Asymptotic Behaviour of a Nonlinear Parabolic Equation with Gradient Absorption and Critical Exponent

Abstract

We study the large-time behaviour of the solutions of the evolution equation involving nonlinear diffusion and gradient absorption, ∂t u - p u + |∇ u|q=0 . We consider the problem posed for x∈ N and t>0 with nonnegative and compactly supported initial data. We take the exponent p>2 which corresponds to slow p-Laplacian diffusion. The main feature of the paper is that the exponent q takes the critical value q=p-1 which leads to interesting asymptotics. This is due to the fact that in this case both the Hamilton-Jacobi term |∇ u|q and the diffusive term p u have a similar size for large times. The study performed in this paper shows that a delicate asymptotic equilibrium happens, so that the large-time behaviour of the solutions is described by a rescaled version of a suitable self-similar solution of the Hamilton-Jacobi equation |∇ W|p-1=W, with logarithmic time corrections. The asymptotic rescaled profile is a kind of sandpile with a cusp on top, and it is independent of the space dimension.