Mathematical Modeling of Typhoid Fever Disease Incorporating Unprotected Humans in the Spread Dynamics

Karunditu, Julia Wanjiku and Kimathi, George and Osman, Shaibu (2019) Mathematical Modeling of Typhoid Fever Disease Incorporating Unprotected Humans in the Spread Dynamics. Journal of Advances in Mathematics and Computer Science, 32 (3). pp. 1-11. ISSN 2456-9968

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Abstract

A deterministic mathematical model of typhoid fever incorporating unprotected humans is formulated in this study and employed to study local and global stability of equilibrium points. The model incorporating Susceptible, unprotected, Infectious and Recovered humans which are analyzed mathematically and also result into a system of ordinary differential equations which are used for interpretations and comparison to the qualitative solutions in studying the spread dynamics of typhoid fever. Jacobian matrix was considered in the study of local stability of disease free equilibrium point and Castillo-Chavez approach used to determine global stability of disease free equilibrium point. Lyapunov function was used to study global stability of endemic equilibrium point. Both equilibrium points (DFE and EE) were found to be local and globally asymptotically stable. This means that the disease will be dependent on numbers of unprotected humans and other factors who contributes positively to the transmission dynamics.

Item Type: Article
Subjects: Archive Digital > Mathematical Science
Depositing User: Unnamed user with email support@archivedigit.com
Date Deposited: 26 Apr 2023 07:13
Last Modified: 02 Jan 2024 13:19
URI: http://eprints.ditdo.in/id/eprint/500

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