Coimage: Difference between revisions

Latest revision as of 18:23, 28 August 2025

f : A \to B

coim f = A / \ker (f)

of the domain by the kernel. The coimage is canonically isomorphic to the image by the first isomorphism theorem, when that theorem applies.

More generally, in category theory, the coimage of a morphism is the dual notion of the image of a morphism. If $f : X \to Y$ , then a coimage of $f$ (if it exists) is an epimorphism $c : X \to C$ such that

there is a map $f_{c} : C \to Y$ with $f = f_{c} \circ c$ ,
for any epimorphism $z : X \to Z$ for which there is a map $f_{z} : Z \to Y$ with $f = f_{z} \circ z$ , there is a unique map $h : Z \to C$ such that both $c = h \circ z$ and $f_{z} = f_{c} \circ h$

Revision as of 07:37, 5 March 2024 view source imported>Jlwoodwa m →References: {{refbegin}}		Latest revision as of 18:23, 28 August 2025 view source imported>A bit iffy + short description
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			{{short description\|Concept in category theory (in mathematics)}}
	In [[Abstract algebra\|algebra]], the '''coimage''' of a [[homomorphism]]		In [[Abstract algebra\|algebra]], the '''coimage''' of a [[homomorphism]]