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In this investigation, we have derived and analysed two different mathematical models to better understand the transmission and spread of Malaria disease, and try to find an effective strategy for its prevention and Control. Mathematicaly, we modeled malaria as a 5-dimensional system of ordinary differental equation.We showed the existence and stability of equilibrium points of the Models. Clearly, all the numerical simulations have shown that the disease-free and endemic equilibriums are stable when the reproduction number lies below one.

Produktbeschreibung
In this investigation, we have derived and analysed two different mathematical models to better understand the transmission and spread of Malaria disease, and try to find an effective strategy for its prevention and Control. Mathematicaly, we modeled malaria as a 5-dimensional system of ordinary differental equation.We showed the existence and stability of equilibrium points of the Models. Clearly, all the numerical simulations have shown that the disease-free and endemic equilibriums are stable when the reproduction number lies below one.
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Autorenporträt
Banchiamlak Kebede, B.Sc. Degree in Applied Mathematics from Arbaminch University. After graduation she was employed in Arbaminch University, Ethiopia as a Graduate Assistant Lecturer. Obtained her M.Sc. Degree in Mathematical and Statistical Modeling (MASTMO) from Hawassa University, The School of Mathehatical and Statistical Sciences, Ethiopia.