English

Admissible initial growth for diffusion equations with weakly superlinear absorption

Analysis of PDEs 2015-09-10 v3

Abstract

We study the admissible growth at infinity of initial data of positive solutions of \prt_tu\Gdu+f(u)=0\prt\_t u-\Gd u+f(u)=0 in \BBR_+\ti\BBRN\BBR\_+\ti\BBR^N when f(u)f(u) is a continuous function, {\it mildly} superlinear at infinity, the model case being f(u)=uln\ga(1+u)f(u)=u\ln^\ga (1+u) with 1\textless\ga\textless21\textless{}\ga\textless{}2. We prove in particular that if the growth of the initial data at infinity is too strong, there is no more diffusion and the corresponding solution satisfies the ODE problem \prt_t\gf+f(\gf)=0\prt\_t \gf+f(\gf)=0 on \BBR_+\BBR\_+ with \gf(0)=\gf(0)=\infty.

Keywords

Cite

@article{arxiv.1503.08532,
  title  = {Admissible initial growth for diffusion equations with weakly superlinear absorption},
  author = {Andrey Shishkov and Laurent Véron},
  journal= {arXiv preprint arXiv:1503.08532},
  year   = {2015}
}

Comments

Communications in Contemporary Mathematics, to appear

R2 v1 2026-06-22T09:05:12.034Z