From Vlasov Equation to Degenerate Nonlocal Cahn-Hilliard Equation

Elbar, Charles; Mason, Marco; Perthame, Benôıt; Skrzeczkowski, Jakub

doi:10.1007/s00220-023-04663-3

Cited by 6 publications

(3 citation statements)

References 113 publications

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“…The existence of solutions and their regularity is standard for the Cahn-Hilliard equation, see [28,29]. Thus, we admit here the first part of Theorem 1 and refer to an extended version of the present paper in [30] for details. Weak solutions are defined as follows: Definition 4 (Weak solutions).…”

Section: Existence Regularity and Long Term Behaviormentioning

confidence: 95%

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Pressure jump and radial stationary solutions of the degenerate Cahn–Hilliard equation

Elbar¹,

Perthame²,

Skrzeczkowski³

2024

Comptes Rendus. Mécanique

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The Cahn-Hilliard equation with degenerate mobility is used in several areas including the modeling of living tissues, following the theory of mixtures. We are interested in quantifying the pressure jump at the interface between phases in the case of incompressible flows. To do so, we depart from the spherically symmetric dynamical compressible model and include an external force. We prove existence of stationary states as limits of the parabolic problems. Then we prove the incompressible limit and characterize compactly supported stationary solutions. This allows us to compute the pressure jump in the small dispersion regime and in particular the force dependent curvature effect.Résumé. L'équation de Cahn-Hilliard avec mobilité dégénérée est utilisée dans différents domaines, en particulier la description de tissus vivants suivant la théorie des mélanges. Nous visons à quantifier le saut de pression à l'interface entre phases dans le cas de flots incompressibles. Pour cela, nous considérons des solutions à symmétrie radiale du problème compressible. Nous démontrons l'existence d'états stationnaires comme limite du problème d'évolution. Nous prouvons ensuite la limite incompressible et caratérisons les solutions à support compact. Ceci nous permet de calculer le saut de pression dans le régime de faible dispersion et en particulier d'obtenir la dépendance en la courbure suivant la force appliquée.

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Section: Existence Regularity and Long Term Behaviormentioning

confidence: 95%

“…Before proving this proposition, we first state a useful lemma that we admit, and refer the reader to [30] for the details.…”

Section: Proof Of Theorem 1 (Long Term Asymptotics)mentioning

confidence: 99%