Difference between revisions of "Lotka Volterra fishing problem"
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{{Dimensions | {{Dimensions | ||
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|nre = 3 | |nre = 3 | ||
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| + | This problem was set up as a small-scale benchmark problem. The optimal solution contains a singular arc, making the Lotka Volterra fishing problem an ideal candidate for benchmarking of algorithms. | ||
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| + | In this problem the Lotka Volterra equations for a predator-prey system have been augmented by an additional linear term, relating to fishing by man. | ||
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| + | == Model dimensions and properties == | ||
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| + | The model has the following [[model dimensions|dimensions]]: | ||
It is thus an [http://en.wikipedia.org/wiki/Ordinary_differential_equation ODE] model with a single integer control function. The interior point equality conditions fix the initial values of the differential states. | It is thus an [http://en.wikipedia.org/wiki/Ordinary_differential_equation ODE] model with a single integer control function. The interior point equality conditions fix the initial values of the differential states. | ||
Revision as of 21:50, 6 July 2008
| Lotka Volterra fishing problem | |
|---|---|
| State dimension: | 1 |
| Differential states: | 3 |
| Algebraic states: | 0 |
| Continuous control functions: | 0 |
| Discrete control functions: | 1 |
| Continuous control values: | 0 |
| Discrete control values: | 0 |
| Path constraints: | 0 |
| Interior point inequalities: | 0 |
| Interior point equalities: | 3 |
This problem was set up as a small-scale benchmark problem. The optimal solution contains a singular arc, making the Lotka Volterra fishing problem an ideal candidate for benchmarking of algorithms.
In this problem the Lotka Volterra equations for a predator-prey system have been augmented by an additional linear term, relating to fishing by man.
Contents
Model dimensions and properties
The model has the following dimensions:
It is thus an ODE model with a single integer control function. The interior point equality conditions fix the initial values of the differential states.
Mathematical formulation
For ![t \in [t_0, t_f]](https://mintoc.de/images/math/5/5/8/55823791d9100bcb5461801aff4f6edd.png)
the mixed-integer optimal control problem is given by
![\begin{array}{llcl}
\displaystyle \min_{x, w} & x_2(t_f) \\[1.5ex]
\mbox{s.t.} & \dot{x}_0(t) & = & x_0(t) - x_0(t) x_1(t) - \; c_0 x_0(t) \; w(t), \\
& \dot{x}_1(t) & = & - x_1(t) + x_0(t) x_1(t) - \; c_1 x_1(t) \; w(t), \\
& \dot{x}_2(t) & = & (x_0(t) - 1)^2 + (x_1(t) - 1)^2, \\[1.5ex]
& x(0) &=& x_0, \\
& w(t) &\in& \{0, 1\}.
\end{array}](https://mintoc.de/images/math/e/9/3/e93178d5bd1af2eb33e434a69e6883c7.png)
Initial values and parameters
These fixed values are used within the model.
Reference Solutions
Source Code
double ref0 = 1, ref1 = 1; /* steady state with u == 0 */ rhs[0] = xd[0] - xd[0]*xd[1] - p[0]*u[0]*xd[0]; rhs[1] = - xd[1] + xd[0]*xd[1] - p[1]*u[0]*xd[1]; rhs[2] = (xd[0]-ref0)*(xd[0]-ref0) + (xd[1]-ref1)*(xd[1]-ref1);
Miscellaneous
The Lotka Volterra fishing problem was introduced by Sebastian Sager in a proceedings paper <bibref>Sager2006</bibref> and revisited in his PhD thesis <bibref>Sager2005</bibref>. These are also the references to look for more details.
References
<bibreferences/>
