Matplotlib DPL94 R1rho R2eff
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Contents
About
The production to these figures relates to the Suppport Request:
sr #3124: Grace graphs production for R1rho analysis with R2_eff as function of Omega_eff
References
- Evenäs, J., Malmendal, A. & Akke, M. (2001). Dynamics of the transition between open and closed conformations in a calmodulin C-terminal domain mutant. Structure 9, 185–195 DOI
- Kempf, J.G. & Loria, J.P. (2004). Measurement of intermediate exchange phenomena. Methods Mol. Biol. 278, 185–231 DOI
- Palmer, A.G. & Massi, F. (2006). Characterization of the dynamics of biomacromolecules using rotating-frame spin relaxation NMR spectroscopy. Chem. Rev. 106, 1700–1719 DOI
- Palmer, A.G., Kroenke, C.D. & Loria, J.P. (2001). Nuclear magnetic resonance methods for quantifying microsecond-to-millisecond motions in biological macromolecules. Meth. Enzymol. 339 DOI
- Francesca Massi, Michael J. Grey, Arthur G. Palmer III* (2005) Microsecond timescale backbone conformational dynamics in ubiquitin studied with NMR R1ρ relaxation experiments, Protein science DOI
Figures
Ref [1], Figure 1.b. The bell-curves As function of angle calculation.
Ref [1], Figure 1.c. The wanted graph. No clear "name" for the calculated parameter.
Ref [2], Equation 27. Here the calculated value is noted as: $R_{eff}$. : Equation 27: $$ R_{eff} = R_{1\rho} / sin^2(\theta) - R_1 / tan^2(\theta) = R^{0}_2 + R_{ex} $$ Where $R^{0}_2$ refers to $R_{1\rho '}$ as seen at DPL94
Ref [3], Equation 20. Here the calculated value is noted as: $R_2$: $R_2 = R{1_\rho} / sin^2(\theta) - R_1 / tan^2(\theta)$ Figure 11+16, would be the reference.
Ref [4], Equation 43. R_eff = R1rho / sin^2(theta) - R_1 / tan^2(theta)
Ref [5], Material and Methods, page 740. Here the calculated value is noted as: R_2: R_2 = R^{0}_2 + R_ex. Figure 4 would be the wished graphs.
A little table of conversion then gives
Relax equation | Relax store | Articles
R1rho' spin.r2 R^{0}_2 or Bar{R}_2 Fitted pars Not stored R_ex R1rho spin.r2eff R1rho R_1 spin.ri_data['R1'] R_1 or Bar{R}_1
The parameter is called R_2 or R_eff in the articles.
Since reff is not used in relax, this could be used?
A description could be:
- The effective rate
- The effective transverse relaxation rate constant
- The effective relaxation rate constant.
Code
File: r1rhor2eff.py
### python imports
import sys
import os
from math import cos, sin
from numpy import array, float64
### plotting facility.
import matplotlib.pyplot as plt
# Ordered dictionary
import collections
### relax modules
# Import some tools to loop over the spins.
from pipe_control.mol_res_spin import return_spin, spin_loop
# Import method to calculate the R1_rho offset data
from specific_analyses.relax_disp.disp_data import calc_rotating_frame_params, generate_r20_key, loop_exp_frq, loop_exp_frq_offset, loop_point, return_param_key_from_data, return_spin_lock_nu1
from specific_analyses.relax_disp import optimisation
###############
# You have to provide a DPL94 results state file
res_folder = "resultsR1"
#res_folder = "results_clustering"
res_state = os.path.join(res_folder, "DPL94", "results")
spin_inte = ":52@N"
# Interpolate graph settings
#num_points=1000, extend=500.0
num_points=100
extend=5000.0
################
spin_inte_rep = spin_inte.replace('#', '_').replace(':', '_').replace('@', '_')
# Load the state
state.load(res_state, force=True)
# Show pipes
pipe.display()
pipe.current()
# Get the spin of interest and save it in cdp, to access it after execution of script.
cdp.myspin = return_spin(spin_inte)
# Calculate the offset data
theta_spin_dic, Domega_spin_dic, w_eff_spin_dic, dic_key_list = calc_rotating_frame_params(spin=cdp.myspin, spin_id=spin_inte, verbosity=1)
