Tangle script for the gravimeter

2020-09-30 17:16:20 +02:00 · 2020-09-30 17:16:20 +02:00 · 02f8add925
commit 02f8add925
parent 2affca0685
1 changed files with 492 additions and 0 deletions
--- a/gravimeter/script.m
+++ b/gravimeter/script.m
@ -0,0 +1,492 @@
+%% Clear Workspace and Close figures
+clear; close all; clc;
+
+%% Intialize Laplace variable
+s = zpk('s');
+
+addpath('gravimeter');
+
+% Simscape Model - Parameters
+
+open('gravimeter.slx')
+
+
+
+% Parameters
+
+l  = 0.5; % Length of the mass [m]
+la = 0.5; % Position of Act. [m]
+
+h  = 1.7; % Height of the mass [m]
+ha = 1.7; % Position of Act. [m]
+
+m = 400; % Mass [kg]
+I = 115; % Inertia [kg m^2]
+
+k = 15e3; % Actuator Stiffness [N/m]
+c = 0.03; % Actuator Damping [N/(m/s)]
+
+deq = 0.2; % Length of the actuators [m]
+
+g = 0; % Gravity [m/s2]
+
+% System Identification - Without Gravity
+
+%% Name of the Simulink File
+mdl = 'gravimeter';
+
+%% Input/Output definition
+clear io; io_i = 1;
+io(io_i) = linio([mdl, '/F1'], 1, 'openinput');  io_i = io_i + 1;
+io(io_i) = linio([mdl, '/F2'], 1, 'openinput');  io_i = io_i + 1;
+io(io_i) = linio([mdl, '/F3'], 1, 'openinput');  io_i = io_i + 1;
+io(io_i) = linio([mdl, '/Acc_side'], 1, 'openoutput'); io_i = io_i + 1;
+io(io_i) = linio([mdl, '/Acc_side'], 2, 'openoutput'); io_i = io_i + 1;
+io(io_i) = linio([mdl, '/Acc_top'], 1, 'openoutput'); io_i = io_i + 1;
+io(io_i) = linio([mdl, '/Acc_top'], 2, 'openoutput'); io_i = io_i + 1;
+
+G = linearize(mdl, io);
+G.InputName  = {'F1', 'F2', 'F3'};
+G.OutputName = {'Ax1', 'Az1', 'Ax2', 'Az2'};
+
+pole(G)
+
+
+
+% #+RESULTS:
+% #+begin_example
+% pole(G)
+% ans =
+%       -0.000473481142385801 +      21.7596190728632i
+%       -0.000473481142385801 -      21.7596190728632i
+%       -7.49842879459177e-05 +       8.6593576906982i
+%       -7.49842879459177e-05 -       8.6593576906982i
+%       -5.15386867925747e-06 +      2.27025295182755i
+%       -5.15386867925747e-06 -      2.27025295182755i
+% #+end_example
+
+% The plant as 6 states as expected (2 translations + 1 rotation)
+
+size(G)
+
+
+
+% #+RESULTS:
+% : State-space model with 4 outputs, 3 inputs, and 6 states.
+
+
+freqs = logspace(-2, 2, 1000);
+
+figure;
+for in_i = 1:3
+    for out_i = 1:4
+        subplot(4, 3, 3*(out_i-1)+in_i);
+        plot(freqs, abs(squeeze(freqresp(G(out_i,in_i), freqs, 'Hz'))), '-');
+        set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
+    end
+end
+
+% System Identification - With Gravity
+
+g = 9.80665; % Gravity [m/s2]
+
+Gg = linearize(mdl, io);
+Gg.InputName  = {'F1', 'F2', 'F3'};
+Gg.OutputName = {'Ax1', 'Az1', 'Ax2', 'Az2'};
+
+
+
+% We can now see that the system is unstable due to gravity.
