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category_theory.abelian.left_derived

Zeroth left derived functors #

If F : C ⥤ D is an additive right exact functor between abelian categories, where C has enough projectives, we provide the natural isomorphism F.left_derived 0 ≅ F.

Main definitions #

Main results #

If preserves_finite_colimits F and epi g, then exact (F.map f) (F.map g) if exact f g.

Given P : ProjectiveResolution X, a morphism F.obj X ⟶ (F.left_derived 0).obj X given preserves_finite_colimits F.

Equations

Given P : ProjectiveResolution X and Q : ProjectiveResolution Y and a morphism f : X ⟶ Y, naturality of the square given by `left_derived_zero_to_self_obj_hom.