Internal category explained

In mathematics, more specifically in category theory, internal categories are a generalisation of the notion of small category, and are defined with respect to a fixed ambient category. If the ambient category is taken to be the category of sets then one recovers the theory of small categories. In general, internal categories consist of a pair of objects in the ambient category—thought of as the 'object of objects' and 'object of morphisms'—together with a collection of morphisms in the ambient category satisfying certain identities. Group objects, are common examples of internal categories.

There are notions of internal functors and natural transformations that make the collection of internal categories in a fixed category into a 2-category.

Definitions

Let

C

be a category with pullbacks. An internal category in

C

consists of the following data: two

C

-objects

C0,C1

named "object of objects" and "object of morphisms" respectively and four

C

-arrows

d0,d1:C1 → C0,e:C0 → C1,m:C1 x

C0

C1 → C1

subject to coherence conditions expressing the axioms of category theory. See [1] [2] [3] [4] .

See also

Notes and References

  1. Book: Moerdijk. Ieke. Ieke Moerdijk. Mac Lane. Saunders. Saunders Mac Lane. Sheaves in geometry and logic : a first introduction to topos theory. 1992. Springer-Verlag. New York. 0-387-97710-4. 2nd corr. print., 1994..
  2. Book: Mac Lane. Saunders. Categories for the working mathematician. 1998. Springer. New York. 0-387-98403-8. 2..
  3. Book: Borceux. Francis. Handbook of categorical algebra. 1994. Cambridge University Press. Cambridge. 0-521-44178-1. registration.
  4. Book: Johnstone. Peter T.. Peter Johnstone (mathematician). Topos theory. registration. 1977. Academic Press. London. 0-12-387850-0.