Author: tlinnet Date: Wed May 7 15:54:32 2014 New Revision: 23038 URL: http://svn.gna.org/viewcvs/relax?rev=23038&view=rev Log: Added model B14 to the list of dispersion models. sr #3154: (https://gna.org/support/?3154) Implementation of Baldwin (2014) B14 model - 2-site exact solution model for all time scales. This follows the tutorial for adding relaxation dispersion models at: http://wiki.nmr-relax.com/Tutorial_for_adding_relaxation_dispersion_models_to_relax#The_relax_manual Modified: trunk/docs/latex/dispersion.tex trunk/docs/latex/dispersion_models.tex Modified: trunk/docs/latex/dispersion.tex URL: http://svn.gna.org/viewcvs/relax/trunk/docs/latex/dispersion.tex?rev=23038&r1=23037&r2=23038&view=diff ============================================================================== --- trunk/docs/latex/dispersion.tex (original) +++ trunk/docs/latex/dispersion.tex Wed May 7 15:54:32 2014 @@ -621,7 +621,7 @@ Final result, with identities to assist efficient matrix exponentiation optimised for numerical calculation. \begin{subequations} \begin{align} - \nu_{1c} = F_0 \cosh(E_0) - F_2 \cos(E_2) + \nu_{1c} = F_0 \cosh(E_0) - F_2 \cos(E_2) \\ \nu_{1s} & = F_0 \sinh(E_0) - F_2 \sin(E_2)i \\ \nu_{3} & = \sqrt({\nu_{1c}^2 - 1} \\ \nu_{4} & = F_1^b (-\alpha_- - h_3 ) + F_1^b (\dw - h_4) i \\ Modified: trunk/docs/latex/dispersion_models.tex URL: http://svn.gna.org/viewcvs/relax/trunk/docs/latex/dispersion_models.tex?rev=23038&r1=23037&r2=23038&view=diff ============================================================================== --- trunk/docs/latex/dispersion_models.tex (original) +++ trunk/docs/latex/dispersion_models.tex Wed May 7 15:54:32 2014 @@ -43,6 +43,8 @@ CR72 full & Analytic & 2 & $\{\RtwozeroA, \RtwozeroB, \dots, \pA, \dw, \kex\}$ & $\pA > \pB$, not very slow exchange & \citet{CarverRichards72} \\ IT99 & Analytic & 2 & $\{\Rtwozero, \dots, \pA, \dw, \kex\}$ & $\pA \gg \pB$ & \citet{IshimaTorchia99} \\ TSMFK01 & Analytic & 2 & $\{\RtwozeroA, \dots, \dw, \kAB\}$ & $\pA \gg \pB$ & \citet{Tollinger01} \\ +B14 & Analytic & 2 & $\{\Rtwozero, \dots, \pA, \dw, \kex\}$ & $\pA > \pB$, & \citet{Baldwin2014} \\ +B14 full & Analytic & 2 & $\{\RtwozeroA, \RtwozeroB, \dots, \pA, \dw, \kex\}$ & $\pA > \pB$, & \citet{Baldwin2014} \\ NS CPMG 2-site expanded & Numeric & 2 & $\{\Rtwozero, \dots, \pA, \dw, \kex\}$ & $\pA > \pB$ & \citet{Tollinger01} \\ NS CPMG 2-site 3D & Numeric & 2 & $\{\Rtwozero, \dots, \pA, \dw, \kex\}$ & $\pA > \pB$ & - \\ NS CPMG 2-site 3D full & Numeric & 2 & $\{\RtwozeroA, \RtwozeroB, \dots, \pA, \dw, \kex\}$ & $\pA > \pB$ & - \\