Documentation

Mathlib.Algebra.DirectLimit

Direct limit of modules, abelian groups, rings, and fields. #

See Atiyah-Macdonald PP.32-33, Matsumura PP.269-270

Generalizes the notion of "union", or "gluing", of incomparable modules over the same ring, or incomparable abelian groups, or rings, or fields.

It is constructed as a quotient of the free module (for the module case) or quotient of the free commutative ring (for the ring case) instead of a quotient of the disjoint union so as to make the operations (addition etc.) "computable".

Main definitions #

class DirectedSystem {ι : Type v} [Preorder ι] (G : ιType w) (f : (i j : ι) → i jG iG j) :

A directed system is a functor from a category (directed poset) to another category.

  • map_self' : ∀ (i : ι) (x : G i) (h : i i), f i i h x = x
  • map_map' : ∀ {i j k : ι} (hij : i j) (hjk : j k) (x : G i), f j k hjk (f i j hij x) = f i k x
Instances
    theorem DirectedSystem.map_self {ι : Type v} [Preorder ι] {G : ιType w} (f : (i j : ι) → i jG iG j) [DirectedSystem G fun (i j : ι) (h : i j) => f i j h] (i : ι) (x : G i) (h : i i) :
    f i i h x = x
    theorem DirectedSystem.map_map {ι : Type v} [Preorder ι] {G : ιType w} (f : (i j : ι) → i jG iG j) [DirectedSystem G fun (i j : ι) (h : i j) => f i j h] {i : ι} {j : ι} {k : ι} (hij : i j) (hjk : j k) (x : G i) :
    f j k hjk (f i j hij x) = f i k x
    theorem Module.DirectedSystem.map_self {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) [DirectedSystem G fun (i j : ι) (h : i j) => (f i j h)] (i : ι) (x : G i) (h : i i) :
    (f i i h) x = x

    A copy of DirectedSystem.map_self specialized to linear maps, as otherwise the fun i j h ↦ f i j h can confuse the simplifier.

    theorem Module.DirectedSystem.map_map {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) [DirectedSystem G fun (i j : ι) (h : i j) => (f i j h)] {i : ι} {j : ι} {k : ι} (hij : i j) (hjk : j k) (x : G i) :
    (f j k hjk) ((f i j hij) x) = (f i k ) x

    A copy of DirectedSystem.map_map specialized to linear maps, as otherwise the fun i j h ↦ f i j h can confuse the simplifier.

    noncomputable def Module.DirectLimit {R : Type u} [Ring R] {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) [DecidableEq ι] :
    Type (max v w)

    The direct limit of a directed system is the modules glued together along the maps.

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    • One or more equations did not get rendered due to their size.
    Instances For
      noncomputable instance Module.DirectLimit.addCommGroup {R : Type u} [Ring R] {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) [DecidableEq ι] :
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      noncomputable instance Module.DirectLimit.module {R : Type u} [Ring R] {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) [DecidableEq ι] :
      Equations
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      noncomputable instance Module.DirectLimit.inhabited {R : Type u} [Ring R] {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) [DecidableEq ι] :
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      noncomputable instance Module.DirectLimit.unique {R : Type u} [Ring R] {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) [DecidableEq ι] [IsEmpty ι] :
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      noncomputable def Module.DirectLimit.of (R : Type u) [Ring R] (ι : Type v) [Preorder ι] (G : ιType w) [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) [DecidableEq ι] (i : ι) :

      The canonical map from a component to the direct limit.

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      • One or more equations did not get rendered due to their size.
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        @[simp]
        theorem Module.DirectLimit.of_f {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {i : ι} {j : ι} {hij : i j} {x : G i} :
        (Module.DirectLimit.of R ι G f j) ((f i j hij) x) = (Module.DirectLimit.of R ι G f i) x
        theorem Module.DirectLimit.exists_of {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] (z : Module.DirectLimit G f) :
        ∃ (i : ι) (x : G i), (Module.DirectLimit.of R ι G f i) x = z

        Every element of the direct limit corresponds to some element in some component of the directed system.

        theorem Module.DirectLimit.induction_on {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] {C : Module.DirectLimit G fProp} (z : Module.DirectLimit G f) (ih : ∀ (i : ι) (x : G i), C ((Module.DirectLimit.of R ι G f i) x)) :
        C z
        noncomputable def Module.DirectLimit.lift (R : Type u) [Ring R] (ι : Type v) [Preorder ι] (G : ιType w) [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) [DecidableEq ι] {P : Type u₁} [AddCommGroup P] [Module R P] (g : (i : ι) → G i →ₗ[R] P) (Hg : ∀ (i j : ι) (hij : i j) (x : G i), (g j) ((f i j hij) x) = (g i) x) :

        The universal property of the direct limit: maps from the components to another module that respect the directed system structure (i.e. make some diagram commute) give rise to a unique map out of the direct limit.

