The topological abelianization of a group. #
This file defines the topological abelianization of a topological group.
Main definitions #
TopologicalAbelianization
: defines the topological abelianization of a groupG
as the quotient ofG
by the topological closure of its commutator subgroup..
Main results #
instNormalCommutatorClosure
: the topological closure of the commutator of a topological groupG
is a normal subgroup.
Tags #
group, topological abelianization
instance
instNormalCommutatorClosure
(G : Type u_1)
[Group G]
[TopologicalSpace G]
[TopologicalGroup G]
:
(commutator G).topologicalClosure.Normal
Equations
- ⋯ = ⋯
@[reducible, inline]
abbrev
TopologicalAbelianization
(G : Type u_1)
[Group G]
[TopologicalSpace G]
[TopologicalGroup G]
:
Type u_1
The topological abelianization of absoluteGaloisGroup
, that is, the quotient of
absoluteGaloisGroup
by the topological closure of its commutator subgroup.
Equations
- TopologicalAbelianization G = (G ⧸ (commutator G).topologicalClosure)
Instances For
instance
TopologicalAbelianization.commGroup
(G : Type u_1)
[Group G]
[TopologicalSpace G]
[TopologicalGroup G]
:
Equations
- TopologicalAbelianization.commGroup G = let __spread.0 := inferInstance; CommGroup.mk ⋯