English

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

Analysis of PDEs 2014-04-15 v1

Abstract

In this paper we continue our study of the large time behavior of the bounded solution to the nonlocal diffusion equation with absorption \begin{align} \begin{cases} u_t = \mathcal{L} u-u^p\quad& \mbox{in}\quad \mathbb R^N\times(0,\infty),\\ u(x,0) = u_0(x)\quad& \mbox{in}\quad \mathbb R^N, \end{cases} \end{align} where p>1p>1, u00u_0\ge0 and bounded and Lu(x,t)=J(xy)(u(y,t)u(x,t))dy \mathcal{L} u(x,t)=\int J(x-y)\left(u(y,t)-u(x,t)\right)\,dy with JC0(RN)J\in C_0^{\infty}(\mathbb R^N), radially symmetric, J0J\geq 0 with J=1\int J=1. Our assumption on the initial datum is that 0u0L(RN)0\le u_0\in L^\infty(\mathbb R^N) and xαu0(x)A>0\mboxasx. |x|^{\alpha}u_0(x)\to A>0\quad\mbox{as}\quad|x|\to\infty. This problem was studied in the supercritical and critical cases p1+2/αp\ge 1+2/\alpha. %See also \cite{PR,TW2} for the case u0L(RN)L1(RN)u_0\in L^\infty(\mathbb R^N)\cap L^1(\mathbb R^N), p1+2/Np\ge 1+2/N. In the present paper we study the subcritical case 1<p<1+2/α1<p<1+2/\alpha. More generally, we consider bounded non-negative initial data such that x2p1u0(x)\mboxasx |x|^{\frac2{p-1}}u_0(x)\to\infty\quad\mbox{as}\quad |x|\to \infty and prove that t1p1u(x,t)(1p1)1p1\mboxastt^{\frac1{p-1}} u(x,t)\to\Big(\frac1{p-1}\Big)^{\frac1{p-1}}\quad\mbox{as}\quad t\to\infty uniformly in xkt |x|\le k\sqrt t, for every k>0k>0.

Keywords

Cite

@article{arxiv.1404.3226,
  title  = {Large time behavior for a nonlocal diffusion equation with absorption and bounded initial data: the subcritical case},
  author = {Ariel Salort and Joana Terra and Noemí Wolanski},
  journal= {arXiv preprint arXiv:1404.3226},
  year   = {2014}
}

Comments

14 pages

R2 v1 2026-06-22T03:49:08.798Z