Your search keyword '"Daniel Han-Kwan"' showing total 19 results

1. Concentration versus absorption for the Vlasov-Navier-Stokes system on bounded domains

Author

Lucas Ertzbischoff, Ayman Moussa, Daniel Han-Kwan, Centre de Mathématiques Laurent Schwartz (CMLS), Centre National de la Recherche Scientifique (CNRS)-École polytechnique (X), Laboratoire Jacques-Louis Lions (LJLL (UMR_7598)), and Sorbonne Université (SU)-Centre National de la Recherche Scientifique (CNRS)-Université de Paris (UP)

Subjects

Applied Mathematics, 010102 general mathematics, Mathematical analysis, General Physics and Astronomy, Statistical and Nonlinear Physics, 01 natural sciences, Domain (mathematical analysis), Exponential function, 010101 applied mathematics, symbols.namesake, Mathematics - Analysis of PDEs, Distribution function, Flow velocity, Bounded function, Dirichlet boundary condition, FOS: Mathematics, symbols, Boundary value problem, 0101 mathematics, [MATH]Mathematics [math], Absorption (electromagnetic radiation), Mathematical Physics, Analysis of PDEs (math.AP), Mathematics

Abstract

We study the large time behaviour of small data solutions to the Vlasov–Navier–Stokes system set on Ω × R 3 , for a smooth bounded domain Ω of R 3 , with homogeneous Dirichlet boundary condition for the fluid and absorption boundary condition for the kinetic phase. We prove that the fluid velocity homogenizes to 0 while the distribution function concentrates towards a Dirac mass in velocity centred at 0, with an exponential rate. The proof, which follows the methods introduced in Han-Kwan et al (2020 Arch. Ration. Mech. Anal. 236 1273–323), requires a careful analysis of the boundary effects. We also exhibit examples of classes of initial data leading to a variety of asymptotic behaviours for the kinetic density, from total absorption to no absorption at all.

Published

2021

2. Quasineutral limit for Vlasov–Poisson via Wasserstein stability estimates in higher dimension

Author

Mikaela Iacobelli, Daniel Han-Kwan, Centre de Mathématiques Laurent Schwartz (CMLS), École polytechnique (X)-Centre National de la Recherche Scientifique (CNRS), Department of Pure Mathematics and Mathematical Statistics (DPMMS), Faculty of mathematics Centre for Mathematical Sciences [Cambridge] (CMS), and University of Cambridge [UK] (CAM)-University of Cambridge [UK] (CAM)

Subjects

Work (thermodynamics), Applied Mathematics, 010102 general mathematics, Mathematical analysis, Poisson distribution, 01 natural sciences, Stability (probability), 010101 applied mathematics, symbols.namesake, Dimension (vector space), Physics::Plasma Physics, Physics::Space Physics, symbols, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Limit (mathematics), 0101 mathematics, ComputingMilieux_MISCELLANEOUS, Analysis, Mathematics

Abstract

This work is concerned with the quasineutral limit of the Vlasov–Poisson system in two and three dimensions. We justify the formal limit for very small but rough perturbations of analytic initial data, generalizing the results of [12] to higher dimension.

Published

2017

3. Large time behavior of the Vlasov-Navier-Stokes system on the torus

Author

Iván Moyano, Ayman Moussa, Daniel Han-Kwan, Centre de Mathématiques Laurent Schwartz (CMLS), Centre National de la Recherche Scientifique (CNRS)-École polytechnique (X), Laboratoire Jacques-Louis Lions (LJLL), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS), Statistical Laboratory [Cambridge], Department of Pure Mathematics and Mathematical Statistics (DPMMS), Faculty of mathematics Centre for Mathematical Sciences [Cambridge] (CMS), University of Cambridge [UK] (CAM)-University of Cambridge [UK] (CAM)-Faculty of mathematics Centre for Mathematical Sciences [Cambridge] (CMS), University of Cambridge [UK] (CAM)-University of Cambridge [UK] (CAM), and ANR-19-CE40-0004,SALVE,Singularités dans des limites asymptotiques d'équations de Vlasov(2019)

Subjects

Physics, Mechanical Engineering, Dirac (video compression format), 010102 general mathematics, Mathematical analysis, Complex system, Structure (category theory), Mathematics::Analysis of PDEs, Torus, Type (model theory), 01 natural sciences, Exponential function, 010101 applied mathematics, Mathematics (miscellaneous), Distribution function, Mathematics - Analysis of PDEs, FOS: Mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], 0101 mathematics, Analysis, Energy (signal processing), Analysis of PDEs (math.AP)

Abstract

International audience; We study the large time behavior of Fujita–Kato type solutions to the Vlasov–Navier–Stokes system set on $\T^3 \times \R^3$. Under the assumption that the initial so-called modulated energy is small enough, we prove that the distribution function converges to a Dirac mass in velocity, with exponential rate. The proof is based on the fine structure of the system and on a bootstrap analysis allowing us to get global bounds on moments.

