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Nonlinear waves and weak turbulence / V. E. ZAKHAROV (Cop. 1998)
Titre : Nonlinear waves and weak turbulence Type de document : texte imprimé Auteurs : V. E. ZAKHAROV, Editeur scientifique Editeur : Providence, R. I. [Etats Unis] : American Mathematical Society Année de publication : Cop. 1998 Collection : American Mathematical Society Translations. Series 2, ISSN 0065-9290 num. 183 Importance : X-197 p. ISBN/ISSN/EAN : 978-0-8218-4113-6 Langues : Anglais Langues originales : Russe Catégories : 76B15
76C20Mots-clés : onde non-linéaire faible turbulence Résumé : This book is a collection of papers on dynamical and statistical theory of nonlinear wave propagation in dispersive conservative media. Emphasis is on waves on the surface of an ideal fluid and on Rossby waves in the atmosphere. Although the book deals mainly with weakly nonlinear waves, it is more than simply a description of standard perturbation techniques. The goal is to show that the theory of weakly interacting waves is naturally related to such areas of mathematics as Diophantine equations, differential geometry of waves, Poincare normal forms, and the inverse scattering method. Note de contenu : références Nonlinear waves and weak turbulence [texte imprimé] / V. E. ZAKHAROV, Editeur scientifique . - Providence, R. I. (Etats Unis) : American Mathematical Society, Cop. 1998 . - X-197 p.. - (American Mathematical Society Translations. Series 2, ISSN 0065-9290; 183) .
ISBN : 978-0-8218-4113-6
Langues : Anglais Langues originales : Russe
Catégories : 76B15
76C20Mots-clés : onde non-linéaire faible turbulence Résumé : This book is a collection of papers on dynamical and statistical theory of nonlinear wave propagation in dispersive conservative media. Emphasis is on waves on the surface of an ideal fluid and on Rossby waves in the atmosphere. Although the book deals mainly with weakly nonlinear waves, it is more than simply a description of standard perturbation techniques. The goal is to show that the theory of weakly interacting waves is naturally related to such areas of mathematics as Diophantine equations, differential geometry of waves, Poincare normal forms, and the inverse scattering method. Note de contenu : références Exemplaires
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