How to manually simulate linear system without lsim

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Valeriy
Valeriy el 27 de Abr. de 2024
Comentada: Valeriy el 28 de Abr. de 2024
I have a 3rd order continuous system of the following form identified with System Identification Toolbox:
y = Cx + Du + e
dx/dt = Ax + Bu + Ke
I can simulate it by using lsim as follows:
simulatedOutput = lsim(systemModel, inputVector, timeVector, initialStateVector)
Now I need to convert this model into code that uses only loops and simple matrix/vector arithmetic. I cannot use lsim, ODE, Runge-Kutta, or any other Matlab-specific solver or functions (I used only interp1 which is easy to convert into code).
I wrote a simple script that will read the same input file used to identify the model, but the output is completely wrong, and I cannot figure out why.
Fig. 1: output from lsim (expected)
Fig. 2: output from manual simulation (actual - code below)
The following is my attempt to simulate the identified system by using a Matlab script with only basic vector/matrix arithmetic and a loop:
% A weights (3x3 matrix)
A = [ ...
0.0356, -3.4131, -14.9525;
-1.0591, 85.8128, 334.3098;
1.5729, -95.1123, -175.5517;
];
% B weights (3x1 vector)
B = [ ...
-0.0019;
0.0403;
-0.0225;
];
% C weights (1x3 vector)
C = [ -5316.9, 24.87, 105.92 ];
% D weight (scalar)
D = 0;
% K weights (3x1 vector)
K = [ ...
-0.0025;
-0.0582;
0.0984;
];
% Initial state
x0 = [ ...
-0.0458;
0.0099;
-0.0139;
];
% Read input file
csv = readmatrix('https://raw.githubusercontent.com/01binary/systemid/main/input.csv');
% Select column vectors
time = csv(:,1);
measurement = csv(:,2);
input = csv(:,3);
% Simulate
x = x0;
timeStep = 0.02;
output = zeros(length(input), 1);
for i = 1:length(input)
t = time(1) + (i - 1) * timeStep;
u = interp1(time, input, t);
[y, dx] = systemModel(A, B, C, D, K, x, u, 0);
x = x + dx * timeStep;
output(i) = y;
end
% Plot against original measurements
plot(time, measurement, time, output);
function [y, dx] = systemModel(A, B, C, D, K, x, u, e)
% y = Cx + Du + e
y = ...
C * x + ... % Add contribution of state
D * u + ... % Add contribution of input
e; % Add disturbance
% dx/dt = Ax + Bu + Ke
dx = ...
A * x + ... % Add contribution of state
B * u + ... % Add contribution of input
e * K; % Add contribution of disturbance
end
I am trying to keep everything really simple and minimal... could someone spot what I am missing?
Thank you!

Respuesta aceptada

Paul
Paul el 27 de Abr. de 2024
Hi Valeriy,
As indicated, the system in question is a differential equation model of a continuous-time sytem.
This line of code
% x = systemState(x, u, 0, A, B, K) * timeStep;
should be
% x = x + systemState(x, u, 0, A, B, K) * timeStep;
because systemState resturns xdot.
But that correction won't match lsim. As the doc page states: "For continuous-time systems, lsim first discretizes the system using c2d, and then propagates the resulting discrete-time state-space equations. Unless you specify otherwise with the method input argument, lsim uses the first-order-hold discretization method when the input signal is smooth, and zero-order hold when the input signal is discontinuous, such as for pulses or square waves."
So if you want to exactly match lsim, you'll have to implement the c2d transformation and then propagate the resulting discrete-time equation.
  15 comentarios
Paul
Paul el 28 de Abr. de 2024
Read in the data and plot it
T = readtable('input.csv')
T = 423x3 table
time reading PWM ________ _______ ____ 0.019995 243 0 0.040017 243 0 0.060022 251 0 0.079997 244 0 0.10001 228 -111 0.12001 228 -111 0.13999 241 -111 0.16002 232 -111 0.18002 220 -111 0.20001 213 -111 0.22001 214 -159 0.24009 233 -159 0.26008 234 -159 0.28002 234 -159 0.30002 234 -159 0.32002 258 -207
figure
plot(T.time,T.PWM,T.time,T.reading),grid
legend('PWM (input)','reading (output)')
Create iddata object. We'll assume the samples are space at 0.02, though I think there is a sample or two towards the end of the data that has a corrupted sample time (or maybe a data point is missing)
data = iddata(T.reading,T.PWM,0.02);
Identify a third order, discrete-time model with the sampling period the same as the sampling period of the data.
sysd = n4sid(data,3);
sysd
sysd = Discrete-time identified state-space model: x(t+Ts) = A x(t) + B u(t) + K e(t) y(t) = C x(t) + D u(t) + e(t) A = x1 x2 x3 x1 0.9988 0.05193 -0.02261 x2 0.02222 -0.01976 0.7353 x3 0.0009856 -0.2093 -0.5957 B = u1 x1 -2.663e-06 x2 5.727e-05 x3 -0.0001872 C = x1 x2 x3 y1 -5317 24.87 105.9 D = u1 y1 0 K = y1 x1 -0.0001655 x2 0.001508 x3 6.209e-06 Sample time: 0.02 seconds Parameterization: FREE form (all coefficients in A, B, C free). Feedthrough: none Disturbance component: estimate Number of free coefficients: 18 Use "idssdata", "getpvec", "getcov" for parameters and their uncertainties. Status: Estimated using N4SID on time domain data "data". Fit to estimation data: 74.87% (prediction focus) FPE: 230.3, MSE: 217.6
To answer @Torsten's question, we see that the form of the model already has the 0.02 "built-in," i.e., the model equations don't include an explicit term of Ts.
The model is stable, even though we did not set the EnforceStability option to true (the default is false)
abs(eig(sysd.A))
ans = 3x1
0.9999 0.4078 0.4078
<mw-icon class=""></mw-icon>
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Identify a continuous-time model
sysc = n4sid(data,3,'Ts',0);
This model is also stable, with two poles that have a very fast time constant.
format short e
eig(sysc.A)
ans =
-3.1047e-03 + 0.0000e+00i -4.4850e+01 + 1.2140e+02i -4.4850e+01 - 1.2140e+02i
If we Euler discretize this model, we see that the poles of the discretized system are well outside the unit circle, so we'd expect an unstable result, which is exactly what was seen from using lsim with inputs spaced by 0.02 sec (lsim doesn't use Euler integration, but the idea is the same).
abs(eig(eye(3) + sysc.A*0.02))
ans = 3x1
9.9994e-01 2.4301e+00 2.4301e+00
<mw-icon class=""></mw-icon>
<mw-icon class=""></mw-icon>
Propagation equations for the discrete-time model
x = sysd.X0;
for ii = 1:numel(T.time)
yd(ii) = sysd.C*x;
x = sysd.A*x + sysd.B*T.PWM(ii);
end
Propagation equations for the continuous-time model
% x = sysc.X0;
% for ii = 1:numel(T.time)
% yc(ii) = sysc.C*x;
% x = x + 0.02*(sysc.A*x + sysc.B*T.PWM(ii));
% end
figure
plot(T.time-T.time(1),T.reading, ...
T.time-T.time(1),lsim(sysd,T.PWM,(0:numel(T.time)-1)*0.02,sysd.X0), ...
T.time-T.time(1),yd),grid %...
legend('reading','lsim','yd')
% T.time-T.time(1),lsim(sysc,T.PWM,(0:numel(T.time)-1)*0.02,sysc.X0), ...
% T.time-T.time(1),yc),grid
Valeriy
Valeriy el 28 de Abr. de 2024
Wow, what a cool analysis, I'm blown away. Thanks for providing this extra information for anyone interested in this thread.

