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- Additive_category abstract "In mathematics, specifically in category theory, an additive category is a preadditive category C such that all finite collections of objects A1, … , An of C have a biproduct A1 ⊕ ⋯ ⊕ An in C. A category C is preadditive if all its hom-sets are Abelian groups and composition of morphisms is bilinear; in other words, C is enriched over the monoidal category of Abelian groups. A biproduct in a preadditive category is both a finitary product and a finitary coproduct.".
- Additive_category wikiPageID "60854".
- Additive_category wikiPageRevisionID "590733346".
- Additive_category hasPhotoCollection Additive_category.
- Additive_category subject Category:Additive_categories.
- Additive_category type Abstraction100002137.
- Additive_category type AdditiveCategories.
- Additive_category type Class107997703.
- Additive_category type Collection107951464.
- Additive_category type Group100031264.
- Additive_category comment "In mathematics, specifically in category theory, an additive category is a preadditive category C such that all finite collections of objects A1, … , An of C have a biproduct A1 ⊕ ⋯ ⊕ An in C. A category C is preadditive if all its hom-sets are Abelian groups and composition of morphisms is bilinear; in other words, C is enriched over the monoidal category of Abelian groups. A biproduct in a preadditive category is both a finitary product and a finitary coproduct.".
- Additive_category label "Additive category".
- Additive_category label "Аддитивная категория".
- Additive_category label "可加範疇".
- Additive_category sameAs m.0gj8d.
- Additive_category sameAs Q4681343.
- Additive_category sameAs Q4681343.
- Additive_category sameAs Additive_category.
- Additive_category wasDerivedFrom Additive_category?oldid=590733346.
- Additive_category isPrimaryTopicOf Additive_category.