A case study of multiple wave solutions in a reaction-diffusion system using invariant manifolds and global bifurcations

A thorough analysis is performed to find traveling waves in a qualitative reaction-diffusion system inspired by a predator-prey model. We provide rigorous results coming from a standard local stability analysis, numerical bifurcation analysis, and relevant computations of invariant manifolds to exhi...

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Bibliographic Details
Published in:arXiv.org 2022-11
Main Authors: Villar-Sepúlveda, Edgardo, Aguirre, Pablo, Breña-Medina, Víctor F
Format: Article
Language:English
Subjects:
Bifurcations
Invariants
Manifolds
Orbits
Predator-prey simulation
Traveling waves
Online Access:Get full text
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Summary:A thorough analysis is performed to find traveling waves in a qualitative reaction-diffusion system inspired by a predator-prey model. We provide rigorous results coming from a standard local stability analysis, numerical bifurcation analysis, and relevant computations of invariant manifolds to exhibit homoclinic and heteroclinic connections, and periodic orbits in the associated traveling wave system with four components. In so doing, we present and describe a zoo of different traveling wave solutions. In addition, homoclinic chaos is manifested via both saddle-focus and focus-focus bifurcations as well as a Belyakov point. An actual computation of global invariant manifolds near a focus-focus homoclinic bifurcation is also presented to unravel a multiplicity of wave solutions in the model.
ISSN:2331-8422