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Reduction of Nonlinear Control Systems

A Differential Geometric Approach

  • Book
  • © 1999

Overview

Authors:
  1. V. I. Elkin

    1. Computing Centre of the Russian Academy of Sciences, Moscow, Russia
      Moscow Institute of Physics and Technology, Moscow, Russia

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Part of the book series: Mathematics and Its Applications (MAIA, volume 472)

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Table of contents (6 chapters)

  1. Front Matter

    Pages i-xi
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  2. Preliminaries

    • V. I. Elkin
    Pages 1-106

  3. Categories of Control Systems

    • V. I. Elkin
    Pages 107-115

  4. Equivalence of Control Systems

    • V. I. Elkin
    Pages 116-159

  5. Factorization of Control Systems

    • V. I. Elkin
    Pages 160-186

  6. Restriction of Control Systems

    • V. I. Elkin
    Pages 187-216

  7. Certain Control Problems

    • V. I. Elkin
    Pages 217-242

  8. Back Matter

    Pages 243-248
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Keywords

About this book

Advances in science and technology necessitate the use of increasingly-complicated dynamic control processes. Undoubtedly, sophisticated mathematical models are also concurrently elaborated for these processes. In particular, linear dynamic control systems iJ = Ay + Bu, y E M C ]Rn, U E ]RT, (1) where A and B are constants, are often abandoned in favor of nonlinear dynamic control systems (2) which, in addition, contain a large number of equations. The solution of problems for multidimensional nonlinear control systems en­ counters serious difficulties, which are both mathematical and technical in nature. Therefore it is imperative to develop methods of reduction of nonlinear systems to a simpler form, for example, decomposition into systems of lesser dimension. Approaches to reduction are diverse, in particular, techniques based on approxi­ mation methods. In this monograph, we elaborate the most natural and obvious (in our opinion) approach, which is essentially inherent in any theory of math­ ematical entities, for instance, in the theory of linear spaces, theory of groups, etc. Reduction in our interpretation is based on assigning to the initial object an isomorphic object, a quotient object, and a subobject. In the theory of linear spaces, for instance, reduction consists in reducing to an isomorphic linear space, quotient space, and subspace. Strictly speaking, the exposition of any mathemat­ ical theory essentially begins with the introduction of these reduced objects and determination of their basic properties in relation to the initial object.

Authors and Affiliations

  • Computing Centre of the Russian Academy of Sciences, Moscow, Russia

    V. I. Elkin

  • Moscow Institute of Physics and Technology, Moscow, Russia

    V. I. Elkin

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