| Tài liệu tham khảo |
Loại |
Chi tiết |
| [1] L. J.S. Allen (2006), An Introduction to Mathematical Biology, Pearson |
Sách, tạp chí |
| Tiêu đề: |
An Introduction to Mathematical Biology |
| Tác giả: |
L. J.S. Allen |
| Nhà XB: |
Pearson |
| Năm: |
2006 |
|
| [2] R.M. Anderson, R.M. May (1991), Injectious Diseases in Humans: Dy- namics and Control, Oxford University Press. Oxford |
Sách, tạp chí |
| Tiêu đề: |
Infectious Diseases in Humans: Dynamics and Control |
| Tác giả: |
R.M. Anderson, R.M. May |
| Nhà XB: |
Oxford University Press |
| Năm: |
1991 |
|
| [3] U. M. Ascher, L. R. Petzold (1998), Computer Methods for Ordinary Differential Equations and Differential-Algebraic Equations, Society for Industrial and Applied Mathematics |
Sách, tạp chí |
| Tiêu đề: |
Computer Methods for Ordinary Differential Equations and Differential-Algebraic Equations |
| Tác giả: |
U. M. Ascher, L. R. Petzold |
| Nhà XB: |
Society for Industrial and Applied Mathematics |
| Năm: |
1998 |
|
| [6] L. Chen, J. Sun (2014), