[01083] The existence and the numerical approximation to a nonlinear coupled system in anisotropic Orlicz-Sobolev spaces
Session Time & Room : 3C (Aug.23, 13:20-15:00) @G601
Type : Contributed Talk
Abstract : We study the existence of a capacity solution for a nonlinear elliptic coupled system
in anisotropic Orlicz-Sobolev spaces. The unknowns are the temperature inside a semiconductor material, and the electric potential. This system may be considered as a generalization of the steady-state thermistor problem. The numerical solution is also analyzed by means of the least squares method in combination with a conjugate gradient technique.