Mathematical Modeling of the Influence of Quarantine Measures and Public Enlightenment on the Transmission Dynamic of Lyme Disease

Mathematical Modeling of the Influence of Quarantine Measures and Public Enlightenment on the Transmission Dynamic of Lyme Disease

This study explores the existence of traveling wave solutions in the classical Kermack-cKendrick epidemic model with local diffusive. The findings highlight the critical role of the basic reproduction number R0 in shaping wave dynamics. Traveling wave solutions are shown to exist for wave speeds c...

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Bibliographic Details
Main Authors: Imoukhedeme Paul Kehinde, Noah Ismail Aremu
Format: Article
Language:English
Published: Universidade Estadual do Sudoeste da Bahia (UESB) 2024-12-01
Series:Intermaths
Subjects:
Lyme disease
Mathematical Modeling
Transmission Dynamics
Quarantine Measures
Online Access:https://periodicos2.uesb.br/index.php/intermaths/article/view/15503
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Summary:This study explores the existence of traveling wave solutions in the classical Kermack-cKendrick epidemic model with local diffusive. The findings highlight the critical role of the basic reproduction number R0 in shaping wave dynamics. Traveling wave solutions are shown to exist for wave speeds c ≥ c∗ when R0 > 1, with c∗ denoting the minimal wave speed. Conversely, no traveling waves are observed for c < c∗ or R0 < 1. Numerical simulations are employed to validate the theoretical results, demonstrating the presence of traveling waves for a range of nonlinear incidence functions and offering insights into the spatial spread.
ISSN:2675-8318

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