Schur-Weyl duality for certain infinite dimensional Uq(sl2)-modules

Abstract

Let V be the two-dimensional simple module and M be a projective Verma module for the quantum group of sl2 at generic q. We show that for any r 1, the endomorphism algebra of M V r is isomorphic to the type B Temperley-Lieb algebra TLBr(q, Q) for an appropriate parameter Q depending on M. The parameter Q is determined explicitly. We also use the cellular structure to determine precisely for which values of r the endomorphism algebra is semisimple. A key element of our method is to identify the algebras TLBr(q,Q) as the endomorphism algebras of the objects in a quotient category of the category of coloured ribbon graphs of Freyd-Yetter or the tangle diagrams of Turaev and Reshitikhin.