Global stability of multi-group SEIRS epidemic models with vaccination
暂无分享,去创建一个
[1] Mathematical analysis for a multi-group SEIR epidemic model with age-dependent relapse , 2018 .
[2] Xianning Liu,et al. Global stability for multi-group SIR and SEIR epidemic models with age-dependent susceptibility , 2017 .
[3] Toshikazu Kuniya,et al. A multi-group SIR epidemic model with age structure , 2016 .
[4] Xianning Liu,et al. Modeling diseases with latency and nonlinear incidence rates: global dynamics of a multi‐group model , 2016 .
[5] Hongying Shu,et al. Global analysis on a class of multi-group SEIR model with latency and relapse. , 2015, Mathematical biosciences and engineering : MBE.
[6] Jian Zu,et al. Global dynamics of multi‐group dengue disease model with latency distributions , 2015 .
[7] T. Kuniya,et al. Global stability for a delayed multi-group SIRS epidemic model with cure rate and incomplete recovery rate , 2015 .
[8] Toshikazu Kuniya,et al. Stability analysis of a delayed multi-group SIS epidemic model with nonlinear incidence rates and patch structure , 2015 .
[9] Xianning Liu,et al. Global dynamics of a multi-group epidemic model with general exposed distribution and relapse , 2015 .
[10] Michael Y. Li,et al. Impact of network connectivity on the synchronization and global dynamics of coupled systems of differential equations , 2014 .
[11] Xiaohua Ding,et al. Global stability of multi-group vaccination epidemic models with delays , 2011 .
[12] Xiao-Qiang Zhao,et al. A Nonlocal and Time-Delayed Reaction-Diffusion Model of Dengue Transmission , 2011, SIAM J. Appl. Math..
[13] Michael Y. Li,et al. Global stability of multi-group epidemic models with distributed delays , 2010 .
[14] Michael Y. Li,et al. Global-stability problem for coupled systems of differential equations on networks , 2010 .
[15] Horst R. Thieme,et al. Spectral Bound and Reproduction Number for Infinite-Dimensional Population Structure and Time Heterogeneity , 2009, SIAM J. Appl. Math..
[16] Michael Y. Li,et al. A graph-theoretic approach to the method of global Lyapunov functions , 2008 .
[17] Mei Song,et al. Global stability of an SIR epidemicmodel with time delay , 2004, Appl. Math. Lett..
[18] J. Watmough,et al. Reproduction numbers and sub-threshold endemic equilibria for compartmental models of disease transmission. , 2002, Mathematical biosciences.
[19] Yasuhiro Takeuchi,et al. Global asymptotic stability of an SIR epidemic model with distributed time delay , 2001 .
[20] M. Roberts,et al. An SEI model with density-dependent demographics and epidemiology. , 1996, IMA journal of mathematics applied in medicine and biology.
[21] K. L. Cooke,et al. Analysis of an SEIRS epidemic model with two delays , 1996, Journal of mathematical biology.
[22] Yasuhiro Takeuchi,et al. Global stability of an SIR epidemic model with time delays , 1995, Journal of mathematical biology.
[23] Xiaodong Lin,et al. Global stability of the endemic equilibrium and uniform persistence in epidemic models with subpopulations , 1993, The Journal of the Australian Mathematical Society. Series B. Applied Mathematics.
[24] J. Yorke,et al. A Deterministic Model for Gonorrhea in a Nonhomogeneous Population , 1976 .
[25] J. Ortega,et al. Monotone Iterations for Nonlinear Equations with Application to Gauss-Seidel Methods , 1967 .