LMIs in Control/Stability Analysis/D-Stability

Consider ${\displaystyle A\in {ℝ}^{n\times n}}$. The matrix ${\displaystyle A}$ is ${\displaystyle 𝒟}$-stable if and only if there exists ${\displaystyle P\in {𝕊}^n}$, where ${\displaystyle P>0}$, such that

${\displaystyle [{\lambda }_{kl}P+{\varphi }_{kl}AP+{\varphi }_{lk}P{A}^T{]}_{1<k,l<m}<0}$,

or equivalent

${\displaystyle \mathrm{\Lambda }\otimes P+\mathrm{\Phi }\otimes (AP)+{\mathrm{\Phi }}^T\otimes (P{A}^T)<0}$,

where ${\displaystyle \otimes }$ is the Kroenecker product,

The eigenvalues of a ${\displaystyle 𝒟}$-stable matrix lie within the LMI region ${\displaystyle 𝒟}$, which is defined as

${\displaystyle 𝒟=\{z\in ℂ:f_D(z)<0\}}$, where

${\displaystyle f_D(z):=\mathrm{\Lambda }+z\mathrm{\Phi }+\overline{z}{\mathrm{\Phi }}^T=\{{\lambda }_{kl}+{\varphi }_{kl}z+{\varphi }_{lk}\overline{z}{\}}_{1\le k,l\le m}}$,

${\displaystyle \mathrm{\Lambda }\in {𝕊}^m}$, ${\displaystyle \mathrm{\Phi }\in {ℝ}^{m\times m}}$, and ${\displaystyle \overline{z}}$ is the complex conjugate of ${\displaystyle z}$.

Consider ${\displaystyle A\in {ℝ}^{n\times n}}$ and ${\displaystyle k\in {ℝ}_{>0}}$.

The matrix ${\displaystyle A}$ satisfies ${\displaystyle \lambda (A)\subset 𝒫(k)}$, where ${\displaystyle 𝒫(k):=\{\lambda \in ℂ:|Im(\lambda )|<k|Re(\lambda )|\}}$, if and only if there exist ${\displaystyle X\in {𝕊}^n}$ and ${\displaystyle ϵ\in {ℝ}_{>0}}$, where ${\displaystyle X>0}$, such that

${\displaystyle \left[\begin{array}{cc}k(AX+X{A}^T)& AX-X{A}^T\\ *& k(AX+X{A}^T)\end{array}\right]<0}$.

Equivalently, the matrix ${\displaystyle A}$ satisfies ${\displaystyle \lambda (A)\subset 𝒫(k)}$ if and only if there exist ${\displaystyle X\in {𝕊}^n}$ and ${\displaystyle ϵ\in {ℝ}_{>0}}$, and ${\displaystyle F\in {ℝ}^{n\times n}}$, where ${\displaystyle X>0}$, such that

${\displaystyle \left[\begin{array}{cccc}0& -kX& X& 0\\ *& 0& 0& -X\\ *& *& 0& -kX\\ *& *& *& 0\end{array}\right]+He\left\{\begin{array}{c}\left[\begin{array}{cc}A& 0\\ 1& 0\\ 0& 1\\ 0& A\end{array}\right]\left[\begin{array}{cc}F& 0\\ 0& F\end{array}\right]\left[\begin{array}{cccc}k1& -ϵk1& ϵ1& 1\\ -1& -ϵ1& ϵk1& k1\end{array}\right]\end{array}\right\}<0}$.

Moreover, for every ${\displaystyle X}$ that satisfies

${\displaystyle \left[\begin{array}{cc}k(AX+X{A}^T)& AX-X{A}^T\\ *& k(AX+X{A}^T)\end{array}\right]<0}$,

${\displaystyle X}$ and ${\displaystyle F=-{ϵ}^{-1}(A-{ϵ}^{-1}1{)}^{-1}X}$ are solutions to

${\displaystyle \left[\begin{array}{cccc}0& -kX& X& 0\\ *& 0& 0& -X\\ *& *& 0& -kX\\ *& *& *& 0\end{array}\right]+He\left\{\begin{array}{c}\left[\begin{array}{cc}A& 0\\ 1& 0\\ 0& 1\\ 0& A\end{array}\right]\left[\begin{array}{cc}F& 0\\ 0& F\end{array}\right]\left[\begin{array}{cccc}k1& -ϵk1& ϵ1& 1\\ -1& -ϵ1& ϵk1& k1\end{array}\right]\end{array}\right\}<0}$

Consider ${\displaystyle A\in {ℝ}^{n\times n}}$ and ${\displaystyle \alpha \in {ℝ}_{>0}}$. The matrix ${\displaystyle A}$ satisfies ${\displaystyle \lambda (A)\subset \mathscr{H}(\alpha )}$, where ${\displaystyle \mathscr{H}(\alpha ):=\{\lambda \in ℂ:Re(\lambda )<-\alpha \}}$ if and only if there exist ${\displaystyle X\in {𝕊}^n}$ and ${\displaystyle ϵ\in {ℝ}_{>0}}$, where ${\displaystyle X>0}$, such that

${\displaystyle AX+X{A}^T+2\alpha X<0}$.

