Vust's theorem and higher level Schur-Weyl duality for types B, C and D

Abstract

Let G be a complex linear algebraic group, g=(G) its Lie algebra and e∈g a nilpotent element. Vust's theorem says that in case of G=(V), the algebra EndGe(V d), where Ge⊂ G is the stabilizer of e under the adjoint action, is generated by the image of the natural action of d-th symmetric group Sd and the linear maps \1 (i-1) e1 (d-i)|i=1,…,d\. In this paper, we generalize this theorem to G=(V) and (V) for nilpotent element e with G· e being normal. As an application, we study the higher Schur-Weyl duality in the sense of BK2 for types B, C and D, which establishes a relationship between W-algebras and degenerate affine braid algebras.