Maximal class group: Difference between revisions

Revision as of 02:27, 21 August 2011

The article defines a property of groups, where the definition may be in terms of a particular prime that serves as parameter
View other prime-parametrized group properties | View other group properties

Definition

A maximal class group is a group of prime power order that has nilpotency class $c$ , and order $p^{c + 1}$ , where $p$ is a prime number and $c > 1$ . Equivalently, it has the following properties:

The abelianization of the group, i.e., the quotient of the group by its commutator subgroup has order $p^{2}$ .
The upper central series and lower central series coincide, and all the successive quotients (except the top-most quotient) are of order $p$ .

Facts

For 2-groups

Classification of finite 2-groups of maximal class: There are only three possibilities in general for any order -- the dihedral group, [[semidihedral group], and generalized quaternion group. For order 8, two of these collapse into one and we get only two possibilities.
Finite non-abelian 2-group has maximal class iff its abelianization has order four: In particular, all the finite 2-groups of a given order and maximal class are isoclinic groups.

General facts

Examples

Prime number $p$	Nilpotency class $c$	$p^{c + 1}$	Number of maximal class groups	List of maximal class groups	List of GAP IDs second part (in order of list)
2	2	8	2	dihedral group:D8, quaternion group	3,4
2	3	16	3	dihedral group:D16, semidihedral group:SD16, generalized quaternion group:Q16	7,8,9
2	4	32	3	dihedral group:D32, semidihedral group:SD32, generalized quaternion group:Q32	18,19,20
2	5	64	3	dihedral group:D64, semidihedral group:SD64, generalized quaternion group:Q64	52,53,54
3	2	27	2	prime-cube order group:U(3,3), M27	3,4
3	3	81	4	wreath product of Z3 and Z3, SmallGroup(81,8), SmallGroup(81,9), SmallGroup(81,10)	7,8,9,10
3	4	243	6
odd $p$	2	$p^{3}$	2	prime-cube order group:U(3,p), semidirect product of cyclic group of prime-square order and cyclic group of prime order	3,4
odd $p$	3	$p^{4}$	4		7,8,9,10
odd $p$	4	$p^{5}$	$3 + 2 g c d (p - 1, 3) + g c d (p - 1, 4)$

Relation with other properties

Weaker properties

UL-equivalent group

@@ Line 12: / Line 12: @@
 ===For 2-groups===
-* [[Classification of finite 2-groups of maximal class]]: There are only three possibilities in general for any order -- the dihedral group, semidihedral group, and generalized quaternion group. For order 8, two of these collapse into one and we get only two possibilities.
+* [[Classification of finite 2-groups of maximal class]]: There are only three possibilities in general for any order -- the [[dihedral group]], [[semidihedral group], and [[generalized quaternion group]]. For order 8, two of these collapse into one and we get only two possibilities.
-* [[Finite non-abelian 2-group has maximal class iff its abelianization has order four]]
+* [[Finite non-abelian 2-group has maximal class iff its abelianization has order four]]: In particular, all the finite 2-groups of a given order and maximal class are [[isoclinic groups]].
 ===General facts===