Extensive categories

Main definitions

• CategoryTheory.IsVanKampenColimit: A (colimit) cocone over a diagram F : J ⥤ C is van Kampen if for every cocone c' over the pullback of the diagram F' : J ⥤ C', c' is colimiting iff c' is the pullback of c.
• 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.

TODO

Show that the following are finitary extensive:

• the categories of sheaves over a site
• Scheme
• AffineScheme (CommRingᵒᵖ)

References

• https://ncatlab.org/nlab/show/extensive+category
• [Carboni et al, Introduction to extensive and distributive categories][CARBONI1993145]

def CategoryTheory.NatTrans.Equifibered {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {F : CategoryTheory.Functor J C} {G : CategoryTheory.Functor J C} (α : F ⟶ G) : Prop

A natural transformation is equifibered if every commutative square of the following form is a pullback.

F(X) → F(Y)
 ↓      ↓
G(X) → G(Y)

theorem CategoryTheory.NatTrans.equifibered_of_isIso {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {F : CategoryTheory.Functor J C} {G : CategoryTheory.Functor J C} (α : F ⟶ G) [CategoryTheory.IsIso α] : CategoryTheory.NatTrans.Equifibered α

theorem CategoryTheory.NatTrans.Equifibered.comp {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {F : CategoryTheory.Functor J C} {G : CategoryTheory.Functor J C} {H : CategoryTheory.Functor J C} {α : F ⟶ G} {β : G ⟶ H} (hα : CategoryTheory.NatTrans.Equifibered α) (hβ : CategoryTheory.NatTrans.Equifibered β) : CategoryTheory.NatTrans.Equifibered (CategoryTheory.CategoryStruct.comp α β)

def CategoryTheory.IsUniversalColimit {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {F : CategoryTheory.Functor J C} (c : CategoryTheory.Limits.Cocone F) : Prop

A (colimit) cocone over a diagram F : J ⥤ C is universal if it is stable under pullbacks.

def CategoryTheory.IsVanKampenColimit {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {F : CategoryTheory.Functor J C} (c : CategoryTheory.Limits.Cocone F) : Prop

A (colimit) cocone over a diagram F : J ⥤ C is van Kampen if for every cocone c' over the pullback of the diagram F' : J ⥤ C', c' is colimiting iff c' is the pullback of c.

TODO: Show that this is iff the functor C ⥤ Catᵒᵖ sending x to C/x preserves it. TODO: Show that this is iff the inclusion functor C ⥤ Span(C) preserves it.

theorem CategoryTheory.IsVanKampenColimit.isUniversal {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {F : CategoryTheory.Functor J C} {c : CategoryTheory.Limits.Cocone F} (H : CategoryTheory.IsVanKampenColimit c) : CategoryTheory.IsUniversalColimit c

noncomputable def CategoryTheory.IsVanKampenColimit.isColimit {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {F : CategoryTheory.Functor J C} {c : CategoryTheory.Limits.Cocone F} (h : CategoryTheory.IsVanKampenColimit c) : CategoryTheory.Limits.IsColimit c

A van Kampen colimit is a colimit.

theorem CategoryTheory.IsInitial.isVanKampenColimit {C : Type u} [CategoryTheory.Category.{v, u} C] [CategoryTheory.Limits.HasStrictInitialObjects C] {X : C} (h : CategoryTheory.Limits.IsInitial X) : CategoryTheory.IsVanKampenColimit (CategoryTheory.Limits.asEmptyCocone X)

class CategoryTheory.FinitaryExtensive (C : Type u) [CategoryTheory.Category.{v, u} C] : Prop

• hasFiniteCoproducts : CategoryTheory.Limits.HasFiniteCoproducts C
• van_kampen' : ∀ {X Y : C} (c : CategoryTheory.Limits.BinaryCofan X Y), CategoryTheory.Limits.IsColimit c → CategoryTheory.IsVanKampenColimit c

  In a finitary extensive category, all coproducts are van Kampen

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

TODO: Show that this is iff all finite coproducts are van Kampen.

