Category instances for Group, AddGroup, CommGroup, and AddCommGroup. #

AddCommGroupCat.instCoeFunHomAddCommGroupCatToQuiverToCategoryStructInstAddCommGroupCatLargeCategoryForAllαAddCommGroup = { coe := fun (f : ↑X →+ ↑Y) => ⇑f }

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instance CommGroupCat.instCoeFunHomCommGroupCatToQuiverToCategoryStructInstCommGroupCatLargeCategoryForAllαCommGroup {X : CommGroupCat} {Y : CommGroupCat} :

CoeFun (X ⟶ Y) fun (x : X ⟶ Y) => ↑X → ↑Y

Equations

CommGroupCat.instCoeFunHomCommGroupCatToQuiverToCategoryStructInstCommGroupCatLargeCategoryForAllαCommGroup = { coe := fun (f : ↑X →* ↑Y) => ⇑f }

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instance AddCommGroupCat.instFunLike (X : AddCommGroupCat) (Y : AddCommGroupCat) :

FunLike (X ⟶ Y) ↑X ↑Y

Equations

AddCommGroupCat.instFunLike X Y = let_fun this := inferInstance; this

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instance CommGroupCat.instFunLike (X : CommGroupCat) (Y : CommGroupCat) :

FunLike (X ⟶ Y) ↑X ↑Y

Equations

CommGroupCat.instFunLike X Y = let_fun this := inferInstance; this

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@[simp]

theorem AddCommGroupCat.coe_id {X : AddCommGroupCat} :

⇑(CategoryTheory.CategoryStruct.id X) = id

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@[simp]

theorem CommGroupCat.coe_id {X : CommGroupCat} :

⇑(CategoryTheory.CategoryStruct.id X) = id

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@[simp]

theorem AddCommGroupCat.coe_comp {X : AddCommGroupCat} {Y : AddCommGroupCat} {Z : AddCommGroupCat} {f : X ⟶ Y} {g : Y ⟶ Z} :

⇑(CategoryTheory.CategoryStruct.comp f g) = ⇑g ∘ ⇑f

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@[simp]

theorem CommGroupCat.coe_comp {X : CommGroupCat} {Y : CommGroupCat} {Z : CommGroupCat} {f : X ⟶ Y} {g : Y ⟶ Z} :

⇑(CategoryTheory.CategoryStruct.comp f g) = ⇑g ∘ ⇑f

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theorem AddCommGroupCat.comp_def {X : AddCommGroupCat} {Y : AddCommGroupCat} {Z : AddCommGroupCat} {f : X ⟶ Y} {g : Y ⟶ Z} :

CategoryTheory.CategoryStruct.comp f g = AddMonoidHom.comp g f

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theorem CommGroupCat.comp_def {X : CommGroupCat} {Y : CommGroupCat} {Z : CommGroupCat} {f : X ⟶ Y} {g : Y ⟶ Z} :

CategoryTheory.CategoryStruct.comp f g = MonoidHom.comp g f

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@[simp]

theorem AddCommGroupCat.forget_map {X : AddCommGroupCat} {Y : AddCommGroupCat} (f : X ⟶ Y) :

(CategoryTheory.forget AddCommGroupCat).map f = ⇑f

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@[simp]

theorem CommGroupCat.forget_map {X : CommGroupCat} {Y : CommGroupCat} (f : X ⟶ Y) :

(CategoryTheory.forget CommGroupCat).map f = ⇑f

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theorem AddCommGroupCat.ext {X : AddCommGroupCat} {Y : AddCommGroupCat} {f : X ⟶ Y} {g : X ⟶ Y} (w : ∀ (x : ↑X), f x = g x) :

f = g

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theorem CommGroupCat.ext {X : CommGroupCat} {Y : CommGroupCat} {f : X ⟶ Y} {g : X ⟶ Y} (w : ∀ (x : ↑X), f x = g x) :

f = g

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def AddCommGroupCat.of (G : Type u) [AddCommGroup G] :

AddCommGroupCat

Construct a bundled AddCommGroup from the underlying type and typeclass.

Equations

AddCommGroupCat.of G = CategoryTheory.Bundled.of G

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def CommGroupCat.of (G : Type u) [CommGroup G] :

CommGroupCat

Construct a bundled CommGroup from the underlying type and typeclass.

