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Literature DB >> 20872265

Global analysis on delay epidemiological dynamic models with nonlinear incidence.

Abstract

In this paper, we derive and study the classical SIR, SIS, SEIR and SEI models of epidemiological dynamics with time delays and a general incidence rate. By constructing Lyapunov functionals, the global asymptotic stability of the disease-free equilibrium and the endemic equilibrium is shown. This analysis extends and develops further our previous results and can be applied to the other biological dynamics, including such as single species population delay models and chemostat models with delay response.

Mesh：

Year: 2010 PMID： 20872265 DOI： 10.1007/s00285-010-0368-2

Source DB: PubMed Journal: J Math Biol ISSN： 0303-6812 Impact factor: 2.259

17 in total

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Authors: Andrei Korobeinikov
Journal: Bull Math Biol Date: 2006-03-29 Impact factor: 1.758

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Authors: Andrei Korobeinikov
Journal: Bull Math Biol Date: 2007-04-19 Impact factor: 1.758

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2. Global properties of vector-host disease models with time delays.

Authors: Li-Ming Cai; Xue-Zhi Li; Bin Fang; Shigui Ruan
Journal: J Math Biol Date: 2016-09-22 Impact factor: 2.259

3. Threshold dynamics of difference equations for SEIR model with nonlinear incidence function and infinite delay.

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4. Delay differential equations for the spatially resolved simulation of epidemics with specific application to COVID-19.

Authors: Nicola Guglielmi; Elisa Iacomini; Alex Viguerie
Journal: Math Methods Appl Sci Date: 2022-01-18 Impact factor: 3.007