Adaptive PID Controller For DC Motor Speed Control
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I am developing a program to control the speed of a DC motor using an adaptive PID controller. As I am just getting started with this type of control, I would greatly appreciate it if anyone could share code, algorithms for simulation, or practical implementation examples of such a controller for my reference
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Respuesta aceptada
hello
maybe this ?
clc
clearvars
% To control the speed of a DC motor using an adaptive PID controller in MATLAB, you can follow these steps. Below is an example implementation:
%
% Step 1: Define the DC Motor Model
% The DC motor can be modeled using its transfer function or state-space representation. For simplicity, we use a transfer function:
%
% ( J ): Moment of inertia
% ( b ): Damping coefficient
% ( K ): Motor constant
% ( R ): Resistance
% ( L ): Inductance
% Step 2: Implement Adaptive PID Controller
% An adaptive PID controller adjusts its parameters ((K_p), (K_i), (K_d)) dynamically based on system performance.
% Parameters of the DC motor
J = 0.01; % Moment of inertia
b = 0.1; % Damping coefficient
K = 0.01; % Motor constant
R = 1; % Resistance
L = 0.5; % Inductance
% Simulation parameters
dt = 0.01;
t = 0:dt:3; % Time vector
% Transfer function of the DC motor
num = K;
den = [(J*L) (J*R + L*b) (b*R + K^2)];
motor_tf = tf(num, den);
% discretization
[B,A] = c2dm(num,den,dt,'tustin');
% Initial PID parameters
Kpi = 100; Kii = 500; Kdi = 10;
%% init
desired_speed = 100; % Desired motor speed (rad/s)
actual_speed(1) = 0; % Initial speed
%% Adaptive PID control loop
% 1st sample
error(1) = desired_speed - 0 ; % Calculate error
error_int(1) = 0; % Calculate integral of error
error_der(1) = 0;% Calculate derivative of error
% PID controller output
u(1) = Kpi*error(1) + Kii*error_int(1) + Kdi*error_der(1);
% Simulate motor response
actual_speed(1) = B(1)*u(1);
% 2nd sample
error(2) = desired_speed - actual_speed(1); % Calculate error
error_int(2) = error_int(1) + 0.5*(error(2)+0)*dt; % Calculate integral of error
error_der(2) = (error(2)-error(1))/dt;% Calculate derivative of error
% PID controller output
u(2) = Kpi*error(2) + Kii*error_int(2) + Kdi*error_der(2);
% Simulate motor response
actual_speed(1) = B(1)*u(1);
actual_speed(2) = B(1)*u(2) + B(2)*u(1) + 0 - (A(2)*actual_speed(1) + 0 );
% 3rd sample and after
for i = 3:length(t)
error(i) = desired_speed - actual_speed(i-1); % Calculate error
error_int(i) = error_int(i-1) + 0.5*(error(i)+error(i-1))*dt; % Calculate integral of error
error_der(i) = (error(i)-error(i-1))/dt;% Calculate derivative of error
% Adaptive PID tuning
Kp = Kpi + 1*abs(error(i));
Ki = Kii + 1*abs(error(i));
Kd = Kdi + 0.01*abs(error(i));
% PID controller output
u(i) = Kp*error(i) + Ki*error_int(i) + Kd*error_der(i);
% Simulate motor response
actual_speed(i) = B(1)*u(i) + B(2)*u(i-1) + B(3)*u(i-2) - (A(2)*actual_speed(i-1) + A(3)*actual_speed(i-2));
end
%% Plot results
figure;
plot(t, actual_speed, 'b', 'LineWidth', 1.5); hold on;
yline(desired_speed, 'r--', 'LineWidth', 1.5);
xlabel('Time (s)');
ylabel('Motor Speed (rad/s)');
title('Adaptive PID Control of DC Motor');
legend('Actual Speed', 'Desired Speed');
grid on;
9 comentarios
same code , but a better adaptative PID regulator :
% To control the speed of a DC motor using an adaptive PID controller in MATLAB, you can follow these steps. Below is an example implementation:
%
% Step 1: Define the DC Motor Model
% The DC motor can be modeled using its transfer function or state-space representation. For simplicity, we use a transfer function:
%
% ( J ): Moment of inertia
% ( b ): Damping coefficient
% ( K ): Motor constant
% ( R ): Resistance
% ( L ): Inductance
% Step 2: Implement Adaptive PID Controller
% An adaptive PID controller adjusts its parameters ((K_p), (K_i), (K_d)) dynamically based on system performance.
