English

Decay estimates for nonlinear nonlocal diffusion problems in the whole space

Analysis of PDEs 2013-04-12 v2

Abstract

In this paper we obtain bounds for the decay rate in the Lr(\rrd)L^r (\rr^d)-norm for the solutions to a nonlocal and nolinear evolution equation, namely, ut(x,t)=\rrdK(x,y)u(y,t)u(x,t)p2(u(y,t)u(x,t))dy,u_t(x,t) = \int_{\rr^d} K(x,y) |u(y,t)- u(x,t)|^{p-2} (u(y,t)- u(x,t)) \, dy, with x\rrd x \in \rr^d, t>0 t>0. Here we consider a kernel K(x,y)K(x,y) of the form K(x,y)=ψ(ya(x))+ψ(xa(y))K(x,y)=\psi (y-a(x))+\psi(x-a(y)), where ψ\psi is a bounded, nonnegative function supported in the unit ball and aa is a linear function a(x)=Axa(x)= Ax. To obtain the decay rates we derive lower and upper bounds for the first eigenvalue of a nonlocal diffusion operator of the form T(u)=\rrdK(x,y)u(y)u(x)p2(u(y)u(x))dy T(u) = - \int_{\rr^d} K(x,y) |u(y)-u(x)|^{p-2} (u(y)-u(x)) \, dy, with 1p<1 \leq p < \infty. The upper and lower bounds that we obtain are sharp and provide an explicit expression for the first eigenvalue in the whole \rrd\rr^d: λ1,p(\rrd)=2(\rrdψ(z)dz)1detA1/p1p. \lambda_{1,p} (\rr^d) = 2(\int_{\rr^d} \psi (z) \, dz)|\frac{1}{|\det{A}|^{1/p}} -1|^p. Moreover, we deal with the p=p=\infty eigenvalue problem studying the limit as pp \to \infty of λ1,p1/p\lambda_{1,p}^{1/p}.

Keywords

Cite

@article{arxiv.1207.2565,
  title  = {Decay estimates for nonlinear nonlocal diffusion problems in the whole space},
  author = {Liviu I. Ignat and Damián Pinasco and Julio D. Rossi and Angel San Antolin},
  journal= {arXiv preprint arXiv:1207.2565},
  year   = {2013}
}
R2 v1 2026-06-21T21:33:48.528Z