+
+pole(Gg)
+
+
+
+% #+RESULTS:
+% #+begin_example
+% pole(G)
+% ans =
+%           -10.9848275341276 +                     0i
+%            10.9838836405193 +                     0i
+%       -7.49855396089326e-05 +      8.65962885769976i
+%       -7.49855396089326e-05 -      8.65962885769976i
+%       -6.68819341967921e-06 +      0.83296042226902i
+%       -6.68819341967921e-06 -      0.83296042226902i
+% #+end_example
+
+
+freqs = logspace(-2, 2, 1000);
+
+figure;
+for in_i = 1:3
+    for out_i = 1:4
+        subplot(4, 3, 3*(out_i-1)+in_i);
+        hold on;
+        plot(freqs, abs(squeeze(freqresp(G(out_i,in_i), freqs, 'Hz'))), '-');
+        plot(freqs, abs(squeeze(freqresp(Gg(out_i,in_i), freqs, 'Hz'))), '-');
+        hold off;
+        set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
+    end
+end
+
+% Parameters
+% Control parameters
+
+g = 1e5;
+g_svd = 1e5;
+
+
+
+% System parameters
+
+w0 = 2*pi*.5; % MinusK BM1 tablle
+
+l  = 0.8; % [m]
+la = l;   % [m]
+
+h  = 1.7; % [m]
+ha = h;   % [m]
+
+m = 70; % [kg]
+
+k = 3e3; % [N/m]
+I = 10;  % [kg m^2]
+
+
+
+% Bode options.
+
+P = bodeoptions;
+P.FreqUnits = 'Hz';
+P.MagUnits = 'abs';
+P.MagScale = 'log';
+P.Grid = 'on';
+P.PhaseWrapping = 'on';
+P.Title.FontSize = 14;
+P.XLabel.FontSize = 14;
+P.YLabel.FontSize = 14;
+P.TickLabel.FontSize = 12;
+P.Xlim = [1e-1,1e2];
+P.MagLowerLimMode = 'manual';
+P.MagLowerLim= 1e-3;
+%P.PhaseVisible = 'off';
+
+
+
+% Frequency vector.
+
+w = 2*pi*logspace(-1,2,1000); % [rad/s]
+
+% generation of the state space model
+
+M = [m 0 0
+     0 m 0
+     0 0 I];
+
+%Jacobian of the bottom sensor
+Js1 = [1 0 h/2
+       0 1 -l/2];
+%Jacobian of the top sensor
+Js2 = [1 0 -h/2
+       0 1 0];
+
+%Jacobian of the actuators
+Ja = [1 0 ha/2 %Left horizontal actuator
+               %1 0 h/2 %Right horizontal actuator
+      0 1 -la/2 %Left vertical actuator
+      0 1 la/2]; %Right vertical actuator
+Jta = Ja';
+K = k*Jta*Ja;
+C = 0.06*k*Jta*Ja;
+
+E = [1 0 0
+     0 1 0
+     0 0 1]; %projecting ground motion in the directions of the legs
+
+AA = [zeros(3) eye(3)
+      -M\K -M\C];
+
+BB = [zeros(3,6)
+      M\Jta M\(k*Jta*E)];
+
+% BB = [zeros(3,3)
+%     M\Jta ];
+%
+% CC = [Ja zeros(3)];
+% DD = zeros(3,3);
+
+CC = [[Js1;Js2] zeros(4,3);
+      zeros(2,6)
+      (Js1+Js2)./2 zeros(2,3)
+      (Js1-Js2)./2 zeros(2,3)
+      (Js1-Js2)./(2*h) zeros(2,3)];
+
+DD = [zeros(4,6)
+      zeros(2,3) eye(2,3)
+      zeros(6,6)];
+
+system_dec = ss(AA,BB,CC,DD);
+
+
+
+% - Input = three actuators and three ground motions