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          theorem Module.DirectLimit.lift_of {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {P : Type u₁} [AddCommGroup P] [Module R P] (g : (i : ι) → G i →ₗ[R] P) (Hg : ∀ (i j : ι) (hij : i j) (x : G i), (g j) ((f i j hij) x) = (g i) x) {i : ι} (x : G i) :
          (Module.DirectLimit.lift R ι G f g Hg) ((Module.DirectLimit.of R ι G f i) x) = (g i) x
          theorem Module.DirectLimit.lift_unique {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {P : Type u₁} [AddCommGroup P] [Module R P] [IsDirected ι fun (x x_1 : ι) => x x_1] (F : Module.DirectLimit G f →ₗ[R] P) (x : Module.DirectLimit G f) :
          F x = (Module.DirectLimit.lift R ι G f (fun (i : ι) => F ∘ₗ Module.DirectLimit.of R ι G f i) ) x
          theorem Module.DirectLimit.lift_injective {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {P : Type u₁} [AddCommGroup P] [Module R P] (g : (i : ι) → G i →ₗ[R] P) (Hg : ∀ (i j : ι) (hij : i j) (x : G i), (g j) ((f i j hij) x) = (g i) x) [IsDirected ι fun (x x_1 : ι) => x x_1] (injective : ∀ (i : ι), Function.Injective (g i)) :
          noncomputable def Module.DirectLimit.map {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] [(i : ι) → Module R (G' i)] {f' : (i j : ι) → i jG' i →ₗ[R] G' j} (g : (i : ι) → G i →ₗ[R] G' i) (hg : ∀ (i j : ι) (h : i j), g j ∘ₗ f i j h = f' i j h ∘ₗ g i) :

          Consider direct limits lim G and lim G' with direct system f and f' respectively, any family of linear maps gᵢ : Gᵢ ⟶ G'ᵢ such that g ∘ f = f' ∘ g induces a linear map lim G ⟶ lim G'.

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            @[simp]
            theorem Module.DirectLimit.map_apply_of {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] [(i : ι) → Module R (G' i)] {f' : (i j : ι) → i jG' i →ₗ[R] G' j} (g : (i : ι) → G i →ₗ[R] G' i) (hg : ∀ (i j : ι) (h : i j), g j ∘ₗ f i j h = f' i j h ∘ₗ g i) {i : ι} (x : G i) :
            (Module.DirectLimit.map g hg) ((Module.DirectLimit.of R ι G f i) x) = (Module.DirectLimit.of R ι G' f' i) ((g i) x)
            @[simp]
            theorem Module.DirectLimit.map_id {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] [IsDirected ι fun (x x_1 : ι) => x x_1] :
            Module.DirectLimit.map (fun (i : ι) => LinearMap.id) = LinearMap.id
            theorem Module.DirectLimit.map_comp {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] [(i : ι) → Module R (G' i)] {f' : (i j : ι) → i jG' i →ₗ[R] G' j} {G'' : ιType v''} [(i : ι) → AddCommGroup (G'' i)] [(i : ι) → Module R (G'' i)] {f'' : (i j : ι) → i jG'' i →ₗ[R] G'' j} [IsDirected ι fun (x x_1 : ι) => x x_1] (g₁ : (i : ι) → G i →ₗ[R] G' i) (g₂ : (i : ι) → G' i →ₗ[R] G'' i) (hg₁ : ∀ (i j : ι) (h : i j), g₁ j ∘ₗ f i j h = f' i j h ∘ₗ g₁ i) (hg₂ : ∀ (i j : ι) (h : i j), g₂ j ∘ₗ f' i j h = f'' i j h ∘ₗ g₂ i) :
            Module.DirectLimit.map g₂ hg₂ ∘ₗ Module.DirectLimit.map g₁ hg₁ = Module.DirectLimit.map (fun (i : ι) => g₂ i ∘ₗ g₁ i)
            noncomputable def Module.DirectLimit.congr {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] [(i : ι) → Module R (G' i)] {f' : (i j : ι) → i jG' i →ₗ[R] G' j} [IsDirected ι fun (x x_1 : ι) => x x_1] (e : (i : ι) → G i ≃ₗ[R] G' i) (he : ∀ (i j : ι) (h : i j), (e j) ∘ₗ f i j h = f' i j h ∘ₗ (e i)) :

            Consider direct limits lim G and lim G' with direct system f and f' respectively, any family of equivalences eᵢ : Gᵢ ≅ G'ᵢ such that e ∘ f = f' ∘ e induces an equivalence lim G ≅ lim G'.

