Drift-diffusion equations with saturation
Abstract
We focus on a family of nonlinear continuity equations for the evolution of a non-negative density with a continuous and compactly supported nonlinear mobility not necessarily concave. The velocity field is the negative gradient of the variation of a free energy including internal and confinement energy terms. Problems with compactly supported mobility are often called saturation problems since the values of the density are constrained below a maximal value. Taking advantage of a family of approximating problems, we show the existence of -semigroups of contractions. We study the -limit of the problem, its most relevant properties, and the appearance of free boundaries in the long-time behaviour. This problem has a formal gradient-flow structure, and we discuss the local/global minimisers of the corresponding free energy in the natural topology related to the set of initial data for the -constrained gradient flow of probability densities. Furthermore, we analyse a structure preserving implicit finite-volume scheme and discuss its convergence and long-time behaviour.
Cite
@article{arxiv.2410.10040,
title = {Drift-diffusion equations with saturation},
author = {José Antonio Carrillo and Alejandro Fernández-Jiménez and David Gómez-Castro},
journal= {arXiv preprint arXiv:2410.10040},
year = {2025}
}
Comments
52 pages, 7 figures