Stability and Controls Analysis for Delay Systems

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Détails bibliographiques
Auteur principal: Wang, JinRong (19..-....). (Auteur)
Autres auteurs: Fečkan, Michal. (Auteur), Li, Mengmeng.
Support: E-Book
Langue: Anglais
Publié: San Diego, CA : Elsevier Science.
Autres localisations: Voir dans le Sudoc
Résumé: Stability and Controls Analysis for Delay Systems is devoted to stability, controllability and iterative learning control (ILC) to delay systems, including first order system, oscillating systems, impulsive systems, fractional systems, difference systems and stochastic systems raised from physics, biology, population dynamics, ecology and economics, currently not presented in other books on conventional fields. Delayed exponential matrix function approach is widely used to derive the representation and stability of the solutions and the controllability. ILC design are also established, which can be regarded as a way to find the control function. The broad variety of achieved results with rigorous proofs and many numerical examples make this book unique. Presents the representation and stability of solutions via the delayed exponential matrix function approach Gives useful sufficient conditions to guarantee controllability Establishes ILC design and focuses on new systems such as the first order system, oscillating systems, impulsive systems, fractional systems, difference systems and stochastic systems raised from various subjects
Accès en ligne: Accès à l'E-book
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Résumé:Stability and Controls Analysis for Delay Systems is devoted to stability, controllability and iterative learning control (ILC) to delay systems, including first order system, oscillating systems, impulsive systems, fractional systems, difference systems and stochastic systems raised from physics, biology, population dynamics, ecology and economics, currently not presented in other books on conventional fields. Delayed exponential matrix function approach is widely used to derive the representation and stability of the solutions and the controllability. ILC design are also established, which can be regarded as a way to find the control function. The broad variety of achieved results with rigorous proofs and many numerical examples make this book unique. Presents the representation and stability of solutions via the delayed exponential matrix function approach Gives useful sufficient conditions to guarantee controllability Establishes ILC design and focuses on new systems such as the first order system, oscillating systems, impulsive systems, fractional systems, difference systems and stochastic systems raised from various subjects
Description:Couverture (https://static2.cyberlibris.com/books_upload/136pix/9780323997935.jpg).
ISBN:9780323997935
Accès:L'accès en ligne est réservé aux établissements ou bibliothèques ayant souscrit l'abonnement