Maximal imaginery eigenvalues in optimal systems

Maximal imaginery eigenvalues in optimal systems

In this note we present equations that uniquely determine the maximum possible imaginary value of the closed loop eigenvalues in an LQ-optimal system, irrespective of how the state weight matrix is chosen, provided a real symmetric solution of the algebraic Riccati equation exists. In addition, the...

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Bibliographic Details
Main Author:	David Di Ruscio
Format:	Article
Language:	English
Published:	Norwegian Society of Automatic Control 1991-07-01
Series:	Modeling, Identification and Control
Subjects:	Linear optimal control pole placement eigenvalues multivariable control systems
Online Access:	http://www.mic-journal.no/PDF/1991/MIC-1991-3-5.pdf

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