Equations

CommGroupCat.of G = CategoryTheory.Bundled.of G

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instance AddCommGroupCat.instInhabitedAddCommGroupCat :

Inhabited AddCommGroupCat

Equations

AddCommGroupCat.instInhabitedAddCommGroupCat = { default := AddCommGroupCat.of PUnit.{u_1 + 1} }

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instance CommGroupCat.instInhabitedCommGroupCat :

Inhabited CommGroupCat

Equations

CommGroupCat.instInhabitedCommGroupCat = { default := CommGroupCat.of PUnit.{u_1 + 1} }

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theorem AddCommGroupCat.coe_of (R : Type u) [AddCommGroup R] :

↑(AddCommGroupCat.of R) = R

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theorem CommGroupCat.coe_of (R : Type u) [CommGroup R] :

↑(CommGroupCat.of R) = R

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instance AddCommGroupCat.ofUnique (G : Type u_1) [AddCommGroup G] [i : Unique G] :

Unique ↑(AddCommGroupCat.of G)

Equations

AddCommGroupCat.ofUnique G = i

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instance CommGroupCat.ofUnique (G : Type u_1) [CommGroup G] [i : Unique G] :

Unique ↑(CommGroupCat.of G)

Equations

CommGroupCat.ofUnique G = i

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instance AddCommGroupCat.hasForgetToAddGroup :

CategoryTheory.HasForget₂ AddCommGroupCat AddGroupCat

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

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instance CommGroupCat.hasForgetToGroup :

CategoryTheory.HasForget₂ CommGroupCat GroupCat

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

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instance AddCommGroupCat.instCoeAddCommGroupCatAddGroupCat :

Coe AddCommGroupCat AddGroupCat

Equations

AddCommGroupCat.instCoeAddCommGroupCatAddGroupCat = { coe := (CategoryTheory.forget₂ AddCommGroupCat AddGroupCat).obj }

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instance CommGroupCat.instCoeCommGroupCatGroupCat :

Coe CommGroupCat GroupCat

Equations

CommGroupCat.instCoeCommGroupCatGroupCat = { coe := (CategoryTheory.forget₂ CommGroupCat GroupCat).obj }

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instance AddCommGroupCat.hasForgetToAddCommMonCat :

CategoryTheory.HasForget₂ AddCommGroupCat AddCommMonCat

Equations

AddCommGroupCat.hasForgetToAddCommMonCat = CategoryTheory.InducedCategory.hasForget₂ fun (G : AddCommGroupCat) => AddCommMonCat.of ↑G

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instance CommGroupCat.hasForgetToCommMonCat :

CategoryTheory.HasForget₂ CommGroupCat CommMonCat

Equations

CommGroupCat.hasForgetToCommMonCat = CategoryTheory.InducedCategory.hasForget₂ fun (G : CommGroupCat) => CommMonCat.of ↑G

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instance AddCommGroupCat.instCoeAddCommGroupCatCommMonCat :

Coe AddCommGroupCat AddCommMonCat

Equations

AddCommGroupCat.instCoeAddCommGroupCatCommMonCat = { coe := (CategoryTheory.forget₂ AddCommGroupCat AddCommMonCat).obj }

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instance CommGroupCat.instCoeCommGroupCatCommMonCat :

Coe CommGroupCat CommMonCat

Equations

CommGroupCat.instCoeCommGroupCatCommMonCat = { coe := (CategoryTheory.forget₂ CommGroupCat CommMonCat).obj }

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instance AddCommGroupCat.instZeroHomAddCommGroupCatToQuiverToCategoryStructInstAddCommGroupCatLargeCategory (G : AddCommGroupCat) (H : AddCommGroupCat) :

Zero (G ⟶ H)

Equations

AddCommGroupCat.instZeroHomAddCommGroupCatToQuiverToCategoryStructInstAddCommGroupCatLargeCategory G H = inferInstance

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instance CommGroupCat.instOneHomCommGroupCatToQuiverToCategoryStructInstCommGroupCatLargeCategory (G : CommGroupCat) (H : CommGroupCat) :

One (G ⟶ H)

Equations

CommGroupCat.instOneHomCommGroupCatToQuiverToCategoryStructInstCommGroupCatLargeCategory G H = inferInstance

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@[simp]

theorem AddCommGroupCat.zero_apply (G : AddCommGroupCat) (H : AddCommGroupCat) (g : ↑G) :

0 g = 0

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@[simp]

theorem CommGroupCat.one_apply (G : CommGroupCat) (H : CommGroupCat) (g : ↑G) :

1 g = 1

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def AddCommGroupCat.ofHom {X : Type u} {Y : Type u} [AddCommGroup X] [AddCommGroup Y] (f : X →+ Y) :

AddCommGroupCat.of X ⟶ AddCommGroupCat.of Y

Typecheck an AddMonoidHom as a morphism in AddCommGroup.

