Factorization system

In mathematics, it can be shown that every function can be written as the composite of a surjective function followed by an injective function. Factorization systems are a generalization of this fact in category theory.

A factorization system (E, M) for a category C consists of two classes of morphisms E and M of C such that :

(1) E and M both contain all isomorphisms of C and are closed under composition.

(2) Every morphism f of C can be written as

${\displaystyle f=m\circ e}$

for some morphisms ${\displaystyle e\in E}$ and ${\displaystyle m\in M}$.

(3) If ${\displaystyle u}$ and ${\displaystyle v}$ are two morphisms such that ${\displaystyle vme=m'e'u}$ for some morphisms ${\displaystyle e,e'\in E}$ and ${\displaystyle m,m'\in M}$, then there exists a unique morphism ${\displaystyle w}$ making the diagram

TODO

commute.

• Peter Freyd, Max Kelly (1972). "Categories of Continuous Functors I". Journal of Pure and Applied Algebra. 2.