Bimodule structure of the mixed tensor product over Uq s(2|1) and quantum walled Brauer algebra

Abstract

We study a mixed tensor product 3 m 3 n of the three-dimensional fundamental representations of the Hopf algebra Uq s(2|1), whenever q is not a root of unity. Formulas for the decomposition of tensor products of any simple and projective Uq s(2|1)-module with the generating modules 3 and 3 are obtained. The centralizer of Uq s(2|1) on the chain is calculated. It is shown to be the quotient Xm,n of the quantum walled Brauer algebra. The structure of projective modules over Xm,n is written down explicitly. It is known that the walled Brauer algebras form an infinite tower. We have calculated the corresponding restriction functors on simple and projective modules over Xm,n. This result forms a crucial step in decomposition of the mixed tensor product as a bimodule over Xm,n Uq s(2|1). We give an explicit bimodule structure for all m,n.