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Mathlib.Algebra.Category.GroupCat.Adjunctions

Adjunctions regarding the category of (abelian) groups #

This file contains construction of basic adjunctions concerning the category of groups and the category of abelian groups.

Main definitions #

AddCommGroup.free: constructs the functor associating to a type X the free abelian group with generators x : X.
Group.free: constructs the functor associating to a type X the free group with generators x : X.
abelianize: constructs the functor which associates to a group G its abelianization Gᵃᵇ.

Main statements #

AddCommGroup.adj: proves that AddCommGroup.free is the left adjoint of the forgetful functor from abelian groups to types.
Group.adj: proves that Group.free is the left adjoint of the forgetful functor from groups to types.
abelianize_adj: proves that abelianize is left adjoint to the forgetful functor from abelian groups to groups.

def AddCommGroupCat.free :

CategoryTheory.Functor (Type u) AddCommGroupCat

The free functor Type u ⥤ AddCommGroup sending a type X to the free abelian group with generators x : X.

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@[simp]

theorem AddCommGroupCat.free_obj_coe {α : Type u} :

↑(AddCommGroupCat.free.obj α) = FreeAbelianGroup α

theorem AddCommGroupCat.free_map_coe {α : Type u} {β : Type u} {f : α → β} (x : FreeAbelianGroup α) :

(AddCommGroupCat.free.map f) x = f <$> x

def AddCommGroupCat.adj :

AddCommGroupCat.free ⊣ CategoryTheory.forget AddCommGroupCat

The free-forgetful adjunction for abelian groups.

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instance AddCommGroupCat.instIsRightAdjointTypeTypesAddCommGroupCatInstAddCommGroupCatLargeCategoryForgetConcreteCategory :

CategoryTheory.IsRightAdjoint (CategoryTheory.forget AddCommGroupCat)

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AddCommGroupCat.instIsRightAdjointTypeTypesAddCommGroupCatInstAddCommGroupCatLargeCategoryForgetConcreteCategory = { left := AddCommGroupCat.free, adj := AddCommGroupCat.adj }

def GroupCat.free :

CategoryTheory.Functor (Type u) GroupCat

The free functor Type u ⥤ Group sending a type X to the free group with generators x : X.

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def GroupCat.adj :

GroupCat.free ⊣ CategoryTheory.forget GroupCat

The free-forgetful adjunction for groups.

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instance GroupCat.instIsRightAdjointTypeTypesGroupCatInstGroupCatLargeCategoryForgetConcreteCategory :

CategoryTheory.IsRightAdjoint (CategoryTheory.forget GroupCat)

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GroupCat.instIsRightAdjointTypeTypesGroupCatInstGroupCatLargeCategoryForgetConcreteCategory = { left := GroupCat.free, adj := GroupCat.adj }

def abelianize :

CategoryTheory.Functor GroupCat CommGroupCat

The abelianization functor Group ⥤ CommGroup sending a group G to its abelianization Gᵃᵇ.

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def abelianizeAdj :

abelianize ⊣ CategoryTheory.forget₂ CommGroupCat GroupCat

The abelianization-forgetful adjuction from Group to CommGroup.

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theorem MonCat.units_map :

∀ {X Y : MonCat} (f : X ⟶ Y), MonCat.units.map f = GroupCat.ofHom (Units.map f)

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theorem MonCat.units_obj (R : MonCat) :

MonCat.units.obj R = GroupCat.of (↑R)ˣ

def MonCat.units :

CategoryTheory.Functor MonCat GroupCat

The functor taking a monoid to its subgroup of units.

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def GroupCat.forget₂MonAdj :

CategoryTheory.forget₂ GroupCat MonCat ⊣ MonCat.units

The forgetful-units adjunction between Group and Mon.

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instance instIsRightAdjointGroupCatInstGroupCatLargeCategoryMonCatInstMonCatLargeCategoryUnits :

CategoryTheory.IsRightAdjoint MonCat.units

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instIsRightAdjointGroupCatInstGroupCatLargeCategoryMonCatInstMonCatLargeCategoryUnits = { left := CategoryTheory.forget₂ GroupCat MonCat, adj := GroupCat.forget₂MonAdj }

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theorem CommMonCat.units_obj (R : CommMonCat) :

CommMonCat.units.obj R = CommGroupCat.of (↑R)ˣ

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theorem CommMonCat.units_map :

∀ {X Y : CommMonCat} (f : X ⟶ Y), CommMonCat.units.map f = CommGroupCat.ofHom (Units.map f)

def CommMonCat.units :

CategoryTheory.Functor CommMonCat CommGroupCat

The functor taking a monoid to its subgroup of units.

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def CommGroupCat.forget₂CommMonAdj :

CategoryTheory.forget₂ CommGroupCat CommMonCat ⊣ CommMonCat.units

The forgetful-units adjunction between CommGroup and CommMon.

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instance instIsRightAdjointCommGroupCatInstCommGroupCatLargeCategoryCommMonCatInstCommMonCatLargeCategoryUnits :

CategoryTheory.IsRightAdjoint CommMonCat.units

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