Universal power not implies IA

Statement
A universal power automorphism of a group (i.e., an automorphism obtained by taking the $$n^{th}$$ power for some integer $$n$$) need not be an IA-automorphism: it need not preserve the cosets of the commutator subgroup (i.e., it need not be identity on the Abelianization).

Related facts

 * Universal power not implies center-fixing

Corollaries

 * Universal power not implies class-preserving
 * Subgroup-conjugating not implies IA
 * Subgroup-conjugating not implies class-preserving
 * Normal not implies IA
 * Normal not implies class-preserving

Example of an Abelian group
Consider the cyclic group of order $$p$$, where $$p$$ is an odd prime. The inverse map is a universal power automorphism of this group, and is not the identity map. Since the group is Abelian, it equals its Abelianization, so we have a universal power automorphism that does not fix every element of the Abelianization.