Published

2019

4. Asymptotic stability of equilibria for screened Vlasov-Poisson systems via pointwise dispersive estimates

Author

Daniel Han-Kwan, Frédéric Rousset, Toan T. Nguyen, Centre de Mathématiques Laurent Schwartz (CMLS), Centre National de la Recherche Scientifique (CNRS)-École polytechnique (X), Pennsylvania State University (Penn State), and Penn State System

Subjects

General Physics and Astronomy, Poisson distribution, Space (mathematics), 01 natural sciences, symbols.namesake, Mathematics - Analysis of PDEs, Exponential stability, 0103 physical sciences, FOS: Mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Landau damping, 0101 mathematics, Mathematical Physics, Mathematics, Pointwise, Smoothness (probability theory), Partial differential equation, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Lipschitz continuity, symbols, 010307 mathematical physics, Geometry and Topology, Analysis, Analysis of PDEs (math.AP)

Abstract

We revisit the proof of Landau damping near stable homogenous equilibria of Vlasov-Poisson systems with screened interactions in the whole space $\mathbb{R}^d$ (for $d\geq3$) that was first established by Bedrossian, Masmoudi and Mouhot. Our proof follows a Lagrangian approach and relies on precise pointwise in time dispersive estimates in the physical space for the linearized problem that should be of independent interest. This allows to cut down the smoothness of the initial data required in Bedrossian at al. (roughly, we only need Lipschitz regularity). Moreover, the time decay estimates we prove are essentially sharp, being the same as those for free transport, up to a logarithmic correction., Comment: 25 pages, minor typos fixed

Published

2019

5. Long time estimates for the Vlasov-Maxwell system in the non-relativistic limit

Author

Daniel Han-Kwan, Toan T. Nguyen, Frédéric Rousset, Centre de Mathématiques Laurent Schwartz (CMLS), École polytechnique (X)-Centre National de la Recherche Scientifique (CNRS), Pennsylvania State University (Penn State), Penn State System, Laboratoire de Mathématiques d'Orsay (LMO), and Université Paris-Sud - Paris 11 (UP11)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Physics, Polynomial, 010102 general mathematics, Mathematical analysis, [PHYS.MPHY]Physics [physics]/Mathematical Physics [math-ph], Complex system, FOS: Physical sciences, Inverse, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), 01 natural sciences, Speed of light (cellular automaton), Stability (probability), 010101 applied mathematics, Sobolev space, Arbitrarily large, Mathematics - Analysis of PDEs, FOS: Mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Limit (mathematics), 0101 mathematics, Mathematical Physics, Analysis of PDEs (math.AP)

Abstract

International audience; In this paper, we study the Vlasov-Maxwell system in the non-relativistic limit, that is in the regime where the speed of light is a very large parameter. We consider data lying in the vicinity of homogeneous equilibria that are stable in the sense of Penrose (for the Vlasov-Poisson system), and prove Sobolev stability estimates that are valid for times which are polynomial in terms of the speed of light and of the inverse of size of initial perturbations. We build a kind of higher-order Vlasov-Darwin approximation which allows us to reach arbitrarily large powers of the speed of light.

Published

2018

6. Quasineutral limit for Vlasov-Poisson with Penrose stable data

Author

Daniel Han-Kwan, Frédéric Rousset, Centre de Mathématiques Laurent Schwartz (CMLS), École polytechnique (X)-Centre National de la Recherche Scientifique (CNRS), Laboratoire de Mathématiques d'Orsay (LMO), Université Paris-Sud - Paris 11 (UP11)-Centre National de la Recherche Scientifique (CNRS), Han-Kwan, Daniel, and Centre National de la Recherche Scientifique (CNRS)-Université Paris-Sud - Paris 11 (UP11)

