Large time behavior for a nonlocal diffusion equation with absorption and bounded initial data: the subcritical case

Abstract

In this paper we continue our study of the large time behavior of the bounded solution to the nonlocal diffusion equation with absorption align cases ut = L u-up& in RN×(0,∞),\\ u(x,0) = u0(x)& in RN, cases align where p>1, u00 and bounded and L u(x,t)=∫ J(x-y)(u(y,t)-u(x,t))\,dy with J∈ C0∞( RN), radially symmetric, J≥ 0 with ∫ J=1. Our assumption on the initial datum is that 0 u0∈ L∞( RN) and |x|αu0(x) A>0as|x|∞. This problem was studied in the supercritical and critical cases p 1+2/α. %See also PR,TW2 for the case u0∈ L∞( RN) L1( RN), p 1+2/N. In the present paper we study the subcritical case 1<p<1+2/α. More generally, we consider bounded non-negative initial data such that \[ |x|2p-1u0(x)∞as |x| ∞ \] and prove that \[t1p-1 u(x,t)(1p-1)1p-1as t∞ \] uniformly in |x| k t, for every k>0.