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 ofX ⟶ X ⨿ YandY ⟶ X ⨿ Yis the initial object.CategoryTheory.types.finitaryExtensive: The category of types is extensive.CategoryTheory.FinitaryExtensive_TopCat: The categoryTopis extensive.CategoryTheory.FinitaryExtensive_functor: The categoryC ⥤ Dis extensive ifDhas 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:
SchemeAffineScheme(CommRingᵒᵖ)
References #
- https://ncatlab.org/nlab/show/extensive+category
- Carboni et al, Introduction to extensive and distributive categories
class
CategoryTheory.HasPullbacksOfInclusions
(C : Type u)
[Category.{v, u} C]
[Limits.HasBinaryCoproducts C]
:
A category has pullback of inclusions if it has all pullbacks along coproduct injections.
Instances
class
CategoryTheory.PreservesPullbacksOfInclusions
{C : Type u_1}
[Category.{u_3, u_1} C]
{D : Type u_2}
[Category.{u_4, u_2} 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 : Z ⟶ X ⨿ Y) : Limits.PreservesLimit (Limits.cospan Limits.coprod.inl f) F
Instances
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) : ∀ (a : Limits.IsColimit c), IsUniversalColimit c
In a finitary extensive category, all coproducts are van Kampen
Instances
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) : ∀ (a : Limits.IsColimit c), IsVanKampenColimit c
In a finitary extensive category, all coproducts are van Kampen
Instances
theorem
CategoryTheory.FinitaryExtensive.vanKampen
{C : Type u}
[Category.{v, u} C]
[FinitaryExtensive C]
{F : Functor (Discrete Limits.WalkingPair) C}
(c : Limits.Cocone F)
(hc : Limits.IsColimit c)
:
@[instance 100]
instance
CategoryTheory.HasPullbacksOfInclusions.instOfHasPullbacks
{C : Type u}
[Category.{v, u} C]
[Limits.HasBinaryCoproducts C]
[Limits.HasPullbacks C]
:
instance
CategoryTheory.HasPullbacksOfInclusions.preservesPullbackInl'
{C : Type u}
[Category.{v, u} C]
[Limits.HasBinaryCoproducts C]
[HasPullbacksOfInclusions C]
{X Y Z : C}
(f : Z ⟶ X ⨿ Y)
:
instance
CategoryTheory.HasPullbacksOfInclusions.hasPullbackInr'
{C : Type u}
[Category.{v, u} C]
[Limits.HasBinaryCoproducts C]
[HasPullbacksOfInclusions C]
{X Y Z : C}
(f : Z ⟶ X ⨿ Y)
:
instance
CategoryTheory.HasPullbacksOfInclusions.hasPullbackInr
{C : Type u}
[Category.{v, u} C]
[Limits.HasBinaryCoproducts C]
[HasPullbacksOfInclusions C]
{X Y Z : C}
(f : Z ⟶ X ⨿ Y)
:
@[instance 100]
instance
CategoryTheory.PreservesPullbacksOfInclusions.instOfPreservesLimitsOfShapeWalkingCospan
{C : Type u}
[Category.{v, u} C]
{D : Type u_1}
[Category.{u_2, u_1} D]
