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- Coimage abstract "In algebra, the coimage of a homomorphismf: A → Bis the quotientcoim 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 wikiPageLength "1303".
- Coimage wikiPageOutDegree "17".
- Coimage wikiPageRevisionID "607162696".
- Coimage wikiPageWikiLink Abstract_algebra.
- Coimage wikiPageWikiLink Category:Abstract_algebra.
- Coimage wikiPageWikiLink Category:Category_theory.
- Coimage wikiPageWikiLink Category:Isomorphism_theorems.
- Coimage wikiPageWikiLink Category_theory.
- Coimage wikiPageWikiLink Cokernel.
- Coimage wikiPageWikiLink Domain_(mathematics).
- Coimage wikiPageWikiLink Domain_of_a_function.
- Coimage wikiPageWikiLink Epimorphism.
- Coimage wikiPageWikiLink Homomorphism.
- Coimage wikiPageWikiLink Image_(category_theory).
- Coimage wikiPageWikiLink Image_(mathematics).
- Coimage wikiPageWikiLink Isomorphism_theorem.
- Coimage wikiPageWikiLink Kernel_(algebra).
- Coimage wikiPageWikiLink Morphism.
- Coimage wikiPageWikiLink Natural_isomorphism.
- Coimage wikiPageWikiLink Natural_transformation.
- Coimage wikiPageWikiLink Quotient_group.
- Coimage wikiPageWikiLink Quotient_object.
- Coimage wikiPageWikiLink Subobject.
- Coimage wikiPageWikiLinkText "Coimage".
- Coimage wikiPageWikiLinkText "coimage".
- Coimage hasPhotoCollection Coimage.
- Coimage wikiPageUsesTemplate Template:Mitchell_TOC.
- Coimage subject Category:Abstract_algebra.
- Coimage subject Category:Category_theory.
- Coimage subject Category:Isomorphism_theorems.
- Coimage type Function.
- Coimage type Morphism.
- Coimage type Theorem.
- Coimage comment "In algebra, the coimage of a homomorphismf: A → Bis the quotientcoim 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 sameAs 余像.
- Coimage sameAs Coimagem.
- Coimage sameAs m.02ysx2.
- Coimage sameAs Q9388290.
- Coimage sameAs Q9388290.
- Coimage sameAs 余象.
- Coimage wasDerivedFrom Coimage?oldid=607162696.
- Coimage isPrimaryTopicOf Coimage.