% Parameters of the DC motor
J = 0.01; % Moment of inertia
b = 0.1; % Damping coefficient
K = 0.01; % Motor constant
R = 1; % Resistance
L = 0.5; % Inductance
% Simulation parameters
dt = 0.01;
t = 0:dt:1; % Time vector
% Transfer function of the DC motor
num = K;
den = [(J*L) (J*R + L*b) (b*R + K^2)];
motor_tf = tf(num, den);
% discretization
[B,A] = c2dm(num,den,dt,'tustin');
% Initial PID parameters
Kpi = 200; Kii = 200; Kdi = 10;
%% init
desired_speed = 100; % Desired motor speed (rad/s)
actual_speed(1) = 0; % Initial speed
%% Adaptive PID control loop
% 1st sample
error(1) = desired_speed - 0 ; % Calculate error
error_int(1) = 0;
error_der(1) = 0;
% PID controller output
u(1) = Kpi*error(1) + Kii*error_int(1) + Kdi*error_der(1);
% Simulate motor response
actual_speed(1) = B(1)*u(1);
% 2nd sample
error(2) = desired_speed - actual_speed(1); % Calculate error
error_int(2) = error_int(1) + 0.5*(error(2)+0)*dt;
error_der(2) = (error(2)-error(1))/dt;
% PID controller output
u(2) = Kpi*error(2) + Kii*error_int(2) + Kdi*error_der(2);
% Simulate motor response
actual_speed(1) = B(1)*u(1);
actual_speed(2) = B(1)*u(2) + B(2)*u(1) + 0 - (A(2)*actual_speed(1) + 0 );
% 3rd sample and after
for i = 3:length(t)
error(i) = desired_speed - actual_speed(i-1); % Calculate error
error_int(i) = error_int(i-1) + 0.5*(error(i)+error(i-1))*dt; % Calculate integral of error
error_der(i) = (error(i)-error(i-1))/dt;% Calculate derivative of error
% Adaptive PID tuning
Kp = Kpi + 1*abs(error(i));
Ki = Kii + 1*abs(error(i));
Kd = Kdi + 0.01*abs(error(i));
% PID controller output
u(i) = Kp*error(i) + Ki*error_int(i) + Kd*error_der(i);
% Simulate motor response
actual_speed(i) = B(1)*u(i) + B(2)*u(i-1) + B(3)*u(i-2) - (A(2)*actual_speed(i-1) + A(3)*actual_speed(i-2));
end
%% Plot results
figure;
plot(t, actual_speed, 'b', 'LineWidth', 1.5); hold on;
yline(desired_speed, 'r--', 'LineWidth', 1.5);
xlabel('Time (s)');
ylabel('Motor Speed (rad/s)');
title('Adaptive PID Control of DC Motor');
legend('Actual Speed', 'Desired Speed');
grid on;
Hi @Mathieu NOE
Thank you for sharing the code. While the proposed PID controller, which uses static equations to update the proportional, integral, and derivative gains based on the error state, can be considered a form of adaptive control, it may not fit the strictest definitions that involve dynamic learning or model identification. In fact, it is much closer to a nonlinear PID controller.
e = linspace(-1, 1, 201);
Kp = 1; % proportional gain
uP = Kp*e; % linear controller
uPn = Kp*abs(e).*e; % nonlinear controller
figure(1)
hold on
plot(e, uP)
plot(e, uPn)
grid on
hold off
xlabel({'Error, $e$'}, 'interpreter', 'latex')
ylabel({'Control action, $u_{P}$'}, 'interpreter', 'latex')
title({'Proportional Control action, $u_{P}$'}, 'interpreter', 'latex')
legend('Linear control', 'Nonlinear control', 'location', 'northwest')
figure(2)
hold on
plot(e, Kp*ones(1, numel(e)))
plot(e, Kp*abs(e))
grid on
hold off
ylim([-0.5, 1.5])
xlabel({'Error, $e$'}, 'interpreter', 'latex')
ylabel({'Control gain, $K_{p}$'}, 'interpreter', 'latex')
title({'Proportional Gain, $K_{p}$'}, 'interpreter', 'latex')
legend('Constant gain', 'Varying gain', 'location', 'north')
Mathieu NOE
el 2 de Oct. de 2025
sure
that was just a starting point... the code I provided ca, be further enhanced.
I think on point that usually poses problem to people is how to implement the recursive equation of the discretized plant.
all of this could be also done more efficiently with simulink IMHO
Sam Chak
el 2 de Oct. de 2025
Hi @Mathieu NOE
The OP can benefit from your code by learning how the P, I, D gains can be easily adjusted based on static equations.
Mathieu NOE
el 2 de Oct. de 2025
yeap , that was the purpose indeed !
Sam Chak
el 2 de Oct. de 2025
+1 👍
Mathieu NOE
el 2 de Oct. de 2025
tx !
