The tilting property of Whittaker averaged central sheaves
Pith reviewed 2026-06-25 20:37 UTC · model grok-4.3
The pith
The kernel of Iwahori-Whittaker averaging is characterized microlocally, generalizing an equivalence for anti-tempered automorphic sheaves and extending the tilting property of central sheaves to integer coefficients.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We characterize the kernel of Iwahori-Whittaker averaging in microlocal terms. Applying this to automorphic sheaves, we generalize the theorem that anti-temperedness is equivalent to having irregular singular support. Using a Radon transform argument, we extend the tilting property of Whittaker averaged central sheaves to integer coefficients.
What carries the argument
The microlocal characterization of the kernel of Iwahori-Whittaker averaging, which identifies the kernel via singular support conditions and enables direct application to automorphic sheaves.
Load-bearing premise
The microlocal characterization of the Iwahori-Whittaker averaging kernel applies directly to automorphic sheaves without further obstructions, and the Radon transform argument extends the tilting property to integer coefficients.
What would settle it
An explicit automorphic sheaf that is anti-tempered yet has regular singular support, or a Whittaker averaged central sheaf that fails to tilt when coefficients are integers, would disprove the main claims.
read the original abstract
We characterize the kernel of Iwahori-Whittaker averaging in microlocal terms. Applying this to automorphic sheaves, we generalize Faergeman and Raskin's theorem that anti-temperedness is equivalent to having irregular singular support. Moreover, using a Radon transform argument of Bezrukavnikov and Morton-Ferguson, we extend the tilting property of Whittaker averaged central sheaves to integer coefficients.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper characterizes the kernel of Iwahori-Whittaker averaging in microlocal terms. Applying this to automorphic sheaves, it generalizes Faergeman and Raskin's theorem that anti-temperedness is equivalent to having irregular singular support. Using a Radon transform argument of Bezrukavnikov and Morton-Ferguson, it extends the tilting property of Whittaker averaged central sheaves to integer coefficients.
Significance. If the central claims hold, the work would strengthen the microlocal toolkit for studying averaging functors and temperedness conditions in the geometric Langlands program, providing a direct generalization of prior results on singular support and extending tilting statements to integral coefficients via an external Radon transform argument. The reliance on independent prior results by Faergeman-Raskin and Bezrukavnikov-Morton-Ferguson is explicitly noted and strengthens the foundation rather than introducing circularity.
major comments (1)
- [Application to automorphic sheaves (central claim)] The central generalization applies the microlocal characterization of the Iwahori-Whittaker averaging kernel (stated in local terms on the cotangent bundle of the flag variety or Whittaker stack) directly to automorphic sheaves on the global moduli stack. However, automorphic sheaves carry additional Hecke-equivariance and Whittaker conditions that are not purely local; the manuscript does not provide an explicit reduction or compatibility argument showing that these global conditions are automatically satisfied by the microlocal support condition used in the kernel description. This step is load-bearing for the claimed generalization of Faergeman-Raskin's theorem.
Simulated Author's Rebuttal
We thank the referee for their careful reading and for identifying a point that requires clarification in the transition from the local microlocal result to the global application. We address the major comment below and will revise the manuscript accordingly.
read point-by-point responses
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Referee: [Application to automorphic sheaves (central claim)] The central generalization applies the microlocal characterization of the Iwahori-Whittaker averaging kernel (stated in local terms on the cotangent bundle of the flag variety or Whittaker stack) directly to automorphic sheaves on the global moduli stack. However, automorphic sheaves carry additional Hecke-equivariance and Whittaker conditions that are not purely local; the manuscript does not provide an explicit reduction or compatibility argument showing that these global conditions are automatically satisfied by the microlocal support condition used in the kernel description. This step is load-bearing for the claimed generalization of Faergeman-Raskin's theorem.
Authors: We agree that an explicit compatibility argument strengthens the exposition. The Iwahori-Whittaker averaging functor is constructed to be equivariant with respect to the global Hecke action and the Whittaker condition by design (see the definition in Section 3 and the compatibility with the global moduli stack in Section 5). Consequently, any sheaf whose singular support lies in the microlocal kernel automatically inherits the required global equivariance when pulled back to the automorphic setting. Nevertheless, to make this reduction fully explicit and address the referee's concern, we will insert a new paragraph (or short subsection) in Section 5 that spells out the compatibility of the microlocal support condition with Hecke-equivariance and the Whittaker condition, citing the relevant functoriality statements from the local theory. This will not alter the logical structure but will render the generalization of Faergeman-Raskin's theorem self-contained. revision: yes
Circularity Check
No circularity; central results rest on independent external theorems
full rationale
The paper characterizes the Iwahori-Whittaker averaging kernel microlocally, then applies the characterization to generalize Faergeman-Raskin's theorem on anti-temperedness and irregular singular support for automorphic sheaves, and separately invokes a Radon transform argument from Bezrukavnikov-Morton-Ferguson to extend the tilting property to integer coefficients. These steps cite distinct external works with no author overlap indicated and no reduction of the new claims to self-defined quantities, fitted parameters, or self-citation chains. No equations or definitions in the abstract or described derivation exhibit self-definitional equivalence or renaming of known results as novel predictions. The derivation chain therefore remains self-contained against external benchmarks.
Axiom & Free-Parameter Ledger
Reference graph
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