coequalizers

A coequalizer of a pair of morphisms $f,g : A \to B$ is an object $C$ with a morphism $c : B \to C$ such that $c \circ f = c \circ g$ and which is universal with respect to this property. This property refers to the existence of coequalizers.

Dual property: equalizers
Related properties: finitely cocomplete
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Relevant implications

abelian is equivalent to additive andcoequalizers andepi-regular andequalizers andmono-regular
binary coproducts andcoequalizers implies pushouts
binary coproducts andpushouts implies coequalizers
cocomplete is equivalent to coequalizers andcoproducts
coequalizers andcountable coproducts implies sequential colimits
coequalizers andfinitely complete andlocally cartesian closed implies regular
coequalizers andgroupoid implies thin
coequalizers andleft cancellative implies thin
coequalizers andself-dual implies equalizers
coequalizers implies Cauchy complete
connected colimits is equivalent to coequalizers andwide pushouts
equalizers andself-dual implies coequalizers
finitely cocomplete is equivalent to coequalizers andfinite coproducts
thin implies coequalizers andright cancellative

Examples

There are 52 categories with this property.

Counterexamples

There are 13 categories without this property.

Unknown

There are 0 categories for which the database has no information on whether they satisfy this property.

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