3 edition of Controlling Chaos and Bifurcations in Engineering Systems found in the catalog.
September 28, 1999
Written in English
|The Physical Object|
|Number of Pages||665|
The bifurcations of control systems with a single input are studied. Based on the normal forms of control systems, the equilibrium sets are classified. A set of quadratic invariants for control sys Cited by: Bifurcation, Quasi-Periodicity, Chaos, and Co-Existence of Different Behaviors in the Controlled H-Bridge Inverter: /ch This chapter deals with the analysis of the dynamic behavior of a controlled single-phase H-bridge inverter. The authors show that in addition to borderCited by: 1.
This book focuses on theoretical aspects of dynamical systems in the broadest sense. It highlights novel and relevant results on mathematical and numerical problems that can be found in the fields of applied mathematics, physics, mechanics, engineering and the life sciences. Purchase Discrete Dynamical Systems, Bifurcations and Chaos in Economics, Volume - 1st Edition. Print Book & E-Book. ISBN ,
and this: (Ott) Chaos in dynamical systems, Edward Ott, Cambridge University Press. Additional reading: (GH) Nonlinear Oscillations, Dynamical Systems and Bifurcations of Vector Fields, Guckenheimer, J and P. Holmes, Springer-Verlag, (W) Introduction to Applied Nonlinear Dynamical Systems and Chaos. Stephen Wiggins, Controlling Chaos and Bifurcations in Engineering Systems, edited by G. Chen (CRC Press, Boca Raton, Florida, ). (A) Extensive, quite mathematical. Controlling Chaos: Theoretical and Practical Methods in Non-Linear Dynamics, T. Kapitaniak (Academic Press, London, ). (A) Contains a brief introduction and a collection of reprints.
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Controlling Chaos and Bifurcations in Engineering Systems provides a state-of-the-art survey of the control-and anti-control-of chaos in dynamical systems. Internationally known experts in the field join forces in this volume to form this tutorial-style combination of overview and technical report on the latest advances in the theory and Format: Hardcover.
Controlling Chaos and Bifurcations in Engineering Systems provides a state-of-the-art survey of the control-and anti-control-of chaos in dynamical systems. Internationally known experts in the field join forces in this volume to form this tutorial-style combination of overview and technical report on the latest advances in the theory and.
"Controlling Chaos and Bifurcations in Engineering Systems offers a state-of-the-art survey of the control and synchronization of chaos in dynamical systems.
Internationally known experts in the field join forces to form this tutorial-style combination of overview and technical reports on the latest advances in the theory and applications of. Request PDF | OnChi K.
Tse and others published Controlling chaos and bifurcations in engineering systems, Guanrong Chen, Boca Raton, FL | Find, read and cite all the research you Author: Chi Kong Tse.
In this volume, leading experts present current achievements in the forefront of research in the challenging field of chaos in circuits and systems, with emphasis on engineering perspectives, methodologies, circuitry design techniques, and potential applications of chaos and by: UNESCO – EOLSS SAMPLE CHAPTERS CONTROL SYSTEMS, ROBOTICS AND AUTOMATION – Vol.
XIII- Control of Chaos and Bifurcations - Alexander L. Fradkov and Guanrong Chen ©Encyclopedia of Life Support Systems (EOLSS) There are many practical reasons for controlling or.
However, it has been noted that the application of delayed feedback in controlling bifurcations is not so popular, especially for controlling bifurcations arising from time-delayed systems. CONTROLLING CHAOS AND BIFURCATIONS IN ENGINEERING SYSTEMS Book Review.
Edited by Guanrong Chen, University of Houston >> Over the last two decades, chaos in engineering systems has moved from being simply a curious phenomenon to one with real, practical significance and utility. Recent exciting developments in chaos research are also discussed, such as the control and synchronization of chaos and possible technological applications.
Sample Chapter(s) Chapter 1: Introduction ( KB) Contents: Introduction; Linear and Nonlinear Oscillators; Electronic Circuits as Oscillators and Analog Simulation of Dynamical Systems.
