Your search keyword '"Mikaela Iacobelli"' showing total 17 results

1. A Mean Field Approach to the Quasi-Neutral Limit for the Vlasov-Poisson Equation.

Author

Megan Griffin-Pickering and Mikaela Iacobelli

Published

2018

2. Landau damping on the torus for the Vlasov-Poisson system with massless electrons

Author

Mikaela Iacobelli and Antoine Gagnebin

Subjects

Mathematics - Analysis of PDEs, FOS: Mathematics, 82D10, 35Q83, 76F25, 82C99, FOS: Physical sciences, Mathematical Physics (math-ph), Mathematical Physics, Analysis of PDEs (math.AP)

Abstract

This paper studies the nonlinear Landau damping on the torus $\mathbb{T}^d$ for the Vlasov-Poisson system with massless electrons (VPME). We consider solutions with analytic or Gevrey ($\gamma > 1/3$) initial data, close to a homogeneous equilibrium satisfying a Penrose stability condition. We show that for such solutions, the corresponding density and force field decay exponentially fast as time goes to infinity. This work extends the results for Vlasov-Poisson on the torus to the case of ions and, more generally, to arbitrary analytic nonlinear couplings., Comment: 36 pages, 1 figure

Published

2022

3. Global well-posedness for the Vlasov-Poisson system with massless electrons in the 3-dimensional torus

Author

Mikaela Iacobelli and Megan Griffin-Pickering

Subjects

FOS: Physical sciences, Electron, 01 natural sciences, Ion, Mathematics - Analysis of PDEs, Physics::Plasma Physics, FOS: Mathematics, 0101 mathematics, Ionic Vlasov-Poisson systems, well-posedness theory, plasma, Mathematical Physics, Mathematics, Applied Mathematics, 010102 general mathematics, Torus, Mathematical Physics (math-ph), Plasma, 010101 applied mathematics, Massless particle, Quantum electrodynamics, Physics::Space Physics, Poisson system, Analysis, Well posedness, Analysis of PDEs (math.AP)

Abstract

The Vlasov-Poisson system with massless electrons (VPME) is widely used in plasma physics to model the evolution of ions in a plasma. It differs from the Vlasov-Poisson system (VP) for electrons in that the Poisson coupling has an exponential nonlinearity that creates several mathematical difficulties. In particular, while global well-posedness in 3 D is well understood in the electron case, this problem remained completely open for the ion model with massless electrons. The aim of this paper is to fill this gap by proving uniqueness for VPME in the class of solutions with bounded density, and global existence of solutions with bounded density for a general class of initial data, generalising all the previous results known for VP., Communications in Partial Differential Equations, 46 (10), ISSN:0360-5302, ISSN:1532-4133

Published

2021

4. Recent Developments on the Well-Posedness Theory for Vlasov-Type Equations

Author

Mikaela Iacobelli and Megan Griffin-Pickering

Subjects

Physics, Physics::General Physics, Physics::Plasma Physics, Torus, Uniqueness, Type (model theory), Space (mathematics), Physics::History of Physics, Well posedness, Mathematical physics

Abstract

In these notes we summarise some recent developments on the existence and uniqueness theory for Vlasov-type equations, both on the torus and on the whole space.

Published

2021

5. Recent Developments on Quasineutral Limits for Vlasov-Type Equations

Author

Megan Griffin-Pickering and Mikaela Iacobelli

Published

2021

6. From Newton's second law to Euler's equations of perfect fluids

Author

Mikaela Iacobelli, Daniel Han-Kwan, Centre de Mathématiques Laurent Schwartz (CMLS), Centre National de la Recherche Scientifique (CNRS)-École polytechnique (X), and ANR-19-CE40-0004,SALVE,Singularités dans des limites asymptotiques d'équations de Vlasov(2019)

