Sites

Entry conditions

Use sites only when you can:

Define a category of contexts or observations.
Define what it means for a family of morphisms to “cover” an object.
State what it means for local pieces to cover a whole.

If there is no notion of coverage, a site is not appropriate.

Definitions

A site is a category $C$ equipped with a Grothendieck topology $J$ .

Vocabulary (plain language)

Site: a collection of objects and arrows plus a rule for which arrows count as covers.
Cover: a family of arrows that are declared to give local pieces of an object.

Symbols used

$C$ : a category.
$J$ : a Grothendieck topology on $C$ .
$U_{i} \to U$ : a cover family with arrows into $U$ .

Intuition

A site formalizes “local pieces” and how they cover a whole.

If you only have a list of objects but no meaningful notion of coverage, then a site is the wrong tool.

What the axioms mean

Covering: a family of morphisms ${U_{i} \to U}$ is declared to cover $U$ if the $U_{i}$ jointly provide the local pieces of $U$ .

Worked examples

Example 1: Open sets

Let $C$ be the category of open sets of a topological space, with inclusions as morphisms. A cover is the usual open cover.

Example 2: Contexts as traces

If objects are observational contexts and morphisms are refinements, then a cover says which refinements are enough to reconstruct the original context.

How to recognize the structure

Can you say when a family of morphisms covers an object?

Common mistakes

Declaring a topology without checking the Grothendieck axioms.
Treating any family of maps as a cover without justification.

Minimal data

A category $C$ .
A topology $J$ that specifies covering families for each object.

Misuse warnings

Do not use sites when coverage is only metaphorical.

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