English

Interaction between nonlinear diffusion and geometry of domain

Analysis of PDEs 2011-08-10 v2

Abstract

Let Ω\Omega be a domain in RN\mathbb R^N, where N2N \ge 2 and Ω\partial\Omega is not necessarily bounded. We consider nonlinear diffusion equations of the form tu=Δϕ(u)\partial_t u= \Delta \phi(u). Let u=u(x,t)u=u(x,t) be the solution of either the initial-boundary value problem over Ω\Omega, where the initial value equals zero and the boundary value equals 1, or the Cauchy problem where the initial data is the characteristic function of the set RNΩ\mathbb R^N\setminus \Omega. We consider an open ball BB in Ω\Omega whose closure intersects Ω\partial\Omega only at one point, and we derive asymptotic estimates for the content of substance in BB for short times in terms of geometry of Ω\Omega. Also, we obtain a characterization of the hyperplane involving a stationary level surface of uu by using the sliding method due to Berestycki, Caffarelli, and Nirenberg. These results tell us about interactions between nonlinear diffusion and geometry of domain.

Keywords

Cite

@article{arxiv.1009.6131,
  title  = {Interaction between nonlinear diffusion and geometry of domain},
  author = {Rolando Magnanini and Shigeru Sakaguchi},
  journal= {arXiv preprint arXiv:1009.6131},
  year   = {2011}
}

Comments

25 pages, no figures. Added some details to introduction. A couple of small changes. To appear in Journal Diff. Eqs

R2 v1 2026-06-21T16:21:35.243Z