Equations

AddCommGroupCat.ofHom f = f

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def CommGroupCat.ofHom {X : Type u} {Y : Type u} [CommGroup X] [CommGroup Y] (f : X →* Y) :

CommGroupCat.of X ⟶ CommGroupCat.of Y

Typecheck a MonoidHom as a morphism in CommGroup.

Equations

CommGroupCat.ofHom f = f

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@[simp]

theorem AddCommGroupCat.ofHom_apply {X : Type u_1} {Y : Type u_1} [AddCommGroup X] [AddCommGroup Y] (f : X →+ Y) (x : X) :

(AddCommGroupCat.ofHom f) x = f x

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@[simp]

theorem CommGroupCat.ofHom_apply {X : Type u_1} {Y : Type u_1} [CommGroup X] [CommGroup Y] (f : X →* Y) (x : X) :

(CommGroupCat.ofHom f) x = f x

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def AddCommGroupCat.asHom {G : AddCommGroupCat} (g : ↑G) :

AddCommGroupCat.of ℤ ⟶ G

Any element of an abelian group gives a unique morphism from ℤ sending 1 to that element.

Equations

AddCommGroupCat.asHom g = (zmultiplesHom ↑G) g

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@[simp]

theorem AddCommGroupCat.asHom_apply {G : AddCommGroupCat} (g : ↑G) (i : ℤ) :

(AddCommGroupCat.asHom g) i = i • g

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theorem AddCommGroupCat.asHom_injective {G : AddCommGroupCat} :

Function.Injective AddCommGroupCat.asHom

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theorem AddCommGroupCat.int_hom_ext {G : AddCommGroupCat} (f : AddCommGroupCat.of ℤ ⟶ G) (g : AddCommGroupCat.of ℤ ⟶ G) (w : f 1 = g 1) :

f = g

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theorem AddCommGroupCat.injective_of_mono {G : AddCommGroupCat} {H : AddCommGroupCat} (f : G ⟶ H) [CategoryTheory.Mono f] :

Function.Injective ⇑f

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theorem AddEquiv.toAddGroupCatIso.proof_1 {X : AddGroupCat} {Y : AddGroupCat} (e : ↑X ≃+ ↑Y) :

CategoryTheory.CategoryStruct.comp (AddEquiv.toAddMonoidHom e) (AddEquiv.toAddMonoidHom (AddEquiv.symm e)) = CategoryTheory.CategoryStruct.id X

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def AddEquiv.toAddGroupCatIso {X : AddGroupCat} {Y : AddGroupCat} (e : ↑X ≃+ ↑Y) :

X ≅ Y

Build an isomorphism in the category AddGroup from an AddEquiv between AddGroups.

Equations

AddEquiv.toAddGroupCatIso e = { hom := AddEquiv.toAddMonoidHom e, inv := AddEquiv.toAddMonoidHom (AddEquiv.symm e), hom_inv_id := ⋯, inv_hom_id := ⋯ }

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theorem AddEquiv.toAddGroupCatIso.proof_2 {X : AddGroupCat} {Y : AddGroupCat} (e : ↑X ≃+ ↑Y) :

CategoryTheory.CategoryStruct.comp (AddEquiv.toAddMonoidHom (AddEquiv.symm e)) (AddEquiv.toAddMonoidHom e) = CategoryTheory.CategoryStruct.id Y

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@[simp]

theorem AddEquiv.toAddGroupCatIso_inv {X : AddGroupCat} {Y : AddGroupCat} (e : ↑X ≃+ ↑Y) :

(AddEquiv.toAddGroupCatIso e).inv = AddEquiv.toAddMonoidHom (AddEquiv.symm e)

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@[simp]

theorem AddEquiv.toAddGroupCatIso_hom {X : AddGroupCat} {Y : AddGroupCat} (e : ↑X ≃+ ↑Y) :

(AddEquiv.toAddGroupCatIso e).hom = AddEquiv.toAddMonoidHom e

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@[simp]

theorem MulEquiv.toGroupCatIso_hom {X : GroupCat} {Y : GroupCat} (e : ↑X ≃* ↑Y) :

