Normal and centralizer-free implies automorphism-faithful

This article gives the statement and possibly, proof, of an implication relation between two subgroup properties. That is, it states that every subgroup satisfying the first subgroup property (i.e., centralizer-free normal subgroup) must also satisfy the second subgroup property (i.e., automorphism-faithful normal subgroup)
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Statement

Suppose ${\displaystyle H}$ is a subgroup of a group ${\displaystyle G}$ such that:

• ${\displaystyle H}$ is centralizer-free in ${\displaystyle G}$: The centralizer ${\displaystyle C_{G}(H)}$ is trivial.
• ${\displaystyle H}$ is normal in ${\displaystyle G}$.

Then, ${\displaystyle H}$ is an Automorphism-faithful subgroup (?) of ${\displaystyle G}$: every nontrivial automorphism of ${\displaystyle G}$ that restricts to ${\displaystyle H}$ must restrict to a nontrivial automorphism of ${\displaystyle H}$.

Related facts

• Normal and self-centralizing implies coprime automorphism-faithful

Analogues in other algebraic structures

• Centralizer-free ideal implies automorphism-faithful
• Centralizer-free ideal implies derivation-faithful

Facts used

1. Three subgroup lemma

Proof

Hands-on proof

Given: A group ${\displaystyle G}$, a normal subgroup ${\displaystyle H}$ such that ${\displaystyle C_{G}(H)}$ is trivial. An automorphism ${\displaystyle \sigma }$ of ${\displaystyle G}$ that acts as the identity on ${\displaystyle H}$.

To prove: ${\displaystyle \sigma }$ is the identity automorphism.

Proof: Note that for ${\displaystyle g\in G,h\in H}$, we have, by normality, that ${\displaystyle ghg^{-1}\in H}$. Thus, since ${\displaystyle \sigma }$ acts as the identity on ${\displaystyle H}$, we get:

${\displaystyle \sigma (ghg^{-1})=ghg^{-1}}$.

Expand the left side and use that ${\displaystyle \sigma (h)=h}$ to obtain:

${\displaystyle \sigma (g)h\sigma (g)^{-1}=ghg^{-1}}$.

Rearranging this yields that ${\displaystyle g^{-1}\sigma (g)}$ commutes with ${\displaystyle h}$. Since this holds true for every ${\displaystyle h\in H}$, we obtain that ${\displaystyle g^{-1}\sigma (g)\in C_{G}(H)}$. Since ${\displaystyle C_{G}(H)}$ is trivial, we obtain that for every ${\displaystyle g\in G}$, ${\displaystyle g^{-1}\sigma (g)}$ is the identity element, yielding ${\displaystyle g=\sigma (g)}$ for all ${\displaystyle g\in G}$. This yields that ${\displaystyle \sigma }$ is the identity automorphism.

Proof using three subgroup lemma

Note that although this proof may superficially appear different from the preceding one, it is a less hands-on formulation of the same proof. This style of proof may be more useful when proving similar statements that are more complicated; for instance: normal and self-centralizing implies coprime automorphism-faithful.

Given: A group ${\displaystyle G}$, a normal subgroup ${\displaystyle H}$ such that ${\displaystyle C_{G}(H)}$ is trivial. An automorphism ${\displaystyle \sigma }$ of ${\displaystyle G}$ that acts as identity on ${\displaystyle H}$.

To prove: ${\displaystyle \sigma }$ is the identity automorphism.

Proof: Suppose ${\displaystyle A}$ is the subgroup generated by ${\displaystyle \sigma }$ in ${\displaystyle \operatorname {Aut} (G)}$, and let's assume we're working in ${\displaystyle G\rtimes A}$. By assumption, ${\displaystyle [H,A]}$ is trivial. Since ${\displaystyle H}$ is normal in ${\displaystyle G}$, we have ${\displaystyle [G,H]\leq H}$. Thus, we have:

• ${\displaystyle [[G,H],A]\leq [H.A]}$, which is trivial, so ${\displaystyle [[G,H],A]}$ is trivial
• ${\displaystyle [[H,A],G]}$ is trivial, because ${\displaystyle [H,A]}$ is trivial

So, by fact (1) (the three subgroup lemma), ${\displaystyle [[G,A],H]}$ is trivial. Since ${\displaystyle [G,A]\leq G}$, we see that ${\displaystyle [G,A]\leq C_{G}(H)}$, so by the assumption of ${\displaystyle C_{G}(H)}$ being trivial, we obtain that ${\displaystyle [G,A]}$ is trivial. This translates to saying that every element of ${\displaystyle A}$ fixes every element of ${\displaystyle G}$, so ${\displaystyle \sigma }$ must be the identity automorphism.