Gluing Topological spaces #

Given a family of gluing data (see Mathlib/CategoryTheory/GlueData.lean), we can then glue them together.

The construction should be "sealed" and considered as a black box, while only using the API provided.

Main definitions #

TopCat.GlueData: A structure containing the family of gluing data.
CategoryTheory.GlueData.glued: The glued topological space. This is defined as the multicoequalizer of ∐ V i j ⇉ ∐ U i, so that the general colimit API can be used.
CategoryTheory.GlueData.ι: The immersion ι i : U i ⟶ glued for each i : ι.
TopCat.GlueData.Rel: A relation on Σ i, D.U i defined by ⟨i, x⟩ ~ ⟨j, y⟩ iff ⟨i, x⟩ = ⟨j, y⟩ or t i j x = y. See TopCat.GlueData.ι_eq_iff_rel.
TopCat.GlueData.mk: A constructor of GlueData whose conditions are stated in terms of elements rather than subobjects and pullbacks.
TopCat.GlueData.ofOpenSubsets: Given a family of open sets, we may glue them into a new topological space. This new space embeds into the original space, and is homeomorphic to it if the given family is an open cover (TopCat.GlueData.openCoverGlueHomeo).

Main results #

TopCat.GlueData.isOpen_iff: A set in glued is open iff its preimage along each ι i is open.
TopCat.GlueData.ι_jointly_surjective: The ι is are jointly surjective.
TopCat.GlueData.rel_equiv: Rel is an equivalence relation.
TopCat.GlueData.ι_eq_iff_rel: ι i x = ι j y ↔ ⟨i, x⟩ ~ ⟨j, y⟩.
TopCat.GlueData.image_inter: The intersection of the images of U i and U j in glued is V i j.
TopCat.GlueData.preimage_range: The preimage of the image of U i in U j is V i j.
TopCat.GlueData.preimage_image_eq_image: The preimage of the image of some U ⊆ U i is given by XXX.
TopCat.GlueData.ι_isOpenEmbedding: Each of the ι is are open embeddings.

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structure TopCat.GlueDataextends CategoryTheory.GlueData :

Type (u_1 + 1)

A family of gluing data consists of

An index type J
An object U i for each i : J.
An object V i j for each i j : J. (Note that this is J × J → TopCat rather than J → J → TopCat to connect to the limits library easier.)
An open embedding f i j : V i j ⟶ U i for each i j : ι.
A transition map t i j : V i j ⟶ V j i for each i j : ι. such that
f i i is an isomorphism.
t i i is the identity.
V i j ×[U i] V i k ⟶ V i j ⟶ V j i factors through V j k ×[U j] V j i ⟶ V j i via some t' : V i j ×[U i] V i k ⟶ V j k ×[U j] V j i. (This merely means that V i j ∩ V i k ⊆ t i j ⁻¹' (V j i ∩ V j k).)
t' i j k ≫ t' j k i ≫ t' k i j = 𝟙 _.

We can then glue the topological spaces U i together by identifying V i j with V j i, such that the U i's are open subspaces of the glued space.

Most of the times it would be easier to use the constructor TopCat.GlueData.mk' where the conditions are stated in a less categorical way.

J : Type u_1
U : self.J → TopCat
V : self.J × self.J → TopCat
f : (i j : self.J) → self.V (i, j) ⟶ self.U i
f_mono : ∀ (i j : self.J), CategoryTheory.Mono (self.f i j)
f_hasPullback : ∀ (i j k : self.J), CategoryTheory.Limits.HasPullback (self.f i j) (self.f i k)
f_id : ∀ (i : self.J), CategoryTheory.IsIso (self.f i i)
t : (i j : self.J) → self.V (i, j) ⟶ self.V (j, i)
t_id : ∀ (i : self.J), self.t i i = CategoryTheory.CategoryStruct.id (self.V (i, i))
t' : (i j k : self.J) → CategoryTheory.Limits.pullback (self.f i j) (self.f i k) ⟶ CategoryTheory.Limits.pullback (self.f j k) (self.f j i)
t_fac : ∀ (i j k : self.J), CategoryTheory.CategoryStruct.comp (self.t' i j k) (CategoryTheory.Limits.pullback.snd (self.f j k) (self.f j i)) = CategoryTheory.CategoryStruct.comp (CategoryTheory.Limits.pullback.fst (self.f i j) (self.f i k)) (self.t i j)
cocycle : ∀ (i j k : self.J), CategoryTheory.CategoryStruct.comp (self.t' i j k) (CategoryTheory.CategoryStruct.comp (self.t' j k i) (self.t' k i j)) = CategoryTheory.CategoryStruct.id (CategoryTheory.Limits.pullback (self.f i j) (self.f i k))
f_open : ∀ (i j : self.J), IsOpenEmbedding ⇑(self.f i j)

