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Mathematics of Kalman-Bucy Filtering

  • Textbook
  • © 1985

Overview

Authors:
  1. Peter A. Ruymgaart

    1. Department of Mathematics, University of Technology, Delft, Delft, The Netherlands

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    You can also search for this author in PubMed   Google Scholar

  2. Tsu T. Soong

    1. Faculty of Engineering and Applied Sciences, State University of New York at Buffalo, Buffalo, USA

    View author publications

    You can also search for this author in PubMed   Google Scholar

Part of the book series: Springer Series in Information Sciences (SSINF, volume 14)

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Table of contents (5 chapters)

  1. Front Matter

    Pages I-X
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  2. Elements of Probability Theory

    • Peter A. Ruymgaart, Tsu T. Soong
    Pages 1-29

  3. Calculus in Mean Square

    • Peter A. Ruymgaart, Tsu T. Soong
    Pages 30-79

  4. The Stochastic Dynamic System

    • Peter A. Ruymgaart, Tsu T. Soong
    Pages 80-99

  5. The Kalman-Bucy Filter

    • Peter A. Ruymgaart, Tsu T. Soong
    Pages 100-153

  6. A Theorem by Liptser and Shiryayev

    • Peter A. Ruymgaart, Tsu T. Soong
    Pages 154-157

  7. Back Matter

    Pages 158-172
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Keywords

About this book

Since their introduction in the mid 1950s, the filtering techniques developed by Kalman, and by Kalman and Bucy have been widely known and widely used in all areas of applied sciences. Starting with applications in aerospace engineering, their impact has been felt not only in all areas of engineering but also in the social sciences, biological sciences, medical sciences, as well as all other physical sciences. Despite all the good that has come out of this devel­ opment, however, there have been misuses because the theory has been used mainly as a tool or a procedure by many applied workers without them fully understanding its underlying mathematical workings. This book addresses a mathematical approach to Kalman-Bucy filtering and is an outgrowth of lectures given at our institutions since 1971 in a sequence of courses devoted to Kalman-Bucy filters. The material is meant to be a theoretical complement to courses dealing with applications and is designed for students who are well versed in the techniques of Kalman-Bucy filtering but who are also interested in the mathematics on which these may be based. The main topic addressed in this book is continuous-time Kalman-Bucy filtering. Although the discrete-time Kalman filter results were obtained first, the continuous-time results are important when dealing with systems developing in time continuously, which are hence more appropriately mod­ eled by differential equations than by difference equations. On the other hand, observations from the former can be obtained in a discrete fashion.

Authors and Affiliations

  • Department of Mathematics, University of Technology, Delft, Delft, The Netherlands

    Peter A. Ruymgaart

  • Faculty of Engineering and Applied Sciences, State University of New York at Buffalo, Buffalo, USA

    Tsu T. Soong

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