I. Smouni, Abdelbar EL Mansouri, B. Khajji, A. Labzai, M. Belam, Y. Tidli
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引用次数: 0
Abstract
. In this work, we present a continuous mathematical model, SEIQR, for monkeypox infection. We study the dynamical behaviour of this model and discuss the basic properties of the system. By constructing Lyapunov functions and using Routh-Hurwitz criteria, the stability analysis of the model confirms that the system is globally, as well as locally, asymptotically stable at the free equilibrium E 0 when R 0 < 1. When R 0 > 1, the endemic equilibrium E ∗ exists, and the system is globally, as well as locally, asymptotically stable at the endemic equilibrium E ∗ . Additionally, we conduct a sensitivity analysis of the model parameters to identify the parameters that have a significant impact on the reproduction number R 0 . Finally, we perform numerical simulations to confirm the theoretical analysis using Matlab.
期刊介绍:
Communications in Mathematical Biology and Neuroscience (CMBN) is a peer-reviewed open access international journal, which is aimed to provide a publication forum for important research in all aspects of mathematical biology and neuroscience. This journal will accept high quality articles containing original research results and survey articles of exceptional merit.