Nonlinear diffusion problems with free boundaries: Convergence, transition speed and zero number arguments,
Abstract
This paper continues the investigation of Du and Lou (J. European Math Soc, to appear), where the long-time behavior of positive solutions to a nonlinear diffusion equation of the form for over a varying interval was examined. Here and are free boundaries evolving according to , , and . We answer several intriguing questions left open in the paper of Du and Lou.First we prove the conjectured convergence result in the paper of Du and Lou for the general case that is and . Second, for bistable and combustion types of , we determine the asymptotic propagation speed of and in the transition case. More presicely, we show that when the transition case happens, for bistable type of there exists a uniquely determined such that , and for combustion type of , there exists a uniquely determined such that . Our approach is based on the zero number arguments of Matano and Angenent, and on the construction of delicate upper and lower solutions.
Cite
@article{arxiv.1501.06258,
title = {Nonlinear diffusion problems with free boundaries: Convergence, transition speed and zero number arguments,},
author = {Yihong Du and Bendong Lou and Maolin Zhou},
journal= {arXiv preprint arXiv:1501.06258},
year = {2015}
}