An SIS epidemic model with variable population size and a delay |
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| Authors: | Herbert W Hethcote P van den Driessche |
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| Institution: | (1) Department of Mathematics, University of Iowa, 52242 Iowa City, Iowa, USA;(2) Department of Mathematics and Statistics, University of Victoria, V8W 3P4 Victoria, B.C., Canada |
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| Abstract: | The SIS epidemiological model has births, natural deaths, disease-related deaths and a delay corresponding to the infectious period. The thresholds for persistence, equilibria and stability are determined. The persistence of the disease combined with the disease-related deaths can cause the population size to decrease to zero, to remain finite, or to grow exponentially with a smaller growth rate constant. For some parameter values, the endemic infective-fraction equilibrium is asymptotically stable, but for other parameter values, it is unstable and a surrounding periodic solution appears by Hopf bifurcation.Research Supported in part by NSERC grant A-8965 and the University of Victoria Committee on Faculty Research & Travel |
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| Keywords: | Epidemiological modeling SIS model Delay Threshold Hopf bifurcation |
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