HepLean Documentation

Mathlib.CategoryTheory.Limits.Shapes.Pullback.Mono

Pullbacks and monomorphisms #

This file provides some results about interactions between pullbacks and monomorphisms, as well as the dual statements between pushouts and epimorphisms.

Main results #

The dual notions for pushouts are also available.

Monomorphisms are stable under pullback in the first argument.

Monomorphisms are stable under pullback in the second argument.

The pullback cone (𝟙 X, 𝟙 X) for the pair (f, f) is a limit if f is a mono. The converse is shown in mono_of_pullback_is_id.

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    f is a mono if the pullback cone (𝟙 X, 𝟙 X) is a limit for the pair (f, f). The converse is given in PullbackCone.is_id_of_mono.

    Suppose f and g are two morphisms with a common codomain and s is a limit cone over the diagram formed by f and g. Suppose f and g both factor through a monomorphism h via x and y, respectively. Then s is also a limit cone over the diagram formed by x and y.

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      If W is the pullback of f, g, it is also the pullback of f ≫ i, g ≫ i for any mono i.

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        The pullback of a monomorphism is a monomorphism

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        The pullback of a monomorphism is a monomorphism

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        The pullback of f, g is also the pullback of f ≫ i, g ≫ i for any mono i.

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          The pushout cocone (𝟙 X, 𝟙 X) for the pair (f, f) is a colimit if f is an epi. The converse is shown in epi_of_isColimit_mk_id_id.

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            def CategoryTheory.Limits.PushoutCocone.isColimitOfFactors {C : Type u} [CategoryTheory.Category.{v, u} C] {W X Y Z : C} (f : X Y) (g : X Z) (h : X W) [CategoryTheory.Epi h] (x : W Y) (y : W Z) (hhx : CategoryTheory.CategoryStruct.comp h x = f) (hhy : CategoryTheory.CategoryStruct.comp h y = g) (s : CategoryTheory.Limits.PushoutCocone f g) (hs : CategoryTheory.Limits.IsColimit s) :
            let_fun reassoc₁ := ; let_fun reassoc₂ := ; CategoryTheory.Limits.IsColimit (CategoryTheory.Limits.PushoutCocone.mk s.inl s.inr )

            Suppose f and g are two morphisms with a common domain and s is a colimit cocone over the diagram formed by f and g. Suppose f and g both factor through an epimorphism h via x and y, respectively. Then s is also a colimit cocone over the diagram formed by x and y.

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              If W is the pushout of f, g, it is also the pushout of h ≫ f, h ≫ g for any epi h.

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                The pushout of an epimorphism is an epimorphism

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                The pushout of an epimorphism is an epimorphism

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                The pushout of f, g is also the pullback of h ≫ f, h ≫ g for any epi h.

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