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Nonlinear Wave Dynamics: Complexity and Simplicity (Texts in the Mathematical Sciences, 17)

Nonlinear Wave Dynamics: Complexity and Simplicity (Texts in the Mathematical Sciences, 17)

Nonlinear Wave Dynamics: Complexity and Simplicity (Texts in the Mathematical
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Nonlinear Wave Dynamics: Complexity and Simplicity (Texts in the Mathematical Sciences, 17) Hardback - 1997 - 1997th Edition

by Engelbrecht, J

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  • Title Nonlinear Wave Dynamics: Complexity and Simplicity (Texts in the Mathematical Sciences, 17)
  • Author Engelbrecht, J
  • Binding Hardback
  • Edition number 1997th
  • Edition 1997
  • Condition Used - Good
  • Pages 185
  • Volumes 1
  • Language ENG
  • Publisher Springer, Dordrecht, The Netherlands
  • Publication date 1997-05-31
  • Illustrated Yes
  • Features Bibliography, Illustrated, Index
  • Bookseller's Inventory # 0792345088.G
  • ISBN 9780792345084 / 0792345088
  • Weight 1.02 lbs (0.46 kg)
  • Dimensions 9.21 x 6.14 x 0.5 in (23.39 x 15.60 x 1.27 cm)
  • Category Technology & Industrial Arts
  • Library of Congress subjects Nonlinear waves, Wave motion, Theory of
  • Library of Congress Catalogue Number 97012177
  • Dewey Decimal Code 531.113
  • Quantity available 1

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Reader reviews for Nonlinear Wave Dynamics: Complexity and Simplicity (Texts in the Mathematical Sciences, 17)

From the publisher

At the end of the twentieth century, nonlinear dynamics turned out to be one of the most challenging and stimulating ideas. Notions like bifurcations, attractors, chaos, fractals, etc. have proved to be useful in explaining the world around us, be it natural or artificial. However, much of our everyday understanding is still based on linearity, i. e. on the additivity and the proportionality. The larger the excitation, the larger the response-this seems to be carved in a stone tablet. The real world is not always reacting this way and the additivity is simply lost. The most convenient way to describe such a phenomenon is to use a mathematical term-nonlinearity. The importance of this notion, i. e. the importance of being nonlinear is nowadays more and more accepted not only by the scientific community but also globally. The recent success of nonlinear dynamics is heavily biased towards temporal characterization widely using nonlinear ordinary differential equations. Nonlinear spatio-temporal processes, i. e. nonlinear waves are seemingly much more complicated because they are described by nonlinear partial differential equations. The richness of the world may lead in this case to coherent structures like solitons, kinks, breathers, etc. which have been studied in detail. Their chaotic counterparts, however, are not so explicitly analysed yet. The wavebearing physical systems cover a wide range of phenomena involving physics, solid mechanics, hydrodynamics, biological structures, chemistry, etc.
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