, and $[1]\times [1]$ for $B_{n}$, $C_{n}$, and $D_{n}$ type quantum groups, which are related to Hecke algebra and Birman-Wenzl algebra, respectively, are derived by using this method.
20 pages, LaTeX