Group of prime power order in which all maximal subgroups are automorphic

Definition
A group of prime power order in which all maximal subgroups are automorphic is a group of prime power order in which all maximal subgroups are automorphic subgroups. In other words, given any two maximal subgroups, there is an automorphism of the whole group sending one to the other.

Stronger properties

 * Weaker than::Cyclic group of prime power order
 * Weaker than::Finite elementary abelian group
 * Weaker than::Homocyclic group of prime power order

Weaker properties

 * Stronger than::Group of prime power order in which all maximal subgroups are isomorphic