- 5 Results
Lowest price: € 54.99, highest price: € 61.29, average price: € 57.88
1
Practical Numerical Algorithms for Chaotic Systems - Leon Chua
Order
at booklooker.de
€ 61.29
OrderSponsored link
Leon Chua:

Practical Numerical Algorithms for Chaotic Systems - Paperback

2021, ISBN: 9781461281214

[ED: Taschenbuch], [PU: Springer New York], Neuware - One of the basic tenets of science is that deterministic systems are completely predictable-given the initial condition and the equat… More...

Shipping costs:Zzgl. Versandkosten., plus shipping costs Buchhandlung - Bides GbR
2
Practical Numerical Algorithms for Chaotic Systems - Leon Chua
Order
at ZVAB.com
$ 62.52
(aprox. € 57.77)
Shipment: € 35.741
OrderSponsored link

Leon Chua:

Practical Numerical Algorithms for Chaotic Systems - Paperback

2011, ISBN: 1461281210

[EAN: 9781461281214], Neubuch, [SC: 35.74], [PU: Springer New York Dez 2011], NONLINEARSYSTEM; BIFURCATION; STABILITY; SYSTEM, Druck auf Anfrage Neuware - Printed after ordering - One of … More...

NEW BOOK. Shipping costs: EUR 35.74 AHA-BUCH GmbH, Einbeck, Germany [51283250] [Rating: 5 (von 5)]
3
Practical Numerical Algorithms for Chaotic Systems - Leon Chua
Order
at ZVAB.com
CHF 54.56
(aprox. € 57.69)
Shipment: € 17.951
OrderSponsored link
Leon Chua:
Practical Numerical Algorithms for Chaotic Systems - Paperback

2011

ISBN: 1461281210

[EAN: 9781461281214], Neubuch, [SC: 17.95], [PU: Springer New York Dez 2011], NONLINEARSYSTEM; BIFURCATION; STABILITY; SYSTEM, Druck auf Anfrage Neuware - Printed after ordering - One of … More...

NEW BOOK. Shipping costs: EUR 17.95 AHA-BUCH GmbH, Einbeck, Germany [51283250] [Rating: 5 (von 5)]
4
Practical Numerical Algorithms for Chaotic Systems - Leon Chua
Order
at ZVAB.com
$ 62.32
(aprox. € 57.68)
Shipment: € 35.621
OrderSponsored link
Leon Chua:
Practical Numerical Algorithms for Chaotic Systems - Paperback

2011, ISBN: 1461281210

[EAN: 9781461281214], Neubuch, [SC: 35.62], [PU: Springer New York Dez 2011], NONLINEARSYSTEM; BIFURCATION; STABILITY; SYSTEM, Druck auf Anfrage Neuware - Printed after ordering - One of … More...

NEW BOOK. Shipping costs: EUR 35.62 AHA-BUCH GmbH, Einbeck, Germany [51283250] [Rating: 5 (von 5)]
5
Practical Numerical Algorithms for Chaotic Systems Thomas S. Parker Author
Order
at BarnesandNoble.com
€ 54.99
OrderSponsored link
Practical Numerical Algorithms for Chaotic Systems Thomas S. Parker Author - new book

ISBN: 9781461281214

One of the basic tenets of science is that deterministic systems are completely predictable-given the initial condition and the equations describing a system, the behavior of the system c… More...

new in stock. Shipping costs:zzgl. Versandkosten., plus shipping costs

1As some platforms do not transmit shipping conditions to us and these may depend on the country of delivery, the purchase price, the weight and size of the item, a possible membership of the platform, a direct delivery by the platform or via a third-party provider (Marketplace), etc., it is possible that the shipping costs indicated by find-more-books.com / find-more-books.com do not correspond to those of the offering platform.

