Representations of the braid group Bn and the highest weight modules of U(sln-1) and Uq(sln-1)

Abstract

In [1] we have constructed a [n+1/2]+1 parameters family of irreducible representations of the Braid group B3 in arbitrary dimension using a q-deformation of the Pascal triangle. This construction extends in particular results by S.P. Humphries (2000), who constructed representations of the braid group B3 in arbitrary dimension using the classical Pascal triangle. E. Ferrand (2000) obtained an equivalent representation of B3 by considering two special operators in the space Cn[X]. Slightly more general representations were given by I. Tuba and H. Wenzl (2001). They involve [n+1/2] parameters (and also use the classical Pascal's triangle). The latter authors also gave the complete classification of all simple representations of B3 for dimension n≤ 5. Our construction generalize all mentioned results and throws a new light on some of them. We also study the irreducibility and equivalence of the constructed representations. In the present article we show that all representations constructed in [1] may be obtained by taking exponent of the highest weight modules of U(sl2 and Uq(sl2). We generalize these connections between the representation of the braid group Bn and the highest weight modules of the Uq(sln-1) for arbitrary n using the well-known reduced Burau representation.