Long time behavior of solutions of Nernst-Planck and Debye-Hückel drift-diffusion systems

Piotr Biler & Jean Dolbeault
We study the convergence rates of solutions to drift-diffusion systems (arising from plasma, semiconductors and electrolytes theories) to their self-similar or steady states. This analysis involves entropy- type Lyapunov functionals and logarithmic Sobolev inequalities.
This data repository is not currently reporting usage information. For information on how your repository can submit usage information, please see our documentation.