A Whittaker category for the Symplectic Lie algebra

Abstract

For any n∈ Z≥ 2, let mn be the subalgebra of sp2n spanned by all long negative root vectors X-2εi, i=1,…,n. An sp2n-module M is called a Whittaker module with respect to the Whittaker pair (sp2n,mn) if the action of mn on M is locally finite, according to a definition of Batra and Mazorchuk. This kind of modules are more general than the classical Whittaker modules defined by Kostant. In this paper, we show that each non-singular block WHaμ with finite dimensional Whittaker vector subspaces is equivalent to a module category Wa of the even Weyl algebra Dnev which is semi-simple. As a corollary, any simple module in the block WHi-12ωn for the fundamental weight ωn is equivalent to the Nilsson's module Ni up to an automorphism of sp2n. We also characterize all possible algebra homomorphisms from U(sp2n) to the Weyl algebra Dn under a natural condition.