Nernst-Planck-poisson diffusion equation: Numerical solution of the boundary value problem

This work is devoted to prove the existence of weak solutions of the kinetic Vlasov-Poisson-Fokker-Planck system in bounded domains for attractive or repulsive forces. Absorbing and reflectiontype boundary conditions are considered for the kinetic equation and zero values for the potential on the bo

Two new numerical methods for the solution of stiff boundary valued or&nary differential equations are presented and compared The specific problem solved IS that of diffusion and reaction m a char pore, where eight species diffuse and react through ten free radical combustion reactions A new vanable

## Abstract This paper deals with existence results for a Vlasov‐Poisson system, equipped with an absorbing‐type law for the Vlasov equation and a Dirichlet‐type boundary condition for the Poisson part. Using the ideas of Lions and Perthame [21], we prove the existence of a weak solution having goo

## Abstract In this paper we show the existence of a weak solution of the boundary value problem for the time dependent Vlasov–Poisson system. First, we regularize the system in order to apply a fixed‐point theorem. Then we pass to the limit using an energy estimate.