+% - Output = the bottom sensor; the top sensor; the ground motion; the half sum; the half difference; the rotation
+
+
+size(system_dec)
+
+% Comparison with the Simscape Model
+
+freqs = logspace(-2, 2, 1000);
+
+figure;
+for in_i = 1:3
+    for out_i = 1:4
+        subplot(4, 3, 3*(out_i-1)+in_i);
+        hold on;
+        plot(freqs, abs(squeeze(freqresp(G(out_i,in_i), freqs, 'Hz'))), '-');
+        plot(freqs, abs(squeeze(freqresp(system_dec(out_i,in_i)*s^2, freqs, 'Hz'))), '-');
+        hold off;
+        set(gca, 'XScale', 'log'); set(gca, 'YScale', 'log');
+    end
+end
+
+% Analysis
+
+% figure
+% bode(system_dec,P);
+% return
+
+%% svd decomposition
+% system_dec_freq = freqresp(system_dec,w);
+% S = zeros(3,length(w));
+% for m = 1:length(w)
+%     S(:,m) = svd(system_dec_freq(1:4,1:3,m));
+% end
+% figure
+% loglog(w./(2*pi), S);hold on;
+% % loglog(w./(2*pi), abs(Val(1,:)),w./(2*pi), abs(Val(2,:)),w./(2*pi), abs(Val(3,:)));
+% xlabel('Frequency [Hz]');ylabel('Singular Value [-]');
+% legend('\sigma_1','\sigma_2','\sigma_3');%,'\sigma_4','\sigma_5','\sigma_6');
+% ylim([1e-8 1e-2]);
+%
+% %condition number
+% figure
+% loglog(w./(2*pi), S(1,:)./S(3,:));hold on;
+% % loglog(w./(2*pi), abs(Val(1,:)),w./(2*pi), abs(Val(2,:)),w./(2*pi), abs(Val(3,:)));
+% xlabel('Frequency [Hz]');ylabel('Condition number [-]');
+% % legend('\sigma_1','\sigma_2','\sigma_3');%,'\sigma_4','\sigma_5','\sigma_6');
+%
+% %performance indicator
+% system_dec_svd = freqresp(system_dec(1:4,1:3),2*pi*10);
+% [U,S,V] = svd(system_dec_svd);
+% H_svd_OL = -eye(3,4);%-[zpk(-2*pi*10,-2*pi*40,40/10) 0 0 0; 0 10*zpk(-2*pi*40,-2*pi*200,40/200) 0 0; 0 0 zpk(-2*pi*2,-2*pi*10,10/2) 0];% - eye(3,4);%
+% H_svd = pinv(V')*H_svd_OL*pinv(U);
+% % system_dec_control_svd_ = feedback(system_dec,g*pinv(V')*H*pinv(U));
+%
+% OL_dec = g_svd*H_svd*system_dec(1:4,1:3);
+% OL_freq = freqresp(OL_dec,w); % OL = G*H
+% CL_system = feedback(eye(3),-g_svd*H_svd*system_dec(1:4,1:3));
+% CL_freq = freqresp(CL_system,w); % CL = (1+G*H)^-1
+% % CL_system_2 = feedback(system_dec,H);
+% % CL_freq_2 = freqresp(CL_system_2,w); % CL = G/(1+G*H)
+% for i = 1:size(w,2)
+%     OL(:,i) = svd(OL_freq(:,:,i));
+%     CL (:,i) = svd(CL_freq(:,:,i));
+%     %CL2 (:,i) = svd(CL_freq_2(:,:,i));
+% end
+%
+% un = ones(1,length(w));
+% figure
+% loglog(w./(2*pi),OL(3,:)+1,'k',w./(2*pi),OL(3,:)-1,'b',w./(2*pi),1./CL(1,:),'r--',w./(2*pi),un,'k:');hold on;%
+% % loglog(w./(2*pi), 1./(CL(2,:)),w./(2*pi), 1./(CL(3,:)));
+% % semilogx(w./(2*pi), 1./(CL2(1,:)),w./(2*pi), 1./(CL2(2,:)),w./(2*pi), 1./(CL2(3,:)));
