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A Complete Model of Crimean-Congo Hemorrhagic Fever (CCHF) Transmission Cycle with Nonlocal Fractional Derivative

Hakimeh Mohammadi, Mohammed K. A. Kaabar, Jehad Alzabut, A‎. George Maria Selvam, Shahram Rezapour

2021Journal of Function Spaces22 citationsDOIOpen Access PDF

Abstract

Crimean-Congo hemorrhagic fever is a common disease between humans and animals that is transmitted to humans through infected ticks, contact with infected animals, and infected humans. In this paper, we present a boxed model for the transmission of Crimean-Congo fever virus. With the help of the fixed-point theory, our proposed system model is investigated in detail to prove its unique solution. Given that the Caputo fractional-order derivative preserves the system’s historical memory, we use this fractional derivative in our modeling. The equilibrium points of the proposed system and their stability conditions are determined. Using the Euler method for the Caputo fractional-order derivative, we calculate the approximate solutions of the fractional system, and then, we present a numerical simulation for the transmission of Crimean-Congo hemorrhagic fever.

Topics & Concepts

Crimean–Congo hemorrhagic feverFractional calculusDerivative (finance)Transmission (telecommunications)Congo redApplied mathematicsStability (learning theory)MathematicsVirologyComputer scienceMedicineFinancial economicsOrganic chemistryEconomicsChemistryTickTelecommunicationsAdsorptionMachine learningViral Infections and VectorsMathematical and Theoretical Epidemiology and Ecology ModelsFractional Differential Equations Solutions
A Complete Model of Crimean-Congo Hemorrhagic Fever (CCHF) Transmission Cycle with Nonlocal Fractional Derivative | Litcius