| Type de publication : |
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Articles dans des revues avec comité de lecture |
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| Domaine : |
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Mathématiques/Equations aux dérivées partielles
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| Titre : |
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Planar traveling waves in capillary fluids |
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| Auteur(s) : |
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Sylvie Benzoni-Gavage ( ,  ) 1 |
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| Laboratoire : |
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| 1 : |
Institut Camille Jordan (ICJ) |
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CNRS : UMR5208 – Université Claude Bernard - Lyon I – Ecole Centrale de Lyon – Institut National des Sciences Appliquées (INSA) - Lyon |
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Bât. Jean Braconnier n° 101 43 Bd du 11 novembre 1918 69622 VILLEURBANNE CEDEX |
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France |
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| Résumé : |
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By capillary fluids we mean compressible, inviscid fluids whose energy depends not only on their density but also on their density gradient. Their motion is thus governed by systems of conservation laws, either in Eulerian coordinates or in Lagrangian coordinates, that are higher order modification of the usual equations of gas dynamics. In both settings, we receive models that also arise in other fields, in particular in water waves theory and quantum hydrodynamics. Those Hamiltonian systems typically admit three types of planar traveling waves, namely, heteroclinic, homoclinic, and periodic ones. The purpose here is to review the main tools and results regarding the stability of those waves, under most general assumptions on the energy law. Special attention is devoted to the correspondence between traveling waves in Eulerian coordinates and those in Lagrangian coordinates. |
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Langue du texte
intégral : |
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Anglais |
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Date de production,
écriture : |
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14/02/2012 |
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| Journal : |
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Differential and integral equations |
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| Audience : |
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internationale |
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| Date de publication : |
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2013 |
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| Volume : |
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26 |
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| Numéro : |
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3-4 |
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| Page, identifiant, ... : |
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433-478 |
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| Mots Clés : |
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Lagrangian coordinates – kink – soliton – periodic wave – orbital stability – Boussinesq's moment of instability – Benjamin's impulse – Evans function – Krein signature – Whitham modulated equations. |
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