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Chaos in Electronics / by M.A. van Wyk, W.-H. Steeb
(Mathematical Modelling: Theory and Applications ; 2)
Edition | 1st ed. 1997. |
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Publisher | (Dordrecht : Springer Netherlands : Imprint: Springer) |
Year | 1997 |
Language | English |
Size | XI, 483 p : online resource |
Authors | *van Wyk, M.A author Steeb, W.-H author SpringerLink (Online service) |
Subjects | LCSH:Electronic circuits LCSH:Electrical engineering LCSH:Mathematics LCSH:System theory LCSH:Control theory FREE:Electronic Circuits and Systems FREE:Electrical and Electronic Engineering FREE:Applications of Mathematics FREE:Systems Theory, Control |
Notes | 1 Introduction -- 2 Analysis of Chaotic Systems -- 3 One-dimensional Maps in Electronics -- 4 Higher Dimensional Maps in Electronics -- 5 Autonomous Systems in Electronics -- 6 Driven Systems -- 7 Controlling Chaos -- 8 Chaos in Electronics: The Future -- A One-Dimensional Maps -- A.1 Introduction -- A.2 Orbits and Their Properties -- A.3 Hyperbolicity -- A.4 Stability -- A.5 Topological Conjugacy -- A.6 Chaos -- A.7 Invariant Density -- A.8 Variational Equation and Lyapunov Exponent -- A.9 Ergodic Theorem -- A.10 Information Exchange -- A.11 Connection with Higher Dimensional Maps -- B Important Definitions and Theorems -- C Mathematical Methods -- C.1 Least-Squares Linearized Flow Estimation -- C.2 Line Intersection Algorithm -- D MATLAB Program Listings -- D.1 Lyapunov Exponents for Maps -- D.2 Lyapunov Exponents for Flows -- D.3 Lyapunov Exponents from Time Series -- D.4 Standard Gram-Schmidt Procedure -- D.5 Modified Gram-Schmidt Procedure Many dynamical systems in physics, chemistry and biology exhibit complex be haviour. The apparently random motion of a fluid is the best known example. How ever also vibrating structures, electronic oscillators, magnetic devices,lasers, chemical oscillators, and population kinetics can behave in a complicated manner. One can find irregular oscillations, which is now known as chaotic behaviour. The research field of nonlinear dynamical systems and especially the study of chaotic systems has been hailed as one of the important breaktroughs in science this century. The sim plest realization of a system with chaotic behaviour is an electronic oscillator. The purpose of this book is to provide a comprehensive introduction to the application of chaos theory to electronic systems. The book provides both the theoretical and experimental foundations of this research field. Each electronic circuit is described in detail together with its mathematical model. Controlling chaos of electronic oscilla tors is also included. End of proofs and examples are indicated by •. Inside examples the end of proofs are indicated with O. We wish to express our gratitude to Catharine Thompson for a critical reading of the manuscript. Any useful suggestions and comments are welcome. Email address of the first author: MVANWYK@TSAMAIL. TRSA. AC. ZA Email address of the first author: WHS@RAU3. RAU. AC. ZA Home page of the authors: http://zeus. rau. ac. za/steeb/steeb. html xi Chapter 1 Introduction 1 HTTP:URL=https://doi.org/10.1007/978-94-015-8921-5 |
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E-Book | Location | Media type | Volume | Call No. | Status | Reserve | Comments | ISBN | Printed | Restriction | Designated Book | Barcode No. |
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E-Book | オンライン | 電子ブック |
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Springer eBooks | 9789401589215 |
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電子リソース |
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EB00231322 |
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Material Type | E-Book |
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Classification | LCC:TK7867-7867.5 DC23:621.3815 |
ID | 4000111451 |
ISBN | 9789401589215 |
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