Nilpotent group

Definition

Equivalent definitions in tabular format

No.	Shorthand	A group is termed nilpotent if ...	A group ${\displaystyle G}$ is termed nilpotent if ...
1	upper central series	its upper central series stabilizes after a finite length at the whole group	there is a nonnegative integer ${\displaystyle c}$ such that ${\displaystyle Z^{c}(G)=G}$. Here, we define ${\displaystyle Z^{c}(G)}$ inductively as follows: ${\displaystyle Z^{c}(G)}$ is the inverse image of the center ${\displaystyle Z(G/Z^{c-1}(G))}$ under the natural quotient map from ${\displaystyle G}$ to ${\displaystyle G/Z^{c-1}(G)}$, and ${\displaystyle Z^{0}(G)}$ is the trivial subgroup.
2	lower central series	its lower central series stabilizes after a finite length at the trivial subgroup	there is a nonnegative integer ${\displaystyle c}$ such that ${\displaystyle [[[..[G,G],G],G],...G]}$ is trivial where ${\displaystyle G}$ is repeated ${\displaystyle c+1}$ times. Here, ${\displaystyle [,]}$ denotes the commutator of two subgroups. In other words, the lower central series of ${\displaystyle G}$ reaches the identity in finitely many steps.
3	central series	it possesses a central series	here is a nonnegative integer ${\displaystyle c}$ and a chain of subgroups: ${\displaystyle G=H_{1}\geq H_{2}\geq \dots \geq H_{c+1}=\{e\}}$ such that each ${\displaystyle H_{i}}$ is a normal subgroup of ${\displaystyle G}$ and ${\displaystyle H_{i}/H_{i+1}}$ is in the center of ${\displaystyle G/H_{i+1}}$. In other words, there exists a central series for ${\displaystyle G}$ of length ${\displaystyle c}$.
4	diagonal subnormal in square	the diagonal subgroup is subnormal in the square of the group	the subgroup ${\displaystyle \{(g,g):g\in G\}}$ is subnormal in the square ${\displaystyle G\times G}$ with subnormal depth ${\displaystyle c}$.
5	iterated left-normed commutators trivial	there is a finite length such that any iterated left-normed commutator of length more than that becomes trivial	there is a length ${\displaystyle c}$ such that any commutator of the form ${\displaystyle [[\dots [x_{1},x_{2}],x_{3}],\dots ,x_{c+1}]}$ takes value the identity element, where the ${\displaystyle x_{i}}$ are (possibly repeated) elements of ${\displaystyle G}$.
6	iterated commutators of any form trivial	there is a finite length such that any iterated commutator (with any kind of parenthesization of terms) of length more than that becomes trivial	there is a length ${\displaystyle c}$ such that any iterated commutator that involves at least ${\displaystyle c}$ commutator operations (so ${\displaystyle c+1}$ original inputs) takes value the identity element. [SHOW MORE] For instance, for ${\displaystyle c=3}$, the expressions ${\displaystyle \![[x_{1},x_{2}],[x_{3},x_{4}]],[[[x_{1},x_{2}],x_{3}],x_{4}]],[x_{1},[x_{2},[x_{3},x_{4}]]]}$, ${\displaystyle [[x_{1},[x_{2},x_{3}]],x_{4}],[x_{1},[[x_{2},x_{3}],x_{4}]}$ all take value the identity element.

The smallest possible ${\displaystyle c}$ for all three definitions is termed the nilpotency class (sometimes written nilpotence class) of ${\displaystyle G}$. We usually say a group is of nilpotency class ${\displaystyle c}$ if its nilpotency class is less than or equal to ${\displaystyle c}$.

This definition is presented using a tabular format. |View all pages with definitions in tabular format

Equivalence of definitions

Further information: Equivalence of definitions of nilpotent group, equivalence of definitions of nilpotency class

Examples

VIEW: groups satisfying this property | groups dissatisfying this property
VIEW: Related group property satisfactions | Related group property dissatisfactions

• The trivial group is nilpotent, of nilpotency class zero.
• Any abelian group is nilpotent, of nilpotency class one.
• Any group of prime power order is nilpotent. Further information: prime power order implies nilpotent. Thus, exploring groups of prime power order is a good starting point for exploring nilpotent groups. See groups of order 8, groups of order 16, groups of order 32, groups of order 27, groups of order 81. See also nilpotency class distribution of finite p-groups.
• The dihedral group of order 8 is the smallest (in terms of order) nilpotent group which is not abelian. It is a group of nilpotency class two.
• The quaternion group is also the smallest (in terms of order) nilpotent group which is not abelian. This also has order eight.
• For ${\displaystyle p\neq 2}$, there are in general two non-abelian groups of order ${\displaystyle p^{3}}$, both of which are nilpotent (of class two): semidirect product of cyclic group of prime-square order and cyclic group of prime order and prime-cube order group:U(3,p).