# Save the data in cdp to access it after execution of script.
cdp.myspin.theta_spin_dic = theta_spin_dic
cdp.myspin.w_eff_spin_dic = w_eff_spin_dic
cdp.myspin.dic_key_list = dic_key_list
############################
# First creacte back calculated R2eff data for interpolated plots.
############################
# Return the original structure for frq, offset
spin_lock_nu1 = return_spin_lock_nu1(ref_flag=False)
# Prepare list to hold new data
spin_lock_nu1_new = []
# Loop over the structures to generate data
for ei in range(len(spin_lock_nu1)):
# Add a new dimension.
spin_lock_nu1_new.append([])
# Then loop over the spectrometer frequencies.
for mi in range(len(spin_lock_nu1[ei])):
# Add a new dimension.
spin_lock_nu1_new[ei].append([])
# Finally the offsets.
for oi in range(len(spin_lock_nu1[ei][mi])):
# Add a new dimension.
spin_lock_nu1_new[ei][mi].append([])
# No data.
if not len(spin_lock_nu1[ei][mi][oi]):
continue
# Interpolate (adding the extended amount to the end).
for di in range(num_points):
point = (di + 1) * (max(spin_lock_nu1[ei][mi][oi])+extend) / num_points
spin_lock_nu1_new[ei][mi][oi].append(point)
# Intersert field 0
#spin_lock_nu1_new[ei][mi][oi][0] = 0.0
# Convert to a numpy array.
spin_lock_nu1_new[ei][mi][oi] = array(spin_lock_nu1_new[ei][mi][oi], float64)
# Then back calculate R2eff data for the interpolated points.
cdp.myspin.back_calc = optimisation.back_calc_r2eff(spin=cdp.myspin, spin_id=spin_inte, spin_lock_nu1=spin_lock_nu1_new)
# Calculate the offset data, interpolated
theta_spin_dic_inter, Domega_spin_dic_inter, w_eff_spin_dic_inter, dic_key_list_inter = calc_rotating_frame_params(spin=cdp.myspin, spin_id=spin_inte, fields = spin_lock_nu1_new, verbosity=0)
###### Store the data before plotting
# Create a dictionary to hold data
cdp.mydic = collections.OrderedDict()
# Loop over the data structures and save to dictionary
for exp_type, frq, offset, ei, mi, oi in loop_exp_frq_offset(return_indices=True):
r20_key = generate_r20_key(exp_type=exp_type, frq=frq)
# This is not used, but could be used to get Rex.
R1_rho_prime = cdp.myspin.r2[r20_key]
# Get R1
R1 = cdp.myspin.ri_data['R1']
R1_err = cdp.myspin.ri_data_err['R1']
# Add to dic
if exp_type not in cdp.mydic:
cdp.mydic[exp_type] = collections.OrderedDict()
if frq not in cdp.mydic[exp_type]:
cdp.mydic[exp_type][frq] = collections.OrderedDict()
if offset not in cdp.mydic[exp_type][frq]:
cdp.mydic[exp_type][frq][offset] = collections.OrderedDict()
# X val
cdp.mydic[exp_type][frq][offset]['point'] = []
cdp.mydic[exp_type][frq][offset]['point_inter'] = []
cdp.mydic[exp_type][frq][offset]['theta'] = []
cdp.mydic[exp_type][frq][offset]['theta_inter'] = []
cdp.mydic[exp_type][frq][offset]['w_eff'] = []
cdp.mydic[exp_type][frq][offset]['w_eff_inter'] = []
# Y val
cdp.mydic[exp_type][frq][offset]['R1_rho'] = []
cdp.mydic[exp_type][frq][offset]['R1_rho_err'] = []
cdp.mydic[exp_type][frq][offset]['R1_rho_bc'] = []
cdp.mydic[exp_type][frq][offset]['R1_rho_inter'] = []
# Y2 val
cdp.mydic[exp_type][frq][offset]['R1_rho_R2eff'] = []
cdp.mydic[exp_type][frq][offset]['R1_rho_R2eff_err'] = []
cdp.mydic[exp_type][frq][offset]['R1_rho_R2eff_bc'] = []
cdp.mydic[exp_type][frq][offset]['R1_rho_R2eff_inter'] = []
