Goddart's rocket problem
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Revision as of 18:08, 22 February 2016 by FelixMueller (Talk | contribs) (→Mathematical formulation)
| Goddart's rocket problem | |
|---|---|
| State dimension: | 1 |
| Differential states: | 3 |
| Continuous control functions: | 1 |
| Path constraints: | 1 |
| Interior point equalities: | 4 |
In Goddart's rocket problem we model the ascent (vertical; restricted to 1 dimension) of a rocket. The aim is to reach a certain altitude with minimal fuel consumption. It is equivalent to maximize the mass at the final altitude.
Contents
[hide]Variables
The state variables 
describe the altitude(radius), speed and mass respectively.
The drag is given by
Mathematical formulation
![\begin{array}{llcll}
\displaystyle \min_{m,r,v,u,T} & -m(T)\\[1.5ex]
\mbox{s.t.} & \dot{r} & = & v, \\
& \dot{v} & = & -\frac{1}{r^2} + \frac{1}{m} (T_{max}u-D(r,v)) \\[1.5ex]
& \dot{m} & = & -b T_{max} u, \\
& u(t) &\in& [0,1] \\
& r(0) &=& r_0, \\
& v(0) &=& v_0, \\
& m(0) &=& m_0, \\
& r(T) &=& r_T, \\
& D(r,v)&\le& C \\
& T \, free
\end{array}](https://mintoc.de/images/math/1/5/1/1510d912f548b873254257dbd8da014e.png)
Parameters
Reference Solution
The following reference solution was generated using BOCOP. The optimal value of the objective function is -0.63389.
- Reference solution plots
Control u over time.
Position r over time.
Speed v over time.
Mass m over time.
Source Code
Model descriptions are available in:
References
The Problem can be found in the BOCOP User Guide.