This article is about a standard (though not very rudimentary) definition in group theory. The article text may, however, contain more than just the basic definition
VIEW: Definitions built on this | Facts about this: (facts closely related to Nilpotent group, all facts related to Nilpotent group) |Survey articles about this | Survey articles about definitions built on this
VIEW RELATED: Analogues of this | Variations of this | Opposites of this |
View a complete list of semi-basic definitions on this wiki

This article defines a group property that is pivotal (i.e., important) among existing group properties
View a list of pivotal group properties | View a complete list of group properties [SHOW MORE]

VIEW RELATED: Group property implications | Group property non-implications | Group metaproperty satisfactions | Group metaproperty dissatisfactions | Group property satisfactions |Group property dissatisfactions<random> @@@
RANDOM GROUP PROPERTY: <random>Simple group: A nontrivial group having no proper nontrivial normal subgroup.@@@Noetherian group: A group where every subgroup is finitely generated.@@@Complete group: A group for which the natural homomorphism to its automorphism group is an isomorphism, i.e., a centerless group for which every automorphism is inner.@@@SQ-universal group: A group for which every finitely generated group can be realized as a subquotient.@@@T-group: A group where any subnormal subgroup is normal, i.e., where normality is transitive. In general, normality is not transitive.@@@Locally finite group: A group in which every finitely generated subgroup is finite.@@@Group satisfying normalizer condition: A group with no proper self-normalizing subgroup.</random></random>

The version of this for finite groups is at: finite nilpotent group

Metaproperties

Metaproperty name	Satisfied?	Proof	Statement with symbols
quasivarietal group property	Yes	nilpotency is quasivarietal	closed under taking subgroups, quotients, and direct products (see below)
subgroup-closed group property	Yes	nilpotency is subgroup-closed	If ${\displaystyle G}$ is nilpotent, and ${\displaystyle H\leq G}$, then ${\displaystyle H}$ is nilpotent.
quotient-closed group property	Yes	nilpotency is quotient-closed	If ${\displaystyle G}$ is nilpotent, and ${\displaystyle H\leq G}$ is a normal subgroup, the quotient group ${\displaystyle G/H}$ is nilpotent.
finite direct product-closed group property	Yes	nilpotency is finite direct product-closed	If ${\displaystyle G_{1},G_{2},\dots ,G_{n}}$ are all nilpotent groups, the external direct product ${\displaystyle G_{1}\times G_{2}\times \dots \times G_{n}}$ is also nilpotent.
finite normal join-closed group property	Yes	nilpotency is finite normal join-closed	Suppose ${\displaystyle G}$ is a group and ${\displaystyle N_{1},N_{2},\dots ,N_{r}}$ are all nilpotent normal subgroups of ${\displaystyle G}$. Then the join of subgroups (which in this case is also the product of subgroups) ${\displaystyle N_{1}N_{2}\dots N_{r}}$ is also nilpotent.
extension-closed group property	No	nilpotency is not extension-closed	It is possible to have a non-nilpotent group ${\displaystyle G}$ and a normal subgroup ${\displaystyle H}$ such that both ${\displaystyle H}$ and ${\displaystyle G/H}$ are nilpotent.

Relation with other properties

This property is a pivotal (important) member of its property space. Its variations, opposites, and other properties related to it and defined using it are often studied

• Variations of nilpotent group

Conjunction with other properties

Conjunctions with other group properties:

• Finite nilpotent group: Conjunction of being finite and nilpotent. Any finite nilpotent group is a direct product of its Sylow subgroups.
• Finitely generated nilpotent group
• Periodic nilpotent group

Conjunctions with subgroup properties:

• Nilpotent normal subgroup
• Nilpotent characteristic subgroup
• Nilpotent subnormal subgroup

Stronger properties

Property	Meaning	Proof of implication	Proof of strictness (reverse implication failure)	Intermediate notions
abelian group	any two elements commute, so class ${\displaystyle \leq 1}$	abelian implies nilpotent	nilpotent not implies abelian (see also list of examples)	|FULL LIST, MORE INFO
cyclic group	generated by one element	(via abelian)	(via abelian) (see also list of examples)	Abelian group|FULL LIST, MORE INFO
group of prime power order	order is a power of a prime	prime power order implies nilpotent	(see also list of examples)	|FULL LIST, MORE INFO
finite nilpotent group	Nilpotent and a finite group		(see also list of examples)	|FULL LIST, MORE INFO
group of nilpotency class two	The derived subgroup is in the center		(see also list of examples)	|FULL LIST, MORE INFO
Aut-nilpotent group	The automorphism group is a nilpotent group	aut-nilpotent implies nilpotent	nilpotent not implies aut-nilpotent	|FULL LIST, MORE INFO
UL-equivalent group	The upper central series and lower central series coincide	(by definition)	nilpotent not implies UL-equivalent (see also list of examples)	|FULL LIST, MORE INFO

Weaker properties

Testing

GAP command

This group property can be tested using built-in functionality of Groups, Algorithms, Programming (GAP).
The GAP command for this group property is:IsNilpotentGroup
The class of all groups with this property can be referred to with the built-in command: NilpotentGroups
View GAP-testable group properties

To test whether a given group is nilpotent or not using GAP, enter:

IsNilpotentGroup (group);

where group is either the definition of a group or a name for a group already defined.

The class of all nilpotent groups is specified as NilpotentGroups.

Formalisms

In terms of ascending series

This group property is obtained by applying the ascending series-finite operator to the subgroup-defining function: center

A group is nilpotent if and only if the ascending series corresponding to the center subgroup-defining function (which is the upper central series) terminates at the whole group in finitely many steps.

In terms of the diagonal-in-square operator

This property is obtained by applying the diagonal-in-square operator to the property: subnormal subgroup
View other properties obtained by applying the diagonal-in-square operator

A group ${\displaystyle G}$ is nilpotent if and only if the diagonal subgroup ${\displaystyle \{(g,g)\mid g\in G\}}$ is subnormal in the group ${\displaystyle G\times G}$. In fact, the nilpotency class of ${\displaystyle G}$ equals the subnormal depth of the diagonal subgroup.

Study of this notion

Mathematical subject classification

Under the Mathematical subject classification, the study of this notion comes under the class: 20F18

While 20F18 is the subject class used for nilpotent groups, the subject class used for finite nilpotent groups in particular is 20D15.

Closely related is 20F19: Generalizations of nilpotent and solvable groups.

References

Textbook references