Dynamical behavior of epidemiological models with nonlinear incidence rates |
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| Authors: | Liu Wei-min Hethcote Herbert W. Levin Simon A. |
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| Affiliation: | (1) Center for Applied Mathematics, 14853 Ithaca, NY, USA;(2) Section of Ecology and Systematics, Corson Hall, Cornell University, 1485.3 Ithaca, NY, USA;(3) Ecosystems Research Center, 52242 Iowa City, IA, USA;(4) Department of Mathematics, University of Iowa, 52242 Iowa City, IA, USA |
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| Abstract: | Epidemiological models with nonlinear incidence rates  IpSqshow a much wider range of dynamical behaviors than do those with bilinear incidence rates IS. These behaviors are determined mainly by p and , and secondarily by q. For such models, there may exist multiple attractive basins in phase space; thus whether or not the disease will eventually die out may depend not only upon the parameters, but also upon the initial conditions. In some cases, periodic solutions may appear by Hopf bifurcation at critical parameter values. |
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| Keywords: | Epidemiological models Nonlinear incidence rates Hopf bifurcation Homoclinic-loop bifurcation |
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