Equivalently, the matrix ${\displaystyle A}$ satisfies ${\displaystyle \lambda (A)\subset \mathscr{H}(\alpha )}$ if and only if there exist ${\displaystyle X\in {𝕊}^n}$, ${\displaystyle ϵ\in {ℝ}_{>0}}$, and ${\displaystyle F\in {ℝ}^{n\times n}}$, where ${\displaystyle X>0}$, such that

${\displaystyle \left[\begin{array}{ccc}0& -X& X\\ *& 0& 0\\ *& *& -\frac{1}{2}{\alpha }^{-1}X\end{array}\right]+He\left\{\begin{array}{c}\left[\begin{array}{c}A\\ 1\\ 0\end{array}\right]F\left[\begin{array}{ccc}1& -ϵ1& ϵ1\end{array}\right]\end{array}\right\}<0}$.

Moreover, for every ${\displaystyle X}$ that satisfies

${\displaystyle AX+X{A}^T+2\alpha X<0}$

${\displaystyle X}$ and ${\displaystyle F=-{ϵ}^{-1}(A-{ϵ}^{-1}1{)}^{-1}X}$ are solutions to

${\displaystyle \left[\begin{array}{ccc}0& -X& X\\ *& 0& 0\\ *& *& -\frac{1}{2}{\alpha }^{-1}X\end{array}\right]+He\left\{\begin{array}{c}\left[\begin{array}{c}A\\ 1\\ 0\end{array}\right]F\left[\begin{array}{ccc}1& -ϵ1& ϵ1\end{array}\right]\end{array}\right\}<0}$.

Consider ${\displaystyle A\in {ℝ}^{n\times n}}$, ${\displaystyle r\in {ℝ}_{>0}}$, and ${\displaystyle c\in {ℝ}_{<0}}$, where ${\displaystyle c<-r}$. The matrix ${\displaystyle A}$ satisfies ${\displaystyle \lambda (A)\subset 𝒢(c,r)}$, where ${\displaystyle 𝒢(c,r):=\{\lambda \in ℂ:|\lambda -c|<r\}}$, if and only if there exist ${\displaystyle X\in {𝕊}^n}$ and ${\displaystyle ϵ\in {ℝ}_{>0}}$, where ${\displaystyle X>0}$, such that

${\displaystyle AX+X{A}^T-\frac{c^2-r^2}{c}X-\frac{1}{c}AX{A}^T<0}$.

Equivalently, the matrix ${\displaystyle A}$ satisfies ${\displaystyle \lambda (A)\subset 𝒢(c,r)}$ if and only if there exist ${\displaystyle X\in {𝕊}^n}$, ${\displaystyle ϵ\in {ℝ}_{>0}}$, and ${\displaystyle F\in {ℝ}^{n\times n}}$, where ${\displaystyle X>0}$, such that

${\displaystyle \left[\begin{array}{cccc}0& -X& X& 0\\ *& 0& 0& -X\\ *& *& \frac{c}{c^2-r^2}X& 0\\ *& *& *& cX\end{array}\right]+He\left\{\begin{array}{c}\left[\begin{array}{c}A\\ 1\\ 0\\ 0\end{array}\right]F\left[\begin{array}{cccc}1& -ϵ1& ϵ1& 1\end{array}\right]\end{array}\right\}<0}$

Moreover, for every ${\displaystyle X}$ that satisfies

${\displaystyle AX+X{A}^T-\frac{c^2-r^2}{c}X-\frac{1}{c}AX{A}^T<0}$

${\displaystyle X}$ and ${\displaystyle F=-{ϵ}^{-1}(A-{ϵ}^{-1}1{)}^{-1}X}$ are solutions to

${\displaystyle \left[\begin{array}{cccc}0& -X& X& 0\\ *& 0& 0& -X\\ *& *& \frac{c}{c^2-r^2}X& 0\\ *& *& *& cX\end{array}\right]+He\left\{\begin{array}{c}\left[\begin{array}{c}A\\ 1\\ 0\\ 0\end{array}\right]F\left[\begin{array}{cccc}1& -ϵ1& ϵ1& 1\end{array}\right]\end{array}\right\}<0}$

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

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