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              theorem Module.DirectLimit.congr_apply_of {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] [(i : ι) → Module R (G' i)] {f' : (i j : ι) → i jG' i →ₗ[R] G' j} [IsDirected ι fun (x x_1 : ι) => x x_1] (e : (i : ι) → G i ≃ₗ[R] G' i) (he : ∀ (i j : ι) (h : i j), (e j) ∘ₗ f i j h = f' i j h ∘ₗ (e i)) {i : ι} (g : G i) :
              (Module.DirectLimit.congr e he) ((Module.DirectLimit.of R ι G f i) g) = (Module.DirectLimit.of R ι G' f' i) ((e i) g)
              theorem Module.DirectLimit.congr_symm_apply_of {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] [(i : ι) → Module R (G' i)] {f' : (i j : ι) → i jG' i →ₗ[R] G' j} [IsDirected ι fun (x x_1 : ι) => x x_1] (e : (i : ι) → G i ≃ₗ[R] G' i) (he : ∀ (i j : ι) (h : i j), (e j) ∘ₗ f i j h = f' i j h ∘ₗ (e i)) {i : ι} (g : G' i) :
              noncomputable def Module.DirectLimit.totalize {R : Type u} [Ring R] {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] (f : (i j : ι) → i jG i →ₗ[R] G j) (i : ι) (j : ι) :
              G i →ₗ[R] G j

              totalize G f i j is a linear map from G i to G j, for every i and j. If i ≤ j, then it is the map f i j that comes with the directed system G, and otherwise it is the zero map.

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                theorem Module.DirectLimit.totalize_of_le {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} {i : ι} {j : ι} (h : i j) :
                theorem Module.DirectLimit.totalize_of_not_le {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} {i : ι} {j : ι} (h : ¬i j) :
                theorem Module.DirectLimit.toModule_totalize_of_le {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] [DirectedSystem G fun (i j : ι) (h : i j) => (f i j h)] [(i : ι) → (k : G i) → Decidable (k 0)] {x : DirectSum ι G} {i : ι} {j : ι} (hij : i j) (hx : kDFinsupp.support x, k i) :
                (DirectSum.toModule R ι (G j) fun (k : ι) => Module.DirectLimit.totalize G f k j) x = (f i j hij) ((DirectSum.toModule R ι (G i) fun (k : ι) => Module.DirectLimit.totalize G f k i) x)
                theorem Module.DirectLimit.of.zero_exact_aux {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] [DirectedSystem G fun (i j : ι) (h : i j) => (f i j h)] [(i : ι) → (k : G i) → Decidable (k 0)] [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] {x : DirectSum ι G} (H : Submodule.Quotient.mk x = 0) :
                ∃ (j : ι), (kDFinsupp.support x, k j) (DirectSum.toModule R ι (G j) fun (i : ι) => Module.DirectLimit.totalize G f i j) x = 0
                theorem Module.DirectLimit.of.zero_exact {R : Type u} [Ring R] {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → AddCommGroup (G i)] [(i : ι) → Module R (G i)] {f : (i j : ι) → i jG i →ₗ[R] G j} [DecidableEq ι] [DirectedSystem G fun (i j : ι) (h : i j) => (f i j h)] [IsDirected ι fun (x x_1 : ι) => x x_1] {i : ι} {x : G i} (H : (Module.DirectLimit.of R ι G f i) x = 0) :
                ∃ (j : ι) (hij : i j), (f i j hij) x = 0

                A component that corresponds to zero in the direct limit is already zero in some bigger module in the directed system.

                noncomputable def AddCommGroup.DirectLimit {ι : Type v} [Preorder ι] (G : ιType w) [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] (f : (i j : ι) → i jG i →+ G j) :
                Type (max w v)

                The direct limit of a directed system is the abelian groups glued together along the maps.

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                  theorem AddCommGroup.DirectLimit.directedSystem {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → AddCommGroup (G i)] (f : (i j : ι) → i jG i →+ G j) [h : DirectedSystem G fun (i j : ι) (h : i j) => (f i j h)] :
                  DirectedSystem G fun (i j : ι) (hij : i j) => (AddMonoidHom.toIntLinearMap (f i j hij))
                  noncomputable instance AddCommGroup.DirectLimit.instAddCommGroupDirectLimit {ι : Type v} [Preorder ι] (G : ιType w) [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] (f : (i j : ι) → i jG i →+ G j) :
                  Equations
                  noncomputable instance AddCommGroup.DirectLimit.instInhabitedDirectLimit {ι : Type v} [Preorder ι] (G : ιType w) [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] (f : (i j : ι) → i jG i →+ G j) :
                  Equations
                  noncomputable instance AddCommGroup.DirectLimit.instUniqueDirectLimit {ι : Type v} [Preorder ι] (G : ιType w) [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] (f : (i j : ι) → i jG i →+ G j) [IsEmpty ι] :
                  Equations
                  noncomputable def AddCommGroup.DirectLimit.of {ι : Type v} [Preorder ι] (G : ιType w) [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] (f : (i j : ι) → i jG i →+ G j) (i : ι) :

                  The canonical map from a component to the direct limit.