+% xlabel('Frequency [Hz]');ylabel('Singular Value [-]');
+% legend('GH \sigma_{inf} +1 ','GH \sigma_{inf} -1','S 1/\sigma_{sup}');%,'\lambda_1','\lambda_2','\lambda_3');
+%
+% figure
+% loglog(w./(2*pi),OL(1,:)+1,'k',w./(2*pi),OL(1,:)-1,'b',w./(2*pi),1./CL(3,:),'r--',w./(2*pi),un,'k:');hold on;%
+% % loglog(w./(2*pi), 1./(CL(2,:)),w./(2*pi), 1./(CL(3,:)));
+% % semilogx(w./(2*pi), 1./(CL2(1,:)),w./(2*pi), 1./(CL2(2,:)),w./(2*pi), 1./(CL2(3,:)));
+% xlabel('Frequency [Hz]');ylabel('Singular Value [-]');
+% legend('GH \sigma_{sup} +1 ','GH \sigma_{sup} -1','S 1/\sigma_{inf}');%,'\lambda_1','\lambda_2','\lambda_3');
+
+% Control Section
+
+system_dec_10Hz = freqresp(system_dec,2*pi*10);
+system_dec_0Hz = freqresp(system_dec,0);
+
+system_decReal_10Hz = pinv(align(system_dec_10Hz));
+[Ureal,Sreal,Vreal] = svd(system_decReal_10Hz(1:4,1:3));
+normalizationMatrixReal = abs(pinv(Ureal)*system_dec_0Hz(1:4,1:3)*pinv(Vreal'));
+
+[U,S,V] = svd(system_dec_10Hz(1:4,1:3));
+normalizationMatrix = abs(pinv(U)*system_dec_0Hz(1:4,1:3)*pinv(V'));
+
+H_dec = ([zpk(-2*pi*5,-2*pi*30,30/5) 0 0 0
+          0 zpk(-2*pi*4,-2*pi*20,20/4) 0 0
+          0 0 0 zpk(-2*pi,-2*pi*10,10)]);
+H_cen_OL = [zpk(-2*pi,-2*pi*10,10) 0 0; 0 zpk(-2*pi,-2*pi*10,10) 0;
+            0 0 zpk(-2*pi*5,-2*pi*30,30/5)];
+H_cen = pinv(Jta)*H_cen_OL*pinv([Js1; Js2]);
+% H_svd_OL = -[1/normalizationMatrix(1,1) 0 0 0
+%     0 1/normalizationMatrix(2,2) 0 0
+%     0 0 1/normalizationMatrix(3,3) 0];
+% H_svd_OL_real = -[1/normalizationMatrixReal(1,1) 0 0 0
+%     0 1/normalizationMatrixReal(2,2) 0 0
+%     0 0 1/normalizationMatrixReal(3,3) 0];
+H_svd_OL = -[1/normalizationMatrix(1,1)*zpk(-2*pi*10,-2*pi*60,60/10) 0 0 0
+             0 1/normalizationMatrix(2,2)*zpk(-2*pi*5,-2*pi*30,30/5) 0 0
+             0 0 1/normalizationMatrix(3,3)*zpk(-2*pi*2,-2*pi*10,10/2) 0];
+H_svd_OL_real = -[1/normalizationMatrixReal(1,1)*zpk(-2*pi*10,-2*pi*60,60/10) 0 0 0
+                  0 1/normalizationMatrixReal(2,2)*zpk(-2*pi*5,-2*pi*30,30/5) 0 0
+                  0 0 1/normalizationMatrixReal(3,3)*zpk(-2*pi*2,-2*pi*10,10/2) 0];
+% H_svd_OL_real = -[zpk(-2*pi*10,-2*pi*40,40/10) 0 0 0; 0 10*zpk(-2*pi*10,-2*pi*100,100/10) 0 0; 0 0 zpk(-2*pi*2,-2*pi*10,10/2) 0];%-eye(3,4);
+% H_svd_OL = -[zpk(-2*pi*10,-2*pi*40,40/10) 0 0 0; 0 zpk(-2*pi*4,-2*pi*20,4/20) 0 0; 0 0 zpk(-2*pi*2,-2*pi*10,10/2) 0];% - eye(3,4);%
+H_svd = pinv(V')*H_svd_OL*pinv(U);
+H_svd_real = pinv(Vreal')*H_svd_OL_real*pinv(Ureal);
+
+OL_dec = g*H_dec*system_dec(1:4,1:3);