Controlling Chaos. Two fundamental interdependent characterizations of chaos are. exponential sensitivity to small perturbations (also known as the Butterfly Effect), and ; complex orbit structure (see Symbolic Dynamics).; Typically, attribute (1) is quantified by the largest Lyapunov exponent, while attribute (2) is most often quantified by an entropy (e.g., the metric entropy or the.
Nonlinearity, Bifurcation and Chaos - Theory and Application is an edited book focused on introducing both theoretical and application oriented approaches in science and engineering.
It contains 12 chapters, and is recommended for university teachers, scientists, researchers, engineers, as well as graduate and post-graduate students either working or interested Cited by: 6.
Attarsharghi et al., Adaptive control of chaos in cardiac arrhythmia, Int. Conf. Mechanical and Electronics Engineering () pp. 49– Google Scholar; G. Chen, Controlling Chaos and Bifurcations in Engineering Systems (CRC Press, ). Google ScholarCited by: 3. Lenci and G. Rega, “Controlling nonlinear dynamics in a two-well impact system I.
Attractors and bifurcation scenario under symmetric excitations,” Int. Bifurcation and Chaos. – “II. Attractors and bifurcation scenario under unsymmetric optimal excitation,” Int. Bifurcation and Chaos, –, Google Author: Alexander Fradkov, Boris Andrievsky.
Controlling chaos and bifurcations refers to the task of designing a controller to modify the chaotic behaviors and bifurcation properties of a given nonlinear system and thereby achieving some desirable dynamical behaviors.
In this editorial, we present published papers which analyze various aspects and applications related to this special : Qamar Din, A. Elsadany, Hammad Khalil. Chaos engineering is carefully injecting this harm into our systems to test the system’s ability to respond to it.
This is an effective method to practice, prepare, and prevent/minimize downtime. It is a typical route to generate chaos via period-doubling bifurcations in some nonlinear systems.
In this paper, we propose a new hybrid control strategy in which state feedback and parameter perturbation are used to control the period-doubling bifurcations and to stabilize unstable periodic orbits embedded in the chaotic attractor of a discrete chaotic dynamical by: In this paper, a review of the various developments in the field of chaotic dynamics with specific emphasis on chaos in structural and mechanical systems is presented.
The paper discusses some known chaotic systems such as the Lorenz, Rössler, Ueda and Henon attractors as well as chaos in Duffing and Van der Pol oscillators. The paper also covers chaos in piecewise linear systems, Cited by: 4. BOOK REVIEW CONTROLLING CHAOS AND BIFURCA-TIONS IN ENGINEERING SYSTEMS, Guan-rong Chen, Boca Raton, FL: CRC Press,ISBN 1.
INTRODUCTION In the s and s, we saw phenomenal advancement in nonlinear science, which had led to remarkable improvement in our understanding ofthe worldaround of thediscoveriesin.
Celka, “Theory and experiments on nonlinear time-delayed feedback systems with application to chaos control,” in Controlling Chaos and Bifurcations in Engineering Systems, G. Chen, Ed., pp. –, CRC Press, Boca Raton, FL, USA, View at: Google ScholarAuthor: Abimael Salcedo, Joaquin Alvarez.
The purpose of the present chapter is once again to show on concrete new examples that chaos in one-dimensional unimodal mappings, dynamical chaos in systems of ordinary differential equations, diffusion chaos in systems of the equations with partial derivatives and chaos in Hamiltonian and conservative systems are generated by cascades of bifurcations under universal bifurcation Feigenbaum Cited by: 1.
Purchase Bifurcation and Chaos in Complex Systems, Volume 1 - 1st Edition. Print Book & E-Book. ISBNHowever, technological demands are pushing systems to the limits of their performance, and many engineering systems are being operated under conditions which may be viewed as 'stressed.' It is this stressed op eration which gives rise to nonlinear dynamic phe nomena, such as bifurcations leading, in some cases, to by: Chaos theory is a branch of mathematics focusing on the study of chaos—states of dynamical systems whose apparently-random states of disorder and irregularities are often governed by deterministic laws that are highly sensitive to initial conditions.
Chaos theory is an interdisciplinary theory stating that, within the apparent randomness of chaotic complex systems, there are underlying.