Fractional Order Singular Systems
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Fractional-Order Singular Systems
Author: Qing-Hao Zhang
language: en
Publisher: Walter de Gruyter GmbH & Co KG
Release Date: 2025-03-03
This book explores robust control strategies to manage the inherent uncertainties and maintain the admissibility and performance of fractional-order singular systems. It covers essential topics such as system admissibility, robust stabilization, H∞ control, positive real control, fault detection, delay systems, and provides a comprehensive framework for both the theoretical analysis and practical implementation of robust control methods.
Fractional-Order Singular Systems
Author: Qing-Hao Zhang
language: en
Publisher: Walter de Gruyter GmbH & Co KG
Release Date: 2025-03-03
This book explores robust control strategies to manage the inherent uncertainties and maintain the admissibility and performance of fractional-order singular systems. It covers essential topics such as system admissibility, robust stabilization, H∞ control, positive real control, fault detection, delay systems, and provides a comprehensive framework for both the theoretical analysis and practical implementation of robust control methods.
Discrete Fractional Calculus
This text provides the first comprehensive treatment of the discrete fractional calculus. Experienced researchers will find the text useful as a reference for discrete fractional calculus and topics of current interest. Students who are interested in learning about discrete fractional calculus will find this text to provide a useful starting point. Several exercises are offered at the end of each chapter and select answers have been provided at the end of the book. The presentation of the content is designed to give ample flexibility for potential use in a myriad of courses and for independent study. The novel approach taken by the authors includes a simultaneous treatment of the fractional- and integer-order difference calculus (on a variety of time scales, including both the usual forward and backwards difference operators). The reader will acquire a solid foundation in the classical topics of the discrete calculus while being introduced to exciting recent developments, bringing them to the frontiers of the subject. Most chapters may be covered or omitted, depending upon the background of the student. For example, the text may be used as a primary reference in an introductory course for difference equations which also includes discrete fractional calculus. Chapters 1—2 provide a basic introduction to the delta calculus including fractional calculus on the set of integers. For courses where students already have background in elementary real analysis, Chapters 1—2 may be covered quickly and readers may then skip to Chapters 6—7 which present some basic results in fractional boundary value problems (FBVPs). Chapters 6—7 in conjunction with some of the current literature listed in the Bibliography can provide a basis for a seminar in the current theory of FBVPs. For a two-semester course, Chapters 1—5 may be covered in depth, providing a very thorough introduction to both the discrete fractional calculus as well as the integer-order calculus.