Iterative Learning Control [electronic resource] : Robustness and Monotonic Convergence for Interval Systems / by Hyo-Sung Ahn, YangQuan Chen, Kevin L. Moore.

By: Ahn, Hyo-Sung [author.]Contributor(s): Chen, YangQuan [author.] | Moore, Kevin L [author.] | SpringerLink (Online service)Material type: TextTextLanguage: English Series: Communications and Control Engineering: Publisher: London : Springer London, 2007Description: XVIII, 230 p. online resourceContent type: text Media type: computer Carrier type: online resourceISBN: 9781846288593Subject(s): Engineering | Artificial intelligence | Bioinformatics | Systems theory | Biomedical engineering | Engineering | Control Engineering | Systems Theory, Control | Artificial Intelligence (incl. Robotics) | Automation and Robotics | Bioinformatics | Biomedical EngineeringAdditional physical formats: Printed edition:: No titleOnline resources: Click here to access online
Contents:
Iterative Learning Control Overview -- An Overview of the ILC Literature -- The Super-vector Approach -- Robust Interval Iterative Learning Control -- Robust Interval Iterative Learning Control: Analysis -- Schur Stability Radius of Interval Iterative Learning Control -- Iterative Learning Control Design Based on Interval Model Conversion -- Iteration-domain Robustness -- Robust Iterative Learning Control: H? Approach -- Robust Iterative Learning Control: Stochastic Approaches -- Conclusions.
In: Springer eBooksSummary: This monograph studies the design of robust, monotonically-convergent iterative learning controllers for discrete-time systems. Two key problems with the fundamentals of iterative learning control (ILC) design as treated by existing work are: first, many ILC design strategies assume nominal knowledge of the system to be controlled and; second, it is well-known that many ILC algorithms do not produce monotonic convergence, though in applications monotonic convergence is often essential. Iterative Learning Control takes account of the recently-developed comprehensive approach to robust ILC analysis and design established to handle the situation where the plant model is uncertain. Considering ILC in the iteration domain, it presents a unified analysis and design framework that enables designers to consider both robustness and monotonic convergence for typical uncertainty models, including parametric interval uncertainties, iteration-domain frequency uncertainty, and iteration-domain stochastic uncertainty. Topics include: • Use of a lifting technique to convert the two-dimensional ILC system, which has dynamics in both the time and iteration domains, into the supervector framework, which yields a one-dimensional system, with dynamics only in the iteration domain. • Development of iteration-domain uncertainty models in the supervector framework. • ILC design for monotonic convergence when the plant is subject to parametric interval uncertainty in its Markov matrix. • An algebraic H-infinity design methodology for ILC design when the plant is subject to iteration-domain frequency uncertainty. • Development of Kalman-filter-based ILC algorithms when the plant is subject to iteration-domain stochastic uncertainties. • Analytical determination of the base-line error of ILC algorithms. • Solutions to three fundamental robust interval computational problems (used as basic tools for designing robust ILC controllers): finding the maximum singular value of an interval matrix, determining the robust stability of interval polynomial matrix, and obtaining the power of an interval matrix. Iterative Learning Control will be of great interest to academic researchers in control theory and to industrial control engineers working in robotics-oriented manufacturing and batch-processing-based industries. Graduate students of intelligent control will also find this volume instructive.
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Iterative Learning Control Overview -- An Overview of the ILC Literature -- The Super-vector Approach -- Robust Interval Iterative Learning Control -- Robust Interval Iterative Learning Control: Analysis -- Schur Stability Radius of Interval Iterative Learning Control -- Iterative Learning Control Design Based on Interval Model Conversion -- Iteration-domain Robustness -- Robust Iterative Learning Control: H? Approach -- Robust Iterative Learning Control: Stochastic Approaches -- Conclusions.

This monograph studies the design of robust, monotonically-convergent iterative learning controllers for discrete-time systems. Two key problems with the fundamentals of iterative learning control (ILC) design as treated by existing work are: first, many ILC design strategies assume nominal knowledge of the system to be controlled and; second, it is well-known that many ILC algorithms do not produce monotonic convergence, though in applications monotonic convergence is often essential. Iterative Learning Control takes account of the recently-developed comprehensive approach to robust ILC analysis and design established to handle the situation where the plant model is uncertain. Considering ILC in the iteration domain, it presents a unified analysis and design framework that enables designers to consider both robustness and monotonic convergence for typical uncertainty models, including parametric interval uncertainties, iteration-domain frequency uncertainty, and iteration-domain stochastic uncertainty. Topics include: • Use of a lifting technique to convert the two-dimensional ILC system, which has dynamics in both the time and iteration domains, into the supervector framework, which yields a one-dimensional system, with dynamics only in the iteration domain. • Development of iteration-domain uncertainty models in the supervector framework. • ILC design for monotonic convergence when the plant is subject to parametric interval uncertainty in its Markov matrix. • An algebraic H-infinity design methodology for ILC design when the plant is subject to iteration-domain frequency uncertainty. • Development of Kalman-filter-based ILC algorithms when the plant is subject to iteration-domain stochastic uncertainties. • Analytical determination of the base-line error of ILC algorithms. • Solutions to three fundamental robust interval computational problems (used as basic tools for designing robust ILC controllers): finding the maximum singular value of an interval matrix, determining the robust stability of interval polynomial matrix, and obtaining the power of an interval matrix. Iterative Learning Control will be of great interest to academic researchers in control theory and to industrial control engineers working in robotics-oriented manufacturing and batch-processing-based industries. Graduate students of intelligent control will also find this volume instructive.

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