Documentation

Mathlib.CategoryTheory.Extensive

Extensive categories #

Main definitions #

CategoryTheory.FinitaryExtensive: A category is (finitary) extensive if it has finite coproducts, and binary coproducts are van Kampen.

Main Results #

CategoryTheory.hasStrictInitialObjects_of_finitaryExtensive: The initial object in extensive categories is strict.
CategoryTheory.FinitaryExtensive.mono_inr_of_isColimit: Coproduct injections are monic in extensive categories.
CategoryTheory.BinaryCofan.isPullback_initial_to_of_isVanKampen: In extensive categories, sums are disjoint, i.e. the pullback of X ⟶ X ⨿ Y and Y ⟶ X ⨿ Y is the initial object.
CategoryTheory.types.finitaryExtensive: The category of types is extensive.
CategoryTheory.FinitaryExtensive_TopCat: The category Top is extensive.
CategoryTheory.FinitaryExtensive_functor: The category C ⥤ D is extensive if D has all pullbacks and is extensive.
CategoryTheory.FinitaryExtensive.isVanKampen_finiteCoproducts: Finite coproducts in a finitary extensive category are van Kampen.

TODO #

Show that the following are finitary extensive:

Scheme
AffineScheme (CommRingᵒᵖ)

References #

https://ncatlab.org/nlab/show/extensive+category
Carboni et al, Introduction to extensive and distributive categories

structure CategoryTheory.HasPullbacksOfInclusions (C : Type u) [Category C] [Limits.HasBinaryCoproducts C] :

A category has pullback of inclusions if it has all pullbacks along coproduct injections.

hasPullbackInl {X Y Z : C} (f : Quiver.Hom Z (Limits.coprod X Y)) : Limits.HasPullback Limits.coprod.inl f

Instances For

structure CategoryTheory.PreservesPullbacksOfInclusions {C : Type u_1} [Category C] {D : Type u_2} [Category D] (F : Functor C D) [Limits.HasBinaryCoproducts C] :

A functor preserves pullback of inclusions if it preserves all pullbacks along coproduct injections.

preservesPullbackInl {X Y Z : C} (f : Quiver.Hom Z (Limits.coprod X Y)) : Limits.PreservesLimit (Limits.cospan Limits.coprod.inl f) F

Instances For

structure CategoryTheory.FinitaryPreExtensive (C : Type u) [Category C] :

A category is (finitary) pre-extensive if it has finite coproducts, and binary coproducts are universal.

hasFiniteCoproducts : Limits.HasFiniteCoproducts C
hasPullbacksOfInclusions : HasPullbacksOfInclusions C
universal' {X Y : C} (c : Limits.BinaryCofan X Y) : Limits.IsColimit c → IsUniversalColimit c
In a finitary extensive category, all coproducts are van Kampen

Instances For

structure CategoryTheory.FinitaryExtensive (C : Type u) [Category C] :

A category is (finitary) extensive if it has finite coproducts, and binary coproducts are van Kampen.

hasFiniteCoproducts : Limits.HasFiniteCoproducts C
hasPullbacksOfInclusions : HasPullbacksOfInclusions C
van_kampen' {X Y : C} (c : Limits.BinaryCofan X Y) : Limits.IsColimit c → IsVanKampenColimit c
In a finitary extensive category, all coproducts are van Kampen

Instances For

theorem CategoryTheory.FinitaryExtensive.vanKampen {C : Type u} [Category C] [FinitaryExtensive C] {F : Functor (Discrete Limits.WalkingPair) C} (c : Limits.Cocone F) (hc : Limits.IsColimit c) :

IsVanKampenColimit c

theorem CategoryTheory.HasPullbacksOfInclusions.instOfHasPullbacks {C : Type u} [Category C] [Limits.HasBinaryCoproducts C] [Limits.HasPullbacks C] :

HasPullbacksOfInclusions C

theorem CategoryTheory.HasPullbacksOfInclusions.preservesPullbackInl' {C : Type u} [Category C] [Limits.HasBinaryCoproducts C] [HasPullbacksOfInclusions C] {X Y Z : C} (f : Quiver.Hom Z (Limits.coprod X Y)) :

