Group in which every normal-extensible automorphism is inner

Definition
A group in which every normal-extensible automorphism is inner is a group wit hthe property that every normal-extensible automorphism of a group is an inner automorphism.

Stronger properties

 * Weaker than::Complete group
 * Weaker than::Group in which every automorphism is inner

Weaker properties

 * Stronger than::Group in which every extensible automorphism is inner
 * Stronger than::Group in which every normal-extensible automorphism is normal

Opposite properties

 * Group in which every automorphism is normal-extensible