The category of Whittaker modules over the Cartan Type Lie algebra S2

Abstract

The Lie algebra S2 of polynomial vector fields on C2 with constant divergence is an important Cartan type Lie algebra. In this paper, we study Whittaker S2-modules that are locally finite over span\∂∂ t1, ∂∂ t2\. We first show that each block ΩS2a of the category of (A2, S2)-Whittaker modules with finite-dimensional Whittaker vector spaces is equivalent to the category of finite-dimensional modules over the parabolic subalgebra S2≥ 0. Then we classify all simple Whittaker S2-modules in every block ΩS2a . Finally, we establish an equivalence between ΩS21 and the category H1-fmod of finite-dimensional modules over an associative algebra H1, whose generators are also determined.