English

Spreading and vanishing in nonlinear diffusion problems with free boundaries

Analysis of PDEs 2016-08-02 v1

Abstract

We study nonlinear diffusion problems of the form ut=uxx+f(u)u_t=u_{xx}+f(u) with free boundaries. Such problems may be used to describe the spreading of a biological or chemical species, with the free boundary representing the expanding front. For special f(u)f(u) of the Fisher-KPP type, the problem was investigated by Du and Lin [8]. Here we consider much more general nonlinear terms. For any f(u)f(u) which is C1C^1 and satisfies f(0)=0f(0)=0, we show that the omega limit set ω(u)\omega(u) of every bounded positive solution is determined by a stationary solution. For monostable, bistable and combustion types of nonlinearities, we obtain a rather complete description of the long-time dynamical behavior of the problem; moreover, by introducing a parameter σ\sigma in the initial data, we reveal a threshold value σ\sigma^* such that spreading (limtu=1\lim_{t\to\infty}u= 1) happens when σ>σ\sigma>\sigma^*, vanishing (limtu=0\lim_{t\to\infty}u=0) happens when σ<σ\sigma<\sigma^*, and at the threshold value σ\sigma^*, ω(u)\omega(u) is different for the three different types of nonlinearities. When spreading happens, we make use of "semi-waves" to determine the asymptotic spreading speed of the front.

Keywords

Cite

@article{arxiv.1301.5373,
  title  = {Spreading and vanishing in nonlinear diffusion problems with free boundaries},
  author = {Yihong Du and Bendong Lou},
  journal= {arXiv preprint arXiv:1301.5373},
  year   = {2016}
}
R2 v1 2026-06-21T23:13:53.574Z