2024, Vol. 5, Issue 2, Part B
Mathematical analysis of COVID-19 transmission in TB community during immunization
Author(s): Bed Prakash Singh and Brijendra Kumar
Abstract: The infectious diseases coronavirus (also known as COVID-19) and tuberculosis (commonly known as TB) continue to infect millions of people worldwide every year. Coughing, fever, and breathing difficulties are some of the symptoms they share, although their incubation durations are very different. This article presents a mathematical model for the spread of COVID-19 in a population with tuberculosis while the disease is being prevented by vaccination, using a set of nonlinear ordinary differential equations. Once the answers are shown to be positive, an analytical study of the well-posedness of the proposed coinfection model is conducted. The fundamental reproduction number for coinfection has also been expressed by calculations. In order to supplement the outcomes of the analysis, several other simulation situations were graphically executed.
DOI: https://doi.org/10.22271/math.2024.v5.i2b.232
Pages: 159-168 | Views: 920 | Downloads: 335
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How to cite this article:
Bed Prakash Singh and Brijendra Kumar. Mathematical analysis of COVID-19 transmission in TB community during immunization. Journal of Mathematical Problems, Equations and Statistics. 2024; 5(2): 159-168. DOI: 10.22271/math.2024.v5.i2b.232
