Difference between revisions of "NS CPMG 2-site star full"

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The relaxation dispersion model for the numeric solution (NS) to the Bloch-McConnell equations for [[SQ CPMG-type data]] using complex conjugate matrices.  The model is labelled as '''NS CPMG 2-site star full''' in relax.
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The relaxation dispersion model for the numeric solution (NS) to the Bloch-McConnell equations for [[SQ CPMG-type data]] using complex conjugate matrices.  The model is labelled as '''NS CPMG 2-site star full''' in [[Relaxation dispersion citation for relax|relax]].
  
 
== Parameters ==
 
== Parameters ==
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== Links ==
 
== Links ==
  
The implementation of the NS CPMG 2-site star full model in relax can be seen in the:
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The [[Relaxation dispersion citation for relax|implementation of the NS CPMG 2-site star full model in relax]] can be seen in the:
 
* [http://www.nmr-relax.com/manual/full_NS_2_site_star_CPMG_model.html relax manual],  
 
* [http://www.nmr-relax.com/manual/full_NS_2_site_star_CPMG_model.html relax manual],  
 
* [http://www.nmr-relax.com/api/3.1/lib.dispersion.ns_cpmg_2site_star-module.html API documentation],
 
* [http://www.nmr-relax.com/api/3.1/lib.dispersion.ns_cpmg_2site_star-module.html API documentation],

Revision as of 11:09, 16 April 2014

The relaxation dispersion model for the numeric solution (NS) to the Bloch-McConnell equations for SQ CPMG-type data using complex conjugate matrices. The model is labelled as NS CPMG 2-site star full in relax.

Parameters

The NS CPMG 2-site star full model has the parameters {$R_{2A}^0$, $R_{2B}^0$, $...$, $p_A$, $\Delta\omega$, $k_{ex}$}.

References

N/A

Related models

The NS CPMG 2-site star model is a parametric restriction of this model.

Links

The implementation of the NS CPMG 2-site star full model in relax can be seen in the:

See also