Whittaker category for the Lie algebra of polynomial vector fields
Abstract
For any positive integer n, let An=C[t1,…,tn], Wn=Der(An) and n=Span\∂∂t1,…,∂∂tn\. Then (Wn, n) is a Whittaker pair. A Wn-module M on which n operates locally finite is called a Whittaker module. We show that each block aW of the category of (An,Wn)-Whittaker modules with finite dimensional Whittaker vector spaces is equivalent to the category of finite dimensional modules over Ln, where Ln is the Lie subalgebra of Wn consisting of vector fields vanishing at the origin. As a corollary, we classify all simple non-singular Whittaker Wn-modules with finite dimensional Whittaker vector spaces using gln-modules. We also obtain an analogue of Skryabin's equivalence for the non-singular block aW.
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