Difference between revisions of "Lotka Volterra fishing problem"
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== Reference Solutions == | == Reference Solutions == | ||
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+ | [[Image:lotkaindirektStates.png|States]] | ||
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+ | ''The two differential states and corresponding adjoint variables in the indirect approach''</div> | ||
== Source Code == | == Source Code == |
Revision as of 15:00, 29 June 2008
This problem was set up as a simple benchmark problem. Despite of its simple structure, the optimal solution contains a singular arcs, 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.
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 the mixed-integer optimal control problem is given by
Initial values and parameters
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);