The rectangular representation of the double affine Hecke algebra via elliptic Schur-Weyl duality

Abstract

Given a module M for the algebra Dq(G) of quantum differential operators on G, and a positive integer n, we may equip the space FnG(M) of invariant tensors in V n M, with an action of the double affine Hecke algebra of type An-1. Here G= SLN or GLN, and V is the N-dimensional defining representation of G. In this paper we take M to be the basic Dq(G)-module, i.e. the quantized coordinate algebra M= Oq(G). We describe a weight basis for FnG(Oq(G)) combinatorially in terms of walks in the type A weight lattice, and standard periodic tableaux, and subsequently identify FnG(Oq(G)) with the irreducible "rectangular representation" of height N of the double affine Hecke algebra.