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arxiv: 2207.08297 · v3 · pith:4R3EQ6JSnew · submitted 2022-07-17 · 🧮 math.AG · math.KT

A moving lemma for cohomology with support

Stefan Schreieder This is my paper

Pith reviewed 2026-05-24 11:36 UTC · model grok-4.3

classification 🧮 math.AG math.KT
keywords moving lemmacohomology with supportétale cohomologyGersten conjectureeffacement theorempurity theoremunramified cohomologyalgebraic geometry
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The pith

A moving lemma holds for cohomology classes with support on smooth quasi-projective varieties that admit smooth projective compactifications.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper proves a moving lemma for a natural class of cohomology theories with support, including étale and pro-étale cohomology with suitable coefficients. The lemma applies specifically to smooth quasi-projective varieties over a field that admit a smooth projective compactification. If correct, it yields a local and global generalization of the effacement theorem, a finite-level version of the Gersten conjecture in characteristic zero, and extensions of injectivity and codimension-1 purity for étale cohomology. The same results establish that refined unramified cohomology groups are motivic.

Core claim

For cohomology theories with support in a natural class, on smooth quasi-projective k-varieties admitting a smooth projective compactification, cohomology classes with support can be moved in a controlled way. This yields a local and global generalization of the effacement theorem of Quillen, Bloch-Ogus, and Gabber, a finite level version of the Gersten conjecture in characteristic zero, a generalization of the injectivity property and the codimension 1 purity theorem for étale cohomology, and shows that the refined unramified cohomology groups are motivic.

What carries the argument

The moving lemma for cohomology classes with support, which relocates the support of a class while preserving it in the given cohomology theory.

Load-bearing premise

The smooth quasi-projective varieties under consideration admit a smooth projective compactification.

What would settle it

An explicit computation on a concrete smooth quasi-projective variety over a field of characteristic zero with a known smooth projective compactification, such as affine space minus a hyperplane, where a cohomology class with support cannot be moved away from a given closed subset while remaining in the same class for étale cohomology.

read the original abstract

For a natural class of cohomology theories with support (including \'etale or pro-\'etale cohomology with suitable coefficients), we prove a moving lemma for cohomology classes with support on smooth quasi-projective k-varieties that admit a smooth projective compactification (e.g. if char(k)=0). This has the following consequences for such k-varieties and cohomology theories: a local and global generalization of the effacement theorem of Quillen, Bloch--Ogus, and Gabber, a finite level version of the Gersten conjecture in characteristic zero, and a generalization of the injectivity property and the codimension 1 purity theorem for \'etale cohomology. Our results imply that the refined unramified cohomology groups from [Sch23] are motivic.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Referee Report

0 major / 2 minor

Summary. The paper proves a moving lemma for cohomology classes with support, for a natural class of cohomology theories (including étale and pro-étale cohomology with suitable coefficients) on smooth quasi-projective k-varieties that admit a smooth projective compactification. The proof reduces to the projective case via the compactification and applies a general-position argument that preserves support conditions. Consequences include a generalized effacement theorem, a finite-level Gersten conjecture in characteristic zero, and generalizations of injectivity and codimension-1 purity for étale cohomology; these imply that the refined unramified cohomology groups of [Sch23] are motivic.

Significance. If correct, the moving lemma supplies a key technical device for cohomology with support on quasi-projective varieties, extending classical results of Quillen, Bloch–Ogus and Gabber while making the compactification hypothesis explicit. The derived statements on effacement, Gersten and purity are standard consequences via localization and dévissage, but their availability under the stated axioms strengthens the toolkit for unramified and motivic cohomology. The independence of the central lemma from the self-citation [Sch23] is a positive feature.

minor comments (2)
  1. §1: the precise list of axioms imposed on the cohomology theory (e.g., excision, homotopy invariance, or support axioms) should be collected in a single numbered paragraph or definition for easy reference when verifying the moving argument.
  2. The reduction step via compactification is described in outline; a short diagram or numbered sequence of steps would clarify how the support condition is preserved when passing to the boundary.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive summary, significance assessment, and recommendation of minor revision. We are pleased that the independence of the central lemma from [Sch23] is noted as a positive feature. No specific major comments appear in the report.

Circularity Check

0 steps flagged

No significant circularity

full rationale

The paper states a moving lemma for cohomology with support on smooth quasi-projective varieties admitting smooth projective compactification, proved by reduction to the projective case followed by standard general-position arguments that preserve support conditions and the listed cohomology axioms. Consequences (generalized effacement, finite Gersten, purity) are obtained via ordinary localization and dévissage. The sole self-citation [Sch23] appears only in the final sentence to deduce motivicity of refined unramified groups and is not invoked in the moving-lemma proof or its immediate corollaries. No equation or step reduces by construction to a fitted parameter, self-defined quantity, or load-bearing self-citation chain; the derivation remains independent of the target results.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The result rests on standard axioms of algebraic geometry and cohomology theories; no free parameters or invented entities are visible in the abstract.

axioms (2)
  • domain assumption Existence of smooth projective compactifications for the varieties considered when char(k)=0
    Explicitly required for the statement of the moving lemma.
  • domain assumption The cohomology theories belong to a 'natural class' closed under the operations needed for the moving lemma
    Invoked to include étale and pro-étale cohomology.

pith-pipeline@v0.9.0 · 5645 in / 1306 out tokens · 20475 ms · 2026-05-24T11:36:15.192709+00:00 · methodology

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Reference graph

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26 extracted references · 26 canonical work pages · 1 internal anchor

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