Mnh
el 18 de Oct. de 2025
@Mathieu NOE Thank you for your assistance; it has been quite helpful for my project. I am currently encountering some issues with the motor control algorithm in the real-world implementation. As you can see, at a speed of 5 rad/s, the plant does not accurately track the model and exhibits significant instability. This behavior similarly occurs within the speed range of 5–25 rad/s. When I set the speed to 30 rad/s, the motor initially overshoots and then experiences a severe drop in speed (sometimes even reaching zero or negative values, resulting in a brief reversal). Could you please provide me with some suggestions?%% MRAS Adaptive PID (MIT rule) for DC Motor (MATLAB–Arduino Serial)
% Hardware:
% - Arduino UNO R3 + L298N + Encoder 334x34
% - The Arduino code transmits the motor speed (rad/s) via Serial communication
% - MATLAB performs the control computation and sends the PWM signal (0–255)
clc; clear; close all;
%% --- Serial Setup ---
port = "COM4"; baud = 115200;
s = serialport(port, baud);
configureTerminator(s, "LF");
flush(s);
disp('✅ Arduino Serial connection successful.');
pause(1);
%% --- MRAS-PID parameters ---
T = 0.05; % Control period (s)
setpoint = 5; % rad/s
am = 6.0; bm = 6.0; % Reference model
ym = 0;
gamma_p = 0.01; gamma_i = 0.003; gamma_d = 0.002;
norm_p = 0.08; norm_i = 0.02; norm_d = 0.05;
Kp = 1.8; Ki = 0.8; Kd = 0.05;
Kp_min=0.2; Kp_max=6.0; Ki_min=0; Ki_max=2.5; Kd_min=0; Kd_max=0.2;
I = 0; e_prev = 0; yp = 0; d_filt = 0;
deriv_alpha = 0.5; speed_alpha = 0.7;
PWM_MAX = 255; PWM_DEAD = 8; MAX_SPEED = 31;
%% --- Initialize plot ---
figure('Color','w');
subplot(2,1,1);
h1=animatedline('Color','r','LineWidth',1.5);
h2=animatedline('Color','b','LineWidth',1.5);
h3=animatedline('Color',[.7 .7 .7],'LineWidth',1,'LineStyle','--');
xlabel('Time (s)'); ylabel('Speed (rad/s)');
title('MRAS Adaptive PID Tracking');
legend({'Plant','Model','Ref'},'Location','best'); grid on;
subplot(2,1,2);
hKp=animatedline('Color','r'); hKi=animatedline('Color','b'); hKd=animatedline('Color','g');
xlabel('Time (s)'); ylabel('Gain'); grid on;
%% --- loop ---
disp('Starting control... Press Ctrl+C to stop');
t0 = tic;
while ishandle(h1)
t = toc(t0);
% --- Read speed from Arduino ---
if s.NumBytesAvailable > 0
line = readline(s);
yp_new = str2double(line);
if ~isnan(yp_new)
yp = speed_alpha*yp + (1-speed_alpha)*yp_new;
end
end
% --- Reference model ---
ym = ym + T*(-am*ym + bm*setpoint);
% --- error ---
e = setpoint - yp;
em = ym - yp;
% --- Basic PID ---
d_raw = (e - e_prev)/T;
d_filt = deriv_alpha*d_filt + (1-deriv_alpha)*d_raw;
I = I + e*T;
uP = Kp*e + Kd*d_filt;
u_tent = uP + Ki*I;
% Saturation and anti-windup
if (u_tent>=PWM_MAX && e>0) || (u_tent<=0 && e<0)
I = I*0.999;
end
u = uP + Ki*I;
pwmOut = min(max(u,0),PWM_MAX);
if pwmOut>0 && pwmOut<PWM_DEAD
pwmOut = PWM_DEAD;
end
% --- Send PWM to Arduino ---
writeline(s, string(round(pwmOut)));
% --- MRAS adaptation ---
freeze = ((pwmOut>=PWM_MAX && em>0) || (pwmOut<=0 && em<0));
if ~freeze
phi_p=e; phi_i=I; phi_d=d_filt;
Kp = Kp + gamma_p*em*phi_p/(1+norm_p*phi_p^2);
Ki = Ki + gamma_i*em*phi_i/(1+norm_i*phi_i^2);
Kd = Kd + gamma_d*em*phi_d/(1+norm_d*phi_d^2);
Kp = min(max(Kp,Kp_min),Kp_max);
Ki = min(max(Ki,Ki_min),Ki_max);
Kd = min(max(Kd,Kd_min),Kd_max);
end
% --- Real-time plotting ---
addpoints(h1,t,yp);
addpoints(h2,t,ym);
addpoints(h3,t,setpoint);
addpoints(hKp,t,Kp); addpoints(hKi,t,Ki); addpoints(hKd,t,Kd);
drawnow limitrate;
e_prev = e;
pause(T);
end
disp('⏹ STOP.'); clear s;
Mathieu NOE
el 20 de Oct. de 2025
hello
my first comments :
- have you identified your plant ? measured the step response (by creating a 0 to whatever PWM value step input)
- befor implementing advanced non linear PID maybe try with a simpler fixed paramaters PID and then improve by changing the law only one by one parameter.
- Once you have identified the plant model you can use the well known techniques for PID tuning (start with Ziegler Nichols basic tuning)
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