Етапи та основні задачі столітнього розвитку теорії систем керування та ідентифікації. Частина 4. Методи і задачі проєктування робастних систем керування

Етапи та основні задачі столітнього розвитку теорії систем керування та ідентифікації. Частина 4. Методи і задачі проєктування робастних систем керування

The article provides a review of the most important methods and problems in the design of robust discrete control systems. In this case, the main attention was focused on the problems of suppressing limited external disturbances, information about which is presented only in the form of a limitation...

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Datum:2024
Hauptverfasser: Romanenko, Victor, Gubarev, Vyacheslav
Format: Artikel
Sprache:English
Veröffentlicht: V.M. Glushkov Institute of Cybernetics of NAS of Ukraine 2024
Schlagworte:
регулятор стану
інваріантний еліпсоїд
лінійні матричні нерівності
робастне керування
теорія H∞
зовнішні збурення
Online Zugang:https://jais.net.ua/index.php/files/article/view/223
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Назва журналу:Problems of Control and Informatics

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Problems of Control and Informatics
Beschreibung
Zusammenfassung:The article provides a review of the most important methods and problems in the design of robust discrete control systems. In this case, the main attention was focused on the problems of suppressing limited external disturbances, information about which is presented only in the form of a limitation on their maximum value. The use of invariant ellipsoids  is considered as the first mathematical apparatus for describing the characteristics of the influence of external disturbances on the trajectory of motion of dynamic systems. Theorems on the representation of invariant ellipsoids  in the form of linear matrix inequalities (LMI) are formulated, which are further used to synthesize discrete state controllers that suppress external disturbances. The solution to a more general problem of robust suppression of limited disturbances based on the use of LMI in the presence of system uncertainties in the parameters of the mathematical model of the control object is considered. The use of H∞-control theory is considered as a second mathematical apparatus for suppressing external l2-limited external disturbances. In this case, the optimality criterion consists in minimizing the maximum ratio of the l2-norm of the vector of output stabilized coordinates to the l2-norm of the vector of input disturbances. The problem is solved by reducing it to the problem of robust control of a discrete dynamic system in space H∞ based on the Two-Ricatti approach. The standard H∞-optimization problem is also considered.

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