how to change the rise time of step input in simulink

18 views (last 30 days)
Hello,
I want to change the rise time of the step input in simulink. I tried the transfer function 1/(s+1) but not satifying my requirement. Can someone suggest me some tricks. Thanks in advace.
Regards,
Swasthik
  2 Comments
Sam Chak
Sam Chak on 19 Sep 2022
Can you specify all the performance requirements?
What did you mean by "tried the transfer function"? What is that transfer function for? For Plant, Actuator, or Compensator, or Prefilter? If possible, please the Plant transfer function.
Swasthik Baje Shankarakrishna Bhat
Hi sam,
i just need a step input with variable rise time. Something like this,
Thanks and regards,
Swasthik

Sign in to comment.

Accepted Answer

Sam Chak
Sam Chak on 21 Sep 2022
Edited: Sam Chak on 22 Sep 2022
Edit: I created a general one so that you can enter the desired ramp up parameters:
% u = min(1, max(0, "Linear Line function"));
ramp_start = 5;
ramp_end = 8;
t = linspace(0, 25, 251);
u = min(1, max(0, 1/(ramp_end - ramp_start)*(t - ramp_start)));
plot(t, u, 'linewidth', 1.5), grid on, ylim([-1 2])
If you have Fuzzy Logic Toolbox license, then you can use this linsmf() function. Here is a demo for a Double Integrator:
% Plant
Gp = tf(1, [1 0 0])
Gp = 1 --- s^2 Continuous-time transfer function.
% PID
kp = 0;
ki = 0;
kd = 0.8165;
Tf = kd;
Gc = pid(kp, ki, kd, Tf)
Gc = s Kp + Kd * -------- Tf*s+1 with Kp = 0, Kd = 0.817, Tf = 0.817 Continuous-time PDF controller in parallel form.
% Closed-loop system
Gcl = feedback(Gc*Gp, 1)
Gcl = s ------------------- s^3 + 1.225 s^2 + s Continuous-time transfer function.
% Saturated Ramp Response
t = linspace(0, 25, 251);
u = linsmf(t, [5 8]); % rise time is from 5 to 8 sec
lsim(Gcl, u, t), ylim([-1 2]), grid on
  3 Comments
Sam Chak
Sam Chak on 21 Sep 2022
I forgot to mention that although linsmf is user-friendly, it requires the Fuzzy Logic Toolbox.
If you don't have Toolbox, then you can try this alternative. It produces the same time-delayed saturated ramp signal.
% Syntax:
% u = min(1, max(0, "Linear Line function"));
t = linspace(0, 25, 251);
u = min(1, max(0, 1/3*(t - 5)));
plot(t, u, 'linewidth', 1.5), grid on, ylim([-1 2])
Swasthik Baje Shankarakrishna Bhat
Hi Sam,
Sorry to bother you again. Can we have a neative sloped step input with programmable fall time?
Thanks and regards,
Swasthik

Sign in to comment.

More Answers (3)

Timo Dietz
Timo Dietz on 20 Sep 2022
Edited: Timo Dietz on 20 Sep 2022
Hello,
what about using a single-sided ramp function: b * (1 - exp(-a*s)) / s^2
The gradient of the rising slope is '1', so after the time 'a' the amplitude 'a' is reached. The factor 'b' should finally allow you to control the steepness of the 'step'.
Does this meet your requirement?
  3 Comments
Timo Dietz
Timo Dietz on 21 Sep 2022
Edited: Timo Dietz on 21 Sep 2022
Hello,
I thought you are searching for a solution in the frequency/laplace domain since you mentioned the pT1.
So, with 'H_slope = b/a * (1 - exp(-a*s)) / s^2' you can control the slope (in time domain) via a and b:
syms s;
a = 1.5; % time after which amplitude is reached
b = 2; % amplitude
% frequency domain
H_slope = b/a * (1 - exp(-a*s)) / s^2;
% time domain
f_slope = ilaplace(H_slope);
fplot(f_slope, [0 2]);
grid on;

Sign in to comment.


Swasthik Baje Shankarakrishna Bhat
perfect, Thanks sam. Have a nice day
  1 Comment
Sam Chak
Sam Chak on 21 Sep 2022
It's great to hear that it works. If you find the solution is helpful, please consider accepting ✔ and voting 👍 the Answer. Thanks!

Sign in to comment.


Paul
Paul on 22 Sep 2022
A 1D Lookup Table seems like a good option.

Categories

Find more on General Applications in Help Center and File Exchange

Products


Release

R2022b

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!