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                    @[simp]
                    theorem AddCommGroup.DirectLimit.of_f {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} {i : ι} {j : ι} (hij : i j) (x : G i) :
                    theorem AddCommGroup.DirectLimit.induction_on {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] {C : AddCommGroup.DirectLimit G fProp} (z : AddCommGroup.DirectLimit G f) (ih : ∀ (i : ι) (x : G i), C ((AddCommGroup.DirectLimit.of G f i) x)) :
                    C z
                    theorem AddCommGroup.DirectLimit.of.zero_exact {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} [IsDirected ι fun (x x_1 : ι) => x x_1] [DirectedSystem G fun (i j : ι) (h : i j) => (f i j h)] (i : ι) (x : G i) (h : (AddCommGroup.DirectLimit.of G f i) x = 0) :
                    ∃ (j : ι) (hij : i j), (f i j hij) x = 0

                    A component that corresponds to zero in the direct limit is already zero in some bigger module in the directed system.

                    noncomputable def AddCommGroup.DirectLimit.lift {ι : Type v} [Preorder ι] (G : ιType w) [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] (f : (i j : ι) → i jG i →+ G j) (P : Type u₁) [AddCommGroup P] (g : (i : ι) → G i →+ P) (Hg : ∀ (i j : ι) (hij : i j) (x : G i), (g j) ((f i j hij) x) = (g i) x) :

                    The universal property of the direct limit: maps from the components to another abelian group that respect the directed system structure (i.e. make some diagram commute) give rise to a unique map out of the direct limit.

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                    • One or more equations did not get rendered due to their size.
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                      @[simp]
                      theorem AddCommGroup.DirectLimit.lift_of {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} (P : Type u₁) [AddCommGroup P] (g : (i : ι) → G i →+ P) (Hg : ∀ (i j : ι) (hij : i j) (x : G i), (g j) ((f i j hij) x) = (g i) x) (i : ι) (x : G i) :
                      theorem AddCommGroup.DirectLimit.lift_unique {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} (P : Type u₁) [AddCommGroup P] [IsDirected ι fun (x x_1 : ι) => x x_1] (F : AddCommGroup.DirectLimit G f →+ P) (x : AddCommGroup.DirectLimit G f) :
                      theorem AddCommGroup.DirectLimit.lift_injective {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} (P : Type u₁) [AddCommGroup P] (g : (i : ι) → G i →+ P) (Hg : ∀ (i j : ι) (hij : i j) (x : G i), (g j) ((f i j hij) x) = (g i) x) [IsDirected ι fun (x x_1 : ι) => x x_1] (injective : ∀ (i : ι), Function.Injective (g i)) :
                      noncomputable def AddCommGroup.DirectLimit.map {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] {f' : (i j : ι) → i jG' i →+ G' j} (g : (i : ι) → G i →+ G' i) (hg : ∀ (i j : ι) (h : i j), AddMonoidHom.comp (g j) (f i j h) = AddMonoidHom.comp (f' i j h) (g i)) :

                      Consider direct limits lim G and lim G' with direct system f and f' respectively, any family of group homomorphisms gᵢ : Gᵢ ⟶ G'ᵢ such that g ∘ f = f' ∘ g induces a group homomorphism lim G ⟶ lim G'.