+OL_cen = g*H_cen_OL*pinv([Js1; Js2])*system_dec(1:4,1:3)*pinv(Jta);
+OL_svd = 100*H_svd_OL*pinv(U)*system_dec(1:4,1:3)*pinv(V');
+OL_svd_real = 100*H_svd_OL_real*pinv(Ureal)*system_dec(1:4,1:3)*pinv(Vreal');
+
+% figure
+% bode(OL_dec,w,P);title('OL Decentralized');
+% figure
+% bode(OL_cen,w,P);title('OL Centralized');
+
+figure
+bode(g*system_dec(1:4,1:3),w,P);
+title('gain * Plant');
+
+figure
+bode(OL_svd,OL_svd_real,w,P);
+title('OL SVD');
+legend('SVD of Complex plant','SVD of real approximation of the complex plant')
+
+figure
+bode(system_dec(1:4,1:3),pinv(U)*system_dec(1:4,1:3)*pinv(V'),P);
+
+CL_dec = feedback(system_dec,g*H_dec,[1 2 3],[1 2 3 4]);
+CL_cen = feedback(system_dec,g*H_cen,[1 2 3],[1 2 3 4]);
+CL_svd = feedback(system_dec,100*H_svd,[1 2 3],[1 2 3 4]);
+CL_svd_real = feedback(system_dec,100*H_svd_real,[1 2 3],[1 2 3 4]);
+
+pzmap_testCL(system_dec,H_dec,g,[1 2 3],[1 2 3 4])
+title('Decentralized control');
+
+pzmap_testCL(system_dec,H_cen,g,[1 2 3],[1 2 3 4])
+title('Centralized control');
+
+pzmap_testCL(system_dec,H_svd,100,[1 2 3],[1 2 3 4])
+title('SVD control');
+
+pzmap_testCL(system_dec,H_svd_real,100,[1 2 3],[1 2 3 4])
+title('Real approximation SVD control');
+
+P.Ylim = [1e-8 1e-3];
+figure
+bodemag(system_dec(1:4,1:3),CL_dec(1:4,1:3),CL_cen(1:4,1:3),CL_svd(1:4,1:3),CL_svd_real(1:4,1:3),P);
+title('Motion/actuator')
+legend('Control OFF','Decentralized control','Centralized control','SVD control','SVD control real appr.');
+
+P.Ylim = [1e-5 1e1];
+figure
+bodemag(system_dec(1:4,4:6),CL_dec(1:4,4:6),CL_cen(1:4,4:6),CL_svd(1:4,4:6),CL_svd_real(1:4,4:6),P);
+title('Transmissibility');
+legend('Control OFF','Decentralized control','Centralized control','SVD control','SVD control real appr.');
+
+figure
+bodemag(system_dec([7 9],4:6),CL_dec([7 9],4:6),CL_cen([7 9],4:6),CL_svd([7 9],4:6),CL_svd_real([7 9],4:6),P);
+title('Transmissibility from half sum and half difference in the X direction');
+legend('Control OFF','Decentralized control','Centralized control','SVD control','SVD control real appr.');
+
+figure
+bodemag(system_dec([8 10],4:6),CL_dec([8 10],4:6),CL_cen([8 10],4:6),CL_svd([8 10],4:6),CL_svd_real([8 10],4:6),P);
+title('Transmissibility from half sum and half difference in the Z direction');
+legend('Control OFF','Decentralized control','Centralized control','SVD control','SVD control real appr.');
+
+% Greshgorin radius
+
+system_dec_freq = freqresp(system_dec,w);
+x1 = zeros(1,length(w));
+z1 = zeros(1,length(w));
+x2 = zeros(1,length(w));
+S1 = zeros(1,length(w));
+S2 = zeros(1,length(w));