[Limits.HasBinaryCoproducts C]
(F : Functor C D)
[Limits.PreservesLimitsOfShape Limits.WalkingCospan F]
:
instance
CategoryTheory.PreservesPullbacksOfInclusions.preservesPullbackInl'
{C : Type u}
[Category.{v, u} C]
{D : Type u_1}
[Category.{u_2, u_1} D]
[Limits.HasBinaryCoproducts C]
(F : Functor C D)
[PreservesPullbacksOfInclusions F]
{X Y Z : C}
(f : Z ⟶ X ⨿ Y)
:
instance
CategoryTheory.PreservesPullbacksOfInclusions.preservesPullbackInr'
{C : Type u}
[Category.{v, u} C]
{D : Type u_1}
[Category.{u_2, u_1} D]
[Limits.HasBinaryCoproducts C]
(F : Functor C D)
[PreservesPullbacksOfInclusions F]
{X Y Z : C}
(f : Z ⟶ X ⨿ Y)
:
instance
CategoryTheory.PreservesPullbacksOfInclusions.preservesPullbackInr
{C : Type u}
[Category.{v, u} C]
{D : Type u_1}
[Category.{u_2, u_1} D]
[Limits.HasBinaryCoproducts C]
(F : Functor C D)
[PreservesPullbacksOfInclusions F]
{X Y Z : C}
(f : Z ⟶ X ⨿ Y)
:
@[instance 100]
instance
CategoryTheory.FinitaryExtensive.toFinitaryPreExtensive
{C : Type u}
[Category.{v, u} C]
[FinitaryExtensive C]
:
theorem
CategoryTheory.FinitaryExtensive.mono_inr_of_isColimit
{C : Type u}
[Category.{v, u} 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.{v, u} C]
{X Y : C}
[FinitaryExtensive C]
{c : Limits.BinaryCofan X Y}
(hc : Limits.IsColimit c)
:
instance
CategoryTheory.instMonoInl
{C : Type u}
[Category.{v, u} C]
[FinitaryExtensive C]
(X Y : C)
:
instance
CategoryTheory.instMonoInr
{C : Type u}
[Category.{v, u} C]
[FinitaryExtensive C]
(X Y : C)
:
theorem
CategoryTheory.FinitaryExtensive.isPullback_initial_to_binaryCofan
{C : Type u}
[Category.{v, u} 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
@[instance 100]
theorem
CategoryTheory.finitaryExtensive_iff_of_isTerminal
(C : Type u)
[Category.{v, u} C]
[Limits.HasFiniteCoproducts C]
[HasPullbacksOfInclusions C]
(T : C)
(HT : Limits.IsTerminal T)
(c₀ : Limits.BinaryCofan T T)
(hc₀ : Limits.IsColimit c₀)
:
noncomputable def
CategoryTheory.finitaryExtensiveTopCatAux
(Z : TopCat)
(f : Z ⟶ { carrier := PUnit.{u + 1} ⊕ PUnit.{u + 1}, str := instTopologicalSpaceSum })
:
Limits.IsColimit
(Limits.BinaryCofan.mk
(TopCat.pullbackFst f
({ carrier := PUnit.{u + 1}, str := instTopologicalSpacePUnit }.binaryCofan
{ carrier := PUnit.{u + 1}, str := instTopologicalSpacePUnit }).inl)
(TopCat.pullbackFst f
({ carrier := PUnit.{u + 1}, str := instTopologicalSpacePUnit }.binaryCofan
{ carrier := PUnit.{u + 1}, str := instTopologicalSpacePUnit }).inr))
(Implementation) An auxiliary lemma for the proof that TopCat is finitary extensive.
