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Mathematical Analysis of a Chlamydia Epidemic Model with Pulse Vaccination Strategy
Acta Biotheoretica 63 (1):1-21 (2014)
Abstract
In this paper, we have considered a dynamical model of Chlamydia disease with varying total population size, bilinear incidence rate and pulse vaccination strategy. We have defined two positive numbers $$R_{0}$$ R 0 and $$R_{1}$$ R 1. It is proved that there exists an infection-free periodic solution which is globally attractive if $$R_{0} 1.$$ R 1 > 1. The important mathematical findings for the dynamical behaviour of the Chlamydia disease model are also numerically verified using MATLAB. Finally epidemiological implications of our analytical findings are addressed criticallyOther Versions
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Citations of this work
Measuring Infection Transmission in a Stochastic SIV Model with Infection Reintroduction and Imperfect Vaccine.M. Gamboa & M. J. Lopez-Herrero - 2020 - Acta Biotheoretica 68 (4):395-420.
Optimal Control and Cost-Effectiveness Analysis of an HPV–Chlamydia trachomatis Co-infection Model.A. Omame, C. U. Nnanna & S. C. Inyama - 2021 - Acta Biotheoretica 69 (3):185-223.
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