Journal of Mathematical Problems, Equations and Statistics
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P-ISSN: 2709-9393, E-ISSN: 2709-9407

2024, Vol. 5, Issue 1, Part B


Permanence and uniform asymptotic stability of almost periodic positive solutions for COVID-19 epidemic model with time delays


Author(s): KV Vidyasagar, MV Ramakrishna, A Chandra Mouli and B Rajesh Kumar

Abstract: In this paper we study a non-autonomous time-delayed COVID-19 epidemic model. By utilizing some differential inequalities, sufficient conditions are derived for the permanence of the model and we also obtain the existence and uniform asymptotic stability of almost periodic solutions for the addressed model by Lyapunov functional method. Finally numerical simulations are given to demonstrate our theoretical results.

DOI: https://doi.org/10.22271/math.2024.v5.i1b.128

Pages: 124-133 | Views: 392 | Downloads: 141

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Journal of Mathematical Problems, Equations and Statistics
How to cite this article:
KV Vidyasagar, MV Ramakrishna, A Chandra Mouli and B Rajesh Kumar. Permanence and uniform asymptotic stability of almost periodic positive solutions for COVID-19 epidemic model with time delays. Journal of Mathematical Problems, Equations and Statistics. 2024; 5(1): 124-133. DOI: 10.22271/math.2024.v5.i1b.128
Journal of Mathematical Problems, Equations and Statistics
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