Bibliographic data of the best matching book

Details of the book
Practical Numerical Algorithms for Chaotic Systems Thomas S. Parker Author

One of the basic tenets of science is that deterministic systems are completely predictable-given the initial condition and the equations describing a system, the behavior of the system can be predicted 1 for all time. The discovery of chaotic systems has eliminated this viewpoint. Simply put, a chaotic system is a deterministic system that exhibits random behavior. Though identified as a robust phenomenon only twenty years ago, chaos has almost certainly been encountered by scientists and engi­ neers many times during the last century only to be dismissed as physical noise. Chaos is such a wide-spread phenomenon that it has now been reported in virtually every scientific discipline: astronomy, biology, biophysics, chemistry, engineering, geology, mathematics, medicine, meteorology, plasmas, physics, and even the social sci­ ences. It is no coincidence that during the same two decades in which chaos has grown into an independent field of research, computers have permeated society. It is, in fact, the wide availability of inex­ pensive computing power that has spurred much of the research in chaotic dynamics. The reason is simple: the computer can calculate a solution of a nonlinear system. This is no small feat. Unlike lin­ ear systems, where closed-form solutions can be written in terms of the system's eigenvalues and eigenvectors, few nonlinear systems and virtually no chaotic systems possess closed-form solutions.

Details of the book - Practical Numerical Algorithms for Chaotic Systems Thomas S. Parker Author


EAN (ISBN-13): 9781461281214
ISBN (ISBN-10): 1461281210
Hardcover
Paperback
Publishing year: 2011
Publisher: Springer New York Core >1 >T

Book in our database since 2013-06-27T05:12:49-04:00 (New York)
Detail page last modified on 2024-03-06T10:28:28-05:00 (New York)
ISBN/EAN: 1461281210

ISBN - alternate spelling:
1-4612-8121-0, 978-1-4612-8121-4
Alternate spelling and related search-keywords:
Book author: parker thomas, leon chua, park
Book title: practical numerical, numerical algorithms


Information from Publisher

Author: Thomas S. Parker; Leon Chua
Title: Practical Numerical Algorithms for Chaotic Systems
Publisher: Springer; Springer US
348 Pages
Publishing year: 2011-12-21
New York; NY; US
Printed / Made in
Weight: 0,557 kg
Language: English
53,49 € (DE)
54,99 € (AT)
59,00 CHF (CH)
POD
XIV, 348 p.

BC; Systems Theory, Control; Hardcover, Softcover / Mathematik/Sonstiges; Kybernetik und Systemtheorie; Verstehen; Nonlinear system; algorithms; bifurcation; stability; system; Calculus of Variations and Optimal Control; Optimization; Math. Applications in Chemistry; Computational Intelligence; Systems Theory, Control; Calculus of Variations and Optimization; Mathematical Applications in Chemistry; Computational Intelligence; Optimierung; Quanten- und theoretische Chemie; Künstliche Intelligenz; BB