Subjects

Physics, General Mathematics, 010102 general mathematics, Mathematical analysis, Dirac (software), Vlasov equation, Poisson distribution, 01 natural sciences, Stability (probability), 010101 applied mathematics, Sobolev space, symbols.namesake, Mathematics - Analysis of PDEs, Distribution (mathematics), Physics::Plasma Physics, Physics::Space Physics, symbols, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Limit (mathematics), [MATH.MATH-AP] Mathematics [math]/Analysis of PDEs [math.AP], 0101 mathematics, Variable (mathematics)

Abstract

International audience; We study the quasineutral limit of a Vlasov-Poisson system that describes the dynamics of ions in a plasma. We handle data with Sobolev regularity under the sharp assumption that the profile of the initial data in the velocity variable satisfies a Penrose stability condition. As a by-product of our analysis, we obtain a well-posedness theory for the limit equation (which is a Vlasov equation with Dirac distribution as interaction kernel) for such data.

Published

2016

7. On the controllability of the relativistic Vlasov–Maxwell system

Author

Olivier Glass and Daniel Han-Kwan

Subjects

Applied Mathematics, General Mathematics, Mathematical analysis, Torus, Magnetic field, Controllability, symbols.namesake, Distribution function, Maxwell's equations, Scheme (mathematics), symbols, Speed of light, Absorption (logic), Mathematics

Abstract

In this paper, we study the controllability of the two-dimensional relativistic Vlasov-Maxwell system in a torus, by means of an interior control. We give two types of results. With the geometric control condition on the control set, we prove the local exact controllability of the system in large time. Our proof in this case is based on the return method, on some results on the control of the Maxwell equations, and on a suitable approximation scheme to solve the non-linear Vlasov-Maxwell system on the torus with an absorption procedure. Without geometric control condition, but assuming that a strip of the torus is contained in the control set and under certain additional conditions on the initial data, we establish a controllability result on the distribution function only, also in large time. Here, we need some additional arguments based on the asymptotics of the Vlasov-Maxwell system with large speed of light and on our previous results concerning the controllability of the Vlasov-Poisson system with an external magnetic field [14].

Published

2015

8. On propagation of higher space regularity for non-linear Vlasov equations

Author

Daniel Han-Kwan

Subjects

Numerical Analysis, Class (set theory), Work (thermodynamics), Applied Mathematics, Mathematical analysis, Context (language use), Space (mathematics), Sobolev space, Nonlinear system, Mathematics - Analysis of PDEs, Physics::Plasma Physics, Norm (mathematics), FOS: Mathematics, 35Q83, kinetic averaging lemmas, kinetic transport equations, Limit (mathematics), Analysis, Mathematics, Analysis of PDEs (math.AP)

Abstract

This work is concerned with the broad question of propagation of regularity for smooth solutions to nonlinear Vlasov equations. For a class of equations (that includes Vlasov–Poisson and relativistic Vlasov–Maxwell systems), we prove that higher regularity in space is propagated, locally in time, into higher regularity for the moments in velocity of the solution. This in turn can be translated into some anisotropic Sobolev higher regularity for the solution itself, which can be interpreted as a kind of weak propagation of space regularity. To this end, we adapt the methods introduced by D. Han-Kwan and F. Rousset (Ann. Sci. Ecole Norm. Sup. 49:6 (2016) 1445–1495) in the context of the quasineutral limit of the Vlasov–Poisson system.

Published

2017

9. Trend to equilibrium and spectral localization properties for the linear Boltzmann equation

Author

Daniel Han-Kwan and Matthieu Léautaud

Subjects

Mathematical analysis, Lattice Boltzmann methods, General Medicine, Statistical physics, Linear boltzmann equation, Boltzmann equation, Boltzmann distribution, Mathematics

Published

2014

10. The quasineutral limit of the Vlasov–Poisson equation in Wasserstein metric

Author

Mikaela Iacobelli, Daniel Han-Kwan, Centre de Mathématiques Laurent Schwartz (CMLS), École polytechnique (X)-Centre National de la Recherche Scientifique (CNRS), Department of Pure Mathematics and Mathematical Statistics (DPMMS), Faculty of mathematics Centre for Mathematical Sciences [Cambridge] (CMS), and University of Cambridge [UK] (CAM)-University of Cambridge [UK] (CAM)

Subjects

Work (thermodynamics), Applied Mathematics, General Mathematics, 010102 general mathematics, Mathematical analysis, 01 natural sciences, Measure (mathematics), Stability (probability), 010101 applied mathematics, Massless particle, Wasserstein metric, Convergence (routing), [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Limit (mathematics), 0101 mathematics, Poisson's equation, ComputingMilieux_MISCELLANEOUS, Mathematics

Abstract

In this work, we study the quasineutral limit of the one-dimensional Vlasov-Poisson equation for ions with massless thermalized electrons. We prove new weak-strong stability estimates in the Wasserstein metric that allow us to extend and improve previously known convergence results. In particular, we show that given a possibly unstable analytic initial profile, the formal limit holds for sequences of measure initial data converging sufficiently fast in the Wasserstein metric to this profile. This is achieved without assuming uniform analytic regularity.

