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basic constructions:
strong axioms
further
A category is small if it has a small set of objects and a small set of morphisms.
In other words, a small category is an internal category in the category Set.
A category which is not small may be called large, especially when it is not essentially small (see below).
Small categories are free of some of the subtleties that apply to large categories.
A category is said to be essentially small if it is equivalent to a small category. Assuming the axiom of choice, this is the same as saying that it has a small skeleton, or equivalently that it is locally small and has a small number of isomorphism classes of objects.
A small category structure on a locally small category is an essentially surjective functor from a set (as a discrete category) to . A category is essentially small iff it is locally small and has a small category structure; unlike the previous paragraph, this result does not require the axiom of choice.
If Grothendieck universes are being used, then for a fixed Grothendieck universe, a category is -small if its collection of objects and collection of morphisms are both elements of . Thus, is essentially -small if there is a bijection from its set of morphisms to an element of (the same for the set of objects follows); this condition is non-evil.
So let be the category of -small sets. Then
This of course is a material formulation. We may call structurally -small if there is a bijection from its set of morphisms to an element of (the same for the set of objects follows). This gives an up-to-isomorphism version of -smallness (see universe in a topos for an alternative structural formulation). Such structural -smallness may be substituted in the discussion below.
A Let category is-moderate if be its the set category of objects and set of morphisms are both subsets of . -small However, sets. some Similar categories considerations (such lead as us the to category say of-moderate categories!) are larger yet.
and that a category essentially -small if it is locally -small and admits an essentially surjective functor from a discrete -small category.
A category is -moderate if its set of objects and set of morphisms are both subsets of . However, some categories (such as the category of -moderate categories!) are larger yet.
small category, locally small category, complete small category
Revision on January 19, 2020 at 18:41:48 by Todd Trimble See the history of this page for a list of all contributions to it.