Skew Howe duality for Uq(gln) via quantized Clifford algebras

Abstract

We develop an operator commutant version of the First Fundamental Theorem of invariant theory for the general linear quantum group Uq(gln) by using a double centralizer property inside a quantized Clifford algebra. In particular, we show that Uq(glm) generates the centralizer of the Uq(gln)-action on the tensor product of braided exterior algebras q(Cn) m. We obtain a multiplicity-free decomposition of the Uq(gln) Uq(glm)-module q(Cn) m q(Cnm) by computing explicit joint highest weight vectors. We find that the irreducible modules in this decomposition are parametrized by the same dominant weights as in the classical case of the well-known skew GLn × GLm-duality. Clifford algebras are an essential feature of our work: they provide a unifying framework for classical and quantized skew Howe duality results that can be extended to include orthogonal algebras of types BD.