English

On the global existence for the Muskat problem

Analysis of PDEs 2016-02-22 v1

Abstract

The Muskat problem models the dynamics of the interface between two incompressible immiscible fluids with different constant densities. In this work we prove three results. First we prove an L2(R)L^2(\R) maximum principle, in the form of a new ``log'' conservation law \eqref{ln} which is satisfied by the equation \eqref{ec1d} for the interface. Our second result is a proof of global existence of Lipschitz continuous solutions for initial data that satisfy f0L<\|f_0\|_{L^\infty}<\infty and xf0L<1\|\partial_x f_0\|_{L^\infty}<1. We take advantage of the fact that the bound xf0L<1\|\partial_x f_0\|_{L^\infty}<1 is propagated by solutions, which grants strong compactness properties in comparison to the log conservation law. Lastly, we prove a global existence result for unique strong solutions if the initial data is smaller than an explicitly computable constant, for instance f11/5\| f\|_1 \le 1/5. Previous results of this sort used a small constant ϵ1\epsilon \ll1 which was not explicit.

Keywords

Cite

@article{arxiv.1007.3744,
  title  = {On the global existence for the Muskat problem},
  author = {Peter Constantin and Diego Cordoba and Francisco Gancedo and Robert M. Strain},
  journal= {arXiv preprint arXiv:1007.3744},
  year   = {2016}
}

Comments

31 pages

R2 v1 2026-06-21T15:51:10.902Z