Mod-p maximal compact inductions do not have irreducible admissible subrepresentations
Pith reviewed 2026-05-24 15:16 UTC · model grok-4.3
The pith
Mod-p maximal compact inductions of p-adic split reductive groups do not contain irreducible admissible subrepresentations.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
Let p be a prime number. We show in this short note that mod-p maximal compact inductions of a p-adic split reductive group do not have irreducible admissible subrepresentations.
What carries the argument
The maximal compact induction functor applied in the category of smooth representations over a field of characteristic p.
If this is right
- These induced modules cannot be decomposed into irreducible admissible pieces.
- The smooth representation category in characteristic p does not contain the images of maximal compact induction among its admissible objects.
- Constructions other than maximal compact induction are required to obtain irreducible admissible representations modulo p.
Where Pith is reading between the lines
- This absence may force mod-p theory to rely on non-compact or non-maximal parahoric inductions for its simple objects.
- The result separates the mod-p case from characteristic-zero theory where compact induction can produce supercuspidal representations.
Load-bearing premise
The induction is the standard smooth induction from a maximal compact open subgroup and admissibility is the usual finite-generation condition on fixed vectors under open subgroups.
What would settle it
An explicit construction or computation exhibiting an irreducible admissible subrepresentation inside such an induced module for any specific group such as GL(2,Q_p) would disprove the claim.
read the original abstract
Let $p$ be a prime number. We show in this short note that mod-$p$ maximal compact inductions of a $p$-adic split reductive group do not have irreducible admissible subrepresentations.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript is a short note asserting that, for a prime p, the mod-p maximal compact induction c-Ind_K^G(1) of the trivial representation from a maximal compact open subgroup K of a p-adic split reductive group G contains no nonzero irreducible admissible subrepresentation in the category of smooth representations over a field of characteristic p.
Significance. If established with a correct argument, the negative result would be a basic structural fact about smooth mod-p representations of p-adic groups, indicating that such compact inductions are not admissible and contain no irreducible admissible pieces. This could constrain approaches to classifying or constructing mod-p representations via induction from maximal compacts, but the note supplies no argument, definitions, or references, so the significance cannot be assessed from the given text.
major comments (1)
- [Abstract / entire note] The manuscript consists solely of the one-sentence claim that the result is shown 'in this short note,' with no proof, no lemmas, no invocation of standard facts about smooth representations or admissibility, and no definitions of the induction functor, the coefficient field, or the notions of irreducibility and admissibility. This renders the central non-existence statement unverifiable.
Simulated Author's Rebuttal
We thank the referee for the report. We acknowledge that the current version of the manuscript is limited to a single sentence and does not contain a proof or supporting material, rendering the claim unverifiable as presented.
read point-by-point responses
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Referee: [Abstract / entire note] The manuscript consists solely of the one-sentence claim that the result is shown 'in this short note,' with no proof, no lemmas, no invocation of standard facts about smooth representations or admissibility, and no definitions of the induction functor, the coefficient field, or the notions of irreducibility and admissibility. This renders the central non-existence statement unverifiable.
Authors: We agree with the referee that the submitted manuscript contains only the bare statement without any proof, definitions, or references. This is a genuine shortcoming of the current text. In a revised version we will supply a complete self-contained argument, including the definition of the maximal compact induction functor c-Ind_K^G, the coefficient field of characteristic p, the notions of smoothness, admissibility, and irreducibility in this setting, and the invocation of standard facts from the theory of smooth representations of p-adic groups that are needed to reach the non-existence conclusion. revision: yes
Circularity Check
No significant circularity
full rationale
The paper is a short note establishing a non-existence result: mod-p maximal compact inductions c-Ind_K^G(1) contain no nonzero irreducible admissible subrepresentations. This rests on the standard definitions of smooth representations, admissibility (finite-dimensional fixed vectors under open compact subgroups), and compact induction from a maximal compact open K in a p-adic split reductive G, all taken from the usual literature on p-adic groups. No equations, fitted parameters, self-definitional loops, or load-bearing self-citations appear; the argument is a direct proof of absence rather than any reduction of a claimed prediction or uniqueness statement to its own inputs. The derivation is therefore self-contained against external benchmarks.
discussion (0)
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