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<div class="ChapSects"><a href="chap4_mj.html#X7A489A5D79DA9E5C">4 Examples</a>
<div class="ContSect"> <a href="chap4_mj.html#X8638E6CE7B5955FB">4.1 Right Engel elements</a>

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<h3>4 Examples</h3>

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<h4>4.1 Right Engel elements</h4>

An old problem in the context of Engel elements is the question: Is a right \(n\)-Engel element left \(n\)-Engel? It is known that the answer is no. For details about the history of the problem, see <a href="chapBib_mj.html#biBNewmanNickel94">[NN94]</a>. In this paper the authors show that for \(n>4\) there are nilpotent groups with right \(n\)-Engel elements no power of which is a left \(n\)-Engel element. The insight was based on computations with the ANU NQ which we reproduce here. We also show the cases \(5>n\).

<div class="example"><pre>
gap> LoadPackage( "nq" );
true
gap> ## SetInfoLevel( InfoNQ, 1 );
gap> ##
gap> ## setup calculation
gap> ##
gap> et := ExpressionTrees( "a", "b", "x" );
[ a, b, x ]
gap> a := et[1];; b := et[2];; x := et[3];;
gap> 
gap> ##
gap> ## define the group for n = 2,3,4,5
gap> ##
gap> 
gap> rengel := LeftNormedComm( [a,x,x] );
Comm( a, x, x )
gap> G := rec( generators := et, relations := [rengel] );
rec( generators := [ a, b, x ], relations := [ Comm( a, x, x ) ] )
gap> ## The following is equivalent to:
gap> ## NilpotentQuotient( : input_string := NqStringExpTrees( G, [x] ) )
gap> H := NilpotentQuotient( G, [x] );
Pcp-group with orders [ 0, 0, 0 ]
gap> LeftNormedComm( [ H.2,H.1,H.1 ] );
id
gap> LeftNormedComm( [ H.1,H.2,H.2 ] );
id
</pre></div>

This shows that each right 2-Engel element in a finitely generated nilpotent group is a left 2-Engel element. Note that the group above is the largest nilpotent group generated by two elements, one of which is right 2-Engel. Every nilpotent group generated by an arbitrary element and a right 2-Engel element is a homomorphic image of the group \(H\).

<div class="example"><pre>
gap> rengel := LeftNormedComm( [a,x,x,x] );
Comm( a, x, x, x )
gap> G := rec( generators := et, relations := [rengel] );
rec( generators := [ a, b, x ], relations := [ Comm( a, x, x, x ) ] )
gap> H := NilpotentQuotient( G, [x] );
Pcp-group with orders [ 0, 0, 0, 0, 0, 4, 2, 2 ]
gap> LeftNormedComm( [ H.1,H.2,H.2,H.2 ] );
id
gap> h := LeftNormedComm( [ H.2,H.1,H.1,H.1 ] );
g6^2*g7*g8
gap> Order( h );
4
</pre></div>

The element \(h\) has order \(4\). In a nilpotent group without \(2\)-torsion a right 3-Engel element is left 3-Engel.

<div class="example"><pre>
gap> rengel := LeftNormedComm( [a,x,x,x,x] );
Comm( a, x, x, x, x )
gap> G := rec( generators := et, relations := [rengel] );
rec( generators := [ a, b, x ], relations := [ Comm( a, x, x, x, x ) ] )
gap> H := NilpotentQuotient( G, [x] );
Pcp-group with orders [ 0, 0, 0, 0, 0, 0, 0, 0, 2, 0, 12, 0, 5, 10, 2, 0, 30,
 5, 2, 5, 5, 5, 5 ]
gap> LeftNormedComm( [ H.1,H.2,H.2,H.2,H.2 ] );
id
gap> h := LeftNormedComm( [ H.2,H.1,H.1,H.1,H.1 ] );
g9*g10^2*g11^10*g12^5*g13^2*g14^8*g15*g16^6*g17^10*g18*g20^4*g21^4*g22^2*g23^2
gap> Order( h );
60
</pre></div>

The previous calculation shows that in a nilpotent group without \(2,3,5\)-torsion a right 4-Engel element is left 4-Engel.

<div class="example"><pre>
gap> rengel := LeftNormedComm( [a,x,x,x,x,x] );
Comm( a, x, x, x, x, x )
gap> G := rec( generators := et, relations := [rengel] );
rec( generators := [ a, b, x ], relations := [ Comm( a, x, x, x, x, x ) ] )
gap> H := NilpotentQuotient( G, [x], 9 );
Pcp-group with orders [ 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 6, 0, 30,
 0, 0, 30, 0, 3, 6, 0, 0, 10, 30, 0, 0, 0, 0, 30, 30, 0, 0, 3, 6, 5, 2, 0,
 2, 408, 2, 0, 0, 0, 10, 10, 30, 10, 0, 0, 0, 3, 3, 3, 2, 204, 6, 6, 0, 10,
 10, 10, 2, 2, 2, 0, 300, 0, 0, 18 ]
gap> LeftNormedComm( [ H.1,H.2,H.2,H.2,H.2,H.2 ] );
id
gap> h := LeftNormedComm( [ H.2,H.1,H.1,H.1,H.1,H.1 ] );;
gap> Order( h );
infinity
</pre></div>

Finally, we see that in a torsion-free group a right 5-Engel element need not be a left 5-Engel element.

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