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                        @[simp]
                        theorem AddCommGroup.DirectLimit.map_apply_of {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] {f' : (i j : ι) → i jG' i →+ G' j} (g : (i : ι) → G i →+ G' i) (hg : ∀ (i j : ι) (h : i j), AddMonoidHom.comp (g j) (f i j h) = AddMonoidHom.comp (f' i j h) (g i)) {i : ι} (x : G i) :
                        @[simp]
                        theorem AddCommGroup.DirectLimit.map_id {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} [IsDirected ι fun (x x_1 : ι) => x x_1] :
                        theorem AddCommGroup.DirectLimit.map_comp {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] {f' : (i j : ι) → i jG' i →+ G' j} {G'' : ιType v''} [(i : ι) → AddCommGroup (G'' i)] {f'' : (i j : ι) → i jG'' i →+ G'' j} [IsDirected ι fun (x x_1 : ι) => x x_1] (g₁ : (i : ι) → G i →+ G' i) (g₂ : (i : ι) → G' i →+ G'' i) (hg₁ : ∀ (i j : ι) (h : i j), AddMonoidHom.comp (g₁ j) (f i j h) = AddMonoidHom.comp (f' i j h) (g₁ i)) (hg₂ : ∀ (i j : ι) (h : i j), AddMonoidHom.comp (g₂ j) (f' i j h) = AddMonoidHom.comp (f'' i j h) (g₂ i)) :
                        noncomputable def AddCommGroup.DirectLimit.congr {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] {f' : (i j : ι) → i jG' i →+ G' j} [IsDirected ι fun (x x_1 : ι) => x x_1] (e : (i : ι) → G i ≃+ G' i) (he : ∀ (i j : ι) (h : i j), AddMonoidHom.comp (AddEquiv.toAddMonoidHom (e j)) (f i j h) = AddMonoidHom.comp (f' i j h) (e i)) :

                        Consider direct limits lim G and lim G' with direct system f and f' respectively, any family of equivalences eᵢ : Gᵢ ≅ G'ᵢ such that e ∘ f = f' ∘ e induces an equivalence lim G ⟶ lim G'.

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                          theorem AddCommGroup.DirectLimit.congr_apply_of {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] {f' : (i j : ι) → i jG' i →+ G' j} [IsDirected ι fun (x x_1 : ι) => x x_1] (e : (i : ι) → G i ≃+ G' i) (he : ∀ (i j : ι) (h : i j), AddMonoidHom.comp (AddEquiv.toAddMonoidHom (e j)) (f i j h) = AddMonoidHom.comp (f' i j h) (e i)) {i : ι} (g : G i) :
                          theorem AddCommGroup.DirectLimit.congr_symm_apply_of {ι : Type v} [Preorder ι] {G : ιType w} [DecidableEq ι] [(i : ι) → AddCommGroup (G i)] {f : (i j : ι) → i jG i →+ G j} {G' : ιType v'} [(i : ι) → AddCommGroup (G' i)] {f' : (i j : ι) → i jG' i →+ G' j} [IsDirected ι fun (x x_1 : ι) => x x_1] (e : (i : ι) → G i ≃+ G' i) (he : ∀ (i j : ι) (h : i j), AddMonoidHom.comp (AddEquiv.toAddMonoidHom (e j)) (f i j h) = AddMonoidHom.comp (f' i j h) (e i)) {i : ι} (g : G' i) :
                          noncomputable def Ring.DirectLimit {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → CommRing (G i)] (f : (i j : ι) → i jG iG j) :
                          Type (max v w)

                          The direct limit of a directed system is the rings glued together along the maps.

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                            noncomputable instance Ring.DirectLimit.commRing {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → CommRing (G i)] (f : (i j : ι) → i jG iG j) :
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                            noncomputable instance Ring.DirectLimit.ring {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → CommRing (G i)] (f : (i j : ι) → i jG iG j) :
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                            noncomputable instance Ring.DirectLimit.zero {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → CommRing (G i)] (f : (i j : ι) → i jG iG j) :
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                            noncomputable instance Ring.DirectLimit.instInhabitedDirectLimit {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → CommRing (G i)] (f : (i j : ι) → i jG iG j) :
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                            noncomputable def Ring.DirectLimit.of {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → CommRing (G i)] (f : (i j : ι) → i jG iG j) (i : ι) :

                            The canonical map from a component to the direct limit.

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                              theorem Ring.DirectLimit.of_f {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG iG j} {i : ι} {j : ι} (hij : i j) (x : G i) :
                              (Ring.DirectLimit.of G f j) (f i j hij x) = (Ring.DirectLimit.of G f i) x
                              theorem Ring.DirectLimit.exists_of {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG iG j} [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] (z : Ring.DirectLimit G f) :
                              ∃ (i : ι) (x : G i), (Ring.DirectLimit.of G f i) x = z

                              Every element of the direct limit corresponds to some element in some component of the directed system.

