Dynamics of Epidemiological Models |
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| Authors: | Alberto Pinto Maíra Aguiar José Martins Nico Stollenwerk |
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| Affiliation: | 1.LIAAD-INESC,Porto LA,Portugal;2.Department of Mathematics, Faculty of Sciences,University of Porto,Porto,Portugal;3.Department of Mathematics and Research Center of Mathematics of the University of Minho,Braga,Portugal;4.Centro de Matemática e Aplica??es Fundamentais da Universidade de Lisboa,Lisboa,Portugal;5.Funda??o Ezequiel Dias,Laboratório de Dengue e Febre Amarela,Belo Horizonte,MG,Brazil;6.Department of Mathematics, School of Technology and Management,Polytechnic Institute of Leiria,Leiria,Portugal;7.Research Center Jülich,Jülich,Germany |
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| Abstract: | We study the SIS and SIRI epidemic models discussing different approaches to compute the thresholds that determine the appearance of an epidemic disease. The stochastic SIS model is a well known mathematical model, studied in several contexts. Here, we present recursively derivations of the dynamic equations for all the moments and we derive the stationary states of the state variables using the moment closure method. We observe that the steady states give a good approximation of the quasi-stationary states of the SIS model. We present the relation between the SIS stochastic model and the contact process introducing creation and annihilation operators. For the spatial stochastic epidemic reinfection model SIRI, where susceptibles S can become infected I, then recover and remain only partial immune against reinfection R, we present the phase transition lines using the mean field and the pair approximation for the moments. We use a scaling argument that allow us to determine analytically an explicit formula for the phase transition lines in pair approximation. |
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