Pages that link to "Item:Q5498555"

The following pages link to Finite p-groups all of whose maximal subgroups, except one, have cyclic derived subgroups (Q5498555):

Displaying 9 items.

• Counterexamples to a rank analog of the Shepherd-Leedham-Green-McKay theorem on finite \(p\)-groups of maximal nilpotency class. (Q359351) (← links)
• Finite nonabelian \(p\)-groups having exactly one maximal subgroup with a noncyclic center. (Q633169) (← links)
• Finite \(p\)-groups all of whose proper subgroups have small derived subgroups. (Q989769) (← links)
• Finite \(p\)-groups all of whose maximal subgroups either are metacyclic or have a derived subgroup of order \(\leq p\). (Q2261957) (← links)
• On maximal cyclic subgroups in finite \(p\)-groups. (Q2498486) (← links)
• Finite \(p\)-groups all of whose proper subgroups have cyclic Frattini subgroups. (Q2903541) (← links)
• Finite p-groups all of whose proper subgroups have its derived subgroup of order at most p (Q3113344) (← links)
• On the finite $p$-groups with unique cyclic subgroup of given order (Q4633103) (← links)
• Finite p-groups all of whose maximal subgroups, except one, have its derived subgroup of order ≤ p (Q4909379) (← links)