MATHEMATICAL MODELING OF TUBERCULOSIS DYNAMICS WITH HYGIENE CONSCIOUSNESS AS A CONTROL STRATEGY

  • Type: Project
  • Department: Mathematics
  • Project ID: MTH0123
  • Access Fee: ₦5,000 ($14)
  • Pages: 41 Pages
  • Format: Microsoft Word
  • Views: 696
  • Report This work

For more Info, call us on
+234 8130 686 500
or
+234 8093 423 853

ABSTRACT

Tuberculosis, an air-borne infectious disease, remains a major threat to public health in Kenya. In this study we derived a system of non-linear ordinary differential equations from SLICR mathematical model of TB to study the effects of hygiene consciousness as a control strategy against TB in Kenya. The effective basic reproduction number (R0) of the model was determined by the next generation matrix approach. We established and analysed the equilibrium points. Using the Routh-Hurwitz criterion for local stability analysis and comparison theorem for global stability analysis, the disease free equilibrium (DFE) was found to be locally asymptotically stable given that R0 < 1. Also by using the Routh-Hurwitz criterion for local stability analysis and Lyapunov function and LaSalle’s invariance principle for global stability analysis, the endemic equilibrium (EE) point was found to be locally asymptotically stable given that R0 > 1. Using MATLAB ode45 solver, we simulated the model numerically and the results suggest that hygiene consciousness can help in controlling TB disease if incorporated effectively

MATHEMATICAL MODELING OF TUBERCULOSIS DYNAMICS WITH HYGIENE CONSCIOUSNESS AS A CONTROL STRATEGY
For more Info, call us on
+234 8130 686 500
or
+234 8093 423 853

Share This
  • Type: Project
  • Department: Mathematics
  • Project ID: MTH0123
  • Access Fee: ₦5,000 ($14)
  • Pages: 41 Pages
  • Format: Microsoft Word
  • Views: 696
Payment Instruction
Bank payment for Nigerians, Make a payment of ₦ 5,000 to

Bank GTBANK
gtbank
Account Name Obiaks Business Venture
Account Number 0211074565

Bitcoin: Make a payment of 0.0005 to

Bitcoin(Btc)

btc wallet
Copy to clipboard Copy text

500
Leave a comment...

    Details

    Type Project
    Department Mathematics
    Project ID MTH0123
    Fee ₦5,000 ($14)
    No of Pages 41 Pages
    Format Microsoft Word

    Related Works

    ABSTRACT This project proposes a non – linear mathematical model to study the effect of irresponsible infected  immigrants on the spread of HIV/AIDS in a heterogeneous population with a constant recruitment of susceptible. The equilibrium points, stability analysis  and numerical simulation on the model are presented. It is realised that at... Continue Reading
    ABSTRACT This project proposes a non – linear mathematical model to study the effect of irresponsible infected  immigrants on the spread of HIV/AIDS in a heterogeneous population with a constant recruitment of susceptible. The equilibrium points, stability analysis  and numerical simulation on the model are presented. It is realised that at... Continue Reading
    . CHAPTER ONE 1.0 INTRODUCTION 1.1 Background of the Study Tuberculosis or TB (short for Tubercles Bacillus) is an air borne and highly infectious disease caused by infection with the bacteria mycobacterium tuberculosis. An individual is infected with the disease when he or she... Continue Reading
    ABSTRACT This research work focused on the use of an hybrid RANS-LES turbulence model in simulating and checking the drag performance characteristics of an aerodynamic vehicle. The Spalart-Allmaras shear stress transport (SST)- Scale Adaptive Simulation (SAS) Turbulence model was selected for use, and with the help of OpenFOAM Finite Volume... Continue Reading
    ABSTRACT This study proposes and analyzes a non-linear mathematical model for the dynamics of HIV/AIDS with treatment and vertical transmission. The equilibrium points of the model system are found and their stability is investigated. The model exhibits two equilibria namely, the disease-free and the endemic equilibrium. It is found that if the... Continue Reading
    ABSTRACT This study proposes and analyzes a non-linear mathematical model for the dynamics of HIV/AIDS with treatment and vertical transmission. The equilibrium points of the model system are found and their stability is investigated. The model exhibits two equilibria namely, the disease-free and the endemic equilibrium. It is found that if the... Continue Reading
    ABSTRACT In this study, we have formulated a mathematical model based on a system of ordinary differential equations to study the dynamics of typhoid fever disease incorporating protection against infection. The existences of the steady states of the model are determined and the basic reproduction number is computed using the next generation... Continue Reading
    ABSTRACT In this research work, Mathematical Model for Measles Transmission Dynamics in Luweero District of Uganda, SVEIR model was developed and analyzed. The model consists of five non liner ordinary differential equations. The effective reproductive number, (the number of secondary infections when a single effective individual is introduced... Continue Reading
    Abstract In this research work, Mathematical Model for Measles Transmission Dynamics in Luweero District of Uganda, SVEIR model was developed and analyzed. The model consists of five non liner ordinary differential equations. The effective reproductive number, (the number of secondary infections when a single effective individual is introduced... Continue Reading
    ABSTRACT Simple population growth models involving birth rate, death rate, migration, and carrying capacity of the environment were considered. Furthermore, the particular case where there is discrete delay according to the sex involved in the population growth were treated. The equilibrium and stability analysis of each of the cases were... Continue Reading
    Call Us
    whatsappWhatsApp Us