Normal subgroup whose focal subgroup equals its derived subgroup
(Redirected from Normal subgroup whose focal subgroup equals its commutator subgroup)
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This page describes a subgroup property obtained as a conjunction (AND) of two (or more) more fundamental subgroup properties: normal subgroup and subgroup whose focal subgroup equals its commutator subgroup
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Definition
A normal subgroup whose focal subgroup equals its commutator subgroup is a subgroup of a group satisfying the following equivalent conditions:
- is a normal subgroup of and , i.e., is a subgroup whose focal subgroup equals its commutator subgroup.
- .