LMIs in Control/pages/Notion of Matrix Positivity

A symmetric matrix ${\displaystyle A\in {ℝ}^{n\times n}}$ is defined to be:

positive semidefinite, ${\displaystyle (A\ge 0)}$, if ${\displaystyle x^{T}Ax\ge 0}$ for all ${\displaystyle x\in {ℝ}^n,x\ne \mathrm{𝟎}}$.

positive definite, ${\displaystyle (A>0)}$, if ${\displaystyle x^{T}Ax>0}$ for all ${\displaystyle x\in {ℝ}^n,x\ne \mathrm{𝟎}}$.

negative semidefinite, ${\displaystyle (-A\ge 0)}$.

negative definite, ${\displaystyle (-A>0)}$.

indefinite if ${\displaystyle A}$ is neither positive semidefinite nor negative semidefinite.

• For any matrix ${\displaystyle M}$, ${\displaystyle M^{T}M>0}$.
• Positive definite matricies are invertible and the inverse is also positive definite.
• A positive definite matrix ${\displaystyle A>0}$ has a square root, ${\displaystyle A^{1/2}>0}$, such that ${\displaystyle A^{1/2}{A}^{1/2}=A}$.
• For a positive definite matrix ${\displaystyle A>0}$ and invertible ${\displaystyle M}$, ${\displaystyle M^{T}AM>0}$.
• If ${\displaystyle A>0}$ and ${\displaystyle M>0}$, then ${\displaystyle A+M>0}$.
• If ${\displaystyle A>0}$ then ${\displaystyle \mu A>0}$ for any scalar ${\displaystyle \mu >0}$.

• 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.

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