A -ary site is a site whose covering sieves are determined by -small covering families, and which has a very weak sort of finite limits. These conditions get weaker as gets larger, until when is the size of the universe, every small site is -ary.
-ary sites are a very general (perhaps the most general) appropriate input for -ary exact completion.
Let be an arity class.
A site is weakly -ary if for any covering sieve of an object in , there exists a -small family in such that (1) each , and (2) the sieve generated by is a covering sieve.
This definition can also be rephrased purely in terms of the covering families; see (Shulman).
Let be a site and a functor. A local -prelimit of is a -small family of cones in such that for any cone , the sieve factors through some is a covering sieve of .
A -ary site is a weakly -ary site which has all finite local -prelimits (i.e. whenever is a finite category).
If has a trivial topology, then a local unary prelimit (i.e. ) is precisely a weak limit. The trivial topology is always weakly -ary, so a trivial site is unary just when it has weak limits.
Any limit is, in particular, a local -prelimit. Thus, any weakly -ary site with finite limits is -ary.
If the class of all cones over is -ary, then it is a local -prelimit. Thus, any -small and weakly -ary site is -ary. In particular, any small site is an infinitary site.
The regular topology on a regular category (including an exact category) is unary.
The coherent topology on a coherent category (including a pretopos) is finitary.
Generalizing the previous two examples, the class of all -small and effective-epic families on a ∞-ary regular category (including a ∞-ary exact category) is a -ary topology. This is called its -canonical topology.
The extensive topology on a (finitary) extensive category is finitary.
The canonical topology on any Grothendieck topos is infinitary.
The Zariski topology on is finitary.
The 2-category has -ary sites as its objects, and morphisms of sites as its morphisms, where we use the more general covering-flat definition of a morphism of sites.
is equivalent to a 2-category of framed allegories?; see (Shulman).
contains, as a full reflective sub-2-category, the 2-category of ∞-ary exact categories with their -canonical topologies. The reflector is called exact completion. When is the size of the universe, this reflector applied to a small (hence infinitary) site constructs its topos of sheaves.
Last revised on September 6, 2012 at 19:47:05. See the history of this page for a list of all contributions to it.