Balanced category
In mathematics, especially in category theory, a balanced category is a category in which every bimorphism (a morphism that is both a monomorphism and epimorphism) is an isomorphism.
The category of topological spaces is not balanced (since continuous bijections are not necessarily homeomorphisms), while a topos is balanced.[1] This is one of the reasons why a topos is said to be nicer.[2]
Examples
The following categories are balanced
- Set, the category of sets.
- An abelian category.[3]
- The category of (Hausdorff) compact spaces (since a continuous bijection there is homeomorphic).
An additive category may not be balanced.[4] Contrary to what one might expect, a balanced pre-abelian category may not be abelian.[5]
A quasitopos is similar to a topos but may not be balanced.
See also
- quasi-abelian category
References
Sources
- Johnstone, P. T. (1977). Topos theory. Academic Press.
- Roy L. Crole, Categories for types, Cambridge University Press (1994)
Further reading
- balanced category at the nLab
- v
- t
- e