LMIs in Control/Click here to continue/Observer synthesis/Full-order state Observer

LMIs in Control/Click here to continue/Observer synthesis/Full-order state Observer

The problem of constructing a simple full-order state observer directly follows from the result of Hurwitz detectability LMI's, Which essentially is the dual of Hurwitz stabilizability. If a feasible solution to the first LMI for Hurwitz detectability exist then using the results we can back out a full state observer ${\displaystyle L}$ such that ${\displaystyle A+LC}$ is Hurwitz stable.

${\displaystyle \begin{array}{cc}\dot{x}(t)& =Ax(t)+Bu(t),\\ y(t)& =Cx(t)+Du(t)\\ x(0)& =x_0\\ \end{array}}$

where ${\displaystyle x(t)\in {ℝ}^n}$, ${\displaystyle y(t)\in {ℝ}^m}$, ${\displaystyle u(t)\in {ℝ}^q}$, at any ${\displaystyle t\in ℝ}$.

• The matrices ${\displaystyle A,B,C,D}$ are system matrices of appropriate dimensions and are known.

The full-order state observer problem essential is finding a positive definite ${\displaystyle P}$ such that the following LMI conclusions hold.

1) The full-order state observer problem has a solution if and only if there exist a symmetric positive definite Matrix ${\displaystyle P}$ and a matrix ${\displaystyle W}$ that satisfy

• ${\displaystyle A^{T}P+PA+W^{T}C+C^{T}W<0.}$

Then the observer can be obtained as ${\displaystyle L=P^{-1}W}$
2) The full-state state observer can be found if and only if there is a symmetric positive definite Matrix ${\displaystyle P}$ that satisfies the below Matrix inequality

• ${\displaystyle A^{T}P+PA-C^{T}C<0}$
  

In this case the observer can be reconstructed as ${\displaystyle L=-\frac{1}{2}{P}^{-1}{C}^T}$. It can be seen that the second relation can be directly obtained by substituting ${\displaystyle W=-\frac{1}{2}{C}^T}$ in the first condition.

Hence, both the above LMI's result in a full-order observer ${\displaystyle L}$ such that ${\displaystyle A+LC}$ is Hurwitz stable.

A list of references documenting and validating the LMI.

• LMIs in Control Systems Analysis, Design and Applications - Duan and Yu
• LMI Methods in Optimal and Robust Control - A course on LMIs in Control by Matthew Peet.
• LMI Properties and Applications in Systems, Stability, and Control Theory - A List of LMIs by Ryan Caverly and James Forbes.
• LMIs in Systems and Control Theory - A downloadable book on LMIs by Stephen Boyd.

Template:BookCat