Unipotent nearby cycles and the cohomology of shtukas
Abstract
We give cases in which nearby cycles commutes with pushforward from sheaves on the moduli stack of shtukas to a product of curves over a finite field. The proof systematically uses the property that taking nearby cycles of Satake sheaves on the Beilinson-Drinfeld Grassmannian with parahoric reduction is a central functor together with a "Zorro's lemma" argument similar to that given by Xue to prove the smoothness of cohomology sheaves at unramified places. As an application, for automorphic forms at the parahoric level, we characterize the image of tame inertia under the Langlands correspondence in terms of two-sided cells.
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