                              theorem Ring.DirectLimit.Polynomial.exists_of {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f' : (i j : ι) → i jG i →+* G j} [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] (q : Polynomial (Ring.DirectLimit G fun (i j : ι) (h : i j) => (f' i j h))) :
                              ∃ (i : ι) (p : Polynomial (G i)), Polynomial.map (Ring.DirectLimit.of G (fun (i j : ι) (h : i j) => (f' i j h)) i) p = q
                              theorem Ring.DirectLimit.induction_on {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG iG j} [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] {C : Ring.DirectLimit G fProp} (z : Ring.DirectLimit G f) (ih : ∀ (i : ι) (x : G i), C ((Ring.DirectLimit.of G f i) x)) :
                              C z
                              theorem Ring.DirectLimit.of.zero_exact_aux2 {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → CommRing (G i)] (f' : (i j : ι) → i jG i →+* G j) [DirectedSystem G fun (i j : ι) (h : i j) => (f' i j h)] {x : FreeCommRing ((i : ι) × G i)} {s : Set ((i : ι) × G i)} {t : Set ((i : ι) × G i)} [DecidablePred fun (x : (i : ι) × G i) => x s] [DecidablePred fun (x : (i : ι) × G i) => x t] (hxs : FreeCommRing.IsSupported x s) {j : ι} {k : ι} (hj : zs, z.fst j) (hk : zt, z.fst k) (hjk : j k) (hst : s t) :
                              (f' j k hjk) ((FreeCommRing.lift fun (ix : s) => (f' (ix).fst j ) (ix).snd) ((FreeCommRing.restriction s) x)) = (FreeCommRing.lift fun (ix : t) => (f' (ix).fst k ) (ix).snd) ((FreeCommRing.restriction t) x)
                              theorem Ring.DirectLimit.of.zero_exact_aux {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f' : (i j : ι) → i jG i →+* G j} [DirectedSystem G fun (i j : ι) (h : i j) => (f' i j h)] [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] {x : FreeCommRing ((i : ι) × G i)} (H : (Ideal.Quotient.mk (Ideal.span {a : FreeCommRing ((i : ι) × G i) | (∃ (i : ι) (j : ι) (H : i j) (x : G i), FreeCommRing.of { fst := j, snd := (fun (i j : ι) (h : i j) => (f' i j h)) i j H x } - FreeCommRing.of { fst := i, snd := x } = a) (∃ (i : ι), FreeCommRing.of { fst := i, snd := 1 } - 1 = a) (∃ (i : ι) (x : G i) (y : G i), FreeCommRing.of { fst := i, snd := x + y } - (FreeCommRing.of { fst := i, snd := x } + FreeCommRing.of { fst := i, snd := y }) = a) ∃ (i : ι) (x : G i) (y : G i), FreeCommRing.of { fst := i, snd := x * y } - FreeCommRing.of { fst := i, snd := x } * FreeCommRing.of { fst := i, snd := y } = a})) x = 0) :
                              ∃ (j : ι) (s : Set ((i : ι) × G i)) (H : ks, k.fst j), FreeCommRing.IsSupported x s ∀ [inst : DecidablePred fun (x : (i : ι) × G i) => x s], (FreeCommRing.lift fun (ix : s) => (f' (ix).fst j ) (ix).snd) ((FreeCommRing.restriction s) x) = 0
                              theorem Ring.DirectLimit.of.zero_exact {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f' : (i j : ι) → i jG i →+* G j} [DirectedSystem G fun (i j : ι) (h : i j) => (f' i j h)] [IsDirected ι fun (x x_1 : ι) => x x_1] {i : ι} {x : G i} (hix : (Ring.DirectLimit.of G (fun (i j : ι) (h : i j) => (f' i j h)) i) x = 0) :
                              ∃ (j : ι) (hij : i j), (f' i j hij) x = 0

                              A component that corresponds to zero in the direct limit is already zero in some bigger module in the directed system.

                              theorem Ring.DirectLimit.of_injective {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] (f' : (i j : ι) → i jG i →+* G j) [IsDirected ι fun (x x_1 : ι) => x x_1] [DirectedSystem G fun (i j : ι) (h : i j) => (f' i j h)] (hf : ∀ (i j : ι) (hij : i j), Function.Injective (f' i j hij)) (i : ι) :
                              Function.Injective (Ring.DirectLimit.of G (fun (i j : ι) (h : i j) => (f' i j h)) i)

                              If the maps in the directed system are injective, then the canonical maps from the components to the direct limits are injective.

                              noncomputable def Ring.DirectLimit.lift {ι : Type v} [Preorder ι] (G : ιType w) [(i : ι) → CommRing (G i)] (f : (i j : ι) → i jG iG j) (P : Type u₁) [CommRing P] (g : (i : ι) → G i →+* P) (Hg : ∀ (i j : ι) (hij : i j) (x : G i), (g j) (f i j hij x) = (g i) x) :

                              The universal property of the direct limit: maps from the components to another ring that respect the directed system structure (i.e. make some diagram commute) give rise to a unique map out of the direct limit.