Instances For

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theorem TopCat.GlueData.f_open (self : TopCat.GlueData) (i : self.J) (j : self.J) :

IsOpenEmbedding ⇑(self.f i j)

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theorem TopCat.GlueData.π_surjective (D : TopCat.GlueData) :

Function.Surjective ⇑D.π

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theorem TopCat.GlueData.isOpen_iff (D : TopCat.GlueData) (U : Set ↑D.glued) :

IsOpen U ↔ ∀ (i : D.J), IsOpen (⇑(D.ι i) ⁻¹' U)

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theorem TopCat.GlueData.ι_jointly_surjective (D : TopCat.GlueData) (x : ↑D.glued) :

∃ (i : D.J) (y : ↑(D.U i)), (D.ι i) y = x

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def TopCat.GlueData.Rel (D : TopCat.GlueData) (a : (i : D.J) × ↑(D.U i)) (b : (i : D.J) × ↑(D.U i)) :

Prop

An equivalence relation on Σ i, D.U i that holds iff 𝖣 .ι i x = 𝖣 .ι j y. See TopCat.GlueData.ι_eq_iff_rel.

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D.Rel a b = (a = b ∨ ∃ (x : ↑(D.V (a.fst, b.fst))), (D.f a.fst b.fst) x = a.snd ∧ (D.f b.fst a.fst) ((D.t a.fst b.fst) x) = b.snd)

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theorem TopCat.GlueData.rel_equiv (D : TopCat.GlueData) :

Equivalence D.Rel

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theorem TopCat.GlueData.eqvGen_of_π_eq (D : TopCat.GlueData) {x : ↑(∐ D.U)} {y : ↑(∐ D.U)} (h : D.π x = D.π y) :

Relation.EqvGen (CategoryTheory.Limits.Types.CoequalizerRel ⇑D.diagram.fstSigmaMap ⇑D.diagram.sndSigmaMap) x y

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theorem TopCat.GlueData.ι_eq_iff_rel (D : TopCat.GlueData) (i : D.J) (j : D.J) (x : ↑(D.U i)) (y : ↑(D.U j)) :

(D.ι i) x = (D.ι j) y ↔ D.Rel ⟨i, x⟩ ⟨j, y⟩

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theorem TopCat.GlueData.ι_injective (D : TopCat.GlueData) (i : D.J) :

Function.Injective ⇑(D.ι i)

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instance TopCat.GlueData.ι_mono (D : TopCat.GlueData) (i : D.J) :

CategoryTheory.Mono (D.ι i)

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⋯ = ⋯

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theorem TopCat.GlueData.image_inter (D : TopCat.GlueData) (i : D.J) (j : D.J) :

Set.range ⇑(D.ι i) ∩ Set.range ⇑(D.ι j) = Set.range ⇑(CategoryTheory.CategoryStruct.comp (D.f i j) (D.ι i))

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theorem TopCat.GlueData.preimage_range (D : TopCat.GlueData) (i : D.J) (j : D.J) :

⇑(D.ι j) ⁻¹' Set.range ⇑(D.ι i) = Set.range ⇑(D.f j i)

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theorem TopCat.GlueData.preimage_image_eq_image (D : TopCat.GlueData) (i : D.J) (j : D.J) (U : Set ↑(D.U i)) :

⇑(D.ι j) ⁻¹' (⇑(D.ι i) '' U) = ⇑(D.f j i) '' (⇑(CategoryTheory.CategoryStruct.comp (D.t j i) (D.f i j)) ⁻¹' U)

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theorem TopCat.GlueData.preimage_image_eq_image' (D : TopCat.GlueData) (i : D.J) (j : D.J) (U : Set ↑(D.U i)) :

⇑(D.ι j) ⁻¹' (⇑(D.ι i) '' U) = ⇑(CategoryTheory.CategoryStruct.comp (D.t i j) (D.f j i)) '' (⇑(D.f i j) ⁻¹' U)

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theorem TopCat.GlueData.open_image_open (D : TopCat.GlueData) (i : D.J) (U : TopologicalSpace.Opens ↑(D.U i)) :

IsOpen (⇑(D.ι i) '' ↑U)

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theorem TopCat.GlueData.ι_isOpenEmbedding (D : TopCat.GlueData) (i : D.J) :

IsOpenEmbedding ⇑(D.ι i)

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@[deprecated TopCat.GlueData.ι_isOpenEmbedding]

theorem TopCat.GlueData.ι_openEmbedding (D : TopCat.GlueData) (i : D.J) :

IsOpenEmbedding ⇑(D.ι i)

Alias of TopCat.GlueData.ι_isOpenEmbedding.

