Volume 19, Issue 1, January 2017, Pages 46–54
S. O. Adewale1, G. A. Adeniran2, ISAAC ADESOLA OLOPADE3, S.O. Ajao4, and I. T. Mohammed5
1 Department of Pure and Applied Mathematics, P.M.B. 4000, Ladoke Akintola University of Technology (LAUTECH), Ogbomoso, Oyo State, Nigeria
2 Department of Pure and Applied Mathematics, P.M.B. 4000, Ladoke Akintola University of Technology (LAUTECH), Ogbomoso, Oyo State, Nigeria
3 Department of Mathematics and Computer Science, P.M.B. 002, Elizade University, Ilara-Mokin, Ondo State, Nigeria
4 Department of Pure and Applied Mathematics, P.M.B. 4000, Ladoke Akintola University of Technology (LAUTECH), Ogbomoso, Oyo State, Nigeria
5 Department of Statistics, Osun State Polytechnic, P.M.B. 301, Iree, Osun State, Nigeria
Original language: English
Copyright © 2017 ISSR Journals. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
Sensitivity analysis was performed on the mathematical model of Cholera to determine the influence and importance of each parameter on the basic reproduction number (R0) in the dynamical spread of Cholera. Basic Reproduction Number (R0) was obtained using next generation matrix method (NGM). The disease free equilibrium was analyzed for stability and the analysis shows that the disease free equilibrium point is globally asymptotically stable whenever the basic reproduction number is less than unity i.e (R0<1). Also, there exist endemic equilibrium points of the model whenever R0>1. The relative sensitivity indices of the model with respect to each parameter in the basic reproduction number is calculated in order to find the most sensitive parameter which the medical practitioners and policy health makers should work on in order to reduce the spread of cholera in the society. The result shows that effective contact rate and fraction of individuals with low immunity are the most sensitive parameters in the reproduction number. Numerical simulation was carried out by MAPLE 17 software using Runge-kutta method of order four to show the effects of contact rate and fraction of individuals with low immunity in the dynamical spread of Cholera. This work will allow the health policy makers to know the best control measure to be adopted in order to have disease free environment.
Author Keywords: Cholera, Reproduction Number, Critical Point, Sensitivity analysis, Stability.
S. O. Adewale1, G. A. Adeniran2, ISAAC ADESOLA OLOPADE3, S.O. Ajao4, and I. T. Mohammed5
1 Department of Pure and Applied Mathematics, P.M.B. 4000, Ladoke Akintola University of Technology (LAUTECH), Ogbomoso, Oyo State, Nigeria
2 Department of Pure and Applied Mathematics, P.M.B. 4000, Ladoke Akintola University of Technology (LAUTECH), Ogbomoso, Oyo State, Nigeria
3 Department of Mathematics and Computer Science, P.M.B. 002, Elizade University, Ilara-Mokin, Ondo State, Nigeria
4 Department of Pure and Applied Mathematics, P.M.B. 4000, Ladoke Akintola University of Technology (LAUTECH), Ogbomoso, Oyo State, Nigeria
5 Department of Statistics, Osun State Polytechnic, P.M.B. 301, Iree, Osun State, Nigeria
Original language: English
Copyright © 2017 ISSR Journals. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
Abstract
Sensitivity analysis was performed on the mathematical model of Cholera to determine the influence and importance of each parameter on the basic reproduction number (R0) in the dynamical spread of Cholera. Basic Reproduction Number (R0) was obtained using next generation matrix method (NGM). The disease free equilibrium was analyzed for stability and the analysis shows that the disease free equilibrium point is globally asymptotically stable whenever the basic reproduction number is less than unity i.e (R0<1). Also, there exist endemic equilibrium points of the model whenever R0>1. The relative sensitivity indices of the model with respect to each parameter in the basic reproduction number is calculated in order to find the most sensitive parameter which the medical practitioners and policy health makers should work on in order to reduce the spread of cholera in the society. The result shows that effective contact rate and fraction of individuals with low immunity are the most sensitive parameters in the reproduction number. Numerical simulation was carried out by MAPLE 17 software using Runge-kutta method of order four to show the effects of contact rate and fraction of individuals with low immunity in the dynamical spread of Cholera. This work will allow the health policy makers to know the best control measure to be adopted in order to have disease free environment.
Author Keywords: Cholera, Reproduction Number, Critical Point, Sensitivity analysis, Stability.
How to Cite this Article
S. O. Adewale, G. A. Adeniran, ISAAC ADESOLA OLOPADE, S.O. Ajao, and I. T. Mohammed, “MATHEMATICAL AND SENSITIVITY ANALYSIS OF THE DYNAMICAL SPREAD OF CHOLERA,” International Journal of Innovation and Applied Studies, vol. 19, no. 1, pp. 46–54, January 2017.