mailr21399 - /branches/relax_disp/docs/latex/dispersion_models.tex


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Posted by edward on November 06, 2013 - 15:55:
Author: bugman
Date: Wed Nov  6 15:55:45 2013
New Revision: 21399

URL: http://svn.gna.org/viewcvs/relax?rev=21399&view=rev
Log:
Improvements for the supported dispersion model table in the manual.

Footnotes have been added to indicate which models are not implemented yet.


Modified:
    branches/relax_disp/docs/latex/dispersion_models.tex

Modified: branches/relax_disp/docs/latex/dispersion_models.tex
URL: 
http://svn.gna.org/viewcvs/relax/branches/relax_disp/docs/latex/dispersion_models.tex?rev=21399&r1=21398&r2=21399&view=diff
==============================================================================
--- branches/relax_disp/docs/latex/dispersion_models.tex (original)
+++ branches/relax_disp/docs/latex/dispersion_models.tex Wed Nov  6 15:55:45 
2013
@@ -22,8 +22,8 @@
 % Label.
 \label{table: dispersion models}
 
+% Experiment independent models.
 \\[-5pt]
-% Experiment independent models.
 Experiment independent \\
 \cline{1-1}
 \\[-5pt]
@@ -31,8 +31,8 @@
 R2eff                    & -        & -     & $\{\Rtwoeff, I_0, \cdots\}$    
                     & Variable relaxation time period   & - \\
 No Rex                   & Closed   & 0     & $\{\Rtwozero, \cdots\}$        
                     & -                                 & - \\
 
+% CPMG-type models.
 \\[-5pt]
-% CPMG-type models.
 CPMG-type \\
 \cline{1-1}
 \\[-5pt]
@@ -49,26 +49,26 @@
 NS CPMG 2-site star      & Numeric  & 2     & $\{\Rtwozero, \dots, \pA, \dw, 
\kex\}$              & $\pA > \pB$                       & - \\
 NS CPMG 2-site star full & Numeric  & 2     & $\{\RtwozeroA, \RtwozeroB, 
\dots, \pA, \dw, \kex\}$ & $\pA > \pB$                       & - \\
 
+% MQ CPMG-type models.
 \\[-5pt]
-% MQ CPMG-type models.
 MQ CPMG-type \\
 \cline{1-1}
 \\[-5pt]
 MQ CR72                  & Analytic & 2     & $\{\Rtwozero, \dots, \pA, \dw, 
\dwH, \kex\}$        & $\pA > \pB$                       & 
\citet{Korzhnev04a} \\
 
-\\[-5pt]
 % SQ, ZQ, DQ and MQ CPMG-type models.
+\clearpage
 MMQ CPMG-type \\
 \cline{1-1}
 \\[-5pt]
 MMQ 2-site               & Numeric  & 2     & $\{\Rtwozero, \dots, \pA, \dw, 
\dwH, \kex\}$        & $\pA > \pB$                       & \citet{Korzhnev05} 
\\
-MMQ 3-site (linear)      & Numeric  & 3     & $\{\Rtwozero, \dots, \pA, \pB, 
\dwAB, \dwAC,$       & $\pA > \pB$ and $\pA > \pC$       & \citet{Korzhnev05} 
\\
+MMQ 3-site (linear)\footnotemark[1]      & Numeric  & 3     & $\{\Rtwozero, 
\dots, \pA, \pB, \dwAB, \dwAC,$       & $\pA > \pB$ and $\pA > \pC$       & 
\citet{Korzhnev05} \\
                          &          &       & $\dwHAB, \dwHAC, \kexAB, 
\kexAC\}$ \\
-MMQ 3-site (branched)    & Numeric  & 3     & $\{\Rtwozero, \dots, \pA, \pB, 
\dwAB, \dwAC$        & $\pA > \pB$ and $\pA > \pC$       & \citet{Korzhnev05} 
\\
+MMQ 3-site (branched)\footnotemark[1]    & Numeric  & 3     & $\{\Rtwozero, 
\dots, \pA, \pB, \dwAB, \dwAC$        & $\pA > \pB$ and $\pA > \pC$       & 
\citet{Korzhnev05} \\
                          &          &       & $, \dwHAB, \dwHAC, \dwHBC, 
\kexAB, \kexAC, \kexBC\}$ \\
 
 % R1rho-type models.
-\clearpage
+\\[-5pt]
 $\Ronerho$-type \\
 \cline{1-1}
 \\[-5pt]
@@ -77,13 +77,15 @@
 DPL94                    & Analytic & 2     & $\{\Ronerhoprime, \dots, 
\Phiex, \kex\}$            & Fast exchange                     & 
\citet{Davis94} \\
 M61 skew                 & Analytic & 2     & $\{\Ronerhoprime, \dots, \pA, 
\dw, \kex\}$          & $\pA \gg \pB$, on-resonance       & \citet{Meiboom61} 
\\
 TP02                     & Analytic & 2     & $\{\Ronerhoprime, \dots, \pA, 
\dw, \kex\}$          & Not fast exchange                 & 
\citet{TrottPalmer02} \\
-TP04                     & Analytic & N     & $\{\Ronerhoprime, \dots, 
\pone, \dots, \pN, \aveomega, \konetwo, \dots\, \koneN\}$    & One site 
dominant        & \citet{TrottPalmer04} \\
-MP05                     & Analytic & 2     & $\{\Ronerhoprime, \dots, \pA, 
\dw, \kex\}$          & $\pA > \pB$                       & 
\citet{MiloushevPalmer05} \\
+TP04\footnotemark[1]     & Analytic & N     & $\{\Ronerhoprime, \dots, 
\pone, \dots, \pN, \aveomega, \konetwo, \dots\, \koneN\}$    & One site 
dominant        & \citet{TrottPalmer04} \\
+MP05\footnotemark[1]     & Analytic & 2     & $\{\Ronerhoprime, \dots, \pA, 
\dw, \kex\}$          & $\pA > \pB$                       & 
\citet{MiloushevPalmer05} \\
 NS R1rho 2-site          & Numeric  & 2     & $\{\Ronerhoprime, \dots, \pA, 
\dw, \kex\}$          & $\pA > \pB$                       & - \\
-NS R1rho 3-site (linear) & Numeric  & 3     & $\{\Ronerhoprime, \dots, \pA, 
\pB, \dwAB, \dwAC,$   & $\pA > \pB$ and $\pA > \pC$       & - \\
+NS R1rho 3-site (linear)\footnotemark[1] & Numeric  & 3     & 
$\{\Ronerhoprime, \dots, \pA, \pB, \dwAB, \dwAC,$   & $\pA > \pB$ and $\pA > 
\pC$       & - \\
                          &          &       & $\dwHAB, \dwHAC, \kexAB, 
\kexAC\}$ \\
-NS R1rho 3-site (branched) & Numeric & 3    & $\{\Ronerhoprime, \dots, \pA, 
\pB, \dwAB, \dwAC$    & $\pA > \pB$ and $\pA > \pC$       & - \\
+NS R1rho 3-site (branched)\footnotemark[1] & Numeric & 3    & 
$\{\Ronerhoprime, \dots, \pA, \pB, \dwAB, \dwAC$    & $\pA > \pB$ and $\pA > 
\pC$       & - \\
                          &          &       & $, \dwHAB, \dwHAC, \dwHBC, 
\kexAB, \kexAC, \kexBC\}$ \\
+
+\footnotetext[1]{Not implemented yet}
 
 \end{longtable}
 \end{small}

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