Subjects

General Mathematics, FOS: Physical sciences, 01 natural sciences, symbols.namesake, Mathematics - Analysis of PDEs, [MATH.MATH-MP]Mathematics [math]/Mathematical Physics [math-ph], FOS: Mathematics, Fluid dynamics, Coulomb, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Incompressible euler equations, Limit (mathematics), 0101 mathematics, Mathematical Physics, Physics, Heuristic, Applied Mathematics, 010102 general mathematics, Dynamics (mechanics), Mathematical Physics (math-ph), 010101 applied mathematics, Classical mechanics, Energy method, Euler's formula, symbols, Analysis of PDEs (math.AP)

Abstract

Vlasov equations can be formally derived from N-body dynamics in the mean-field limit. In some suitable singular limits, they may themselves converge to fluid dynamics equations. Motivated by this heuristic, we introduce natural scalings under which the incompressible Euler equations can be rigorously derived from N-body dynamics with repulsive Coulomb interaction. Our analysis is based on the modulated energy methods of Brenier and Serfaty., Minor typos corrected

Published

2021

7. Asymptotic analysis for a very fast diffusion equation arising from the 1D quantization problem

Author

Mikaela Iacobelli

Subjects

Asymptotic analysis, Diffusion equation, Exponential convergence, Applied Mathematics, Quantization (signal processing), Stability (probability), Mathematics - Analysis of PDEs, FOS: Mathematics, Discrete Mathematics and Combinatorics, Applied mathematics, Periodic boundary conditions, Balanced flow, Diffusion (business), Analysis, Analysis of PDEs (math.AP), Mathematics

Abstract

In this paper we study the asymptotic behavior of a very fast diffusion PDE in 1D with periodic boundary conditions. This equation is motivated by the gradient flow approach to the problem of quantization of measures introduced in [ 3 ]. We prove exponential convergence to equilibrium under minimal assumptions on the data, and we also provide sufficient conditions for \begin{document}$ W_2 $\end{document} -stability of solutions.

Published

2019

8. 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

9. Weighted ultrafast diffusion equations : from well-posedness to long-time behaviour

Author

Filippo Santambrogio, Francesco S. Patacchini, Mikaela Iacobelli, Durham University, Carnegie Mellon University [Pittsburgh] (CMU), Laboratoire de Mathématiques d'Orsay (LMO), and Université Paris-Sud - Paris 11 (UP11)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Mechanical Engineering, 010102 general mathematics, Complex system, Structure (category theory), Space (mathematics), 01 natural sciences, 010101 applied mathematics, Mathematics - Analysis of PDEs, Mathematics (miscellaneous), Quadratic equation, Flow (mathematics), FOS: Mathematics, Applied mathematics, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Uniqueness, 0101 mathematics, Diffusion (business), Analysis, Analysis of PDEs (math.AP), Probability measure, Mathematics

Abstract

In this paper we devote our attention to a class of weighted ultrafast diffusion equations arising from the problem of quantisation for probability measures. These equations have a natural gradient flow structure in the space of probability measures endowed with the quadratic Wasserstein distance. Exploiting this structure, in particular through the so-called JKO scheme, we introduce a notion of weak solutions, prove existence, uniqueness, BV and H1 estimates, L1 weighted contractivity, Harnack inequalities, and exponential convergence to a steady state., Archive for Rational Mechanics and Analysis, 232 (3), ISSN:0003-9527, ISSN:1432-0673

Published

2019

10. Asymptotic quantization for probability measures on Riemannian manifolds

Author

Mikaela Iacobelli

Subjects

Control and Optimization, Curvature of Riemannian manifolds, Quantization (signal processing), 010102 general mathematics, Mathematical analysis, Riemannian geometry, 01 natural sciences, Statistical manifold, 010101 applied mathematics, Computational Mathematics, symbols.namesake, Control and Systems Engineering, Ricci-flat manifold, symbols, Mathematics::Differential Geometry, Sectional curvature, 0101 mathematics, Mathematics, Scalar curvature, Probability measure

Abstract

In this paper we study the quantization problem for probability measures on Riemannian manifolds. Under a suitable assumption on the growth at infinity of the measure we find asymptotic estimates for the quantization error, generalizing the results on R d . Our growth assumption depends on the curvature of the manifold and reduces, in the flat case, to a moment condition. We also build an example showing that our hypothesis is sharp.

