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Mathlib.Algebra.Category.CoalgCat.Monoidal

The monoidal category structure on `R`-coalgebras #

In Mathlib/RingTheory/Coalgebra/TensorProduct.lean, given two R-coalgebras M, N, we define a coalgebra instance on M ⊗[R] N, as well as the tensor product of two CoalgHoms as a CoalgHom, and the associator and left/right unitors for coalgebras as CoalgEquivs.

In this file, we declare a MonoidalCategory instance on the category of coalgebras, with data fields given by the definitions in Mathlib/RingTheory/Coalgebra/TensorProduct.lean, and Prop fields proved by pulling back the MonoidalCategory instance on the category of modules, using Monoidal.induced.

noncomputable instance CoalgCat.instMonoidalCategoryStruct (R : Type u) [CommRing R] :

CategoryTheory.MonoidalCategoryStruct (CoalgCat R)

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@[simp]

theorem CoalgCat.whiskerRight_def (R : Type u) [CommRing R] {X₁✝ X₂✝ : CoalgCat R} (f : X₁✝ ⟶ X₂✝) (X : CoalgCat R) :

CategoryTheory.MonoidalCategoryStruct.whiskerRight f X = ofHom (CoalgHom.rTensor (↑X.toModuleCat) f.toCoalgHom')

@[simp]

theorem CoalgCat.associator_def (R : Type u) [CommRing R] (X Y Z : CoalgCat R) :

CategoryTheory.MonoidalCategoryStruct.associator X Y Z = (Coalgebra.TensorProduct.assoc R R ↑X.toModuleCat ↑Y.toModuleCat ↑Z.toModuleCat).toCoalgIso

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theorem CoalgCat.tensorUnit_instCoalgebra (R : Type u) [CommRing R] :

(CategoryTheory.MonoidalCategoryStruct.tensorUnit (CoalgCat R)).instCoalgebra = inferInstance

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theorem CoalgCat.tensorObj_instCoalgebra (R : Type u) [CommRing R] (X Y : CoalgCat R) :

(CategoryTheory.MonoidalCategoryStruct.tensorObj X Y).instCoalgebra = inferInstance

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theorem CoalgCat.rightUnitor_def (R : Type u) [CommRing R] (X : CoalgCat R) :

CategoryTheory.MonoidalCategoryStruct.rightUnitor X = (Coalgebra.TensorProduct.rid R R ↑X.toModuleCat).toCoalgIso

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theorem CoalgCat.tensorUnit_carrier (R : Type u) [CommRing R] :

↑(CategoryTheory.MonoidalCategoryStruct.tensorUnit (CoalgCat R)).toModuleCat = R

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theorem CoalgCat.tensorObj_carrier (R : Type u) [CommRing R] (X Y : CoalgCat R) :

↑(CategoryTheory.MonoidalCategoryStruct.tensorObj X Y).toModuleCat = TensorProduct R ↑X.toModuleCat ↑Y.toModuleCat

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theorem CoalgCat.tensorUnit_isAddCommGroup (R : Type u) [CommRing R] :

(CategoryTheory.MonoidalCategoryStruct.tensorUnit (CoalgCat R)).isAddCommGroup = inst✝.toAddCommGroup

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theorem CoalgCat.tensorUnit_isModule (R : Type u) [CommRing R] :

(CategoryTheory.MonoidalCategoryStruct.tensorUnit (CoalgCat R)).isModule = Semiring.toModule

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theorem CoalgCat.tensorHom_def (R : Type u) [CommRing R] {X₁✝ Y₁✝ X₂✝ Y₂✝ : CoalgCat R} (f : X₁✝ ⟶ Y₁✝) (g : X₂✝ ⟶ Y₂✝) :

CategoryTheory.MonoidalCategoryStruct.tensorHom f g = ofHom (Coalgebra.TensorProduct.map f.toCoalgHom' g.toCoalgHom')

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theorem CoalgCat.tensorObj_isAddCommGroup (R : Type u) [CommRing R] (X Y : CoalgCat R) :

(CategoryTheory.MonoidalCategoryStruct.tensorObj X Y).isAddCommGroup = TensorProduct.addCommGroup

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theorem CoalgCat.tensorObj_isModule (R : Type u) [CommRing R] (X Y : CoalgCat R) :

(CategoryTheory.MonoidalCategoryStruct.tensorObj X Y).isModule = TensorProduct.instModule

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theorem CoalgCat.whiskerLeft_def (R : Type u) [CommRing R] (X x✝ x✝¹ : CoalgCat R) (f : x✝ ⟶ x✝¹) :

CategoryTheory.MonoidalCategoryStruct.whiskerLeft X f = ofHom (CoalgHom.lTensor (↑X.toModuleCat) f.toCoalgHom')

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theorem CoalgCat.leftUnitor_def (R : Type u) [CommRing R] (X : CoalgCat R) :

CategoryTheory.MonoidalCategoryStruct.leftUnitor X = (Coalgebra.TensorProduct.lid R ↑X.toModuleCat).toCoalgIso

noncomputable def CoalgCat.MonoidalCategory.inducingFunctorData (R : Type u) [CommRing R] :

CategoryTheory.Monoidal.InducingFunctorData (CategoryTheory.forget₂ (CoalgCat R) (ModuleCat R))

The data needed to induce a MonoidalCategory structure via CoalgCat.instMonoidalCategoryStruct and the forgetful functor to modules.

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Instances For

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theorem CoalgCat.MonoidalCategory.inducingFunctorData_εIso (R : Type u) [CommRing R] :

(inducingFunctorData R).εIso = CategoryTheory.Iso.refl (CategoryTheory.MonoidalCategoryStruct.tensorUnit (ModuleCat R))

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theorem CoalgCat.MonoidalCategory.inducingFunctorData_μIso (R : Type u) [CommRing R] (x✝ x✝¹ : CoalgCat R) :

(inducingFunctorData R).μIso x✝ x✝¹ = CategoryTheory.Iso.refl (CategoryTheory.MonoidalCategoryStruct.tensorObj ((CategoryTheory.forget₂ (CoalgCat R) (ModuleCat R)).obj x✝) ((CategoryTheory.forget₂ (CoalgCat R) (ModuleCat R)).obj x✝¹))

noncomputable instance CoalgCat.instMonoidalCategory (R : Type u) [CommRing R] :

CategoryTheory.MonoidalCategory (CoalgCat R)

Equations

CoalgCat.instMonoidalCategory R = CategoryTheory.Monoidal.induced (CategoryTheory.forget₂ (CoalgCat R) (ModuleCat R)) (CoalgCat.MonoidalCategory.inducingFunctorData R)