+S3 = zeros(1,length(w));
+
+for t = 1:length(w)
+    x1(t) = (abs(system_dec_freq(1,2,t))+abs(system_dec_freq(1,3,t)))/abs(system_dec_freq(1,1,t));
+    z1(t) = (abs(system_dec_freq(2,1,t))+abs(system_dec_freq(2,3,t)))/abs(system_dec_freq(2,2,t));
+    x2(t) = (abs(system_dec_freq(3,1,t))+abs(system_dec_freq(3,2,t)))/abs(system_dec_freq(3,3,t));
+    system_svd = pinv(Ureal)*system_dec_freq(1:4,1:3,t)*pinv(Vreal');
+    S1(t) = (abs(system_svd(1,2))+abs(system_svd(1,3)))/abs(system_svd(1,1));
+    S2(t) = (abs(system_svd(2,1))+abs(system_svd(2,3)))/abs(system_svd(2,2));
+    S2(t) = (abs(system_svd(3,1))+abs(system_svd(3,2)))/abs(system_svd(3,3));
+end
+
+limit = 0.5*ones(1,length(w));
+
+figure
+loglog(w./(2*pi),x1,w./(2*pi),z1,w./(2*pi),x2,w./(2*pi),limit,'--');
+legend('x_1','z_1','x_2','Limit');
+xlabel('Frequency [Hz]');
+ylabel('Greshgorin radius [-]');
+
+figure
+loglog(w./(2*pi),S1,w./(2*pi),S2,w./(2*pi),S3,w./(2*pi),limit,'--');
+legend('S1','S2','S3','Limit');
+xlabel('Frequency [Hz]');
+ylabel('Greshgorin radius [-]');
+% set(gcf,'color','w')
+
+% Injecting ground motion in the system to have the output
+
+Fr = logspace(-2,3,1e3);
+w=2*pi*Fr*1i;
+%fit of the ground motion data in m/s^2/rtHz
+Fr_ground_x = [0.07 0.1 0.15 0.3 0.7 0.8 0.9 1.2 5 10];
+n_ground_x1 = [4e-7 4e-7 2e-6 1e-6 5e-7 5e-7 5e-7 1e-6 1e-5 3.5e-5];
+Fr_ground_v = [0.07 0.08 0.1 0.11 0.12 0.15 0.25 0.6 0.8 1 1.2 1.6 2 6 10];
+n_ground_v1 = [7e-7 7e-7 7e-7 1e-6 1.2e-6 1.5e-6 1e-6 9e-7 7e-7 7e-7 7e-7 1e-6 2e-6 1e-5 3e-5];
+
+n_ground_x = interp1(Fr_ground_x,n_ground_x1,Fr,'linear');
+n_ground_v = interp1(Fr_ground_v,n_ground_v1,Fr,'linear');
+% figure
+% loglog(Fr,abs(n_ground_v),Fr_ground_v,n_ground_v1,'*');
+% xlabel('Frequency [Hz]');ylabel('ASD [m/s^2 /rtHz]');
+% return
+
+%converting into PSD
+n_ground_x = (n_ground_x).^2;
+n_ground_v = (n_ground_v).^2;
+
+%Injecting ground motion in the system and getting the outputs
+system_dec_f = (freqresp(system_dec,abs(w)));
+PHI = zeros(size(Fr,2),12,12);
+for p = 1:size(Fr,2)
+    Sw=zeros(6,6);
+    Iact = zeros(3,3);
+    Sw(4,4) = n_ground_x(p);
+    Sw(5,5) = n_ground_v(p);
+    Sw(6,6) = n_ground_v(p);
+    Sw(1:3,1:3) = Iact;
+    PHI(p,:,:) = (system_dec_f(:,:,p))*Sw(:,:)*(system_dec_f(:,:,p))';
+end
+x1 = PHI(:,1,1);
+z1 = PHI(:,2,2);
+x2 = PHI(:,3,3);
+z2 = PHI(:,4,4);
+wx = PHI(:,5,5);
+wz = PHI(:,6,6);
+x12 = PHI(:,1,3);
+z12 = PHI(:,2,4);
+PHIwx = PHI(:,1,5);
+PHIwz = PHI(:,2,6);
+xsum = PHI(:,7,7);
+zsum = PHI(:,8,8);
+xdelta = PHI(:,9,9);
+zdelta = PHI(:,10,10);
+rot = PHI(:,11,11);