# Loop over the original dispersion points.
for point, di in loop_point(exp_type=exp_type, frq=frq, offset=offset, return_indices=True):
param_key = return_param_key_from_data(exp_type=exp_type, frq=frq, offset=offset, point=point)
# X val
cdp.mydic[exp_type][frq][offset]['point'].append(point)
theta = theta_spin_dic[param_key]
cdp.mydic[exp_type][frq][offset]['theta'].append(theta)
w_eff = w_eff_spin_dic[param_key]
cdp.mydic[exp_type][frq][offset]['w_eff'].append(w_eff)
# Average resonance spin_lock_offset
#print Domega_spin_dic[param_key]
# Y val
R1_rho = cdp.myspin.r2eff[param_key]
cdp.mydic[exp_type][frq][offset]['R1_rho'].append(R1_rho)
R1_rho_err = cdp.myspin.r2eff_err[param_key]
cdp.mydic[exp_type][frq][offset]['R1_rho_err'].append(R1_rho_err)
R1_rho_bc = cdp.myspin.r2eff_bc[param_key]
cdp.mydic[exp_type][frq][offset]['R1_rho_bc'].append(R1_rho_bc)
# Y2 val
# Calc R1_rho_R2eff
R1_rho_R2eff = (R1_rho - R1*cos(theta)*cos(theta)) / (sin(theta) * sin(theta))
cdp.mydic[exp_type][frq][offset]['R1_rho_R2eff'].append(R1_rho_R2eff)
R1_rho_R2eff_err = (R1_rho_err - R1_err*cos(theta)*cos(theta)) / (sin(theta) * sin(theta))
cdp.mydic[exp_type][frq][offset]['R1_rho_R2eff_err'].append(R1_rho_R2eff_err)
R1_rho_R2eff_bc = (R1_rho_bc - R1*cos(theta)*cos(theta)) / (sin(theta) * sin(theta))
cdp.mydic[exp_type][frq][offset]['R1_rho_R2eff_bc'].append(R1_rho_R2eff_bc)
## Loop over the new dispersion points.
for di in range(len(cdp.myspin.back_calc[ei][0][mi][oi])):
point = spin_lock_nu1_new[ei][mi][oi][di]
param_key = return_param_key_from_data(exp_type=exp_type, frq=frq, offset=offset, point=point)
# X val
cdp.mydic[exp_type][frq][offset]['point_inter'].append(point)
theta = theta_spin_dic_inter[param_key]
cdp.mydic[exp_type][frq][offset]['theta_inter'].append(theta)
w_eff = w_eff_spin_dic_inter[param_key]
cdp.mydic[exp_type][frq][offset]['w_eff_inter'].append(w_eff)
# Y val
R1_rho = cdp.myspin.back_calc[ei][0][mi][oi][di]
cdp.mydic[exp_type][frq][offset]['R1_rho_inter'].append(R1_rho)
# Y2 val
# Calc R1_rho_R2eff
R1_rho_R2eff = (R1_rho - R1*cos(theta)*cos(theta)) / (sin(theta) * sin(theta))
cdp.mydic[exp_type][frq][offset]['R1_rho_R2eff_inter'].append(R1_rho_R2eff)
#if oi == 0:
#print exp_type, frq, offset, point, theta, w_eff
####### PLOT ####
## Define labels for plotting
filesave_R1_rho_R2eff = 'R1_rho_R2eff'
filesave_R1_rho = 'R1_rho'
# For writing math in matplotlib, see
# http://matplotlib.org/1.3.1/users/mathtext.html
ylabel_R1_rho = r'R$_{1\rho}$ [rad s$^{-1}$]'
ylabel_R1_rho_R2eff = r'R$_{1\rho, R_{2,eff}}$ [rad s$^{-1}$]'
xlabel_theta = 'Rotating frame tilt angle [rad]'
xlabel_w_eff = r'Effective field in rotating frame [rad s$^{-1}$]'
xlabel_lock = 'Spin-lock field strength [Hz]'
# Set image inches size
img_inch_x = 12
img_inch_y = img_inch_x / 1.6
legend_size = 6
# Plot values in dic
for exptype, frq_dic in cdp.mydic.items():
for frq, offset_dic in frq_dic.items():
for offset, val_dics in offset_dic.items():
# General plot label
graphlabel = "%3.1f_%3.3f_meas"%(frq/1E6, offset)
graphlabel_bc = "%3.1f_%3.3f_bc"%(frq/1E6, offset)
graphlabel_inter = "%3.1f_%3.3f_inter"%(frq/1E6, offset)
