Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
8905130 | Advances in Mathematics | 2017 | 72 Pages |
Abstract
In the third part, we construct a functor Î:CN((t)),ÏâCN((t)),Ï, which depends on a choice of dimension theory for G((t)). We conjecture this functor to be an equivalence. After developing the Fourier-Deligne transform for Tate vector spaces, we prove this conjecture for G=GLn. We show that both Whittaker categories can be obtained by taking invariants of C with respect to a very explicit pro-unipotent group subscheme (not indscheme!) of G((t)).
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Physical Sciences and Engineering
Mathematics
Mathematics (General)
Authors
Dario Beraldo,