Asymptotic Behavior for a Nonlocal Diffusion Equation with Absorption and Nonintegrable Initial Data. the Supercritical Case

Abstract

In this paper we study the asymptotic behavior as time goes to infinity of the solution to a nonlocal diffusion equation with absorption modeled by a powerlike reaction -up, p>1 and set in N. We consider a bounded, nonnegative initial datum u0 that behaves like a negative power at infinity. That is, |x|α u0(x) A>0 as |x|∞ with 0<α N. We prove that, in the supercritical case p>1+2/α, the solution behaves asymptotically as that of the heat equation --with diffusivity related to the nonlocal operator-- with the same initial datum.