Vanishing sheaves and the geometric Whittaker model
Abstract
Let G be a connected reductive algebraic group over an algebraically closed field k of characteristic p>0 and let be a prime number different from p. Let U⊂ G be a maximal unipotent subgroup, and let T be a maximal torus normalizing U with normalizer N=NG(T). Let W=N/T be the Weyl group of G. Let L be a non-degenerate -adic multiplicative local system on U. In this paper we prove that the bi-Whittaker category, namely the triangulated monoidal category of (U,L)-bi-equivariant complexes on G, is monoidally equivalent to an explicit thick triangulated monoidal subcategory DW(T)⊂ DW(T) of ''W-equivariant central sheaves'' on the torus, answering a question raised by Drinfeld. In particular, the bi-Whittaker category has the structure of a symmetric monoidal category. We also study a certain thick triangulated monoidal subcategory DG(G)⊂ DG(G) of ''vanishing sheaves'' and prove that it is braided monoidally equivalent to an explicit thick triangulated monoidal subcategory DN(T)⊂ DN(T) of ''N-equivariant central sheaves'' on the torus. The above equivalence is given by an enhancement of the parabolic restriction functor restricted to the subcategory DG(G).
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