This work deals with the modeling of plasmas, which are charged-particle fluids. Thanks to machine leaning, we construct a closure for the one-dimensional Euler-Poisson system valid for a wide range of collision regimes. This closure, based on a fully convolutional neural network called V-net, takes as input the whole spatial density, mean velocity and temperature and predicts as output the whole heat flux. It is learned from data coming from kinetic simulations of the Vlasov-Poisson equations. Data generation and preprocessings are designed to ensure an almost uniform accuracy over the chosen range of Knudsen numbers (which parametrize collision regimes). Finally, several numerical tests are carried out to assess validity and flexibility o...
Collisionless plasmas, mostly present in astrophysical and space environments, often require a kinet...
A novel quasilinear turbulent transport model DeKANIS has been constructed founded on the gyrokineti...
This thesis has as a goal the development, analysis and application of numerical schemes for the sim...
International audienceThis work deals with the modeling of plasmas, which are charged-particle fluid...
The Vlasov-Poisson system is employed in its reduced form version (1D1V) as a test bed for the appli...
Kinetic approaches are generally accurate in dealing with microscale plasma physics problems but are...
The model reduction of a mesoscopic kinetic dynamics to a macroscopic continuum dynamics has been on...
In this doctoral thesis, efficient particle methods describing phase transition and multi-scale flui...
International audienceThis paper analyzes various schemes for the Euler-Poisson-Boltzmann (EPB) mode...
The inclusion of kinetic effects into fluid models has been a long standing problem in magnetic reco...
This paper concerns the derivation of the Kinetic Isothermal Euler system in dimension d...
The model reduction of a mesoscopic kinetic dynamics to a macroscopic continuum dynamics has been on...
In the present work, we extend a novel numerical algorithm which was constructed for the solution of...
The extremely high dimensionality and nonlinearity in the Boltzmann equation bring tremendous diffic...
International audienceWe consider the Hamiltonian structure of reduced fluid models obtained from a ...
Collisionless plasmas, mostly present in astrophysical and space environments, often require a kinet...
A novel quasilinear turbulent transport model DeKANIS has been constructed founded on the gyrokineti...
This thesis has as a goal the development, analysis and application of numerical schemes for the sim...
International audienceThis work deals with the modeling of plasmas, which are charged-particle fluid...
The Vlasov-Poisson system is employed in its reduced form version (1D1V) as a test bed for the appli...
Kinetic approaches are generally accurate in dealing with microscale plasma physics problems but are...
The model reduction of a mesoscopic kinetic dynamics to a macroscopic continuum dynamics has been on...
In this doctoral thesis, efficient particle methods describing phase transition and multi-scale flui...
International audienceThis paper analyzes various schemes for the Euler-Poisson-Boltzmann (EPB) mode...
The inclusion of kinetic effects into fluid models has been a long standing problem in magnetic reco...
This paper concerns the derivation of the Kinetic Isothermal Euler system in dimension d...
The model reduction of a mesoscopic kinetic dynamics to a macroscopic continuum dynamics has been on...
In the present work, we extend a novel numerical algorithm which was constructed for the solution of...
The extremely high dimensionality and nonlinearity in the Boltzmann equation bring tremendous diffic...
International audienceWe consider the Hamiltonian structure of reduced fluid models obtained from a ...
Collisionless plasmas, mostly present in astrophysical and space environments, often require a kinet...
A novel quasilinear turbulent transport model DeKANIS has been constructed founded on the gyrokineti...
This thesis has as a goal the development, analysis and application of numerical schemes for the sim...