Litcius/Paper detail

A malaria model with Caputo–Fabrizio and Atangana–Baleanu derivatives

Hamadjam Abboubakar, Pushpendra Kumar, Norodin A. Rangaig, Sachin Kumar

2020Advances in Complex Systems66 citationsDOI

Abstract

In this paper, we study two fractional models in the Caputo–Fabrizio sense and Atangana–Baleanu sense, in which the effects of malaria infection on mosquito biting behavior and attractiveness of humans are considered. Using Lyapunov theory, we prove the global asymptotic stability of the unique endemic equilibrium of the integer-order model, and the fractional models, whenever the basic reproduction number [Formula: see text] is greater than one. By using fixed point theory, we prove existence, and conditions of the uniqueness of solutions, as well as the stability and convergence of numerical schemes. Numerical simulations for both models, using fractional Euler method and Adams–Bashforth method, respectively, are provided to confirm the effectiveness of used approximation methods for different values of the fractional-order [Formula: see text].

Topics & Concepts

UniquenessMathematicsApplied mathematicsLyapunov functionStability (learning theory)Convergence (economics)Equilibrium pointEuler's formulaFractional calculusInteger (computer science)Order (exchange)Fixed-point theoremStability theoryMathematical analysisDifferential equationComputer scienceNonlinear systemEconomic growthPhysicsFinanceEconomicsMachine learningQuantum mechanicsProgramming languageFractional Differential Equations SolutionsMathematical and Theoretical Epidemiology and Ecology Models