Van der Pol Oscillator (binary variant)

This site describes a Van der Pol Oscillator variant with three binary controls instead of only one continuous control.

Mathematical formulation

The mixed-integer optimal control problem is given by

${\displaystyle \begin{array}{lll}\min {}_{x,y,w}& \underset{t_0}{\overset{t_f}{\int }}& (x(t{)}^2+y(t{)}^{2}dt\\ s.t.& \dot{x}& =y,\\ & \dot{y}& =\sum _{i=1}^3{c}_i{w}_i(1-x^2)y-x,\\ & x(0)& =1,\\ & y(0)& =0,\\ & 1& =\sum _{i=1}^3{w}_i(t),\\ & w_i(t)& \in \{0,1\},i=1\dots 3.\end{array}}$

Parameters

These fixed values are used within the model:

${\displaystyle [t_0,t_f]=[0,20],c_1=-1,c_2=0.75,c_3=-2.}$

Reference Solutions

If the problem is relaxed, i.e., we demand that ${\displaystyle w(t)}$ be in the continuous interval ${\displaystyle [0,1]}$ instead of the binary choice ${\displaystyle \{0,1\}}$, the optimal solution can be determined by means of direct optimal control.

The optimal objective value of the relaxed problem with ${\displaystyle n_t=6000,n_u=60}$ is ${\displaystyle 1.30167235}$. The objective value of the binary controls obtained by Combinatorial Integral Approimation (CIA) is ${\displaystyle 1.30273681}$.

• Reference solution plots
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  Optimal relaxed controls and states determined by an direct approach with ampl_mintoc (Radau collocation) and ${\displaystyle n_t=6000,n_u=60}$.
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  Optimal binary controls and states determined by an direct approach (Radau collocation) with ampl_mintoc and ${\displaystyle n_t=6000,n_u=60}$. The relaxed controls were approximated by Combinatorial Integral Approximation.