Equations
Instances For
theorem
CategoryTheory.finitaryExtensive_of_reflective
{C : Type u}
[Category.{v, u} C]
{D : Type u''}
[Category.{v'', u''} D]
[Limits.HasFiniteCoproducts D]
[HasPullbacksOfInclusions D]
[FinitaryExtensive C]
{Gl : Functor C D}
{Gr : Functor D C}
(adj : Gl ⊣ Gr)
[Gr.Full]
[Gr.Faithful]
[∀ (X : D) (Y : C) (f : X ⟶ Gl.obj Y), Limits.HasPullback (Gr.map f) (adj.unit.app Y)]
[∀ (X : D) (Y : C) (f : X ⟶ Gl.obj Y), Limits.PreservesLimit (Limits.cospan (Gr.map f) (adj.unit.app Y)) Gl]
[PreservesPullbacksOfInclusions Gl]
:
instance
CategoryTheory.finitaryExtensive_functor
{C : Type u}
[Category.{v, u} C]
{D : Type u''}
[Category.{v'', u''} D]
[Limits.HasPullbacks C]
[FinitaryExtensive C]
:
FinitaryExtensive (Functor D C)
instance
CategoryTheory.instPreservesLimitWalkingCospanCospanOfIsIso
{C : Type u_1}
[Category.{u_2, u_1} C]
{D : Type u_3}
[Category.{u_4, u_3} D]
(F : Functor C D)
{X Y Z : C}
(f : X ⟶ Z)
(g : Y ⟶ Z)
[IsIso f]
:
Limits.PreservesLimit (Limits.cospan f g) F
instance
CategoryTheory.instPreservesLimitWalkingCospanCospanOfIsIso_1
{C : Type u_1}
[Category.{u_2, u_1} C]
{D : Type u_3}
[Category.{u_4, u_3} D]
(F : Functor C D)
{X Y Z : C}
(f : X ⟶ Z)
(g : Y ⟶ Z)
[IsIso g]
:
Limits.PreservesLimit (Limits.cospan f g) F
theorem
CategoryTheory.finitaryExtensive_of_preserves_and_reflects
{C : Type u}
[Category.{v, u} C]
{D : Type u''}
[Category.{v'', u''} 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]
:
theorem
CategoryTheory.finitaryExtensive_of_preserves_and_reflects_isomorphism
{C : Type u}
[Category.{v, u} C]
{D : Type u''}
[Category.{v'', u''} 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]
:
theorem
CategoryTheory.FinitaryPreExtensive.isUniversal_finiteCoproducts_Fin
{C : Type u}
[Category.{v, u} C]
[FinitaryPreExtensive C]
{n : ℕ}
{F : Functor (Discrete (Fin n)) C}
{c : Limits.Cocone F}
(hc : Limits.IsColimit c)
:
theorem
CategoryTheory.FinitaryPreExtensive.isUniversal_finiteCoproducts
{C : Type u}
[Category.{v, u} C]
[FinitaryPreExtensive C]
{ι : Type u_1}
[Finite ι]
{F : Functor (Discrete ι) C}
{c : Limits.Cocone F}
(hc : Limits.IsColimit c)
:
theorem
CategoryTheory.FinitaryExtensive.isVanKampen_finiteCoproducts_Fin
{C : Type u}
[Category.{v, u} C]
[FinitaryExtensive C]
{n : ℕ}
{F : Functor (Discrete (Fin n)) C}
{c : Limits.Cocone F}
(hc : Limits.IsColimit c)
:
theorem
CategoryTheory.FinitaryExtensive.isVanKampen_finiteCoproducts
{C : Type u}
[Category.{v, u} C]
[FinitaryExtensive C]
{ι : Type u_1}
[Finite ι]
{F : Functor (Discrete ι) C}
{c : Limits.Cocone F}
(hc : Limits.IsColimit c)
:
theorem
CategoryTheory.FinitaryPreExtensive.hasPullbacks_of_is_coproduct
{C : Type u}
[Category.{v, u} 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 : 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.{v, u} 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)
:
instance
CategoryTheory.instMonoι
{C : Type u}