# Plot 1: R1_rho as function of theta.
plt.figure(1)
line, = plt.plot(val_dics['theta_inter'], val_dics['R1_rho_inter'], '-', label=graphlabel_inter)
plt.errorbar(val_dics['theta'], val_dics['R1_rho'], yerr=val_dics['R1_rho_err'], fmt='o', label=graphlabel, color=line.get_color())
plt.plot(val_dics['theta'], val_dics['R1_rho_bc'], 'D', label=graphlabel_bc, color=line.get_color())
# Plot 2: R1_rho_R2eff as function of w_eff
plt.figure(2)
w_eff2_inter = [x*x for x in val_dics['w_eff_inter']]
w_eff2 = [x*x for x in val_dics['w_eff']]
#line, = plt.plot(w_eff2_inter, val_dics['R1_rho_R2eff_inter'], '-', label=graphlabel_inter)
#plt.errorbar(w_eff2, val_dics['R1_rho_R2eff'], yerr=val_dics['R1_rho_R2eff_err'], fmt='o', label=graphlabel, color=line.get_color())
#plt.plot(w_eff2, val_dics['R1_rho_R2eff_bc'], 'D', label=graphlabel_bc, color=line.get_color())
line, = plt.plot(val_dics['w_eff_inter'], val_dics['R1_rho_R2eff_inter'], '-', label=graphlabel_inter)
plt.errorbar(val_dics['w_eff'], val_dics['R1_rho_R2eff'], yerr=val_dics['R1_rho_R2eff_err'], fmt='o', label=graphlabel, color=line.get_color())
plt.plot(val_dics['w_eff'], val_dics['R1_rho_R2eff_bc'], 'D', label=graphlabel_bc, color=line.get_color())
# Plot 3: R1_rho as function of as function of disp_point, the Spin-lock field strength
plt.figure(3)
line, = plt.plot(val_dics['point_inter'], val_dics['R1_rho_inter'], '-', label=graphlabel_inter)
plt.errorbar(val_dics['point'], val_dics['R1_rho'], yerr=val_dics['R1_rho_err'], fmt='o', label=graphlabel, color=line.get_color())
plt.plot(val_dics['point'], val_dics['R1_rho_bc'], 'D', label=graphlabel_bc, color=line.get_color())
# Define settings for each graph
# Plot 1: R1_rho as function of theta.
fig1 = plt.figure(1)
plt.xlabel(xlabel_theta)
plt.ylabel(ylabel_R1_rho)
plt.legend(loc='best', prop={'size':legend_size})
plt.grid(True)
plt.ylim([0,16])
plt.title("%s \n %s as function of %s"%(spin_inte, ylabel_R1_rho, xlabel_theta))
fig1.set_size_inches(img_inch_x, img_inch_y)
plt.savefig("matplotlib_%s_%s_theta_sep.png"%(spin_inte_rep, filesave_R1_rho) )
## Plot 2: R1_rho_R2eff as function of w_eff
fig2 = plt.figure(2)
plt.xlabel(xlabel_w_eff)
plt.ylabel(ylabel_R1_rho_R2eff)
plt.legend(loc='best', prop={'size':legend_size})
plt.grid(True)
plt.ylim([0,16])
#plt.xlim([0,20000*20000])
plt.xlim([0,20000])
plt.title("%s \n %s as function of %s"%(spin_inte, ylabel_R1_rho_R2eff, xlabel_w_eff))
fig2.set_size_inches(img_inch_x, img_inch_y)
plt.savefig("matplotlib_%s_%s_w_eff.png"%(spin_inte_rep, filesave_R1_rho_R2eff) )
## Plot 3: R1_rho as function of as function of disp_point, the Spin-lock field strength
fig3 = plt.figure(3)
plt.xlabel(xlabel_lock)
plt.ylabel(ylabel_R1_rho)
plt.legend(loc='best', prop={'size':legend_size})
plt.grid(True)
plt.ylim([0,16])
plt.title("%s \n %s as function of %s"%(spin_inte, ylabel_R1_rho, xlabel_lock))
fig3.set_size_inches(img_inch_x, img_inch_y)
plt.savefig("matplotlib_%s_%s_disp.png"%(spin_inte_rep, filesave_R1_rho_R2eff) )
plt.show()
To run
relax -p r1rhor2eff.py
