Derived subgroup centralizes cyclic normal subgroup: Difference between revisions

Statement

Suppose ${\displaystyle N}$ is a Cyclic normal subgroup (?) of a group ${\displaystyle G}$. Then, the commutator subgroup ${\displaystyle [G,G]}$ is contained in the Centralizer (?) ${\displaystyle C_G(N)}$.

Equivalently, since centralizing is a symmetric relation, we can say that ${\displaystyle N}$ is contained in the Centralizer of derived subgroup (?) ${\displaystyle C_G([G,G])}$.

Related facts

Related facts about cyclic normal subgroups

• Normal of least prime order implies central
• Cyclic normal Sylow subgroup for least prime divisor is central

Related facts about descent of action

• Quotient group acts on abelian normal subgroup

Related facts about containment in the centralizer of commutator subgroup

• Commutator subgroup centralizes aut-abelian normal subgroup, so any aut-abelian normal subgroup is contained in the centralizer of commutator subgroup
• Abelian-quotient abelian normal subgroup is contained in centralizer of commutator subgroup
• Abelian subgroup is contained in centralizer of commutator subgroup in generalized dihedral group
• Abelian subgroup equals centralizer of commutator subgroup in generalized dihedral group unless it is a 2-group of exponent at most four

Other related facts

• Odd-order cyclic group is characteristic in holomorph

Facts used

1. Cyclic implies aut-abelian
2. Derived subgroup centralizes aut-abelian normal subgroup

Proof

The proof follows from facts (1) and (2).