Published

2016

11. Global strong solutions in $ {\mathbb{R}}^3 $ for ionic Vlasov-Poisson systems

Author

Mikaela Iacobelli and Megan Griffin-Pickering

Subjects

Physics, Numerical Analysis, Euclidean space, Structure (category theory), FOS: Physical sciences, Ionic bonding, Mathematical Physics (math-ph), Plasma, Electron, Type (model theory), Kinetic energy, 01 natural sciences, 010305 fluids & plasmas, Ion, 010101 applied mathematics, Mathematics - Analysis of PDEs, Physics::Plasma Physics, Modeling and Simulation, 0103 physical sciences, FOS: Mathematics, 0101 mathematics, Mathematical Physics, Analysis of PDEs (math.AP), Mathematical physics

Abstract

Systems of Vlasov-Poisson type are kinetic models describing dilute plasma. The structure of the model differs according to whether it describes the electrons or positively charged ions in the plasma. In contrast to the electron case, where the well-posedness theory for Vlasov-Poisson systems is well established, the well-posedness theory for ion models has been investigated more recently. In this article, we prove global well-posedness for two Vlasov-Poisson systems for ions, posed on the whole three-dimensional Euclidean space $\mathbb{R}^3$, under minimal assumptions on the initial data and the confining potential., 25 pages; minor changes

Published

2021

12. A gradient flow perspective on the quantization problem

Author

Mikaela Iacobelli, Cardaliaguet, Pierre, Porretta, Alessio, and Salvarani, Francesco

Subjects

Computer science, Quantization (signal processing), Perspective (graphical), Applied mathematics, Mathematics::Differential Geometry, Balanced flow

Abstract

In this paper we review recent results by the author on the problem of quantization of measures. More precisely, we propose a dynamical approach, and we investigate it in dimensions 1 and 2. Moreover, we discuss a recent general result on the static problem on arbitrary Riemannian manifolds.

Published

2018

13. Singular Limits for Plasmas with Thermalised Electrons

Author

Megan Griffin-Pickering, Mikaela Iacobelli, Griffin-Pickering, Megan [0000-0001-6463-6671], and Apollo - University of Cambridge Repository

Subjects

Work (thermodynamics), General Mathematics, Electron, Kinetic energy, 01 natural sciences, symbols.namesake, Plasma, Mathematics - Analysis of PDEs, Mean-field derivation, FOS: Mathematics, Limit (mathematics), 0101 mathematics, Mathematics, Particle system, Applied Mathematics, 010102 general mathematics, 010101 applied mathematics, Massless particle, Vlasov-Poisson for massless electrons, Classical mechanics, Mean field theory, Quasineutral limit, Euler's formula, symbols, Analysis of PDEs (math.AP), Kinetic isothermal Euler system

Abstract

This work is concerned with the study of singular limits for the Vlasov-Poisson system in the case of massless electrons (VPME), which is a kinetic system modelling the ions in a plasma. Our objective is threefold: first, we provide a mean field derivation of the VPME system in dimensions $d=2,3$ from a system of $N$ extended charges. Secondly, we prove a rigorous quasineutral limit for initial data that are perturbations of analytic data, deriving the Kinetic Isothermal Euler (KIE) system from the VPME system in dimensions $d=2,3$. Lastly, we combine these two singular limits in order to show how to obtain the KIE system from an underlying particle system., 51 pages

