Difference between revisions of "Engel group"
From Encyclopedia of Mathematics
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| + | A group $G$ in which for every two elements $a,b\in G$ there is an integer $n=n(a,b)$ such that $[[\ldots[[a,b],b],\ldots],b]=1$, where $b$ is separated $n$ times and $[a,b]$ is the [[Commutator|commutator]] of $a$ and $b$. If this number $n$ can be chosen independently of $a$ and $b$, then $G$ is called an Engel group of finite class $n$. The class of Engel groups contains that of locally nilpotent groups, but does not coincide with it. Every nilpotent group of class $n$ is an Engel group of the same class. Engel groups of class 2 are nilpotent of class at most 3. | ||
They are named after F. Engel. | They are named after F. Engel. | ||
Latest revision as of 11:46, 26 April 2014
A group $G$ in which for every two elements $a,b\in G$ there is an integer $n=n(a,b)$ such that $[[\ldots[[a,b],b],\ldots],b]=1$, where $b$ is separated $n$ times and $[a,b]$ is the commutator of $a$ and $b$. If this number $n$ can be chosen independently of $a$ and $b$, then $G$ is called an Engel group of finite class $n$. The class of Engel groups contains that of locally nilpotent groups, but does not coincide with it. Every nilpotent group of class $n$ is an Engel group of the same class. Engel groups of class 2 are nilpotent of class at most 3.
They are named after F. Engel.
References
| [1] | A.G. Kurosh, "The theory of groups" , 1–2 , Chelsea (1955–1956) (Translated from Russian) |
Comments
A finite Engel group is nilpotent (cf. Nilpotent group).
References
| [a1] | D.J.S. Robinson, "A course in the theory of groups" , Springer (1982) |
| [a2] | B. Huppert, "Finite groups" , 3 , Springer (1982) |
How to Cite This Entry:
Engel group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Engel_group&oldid=14945
Engel group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Engel_group&oldid=14945
This article was adapted from an original article by N.N. Vil'yams (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article