(MulEquiv.toGroupCatIso e).hom = MulEquiv.toMonoidHom e

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@[simp]

theorem MulEquiv.toGroupCatIso_inv {X : GroupCat} {Y : GroupCat} (e : ↑X ≃* ↑Y) :

(MulEquiv.toGroupCatIso e).inv = MulEquiv.toMonoidHom (MulEquiv.symm e)

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def MulEquiv.toGroupCatIso {X : GroupCat} {Y : GroupCat} (e : ↑X ≃* ↑Y) :

X ≅ Y

Build an isomorphism in the category GroupCat from a MulEquiv between Groups.

Equations

MulEquiv.toGroupCatIso e = { hom := MulEquiv.toMonoidHom e, inv := MulEquiv.toMonoidHom (MulEquiv.symm e), hom_inv_id := ⋯, inv_hom_id := ⋯ }

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theorem AddEquiv.toAddCommGroupCatIso.proof_1 {X : AddCommGroupCat} {Y : AddCommGroupCat} (e : ↑X ≃+ ↑Y) :

CategoryTheory.CategoryStruct.comp (AddEquiv.toAddMonoidHom e) (AddEquiv.toAddMonoidHom (AddEquiv.symm e)) = CategoryTheory.CategoryStruct.id X

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theorem AddEquiv.toAddCommGroupCatIso.proof_2 {X : AddCommGroupCat} {Y : AddCommGroupCat} (e : ↑X ≃+ ↑Y) :

CategoryTheory.CategoryStruct.comp (AddEquiv.toAddMonoidHom (AddEquiv.symm e)) (AddEquiv.toAddMonoidHom e) = CategoryTheory.CategoryStruct.id Y

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def AddEquiv.toAddCommGroupCatIso {X : AddCommGroupCat} {Y : AddCommGroupCat} (e : ↑X ≃+ ↑Y) :

X ≅ Y

Build an isomorphism in the category AddCommGroupCat from an AddEquiv between AddCommGroups.

Equations

AddEquiv.toAddCommGroupCatIso e = { hom := AddEquiv.toAddMonoidHom e, inv := AddEquiv.toAddMonoidHom (AddEquiv.symm e), hom_inv_id := ⋯, inv_hom_id := ⋯ }

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@[simp]

theorem MulEquiv.toCommGroupCatIso_inv {X : CommGroupCat} {Y : CommGroupCat} (e : ↑X ≃* ↑Y) :

(MulEquiv.toCommGroupCatIso e).inv = MulEquiv.toMonoidHom (MulEquiv.symm e)

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@[simp]

theorem AddEquiv.toAddCommGroupCatIso_hom {X : AddCommGroupCat} {Y : AddCommGroupCat} (e : ↑X ≃+ ↑Y) :

(AddEquiv.toAddCommGroupCatIso e).hom = AddEquiv.toAddMonoidHom e

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@[simp]

theorem MulEquiv.toCommGroupCatIso_hom {X : CommGroupCat} {Y : CommGroupCat} (e : ↑X ≃* ↑Y) :

(MulEquiv.toCommGroupCatIso e).hom = MulEquiv.toMonoidHom e

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@[simp]

theorem AddEquiv.toAddCommGroupCatIso_inv {X : AddCommGroupCat} {Y : AddCommGroupCat} (e : ↑X ≃+ ↑Y) :

(AddEquiv.toAddCommGroupCatIso e).inv = AddEquiv.toAddMonoidHom (AddEquiv.symm e)

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def MulEquiv.toCommGroupCatIso {X : CommGroupCat} {Y : CommGroupCat} (e : ↑X ≃* ↑Y) :

X ≅ Y

Build an isomorphism in the category CommGroupCat from a MulEquiv between CommGroups.

Equations

MulEquiv.toCommGroupCatIso e = { hom := MulEquiv.toMonoidHom e, inv := MulEquiv.toMonoidHom (MulEquiv.symm e), hom_inv_id := ⋯, inv_hom_id := ⋯ }

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def CategoryTheory.Iso.addGroupIsoToAddEquiv {X : AddGroupCat} {Y : AddGroupCat} (i : X ≅ Y) :

↑X ≃+ ↑Y

Build an addEquiv from an isomorphism in the category AddGroup

Equations

CategoryTheory.Iso.addGroupIsoToAddEquiv i = AddMonoidHom.toAddEquiv i.hom i.inv ⋯ ⋯

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def CategoryTheory.Iso.groupIsoToMulEquiv {X : GroupCat} {Y : GroupCat} (i : X ≅ Y) :

↑X ≃* ↑Y

Build a MulEquiv from an isomorphism in the category GroupCat.

