Quantized Weyl algebras, the double centralizer property, and a new First Fundamental Theorem for Uq(gln)

Abstract

Let P:= Pm× n denote the quantized coordinate ring of the space of m× n matrices, equipped with natural actions of the quantized enveloping algebras Uq(glm) and Uq(gln). Let L and R denote the images of Uq(glm) and Uq(gln) in End( P), respectively. We define a q-analogue of the algebra of polynomial-coefficient differential operators inside End( P), henceforth denoted by PD, and we prove that L PD and R PD are mutual centralizers inside PD. Using this, we establish a new First Fundamental Theorem of invariant theory for Uq(gln). We also compute explicit formulas in terms of q-determinants for generators of the intersections with PD of the images of the Cartan subalgebras of Uq(glm) and Uq(gln).