Local Weyl modules and skew Howe duality

Abstract

The skew (gln, glr) Howe duality states that the exterior algebra Λ(Cnr) admits a multiplicity-free decomposition under the natural actions of gln× glr. In this paper, by using certain Lagrange interpolation polynomials of degree r-1, we extend the action of gln on Λ(nr) to its loop algebra L(gln). View Λ(nr) as a module for the loop algebra L(sln) of sln by taking restriction. We prove that every highest weight vector of gln× glr in Λ(nr) generates a local Weyl module of L(sln). Furthermore, we obtain in this way an explicit realization of all local Weyl modules for L(sln).