Hyperbolic traveling waves driven by growth
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 (), 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 : for small the behaviour is essentially the same as for the diffusive Fisher-KPP equation. However, for large the traveling front with minimal speed is discontinuous and travels at the maximal speed . The traveling fronts with minimal speed are linearly stable in weighted spaces. We also prove local nonlinear stability of the traveling front with minimal speed when is smaller than the transition parameter.
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