Difference between revisions of "ApCoCoA-1:GroupsToCheck"

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   My question is, do I have to implement the last equation with b^{3} instead of b^{-1} or should
 
   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)?
 
   I use 4 generators (a invers to c, b invers to d)?
   Comment: The implementation in the page is already enough for this group. For your question, I would like to
+
   Comment: The implementation in the page is already enough for this group. For your question, I would like to suggest that we should try to add as few extra relations as possible.
  suggest that adding as few extra relations as possible.
 
 
von Dyck Group
 
von Dyck Group
 
   Checked: No
 
   Checked: No

Revision as of 09:01, 23 August 2013

Inserted Groups

Baumslag-Gersten Group

 Checked: Done
 Notes: --

Braid Group

 Checked: Done
 Notes:  --

Cyclic Group

 Checked: Done
 Notes:  --

Dicyclic Group

 Checked: Done
 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.
 Comment: The implementation in the page is correct.

Dihedral Group

 Checked: Done
 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)?
 Comment: The implementation in the page is already enough for this group. For your question, I would like to suggest that we should try to add as few extra relations as possible.

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.

Lamplighter Group

 Checked: No
 Notes: Since I cannot implement "for all n in Z" the user has to define a maximum n (= MEMORY.N). Until this boundary
 the group will be created.