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Mathlib.CategoryTheory.Idempotents.Biproducts

Biproducts in the idempotent completion of a preadditive category #

In this file, we define an instance expressing that if C is an additive category (i.e. is preadditive and has finite biproducts), then Karoubi C is also an additive category.

We also obtain that for all P : Karoubi C where C is a preadditive category C, there is a canonical isomorphism P ⊞ P.complement ≅ (toKaroubi C).obj P.X in the category Karoubi C where P.complement is the formal direct factor of P.X corresponding to the idempotent endomorphism 𝟙 P.X - P.p.

The Bicone used in order to obtain the existence of the biproduct of a functor J ⥤ Karoubi C when the category C is additive.

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    A formal direct factor P : Karoubi C of an object P.X : C in a preadditive category is actually a direct factor of the image (toKaroubi C).obj P.X of P.X in the category Karoubi C

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