AbstractThe first half of this paper is concerning with the nonlinear drift-diffusion semiconductor model in d (d⩽3) dimensional space. The global estimate is achieved on the evolution of support of solution and the finite speed of propagation. The proof is based on the estimate of the weighted norm with special designed weight functions. In the second half, we prove the quasineutral limit locally for 1-dimensional standard drift-diffusion model with discontinuous, sign-changing doping profile
We study the quasi-neutral limit in an optimal semiconductor design problem constrained by a nonline...
My work concerns two different systems of equations used in the mathematical modeling of semiconduct...
We present charge transport models for novel semiconductor devices which may include ionic species a...
AbstractIn this paper, the authors consider the limiting problem of the drift-diffusion-Poisson mode...
AbstractIn this paper the vanishing Debye length limit of the bipolar time-dependent drift–diffusion...
Abstract: In this paper the vanishing Debye length limit (space charge neutral limit) of bipolar tim...
textabstractA drift-diffusion model for semiconductors with nonlinear diffusion is considered. The m...
Abstract. A drift-diffusion model for semiconductors with nonlinear diffusion is considered. The mod...
AbstractIn this paper the limit of vanishing Debye length in a bipolar drift-diffusion model for sem...
AbstractAn “augmented” version of the drift-diffusion model in an n-semiconductor device is consider...
AbstractWe study a relaxation limit of a solution to the initial–boundary value problem for a hydrod...
AbstractWe discuss strong solutions of a nonlinear parabolic system that arise from the simulation f...
This thesis is devoted to two different systems of equations used in the mathematical modeling of se...
AbstractThe limit of the vanishing Debye length (the charge neutral limit) in a nonlinear bipolar dr...
We regard drift-diffusion equations for semiconductor devices in Lebesgue spaces. To that end we re...
We study the quasi-neutral limit in an optimal semiconductor design problem constrained by a nonline...
My work concerns two different systems of equations used in the mathematical modeling of semiconduct...
We present charge transport models for novel semiconductor devices which may include ionic species a...
AbstractIn this paper, the authors consider the limiting problem of the drift-diffusion-Poisson mode...
AbstractIn this paper the vanishing Debye length limit of the bipolar time-dependent drift–diffusion...
Abstract: In this paper the vanishing Debye length limit (space charge neutral limit) of bipolar tim...
textabstractA drift-diffusion model for semiconductors with nonlinear diffusion is considered. The m...
Abstract. A drift-diffusion model for semiconductors with nonlinear diffusion is considered. The mod...
AbstractIn this paper the limit of vanishing Debye length in a bipolar drift-diffusion model for sem...
AbstractAn “augmented” version of the drift-diffusion model in an n-semiconductor device is consider...
AbstractWe study a relaxation limit of a solution to the initial–boundary value problem for a hydrod...
AbstractWe discuss strong solutions of a nonlinear parabolic system that arise from the simulation f...
This thesis is devoted to two different systems of equations used in the mathematical modeling of se...
AbstractThe limit of the vanishing Debye length (the charge neutral limit) in a nonlinear bipolar dr...
We regard drift-diffusion equations for semiconductor devices in Lebesgue spaces. To that end we re...
We study the quasi-neutral limit in an optimal semiconductor design problem constrained by a nonline...
My work concerns two different systems of equations used in the mathematical modeling of semiconduct...
We present charge transport models for novel semiconductor devices which may include ionic species a...