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Mathlib.Algebra.Category.BialgebraCat.Monoidal

The monoidal structure on the category of bialgebras #

In Mathlib.RingTheory.Bialgebra.TensorProduct, given two R-bialgebras A, B, we define a bialgebra instance on A ⊗[R] B as well as the tensor product of two BialgHoms as a BialgHom, and the associator and left/right unitors for bialgebras as BialgEquivs. In this file, we declare a MonoidalCategory instance on the category of bialgebras, with data fields given by the definitions in Mathlib.RingTheory.Bialgebra.TensorProduct, and Prop fields proved by pulling back the MonoidalCategory instance on the category of algebras, using Monoidal.induced.

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

CategoryTheory.MonoidalCategoryStruct (BialgebraCat R)

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

CategoryTheory.MonoidalCategoryStruct.whiskerLeft X f = ofHom (BialgHom.lTensor X.carrier f.toBialgHom')

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theorem BialgebraCat.instMonoidalCategoryStruct_tensorUnit (R : Type u) [CommRing R] :

CategoryTheory.MonoidalCategoryStruct.tensorUnit (BialgebraCat R) = of R R

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theorem BialgebraCat.instMonoidalCategoryStruct_rightUnitor (R : Type u) [CommRing R] (X : BialgebraCat R) :

CategoryTheory.MonoidalCategoryStruct.rightUnitor X = (Bialgebra.TensorProduct.rid R X.carrier).toBialgebraCatIso

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

CategoryTheory.MonoidalCategoryStruct.whiskerRight f X = ofHom (BialgHom.rTensor X.carrier f.toBialgHom')

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theorem BialgebraCat.instMonoidalCategoryStruct_leftUnitor (R : Type u) [CommRing R] (X : BialgebraCat R) :

CategoryTheory.MonoidalCategoryStruct.leftUnitor X = (Bialgebra.TensorProduct.lid R X.carrier).toBialgebraCatIso

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theorem BialgebraCat.instMonoidalCategoryStruct_associator (R : Type u) [CommRing R] (X Y Z : BialgebraCat R) :

CategoryTheory.MonoidalCategoryStruct.associator X Y Z = (Bialgebra.TensorProduct.assoc R X.carrier Y.carrier Z.carrier).toBialgebraCatIso

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

CategoryTheory.MonoidalCategoryStruct.tensorHom f g = ofHom (Bialgebra.TensorProduct.map f.toBialgHom' g.toBialgHom')

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theorem BialgebraCat.instMonoidalCategoryStruct_tensorObj (R : Type u) [CommRing R] (X Y : BialgebraCat R) :

CategoryTheory.MonoidalCategoryStruct.tensorObj X Y = of R (TensorProduct R X.carrier Y.carrier)

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

CategoryTheory.Monoidal.InducingFunctorData (CategoryTheory.forget₂ (BialgebraCat R) (AlgebraCat R))

The data needed to induce a MonoidalCategory structure via BialgebraCat.instMonoidalCategoryStruct and the forgetful functor to algebras.

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

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

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

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

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

CategoryTheory.MonoidalCategory (BialgebraCat R)

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BialgebraCat.instMonoidalCategory R = CategoryTheory.Monoidal.induced (CategoryTheory.forget₂ (BialgebraCat R) (AlgebraCat R)) (BialgebraCat.MonoidalCategory.inducingFunctorData R)

noncomputable instance BialgebraCat.instMonoidalAlgebraCatForget₂ (R : Type u) [CommRing R] :

(CategoryTheory.forget₂ (BialgebraCat R) (AlgebraCat R)).Monoidal

forget₂ (BialgebraCat R) (AlgebraCat R) as a monoidal functor.

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noncomputable instance BialgebraCat.instMonoidalCoalgebraCatForget₂ (R : Type u) [CommRing R] :

(CategoryTheory.forget₂ (BialgebraCat R) (CoalgebraCat R)).Monoidal

forget₂ (BialgebraCat R) (CoalgebraCat R) as a monoidal functor.

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