1 Steady-State Solutions.- 1.1 Systems.- 1.1.1 Autonomous continuous-time dynamical systems.- 1.1.2 Non-autonomous continuous-time dynamical systems.- 1.1.3 Relationship between autonomous and non-autonomous systems.- 1.1.4 Useful facts regarding continuous-time dynamical systems.- 1.1.5 Discrete-time systems.- 1.2 Limit sets.- 1.2.1 Equilibrium points.- 1.2.2 Periodic solutions.- 1.2.3 Quasi-periodic solutions.- 1.2.4 Chaos.- 1.2.5 Predictive power.- 1.3 Summary.- 2 Poincaré Maps.- 2.1 Definitions.- 2.1.1 The Poincaré map for non-autonomous systems.- 2.1.2 The Poincaré map for autonomous systems.- 2.2 Limit Sets.- 2.2.1 Equilibrium points.- 2.2.2 Periodic solutions.- 2.2.3 Quasi-periodic solutions.- 2.2.4 Chaos.- 2.3 Higher-order Poincaré maps.- 2.4 Algorithms.- 2.4.1 Choosing the hyperplane ?.- 2.4.2 Locating hyperplane crossings.- 2.5 Summary.- 3 Stability.- 3.1 Eigenvalues.- 3.2 Characteristic multipliers.- 3.2.1 Characteristic multipliers.- 3.2.2 Characteristic multipliers and the variational equation.- 3.2.3 Characteristic multipliers and equilibrium points.- 3.3 Lyapunov exponents.- 3.3.1 Definition.- 3.3.2 Lyapunov exponents of an equilibrium point.- 3.3.3 Lyapunov numbers of a fixed point.- 3.3.4 Perturbation subspaces.- 3.3.5 Lyapunov exponents of non-chaotic limit sets.- 3.3.6 Lyapunov exponents of chaotic attractors.- 3.4 Algorithms.- 3.4.1 Eigenvalues at an equilibrium point.- 3.4.2 Characteristic multipliers.- 3.4.3 Lyapunov exponents.- 3.5 Summary.- 4 Integration.- 4.1 Types.- 4.2 Integration error.- 4.2.1 Local errors.- 4.2.2 Global errors.- 4.2.3 Numerical stability.- 4.3 Stiff equations.- 4.4 Practical considerations.- 4.4.1 Variable step-size and order.- 4.4.2 Output points.- 4.4.3 Solving implicit equations.- 4.4.4 Error considerations.- 4.4.5 Integrating chaotic systems.- 4.4.6 Start-up costs.- 4.5 Summary.- 5 Locating Limit Sets.- 5.1 Introduction.- 5.1.1 Brute-force approach.- 5.1.2 Newton-Raphson approach.- 5.2 Equilibrium points.- 5.3 Fixed points.- 5.4 Closed orbits.- 5.5 Periodic solutions.- 5.5.1 The non-autonomous case.- 5.5.2 The autonomous case.- 5.6 Two-periodic solutions.- 5.6.1 Finite differences.- 5.6.2 Spectral balance.- 5.7 Chaotic solutions.- 5.8 Summary.- 6 Manifolds.- 6.1 Definitions and theory.- 6.1.1 Continuous-time systems.- 6.1.2 Discrete-time systems.- 6.2 Algorithms.- 6.2.1 Continuous-time systems.- 6.2.2 Discrete-time systems.- 6.3 Summary.- 7 Dimension.- 7.1 Dimension.- 7.1.1 Definitions.- 7.1.2 Algorithms.- 7.2 Reconstruction.- 7.3 Summary.- 8 Bifurcation Diagrams.- 8.1 Definitions.- 8.2 Algorithms.- 8.2.1 Brute force.- 8.2.2 Continuation.- 8.3 Summary.- 9 Programming.- 9.1 The user interface.- 9.1.1 The dynamical system interface.- 9.1.2 The program initialization interface.- 9.1.3 The interactive interface.- 9.2 Languages.- 9.2.1 Modular design.- 9.3 Library definitions.- 9.3.1 RKF—Runge-Kutta-Fehlberg integration.- 9.3.2 PARSE—input parsing routines.- 9.3.3 BINFILE—binary data files.- 9.3.4 GRAF—graphics.- 10 Phase Portraits.- 10.1 Trajectories.- 10.1.1 Selection of initial conditions.- 10.1.2 Calculating the trajectory.- 10.1.3 Arrowheads.- 10.1.4 Drawing the vector field.- 10.2 Limit sets.- 10.2.1 Equilibrium points.- 10.2.2 Limit cycles.- 10.2.3 Index.- 10.3 Basins.- 10.3.1 Definitions.- 10.3.2 Examples.- 10.3.3 Calculating boundaries of basins of attraction.- 10.4 Programming tips.- 10.4.1 Consistency checking.- 10.4.2 History files.- 10.5 Summary.- A The Newton-Raphson Algorithm.- B The Variational Equation.- C Differential Topology.- C.1 Differential topology.- C.2 Structural stability.- D The Poincaré Map.- E One Lyapunov Exponent Vanishes.- F Cantor Sets.- G List of Symbols.

More/other books that might be very similar to this book

Latest similar book:
9781461238447 Construction of Arithmetical Meanings and Strategies (Paul Cobb; Leslie P. Steffe)


< to archive...