Published

2017

11. The Vlasov-Navier-Stokes system in a 2D pipe: existence and stability of regular equilibria

Author

Ayman Moussa, Olivier Glass, Daniel Han-Kwan, Laboratoire Jacques-Louis Lions (LJLL), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS), CEntre de REcherches en MAthématiques de la DEcision (CEREMADE), Centre National de la Recherche Scientifique (CNRS)-Université Paris Dauphine-PSL, Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL), Centre de Mathématiques Laurent Schwartz (CMLS), and Centre National de la Recherche Scientifique (CNRS)-École polytechnique (X)

Subjects

Mechanical Engineering, 010102 general mathematics, Mathematical analysis, Complex system, Thermodynamics, Hagen–Poiseuille equation, Kinetic energy, 01 natural sciences, Stability (probability), 010101 applied mathematics, Physics::Fluid Dynamics, Mathematics (miscellaneous), Mathematics - Analysis of PDEs, Exponential stability, Phase (matter), FOS: Mathematics, Boundary value problem, 0101 mathematics, [MATH]Mathematics [math], Analysis, Stationary state, Analysis of PDEs (math.AP), Mathematics

Abstract

International audience; In this paper, we study the Vlasov-Navier-Stokes system in a 2D pipe with partially absorbing boundary conditions. We show the existence of stationary states for this system near small Poiseuille flows for the fluid phase, for which the kinetic phase is not trivial. We prove the asymptotic stability of these states with respect to appropriately compactly supported perturbations. The analysis relies on geometric control conditions which help to avoid any concentration phenomenon for the kinetic phase.

Published

2016

12. Nonlinear instability of Vlasov-Maxwell systems in the classical and quasineutral limits

Author

Daniel Han-Kwan and Toan T. Nguyen

Subjects

Applied Mathematics, 010102 general mathematics, Mathematical analysis, Inverse, Order (ring theory), 01 natural sciences, Instability, Classical limit, 010101 applied mathematics, Sobolev space, Computational Mathematics, symbols.namesake, Mathematics - Analysis of PDEs, Physics::Plasma Physics, FOS: Mathematics, symbols, Speed of light, Limit (mathematics), 0101 mathematics, Analysis, Debye length, Analysis of PDEs (math.AP), Mathematics

Abstract

We study the instability of solutions to the relativistic Vlasov--Maxwell systems in two limiting regimes: the classical limit when the speed of light tends to infinity and the quasineutral limit when the Debye length tends to zero. First, in the classical limit, $\varepsilon \to 0$, with $\varepsilon$ being the inverse of the speed of light, we construct a family of solutions that converge initially polynomially fast to a homogeneous solution $\mu$ of Vlasov--Poisson systems in arbitrarily high Sobolev norms, but become of order one away from $\mu$ in arbitrary negative Sobolev norms within time of order $|\log \varepsilon|$. Second, we deduce the invalidity of the quasineutral limit in $L^2$ in arbitrarily short time.

Published

2015

13. Quasineutral limit of the Euler-Poisson system for ions in a domain with boundaries II

Author

Daniel Han-Kwan, David Gérard-Varet, Frédéric Rousset, Institut de Mathématiques de Jussieu (IMJ), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS), Centre de Mathématiques Laurent Schwartz (CMLS), École polytechnique (X)-Centre National de la Recherche Scientifique (CNRS), Laboratoire de Mathématiques d'Orsay (LM-Orsay), and Université Paris-Sud - Paris 11 (UP11)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Physics, Work (thermodynamics), General Mathematics, Astrophysics::High Energy Astrophysical Phenomena, 010102 general mathematics, Mathematical analysis, Boundary (topology), 01 natural sciences, Isothermal process, 010101 applied mathematics, symbols.namesake, Mathematics - Analysis of PDEs, Euler's formula, symbols, FOS: Mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Astrophysics::Solar and Stellar Astrophysics, Supersonic speed, Outflow, Limit (mathematics), 0101 mathematics, Outflow boundary, Astrophysics::Galaxy Astrophysics, Analysis of PDEs (math.AP)

Abstract

International audience; In this paper, we study the quasineutral limit of the isothermal Euler-Poisson equation for ions, in a domain with boundary. This is a follow-up to our previous work \cite{GVHKR}, devoted to no-penetration as well as subsonic outflow boundary conditions. We focus here on the case of supersonic outflow velocities. The structure of the boundary layers and the stabilization mechanism are different.

