A mathematical model with nonlinear relapse: conditions for a forward-backward bifurcation

Fabio Sanchez; Jorge Arroyo-Esquivel; Juan G. Calvo

doi:10.1080/17513758.2023.2192238

Journal of Biological Dynamics (Dec 2023)

A mathematical model with nonlinear relapse: conditions for a forward-backward bifurcation

Fabio Sanchez,
Jorge Arroyo-Esquivel,
Juan G. Calvo

Affiliations

Fabio Sanchez: Centro de Investigación en Matemática Pura y Aplicada–Escuela de Matemática, Universidad de Costa Rica, San José, Costa Rica
Jorge Arroyo-Esquivel: Department of Mathematics, University of California Davis, Davis, CA, USA
Juan G. Calvo: Centro de Investigación en Matemática Pura y Aplicada–Escuela de Matemática, Universidad de Costa Rica, San José, Costa Rica

DOI: https://doi.org/10.1080/17513758.2023.2192238
Journal volume & issue: Vol. 17, no. 1

Abstract

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ABSTRACTWe constructed a Susceptible-Addicted-Reformed model and explored the dynamics of nonlinear relapse in the Reformed population. The transition from susceptible considered at-risk is modeled using a strictly decreasing general function, mimicking an influential factor that reduces the flow into the addicted class. The basic reproductive number is computed, which determines the local asymptotically stability of the addicted-free equilibrium. Conditions for a forward-backward bifurcation were established using the basic reproductive number and other threshold quantities. A stochastic version of the model is presented, and some numerical examples are shown. Results showed that the influence of the temporarily reformed individuals is highly sensitive to the initial addicted population.

Published in Journal of Biological Dynamics

ISSN: 1751-3758 (Print); 1751-3766 (Online)
Publisher: Taylor & Francis Group
Country of publisher: United Kingdom
LCC subjects: Geography. Anthropology. Recreation: Environmental sciences; Science: Biology (General)
Website: https://www.tandfonline.com/journals/tjbd

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