Porous medium equation with nonlocal pressure

Abstract

We provide a rather complete description of the results obtained so far on the nonlinear diffusion equation ut=∇· (um-1∇ (-)-su), which describes a flow through a porous medium driven by a nonlocal pressure. We consider constant parameters m>1 and 0<s<1, we assume that the solutions are non-negative, and the problem is posed in the whole space. We present a theory of existence of solutions, results on uniqueness, and relation to other models. As new results of this paper, we prove the existence of self-similar solutions in the range when N=1 and m>2, and the asymptotic behavior of solutions when N=1. The cases m = 1 and m = 2 were rather well known.