Limits.HasPullback f Limits.coprod.inl

theorem CategoryTheory.HasPullbacksOfInclusions.hasPullbackInr' {C : Type u} [Category C] [Limits.HasBinaryCoproducts C] [HasPullbacksOfInclusions C] {X Y Z : C} (f : Quiver.Hom Z (Limits.coprod X Y)) :

Limits.HasPullback f Limits.coprod.inr

theorem CategoryTheory.HasPullbacksOfInclusions.hasPullbackInr {C : Type u} [Category C] [Limits.HasBinaryCoproducts C] [HasPullbacksOfInclusions C] {X Y Z : C} (f : Quiver.Hom Z (Limits.coprod X Y)) :

Limits.HasPullback Limits.coprod.inr f

theorem CategoryTheory.PreservesPullbacksOfInclusions.instOfPreservesLimitsOfShapeWalkingCospan {C : Type u} [Category C] {D : Type u_1} [Category D] [Limits.HasBinaryCoproducts C] (F : Functor C D) [Limits.PreservesLimitsOfShape Limits.WalkingCospan F] :

PreservesPullbacksOfInclusions F

theorem CategoryTheory.PreservesPullbacksOfInclusions.preservesPullbackInl' {C : Type u} [Category C] {D : Type u_1} [Category D] [Limits.HasBinaryCoproducts C] (F : Functor C D) [PreservesPullbacksOfInclusions F] {X Y Z : C} (f : Quiver.Hom Z (Limits.coprod X Y)) :

Limits.PreservesLimit (Limits.cospan f Limits.coprod.inl) F

theorem CategoryTheory.PreservesPullbacksOfInclusions.preservesPullbackInr' {C : Type u} [Category C] {D : Type u_1} [Category D] [Limits.HasBinaryCoproducts C] (F : Functor C D) [PreservesPullbacksOfInclusions F] {X Y Z : C} (f : Quiver.Hom Z (Limits.coprod X Y)) :

Limits.PreservesLimit (Limits.cospan f Limits.coprod.inr) F

theorem CategoryTheory.PreservesPullbacksOfInclusions.preservesPullbackInr {C : Type u} [Category C] {D : Type u_1} [Category D] [Limits.HasBinaryCoproducts C] (F : Functor C D) [PreservesPullbacksOfInclusions F] {X Y Z : C} (f : Quiver.Hom Z (Limits.coprod X Y)) :

Limits.PreservesLimit (Limits.cospan Limits.coprod.inr f) F

theorem CategoryTheory.FinitaryExtensive.toFinitaryPreExtensive {C : Type u} [Category C] [FinitaryExtensive C] :

FinitaryPreExtensive C

theorem CategoryTheory.FinitaryExtensive.mono_inr_of_isColimit {C : Type u} [Category C] {X Y : C} [FinitaryExtensive C] {c : Limits.BinaryCofan X Y} (hc : Limits.IsColimit c) :

theorem CategoryTheory.FinitaryExtensive.mono_inl_of_isColimit {C : Type u} [Category C] {X Y : C} [FinitaryExtensive C] {c : Limits.BinaryCofan X Y} (hc : Limits.IsColimit c) :

theorem CategoryTheory.instMonoInl {C : Type u} [Category C] [FinitaryExtensive C] (X Y : C) :

Mono Limits.coprod.inl

theorem CategoryTheory.instMonoInr {C : Type u} [Category C] [FinitaryExtensive C] (X Y : C) :

Mono Limits.coprod.inr

theorem CategoryTheory.FinitaryExtensive.isPullback_initial_to_binaryCofan {C : Type u} [Category C] {X Y : C} [FinitaryExtensive C] {c : Limits.BinaryCofan X Y} (hc : Limits.IsColimit c) :

IsPullback (Limits.initial.to ((Limits.pair X Y).obj { as := Limits.WalkingPair.left })) (Limits.initial.to ((Limits.pair X Y).obj { as := Limits.WalkingPair.right })) c.inl c.inr

theorem CategoryTheory.hasStrictInitialObjects_of_finitaryPreExtensive {C : Type u} [Category C] [FinitaryPreExtensive C] :