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structure TopCat.GlueData.MkCore :

Type (u + 1)

A family of gluing data consists of

An index type J
A bundled topological space U i for each i : J.
An open set V i j ⊆ U i for each i j : J.
A transition map t i j : V i j ⟶ V j i for each i j : ι. such that
V i i = U i.
t i i is the identity.
For each x ∈ V i j ∩ V i k, t i j x ∈ V j k.
t j k (t i j x) = t i k x.

We can then glue the topological spaces U i together by identifying V i j with V j i.

J : Type u
U : self.J → TopCat
V : (i : self.J) → self.J → TopologicalSpace.Opens ↑(self.U i)
t : (i j : self.J) → (TopologicalSpace.Opens.toTopCat (self.U i)).obj (self.V i j) ⟶ (TopologicalSpace.Opens.toTopCat (self.U j)).obj (self.V j i)
V_id : ∀ (i : self.J), self.V i i = ⊤
t_id : ∀ (i : self.J), ⇑(self.t i i) = id
t_inter : ∀ ⦃i j : self.J⦄ (k : self.J) (x : ↥(self.V i j)), ↑x ∈ self.V i k → ↑((self.t i j) x) ∈ self.V j k
cocycle : ∀ (i j k : self.J) (x : ↥(self.V i j)) (h : ↑x ∈ self.V i k), ↑((self.t j k) ⟨↑((self.t i j) x), ⋯⟩) = ↑((self.t i k) ⟨↑x, h⟩)

Instances For

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theorem TopCat.GlueData.MkCore.V_id (self : TopCat.GlueData.MkCore) (i : self.J) :

self.V i i = ⊤

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theorem TopCat.GlueData.MkCore.t_id (self : TopCat.GlueData.MkCore) (i : self.J) :

⇑(self.t i i) = id

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theorem TopCat.GlueData.MkCore.t_inter (self : TopCat.GlueData.MkCore) ⦃i : self.J⦄ ⦃j : self.J⦄ (k : self.J) (x : ↥(self.V i j)) :

↑x ∈ self.V i k → ↑((self.t i j) x) ∈ self.V j k

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theorem TopCat.GlueData.MkCore.cocycle (self : TopCat.GlueData.MkCore) (i : self.J) (j : self.J) (k : self.J) (x : ↥(self.V i j)) (h : ↑x ∈ self.V i k) :

↑((self.t j k) ⟨↑((self.t i j) x), ⋯⟩) = ↑((self.t i k) ⟨↑x, h⟩)

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theorem TopCat.GlueData.MkCore.t_inv (h : TopCat.GlueData.MkCore) (i : h.J) (j : h.J) (x : ↥(h.V j i)) :

(h.t i j) ((h.t j i) x) = x

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instance TopCat.GlueData.instIsIsoT (h : TopCat.GlueData.MkCore) (i : h.J) (j : h.J) :

CategoryTheory.IsIso (h.t i j)

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⋯ = ⋯

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def TopCat.GlueData.MkCore.t' (h : TopCat.GlueData.MkCore) (i : h.J) (j : h.J) (k : h.J) :

CategoryTheory.Limits.pullback (h.V i j).inclusion' (h.V i k).inclusion' ⟶ CategoryTheory.Limits.pullback (h.V j k).inclusion' (h.V j i).inclusion'

(Implementation) the restricted transition map to be fed into TopCat.GlueData.

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One or more equations did not get rendered due to their size.

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def TopCat.GlueData.mk' (h : TopCat.GlueData.MkCore) :

TopCat.GlueData

This is a constructor of TopCat.GlueData whose arguments are in terms of elements and intersections rather than subobjects and pullbacks. Please refer to TopCat.GlueData.MkCore for details.

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One or more equations did not get rendered due to their size.

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def TopCat.GlueData.ofOpenSubsets {α : Type u} [TopologicalSpace α] {J : Type u} (U : J → TopologicalSpace.Opens α) :

TopCat.GlueData

We may construct a glue data from a family of open sets.