Equations

CategoryTheory.Iso.groupIsoToMulEquiv i = MonoidHom.toMulEquiv i.hom i.inv ⋯ ⋯

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def CategoryTheory.Iso.addCommGroupIsoToAddEquiv {X : AddCommGroupCat} {Y : AddCommGroupCat} (i : X ≅ Y) :

↑X ≃+ ↑Y

Build an AddEquiv from an isomorphism in the category AddCommGroup.

Equations

CategoryTheory.Iso.addCommGroupIsoToAddEquiv i = AddMonoidHom.toAddEquiv i.hom i.inv ⋯ ⋯

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@[simp]

theorem CategoryTheory.Iso.addCommGroupIsoToAddEquiv_symm_apply {X : AddCommGroupCat} {Y : AddCommGroupCat} (i : X ≅ Y) (a : ↑Y) :

(AddEquiv.symm (CategoryTheory.Iso.addCommGroupIsoToAddEquiv i)) a = i.inv a

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@[simp]

theorem CategoryTheory.Iso.commGroupIsoToMulEquiv_symm_apply {X : CommGroupCat} {Y : CommGroupCat} (i : X ≅ Y) (a : ↑Y) :

(MulEquiv.symm (CategoryTheory.Iso.commGroupIsoToMulEquiv i)) a = i.inv a

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@[simp]

theorem CategoryTheory.Iso.commGroupIsoToMulEquiv_apply {X : CommGroupCat} {Y : CommGroupCat} (i : X ≅ Y) (a : ↑X) :

(CategoryTheory.Iso.commGroupIsoToMulEquiv i) a = i.hom a

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@[simp]

theorem CategoryTheory.Iso.addCommGroupIsoToAddEquiv_apply {X : AddCommGroupCat} {Y : AddCommGroupCat} (i : X ≅ Y) (a : ↑X) :

(CategoryTheory.Iso.addCommGroupIsoToAddEquiv i) a = i.hom a

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def CategoryTheory.Iso.commGroupIsoToMulEquiv {X : CommGroupCat} {Y : CommGroupCat} (i : X ≅ Y) :

↑X ≃* ↑Y

Build a MulEquiv from an isomorphism in the category CommGroup.

Equations

CategoryTheory.Iso.commGroupIsoToMulEquiv i = MonoidHom.toMulEquiv i.hom i.inv ⋯ ⋯

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theorem addEquivIsoAddGroupIso.proof_1 {X : AddGroupCat} {Y : AddGroupCat} :

(CategoryTheory.CategoryStruct.comp (fun (e : ↑X ≃+ ↑Y) => AddEquiv.toAddGroupCatIso e) fun (i : X ≅ Y) => CategoryTheory.Iso.addGroupIsoToAddEquiv i) = CategoryTheory.CategoryStruct.id (↑X ≃+ ↑Y)

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theorem addEquivIsoAddGroupIso.proof_2 {X : AddGroupCat} {Y : AddGroupCat} :

(CategoryTheory.CategoryStruct.comp (fun (i : X ≅ Y) => CategoryTheory.Iso.addGroupIsoToAddEquiv i) fun (e : ↑X ≃+ ↑Y) => AddEquiv.toAddGroupCatIso e) = CategoryTheory.CategoryStruct.id (X ≅ Y)

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def addEquivIsoAddGroupIso {X : AddGroupCat} {Y : AddGroupCat} :

↑X ≃+ ↑Y ≅ X ≅ Y

"additive equivalences between add_groups are the same as (isomorphic to) isomorphisms in AddGroup

Equations

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

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def mulEquivIsoGroupIso {X : GroupCat} {Y : GroupCat} :

↑X ≃* ↑Y ≅ X ≅ Y

multiplicative equivalences between Groups are the same as (isomorphic to) isomorphisms in GroupCat

Equations

mulEquivIsoGroupIso = { hom := fun (e : ↑X ≃* ↑Y) => MulEquiv.toGroupCatIso e, inv := fun (i : X ≅ Y) => CategoryTheory.Iso.groupIsoToMulEquiv i, hom_inv_id := ⋯, inv_hom_id := ⋯ }