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A simple stabilization and algebraic control of unstable delayed first-order systems using meromorphic functions

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dc.title A simple stabilization and algebraic control of unstable delayed first-order systems using meromorphic functions en
dc.contributor.author Pekař, Libor
dc.contributor.author Prokop, Roman
dc.relation.ispartof Proceedings of the 26th IASTED International Conference on Modelling, Identification, and Control
dc.identifier.isbn 978-0-88986-633-1
dc.date.issued 2007
dc.citation.spage 183
dc.citation.epage 188
dc.event.title 26th IASTED International Conference on Modelling, Identification and Control
dc.event.location Innsbruck
utb.event.state-en Australia
utb.event.state-cs Austrálie
dc.event.sdate 2007-02-12
dc.event.edate 2007-02-14
dc.type conferenceObject
dc.language.iso en
dc.publisher Acta Press Anaheim en
dc.relation.uri http://www.actapress.com/PaperInfo.aspx?PaperID=29560&reason=500
dc.subject stabilization en
dc.subject delayed systems en
dc.subject algebraic control design en
dc.subject internal model control en
dc.description.abstract The paper is focused on control of unstable delayed systems. The control design is performed in the R(MS) ring of (retarded quasipolynomial) meromorphic functions. The unstable systems are modeled in anisochronic philosophy as a ratio of quasipolynomials where also denominator contains delay terms. The goal is to find a suitable stable quasipolynomial as a common denominator of R(MS) terms. This task is equivalent to the stabilization of a plant by a proportional feedback loop. Then, the appropriate controller can be found. In this paper, three algebraic methods are suggested, two of them are based on the solution of the Bezout equation with Youla-Kucera parameterization. The third one utilizes modified internal model control (IMC) structure with an affine parameterization. All methods offer a real positive real parameter m(0) which defines closed loop poles placement. The modified "equalization method" for determining of m(0) can be applied. An example illustrates the proposed methodology, properties and benchmarking of all principles. en
utb.faculty Faculty of Applied Informatics
dc.identifier.uri http://hdl.handle.net/10563/1001930
utb.identifier.obdid 43865790
utb.identifier.scopus 2-s2.0-56149083209
utb.identifier.wok 000246295700032
utb.source d-wok
dc.date.accessioned 2011-08-09T07:34:15Z
dc.date.available 2011-08-09T07:34:15Z
utb.contributor.internalauthor Pekař, Libor
utb.contributor.internalauthor Prokop, Roman
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