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

theorem CategoryTheory.mapPair_equifibered {C : Type u} [CategoryTheory.Category.{v, u} C] {F : CategoryTheory.Functor (CategoryTheory.Discrete CategoryTheory.Limits.WalkingPair) C} {F' : CategoryTheory.Functor (CategoryTheory.Discrete CategoryTheory.Limits.WalkingPair) C} (α : F ⟶ F') : CategoryTheory.NatTrans.Equifibered α

theorem CategoryTheory.BinaryCofan.isVanKampen_iff {C : Type u} [CategoryTheory.Category.{v, u} C] {X : C} {Y : C} (c : CategoryTheory.Limits.BinaryCofan X Y) : CategoryTheory.IsVanKampenColimit c ↔ ∀ {X' Y' : C} (c' : CategoryTheory.Limits.BinaryCofan X' Y') (αX : X' ⟶ X) (αY : Y' ⟶ Y) (f : c'.pt ⟶ c.pt), CategoryTheory.CategoryStruct.comp αX (CategoryTheory.Limits.BinaryCofan.inl c) = CategoryTheory.CategoryStruct.comp (CategoryTheory.Limits.BinaryCofan.inl c') f → CategoryTheory.CategoryStruct.comp αY (CategoryTheory.Limits.BinaryCofan.inr c) = CategoryTheory.CategoryStruct.comp (CategoryTheory.Limits.BinaryCofan.inr c') f → (Nonempty (CategoryTheory.Limits.IsColimit c') ↔ CategoryTheory.IsPullback (CategoryTheory.Limits.BinaryCofan.inl c') αX f (CategoryTheory.Limits.BinaryCofan.inl c) ∧ CategoryTheory.IsPullback (CategoryTheory.Limits.BinaryCofan.inr c') αY f (CategoryTheory.Limits.BinaryCofan.inr c))

theorem CategoryTheory.BinaryCofan.isVanKampen_mk {C : Type u} [CategoryTheory.Category.{v, u} C] {X : C} {Y : C} (c : CategoryTheory.Limits.BinaryCofan X Y) (cofans : (X Y : C) → CategoryTheory.Limits.BinaryCofan X Y) (colimits : (X Y : C) → CategoryTheory.Limits.IsColimit (cofans X Y)) (cones : {X Y Z : C} → (f : X ⟶ Z) → (g : Y ⟶ Z) → CategoryTheory.Limits.PullbackCone f g) (limits : {X Y Z : C} → (f : X ⟶ Z) → (g : Y ⟶ Z) → CategoryTheory.Limits.IsLimit (cones X Y Z f g)) (h₁ : ∀ {X' Y' : C} (αX : X' ⟶ X) (αY : Y' ⟶ Y) (f : (cofans X' Y').pt ⟶ c.pt), CategoryTheory.CategoryStruct.comp αX (CategoryTheory.Limits.BinaryCofan.inl c) = CategoryTheory.CategoryStruct.comp (CategoryTheory.Limits.BinaryCofan.inl (cofans X' Y')) f → CategoryTheory.CategoryStruct.comp αY (CategoryTheory.Limits.BinaryCofan.inr c) = CategoryTheory.CategoryStruct.comp (CategoryTheory.Limits.BinaryCofan.inr (cofans X' Y')) f → CategoryTheory.IsPullback (CategoryTheory.Limits.BinaryCofan.inl (cofans X' Y')) αX f (CategoryTheory.Limits.BinaryCofan.inl c) ∧ CategoryTheory.IsPullback (CategoryTheory.Limits.BinaryCofan.inr (cofans X' Y')) αY f (CategoryTheory.Limits.BinaryCofan.inr c)) (h₂ : {Z : C} → (f : Z ⟶ c.pt) → CategoryTheory.Limits.IsColimit (CategoryTheory.Limits.BinaryCofan.mk (CategoryTheory.Limits.PullbackCone.fst (cones Z ((CategoryTheory.Limits.pair X Y).obj { as := CategoryTheory.Limits.WalkingPair.left }) c.pt f (CategoryTheory.Limits.BinaryCofan.inl c))) (CategoryTheory.Limits.PullbackCone.fst (cones Z ((CategoryTheory.Limits.pair X Y).obj { as := CategoryTheory.Limits.WalkingPair.right }) c.pt f (CategoryTheory.Limits.BinaryCofan.inr c))))) : CategoryTheory.IsVanKampenColimit c

theorem CategoryTheory.BinaryCofan.mono_inr_of_isVanKampen {C : Type u} [CategoryTheory.Category.{v, u} C] [CategoryTheory.Limits.HasInitial C] {X : C} {Y : C} {c : CategoryTheory.Limits.BinaryCofan X Y} (h : CategoryTheory.IsVanKampenColimit c) : CategoryTheory.Mono (CategoryTheory.Limits.BinaryCofan.inr c)

