Literature DB >> 17443392

Global properties of infectious disease models with nonlinear incidence.

Andrei Korobeinikov1.   

Abstract

We consider global properties for the classical SIR, SIRS and SEIR models of infectious diseases, including the models with the vertical transmission, assuming that the horizontal transmission is governed by an unspecified function f(S,I). We construct Lyapunov functions which enable us to find biologically realistic conditions sufficient to ensure existence and uniqueness of a globally asymptotically stable equilibrium state. This state can be either endemic, or infection-free, depending on the value of the basic reproduction number.

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Year:  2007        PMID: 17443392     DOI: 10.1007/s11538-007-9196-y

Source DB:  PubMed          Journal:  Bull Math Biol        ISSN: 0092-8240            Impact factor:   1.758


  13 in total

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6.  Stability, bifurcation and chaos analysis of vector-borne disease model with application to Rift Valley fever.

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7.  Hopf Bifurcation of an Epidemic Model with Delay.

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Journal:  PLoS One       Date:  2016-06-15       Impact factor: 3.240

8.  Spatio-Temporal Patterns of the 2019-nCoV Epidemic at the County Level in Hubei Province, China.

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Journal:  Int J Environ Res Public Health       Date:  2020-04-08       Impact factor: 3.390

9.  Stability and Hopf Bifurcation in a Delayed HIV Infection Model with General Incidence Rate and Immune Impairment.

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Journal:  Comput Math Methods Med       Date:  2015-08-04       Impact factor: 2.238

10.  Modelling diseases with relapse and nonlinear incidence of infection: a multi-group epidemic model.

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Journal:  J Biol Dyn       Date:  2014       Impact factor: 2.179
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