On nonlinear cross-diffusion systems: an optimal transport approach
Abstract
We study a nonlinear, degenerate cross-diffusion model which involves two densities with two different drift velocities. A general framework is introduced based on its gradient flow structure in Wasserstein space to derive a notion of discrete-time solutions. Its continuum limit, due to the possible mixing of the densities, only solves a weaker version of the original system. In one space dimension, where the densities are guaranteed to be segregated, a stable interface appears between the two densities, and a stronger convergence result, in particular derivation of a standard weak solution to the system, is available. We also study the incompressible limit of the system, which addresses transport under a height constraint on the total density. In one space dimension we show that the problem leads to a two-phase Hele-Shaw type flow.
Cite
@article{arxiv.1705.02457,
title = {On nonlinear cross-diffusion systems: an optimal transport approach},
author = {Inwon Kim and Alpár R. Mészáros},
journal= {arXiv preprint arXiv:1705.02457},
year = {2018}
}
Comments
improved version; some well-known results shortened