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

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

instance CategoryTheory.instMonoCoprodHasColimitOfHasColimitsOfShapeDiscreteWalkingPairDiscreteCategoryHasColimitsOfShape_discreteHasFiniteCoproductsOf_fintypeFintypeWalkingPairPairInl {C : Type u} [CategoryTheory.Category.{v, u} C] [CategoryTheory.FinitaryExtensive C] (X : C) (Y : C) : CategoryTheory.Mono CategoryTheory.Limits.coprod.inl

instance CategoryTheory.instMonoCoprodHasColimitOfHasColimitsOfShapeDiscreteWalkingPairDiscreteCategoryHasColimitsOfShape_discreteHasFiniteCoproductsOf_fintypeFintypeWalkingPairPairInr {C : Type u} [CategoryTheory.Category.{v, u} C] [CategoryTheory.FinitaryExtensive C] (X : C) (Y : C) : CategoryTheory.Mono CategoryTheory.Limits.coprod.inr

theorem CategoryTheory.BinaryCofan.isPullback_initial_to_of_isVanKampen {C : Type u} [CategoryTheory.Category.{v, u} C] {X : C} {Y : C} [CategoryTheory.Limits.HasInitial C] {c : CategoryTheory.Limits.BinaryCofan X Y} (h : CategoryTheory.IsVanKampenColimit c) : CategoryTheory.IsPullback (CategoryTheory.Limits.initial.to ((CategoryTheory.Limits.pair X Y).obj { as := CategoryTheory.Limits.WalkingPair.left })) (CategoryTheory.Limits.initial.to ((CategoryTheory.Limits.pair X Y).obj { as := CategoryTheory.Limits.WalkingPair.right })) (CategoryTheory.Limits.BinaryCofan.inl c) (CategoryTheory.Limits.BinaryCofan.inr c)

theorem CategoryTheory.FinitaryExtensive.isPullback_initial_to_binaryCofan {C : Type u} [CategoryTheory.Category.{v, u} C] {X : C} {Y : C} [CategoryTheory.FinitaryExtensive C] {c : CategoryTheory.Limits.BinaryCofan X Y} (hc : CategoryTheory.Limits.IsColimit c) : CategoryTheory.IsPullback (CategoryTheory.Limits.initial.to ((CategoryTheory.Limits.pair X Y).obj { as := CategoryTheory.Limits.WalkingPair.left })) (CategoryTheory.Limits.initial.to ((CategoryTheory.Limits.pair X Y).obj { as := CategoryTheory.Limits.WalkingPair.right })) (CategoryTheory.Limits.BinaryCofan.inl c) (CategoryTheory.Limits.BinaryCofan.inr c)

theorem CategoryTheory.hasStrictInitial_of_isUniversal {C : Type u} [CategoryTheory.Category.{v, u} C] [CategoryTheory.Limits.HasInitial C] (H : CategoryTheory.IsUniversalColimit (CategoryTheory.Limits.BinaryCofan.mk (CategoryTheory.CategoryStruct.id (⊥_ C)) (CategoryTheory.CategoryStruct.id (⊥_ C)))) : CategoryTheory.Limits.HasStrictInitialObjects C

instance CategoryTheory.hasStrictInitialObjects_of_finitaryExtensive {C : Type u} [CategoryTheory.Category.{v, u} C] [CategoryTheory.FinitaryExtensive C] : CategoryTheory.Limits.HasStrictInitialObjects C

