English

Hyperbolic traveling waves driven by growth

Analysis of PDEs 2016-11-22 v2

Abstract

We perform the analysis of a hyperbolic model which is the analog of the Fisher-KPP equation. This model accounts for particles that move at maximal speed ϵ1\epsilon^{-1} (ϵ\textgreater0\epsilon\textgreater{}0), and proliferate according to a reaction term of monostable type. We study the existence and stability of traveling fronts. We exhibit a transition depending on the parameter ϵ\epsilon: for small ϵ\epsilon the behaviour is essentially the same as for the diffusive Fisher-KPP equation. However, for large ϵ\epsilon the traveling front with minimal speed is discontinuous and travels at the maximal speed ϵ1\epsilon^{-1}. The traveling fronts with minimal speed are linearly stable in weighted L2L^2 spaces. We also prove local nonlinear stability of the traveling front with minimal speed when ϵ\epsilon is smaller than the transition parameter.

Keywords

Cite

@article{arxiv.1110.3242,
  title  = {Hyperbolic traveling waves driven by growth},
  author = {Emeric Bouin and Vincent Calvez and Grégoire Nadin},
  journal= {arXiv preprint arXiv:1110.3242},
  year   = {2016}
}

Comments

24 pages

R2 v1 2026-06-21T19:20:23.922Z