On local integrability results for p-adic reductive groups
Pith reviewed 2026-05-10 09:15 UTC · model grok-4.3
The pith
Local character expansions prove local integrability of characters for p-adic reductive groups.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
Using local character expansions, the paper establishes that the complex characters of p-adic reductive groups are locally integrable, giving an algebraic incarnation of this property that applies to other coefficients as well.
What carries the argument
Local character expansions, which allow an algebraic control over the behavior of characters near singular points to deduce integrability.
If this is right
- Harish-Chandra's theorem on local integrability is proved concisely.
- The integrability holds for some non-complex coefficients.
- Local integrability is verified in additional cases not covered before.
- Characters satisfy local L^α integrability for specified α > 1.
Where Pith is reading between the lines
- This algebraic approach might enable similar results in related settings with different base fields.
- The method could simplify checks for integrability in explicit computations of characters.
- Extending the α bound might connect to other analytic properties of characters.
Load-bearing premise
Local character expansions exist and possess the algebraic properties needed to imply the integrability.
What would settle it
Discovery of a p-adic reductive group character that fails to be locally integrable, or a local character expansion lacking the required properties for integrability.
read the original abstract
We present a short proof, based on local character expansions, of the celebrated theorem of Harish-Chandra about local integrability of complex characters of $p$-adic reductive groups. The proof gives an algebraic incarnation of the local integrability that works for some coefficients different from $\mathbb{C}$, verifies local integrability in cases that appear not covered in the literature, and shows that a character is locally-$L^{\alpha}$ for some specified $\alpha>1$ as in [GGH23].
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript presents a short proof of Harish-Chandra's theorem on the local integrability of complex characters of p-adic reductive groups, relying on local character expansions. It supplies an algebraic formulation of integrability valid for certain coefficient rings other than ℂ, establishes the result in cases apparently absent from the literature, and proves that characters are locally L^α for a specified α > 1, in the spirit of [GGH23].
Significance. If the argument is valid, the work supplies a streamlined algebraic proof of a foundational result in the representation theory of p-adic groups. The algebraic incarnation, applicability to non-complex coefficients, coverage of additional cases, and the explicit L^α bound are concrete strengths that could simplify arguments involving distributions and orbital integrals.
major comments (1)
- [Introduction] The proof invokes local character expansions from the literature to deduce integrability algebraically. To underwrite the extensions beyond ℂ-coefficients and the new cases, the manuscript must explicitly identify (in the introduction or the proof section) which algebraic properties of the expansions—such as support on nilpotent orbits or the precise form of the leading terms—are used, and confirm these properties are available independently of analytic integrability results for the coefficient rings in question. This step is load-bearing for the central claim of a short, non-circular algebraic proof.
minor comments (2)
- Expand the citation [GGH23] to full bibliographic details in the references section.
- Specify the numerical value or range of the exponent α in the local L^α statement, and indicate whether the bound is uniform or depends on the group or representation.
Simulated Author's Rebuttal
We thank the referee for their careful reading of the manuscript and for the constructive major comment. We address the point below and have revised the paper to incorporate the requested clarification.
read point-by-point responses
-
Referee: [Introduction] The proof invokes local character expansions from the literature to deduce integrability algebraically. To underwrite the extensions beyond ℂ-coefficients and the new cases, the manuscript must explicitly identify (in the introduction or the proof section) which algebraic properties of the expansions—such as support on nilpotent orbits or the precise form of the leading terms—are used, and confirm these properties are available independently of analytic integrability results for the coefficient rings in question. This step is load-bearing for the central claim of a short, non-circular algebraic proof.
Authors: We agree that an explicit identification of the algebraic properties is necessary to justify the extensions to non-complex coefficients and the additional cases. In the revised version we have inserted a new paragraph at the end of the introduction (with a cross-reference in Section 2) that enumerates the precise properties drawn from the local character expansions: (i) the expansion is supported on nilpotent orbits, and (ii) the leading terms are given by the indicated linear combination of orbital integrals with coefficients in the ring R. We further state that these properties are established in the cited references by purely algebraic arguments (via the structure of the Hecke algebra and the definition of the distributions over R) and do not rely on any analytic integrability results for the coefficient rings under consideration. This addition makes the non-circular character of the argument fully transparent. revision: yes
Circularity Check
No significant circularity; derivation relies on external prior results for expansions.
full rationale
The paper derives local integrability (and extensions to other coefficients and L^α bounds) from the assumed existence and algebraic properties of local character expansions, which are invoked from prior literature without re-derivation. No step equates the target integrability statement to a fitted parameter, self-defined quantity, or load-bearing self-citation chain; the expansions are treated as independent inputs whose algebraic features (e.g., support properties) yield the integrability conclusion. The central claim therefore remains non-circular given those external assumptions, consistent with the modest reader's score and absence of any quoted reduction to inputs by construction.
Axiom & Free-Parameter Ledger
Reference graph
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