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Kybernetika 38(2):209-216, 2002.

Existence of Pole-Zero Structures in a Rational Matrix Equation Arising in a Decentralized Stabilization of Expanding Systems.

Dibyendu Baksi, Kanti B. Datta and Goshaidas Ray


Abstract:

A necessary and sufficient condition for the existence of pole and zero structures in a proper rational matrix equation $T_{2} X = T_{1}$ is developed. This condition provides a new interpretation of sufficient conditions which ensure decentralized stabilizability of an expanded system. A numerical example illustrate the theoretical results.


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BIB TeX

@article{kyb:2002:2:209-216,

author = {Baksi, Dibyendu and Datta, Kanti B. and Ray, Goshaidas},

title = {Existence of Pole-Zero Structures in a Rational Matrix Equation Arising in a Decentralized Stabilization of Expanding Systems.},

journal = {Kybernetika},

volume = {38},

year = {2002},

number = {2},

pages = {209-216}

publisher = {{\'U}TIA, AV {\v C}R, Prague },

}


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