Author: bugman Date: Thu Jul 31 14:32:47 2014 New Revision: 24873 URL: http://svn.gna.org/viewcvs/relax?rev=24873&view=rev Log: Added Andy Baldwin's 2013 R1rho relaxation dispersion model to the manual. The model has been added to the table of dispersion models and to the dispersion software comparison table of the dispersion chapter of the manual. The citation has also been added to the bibliography. Modified: trunk/docs/latex/bibliography.bib trunk/docs/latex/dispersion_models.tex Modified: trunk/docs/latex/bibliography.bib URL: http://svn.gna.org/viewcvs/relax/trunk/docs/latex/bibliography.bib?rev=24873&r1=24872&r2=24873&view=diff ============================================================================== --- trunk/docs/latex/bibliography.bib (original) +++ trunk/docs/latex/bibliography.bib Thu Jul 31 14:32:47 2014 @@ -367,6 +367,22 @@ medline-stat = {MEDLINE}, url = {http://eutils.ncbi.nlm.nih.gov/entrez/eutils/elink.fcgi?cmd=prlinks\&dbfrom=pubmed\&retmode=ref\&id=12054873}, year = 2002 +} + +@article{Baldwin2013, + Author = {Baldwin, A. J. and Kay, L. E.}, + Title = {An {R}1rho expression for a spin in chemical exchange between two sites with unequal transverse relaxation rates}, + Journal = jbnmr, + Year = {2013}, + Pages = {211-218}, + Volume = {55}, + Number = {2}, + Doi = {10.1007/s10858-012-9694-6}, + Url = {http://dx.doi.org/10.1007/s10858-012-9694-6}, + Publisher = {Springer Netherlands}, + Keywords = {Relaxation dispersion NMR; Invisible excited states; Protein conformational exchange; Spin-lock; Rotating frame relaxation; Differential transverse relaxation}, + Language = {English} + Issn = {0925-2738}, } @article{Baldwin2014, Modified: trunk/docs/latex/dispersion_models.tex URL: http://svn.gna.org/viewcvs/relax/trunk/docs/latex/dispersion_models.tex?rev=24873&r1=24872&r2=24873&view=diff ============================================================================== --- trunk/docs/latex/dispersion_models.tex (original) +++ trunk/docs/latex/dispersion_models.tex Thu Jul 31 14:32:47 2014 @@ -76,6 +76,8 @@ TAP03 & Analytic & 2 & $\{\Ronerhoprime, \dots, \pA, \dw, \kex\}$ & Weak condition of $\pA \gg \pB$ & \citet{Trott03} \\ TP04\footnotemark[1] & 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} \\ +B13 & Analytic & 2 & $\{\Rtwozero, \dots, \pA, \dw, \kex\}$ & $\pA > \pB$, & \citet{Baldwin2013} \\ +B13 full & Analytic & 2 & $\{\RtwozeroA, \RtwozeroB, \dots, \pA, \dw, \kex\}$ & $\pA > \pB$, & \citet{Baldwin2013} \\ NS R1rho 2-site & Numeric & 2 & $\{\Ronerhoprime, \dots, \pA, \dw, \kex\}$ & $\pA > \pB$ & - \\ NS R1rho 3-site linear & Numeric & 3 & $\{\Ronerhoprime, \dots, \pA, \pB, \dwAB, \dwBC,$ & $\pA > \pB$ and $\pA > \pC$ & - \\ & & & $\kexAB, \kexBC\}$ \\