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＜電子ブック＞
Nonlinear Waves and Weak Turbulence : with Applications in Oceanography and Condensed Matter Physics / by FITZMAURICE, GURARIE, MCCAUGHAN, WOYCZYNSKI
(Progress in Nonlinear Differential Equations and Their Applications. ISSN:23740280 ; 11)

版	1st ed. 1993.
出版者	(Boston, MA : Birkhäuser Boston : Imprint: Birkhäuser)
出版年	1993
本文言語	英語
大きさ	XVI, 345 p : online resource
著者標目	*FITZMAURICE author GURARIE author MCCAUGHAN author WOYCZYNSKI author SpringerLink (Online service)
件　名	LCSH:Engineering mathematics LCSH:Engineering -- Data processing  全ての件名で検索 LCSH:Earth sciences LCSH:Mathematics FREE:Mathematical and Computational Engineering Applications FREE:Earth Sciences FREE:Applications of Mathematics
一般注記	I Hamiltonian Systems -- 1 Turbulence in Hamiltonian Systems -- 2 Revised Universality Concept in the Turbulence Theory -- 3 Wave Spectra of Developed Seas -- 4 Gravity Waves in the Large Scales of the Atmosphere -- 5 Physical Applications of Wave Turbulence: Wind Waves and Classical Collective Modes -- 6 Strong and Weak Turbulence for Gravity Waves and the Cubic Schrödinger Equation -- 7 Hidden Symmetries of Hamiltonian Systems over Holomorphic Curves -- II Flow Stability -- 8 Chaotic Motion in Unsteady Vortical Flows -- 9 Oblique Instability Waves in Nearly Parallel Shear Flows -- 10 Modeling Turbulence by Systems of Coupled Gyrostats -- III Nonlinear Waves in Condensed Matter -- 11 Soliton Turbulence in Nonlinear Optical Phenomena -- 12 Solitons Propagation in Optical Fibers with Random Parameters -- 13 Collision Dynamics of Solitary Waves in Nematic Liquid Crystals -- IV Statistical Problems -- 14 Statistical Mechanics, Euler’s Equation, and Jupiter’s Red Spot -- 15 Stochastic Burgers’ Flows -- 16 Long Range Prediction and Scaling Limit for Statistical Solutions of the Burgers’ Equation -- 17 A Remark on Shocks in Inviscid Burgers’ Turbulence This book is an outgrowth of the NSF-CBMS conference Nonlinear Waves £3 Weak Turbulence held at Case Western Reserve University in May 1992. The principal speaker at the conference was Professor V. E. Zakharov who delivered a series of ten lectures outlining the historical and ongoing developments in the field. Some twenty other researchers also made presentations and it is their work which makes up the bulk of this text. Professor Zakharov's opening chapter serves as a general introduction to the other papers, which for the most part are concerned with the application of the theory in various fields. While the word "turbulence" is most often associated with f:l. uid dynamics it is in fact a dominant feature of most systems having a large or infinite number of degrees of freedom. For our purposes we might define turbulence as the chaotic behavior of systems having a large number of degrees of freedom and which are far from thermodynamic equilibrium. Work in field can be broadly divided into two areas: • The theory of the transition from smooth laminar motions to the disordered motions characteristic of turbulence. • Statistical studies of fully developed turbulent systems. In hydrodynamics, work on the transition question dates back to the end of the last century with pioneering contributions by Osborne Reynolds and Lord Rayleigh HTTP:URL=https://doi.org/10.1007/978-1-4612-0331-5

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