Engel group

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Definition

A group $G$ is termed an Engel group or nil group or nilgroup, if, given any two elements $x,y\in G$ , there exists a $n$ such that the iterated commutator:

$[[\dots [x,y],y],y],\dots ],y]=e$

where $e$ denotes the identity element, $[x,y]=xyx^{-1}y^{-1}$ denotes the commutator of $x$ and $y$ , and $y$ occurs $n$ times.

If there exists a $n$ that works for all pairs of elements of $G$ , then we say that $G$ is a $n$ -Engel group. A $n$ -Engel group, for some $n$ , is termed a bounded Engel group. Note that sometimes the term Engel group is used for bounded Engel group.

Note if we instead define the commutator as $[x,y]=x^{-1}y^{-1}xy$ we get an equivalent definition.

Relation with other properties

Stronger properties

Property	Meaning	Intermediate notions
locally nilpotent group	every finitely generated subgroup is nilpotent	\|FULL LIST, MORE INFO
nilpotent group		\|FULL LIST, MORE INFO
bounded Engel group		\|FULL LIST, MORE INFO
2-locally nilpotent group	subgroup generated by two elements is always nilpotent	\|FULL LIST, MORE INFO

Examples and counterexamples

Finite groups

All the nilpotent groups, which are equivalent to locally nilpotent groups for finite groups, are Engel groups.

The smallest non-Engel finite group is symmetric group:S3. To see that, consider $x=(1\,3)$ , $y=(2\,3)$ . Define $x_{0}=x$ , $x_{i}=[x_{i-1},y]$ for $i\geq 1$ and you will see that none of $x_{0},x_{1},x_{2},\dots$ are the identity permutation. (The values of $x_{0},x_{1},x_{2},\dots$ depend on which definition of commutator you use, and which convention you take on the order of composition of permutations)