Universality in Chaos, 2nd edition
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€248.00
A. Libchaber
A. Rossi
advanced chaos theory applications
Alan Wolf
Albert B. Zisook
Alvin Shrier
B. A. Huberman
Belousov Zhabotinskii Reaction
bifurcation theory
Boris I. Shraiman
Boris Shraiman
C. Eugene Wayne
C. Laroche
C. Vidal
Cantor Set
Carson Jeffries
Category=PH
Chaotic Regime
Claudio Tebaldi
Convective Rolls
cycle
D. Farmer
D.J. Scalapino
David Ruelle
Dennis Sullivan
deterministic chaos
differential
dynamical systems analysis
E.B. Vul
Edward N. Lorenz
eq_bestseller
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
eq_non-fiction
eq_science
equation
F. T. Arecchi(a)
fixed
Follow
fractal geometry
G. Jones
G. Puccioni
H. Koch
Harry L. Swinney
Henri Epsteint
Hopf Bifurcations
Itamar Procaccia
J. C. Mankin
J. Crutchfield
J. Doyne Farmer
J. L. Hudson
J. Maurer
J. P. Gollub
J. Rudnick
J. Tredicce
J.-P. Eckmann
J.C. Roux
J.E. Hirsch
J.P. Crutchfield
Jack Swift
James Testa
Jose Perez
Josephson Junctions
K.M. Khanin
Leo P. Kadanoff
Leon Glass
limit
Limit Cycle
M. Dubois
M. Henon
M. L. Stein
M. Nauenberg
map
Marzio Giglio
Michael R. Guevara
Mitchell J Feigenbaum
Mogens H. Jensen
Mogens Hogh Jensen
N. Metropolis
N. Packard
nonlinear dynamics
Ordinary Differential Equations
Oscar E. Lanford
Oscillatory Instability
P. Berge
P. Collet
P. Manneville
P. R. Stein
PACS
Paul C. Martin
Paul Manneville
Per Bak
Period Doubling
Period Doubling Bifurcation
Periodic Orbit
phase
Pitchfork
Pitchfork Bifurcations
poincare
point
Power Spectra
Predrag Cvitanovic
R. Meucci
R. Shaw
R.J. Donnelly
Rayleigh Number
Return Map
Reuben H. Simoyi
Robert H.G. Helleman
Robert M. May
Robert S. MacKay
S. Bachelart
S. Fauve
S. Grossmann
S. Thomae
Scott J.+ Shenker
Sergio Musazzi
space
Strange Attractor
Strange Attractors
Superposed
Thomas C. Halsey
Tomas Bohr
turbulence modeling
Umberto Perini
Universal Number
Valter Franceschini
Vice Versa
Winding Number
Y. Pomeau
Ya.G. Sinai
Yves Pomeau
Product details
- ISBN 9781138429734
- Weight: 453g
- Dimensions: 156 x 234mm
- Publication Date: 21 Aug 2017
- Publisher: Taylor & Francis Ltd
- Publication City/Country: GB
- Product Form: Hardback
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Nature provides many examples of physical systems that are described by deterministic equations of motion, but that nevertheless exhibit nonpredictable behavior. The detailed description of turbulent motions remains perhaps the outstanding unsolved problem of classical physics. In recent years, however, a new theory has been formulated that succeeds in making quantitative predictions describing certain transitions to turbulence. Its significance lies in its possible application to large classes (often very dissimilar) of nonlinear systems.
Since the publication of Universality in Chaos in 1984, progress has continued to be made in our understanding of nonlinear dynamical systems and chaos. This second edition extends the collection of articles to cover recent developments in the field, including the use of statistical mechanics techniques in the study of strange sets arising in dynamics. It concentrates on the universal aspects of chaotic motions, the qualitative and quantitative predictions that apply to large classes of physical systems. Much like the previous edition, this book will be an indispensable reference for researchers and graduate students interested in chaotic dynamics in the physical, biological, and mathematical sciences as well as engineering.
