Stretched exponential function

The Kalman–Yakubovich–Popov lemma is a result in system analysis and control theory which states: Given a number ${\displaystyle \gamma >0}$, two n-vectors b, c and an n by n Hurwitz matrix A, if the pair ${\displaystyle (A,b)}$ is completely controllable, then a symmetric matrix P and a vector q satisfying

${\displaystyle A^{T}P+PA=-qq^{T}\,}$

${\displaystyle Pb-c={\sqrt {\gamma }}q\,}$

exist if and only if

${\displaystyle \gamma +2Re[c^{T}(j\omega I-A)^{-1}b]\geq 0}$

Moreover, the set ${\displaystyle \{x:x^{T}Px=0\}}$ is the unobservable subspace for the pair ${\displaystyle (A,b)}$.

The lemma can be seen as a generalization of the Lyapunov equation in stability theory. It establishes a relation between a linear matrix inequality involving the state space constructs A, b, c and a condition in the frequency domain.

It was derived in 1962 by Kalman, who brought together results by Vladimir Andreevich Yakubovich and Vasile Mihai Popov.