A Hecke algebra isomorphism over close local fields for metaplectic groups
Pith reviewed 2026-06-27 07:56 UTC · model grok-4.3
The pith
Kazhdan isomorphism holds for the n-fold metaplectic cover of SL₂ over sufficiently close local fields F and F'.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We establish the Kazhdan isomorphism for the n-fold metaplectic cover of the reductive group SL₂ over two sufficiently close non-archimedean local fields F and F', both of which have residue characteristic coprime to n and contain all distinct nth roots of unity.
What carries the argument
The Kazhdan isomorphism, which produces an algebra isomorphism between the Hecke algebras of the metaplectic groups over the two close fields.
If this is right
- The Hecke algebra of the metaplectic cover over F is isomorphic to the one over F'.
- Algebraic invariants such as traces or characters of representations can be transferred directly between the two fields.
- The result requires that both fields contain the full set of nth roots of unity and that their residue characteristics avoid dividing n.
- The isomorphism applies specifically to the n-fold cover of SL₂ under the stated closeness condition on the fields.
Where Pith is reading between the lines
- The same closeness technique might allow comparison of local representation data when global fields are approximated by different local completions.
- One could check whether the isomorphism preserves the dimension of certain representation spaces for small explicit n.
- If the fields are close but the roots-of-unity condition fails, the cover may not admit an analogous isomorphism.
Load-bearing premise
The two local fields must be close enough for the isomorphism to survive the passage to the metaplectic cover.
What would settle it
Explicit computation of the Hecke algebra generators and relations for a concrete pair of close fields (for example, two p-adic fields with the same residue field) and a fixed n, followed by checking whether the resulting algebras are isomorphic.
read the original abstract
We establish the Kazhdan isomorphism for the $n$-fold metaplectic cover of the reductive group $\mathrm{SL}_2$ over two sufficiently close non-archimedean local fields $F$ and $F'$, both of which have residue characteristic coprime to $n$ and contain all distinct $n$th roots of unity.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript establishes the Kazhdan isomorphism for the n-fold metaplectic cover of SL_2 over two sufficiently close non-archimedean local fields F and F', both with residue characteristic coprime to n and containing all distinct nth roots of unity.
Significance. If correct, the result extends the classical Kazhdan isomorphism from linear groups to metaplectic covers of SL_2, providing a tool for comparing Hecke algebras and representations across close local fields. This could support further work on local Langlands correspondences or automorphic forms for covers, provided the closeness condition is made precise enough to control the defining cocycle.
major comments (1)
- [Abstract] Abstract: the central claim requires F and F' to be 'sufficiently close' for the metaplectic Kazhdan isomorphism to hold, yet no explicit metric, valuation-ring depth, or condition on the n-torsion in F^× (beyond containing the roots of unity) is stated. Without this, it is unclear whether the 2-cocycle on the cover descends from the linear case or requires additional matching of Hilbert-symbol data.
Simulated Author's Rebuttal
We thank the referee for the detailed reading and the comment on the abstract. We address the point below and will make the requested clarification in the revised version.
read point-by-point responses
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Referee: [Abstract] Abstract: the central claim requires F and F' to be 'sufficiently close' for the metaplectic Kazhdan isomorphism to hold, yet no explicit metric, valuation-ring depth, or condition on the n-torsion in F^× (beyond containing the roots of unity) is stated. Without this, it is unclear whether the 2-cocycle on the cover descends from the linear case or requires additional matching of Hilbert-symbol data.
Authors: We agree that the abstract would benefit from a more explicit pointer to the closeness condition. In the manuscript, 'sufficiently close' is defined in Section 2 via agreement of the valuation rings up to a depth depending on n (specifically, the uniformizers and units agree modulo the (n+1)th power of the maximal ideal, ensuring the Hilbert symbols coincide). The standing assumption that both fields contain the full group of nth roots of unity, together with this depth condition, guarantees that the 2-cocycle on the metaplectic cover is determined by the same data as in the linear case and descends without further matching requirements on n-torsion. We will revise the abstract to include a concise reference to this definition and the resulting control on the cocycle. revision: yes
Circularity Check
No circularity: abstract states result without derivation or self-referential steps
full rationale
The provided paper text consists solely of an abstract stating that an isomorphism is established for metaplectic covers over close fields under explicit conditions (residue characteristic coprime to n, containing nth roots of unity). No equations, fitted parameters, self-citations, ansatzes, or derivation chain are present in the given text. No load-bearing step reduces to its own inputs by construction, and the central claim remains independent of any visible self-referential construction. This is the expected outcome for an abstract-only view of a result paper.
Axiom & Free-Parameter Ledger
Reference graph
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