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@[simp]

theorem TopCat.GlueData.ofOpenSubsets_toGlueData_U {α : Type u} [TopologicalSpace α] {J : Type u} (U : J → TopologicalSpace.Opens α) :

∀ (a : (TopCat.GlueData.MkCore.mk (fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) (fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) (fun (i j : J) => { toFun := fun (x : ↑((TopologicalSpace.Opens.toTopCat ((fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) i)).obj ((fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) i j))) => ⟨⟨↑↑x, ⋯⟩, ⋯⟩, continuous_toFun := ⋯ }) ⋯ ⋯ ⋯ ⋯).J), (TopCat.GlueData.ofOpenSubsets U).U a = (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U a)

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@[simp]

theorem TopCat.GlueData.ofOpenSubsets_toGlueData_V {α : Type u} [TopologicalSpace α] {J : Type u} (U : J → TopologicalSpace.Opens α) (i : (TopCat.GlueData.MkCore.mk (fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) (fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) (fun (i j : J) => { toFun := fun (x : ↑((TopologicalSpace.Opens.toTopCat ((fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) i)).obj ((fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) i j))) => ⟨⟨↑↑x, ⋯⟩, ⋯⟩, continuous_toFun := ⋯ }) ⋯ ⋯ ⋯ ⋯).J × (TopCat.GlueData.MkCore.mk (fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) (fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) (fun (i j : J) => { toFun := fun (x : ↑((TopologicalSpace.Opens.toTopCat ((fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) i)).obj ((fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) i j))) => ⟨⟨↑↑x, ⋯⟩, ⋯⟩, continuous_toFun := ⋯ }) ⋯ ⋯ ⋯ ⋯).J) :

(TopCat.GlueData.ofOpenSubsets U).V i = (TopologicalSpace.Opens.toTopCat ((TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i.1))).obj ((TopologicalSpace.Opens.map (U i.1).inclusion').obj (U i.2))

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@[simp]

theorem TopCat.GlueData.ofOpenSubsets_toGlueData_f {α : Type u} [TopologicalSpace α] {J : Type u} (U : J → TopologicalSpace.Opens α) (i : (TopCat.GlueData.MkCore.mk (fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) (fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) (fun (i j : J) => { toFun := fun (x : ↑((TopologicalSpace.Opens.toTopCat ((fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) i)).obj ((fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) i j))) => ⟨⟨↑↑x, ⋯⟩, ⋯⟩, continuous_toFun := ⋯ }) ⋯ ⋯ ⋯ ⋯).J) (j : (TopCat.GlueData.MkCore.mk (fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) (fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) (fun (i j : J) => { toFun := fun (x : ↑((TopologicalSpace.Opens.toTopCat ((fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) i)).obj ((fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) i j))) => ⟨⟨↑↑x, ⋯⟩, ⋯⟩, continuous_toFun := ⋯ }) ⋯ ⋯ ⋯ ⋯).J) :

(TopCat.GlueData.ofOpenSubsets U).f i j = ((TopologicalSpace.Opens.map (U i).inclusion').obj (U j)).inclusion'

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@[simp]

theorem TopCat.GlueData.ofOpenSubsets_toGlueData_t {α : Type u} [TopologicalSpace α] {J : Type u} (U : J → TopologicalSpace.Opens α) (i : (TopCat.GlueData.MkCore.mk (fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) (fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) (fun (i j : J) => { toFun := fun (x : ↑((TopologicalSpace.Opens.toTopCat ((fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) i)).obj ((fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) i j))) => ⟨⟨↑↑x, ⋯⟩, ⋯⟩, continuous_toFun := ⋯ }) ⋯ ⋯ ⋯ ⋯).J) (j : (TopCat.GlueData.MkCore.mk (fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) (fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) (fun (i j : J) => { toFun := fun (x : ↑((TopologicalSpace.Opens.toTopCat ((fun (i : J) => (TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i)) i)).obj ((fun (x j : J) => (TopologicalSpace.Opens.map (U x).inclusion').obj (U j)) i j))) => ⟨⟨↑↑x, ⋯⟩, ⋯⟩, continuous_toFun := ⋯ }) ⋯ ⋯ ⋯ ⋯).J) :

(TopCat.GlueData.ofOpenSubsets U).t i j = { toFun := fun (x : ↑((TopologicalSpace.Opens.toTopCat ((TopologicalSpace.Opens.toTopCat (TopCat.of α)).obj (U i))).obj ((TopologicalSpace.Opens.map (U i).inclusion').obj (U j)))) => ⟨⟨↑↑x, ⋯⟩, ⋯⟩, continuous_toFun := ⋯ }

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@[simp]

theorem TopCat.GlueData.ofOpenSubsets_toGlueData_J {α : Type u} [TopologicalSpace α] {J : Type u} (U : J → TopologicalSpace.Opens α) :

(TopCat.GlueData.ofOpenSubsets U).J = J

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def TopCat.GlueData.fromOpenSubsetsGlue {α : Type u} [TopologicalSpace α] {J : Type u} (U : J → TopologicalSpace.Opens α) :

(TopCat.GlueData.ofOpenSubsets U).glued ⟶ TopCat.of α

The canonical map from the glue of a family of open subsets α into α. This map is an open embedding (fromOpenSubsetsGlue_isOpenEmbedding), and its range is ⋃ i, (U i : Set α) (range_fromOpenSubsetsGlue).

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