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Mathematical Modeling of Malaria Transmission Dynamics: Case of Burundi

Egide Ndamuzi, Paterne Gahungu

2021Journal of Applied Mathematics and Physics21 citationsDOIOpen Access PDF

Abstract

Burundi, a country in East Africa with a temperate climate, has experienced in recent years a worrying growth of the Malaria epidemic. In this paper, a deterministic model of the transmission dynamics of malaria parasite in mosquito and human populations was formulated. The mathematical model was developed based on the SEIR model. An epidemiological threshold, R0, called the basic reproduction number was calculated. The disease-free equilibrium point was locally asymptotically stable if R0 R0 > 1. Using a Lyapunov function, we proved that this disease-free equilibrium point was globally asymptotically stable whenever the basic reproduction number is less than unity. The existence and uniqueness of endemic equilibrium were examined. With the Lyapunov function, we proved also that the endemic equilibrium is globally asymptotically stable if R0 > 1. Finally, the system of equations was solved numerically according to Burundi’s data on malaria. The result from our model shows that, in order to reduce the spread of Malaria in Burundi, the number of mosquito bites on human per unit of time (σ), the vector population of mosquitoes (Nv), the probability of being infected for a human bitten by an infectious mosquito per unit of time (b) and the probability of being infected for a mosquito per unit of time (c) must be reduced by applying optimal control measures.

Topics & Concepts

Lyapunov functionMalariaEquilibrium pointBasic reproduction numberStability theoryUniquenessPopulationTransmission (telecommunications)MathematicsApplied mathematicsEpidemic modelComputer scienceBiologyDemographyDifferential equationPhysicsMathematical analysisNonlinear systemQuantum mechanicsImmunologyTelecommunicationsSociologyMathematical and Theoretical Epidemiology and Ecology ModelsEvolution and Genetic DynamicsCOVID-19 epidemiological studies
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