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Más respuestas (1)

Sam Chak
Sam Chak el 27 de Abr. de 2024
Other than lsim, you have two options for solving the differential equations: you can use the built-in ODE solver or a custom numerical solver like Runge-Kutta 4. Below, you can find a comparison of results between the lsim command and the ode45 solver.
%% data extraction
csv = readmatrix('input.csv');
time = csv(:,1);
measurement = csv(:,2);
input = csv(:,3);
%% data processing (lsim requires evenly-spaced input signal)
ta = time(1);
tb = time(end);
tspan = linspace(ta, tb, (tb-ta)/0.01 + 1);
u = interp1(time, input, tspan);
%% state-space system
A = [0.0356, -3.4131, -14.9525;
-1.0591, 85.8128, 334.3098;
1.5729, -95.1123, -175.5517];
B = [-0.0019;
0.0403;
-0.0225];
C = [-5316.9, 24.87, 105.92];
D = 0;
% x'= A·x + B·u
% y = C·x + D·u
sys = ss(A, B, C, D);
%% initial values
x0 = [-0.0458;
0.0099;
-0.0139];
Approach #1: Run simulation using 'lsim()' command
%% response of state-space system via lsim
lsim(sys, u, tspan, x0), grid on
Approach #2: Run simulation using 'ode45()' solver
%% call ode45 solver
options = odeset('Reltol', 1e-9, 'Abstol', 1e-6);
[t, x] = ode45(@(t, x) odesys(t, x, A, B, C, D, time, input), tspan, x0, options);
[~, y] = odesys(t', x', A, B, C, D, time, input);
plot(t, y), grid on, xlim([0 round(tb)])
xlabel('t'), ylabel('y(t)'), title('ode45 Simulation Results')
%% Identified State-Space System
function [dx, y] = odesys(t, x, A, B, C, D, time, input)
u = interp1(time, input, t);
y = C*x + D*u(:,1);
dx = A*x + B*u(:,1);
end
  3 comentarios
Sam Chak
Sam Chak el 28 de Abr. de 2024
I'm glad to hear that you have resolved the problem. Initially, I misunderstood your intention and thought you wanted to replicate the response of the continuous-time system generated by lsim. That's why I suggested using a custom-designed numerical algorithm, which doesn't necessarily have to be RK4.
Previously, I was unaware that this is a homework exercise aimed at testing a specific time integration method for solving the initial value problem of the identified state-space system. By the way, you mentioned that the Runge-Kutta method is not allowed, but it's worth noting that the standard Euler method is generally considered as a 1st-order Runge-Kutta method.
Valeriy
Valeriy el 28 de Abr. de 2024
@Sam Chak my situation is actually the opposite of a homework assignment. I need to get a Kalman filter working to track the position of a robot arm for my drumming robot, but I never studied Calculus or Differential Equations and don't have any engineering background.
I decided to write an article about the Kalman filter as I'm learning about it, because presenting or teaching about a topic forces me to understand it at a great level of depth than simply getting it working and moving on.
If math & engineering are something you feel excited about, I would appreciate feedback. I am writing the article on a branch in the repository of my blog:
(I haven't incorporated new insights I learned from this thread yet, still testing)

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