Title :
Modeling of electrical field modified by injected space charge
Author :
Atten, Pierre ; Coulomb, Jean-Louis ; Khaddour, Bassem
Author_Institution :
Lab. d´´Electrostatique et de Materiaux Dielectrique, LEMD, Grenoble, France
fDate :
5/1/2005 12:00:00 AM
Abstract :
This paper presents the numerical solution of the coupled Poisson equation and charge conservation equation. We present an algorithm to obtain the distributions of electric field and charge density resulting from a corona discharge in the two-dimensional hyperbolic blade-ground plate configuration. We use finite elements method (FEM) to determine the potential distribution, finite volume method (FVM) and method of characteristics (MOC) to determine the distribution of charge density. The structured mesh is redefined at each iteration step to decrease artificial numerical diffusion. For solving the conservation equation, MOC with redefinition of structured mesh appears to be the best technique.
Keywords :
Poisson equation; charge injection; electric fields; finite element analysis; finite volume methods; 2D hyperbolic blade-ground plate configuration; artificial numerical diffusion; charge conservation equation; charge density distribution; corona discharge; coupled Poisson equation; electric field distribution; electrical field modeling; finite elements method; finite volume method; method of characteristics; space charge injection; Blades; Charge carriers; Corona; Electric potential; Electrodes; Electrostatic precipitators; Finite difference methods; Needles; Poisson equations; Space charge; Finite element; Poisson equation; finite volume; method of characteristics;
Journal_Title :
Magnetics, IEEE Transactions on
DOI :
10.1109/TMAG.2005.844546
