Definition:Monomorphism (Category Theory)

Definition
Let $\mathbf C$ be a metacategory.

A monomorphism is a morphism $f \in \mathbf C_1$ such that:


 * $f \circ g = f \circ h \implies g = h$

for all morphisms $g, h \in \mathbf C_1$ for which these compositions are defined.

That is, a monomorphism is a morphism which is left cancellable.

One writes $f: C \rightarrowtail D$ to denote that $f$ is a monomorphism.

Also known as
Often, monomorphism is abbreviated to mono.

Alternatively, one can speak about a monic morphism to denote a monomorphism.

Also see

 * Definition:Epimorphism (Category Theory), the dual notion