The abelianization of a group #
This file defines the commutator and the abelianization of a group. It furthermore prepares for the
result that the abelianization is left adjoint to the forgetful functor from abelian groups to
groups, which can be found in Algebra/Category/Group/Adjunctions
.
Main definitions #
commutator
: defines the commutator of a groupG
as a subgroup ofG
.Abelianization
: defines the abelianization of a groupG
as the quotient of a group by its commutator subgroup.Abelianization.map
: lifts a group homomorphism to a homomorphism between the abelianizationsMulEquiv.abelianizationCongr
: Equivalent groups have equivalent abelianizations
The abelianization of G is the quotient of G by its commutator subgroup.
Equations
- Abelianization G = (G ⧸ commutator G)
Instances For
Equations
Equations
- Abelianization.instInhabited G = { default := 1 }
Equations
If f : G → A
is a group homomorphism to an abelian group, then lift f
is the unique map
from the abelianization of a G
to A
that factors through f
.
Equations
- One or more equations did not get rendered due to their size.
Instances For
See note [partially-applied ext lemmas].
The map operation of the Abelianization
functor
Equations
- Abelianization.map f = Abelianization.lift (Abelianization.of.comp f)
Instances For
Use map
as the preferred simp normal form.
Equivalent groups have equivalent abelianizations
Equations
- e.abelianizationCongr = { toFun := ⇑(Abelianization.map e.toMonoidHom), invFun := ⇑(Abelianization.map e.symm.toMonoidHom), left_inv := ⋯, right_inv := ⋯, map_mul' := ⋯ }
Instances For
An Abelian group is equivalent to its own abelianization.
Equations
- Abelianization.equivOfComm = { toFun := ⇑Abelianization.of, invFun := ⇑(Abelianization.lift (MonoidHom.id H)), left_inv := ⋯, right_inv := ⋯, map_mul' := ⋯ }
Instances For
Representatives (g₁, g₂) : G × G
of commutators ⁅g₁, g₂⁆ ∈ G
.
Equations
- commutatorRepresentatives G = Set.range fun (g : ↑(commutatorSet G)) => (Exists.choose ⋯, ⋯.choose)
Instances For
Subgroup generated by representatives g₁ g₂ : G
of commutators ⁅g₁, g₂⁆ ∈ G
.
Equations
- closureCommutatorRepresentatives G = Subgroup.closure (Prod.fst '' commutatorRepresentatives G ∪ Prod.snd '' commutatorRepresentatives G)