nLab pro-étale site

Redirected from "pro-étale cohomology".

Contents

Context

Geometry

Cohomology

Étale morphisms

Idea
Definition
Properties

In terms of weakly étale maps
Generation by w-contractible rings
Relation to the étale topos

Examples
Related concepts
References

Idea

The pro-étale site is a variant of the étale site where the finiteness conditions on the fibers of étale morphisms is relaxed to a pro-finiteness condition (pro-étale morphisms)

The sheaf topos over the pro-étale site might be called the pro-étale topos. Its abelian sheaf cohomology – pro-étale cohomology – improves on that of the original étale topos in that it genuinely contains (Bhatt-Scholze 13) the Weil cohomology theory called ℓ-adic cohomology (while over the étale site this is only given by an inverse limit of abelian sheaf cohomology).

Definition

For $X$ a scheme, its pro-étale site $X_{proet}$ is the site whose objects are pro-étale morphisms into $X$ and whose Grothendieck topology is that of the fpqc site.

Properties

In terms of weakly étale maps

Definition

A morphism $f \colon X \longrightarrow Y$ of schemes is called weakly étale if

$f$ is a flat morphism of schemes;
its diagonal $X \longrightarrow X \times_Y X$ is also flat.

(Bhatt-Scholze 13, def. 4.1.1)

Definition

For $X$ a scheme, its pro-étale site $X_{proet}$ is the site whose objects are weakly étale morphisms into $X$ (hence weakly étale $X$ -schemes) and whose Grothendieck topology is that of the fpqc site.

(Bhatt-Scholze 13, def. 4.1.1)

Generation by w-contractible rings

Definition

A commutative ring $R$ is a w-contractible ring if every faithfully flat pro-étale morphism $Spec A \to Spec R$ has a section.

(Bhatt-Scholze 13, def. 2.4.1)

Proposition

For every commutative ring $R$ , there is a a w-contractible $A$ , def. , equipped with a faithfully flat pro-étale morphism $Spec A \to Spec R$ .

(Bhatt-Scholze 13, lemma 2.4.9)

Remark

So the full subcategory on the w-contractible rings forms a dense subsite of the pro-étale site, consisting of objects with pro-étale homotopy type a set.

Relation to the étale topos

Definition

Since every étale morphism of schemes is in particular a pro-étale morphism, there is induced a geometric morphism

\nu \;\colon\; Sh(X_{proet}) \longrightarrow Sh(X_{et})

from the pro-étale topos to the étale topos of any scheme $X$ .

Proposition

$\nu$ is a surjective geometric morphism with fully faithful inverse image. Hence the ordinary étale topos is a coreflection of the pro-étale topos.

(Bhatt-Scholze 13, lemma 5.1.2)

Examples

Given a field $k$ with separable closure $\overline{k}$ , then the pro-etale site of $Spec(\overline{k})$ is equivalently the category of profinite sets. The pro-etale site of $Spec(k)$ identifies with the category of profinite continuous $Gal(\overline k/k)$ -sets. (Bhatt-Scholze 13, example 4.1.10).

Related concepts

References

The pro-étale topology was suggested by Scholze and then fully developed in

Bhargav Bhatt, Peter Scholze, The pro-étale topology for schemes Astérisque No. 369 (2015), 99–201(arXiv:1309.1198)

Some results used in the study of weakly étale maps appeared earlier in

Ofer Gabber and Lorenzo Ramero, Almost ring theory, volume 1800 of Lecture Notes in Mathematics. Springer-Verlag, Berlin, 2003. (arXiv:math/0201175)

A textbook account is in

The Stacks Project, Pro-étale Cohomology (pdf)

Further developments include

Takashi Suzuki, Duality for local fields and sheaves on the category of fields (arXiv:1310.4941)

Last revised on January 25, 2023 at 17:07:18. See the history of this page for a list of all contributions to it.

nLab pro-étale site

Context

Geometry

Cohomology

Special and general types

Special notions

Variants

Extra structure

Operations

Theorems

Étale morphisms

Contents

Idea

Definition

Definition

Properties

In terms of weakly étale maps

Definition

Definition

Generation by w-contractible rings

Definition

Proposition

Remark

Relation to the étale topos

Definition

Proposition

Examples

Related concepts

References