Numerical Nonlinear Stability of TravelingWaves for a Chemotaxis Model

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Abstract

We study the stability of traveling waves of a certain chemotaxis model. The traveling wave solution is a central object of study in a chemotaxis model. Kim et al. [8] introduced a model on a population and nutrient densities based on a nonlinear diffusion law. They proved the existence of traveling waves for the one dimensional Cauchy problem. Existence theory for traveling waves is typically followed by stability analysis because any traveling waves that are not robust against a small perturbation would have little physical significance. We conduct a numerical nonlinear stability for a few relevant instances of traveling waves shown to exist in [8]. Results against absolute additive noises and relative additive noises are presented.

Original languageEnglish
Pages (from-to)141-153
Number of pages13
JournalKyungpook Mathematical Journal
Volume63
Issue number2
DOIs
StatePublished - 2023

Keywords

  • chemotaxis
  • stability
  • traveling waves

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