Two morphisms in a category (or just edges in a directed graph) are parallel if they have the same source and target. Equivalently a pair of parallel morphisms in consists of an object , and object , and two morphisms .
This may be extended to a family of any number of morphisms, but the morphisms are always compared pairwise to see if they are parallel. Degenerate cases: a family of one parallel morphism is simply a morphism; a family of zero parallel morphisms is simply a pair of objects.
The above considerations can be formalized in the following definition.
The walking parallel pair category has two objects, 0 and 1, and two nonidentity arrows, .
Now functors are precisely pairs of parallel morphisms.
The limit of a pair (or family) or morphisms is called their equalizer; the colimit is their coequalizer. (Of course, these do not always exist.)
the boolean domain ; i.e. the walking pair of objects
the directed interval category ; i.e. the walking morphism
the (2,0)-horn category ; i.e. the walking cospan
the (2,1)-horn category ; i.e. the walking composable pair
the (2,2)-horn category ; i.e. the walking span
the 2-simplex category ; i.e. the walking commutative triangle
Adj; i.e. the walking adjunction
the syntactic category of a theory ; i.e. the walking -model
Last revised on June 1, 2025 at 03:27:27. See the history of this page for a list of all contributions to it.