AbstractThe electro-diffusion model, which arises in electrohydrodynamics, is a coupling between the Nernst–Planck–Poisson system and the incompressible Navier–Stokes equations. For the generally smooth doping profile, the quasineutral limit (zero-Debye-length limit) is justified rigorously in Sobolev norm uniformly in time. The proof is based on the elaborate energy analysis and the key point is to establish the uniform estimates with respect to the scaled Debye length
AbstractIn this paper the vanishing Debye length limit of the bipolar time-dependent drift–diffusion...
We investigate the quasi-neutral limit (the zero Debye length limit) for the Euler-Poisson system wi...
We consider electrodiffusion in an incompressible electrolyte medium which is in motion. The Cauchy ...
Abstract: In this paper the vanishing Debye length limit (space charge neutral limit) of bipolar tim...
The quasineutral limit in the transient quantum drift-diffusion equations in one space dimension is ...
AbstractThe limit of the vanishing Debye length (the charge neutral limit) in a nonlinear bipolar dr...
AbstractThe quasineutral limit of compressible Navier–Stokes–Poisson system with heat conductivity a...
This thesis is devoted to two different systems of equations used in the mathematical modeling of se...
AbstractIn this paper the limit of vanishing Debye length in a bipolar drift-diffusion model for sem...
The zero Debye length asymptotic of the Schrödinger-Poisson system in Coulomb gauge for ill-prepared...
AbstractThe quasineutral limit (zero-Debye-length limit) of viscous quantum hydrodynamic model for s...
AbstractThe first half of this paper is concerning with the nonlinear drift-diffusion semiconductor ...
AbstractWe study a relaxation limit of a solution to the initial–boundary value problem for a hydrod...
International audienceWe derive and analyze an Asymptotic-Preserving scheme for the Euler-Maxwell sy...
: This paper is devoted to the travelling wave analysis of the EulerPoisson model for a plasma consi...
AbstractIn this paper the vanishing Debye length limit of the bipolar time-dependent drift–diffusion...
We investigate the quasi-neutral limit (the zero Debye length limit) for the Euler-Poisson system wi...
We consider electrodiffusion in an incompressible electrolyte medium which is in motion. The Cauchy ...
Abstract: In this paper the vanishing Debye length limit (space charge neutral limit) of bipolar tim...
The quasineutral limit in the transient quantum drift-diffusion equations in one space dimension is ...
AbstractThe limit of the vanishing Debye length (the charge neutral limit) in a nonlinear bipolar dr...
AbstractThe quasineutral limit of compressible Navier–Stokes–Poisson system with heat conductivity a...
This thesis is devoted to two different systems of equations used in the mathematical modeling of se...
AbstractIn this paper the limit of vanishing Debye length in a bipolar drift-diffusion model for sem...
The zero Debye length asymptotic of the Schrödinger-Poisson system in Coulomb gauge for ill-prepared...
AbstractThe quasineutral limit (zero-Debye-length limit) of viscous quantum hydrodynamic model for s...
AbstractThe first half of this paper is concerning with the nonlinear drift-diffusion semiconductor ...
AbstractWe study a relaxation limit of a solution to the initial–boundary value problem for a hydrod...
International audienceWe derive and analyze an Asymptotic-Preserving scheme for the Euler-Maxwell sy...
: This paper is devoted to the travelling wave analysis of the EulerPoisson model for a plasma consi...
AbstractIn this paper the vanishing Debye length limit of the bipolar time-dependent drift–diffusion...
We investigate the quasi-neutral limit (the zero Debye length limit) for the Euler-Poisson system wi...
We consider electrodiffusion in an incompressible electrolyte medium which is in motion. The Cauchy ...