Chaos for a class of complex epidemiological models

Gen Hu Di; Yong Xu; Wei Xu; Ren Cai Gu

Chaos for a class of complex epidemiological models

Gen Hu Di, Yong Xu, Wei Xu, Ren Cai Gu

School of Mathematics and Statistics

Northwestern Polytechnical University Xian

Research output: Contribution to journal › Article › peer-review

11 Scopus citations

Abstract

We study the well-known SIR (susceptible, infected, recoverd) model with nonlinear complex incidence rates. Firstly, a series of coordinate transformations are carried out to change the equations as the amenable Hamiltonian systems. Secondly the Melnikov's method is used to establish the conditions of existence of chaotic motion and find the analytically critical values of homoclinic bifurcation. Good agreement can be found between numerical results and analytical results.

Original language	English
Article number	020504
Journal	Wuli Xuebao/Acta Physica Sinica
Volume	60
Issue number	2
State	Published - Feb 2011

Keywords

Chaotic motion
Homoclinic bifurcation
Infected
Melnikov's method
Recoverd) model
SIR(susceptible

Cite this

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title = "Chaos for a class of complex epidemiological models",

abstract = "We study the well-known SIR (susceptible, infected, recoverd) model with nonlinear complex incidence rates. Firstly, a series of coordinate transformations are carried out to change the equations as the amenable Hamiltonian systems. Secondly the Melnikov's method is used to establish the conditions of existence of chaotic motion and find the analytically critical values of homoclinic bifurcation. Good agreement can be found between numerical results and analytical results.",

keywords = "Chaotic motion, Homoclinic bifurcation, Infected, Melnikov's method, Recoverd) model, SIR(susceptible",

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AU - Di, Gen Hu

AU - Xu, Yong

AU - Xu, Wei

AU - Gu, Ren Cai

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N2 - We study the well-known SIR (susceptible, infected, recoverd) model with nonlinear complex incidence rates. Firstly, a series of coordinate transformations are carried out to change the equations as the amenable Hamiltonian systems. Secondly the Melnikov's method is used to establish the conditions of existence of chaotic motion and find the analytically critical values of homoclinic bifurcation. Good agreement can be found between numerical results and analytical results.

AB - We study the well-known SIR (susceptible, infected, recoverd) model with nonlinear complex incidence rates. Firstly, a series of coordinate transformations are carried out to change the equations as the amenable Hamiltonian systems. Secondly the Melnikov's method is used to establish the conditions of existence of chaotic motion and find the analytically critical values of homoclinic bifurcation. Good agreement can be found between numerical results and analytical results.

KW - Chaotic motion

KW - Homoclinic bifurcation

KW - Infected

KW - Melnikov's method

KW - Recoverd) model

KW - SIR(susceptible

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M3 - 文章

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JO - Wuli Xuebao/Acta Physica Sinica

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ER -

Chaos for a class of complex epidemiological models

Abstract

Keywords

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