Whittaker Category and Finite W-superalgebras for Cartan Type Lie Superalgebras

Abstract

Let W(n) be the finite-dimensional simple Lie superalgebra of fundamental type in the Cartan type series of Kac's classification result Kac77 over an algebraically closed field of characteristic 0. Let g be the graded-zero part of W(n) which is isomorphic to gl(n). In the first part of this paper, following the basic idea of taking the ``minimal" parabolic subalgebra P as a working platform in DSY we introduce the Whittaker category for representations of W(n) associated with a nilpotent element e in g0 and with W(n)-1. This Whittaker category turns out to be close to the classical Whittaker category McDowell and Miličić-Soergel studied in Mc and MS, respectively (or see Back). We finally classify the simple objects in . In the second part, we introduce the finite W-algebra associated with e, we then establish a generalized Skryabin's equivalence between the representation category of the finite W-superalgebra and the category ' of so-called weakened Whittaker modules over W(n). Here ' naturally contains as a full subcategory.