Pages that link to "Item:Q375690"

The following pages link to Finite non-elementary Abelian \(p\)-groups whose number of subgroups is maximal. (Q375690):

Displaying 13 items.

• Finite 2-groups whose number of subgroups of each order are at most \(2^4\) (Q722086) (← links)
• Finite \(p\)-groups with few non-major \(k\)-maximal subgroups (Q1696639) (← links)
• Counting maximal abelian subgroups of \(p\)-groups (Q2153262) (← links)
• Finite non-cyclic \(p\)-groups whose number of subgroups is minimal (Q2285058) (← links)
• On a conjecture by Haipeng Qu (Q2414567) (← links)
• Finite p-groups G with p > 2 and d(G) = 2 having exactly one maximal subgroup which is neither abelian nor minimal nonabelian (Q3069657) (← links)
• (Q3607171) (← links)
• A connection between the number of subgroups and the order of a finite group (Q5030242) (← links)
• A note on an “Anzahl” theorem of P. Hall (Q5132343) (← links)
• THE SECOND MINIMUM/MAXIMUM VALUE OF THE NUMBER OF CYCLIC SUBGROUPS OF FINITE -GROUPS (Q5147587) (← links)
• Lower Bounds on the Number of Cyclic Subgroups in Finite Non-Cyclic Nilpotent Groups (Q5882294) (← links)
• On the maximum number of subgroups of a finite group (Q6051031) (← links)
• Finite non-cyclic nilpotent group whose number of subgroups is minimal (Q6196243) (← links)