Category of abelian groups: Difference between revisions
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Latest revision as of 12:45, 29 December 2009
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Definition
The category of Abelian groups, sometimes denoted , is defined as follows:
- Its objects are Abelian groups.
- Its morphisms are homomorphisms of groups.
- The identity morphism is defined as the identity map.
- The composition of morphisms is defined by function composition.
Relation with other categories
Functors from this category
- Category of groups: The category of Abelian groups embeds as a full subcategory of the category of groups.
- Category of monoids
- Category of pointed sets
- Category of sets
Functors to this category
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Additional structure
Monoidal structure
- Monoidal category of Abelian groups: This is a monoidal category where the monoidal operation is the tensor product of Abelian groups. Note that the tensor product is neither a product nor a coproduct in the category of Abelian groups.