Cyclic normal subgroup of finite group

Definition
A cyclic normal subgroup of finite group is a cyclic normal subgroup (i.e., a normal subgroup that is also a cyclic group) of a finite group.

Weaker properties

 * Stronger than::Cyclic normal subgroup
 * Stronger than::Abelian normal subgroup of finite group
 * Stronger than::Abelian normal subgroup
 * Stronger than::Homocyclic normal subgroup of finite group
 * Stronger than::Homocyclic normal subgroup
 * Stronger than::Finite-pi-potentially verbal subgroup
 * Stronger than::Potentially verbal subgroup
 * Stronger than::Finite-potentially verbal subgroup
 * Stronger than::Potentially fully invariant subgroup
 * Stronger than::Finite-pi-potentially fully invariant subgroup
 * Stronger than::Finite-pi-potentially characteristic subgroup