Limits.HasStrictInitialObjects C

theorem CategoryTheory.finitaryExtensive_iff_of_isTerminal (C : Type u) [Category C] [Limits.HasFiniteCoproducts C] [HasPullbacksOfInclusions C] (T : C) (HT : Limits.IsTerminal T) (c₀ : Limits.BinaryCofan T T) (hc₀ : Limits.IsColimit c₀) :

Iff (FinitaryExtensive C) (IsVanKampenColimit c₀)

theorem CategoryTheory.types.finitaryExtensive :

FinitaryExtensive (Type u)

noncomputable def CategoryTheory.finitaryExtensiveTopCatAux (Z : TopCat) (f : Quiver.Hom Z (TopCat.of (Sum PUnit PUnit))) :

Limits.IsColimit (Limits.BinaryCofan.mk (TopCat.pullbackFst f ((TopCat.of PUnit).binaryCofan (TopCat.of PUnit)).inl) (TopCat.pullbackFst f ((TopCat.of PUnit).binaryCofan (TopCat.of PUnit)).inr))

(Implementation) An auxiliary lemma for the proof that TopCat is finitary extensive.

Equations

Eq (CategoryTheory.finitaryExtensiveTopCatAux Z f) ⋯.some

Instances For

theorem CategoryTheory.finitaryExtensive_TopCat :

FinitaryExtensive TopCat

theorem CategoryTheory.finitaryExtensive_of_reflective {C : Type u} [Category C] {D : Type u''} [Category D] [Limits.HasFiniteCoproducts D] [HasPullbacksOfInclusions D] [FinitaryExtensive C] {Gl : Functor C D} {Gr : Functor D C} (adj : Adjunction Gl Gr) [Gr.Full] [Gr.Faithful] [∀ (X : D) (Y : C) (f : Quiver.Hom X (Gl.obj Y)), Limits.HasPullback (Gr.map f) (adj.unit.app Y)] [∀ (X : D) (Y : C) (f : Quiver.Hom X (Gl.obj Y)), Limits.PreservesLimit (Limits.cospan (Gr.map f) (adj.unit.app Y)) Gl] [PreservesPullbacksOfInclusions Gl] :

FinitaryExtensive D

theorem CategoryTheory.finitaryExtensive_functor {C : Type u} [Category C] {D : Type u''} [Category D] [Limits.HasPullbacks C] [FinitaryExtensive C] :

FinitaryExtensive (Functor D C)

theorem CategoryTheory.instPreservesLimitWalkingCospanCospanOfIsIso {C : Type u_1} [Category C] {D : Type u_3} [Category D] (F : Functor C D) {X Y Z : C} (f : Quiver.Hom X Z) (g : Quiver.Hom Y Z) [IsIso f] :

Limits.PreservesLimit (Limits.cospan f g) F

theorem CategoryTheory.instPreservesLimitWalkingCospanCospanOfIsIso_1 {C : Type u_1} [Category C] {D : Type u_3} [Category D] (F : Functor C D) {X Y Z : C} (f : Quiver.Hom X Z) (g : Quiver.Hom Y Z) [IsIso g] :

Limits.PreservesLimit (Limits.cospan f g) F

theorem CategoryTheory.finitaryExtensive_of_preserves_and_reflects {C : Type u} [Category C] {D : Type u''} [Category D] (F : Functor C D) [FinitaryExtensive D] [Limits.HasFiniteCoproducts C] [HasPullbacksOfInclusions C] [PreservesPullbacksOfInclusions F] [Limits.ReflectsLimitsOfShape Limits.WalkingCospan F] [Limits.PreservesColimitsOfShape (Discrete Limits.WalkingPair) F] [Limits.ReflectsColimitsOfShape (Discrete Limits.WalkingPair) F] :

FinitaryExtensive C

theorem CategoryTheory.finitaryExtensive_of_preserves_and_reflects_isomorphism {C : Type u} [Category C] {D : Type u''} [Category D] (F : Functor C D) [FinitaryExtensive D] [Limits.HasFiniteCoproducts C] [Limits.HasPullbacks C] [Limits.PreservesLimitsOfShape Limits.WalkingCospan F] [Limits.PreservesColimitsOfShape (Discrete Limits.WalkingPair) F] [F.ReflectsIsomorphisms] :

