Computation (Aug 2021)

Effects of Fractional Derivatives with Different Orders in SIS Epidemic Models

  • Caterina Balzotti,
  • Mirko D’Ovidio,
  • Anna Chiara Lai,
  • Paola Loreti

DOI
https://doi.org/10.3390/computation9080089
Journal volume & issue
Vol. 9, no. 8
p. 89

Abstract

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We study epidemic Susceptible–Infected–Susceptible (SIS) models in the fractional setting. The novelty is to consider models in which the susceptible and infected populations evolve according to different fractional orders. We study a model based on the Caputo derivative, for which we establish existence results of the solutions. Furthermore, we investigate a model based on the Caputo–Fabrizio operator, for which we provide existence of solutions and a study of the equilibria. Both models can be framed in the context of SIS models with time-varying total population, in which the competition between birth and death rates is macroscopically described by the fractional orders of the derivatives. Numerical simulations for both models and a direct numerical comparison are also provided.

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