Whittaker categories and the minimal nilpotent finite W-algebra for sln+1

Abstract

For any a=(a1,…,an)∈ Cn, we introduce a Whittaker category Ha whose objects are sln+1-modules M such that e0i-ai acts locally nilpotently on M for all i ∈ \1,…,n\, and the subspace wha(M)=\v∈ M e0i v=aiv, \ i=1,…,n\ is finite dimensional. In this paper, we first give a tensor product decomposition US=W B of the localization US of U(sln+1) with respect to the Ore subset S generated by e01,…, e0n. We show that the associative algebra W is isomorphic to the type An finite W-algebra W(e) defined by a minimal nilpotent element e in sln+1. Then using W-modules as a bridge, we show that each block with a generalized central character of H1 is equivalent to the corresponding block of the cuspidal category C, which is completely characterized by Grantcharov and Serganova. As a consequence, each regular integral block of H1 and the category of finite dimensional modules over $W(e) can be described by a well-studied quiver with certain quadratic relations.