In this paper, we consider a drift-diffusion system with cross-coupling through the chemical potentials comprising a model for the motion of finite size ions in liquid electrolytes. The drift term is due to the self-consistent electric field maintained by the ions and described by a Poisson equation. We design two finite volume schemes based on different formulations of the fluxes. We also provide a stability analysis of these schemes and an existence result for the corresponding discrete solutions. A convergence proof is proposed for non-degenerate solutions. Numerical experiments show the behavior of these schemes
We consider an improved Nernst--Planck--Poisson model first proposed by Dreyer et al. in 2013 for co...
We consider an improved Nernst--Planck--Poisson model first proposed by Dreyer et al. in 2013 for co...
Dynamics of Poisson-Nernst-Planck systems and its applications to ion channels are studied in this d...
In this paper, we consider a drift-diffusion system with cross-coupling through the chemical potenti...
In its most widespread, classical formulation, the Nernst-Planck-Poisson system ...
In its most widespread, classical formulation, the Nernst-Planck-Poisson system for ion transport in...
We present two finite volume approaches for modeling the diffusion of charged particles, specificall...
International audienceAn implicit Euler finite-volume scheme for a degenerate cross-diffusion system...
In this paper, we consider an unipolar degenerated drift-diffusion system where the relation betwee...
In its most widespread, classical formulation, the Nernst–Planck–Poisson system for ion transport in...
International audienceIn this paper, we consider an unipolar degenerated drift-diffusion system wher...
The most common mathematical models for electrolyte flows are based on the dilute solution assumptio...
The Poisson-Nernst-Planck system of equations used to model ionic transport is interpreted as a grad...
We consider an improved Nernst--Planck--Poisson model first proposed by Dreyer et al. in 2013 for co...
We consider an improved Nernst-Planck-Poisson model first proposed by Dreyer et al. in 2013 for comp...
We consider an improved Nernst--Planck--Poisson model first proposed by Dreyer et al. in 2013 for co...
We consider an improved Nernst--Planck--Poisson model first proposed by Dreyer et al. in 2013 for co...
Dynamics of Poisson-Nernst-Planck systems and its applications to ion channels are studied in this d...
In this paper, we consider a drift-diffusion system with cross-coupling through the chemical potenti...
In its most widespread, classical formulation, the Nernst-Planck-Poisson system ...
In its most widespread, classical formulation, the Nernst-Planck-Poisson system for ion transport in...
We present two finite volume approaches for modeling the diffusion of charged particles, specificall...
International audienceAn implicit Euler finite-volume scheme for a degenerate cross-diffusion system...
In this paper, we consider an unipolar degenerated drift-diffusion system where the relation betwee...
In its most widespread, classical formulation, the Nernst–Planck–Poisson system for ion transport in...
International audienceIn this paper, we consider an unipolar degenerated drift-diffusion system wher...
The most common mathematical models for electrolyte flows are based on the dilute solution assumptio...
The Poisson-Nernst-Planck system of equations used to model ionic transport is interpreted as a grad...
We consider an improved Nernst--Planck--Poisson model first proposed by Dreyer et al. in 2013 for co...
We consider an improved Nernst-Planck-Poisson model first proposed by Dreyer et al. in 2013 for comp...
We consider an improved Nernst--Planck--Poisson model first proposed by Dreyer et al. in 2013 for co...
We consider an improved Nernst--Planck--Poisson model first proposed by Dreyer et al. in 2013 for co...
Dynamics of Poisson-Nernst-Planck systems and its applications to ion channels are studied in this d...