Published

2014

14. Geometric analysis of the linear Boltzmann equation I. Trend to equilibrium

Author

Matthieu Léautaud, Daniel Han-Kwan, Centre de Mathématiques Laurent Schwartz (CMLS), École polytechnique (X)-Centre National de la Recherche Scientifique (CNRS), Institut de Mathématiques de Jussieu (IMJ), and Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Partial differential equation, Applied Mathematics, 010102 general mathematics, Mathematical analysis, General Physics and Astronomy, Boundary (topology), 01 natural sciences, Boltzmann equation, 010101 applied mathematics, symbols.namesake, Mathematics - Analysis of PDEs, Collision frequency, Bounded function, Phase space, Boltzmann constant, symbols, FOS: Mathematics, Equivalence relation, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Geometry and Topology, 0101 mathematics, Mathematical Physics, Analysis, Mathematics, Analysis of PDEs (math.AP)

Abstract

This work is devoted to the analysis of the linear Boltzmann equation on the torus, in the presence of a force deriving from a potential. The collision operator is allowed to be degenerate in the following two senses: (1) the associated collision kernel may vanish in a large subset of the phase space; (2) we do not assume that it is bounded below by a Maxwellian at infinity in velocity. We study how the association of transport and collision phenomena can lead to convergence to equilibrium, using concepts and ideas from control theory. We prove two main classes of results. On the one hand, we show that convergence towards an equilibrium is equivalent to an almost everywhere geometric control condition. The equilibria (which are not necessarily Maxwellians with our general assumptions on the collision kernel) are described in terms of the equivalence classes of an appropriate equivalence relation involving transport and collisions. On the other hand, we characterize the exponential convergence to equilibrium in terms of the Lebeau constant, which involves some averages of the collision frequency along the flow of the transport. We also explain how to handle the case of linear Boltzmann equations posed on the phase space associated to a compact Riemannian manifold without boundary.

Published

2014

15. Stability issues in the quasineutral limit of the one-dimensional Vlasov-Poisson equation

Author

Maxime Hauray, Daniel Han-Kwan, Institut de Mathématiques de Marseille (I2M), Aix Marseille Université (AMU)-École Centrale de Marseille (ECM)-Centre National de la Recherche Scientifique (CNRS), Centre de Mathématiques Laurent Schwartz (CMLS), Centre National de la Recherche Scientifique (CNRS)-École polytechnique (X), Centre National de la Recherche Scientifique (CNRS)-École Centrale de Marseille (ECM)-Aix Marseille Université (AMU), and École polytechnique (X)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Mathematical analysis, [PHYS.MPHY]Physics [physics]/Mathematical Physics [math-ph], Vlasov equation, FOS: Physical sciences, Statistical and Nonlinear Physics, Monotonic function, Mathematical Physics (math-ph), 16. Peace & justice, Instability, Symmetry (physics), Mathematics - Analysis of PDEs, [MATH.MATH-MP]Mathematics [math]/Mathematical Physics [math-ph], FOS: Mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], 35Q83, 35B35, Limit (mathematics), Poisson's equation, Degeneracy (mathematics), Stationary state, Mathematical Physics, Mathematics, Analysis of PDEs (math.AP)

Abstract

This work is concerned with the quasineutral limit of the one-dimensional Vlasov-Poisson equation, for initial data close to stationary homogeneous profiles. Our objective is threefold: first, we provide a proof of the fact that the formal limit does not hold for homogeneous profiles that satisfy the Penrose instability criterion. Second, we prove on the other hand that the limit is true for homogeneous profiles that satisfy some monotonicity condition, together with a symmetry condition. We handle the case of well-prepared as well as ill- prepared data. Last, we study a stationary boundary-value problem for the formal limit, the so-called quasineutral Vlasov equation. We show the existence of numerous stationary states, with a lot of freedom in the construction (compared to that of BGK waves for Vlasov-Poisson): this illustrates the degeneracy of the limit equation., 50 pages

