Linear Quadratic Regulator

The Linear Quadratic Regulator problem is a one-dimensional toy ODE model which is especially suited for multiple shooting solvers. It aims to minimize a quadratic Lagrange term.

The optimal integer control functions exhibits a singular arc.

Mathematical formulation

${\displaystyle \begin{array}{lll}{\displaystyle \underset{x,w}{\min }}& & {\displaystyle \underset{0}{\overset{10}{\int }}}10\cdot (x(t)-3{)}^2+0.1\cdot u(t{)}^{2}dt\\ \text{subject to}\\ \dot{x}(t)& =& a\cdot x(t)+b\cdot u(t),\\ x(0)& =& 1\end{array}}$

Parameters

We choose ${\displaystyle a=-1}$ and ${\displaystyle b=1}$.

Reference Solutions

Here is one local solution to the above control problem.

• Reference solution plots
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  States and discretized control for a local optimum.

Miscellaneous and Further Reading

The problem description and further references can be found in the PhD thesis of Michael Ernst Geiger [1].

References

[1] "Adaptive Multiple Shooting for Boundary Value Problems and Constrained Parabolic Optimization Problems" by M. E. Geiger