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                                theorem Ring.DirectLimit.lift_of {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG iG j} (P : Type u₁) [CommRing P] (g : (i : ι) → G i →+* P) (Hg : ∀ (i j : ι) (hij : i j) (x : G i), (g j) (f i j hij x) = (g i) x) (i : ι) (x : G i) :
                                (Ring.DirectLimit.lift G f P g Hg) ((Ring.DirectLimit.of G f i) x) = (g i) x
                                theorem Ring.DirectLimit.lift_unique {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG iG j} (P : Type u₁) [CommRing P] [IsDirected ι fun (x x_1 : ι) => x x_1] (F : Ring.DirectLimit G f →+* P) (x : Ring.DirectLimit G f) :
                                F x = (Ring.DirectLimit.lift G f P (fun (i : ι) => RingHom.comp F (Ring.DirectLimit.of G f i)) ) x
                                theorem Ring.DirectLimit.lift_injective {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG iG j} (P : Type u₁) [CommRing P] (g : (i : ι) → G i →+* P) (Hg : ∀ (i j : ι) (hij : i j) (x : G i), (g j) (f i j hij x) = (g i) x) [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] (injective : ∀ (i : ι), Function.Injective (g i)) :
                                noncomputable def Ring.DirectLimit.map {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG i →+* G j} {G' : ιType v'} [(i : ι) → CommRing (G' i)] {f' : (i j : ι) → i jG' i →+* G' j} (g : (i : ι) → G i →+* G' i) (hg : ∀ (i j : ι) (h : i j), RingHom.comp (g j) (f i j h) = RingHom.comp (f' i j h) (g i)) :
                                (Ring.DirectLimit G fun (x x_1 : ι) (h : x x_1) => (f x x_1 h)) →+* Ring.DirectLimit G' fun (x x_1 : ι) (h : x x_1) => (f' x x_1 h)

                                Consider direct limits lim G and lim G' with direct system f and f' respectively, any family of ring homomorphisms gᵢ : Gᵢ ⟶ G'ᵢ such that g ∘ f = f' ∘ g induces a ring homomorphism lim G ⟶ lim G'.

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                                  @[simp]
                                  theorem Ring.DirectLimit.map_apply_of {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG i →+* G j} {G' : ιType v'} [(i : ι) → CommRing (G' i)] {f' : (i j : ι) → i jG' i →+* G' j} (g : (i : ι) → G i →+* G' i) (hg : ∀ (i j : ι) (h : i j), RingHom.comp (g j) (f i j h) = RingHom.comp (f' i j h) (g i)) {i : ι} (x : G i) :
                                  (Ring.DirectLimit.map g hg) ((Ring.DirectLimit.of G (fun (x x_1 : ι) (h : x x_1) => (f x x_1 h)) i) x) = (Ring.DirectLimit.of G' (fun (x x_1 : ι) (h : x x_1) => (f' x x_1 h)) i) ((g i) x)
                                  @[simp]
                                  theorem Ring.DirectLimit.map_id {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG i →+* G j} [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] :
                                  Ring.DirectLimit.map (fun (i : ι) => RingHom.id (G i)) = RingHom.id (Ring.DirectLimit G fun (x x_1 : ι) (h : x x_1) => (f x x_1 h))
                                  theorem Ring.DirectLimit.map_comp {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG i →+* G j} {G' : ιType v'} [(i : ι) → CommRing (G' i)] {f' : (i j : ι) → i jG' i →+* G' j} {G'' : ιType v''} [(i : ι) → CommRing (G'' i)] {f'' : (i j : ι) → i jG'' i →+* G'' j} [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] (g₁ : (i : ι) → G i →+* G' i) (g₂ : (i : ι) → G' i →+* G'' i) (hg₁ : ∀ (i j : ι) (h : i j), RingHom.comp (g₁ j) (f i j h) = RingHom.comp (f' i j h) (g₁ i)) (hg₂ : ∀ (i j : ι) (h : i j), RingHom.comp (g₂ j) (f' i j h) = RingHom.comp (f'' i j h) (g₂ i)) :
                                  RingHom.comp (Ring.DirectLimit.map g₂ hg₂) (Ring.DirectLimit.map g₁ hg₁) = Ring.DirectLimit.map (fun (i : ι) => RingHom.comp (g₂ i) (g₁ i))
                                  noncomputable def Ring.DirectLimit.congr {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG i →+* G j} {G' : ιType v'} [(i : ι) → CommRing (G' i)] {f' : (i j : ι) → i jG' i →+* G' j} [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] (e : (i : ι) → G i ≃+* G' i) (he : ∀ (i j : ι) (h : i j), RingHom.comp (RingEquiv.toRingHom (e j)) (f i j h) = RingHom.comp (f' i j h) (e i)) :
                                  (Ring.DirectLimit G fun (x x_1 : ι) (h : x x_1) => (f x x_1 h)) ≃+* Ring.DirectLimit G' fun (x x_1 : ι) (h : x x_1) => (f' x x_1 h)

                                  Consider direct limits lim G and lim G' with direct system f and f' respectively, any family of equivalences eᵢ : Gᵢ ≅ G'ᵢ such that e ∘ f = f' ∘ e induces an equivalence lim G ⟶ lim G'.

