Yangians and degenerate affine Schur algebras

Abstract

Drinfeld's degenerate affine analog of Schur-Weyl duality relates representations of the degenerate affine Hecke algebra AHr to representations of the Yangian Yn. One way to understand the construction is to introduce an intermediate algebra AS(n,r), the degenerate affine Schur algebra, which appears both as the endomorphism algebra of an induced tensor space over AHr, and as the image of a homomorphism Dn,r:Yn → AS(n,r). In this paper, we describe Dn,r using a diagrammatic calculus. Then we use a theorem of Drinfeld to compute Dn,r when n > r, thereby giving a presentation of AS(n,r) in these cases. We formulate a conjecture in the remaining cases. Finally, we apply results of Arakawa to develop some of the representation theory of AS(n,r).

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