nLab
coequalizer

limits and colimits

1-Categorical

2-Categorical

2-limit
- inserter
- isoinserter
- equifier
- inverter
- PIE-limit
2-pullback, comma object

(∞,1)-Categorical

(∞,1)-limit
- (∞,1)-pullback
  - fiber sequence

Model-categorical

Edit this sidebar

Definition

In a category $C$ a diagram of morphisms of $C$

U ⇉_{b}^{a} V \overset{c}{\to} X

is called a coequalizer diagram if

$c a = c b$ ; and
$c$ is universal for this property: i.e. if $f : V \to Y$ is a morphism of $C$ such that $f a = f b$ , then there is a unique morphism $f' : X \to Y$ such that $f' c = f$ .

This concept is a special case of that of colimit; specifically, it’s the colimit of the diagram

U ⇉_{b}^{a} V .

A coequalizer in $C$ is an equalizer in the opposite category $C^{op}$ .

Revised on June 8, 2011 20:08:27 by Anonymous Coward (216.239.45.4)