% We check results of calculations via full solver vs the case of strong E1 % and E3. This two field create steady state coherences and populations which % we treat as constant (along z and t) during propagation. We keep track only of coherences % created by week fields E2 and E4. % Code below checks result of two solvers. User shuold double check that % scripts are run with the same command line and internal dimensions are the % same. % Notice that all fields feel the propagation but E1 and E2 will look like time % independent in the perturbation approach %% Loading fields data files % let's load exact solver solutions fpDat = fopen('../Nlevels_no_dopler_with_z_4wm/Nlevels_no_dopler_with_z_mg0.dat', 'r', 'ieee-le'); if (fpDat < 0) disp('Cannot open binary data file: Nlevels_no_dopler_with_z_mg0.dat') return end z_1Len = fread(fpDat, 1, 'uint32'); z_Exact = zeros(1, z_1Len); z_Exact(:) = fread(fpDat, z_1Len, 'double'); t_1Len = fread(fpDat, 1, 'uint32'); t_Exact = zeros(1, t_1Len); t_Exact(:) = fread(fpDat, t_1Len, 'double'); I1_out_1Len = fread(fpDat, 1, 'uint32'); I1_Exact = fread(fpDat, [t_1Len, z_1Len], 'double'); I2_out_1Len = fread(fpDat, 1, 'uint32'); I2_Exact = fread(fpDat, [t_1Len, z_1Len], 'double'); I3_out_1Len = fread(fpDat, 1, 'uint32'); I3_Exact = fread(fpDat, [t_1Len, z_1Len], 'double'); I4_out_1Len = fread(fpDat, 1, 'uint32'); I4_Exact = fread(fpDat, [t_1Len, z_1Len], 'double'); fclose(fpDat); clear fpDat z_1Len t_1Len I1_out_1Len I2_out_1Len I3_out_1Len I4_out_1Len % let's load perturbative solver solutions fpDat = fopen('../Nlevels_no_dopler_with_z_4wm_with_perturbations/Nlevels_no_dopler_with_z_mg0.dat', 'r', 'ieee-le'); if (fpDat < 0) disp('Cannot open binary data file: Nlevels_no_dopler_with_z_mg0.dat') return end z_1Len = fread(fpDat, 1, 'uint32'); z_Perturbative = zeros(1, z_1Len); z_Perturbative(:) = fread(fpDat, z_1Len, 'double'); t_1Len = fread(fpDat, 1, 'uint32'); t_Perturbative = zeros(1, t_1Len); t_Perturbative(:) = fread(fpDat, t_1Len, 'double'); I1_out_1Len = fread(fpDat, 1, 'uint32'); I1_Perturbative = fread(fpDat, [t_1Len, z_1Len], 'double'); I2_out_1Len = fread(fpDat, 1, 'uint32'); I2_Perturbative = fread(fpDat, [t_1Len, z_1Len], 'double'); I3_out_1Len = fread(fpDat, 1, 'uint32'); I3_Perturbative = fread(fpDat, [t_1Len, z_1Len], 'double'); I4_out_1Len = fread(fpDat, 1, 'uint32'); I4_Perturbative = fread(fpDat, [t_1Len, z_1Len], 'double'); fclose(fpDat); clear fpDat z_1Len t_1Len I1_out_1Len I2_out_1Len I3_out_1Len I4_out_1Len %% extracting fields at the end of the cell I1_Exact_out=I1_Exact(:,end); I2_Exact_out=I2_Exact(:,end); I3_Exact_out=I3_Exact(:,end); I4_Exact_out=I4_Exact(:,end); I1_Perturbative_out=I1_Perturbative(:,end); I2_Perturbative_out=I2_Perturbative(:,end); I3_Perturbative_out=I3_Perturbative(:,end); I4_Perturbative_out=I4_Perturbative(:,end); %% time to uS t_Exact=t_Exact*1e6; t_Perturbative=t_Perturbative*1e6; %% comparison plot figure(1); subplot(2,2,1); plot(t_Exact, I1_Exact_out, '-k' , t_Perturbative, I1_Perturbative_out, '-r' ) legend('exact', 'perturbative'); xlabel('time (uS)'); title('I_1 vs time'); subplot(2,2,2); plot(t_Exact, I2_Exact_out, '-k' , t_Perturbative, I2_Perturbative_out, '-r' ) legend('exact', 'perturbative'); xlabel('time (uS)'); title('I_2 vs time'); subplot(2,2,3); plot(t_Exact, I3_Exact_out, '-k' , t_Perturbative, I3_Perturbative_out, '-r' ) legend('exact', 'perturbative'); xlabel('time (uS)'); title('I_3 vs time'); subplot(2,2,4); plot(t_Exact, I4_Exact_out, '-k' , t_Perturbative, I4_Perturbative_out, '-r' ) legend('exact', 'perturbative'); xlabel('time (uS)'); title('I_4 vs time'); print('-color','fields_after_the_cell.eps')