FinitaryExtensive C

theorem CategoryTheory.FinitaryPreExtensive.isUniversal_finiteCoproducts_Fin {C : Type u} [Category C] [FinitaryPreExtensive C] {n : Nat} {F : Functor (Discrete (Fin n)) C} {c : Limits.Cocone F} (hc : Limits.IsColimit c) :

IsUniversalColimit c

theorem CategoryTheory.FinitaryPreExtensive.isUniversal_finiteCoproducts {C : Type u} [Category C] [FinitaryPreExtensive C] {ι : Type u_1} [Finite ι] {F : Functor (Discrete ι) C} {c : Limits.Cocone F} (hc : Limits.IsColimit c) :

IsUniversalColimit c

theorem CategoryTheory.FinitaryExtensive.isVanKampen_finiteCoproducts_Fin {C : Type u} [Category C] [FinitaryExtensive C] {n : Nat} {F : Functor (Discrete (Fin n)) C} {c : Limits.Cocone F} (hc : Limits.IsColimit c) :

IsVanKampenColimit c

theorem CategoryTheory.FinitaryExtensive.isVanKampen_finiteCoproducts {C : Type u} [Category C] [FinitaryExtensive C] {ι : Type u_1} [Finite ι] {F : Functor (Discrete ι) C} {c : Limits.Cocone F} (hc : Limits.IsColimit c) :

IsVanKampenColimit c

theorem CategoryTheory.FinitaryPreExtensive.hasPullbacks_of_is_coproduct {C : Type u} [Category C] [FinitaryPreExtensive C] {ι : Type u_1} [Finite ι] {F : Functor (Discrete ι) C} {c : Limits.Cocone F} (hc : Limits.IsColimit c) (i : Discrete ι) {X : C} (g : Quiver.Hom X (((Functor.const (Discrete ι)).obj c.pt).obj i)) :

Limits.HasPullback g (c.ι.app i)

theorem CategoryTheory.FinitaryExtensive.mono_ι {C : Type u} [Category C] [FinitaryExtensive C] {ι : Type u_1} [Finite ι] {F : Functor (Discrete ι) C} {c : Limits.Cocone F} (hc : Limits.IsColimit c) (i : Discrete ι) :

Mono (c.ι.app i)

theorem CategoryTheory.instMonoι {C : Type u} [Category C] [FinitaryExtensive C] {ι : Type u_1} [Finite ι] (X : ι → C) (i : ι) :

Mono (Limits.Sigma.ι X i)

theorem CategoryTheory.FinitaryExtensive.isPullback_initial_to {C : Type u} [Category C] [FinitaryExtensive C] {ι : Type u_1} [Finite ι] {F : Functor (Discrete ι) C} {c : Limits.Cocone F} (hc : Limits.IsColimit c) (i j : Discrete ι) (e : Ne i j) :

IsPullback (Limits.initial.to (F.obj i)) (Limits.initial.to (F.obj j)) (c.ι.app i) (c.ι.app j)

theorem CategoryTheory.FinitaryExtensive.isPullback_initial_to_sigma_ι {C : Type u} [Category C] [FinitaryExtensive C] {ι : Type u_1} [Finite ι] (X : ι → C) (i j : ι) (e : Ne i j) :

IsPullback (Limits.initial.to (X i)) (Limits.initial.to (X j)) (Limits.Sigma.ι X i) (Limits.Sigma.ι X j)

theorem CategoryTheory.FinitaryPreExtensive.hasPullbacks_of_inclusions {C : Type u} [Category C] [FinitaryPreExtensive C] {X Z : C} {α : Type u_1} (f : Quiver.Hom X Z) {Y : α → C} (i : (a : α) → Quiver.Hom (Y a) Z) [Finite α] [hi : IsIso (Limits.Sigma.desc i)] (a : α) :

Limits.HasPullback f (i a)

theorem CategoryTheory.FinitaryPreExtensive.sigma_desc_iso {C : Type u} [Category C] [FinitaryPreExtensive C] {α : Type} [Finite α] {X : C} {Z : α → C} (π : (a : α) → Quiver.Hom (Z a) X) {Y : C} (f : Quiver.Hom Y X) (hπ : IsIso (Limits.Sigma.desc π)) :

IsIso (Limits.Sigma.desc fun (x : α) => Limits.pullback.fst f (π x))