[Category.{v, u} 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.{v, u} 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 : 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.{v, u} C]
[FinitaryExtensive C]
{ι : Type u_1}
[Finite ι]
(X : ι → C)
(i j : ι)
(e : i ≠ j)
:
IsPullback (Limits.initial.to (X i)) (Limits.initial.to (X j)) (Limits.Sigma.ι X i) (Limits.Sigma.ι X j)
instance
CategoryTheory.FinitaryPreExtensive.hasPullbacks_of_inclusions
{C : Type u}
[Category.{v, u} C]
[FinitaryPreExtensive C]
{X Z : C}
{α : Type u_1}
(f : X ⟶ Z)
{Y : α → C}
(i : (a : α) → Y a ⟶ Z)
[Finite α]
[hi : IsIso (Limits.Sigma.desc i)]
(a : α)
:
Limits.HasPullback f (i a)
theorem
CategoryTheory.FinitaryPreExtensive.isIso_sigmaDesc_fst
{C : Type u}
[Category.{v, u} C]
[FinitaryPreExtensive C]
{α : Type}
[Finite α]
{X : C}
{Z : α → C}
(π : (a : α) → Z a ⟶ X)
{Y : C}
(f : Y ⟶ X)
(hπ : IsIso (Limits.Sigma.desc π))
:
IsIso (Limits.Sigma.desc fun (x : α) => Limits.pullback.fst f (π x))
@[deprecated CategoryTheory.FinitaryPreExtensive.isIso_sigmaDesc_fst (since := "2025-06-20")]
theorem
CategoryTheory.FinitaryPreExtensive.sigma_desc_iso
{C : Type u}
[Category.{v, u} C]
[FinitaryPreExtensive C]
{α : Type}
[Finite α]
{X : C}
{Z : α → C}
(π : (a : α) → Z a ⟶ X)
{Y : C}
(f : Y ⟶ X)
(hπ : IsIso (Limits.Sigma.desc π))
:
IsIso (Limits.Sigma.desc fun (x : α) => Limits.pullback.fst f (π x))
Alias of CategoryTheory.FinitaryPreExtensive.isIso_sigmaDesc_fst.
instance
CategoryTheory.FinitaryPreExtensive.isIso_sigmaDesc_map
{C : Type u}
[Category.{v, u} C]
[Limits.HasPullbacks C]
[FinitaryPreExtensive C]
{ι : Type u_1}
{ι' : Type u_2}
[Finite ι]
[Finite ι']
{S : C}
{X : ι → C}
{Y : ι' → C}
(f : (i : ι) → X i ⟶ S)
(g : (i : ι') → Y i ⟶ S)
:
IsIso
(Limits.Sigma.desc fun (p : ι × ι') =>
Limits.pullback.map (f p.1) (g p.2) (Limits.Sigma.desc f) (Limits.Sigma.desc g) (Limits.Sigma.ι X p.1)
(Limits.Sigma.ι Y p.2) (CategoryStruct.id S) ⋯ ⋯)
If C has pullbacks and is finitary (pre-)extensive, pullbacks distribute over finite
coproducts, i.e., ∐ (Xᵢ ×[S] Xⱼ) ≅ (∐ Xᵢ) ×[S] (∐ Xⱼ).
For an IsPullback version, see FinitaryPreExtensive.isPullback_sigmaDesc.
theorem
CategoryTheory.FinitaryPreExtensive.isPullback_sigmaDesc
{C : Type u}
[Category.{v, u} C]
[Limits.HasPullbacks C]
[FinitaryPreExtensive C]
{ι : Type u_1}
{ι' : Type u_2}
[Finite ι]
[Finite ι']
{S : C}
{X : ι → C}
{Y : ι' → C}
(f : (i : ι) → X i ⟶ S)
(g : (i : ι') → Y i ⟶ S)
:
IsPullback
(Limits.Sigma.desc fun (p : ι × ι') =>
CategoryStruct.comp (Limits.pullback.fst (f p.1) (g p.2)) (Limits.Sigma.ι X p.1))
(Limits.Sigma.desc fun (p : ι × ι') =>
CategoryStruct.comp (Limits.pullback.snd (f p.1) (g p.2)) (Limits.Sigma.ι Y p.2))
(Limits.Sigma.desc f) (Limits.Sigma.desc g)
If C has pullbacks and is finitary (pre-)extensive, pullbacks distribute over finite
coproducts, i.e., ∐ (Xᵢ ×[S] Xⱼ) ≅ (∐ Xᵢ) ×[S] (∐ Xⱼ).
For a variant, see FinitaryPreExtensive.isIso_sigmaDesc_map.