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.

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Mise à jour 24 nov. 2023

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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.

[3] https://www.researchgate.net/publication/281374146_An_Introduction_to_Control_Theory_Applications_with_Matlab

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 juillet 23, 2024.