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}