<Chapter Label="Example">
<Heading>A sample computation with &Circle;</Heading>
Here we give an example to give the reader an idea
what &Circle; is able to compute.
<P/>
It was proved in <Cite Key="Kazarin-Soules-2004" /> that
if <M>R</M> is a finite nilpotent two-generated algebra over a
field of characteristic <M>p>3</M> whose adjoint group has at
most three generators, then the dimension of <M>R</M>
is not greater than 9. Also, an example
of the 6-dimensional such algebra with the 3-generated adjoint
group was given there. We will construct the algebra from this
example and investigate it using &Circle;. First we create two
matrices that determine its generators:
Now we construct this algebra in characteristic five and
check its basic properties:
<Example>
<![CDATA[
gap> R := Algebra( GF(5), One(GF(5))*[x,y] );
<algebra over GF(5), with 2 generators>
gap> Dimension( R );
6
gap> Size( R );
15625
gap> RadicalOfAlgebra( R ) = R;
true
]]>
</Example>
Then we compute the adjoint group of <C>R</C>:
<Example>
<![CDATA[
gap> G := AdjointGroup( R );;
gap> Size(G);
15625
]]>
</Example>
Now we can find the generating set of minimal possible order for
the group <C>G</C>, and check that <C>G</C> it is 3-generated.
To do this, first we need to convert it to the isomorphic PcGroup:
<Example>
<![CDATA[
gap> f := IsomorphismPcGroup( G );;
gap> H := Image( f );
Group([ f1, f2, f3, f4, f5, f6 ])
gap> gens := MinimalGeneratingSet( H );;
gap> Length( gens );
3
]]>
</Example>
One can also use <C>UnderlyingRingElement(PreImage(f,x))</C> to
find the preimage of <C>x</C> in <C>G</C>.
<P/>
It appears that the adjoint group of the algebra from example
will be 3-generated in characteristic 3 as well:
<Example>
<![CDATA[
gap> R := Algebra( GF(3), One(GF(3))*[x,y] );
<algebra over GF(3), with 2 generators>
gap> G := AdjointGroup( R );;
gap> H := Image( IsomorphismPcGroup( G ) );
Group([ f1, f2, f3, f4, f5, f6 ])
gap> Length( MinimalGeneratingSet( H ) );
3
]]>
</Example>
But this is not the case in characteristic 2, where
the adjoint group is 4-generated:
<Example>
<![CDATA[
gap> R := Algebra( GF(2), One(GF(2))*[x,y] );
<algebra over GF(2), with 2 generators>
gap> G := AdjointGroup( R );;
gap> Size(G);
64
gap> H := Image( IsomorphismPcGroup( G ) );
Group([ f1, f2, f3, f4, f5, f6 ])
gap> Length( MinimalGeneratingSet( H ) );
4
]]>
</Example>
</Chapter>
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