Cover Image
Read Now

Periodic Flows to Chaos in Time-delay Systems

This book for the first time examines periodic motions to chaos in time-delay systems, which exist extensively in engineering. For a long time, the stability of time-delay systems at equilibrium has been of great interest from the Lyapunov theory-based methods, where one cannot achieve the ideal res...

Full description

Bibliographic Details
Main Author: Luo, Albert C. J.
Format: eBook
Language:English
Published: Cham Springer International Publishing 2017, 2017
Edition:1st ed. 2017
Series:Nonlinear Systems and Complexity
Subjects:
Complex Systems
Nonlinear Optics
Applied Dynamical Systems
System Theory
Nonlinear Theories
Dynamics
Online Access:
Collection: Springer eBooks 2005- - Collection details see MPG.ReNa
LEADER 02311nmm a2200325 u 4500
001 EB001230663
003 EBX01000000000000000873966
005 00000000000000.0
007 cr|||||||||||||||||||||
008 161005 ||| eng
020 |a 9783319426648 
100 1 |a Luo, Albert C. J. 
245 0 0 |a Periodic Flows to Chaos in Time-delay Systems  |h Elektronische Ressource  |c by Albert C. J. Luo 
250 |a 1st ed. 2017 
260 |a Cham  |b Springer International Publishing  |c 2017, 2017 
300 |a X, 198 p. 30 illus., 15 illus. in color  |b online resource 
505 0 |a Linear Time-delay Systems -- Nonlinear Time-delay System -- Periodic Flows in Time-delay Systems -- Quasiperiodic Flows in Time-delay Systems -- Time-delay Duffing Oscillator 
653 |a Complex Systems 
653 |a Nonlinear Optics 
653 |a Applied Dynamical Systems 
653 |a System theory 
653 |a Nonlinear theories 
653 |a Dynamics 
041 0 7 |a eng  |2 ISO 639-2 
989 |b Springer  |a Springer eBooks 2005- 
490 0 |a Nonlinear Systems and Complexity 
028 5 0 |a 10.1007/978-3-319-42664-8 
856 4 0 |u https://doi.org/10.1007/978-3-319-42664-8?nosfx=y  |x Verlag  |3 Volltext 
082 0 |a 515.39 
520 |a This book for the first time examines periodic motions to chaos in time-delay systems, which exist extensively in engineering. For a long time, the stability of time-delay systems at equilibrium has been of great interest from the Lyapunov theory-based methods, where one cannot achieve the ideal results. Thus, time-delay discretization in time-delay systems was used for the stability of these systems. In this volume, Dr. Luo presents an accurate method based on the finite Fourier series to determine periodic motions in nonlinear time-delay systems. The stability and bifurcation of periodic motions are determined by the time-delayed system of coefficients in the Fourier series and the method for nonlinear time-delay systems is equivalent to the Laplace transformation method for linear time-delay systems. Facilitates discovery of analytical solutions of nonlinear time-delay systems; Illustrates bifurcation trees of periodic motions to chaos; Helps readers identify motion complexity and singularity; Explains procedures for determining stability, bifurcation and chaos 

Similar Items