Published

2018

14. A gradient flow approach to quantization of measures

Author

Mikaela Iacobelli, François Golse, Emanuele Caglioti, Dipartimento di Matematica 'Guido Castelnuovo' [Roma I] (Sapienza University of Rome), Università degli Studi di Roma 'La Sapienza' = Sapienza University [Rome], Centre de Mathématiques Laurent Schwartz (CMLS), and Centre National de la Recherche Scientifique (CNRS)-École polytechnique (X)

Subjects

media_common.quotation_subject, Stability (probability), Measure (mathematics), Mathematics - Analysis of PDEs, Quantization of measures, Monge–Kantorovich distance, gradient flow, parabolicequation, 35K59, 35Q94, 35B40 (35K92, 94A12), Gradient flow, Convergence (routing), FOS: Mathematics, Degenerate parabolic equation, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], Applied mathematics, Monge-Kantorovich distance, Limit (mathematics), Mathematics, media_common, Applied Mathematics, Quantization (signal processing), MSC 35K59, 35Q94, 35B40 (35K92, 94A12), Infinity, Modeling and Simulation, Embedding, Balanced flow, Analysis of PDEs (math.AP)

Abstract

In this paper we study a gradient flow approach to the problem of quantization of measures in one dimension. By embedding our problem in $L^2$, we find a continuous version of it that corresponds to the limit as the number of particles tends to infinity. Under some suitable regularity assumptions on the density, we prove uniform stability and quantitative convergence result for the discrete and continuous dynamics., 45 pages, no figure

Published

2015

15. Quantization of probability distributions and gradient flows in space dimension 2

Author

Mikaela Iacobelli, François Golse, and Emanuele Caglioti

Subjects

Physics, Plane (geometry), Applied Mathematics, Quantization (signal processing), media_common.quotation_subject, 010102 general mathematics, Mathematical analysis, gradient flow, parabolic systems of PDEs, quantization of probability distributions, Wasserstein distance, analysis, mathematical physics, Infinity, 01 natural sciences, 010101 applied mathematics, Asymptotically optimal algorithm, Probability distribution, Hexagonal lattice, Limit (mathematics), 0101 mathematics, Balanced flow, Mathematical Physics, Analysis, media_common

Abstract

In this paper we study a perturbative approach to the problem of quantization of probability distributions in the plane. Motivated by the fact that, as the number of points tends to infinity, hexagonal lattices are asymptotically optimal from an energetic point of view [10] , [12] , [15] , we consider configurations that are small perturbations of the hexagonal lattice and we show that: (1) in the limit as the number of points tends to infinity, the hexagonal lattice is a strict minimizer of the energy; (2) the gradient flow of the limiting functional allows us to evolve any perturbed configuration to the optimal one exponentially fast. In particular, our analysis provides a new mathematical justification of the asymptotic optimality of the hexagonal lattice among its nearby configurations.

Published

2018

16. A mean field approach to the quasineutral limit for the Vlasov-Poisson equation

Author

Mikaela Iacobelli, Megan Griffin-Pickering, Griffin-Pickering, Megan [0000-0001-6463-6671], and Apollo - University of Cambridge Repository

Subjects

Quantitative Biology::Neurons and Cognition, quasi-neutral limit, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Euler system, 16. Peace & justice, Kinetic energy, 01 natural sciences, Isothermal process, 010101 applied mathematics, Computational Mathematics, Mathematics - Analysis of PDEs, Dimension (vector space), Mean field theory, FOS: Mathematics, Coulomb, Limit (mathematics), mean field limit, 0101 mathematics, Poisson's equation, Vlasov-Poisson equation, Analysis, Analysis of PDEs (math.AP), Mathematics

Abstract

This paper concerns the derivation of the Kinetic Isothermal Euler system in dimension $d \geq 1$ from an N-particle system of extended charges with Coulomb interaction. This requires a combined mean field and quasineutral limit for a regularized N-particle system., 39 pages; corrected typos, added clarification on the existence of suitable initial data, updated bibliography

Published

2017

17. 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