Difference between revisions of "Helical symmetry"

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where {{t|operator}} represents any symmetry operator. The syntax for helical operators is:
 
where {{t|operator}} represents any symmetry operator. The syntax for helical operators is:
   <tt>h [<phi>,<dz>,<repetitions[optional]>,<rotational symmetry[optional]>]}} </tt>
+
   <tt>h [<phi>,<dz>,<repetitions[optional]>,<rotational symmetry[optional]>] </tt>
  
 
Here:
 
Here:
* phi is the angular increment in degrees
+
* <tt>phi</tt> is the angular increment in degrees
* dz is the axial rise in pixels
+
* <tt>dz</tt> is the axial rise in pixels
* the number of [[#Number of repetitions | repetitions]] (defaults to the maximum definible for a given volume)
+
* the number of [[#Number of repetitions | repetitions]] (defaults to the maximum definible for a given volume).
* additional Cn rotation to account for n-start helices  
+
** Can be passed as 0 to force ''Dynamo'' to create a default value.
 +
* additional Cn rotation to account for n-start helices.
  
 +
Example:
 +
<tt> vh = dsym(v,'h[15.6,4.7]');</tt>
 +
<tt> vh = dsym(v,'h[15.6,4.7,5]');</tt>
 +
<tt> vh = dsym(v,'h[15.6,4.7,5,2]');</tt>
 +
<tt> vh = dsym(v,'h[15.6,4.7,0,8]');</tt>
  
 
== Using symmetrization in alignment projects==
 
== Using symmetrization in alignment projects==

Revision as of 13:35, 1 June 2016

Symmetrizing a particle

Helical operator syntax

Symmetrizing a helical particle can be done with the usual tool dsym:

 vh = dsym(v,<operator>);

where operator represents any symmetry operator. The syntax for helical operators is:

 h [<phi>,<dz>,<repetitions[optional]>,<rotational symmetry[optional]>] 

Here:

  • phi is the angular increment in degrees
  • dz is the axial rise in pixels
  • the number of repetitions (defaults to the maximum definible for a given volume).
    • Can be passed as 0 to force Dynamo to create a default value.
  • additional Cn rotation to account for n-start helices.

Example:

 vh = dsym(v,'h[15.6,4.7]');
 vh = dsym(v,'h[15.6,4.7,5]'); 
 vh = dsym(v,'h[15.6,4.7,5,2]');
 vh = dsym(v,'h[15.6,4.7,0,8]');

Using symmetrization in alignment projects

The simplest way is to input one operator with the syntax described #Helical operator syntax above in the Numerical settings area of the dcm GUI.

This allows to impose a given symmetrization. In order to estimate the symmetry, you will need to create a plugin.


Number of repetitions

Symmetrization of a volume is computed by applying the transformation (phi,dz) in both directions to the original volume a number of times (called repetitions) and then averaging the result. For instance, 17 repetitions imply 8 subsequent applications of (phi,dz) to the original volume and 8 application of -(phi,dz). Each time (phi,dz) is applied, the transformed volume will have a "bottom" of dz layers of pixels that are undefined: (they correspond to the theoretically part of the infinite helix below our volume). The averaging procedure will discard contributions of such pixels. As a result, the central area of the symmetrized volume will be representing contributions of more transformed volumes, attaining thus a higher SNR.

If the user does not specify a number of repetitions, Dynamo will take the maximal number of repetitions for the given volume. If the volume is of size N pixels and the operator carries an axial rise of dz pixels, the maximal number of translations along the z axis is floor(N/dz)