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Mathlib.CategoryTheory.Monoidal.Skeleton

The monoid on the skeleton of a monoidal category #

The skeleton of a monoidal category is a monoid.

Main results #

Skeleton.instMonoid, for monoidal categories.
Skeleton.instCommMonoid, for braided monoidal categories.

@[reducible, inline]

abbrev CategoryTheory.monoidOfSkeletalMonoidal {C : Type u} [Category.{v, u} C] [MonoidalCategory C] (hC : Skeletal C) :

If C is monoidal and skeletal, it is a monoid. See note [reducible non-instances].

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@[reducible, inline]

abbrev CategoryTheory.commMonoidOfSkeletalBraided {C : Type u} [Category.{v, u} C] [MonoidalCategory C] [BraidedCategory C] (hC : Skeletal C) :

If C is braided and skeletal, it is a commutative monoid.

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noncomputable instance CategoryTheory.Skeleton.instMonoidalCategory {C : Type u} [Category.{v, u} C] [MonoidalCategory C] :

MonoidalCategory (Skeleton C)

The skeleton of a monoidal category has a monoidal structure itself, induced by the equivalence.

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noncomputable instance CategoryTheory.Skeleton.instMonoid {C : Type u} [Category.{v, u} C] [MonoidalCategory C] :

Monoid (Skeleton C)

The skeleton of a monoidal category can be viewed as a monoid, where the multiplication is given by the tensor product, and satisfies the monoid axioms since it is a skeleton.

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theorem CategoryTheory.Skeleton.mul_eq {C : Type u} [Category.{v, u} C] [MonoidalCategory C] (X Y : Skeleton C) :

X * Y = toSkeleton (MonoidalCategoryStruct.tensorObj (Quotient.out X) (Quotient.out Y))

theorem CategoryTheory.Skeleton.one_eq {C : Type u} [Category.{v, u} C] [MonoidalCategory C] :

1 = toSkeleton (MonoidalCategoryStruct.tensorUnit C)

theorem CategoryTheory.Skeleton.toSkeleton_tensorObj {C : Type u} [Category.{v, u} C] [MonoidalCategory C] (X Y : C) :

toSkeleton (MonoidalCategoryStruct.tensorObj X Y) = toSkeleton X * toSkeleton Y

noncomputable instance CategoryTheory.Skeleton.instBraidedCategory {C : Type u} [Category.{v, u} C] [MonoidalCategory C] [BraidedCategory C] :

BraidedCategory (Skeleton C)

The skeleton of a braided monoidal category has a braided monoidal structure itself, induced by the equivalence.

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noncomputable instance CategoryTheory.Skeleton.instCommMonoid {C : Type u} [Category.{v, u} C] [MonoidalCategory C] [BraidedCategory C] :

CommMonoid (Skeleton C)

The skeleton of a braided monoidal category can be viewed as a commutative monoid, where the multiplication is given by the tensor product, and satisfies the monoid axioms since it is a skeleton.

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noncomputable instance CategoryTheory.instMonoidalSkeletonFunctorSkeletonEquivalence {C : Type u} [Category.{v, u} C] [MonoidalCategory C] :

(skeletonEquivalence C).functor.Monoidal

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noncomputable instance CategoryTheory.instMonoidalSkeletonInverseSkeletonEquivalence {C : Type u} [Category.{v, u} C] [MonoidalCategory C] :

(skeletonEquivalence C).inverse.Monoidal

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noncomputable instance CategoryTheory.instLaxMonoidalSkeletonMapSkeleton {C : Type u} [Category.{v, u} C] [MonoidalCategory C] {D : Type u_1} [Category.{v_1, u_1} D] [MonoidalCategory D] (F : Functor C D) [F.LaxMonoidal] :

F.mapSkeleton.LaxMonoidal

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noncomputable instance CategoryTheory.instOplaxMonoidalSkeletonMapSkeleton {C : Type u} [Category.{v, u} C] [MonoidalCategory C] {D : Type u_1} [Category.{v_1, u_1} D] [MonoidalCategory D] (F : Functor C D) [F.OplaxMonoidal] :

F.mapSkeleton.OplaxMonoidal

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noncomputable instance CategoryTheory.instMonoidalSkeletonMapSkeleton {C : Type u} [Category.{v, u} C] [MonoidalCategory C] {D : Type u_1} [Category.{v_1, u_1} D] [MonoidalCategory D] (F : Functor C D) [F.Monoidal] :

F.mapSkeleton.Monoidal

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def CategoryTheory.Skeletal.monoidHom {C : Type u} [Category.{v, u} C] [MonoidalCategory C] {D : Type u_1} [Category.{v_1, u_1} D] [MonoidalCategory D] (F : Functor C D) [F.Monoidal] (hC : Skeletal C) (hD : Skeletal D) :

have x := monoidOfSkeletalMonoidal hC; have x_1 := monoidOfSkeletalMonoidal hD; C →* D

A monoidal functor between skeletal monoidal categories induces a monoid homomorphism.

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noncomputable def CategoryTheory.Skeleton.monoidHom {C : Type u} [Category.{v, u} C] [MonoidalCategory C] {D : Type u_1} [Category.{v_1, u_1} D] [MonoidalCategory D] (F : Functor C D) [F.Monoidal] :

Skeleton C →* Skeleton D

A monoidal functor between monoidal categories induces a monoid homomorphism between the skeleta.

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def CategoryTheory.Skeletal.mulEquiv {C : Type u} [Category.{v, u} C] [MonoidalCategory C] {D : Type u_1} [Category.{v_1, u_1} D] [MonoidalCategory D] (e : C ≌ D) [e.functor.Monoidal] (hC : Skeletal C) (hD : Skeletal D) :

have x := monoidOfSkeletalMonoidal hC; have x_1 := monoidOfSkeletalMonoidal hD; C ≃* D

A monoidal equivalence between skeletal monoidal categories induces a monoid isomorphism.

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noncomputable def CategoryTheory.Skeleton.mulEquiv {C : Type u} [Category.{v, u} C] [MonoidalCategory C] {D : Type u_1} [Category.{v_1, u_1} D] [MonoidalCategory D] (e : C ≌ D) [e.functor.Monoidal] :

Skeleton C ≃* Skeleton D

A monoidal equivalence between monoidal categories induces a monoid isomorphism between the skeleta.

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