📝 SummarXiv

Abstract

We study a toy model for the evolution of the oxygen concentration in an oxide layer. It consists in a transient convection diffusion equation in a one-dimensional domain of variable width. The motions of the boundaries are governed by the traces of the concentration. We exhibit a necessary and sufficient condition on the parameters involved in the model for the existence of a unique traveling-wave solution. Moreover, we show that the model admits some universal entropy structure, in the sense that any convex function of the concentration yields a dissipated free energy (up to exchanges with the outer environment at the boundaries). We propose then an implicit in time arbitrary Lagrangian-Eulerian finite volume scheme based on Scharfetter-Gummel fluxes. It is shown to be unconditionally convergent, to preserve exactly the travelling wave, and to dissipate all the aforementioned free energies. Numerical experiments show that our scheme is first order accurate in time and second order in space, and that the transient solution converges in the long-time limit towards the traveling-wave solution.