Asymptotic behavior for a nonlocal diffusion equation in exterior domains: the critical two-dimensional case

Abstract

We study the long time behavior of bounded, integrable solutions to a nonlocal diffusion equation, ∂ t u=J*u-u, where J is a smooth, radially symmetric kernel with support Bd(0)⊂R2. The problem is set in an exterior two-dimensional domain which excludes a hole H, and with zero Dirichlet data on H. In the far field scale, 1 |x|t-1/2 2 with 1,2>0, the scaled function t\, u(x,t) behaves as a multiple of the fundamental solution for the local heat equation with a certain diffusivity determined by J. The proportionality constant, which characterizes the first non-trivial term in the asymptotic behavior of the mass, is given by means of the asymptotic logarithmic momentum' of the solution, t∞∫R2u(x,t)|x|\,dx. This asymptotic quantity can be easily computed in terms of the initial data. In the near field scale, |x| t1/2h(t) with t∞ h(t)=0, the scaled function t( t)2u(x,t)/ |x| converges to a multiple of φ(x)/ |x|, where φ is the unique stationary solution of the problem that behaves as |x| when |x|∞. The proportionality constant is obtained through a matching procedure with the far field limit. Finally, in the very far field, |x| t1/2 g(t) with g(t)∞, the solution is proved to be of order o((t t)-1).