Loop group actions on categories and Whittaker invariants

Abstract

We develop some aspects of the theory of D-modules on ind-schemes of pro-finite type. These notions are used to define D-modules on (algebraic) loop groups and, consequently, actions of loop groups on DG categories. Let N be the maximal unipotent subgroup of a reductive group G. For a non-degenerate character : N(\!(t)\!) Ga and a category C acted upon by N(\!(t)\!) , we define the category CN(\!(t)\!), of (N(\!(t)\!), )-invariant objects, along with the coinvariant category CN(\!(t)\!), . These are the Whittaker categories of C, which are in general not equivalent. However, there is always a family of functors k: CN(\!(t)\!), CN(\!(t)\!), , parametrized by k ∈ Z. We conjecture that each k is an equivalence, provided that the N(\!(t)\!)-action on C extends to a G(\!(t)\!)-action. Using the Fourier-Deligne transform (adapted to Tate vector spaces), we prove this conjecture for G= GLn and show that the Whittaker categories can be obtained by taking invariants of C with respect to a very explicit pro-unipotent group subscheme (not ind-scheme) of G(\!(t)\!).