Difference between revisions of "ApCoCoA-1:Oktaeder group"
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| − | === <div id="Oktaeder group">[[:ApCoCoA:Symbolic data#Oktaeder_group|Oktaeder | + | === <div id="Oktaeder group">[[:ApCoCoA:Symbolic data#Oktaeder_group|Oktaeder Group]]</div> === |
==== Description ==== | ==== Description ==== | ||
The Oktaeder group is a subgroup of the symmetric group. Like the Tetraeder group this group is generated | The Oktaeder group is a subgroup of the symmetric group. Like the Tetraeder group this group is generated | ||
Latest revision as of 20:59, 22 April 2014
Description
The Oktaeder group is a subgroup of the symmetric group. Like the Tetraeder group this group is generated only by rotations.
O = <a,b | a^2 = b^3 = (ab)^4 = 1>
Reference
Geometries and Transformations, Manuscript, Chapter 11: Finite symmetry groups, N.W. Johnson, 2011
Computation
/*Use the ApCoCoA package ncpoly.*/
Use ZZ/(2)[a,b];
NC.SetOrdering("LLEX");
Define CreateRelationsOktaeder()
Relations:=[];
// add the relation a^2 = 1
Append(Relations,[[a^2],[1]]);
// add the relation b^3 = 1
Append(Relations,[[b^3],[1]]);
// add the relation (ab)^4 = 1
Append(Relations,[[a,b,a,b,a,b,a,b],[1]]);
Return Relations;
EndDefine;
Relations:=CreateRelationsOktaeder();
Gb:=NC.GB(Relations);
Example in Symbolic Data Format
<FREEALGEBRA createdAt="2014-01-20" createdBy="strohmeier"> <vars>a,b</vars> <basis> <ncpoly>a*a-1</ncpoly> <ncpoly>b*b*b-1</ncpoly> <ncpoly>(a*b)^4-1</ncpoly> </basis> <Comment>Oktaeder_group</Comment> </FREEALGEBRA>
