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From: Emre S. Tasci <[email protected]>
To: cctbx mailing list <[email protected]>
Sent: Friday, June 3, 2011 3:49 AM
Subject: Re: [cctbxbb] Introducing arbitrary translations in symmetry operations

Dear Ralf,

Thank you very much for your answer. What we are actually trying to do is to refer to the tables of ITA (2006) 15.2.1.* where you have your space group & additional generators and voila! It's not the normalizers defined as a group but the group+normalizers defined as a new group.. 8)

Here is yet another question-- I might be missing something obvious here so you got my apologies beforehand if it proves that I do:

Take for instance SG #16, P222. I add the 3 translation operators
x+1/2,y,z
x,y+1/2,z
x,y,z+1/2
plus the inversion:
-x,-y,-z

then I get  SG #47, Pmmm with (2*b,2*c,2*a) -- but why not (2*a,2*b,2*c)? As I said, I'm highly suspecting that I'm missing something very very obvious but at this moment I'm baffled.

With my best regards,
Emre


On 06/02/2011 07:32 AM, Ralf W. Grosse-Kunstleve wrote:
>> But we couldn't find a way to introduce "x,y,z+t" while we are "expand_smx"ing the space group with these operators.
>
>
> The space_group class only supports finite groups (and only in settings
> that can be represented with integral rotation parts and rational
> translation parts).
> We have the class cctbx.sgtbx.search_symmetry, which multiplies the
> discrete origin shifts into the space group and keeps track
> of the continuous allowed origin shifts separately.
>
> It would need new code to determine a full description of affine
> normalizers. (Are they considered space groups?)


-- =-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-=-
Emre S. Tasci - http://www.emresururi.com
Fisica de la Materia Condensada
Facultad de Ciencia y Tecnologia
Universidad del Pais Vasco
Apartado 644
48080 Bilbao / Spain
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