Quotient of an abelian category

In mathematics, the quotient of an abelian category A by a Serre subcategory B is the category whose objects are those of A and whose morphisms from X to Y are given by the direct limit over subobjects and such that . The quotient A/B will then be an Abelian category, and there is a canonical functor sending an object X to itself and a morphism to the corresponding element of the direct limit with X'=X and Y'=0. This Abelian quotient satisfies the universal property that if C is any other Abelian category, and is an exact functor such that F(b) is a zero object of C for each , then there is a unique exact functor such that .[1]

References

  1. Gabriel, Pierre, Des categories abeliennes, Bull. Soc. Math. France 90 (1962), 323-448.
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