Difference between revisions of "ApCoCoA-1:GroupsToCheck"

From ApCoCoAWiki
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Ordinary Tetrahedron Groups
 
Ordinary Tetrahedron Groups
 
   Checked: No
 
   Checked: No
   Notes: --
+
   Notes: I used the implicit invers elements: We know that x^{e_1} = 1, it follows that x^{e_1 - 1} is the invers, and so on.. 
 +
  Please check, if I'm right.

Revision as of 13:21, 19 August 2013

Inserted Groups

Baumslag-Gersten Group

 Checked: No
 Notes: --

Braid Group

 Checked: No
 Notes:  --

Cyclic Group

 Checked: No
 Notes:  --

Dicyclic Group

 Checked: No
 Notes:  I added two different implementations, one with explicit invers elements and one without. I think the
 second one is the right one. The computation of the first implementation results in a GB with size 2812, the
 second one with size 901.

Dihedral Group

 Checked: No
 Notes: It follows, that a^{-1} = a^{2n-1} and that b^{4} = 1 (second equation) --> b^{-1} = b^{3}
 My question is, do I have to implement the last equation with b^{3} instead of b^{-1} or should
 I use 4 generators (a invers to c, b invers to d)?

von Dyck Group

 Checked: No
 Notes: A useful reference is still missing

Free abelian Group

 Checked: No
 Notes: --

Free Group

 Checked: No
 Notes: --

Fibonacci Group

 Checked: No
 Notes: --

Heisenberg Group

 Checked: No
 Notes: The matrix in the description will be added as a picture, then it will look much better. At the moment we cannot
 upload pictures to the server, but I contacted Stefan, there will be a solution soon.

Higman Group

 Checked: No
 Notes: --

Ordinary Tetrahedron Groups

 Checked: No
 Notes: I used the implicit invers elements: We know that x^{e_1} = 1, it follows that x^{e_1 - 1} is the invers, and so on..   
 Please check, if I'm right.