theorem CategoryTheory.finitaryExtensive_iff_of_isTerminal (C : Type u) [CategoryTheory.Category.{v, u} C] [CategoryTheory.Limits.HasFiniteCoproducts C] (T : C) (HT : CategoryTheory.Limits.IsTerminal T) (c₀ : CategoryTheory.Limits.BinaryCofan T T) (hc₀ : CategoryTheory.Limits.IsColimit c₀) : CategoryTheory.FinitaryExtensive C ↔ CategoryTheory.IsVanKampenColimit c₀

instance CategoryTheory.types.finitaryExtensive : CategoryTheory.FinitaryExtensive (Type u)

noncomputable def CategoryTheory.finitaryExtensiveTopCatAux (Z : TopCat) (f : Z ⟶ TopCat.of (PUnit.{u + 1} ⊕ PUnit.{u + 1} )) : CategoryTheory.Limits.IsColimit (CategoryTheory.Limits.BinaryCofan.mk (TopCat.pullbackFst f (CategoryTheory.Limits.BinaryCofan.inl (TopCat.binaryCofan (TopCat.of PUnit.{u + 1} ) (TopCat.of PUnit.{u + 1} )))) (TopCat.pullbackFst f (CategoryTheory.Limits.BinaryCofan.inr (TopCat.binaryCofan (TopCat.of PUnit.{u + 1} ) (TopCat.of PUnit.{u + 1} )))))

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

instance CategoryTheory.instFinitaryExtensiveTopCatInstTopCatLargeCategory : CategoryTheory.FinitaryExtensive TopCat

theorem CategoryTheory.NatTrans.Equifibered.whiskerRight {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {D : Type u''} [CategoryTheory.Category.{v'', u''} D] {F : CategoryTheory.Functor J C} {G : CategoryTheory.Functor J C} {α : F ⟶ G} (hα : CategoryTheory.NatTrans.Equifibered α) (H : CategoryTheory.Functor C D) [CategoryTheory.Limits.PreservesLimitsOfShape CategoryTheory.Limits.WalkingCospan H] : CategoryTheory.NatTrans.Equifibered (CategoryTheory.whiskerRight α H)

theorem CategoryTheory.IsVanKampenColimit.of_iso {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {F : CategoryTheory.Functor J C} {c : CategoryTheory.Limits.Cocone F} {c' : CategoryTheory.Limits.Cocone F} (H : CategoryTheory.IsVanKampenColimit c) (e : c ≅ c') : CategoryTheory.IsVanKampenColimit c'

theorem CategoryTheory.IsVanKampenColimit.of_map {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {D : Type u_1} [CategoryTheory.Category.{u_2, u_1} D] (G : CategoryTheory.Functor C D) {F : CategoryTheory.Functor J C} {c : CategoryTheory.Limits.Cocone F} [CategoryTheory.Limits.PreservesLimitsOfShape CategoryTheory.Limits.WalkingCospan G] [CategoryTheory.Limits.ReflectsLimitsOfShape CategoryTheory.Limits.WalkingCospan G] [CategoryTheory.Limits.PreservesColimitsOfShape J G] [CategoryTheory.Limits.ReflectsColimitsOfShape J G] (H : CategoryTheory.IsVanKampenColimit (G.mapCocone c)) : CategoryTheory.IsVanKampenColimit c

theorem CategoryTheory.isVanKampenColimit_of_evaluation {J : Type v'} [CategoryTheory.Category.{u', v'} J] {C : Type u} [CategoryTheory.Category.{v, u} C] {D : Type u''} [CategoryTheory.Category.{v'', u''} D] [CategoryTheory.Limits.HasPullbacks D] [CategoryTheory.Limits.HasColimitsOfShape J D] (F : CategoryTheory.Functor J (CategoryTheory.Functor C D)) (c : CategoryTheory.Limits.Cocone F) (hc : ∀ (x : C), CategoryTheory.IsVanKampenColimit (((CategoryTheory.evaluation C D).obj x).mapCocone c)) : CategoryTheory.IsVanKampenColimit c

instance CategoryTheory.instFinitaryExtensiveFunctorCategory {C : Type u} [CategoryTheory.Category.{v, u} C] {D : Type u''} [CategoryTheory.Category.{v'', u''} D] [CategoryTheory.Limits.HasPullbacks C] [CategoryTheory.FinitaryExtensive C] : CategoryTheory.FinitaryExtensive (CategoryTheory.Functor D C)

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

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