Cart Pendulum

The Cart Pendulum problem concerns a pendulum hinged to a mobile cart. The control objective is to transition the pendulum from a downward position to a stabilized, inverted state above the cart. In this formulation, the objective function is defined by a composite of least-squares terms.

The implementation here is taken from [1]. Its dynamics are given by a four-dimensional ODE model.

Mathematical formulation

${\displaystyle \begin{array}{lll}{\displaystyle \underset{u}{\min }}& & {\displaystyle \underset{0}{\overset{t_f}{\int }}}\alpha \cdot x(t{)}^2+\beta \cdot (\theta -\pi {)}^2+\gamma \cdot u(t{)}^{2}dt\\ \text{subject to}\\ \dot{x}(t)& =& \dot{x}(t),\\ \dot{\theta }(t)& =& \dot{\theta }(t),\\ \ddot{x}(t)& =& \frac{u+m\cdot g\cdot \sin (\theta )\cdot \cos (\theta )+m\cdot {\dot{\theta }}^2\cdot \sin (\theta )}{M+m\cdot (1-\cos (\theta {)}^2)},\\ \ddot{\theta }(t)& =& -g\cdot \sin (\theta )-\frac{u+m\cdot g\cdot \sin (\theta )\cdot \cos (\theta )+m\cdot {\ddot{\theta }}^2\cdot \sin (\theta )}{M+m\cdot (1-\cos (\theta {)}^2)}\cdot \cos (\theta ),\\ x(0)& =& 0,\\ \theta (0)& =& 0,\\ \dot{x}(0)& =& 0,\\ \dot{\theta }(0)& =& 0,\\ x(t)& \in & [-2,2]& \mathrm{\forall }t\in [0,t_f],\\ u(t)& \in & [-30,30]& \mathrm{\forall }t\in [0,t_f],\\ \end{array}}$

Reference Solutions

Here is one local solution to the above control problem.

• Reference solution plots
• 
  States and discretized control for a local optimum. The free end time ${\displaystyle t_f}$ was modeled using the additional control ${\displaystyle t}$.

Miscellaneous and Further Reading

This formulation and a detailed description can be found in [1].

References

[1] Multidisciplinary Optimal Control Library: https://openmdao.org/dymos/docs/latest/examples/moon_landing/moon_landing.html