Abstract
An SIS epidemic model with maturation delay is analysed. It is shown that the disease dies out when the basic reproduction number R0<1, and the disease remains endemic when R01 in the sense of uniform persistence. When the disease induced death rate is sufficiently small, the global attractivity of the endemic equilibrium is also proved. © 2001 Academic Press.
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APA
Zhao, X. Q., & Zou, X. (2001). Threshold Dynamics in a Delayed SIS Epidemic Model. Journal of Mathematical Analysis and Applications, 257(2), 282–291. https://doi.org/10.1006/jmaa.2000.7319
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