Highest weight theory for minimal finite W-superalgebras and related Whittaker categories

Abstract

Let g=g0+g1 be a basic classical Lie superalgebra over C, and e=eθ∈g0 with -θ being a minimal root of g. Set U(g,e) to be the minimal finite W-superalgebras associated with the pair (g,e). In this paper we study the highest weight theory for U(g,e), introduce the Verma modules and give a complete isomorphism classification of finite-dimensional irreducible modules, via the parameter set consisting of pairs of weights and levels. Those Verma modules can be further described via parabolic induction from Whittaker modules for osp(1|2) or sl(2) respectively, depending on the detecting parity of r:=g(-1)1. We then introduce and investigate the BGG category O for U(g,e), establishing highest weight theory, as a counterpart of the works for finite W-algebras by Brundan-Goodwin-Kleshchev and Losev, respectively. In comparison with the non-super case, the significant difference here lies in the situation when r is odd, which is a completely new phenomenon. The difficulty and complicated computation arise from there.