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Theory of Chattering Control

with applications to Astronautics, Robotics, Economics, and Engineering

  • Book
  • © 1994

Overview

Authors:
  1. Michail I. Zelikin

    1. Department of Mathematics, Moscow State University, Moscow, Russia

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  2. Vladimir Borisov

    1. Department of Mathematics, Moscow Technological Institute, Moscow, Russia

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    You can also search for this author in PubMed   Google Scholar

Part of the book series: Systems & Control: Foundations & Applications (SCFA)

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Table of contents (8 chapters)

  1. Front Matter

    Pages i-xv
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  2. Introduction

    • Michail I. Zelikin, Vladimir Borisov
    Pages 1-18

  3. Fuller’s Problem

    • Michail I. Zelikin, Vladimir Borisov
    Pages 19-37

  4. Second Order Singular Extremals and Chattering

    • Michail I. Zelikin, Vladimir Borisov
    Pages 38-84

  5. The Ubiquity of Fuller’s Phenomenon

    • Michail I. Zelikin, Vladimir Borisov
    Pages 85-104

  6. Higher Order Singular Extremals

    • Michail I. Zelikin, Vladimir Borisov
    Pages 105-166

  7. Applications

    • Michail I. Zelikin, Vladimir Borisov
    Pages 167-215

  8. Multidimensional Control with Chattering

    • Michail I. Zelikin, Vladimir Borisov
    Pages 217-233

  9. Epilogue

    • Michail I. Zelikin, Vladimir Borisov
    Pages 235-235

  10. Back Matter

    Pages 236-244
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Keywords

About this book

The common experience in solving control problems shows that optimal control as a function of time proves to be piecewise analytic, having a finite number of jumps (called switches) on any finite-time interval. Meanwhile there exists an old example proposed by A.T. Fuller [1961) in which optimal control has an infinite number of switches on a finite-time interval. This phenomenon is called chattering. It has become increasingly clear that chattering is widespread. This book is devoted to its exploration. Chattering obstructs the direct use of Pontryagin's maximum principle because of the lack of a nonzero-length interval with a continuous control function. That is why the common experience appears misleading. It is the hidden symmetry of Fuller's problem that allows the explicit solution. Namely, there exists a one-parameter group which respects the optimal trajectories of the problem. When published in 1961, Fuller's example incited curiosity, but it was considered only "interesting" and soon was forgotten. The second wave of attention to chattering was raised about 12 years later when several other examples with optimal chattering trajectories were 1 found. All these examples were two-dimensional with the one-parameter group of symmetries.

Reviews

"...a rich source of information."
— Mathematical Reviews

"This book is an excellent introduction to and survey of chattering optimal controls."
— SIAM Review

"The book is an interesting and modern study of some problems in control theory in the language of differential geometry."
— Zentralblatt Math

Authors and Affiliations

  • Department of Mathematics, Moscow State University, Moscow, Russia

    Michail I. Zelikin

  • Department of Mathematics, Moscow Technological Institute, Moscow, Russia

    Vladimir Borisov

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