Published

2013

16. Quasineutral limit of the Euler-Poisson system for ions in a domain with boundaries

Author

David Gérard-Varet, Frédéric Rousset, Daniel Han-Kwan, Institut de Mathématiques de Jussieu ( IMJ ), Université Pierre et Marie Curie - Paris 6 ( UPMC ) -Université Paris Diderot - Paris 7 ( UPD7 ) -Centre National de la Recherche Scientifique ( CNRS ), Département de Mathématiques et Applications - ENS Paris ( DMA ), École normale supérieure - Paris ( ENS Paris ) -Centre National de la Recherche Scientifique ( CNRS ), Institut de Recherche Mathématique de Rennes ( IRMAR ), Université de Rennes 1 ( UR1 ), Université de Rennes ( UNIV-RENNES ) -Université de Rennes ( UNIV-RENNES ) -AGROCAMPUS OUEST-École normale supérieure - Rennes ( ENS Rennes ) -Institut National de Recherche en Informatique et en Automatique ( Inria ) -Institut National des Sciences Appliquées ( INSA ) -Université de Rennes 2 ( UR2 ), Université de Rennes ( UNIV-RENNES ) -Centre National de la Recherche Scientifique ( CNRS ), Institut de Mathématiques de Jussieu (IMJ), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS), Département de Mathématiques et Applications - ENS Paris (DMA), École normale supérieure - Paris (ENS-PSL), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Centre National de la Recherche Scientifique (CNRS), Institut de Recherche Mathématique de Rennes (IRMAR), Université de Rennes (UR)-Institut National des Sciences Appliquées - Rennes (INSA Rennes), Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-École normale supérieure - Rennes (ENS Rennes)-Université de Rennes 2 (UR2)-Centre National de la Recherche Scientifique (CNRS)-INSTITUT AGRO Agrocampus Ouest, Institut national d'enseignement supérieur pour l'agriculture, l'alimentation et l'environnement (Institut Agro)-Institut national d'enseignement supérieur pour l'agriculture, l'alimentation et l'environnement (Institut Agro), Centre National de la Recherche Scientifique (CNRS)-École normale supérieure - Paris (ENS Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL), AGROCAMPUS OUEST, Institut national d'enseignement supérieur pour l'agriculture, l'alimentation et l'environnement (Institut Agro)-Institut national d'enseignement supérieur pour l'agriculture, l'alimentation et l'environnement (Institut Agro)-Université de Rennes 1 (UR1), Université de Rennes (UNIV-RENNES)-Université de Rennes (UNIV-RENNES)-Université de Rennes 2 (UR2), Université de Rennes (UNIV-RENNES)-École normale supérieure - Rennes (ENS Rennes)-Centre National de la Recherche Scientifique (CNRS)-Institut National des Sciences Appliquées - Rennes (INSA Rennes), Institut National des Sciences Appliquées (INSA)-Université de Rennes (UNIV-RENNES)-Institut National des Sciences Appliquées (INSA), and École normale supérieure - Paris (ENS Paris)

Subjects

General Mathematics, Boundary (topology), Electron, boundary layers, 01 natural sciences, linearized modulated energy, Domain (mathematical analysis), symbols.namesake, Mathematics - Analysis of PDEs, quasineutral limit, [ MATH.MATH-AP ] Mathematics [math]/Analysis of PDEs [math.AP], Physics::Plasma Physics, FOS: Mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Limit (mathematics), 0101 mathematics, Mathematics, Partial differential equation, 010102 general mathematics, Mathematical analysis, Isothermal Euler-Poisson system, Plasma, 010101 applied mathematics, Massless particle, Euler's formula, symbols, 76N15, 76N25, 35Q35, Analysis of PDEs (math.AP)

Abstract

We study the quasineutral limit of the isothermal Euler-Poisson system describing a plasma made of ions and massless electrons. The analysis is achieved in a domain of $\R^3$ and thus extends former results by Cordier and Grenier [Comm. Partial Differential Equations, 25 (2000), pp.~1099--1113], who dealt with the same problem in a one-dimensional domain without boundary., Comment: 32 pages

