# Pages that link to "Normal of prime power order implies contained in upper central series member corresponding to prime-base logarithm of order in nilpotent"

The following pages link to **Normal of prime power order implies contained in upper central series member corresponding to prime-base logarithm of order in nilpotent**:

- Minimal normal implies central in nilpotent group (← links)
- Nilpotent implies intersection of normal subgroup with upper central series is strictly ascending till the subgroup is reached (← links)
- Normal closure of 2-subnormal subgroup of prime power order in nilpotent group has nilpotency class at most equal to prime-base logarithm of order (← links)