Normal subgroup whose focal subgroup equals its derived subgroup

From Groupprops

BEWARE! This term is nonstandard and is being used locally within the wiki. [SHOW MORE]

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
View other subgroup property conjunctions | view all subgroup properties

Definition

A normal subgroup whose focal subgroup equals its commutator subgroup is a subgroup H of a group G satisfying the following equivalent conditions:

  1. H is a normal subgroup of G and [H,H]=FocG(H), i.e., H is a subgroup whose focal subgroup equals its commutator subgroup.
  2. [G,H]=[H,H].

Relation with other properties

Stronger properties

Weaker properties