Van der Pol Oscillator Simulink Model
Version 1.0.0 (14,8 ko) par
Lazaros Moysis
The Van der Pol Oscillator nonlinear model in Simulink.
This Simulink model represents the Van der Pol oscillator described by the following differential equation
x'' - m(1-x^2)x' + x = 0
where x=x(t) a function of time and m is a physical parameter.
One can easily observe that for m=0 the system becomes linear.
The user is advised to try different values for m and see the changes in the system behavior.
One can also change the initial values for x(0) and x'(0) and see if this changes the behavior of the system.
Notes: The refine factor has been changeg to 4 in order to produce a smoother simulation. Also do not forget to uncheck the "limit data points" option.
This is included in [1].
References:
[1] An introduction to Control Theory Applications Using Matlab, https://www.researchgate.net/publication/281374146_An_Introduction_to_Control_Theory_Applications_with_Matlab
[2] DIFFERENTIAL EQUATIONS,DYNAMICAL SYSTEMS, AND AN INTRODUCTION TO CHAOS, Hirsch, Smale, Devaney. Elsevier Academic Press.
Citation pour cette source
Lazaros Moysis (2024). Van der Pol Oscillator Simulink Model (https://www.mathworks.com/matlabcentral/fileexchange/155527-van-der-pol-oscillator-simulink-model), MATLAB Central File Exchange. Récupéré le .
Compatibilité avec les versions de MATLAB
Créé avec
R2023b
Compatible avec toutes les versions
Plateformes compatibles
Windows macOS LinuxTags
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Version | Publié le | Notes de version | |
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1.0.0 |