Published

2013

17. L^1 averaging lemma for transport equations with Lipschitz force fields

Author

Daniel Han-Kwan, Département de Mathématiques et Applications - ENS Paris (DMA), École normale supérieure - Paris (ENS Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Centre National de la Recherche Scientifique (CNRS), Centre National de la Recherche Scientifique (CNRS)-École normale supérieure - Paris (ENS Paris), and Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)

Subjects

Numerical Analysis, 010102 general mathematics, Mathematical analysis, 16. Peace & justice, Lipschitz continuity, Kinetic energy, 01 natural sciences, Force field (chemistry), 010101 applied mathematics, Mathematics - Analysis of PDEs, Modeling and Simulation, FOS: Mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Nabla symbol, 0101 mathematics, Convection–diffusion equation, Mathematical physics, Mathematics, Analysis of PDEs (math.AP)

Abstract

The purpose of this note is to extend the $L^1$ averaging lemma of Golse and Saint-Raymond \cite{GolSR} to the case of a kinetic transport equation with a force field $F(x)\in W^{1,\infty}$. To this end, we will prove a local in time mixing property for the transport equation $\partial_t f + v.\nabla_x f + F.\nabla_v f =0$., Comment: 15 pages, to be published in Kinetic and Related Models

Published

2010

18. On the confinement of a tokamak plasma

Author

Daniel Han-Kwan, Département de Mathématiques et Applications - ENS Paris (DMA), Centre National de la Recherche Scientifique (CNRS)-École normale supérieure - Paris (ENS Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL), École normale supérieure - Paris (ENS Paris), and Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Tokamak, FOS: Physical sciences, 01 natural sciences, Instability, law.invention, magnetic confinement fusion, Mathematics - Analysis of PDEs, law, Physics::Plasma Physics, [PHYS.PHYS.PHYS-PLASM-PH]Physics [physics]/Physics [physics]/Plasma Physics [physics.plasm-ph], FOS: Mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Statistical physics, 0101 mathematics, Physics, Hydrodynamic stability, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Magnetic confinement fusion, Mechanics, Plasma, Physics - Plasma Physics, Magnetic field, hydrodynamic stability and instability, 010101 applied mathematics, Plasma Physics (physics.plasm-ph), Computational Mathematics, Plasma stability, Analysis, Numerical stability, Analysis of PDEs (math.AP)

Abstract

The goal of this paper is to understand from a mathematical point of view the magnetic confinement of plasmas for fusion. Following Fr\'enod and Sonnendr\"ucker \cite{FS2}, we first use two-scale convergence tools to derive a gyrokinetic system for a plasma submitted to a large magnetic field with a slowly spatially varying intensity. We formally derive from this system a simplified bi-temperature fluid system. We then investigate the behaviour of the plasma in such a regime and we prove nonlinear stability or instability depending on which side of the tokamak we are looking at. In our analysis, we will also point out that there exists a temperature gradient threshold beyond which one can expect stability, even in the "bad" side : this corresponds to the so-called H-mode., Comment: 31 pages, accepted for publication in SIAM J. Math. Anal.

Published

2009

19. The three-dimensional Finite Larmor Radius Approximation

Author

Daniel Han-Kwan, Département de Mathématiques et Applications - ENS Paris (DMA), École normale supérieure - Paris (ENS Paris), Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)-Centre National de la Recherche Scientifique (CNRS), Centre National de la Recherche Scientifique (CNRS)-École normale supérieure - Paris (ENS Paris), and Université Paris sciences et lettres (PSL)-Université Paris sciences et lettres (PSL)

Subjects

Thermodynamic equilibrium, Gyroradius, General Mathematics, Electron, 01 natural sciences, Mathematics - Analysis of PDEs, Physics::Plasma Physics, FOS: Mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Limit (mathematics), 0101 mathematics, Mathematics, Lemma (mathematics), iter, 010102 general mathematics, Mathematical analysis, Larmor formula, finite larmor radius approximation, Plasma, Magnetic field, 010101 applied mathematics, gyrokinetic approximation, Classical mechanics, Physics::Space Physics, averaging lemma, Analysis of PDEs (math.AP)

Abstract

Following Frenod and Sonnendrucker (SIAM J. Math. Anal. 32(6) (2001) 1227-1247), we consider the finite Larmor radius regime for a plasma submitted to a large magnetic field and take into account both the quasineutrality and the local thermodynamic equilibrium of the electrons. We then rigorously establish the asymptotic gyrokinetic limit of the rescaled and modified Vlasov-Poisson system in a three-dimensional setting with the help of an averaging lemma.

Published

2008