Stretched exponential function

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Revision as of 04:24, 24 January 2014 by 174.21.178.252 (talk) (made "characteristic function" point to "characteristic function (probability theory)" instead of "characteristic state function")
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The Kalman–Yakubovich–Popov lemma is a result in system analysis and control theory which states: Given a number γ>0, two n-vectors b, c and an n by n Hurwitz matrix A, if the pair (A,b) is completely controllable, then a symmetric matrix P and a vector q satisfying

ATP+PA=qqT
Pbc=γq

exist if and only if

γ+2Re[cT(jωIA)1b]0

Moreover, the set {x:xTPx=0} is the unobservable subspace for the pair (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.