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Limite incompressible de solutions du système d’Euler compressible 2-D dans certains cas mal préparés

Alexandre Dutrifoy

Séminaire Équations aux dérivées partielles

Les effets dispersifs permettent de passer à la limite dans le système d’Euler compressible 2-D isentropique, quand le nombre de Mach tend vers zéro, même si les données initiales ne sont pas uniformément régulières. Ceci mène à des résultats de convergence vers des solutions non régulières du système d’Euler incompressible, comme les poches de tourbillon ou les solutions de Yudovich.

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