Pierre Degond scite author profile

We consider the discrete Couzin-Vicsek algorithm (CVA) [1,9,19,36], which describes the interactions of individuals among animal societies such as fish schools. In this article, we propose a kinetic (mean-field) version of the CVA model and provide its formal macroscopic limit. The final macroscopic model involves a conservation equation for the density of the individuals and a non conservative equation for the director of the mean velocity and is proved to be hyperbolic. The derivation is based on the introduction of a non-conventional concept of a collisional invariant of a collision operator.Acknowledgements: The first author wishes to thank E. Carlen and M. Carvalho for their interest in this work and their helpful suggestions.

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Global existence for the Vlasov-Poisson equation in 3 space variables with small initial data

Bardos¹,

Degond²

1985

Ann. Inst. H. Poincaré C Anal. Non Linéaire

251

236

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Global existence for the Vlasov-Poisson equation in 3 space variables with small initial data Annales de l'I. H. P., section C, tome 2, n o 2 (1985), p. 101-118 © Gauthier-Villars, 1985, tous droits réservés. L'accès aux archives de la revue « Annales de l'I. H. P., section C » (http://www.elsevier.com/locate/anihpc) implique l'accord avec les conditions générales d'utilisation (http://www.numdam.org/conditions). Toute utilisation commerciale ou impression systématique est constitutive d'une infraction pénale. Toute copie ou impression de ce fichier doit contenir la présente mention de copyright. Article numérisé dans le cadre du programme Numérisation de documents anciens mathématiques http://www.numdam.org/ Global existence for the Vlasov-Poisson equation in 3 space variables with small initial data C. BARDOS (1) and P. DEGOND (2)

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Kinetic formulation and global existence for the Hall-Magneto-hydrodynamics system

et al. 2011

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This paper deals with the derivation and analysis of the the Hall Magneto-Hydrodynamic equations. We first provide a derivation of this system from a twofluids Euler-Maxwell system for electrons and ions, through a set of scaling limits. We also propose a kinetic formulation for the Hall-MHD equations which contains as fluid closure different variants of the Hall-MHD model. Then, we prove the existence of global weak solutions for the incompressible viscous resistive Hall-MHD model. We use the particular structure of the Hall term which has zero contribution to the energy identity. Finally, we discuss particular solutions in the form of axisymmetric purely swirling magnetic fields and propose some regularization of the Hall equation.

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On a hierarchy of macroscopic models for semiconductors

1996

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This paper shows that various models of electron transport in semiconductors that have been previously proposed in the literature can be connected one with each other by the diffusion approximation methodology. We first investigate the diffusion limit of the semiconductor Boltzmann equation towards the so-called ‘‘spherical harmonic expansion model,’’ under the assumption of dominant elastic scattering. Then, this model is again connected, either to the energy-transport model or to a ‘‘periodic spherical harmonic expansion model’’ through a diffusion approximation, respectively making electron–electron or phonon scattering large. We provide the mathematical background which makes the Hilbert expansions associated with these various diffusion limits rigorous.

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Pierre Degond

Continuum Limit of Self-Driven Particles With Orientation Interaction

Global existence for the Vlasov-Poisson equation in 3 space variables with small initial data

Kinetic formulation and global existence for the Hall-Magneto-hydrodynamics system

On a hierarchy of macroscopic models for semiconductors

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