On reciprocal characters and the quantum affine Schur-Weyl duality

Abstract

We identify the dominant part of the Frenkel-Reshetikhin q-character with a natural invariant arising from the Langlands/Zelevinsky parameterization for affine Hecke algebras. We introduce the reciprocal character of a module over a GLn-type affine Hecke algebra, defined in terms of multiplicities within parabolic restriction. The main theorem claims that the reciprocal character matches, under quantum affine Schur--Weyl duality, with the dominant q-character for finite-dimensional modules over quantum affine algebras. This result gives a type A realization of the Nakajima expectation that the dominant monomials in the q-character should play the role of monomial-basis coordinates in Lusztig's framework for finite quantum groups. Indeed, under the affine Hecke categorification of Uq(sl∞)+, we prove that the reciprocal character is the specialization at q=1 of the coordinate map attached to a monomial basis. As a consequence, dominant q-character multiplicities for simple (or standard) modules are described by transition coefficients between monomial and canonical (or PBW) bases. Our methods rely on the development of explicit tableau-counting formulas for such dominant multiplicities, or equivalently for the reciprocal characters of standard modules over affine Hecke algebras.