Abstract
This study presents and examines a diffusive SIRI epidemic model incorporating logistic source and a general incidence rate. Differing from existing works, the system incorporates two factors: the general incidence rate and the logistic source. We first consider the well-posedness of the system. Then, utilizing the construction of four Lyapunov functions, we thoroughly examine the global asymptotic stability of equilibria in both specific and general scenarios, assuming all coefficients remain constant. In addition, we establish the basic reproduction number, denoted as R0, and subsequently derive the correlation between R0 and the local basic reproduction number. Furthermore, we provide a detailed discussion of the persistence and extinction of the infective population. In particular, in the case where R0 equals one and certain assumptions are met, we demonstrate the global asymptotic stability of the disease-free equilibrium. Lastly, we substantiate the validity of our theoretical findings through the presentation of five illustrative examples.
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