Bang-bang approximation of a traveling wave
| Bang-bang approximation of a traveling wave | |
|---|---|
| State dimension: | 2 |
| Differential states: | 1 |
| Discrete control functions: | 1 |
| Path constraints: | 2 |
The following problem is an academic example of a PDE constrained optimal control problem with integer control constraints
and was introduced in [Hante2009]Address: Berlin, Heidelberg
Author: Hante, Falk M.; Leugering, G\"unter
Booktitle: HSCC '09: Proceedings of the 12th International Conference on Hybrid Systems: Computation and Control
Pages: 209--222
Publisher: Springer-Verlag
Title: Optimal Boundary Control of Convention-Reaction Transport Systems with Binary Control Functions
Year: 2009
.
The control task consists of choosing the boundary value of a transport equation from the extremal values of a traveling
wave such that the 
-distance between the traveling wave and the resulting flow is minimized.
Mathematical formulation
![\begin{array}{ll}
\displaystyle \min_{x, q} & \displaystyle \int_0^1\int_0^1 |x(t,s)-x_d(t,s)|^2\,ds\,dt + c \bigvee_0^1 q(t)\,dt \\[1.5ex]
\mbox{s.t.} & \displaystyle \frac{\partial}{\partial t}x(t,s)+\frac{\partial}{\partial s}x(t,s) = 0,\quad 0<s<1,~0<t<1\\[1.5ex]
& \displaystyle x(t,0) = q(t),\quad 0<t<1 \\
& \displaystyle x(0,s) = x_d(0,s),\quad 0<s<1 \\
& \displaystyle q(t) \in \{0,1\},\quad 0<t<1 \\
\end{array}](https://mintoc.de/images/math/9/5/a/95a039fa4651c9f229f07886c436bd8f.png)
where
is the traveling wave (oscillating between 0 and 1), 
is a (small) regularization parameter and
denotes the variation of 
over the interval ![[0,1]](https://mintoc.de/images/math/c/c/f/ccfcd347d0bf65dc77afe01a3306a96b.png)
.
Thereby, the solution of the transport equation has to be understood in the usual weak sense defined by the
characteristic equations.
Systems biology
Reference solution
For 
the best known solution is given by
![q^*(t)=\chi_{[0,0.2]}(t)+\chi_{[0.4,0.6]}(t)+\chi_{[0.8,1]}(t),\quad 0\leq t\leq 1](https://mintoc.de/images/math/a/5/d/a5de6b3b4df43206bf46ceaca874dea2.png)
where ![\chi_{[a,b]}(t)](https://mintoc.de/images/math/6/4/2/642109745edab961ba1c260274c7ea98.png)
denotes the indicator function of the interval ![[a,b]](https://mintoc.de/images/math/2/c/3/2c3d331bc98b44e71cb2aae9edadca7e.png)
.
- Obtained solution plots
Solution
obtained using a projected gradient method based on switching time sensitivities.
Corresponding plots of the differential states (blue) and the wave (red) at
.
References
| [Hante2009] | Hante, Falk M.; Leugering, G\"unter (2009): Optimal Boundary Control of Convention-Reaction Transport Systems with Binary Control Functions. Springer-Verlag, HSCC '09: Proceedings of the 12th International Conference on Hybrid Systems: Computation and Control | |
