The Hartree and Vlasov equations at positive density

Mathieu Lewin; Julien Sabin

doi:10.1080/03605302.2020.1803355

The Hartree and Vlasov equations at positive density

Mathieu Lewin
, Julien Sabin

Université Paris Dauphine
Laboratoire de Mathématiques d'Orsay

Research output: Contribution to journal › Article › peer-review

Abstract

We consider the nonlinear Hartree and Vlasov equations around a translation-invariant (homogeneous) stationary state in infinite volume, for a short range interaction potential. For both models, we consider time-dependent solutions which have a finite relative energy with respect to the reference translation-invariant state. We prove the convergence of the Hartree solutions to the Vlasov ones in a semi-classical limit and obtain as a by-product global well-posedness of the Vlasov equation in the (relative) energy space.

Original language	English
Pages (from-to)	1702-1754
Number of pages	53
Journal	Communications in Partial Differential Equations
Volume	45
Issue number	12
DOIs	https://doi.org/10.1080/03605302.2020.1803355
Publication status	Published - 9 Sept 2020
Externally published	Yes

Keywords

Hartree equation
positive density
semiclassical analysis

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10.1080/03605302.2020.1803355

Cite this

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abstract = "We consider the nonlinear Hartree and Vlasov equations around a translation-invariant (homogeneous) stationary state in infinite volume, for a short range interaction potential. For both models, we consider time-dependent solutions which have a finite relative energy with respect to the reference translation-invariant state. We prove the convergence of the Hartree solutions to the Vlasov ones in a semi-classical limit and obtain as a by-product global well-posedness of the Vlasov equation in the (relative) energy space.",

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AB - We consider the nonlinear Hartree and Vlasov equations around a translation-invariant (homogeneous) stationary state in infinite volume, for a short range interaction potential. For both models, we consider time-dependent solutions which have a finite relative energy with respect to the reference translation-invariant state. We prove the convergence of the Hartree solutions to the Vlasov ones in a semi-classical limit and obtain as a by-product global well-posedness of the Vlasov equation in the (relative) energy space.

KW - Hartree equation

KW - positive density

KW - semiclassical analysis

U2 - 10.1080/03605302.2020.1803355

DO - 10.1080/03605302.2020.1803355

M3 - Article

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JO - Communications in Partial Differential Equations

JF - Communications in Partial Differential Equations

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ER -

The Hartree and Vlasov equations at positive density

Abstract

Keywords

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