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                                    theorem Ring.DirectLimit.congr_apply_of {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG i →+* G j} {G' : ιType v'} [(i : ι) → CommRing (G' i)] {f' : (i j : ι) → i jG' i →+* G' j} [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] (e : (i : ι) → G i ≃+* G' i) (he : ∀ (i j : ι) (h : i j), RingHom.comp (RingEquiv.toRingHom (e j)) (f i j h) = RingHom.comp (f' i j h) (e i)) {i : ι} (g : G i) :
                                    (Ring.DirectLimit.congr e he) ((Ring.DirectLimit.of G (fun (x x_1 : ι) (h : x x_1) => (f x x_1 h)) i) g) = (Ring.DirectLimit.of G' (fun (x x_1 : ι) (h : x x_1) => (f' x x_1 h)) i) ((e i) g)
                                    theorem Ring.DirectLimit.congr_symm_apply_of {ι : Type v} [Preorder ι] {G : ιType w} [(i : ι) → CommRing (G i)] {f : (i j : ι) → i jG i →+* G j} {G' : ιType v'} [(i : ι) → CommRing (G' i)] {f' : (i j : ι) → i jG' i →+* G' j} [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] (e : (i : ι) → G i ≃+* G' i) (he : ∀ (i j : ι) (h : i j), RingHom.comp (RingEquiv.toRingHom (e j)) (f i j h) = RingHom.comp (f' i j h) (e i)) {i : ι} (g : G' i) :
                                    (RingEquiv.symm (Ring.DirectLimit.congr e he)) ((Ring.DirectLimit.of G' (fun (x x_1 : ι) (h : x x_1) => (f' x x_1 h)) i) g) = (Ring.DirectLimit.of G (fun (x x_1 : ι) (h : x x_1) => (f x x_1 h)) i) ((RingEquiv.symm (e i)) g)
                                    noncomputable instance Field.DirectLimit.nontrivial {ι : Type v} [Preorder ι] (G : ιType w) [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] [(i : ι) → Field (G i)] (f' : (i j : ι) → i jG i →+* G j) [DirectedSystem G fun (i j : ι) (h : i j) => (f' i j h)] :
                                    Nontrivial (Ring.DirectLimit G fun (i j : ι) (h : i j) => (f' i j h))
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                                    theorem Field.DirectLimit.exists_inv {ι : Type v} [Preorder ι] (G : ιType w) [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] [(i : ι) → Field (G i)] (f : (i j : ι) → i jG iG j) {p : Ring.DirectLimit G f} :
                                    p 0∃ (y : Ring.DirectLimit G f), p * y = 1
                                    noncomputable def Field.DirectLimit.inv {ι : Type v} [Preorder ι] (G : ιType w) [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] [(i : ι) → Field (G i)] (f : (i j : ι) → i jG iG j) (p : Ring.DirectLimit G f) :

                                    Noncomputable multiplicative inverse in a direct limit of fields.

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                                      theorem Field.DirectLimit.mul_inv_cancel {ι : Type v} [Preorder ι] (G : ιType w) [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] [(i : ι) → Field (G i)] (f : (i j : ι) → i jG iG j) {p : Ring.DirectLimit G f} (hp : p 0) :
                                      theorem Field.DirectLimit.inv_mul_cancel {ι : Type v} [Preorder ι] (G : ιType w) [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] [(i : ι) → Field (G i)] (f : (i j : ι) → i jG iG j) {p : Ring.DirectLimit G f} (hp : p 0) :
                                      @[reducible]
                                      noncomputable def Field.DirectLimit.field {ι : Type v} [Preorder ι] (G : ιType w) [Nonempty ι] [IsDirected ι fun (x x_1 : ι) => x x_1] [(i : ι) → Field (G i)] (f' : (i j : ι) → i jG i →+* G j) [DirectedSystem G fun (i j : ι) (h : i j) => (f' i j h)] :
                                      Field (Ring.DirectLimit G fun (i j : ι) (h : i j) => (f' i j h))

                                      Noncomputable field structure on the direct limit of fields. See note [reducible non-instances].

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