Jump to content

LMIs in Control/Click here to continue/Controller synthesis/Multi-Criterion LQG

From Wikibooks, open books for an open world

LMIs in Control/Click here to continue/Controller synthesis/Multi-Criterion LQG

The Multi-Criterion Linear Quadratic Gaussian (LQG) linear matrix inequality will allow one to form an optimized controller, similar to that in an LQR framework, for a state space system with gaussian noise based on several different criterions defined in the Q and R matrices, that are optimized as a part of the arbitrary cost function. Just like traditional LQR, the cost matrices must be tuned in much a similar fashion as traditional gains in classical control. In the LQR and LQG framework however, the gains are more intuitive as each correlates directly to a state or an input.

The System

[edit | edit source]

The system is a linear time-invariant system, that can be represented in state space as shown below:

where represent the state vector, the measured output vector, and the output vector of interest, respectively, is the disturbance vector, and are the system matrices of appropriate dimension. To further define: is and is the state vector, is and is the state matrix, is and is the input matrix, is and is the exogenous input, is and are the output matrices, and and are and are the output and the output of interest, respectively.


and , and the system is controllable and observable.

The Data

[edit | edit source]

The matrices and the noise signals .

The Optimization Problem

[edit | edit source]

In the Linear Quadratic Gaussian (LQG) control problem, the goal is to minimize a quadratic cost function while the plant has random initial conditions and suffers white noise disturbance on the input and measurement.

There are multiple outputs of interest for this problem. They are defined by

For each of these outputs of interest, we associate a cost function:

Additionally, the matrices and must be found as the solutions to the following Riccati equations:

The optimization problem is to minimize over u subject to the measurability condition and the constraints . This optimization problem can be formulated as:

over , with:

The LMI: Multi-Criterion LQG

[edit | edit source]

over , subject to the following constraints:

Conclusion:

[edit | edit source]

The result of this LMI is the solution to the aforementioned Ricatti equations:

Implementation

[edit | edit source]

This implementation requires Yalmip and Sedumi.

https://github.com/rezajamesahmed/LMImatlabcode/blob/master/multicriterionquadraticproblems.m

[edit | edit source]
  1. Inverse Problem of Optimal Control
[edit | edit source]

Return to Main Page:

[edit | edit source]