Fuller's initial value problem: Difference between revisions

This site describes a Fuller's problem variant with no terminal constraints and additional Mayer term for penalizing deviation from given reference values.

Mathematical formulation

For ${\displaystyle t\in [t_0,t_f]}$ almost everywhere the mixed-integer optimal control problem is given by

${\displaystyle \begin{array}{llc}{\displaystyle \underset{x,w}{\min }}& {\displaystyle \underset{0}{\overset{1}{\int }}}{x}_0^2& \mathrm{d}t+(x(t_f)-x_T{)}^2\\ \text{s.t.}& {\dot{x}}_0& =& x_1,\\ & {\dot{x}}_1& =& 1-2w,\\ & x(0)& =& x_S,\\ & w(t)& \in & \{0,1\}.\end{array}}$

Parameters

We use ${\displaystyle x_S=x_T=(0.01,0{)}^T}$.

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 ${\displaystyle n_t=6000,n_u=150}$ is ${\displaystyle 1.45412214e-05}$. The objective value of the binary controls obtained by Combinatorial Integral Approimation (CIA) is ${\displaystyle 2.40273813e-05}$.

• Reference solution plots
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  Optimal relaxed states determined by an direct approach with ampl_mintoc (Radau collocation) and ${\displaystyle n_t=6000,n_u=150}$.
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  Optimal relaxed controls.
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  Optimal differential states trajectories of binary controls determined by an direct approach (Radau collocation) with ampl_mintoc and ${\displaystyle n_t=6000,n_u=150}$. The relaxed controls were approximated by Combinatorial Integral Approximation.
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  Optimal binary controls.