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DBpedia 2014

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Coimage abstract "In algebra, the coimage of a homomorphism f: A → Bis the quotient coim f = A/ker fof domain and 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 → Y, then a coimage of f (if it exists) is an epimorphism c : X → C such thatthere is a map fc : C → Y with f = fc ∘ c,for any epimorphism z : X → Z for which there is a map fz : Z → Y with f = fz ∘ z, there is a unique map π : Z → C such that both c = π ∘ z and fz = fc ∘ π.".
Coimage wikiPageID "632685".
Coimage wikiPageRevisionID "603316340".
Coimage hasPhotoCollection Coimage.
Coimage subject Category:Abstract_algebra.
Coimage subject Category:Category_theory.
Coimage subject Category:Isomorphism_theorems.
Coimage type Abstraction100002137.
Coimage type Communication100033020.
Coimage type IsomorphismTheorems.
Coimage type Message106598915.
Coimage type Proposition106750804.
Coimage type Statement106722453.
Coimage type Theorem106752293.
Coimage comment "In algebra, the coimage of a homomorphism f: A → Bis the quotient coim f = A/ker fof domain and 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.".
Coimage label "Coimage".
Coimage label "Coimagem".
Coimage label "余像".
Coimage label "余象".
Coimage sameAs 余像.
Coimage sameAs Coimagem.
Coimage sameAs m.02ysx2.
Coimage sameAs Q9388290.
Coimage sameAs Q9388290.
Coimage sameAs Coimage.
Coimage wasDerivedFrom Coimage?oldid=603316340.
Coimage isPrimaryTopicOf Coimage.