Global stability for the SEIR model in epidemiology.
暂无分享,去创建一个
[1] Z. Teng,et al. Persistence in dynamical systems , 1990 .
[2] David London,et al. On derivations arising in differential equations , 1976 .
[3] Robert H. Martin. Logarithmic norms and projections applied to linear differential systems , 1974 .
[4] S. Levin,et al. Dynamical behavior of epidemiological models with nonlinear incidence rates , 1987, Journal of mathematical biology.
[5] H. Hethcote. PERIODICITY AND STABILITY IN EPIDEMIC MODELS: A SURVEY , 1981 .
[6] F. V. Vleck,et al. Stability and Asymptotic Behavior of Differential Equations , 1965 .
[7] J. Muldowney. Dichotomies and asymptotic behaviour for linear differential systems , 1984 .
[8] James S. Muldowney,et al. On Bendixson′s Criterion , 1993 .
[9] Hal L. Smith. Systems of ordinary differential equations which generate an order preserving flow. A survey of results , 1988 .
[10] James S. Muldowney,et al. Compound matrices and ordinary differential equations , 1990 .
[11] J. Hale,et al. Ordinary Differential Equations , 2019, Fundamentals of Numerical Mathematics for Physicists and Engineers.
[12] Morris W. Hirsch,et al. System of differential equations that are competitive or cooperative. IV: structural stability in three-dimensional systems , 1990 .