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In this paper the basic reproduction number for Ro for HBV-HDV co-Infection was obtained with respect to the parameters mathcad. TheLS^U^'0" C°",r°'S Were Carried susceptible...
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In this work, we look at the vaccine and condom Nipah virus model using an optimum control analysis. We implemented measures to limit infection dissemination and control. We examine...
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We propose a model for NiV infection mechanisms from pigs to humans and humans to humans, with a focus on the impact of a combination vaccine, and condom as a control measure. In a...
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We formulated in this work, a mathematical model which is made up of system of non-linear ordinary differential equations that is analyzed so to study the dynamics of terrorism, a case of...
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This work is aimed at formulating a mathematical model ofthe spread ofvector-bome diseases with influence of vertical transmission and preventive strategies. Vector borne diseases are...
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This paper aims to investigate various epidemiological aspects ofLassa fever viral infection using a fractionalorder mathematical model so as to assess the impacts of treatment and...
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The applicability of the Atangana-Baleanu derivative in modeling and assessing the dynamics of the Nipah virus is investigated in this paper. The Atangana-Baleanu derivative, a fractional...
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This study introduces an improved mathematical framework for modeling the dynamics of HIV/AIDS transmission. The model incorporates targeted testing strategies and accounting for the...
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Ebola Virus Disease is a life-threatening disease that is transmitted between humans and animals. The aim of this study is to develop a fractional order Ebola Virus Disease model for the...
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In this research, we conduct sensitivity analysis on the parameters of the Nipah virus model and then apply the differential transformation method to solve the model equations. By...
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In this work, the basic trust-region methods for unconstrained multivariable nonlinear optimization problems were studied using the Dogleg-type trust-region method which employed the...
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We considered the population dynamic of a housefly in well-defined stages. We usecj Leslie and Lefkovitch matrix which considered Eigenvalues and Eigenvectors as the best approach in...
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One very difficult task for mathematicians has been to give a comprehensive but precise definition ofthe subject mathematics. Sometime, seven Fields medalists in mathematics attempted to...
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This study is aimed at solving for the roots of quadratic, cubic and quartic equations in a field when the equations have real coeffcicnt». The problem of finding the roots of polynomial...
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This project work present a machine-checked formalization of I • elementary abstract algebra in constructive set theory. This formalization uses an approach where I start by specifying the...
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In this thesis, the important fundamental properties of numerical methods for ordinary differential equations are investigated. This involves the derivation of Adams Bashforth methods,...
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This project is an x-ray on Ordinary Differential Equations, its application to mathematical modeling and how it can be used to model the quantity of food to be cooked in a restaurant...
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In this project work, some foundations of Abstract Algebra (such as groups) have been studied by the use of a square. The research work identified all the symmetries of the square...
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In this study, the standard SIRS Model was used to control the spread of Tuberculosis The disease-free equilibrium state ofthe model was established and its stability analyzed using the...
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In this work we study the application of graph colouring to scheduling problem three illustrative examples are presented, namely, examination scheduling, committee assignment and...
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In this work, we applied Euler circuits and Euler trails to the ground plan of Michael Okpara University of Agriculture Umudike campus, Abia state. Euler's theorems, algorithms graphs,...
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This work applies the residues theorem which is a concept of the complex calculus to the real calculus. This is significant as the theorem is used for the evaluation of some real definite...
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This work generally explores Lagrange Multipliers method and its relevance, condition, distinction and technique to finding solutions of a constrained Non-linear optimization problem
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This project work focuses on how mathematical modeling can be used to reduce the rate ol typhoid fever in Michael Okpara University of Agriculture, Umudike. From the data results, it was...
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We reviewed and compared methods of solution for integral equations with concentration on approximation methods. We gave an introduction to integral equations, and reviewed...