Consider the following theorem:
If $G$ is a finite nonabelian $p$-group, then $\operatorname{Aut}_c(G)=\operatorname{Inn}(G)$ if and only if $G′=Z(G)$ and $Z(G)$ is cyclic.
Notation
- $p$ is a prime number
- $G'$ is the commutator subgroup of $G$
- $Z(G)$ is the center of $G$
- $\operatorname{Aut}(G)$ is the automorphism group of $G$
- $\operatorname{Inn}(G)$ is the group of inner automorphisms of $G$
- $\operatorname{Aut}_c(G)$ is the group of central automorphisms of $G$. These are automorphisms which commute with every element of $\operatorname{Inn}(G)$.
I am looking for a proof which is available online free of charge. There is a reference in Centralizer of $Inn(G)$ in $Aut(G)$ but it is not free of charge.
This is not any form of homework or other assignment.
Thank you very much for any help, ideas or references!!
The paper you are looking for is this: "Central automorphisms that are almost inner", by Curran and McCaughan. Can you provide an e-mail address? I'll be happy to send you a copy.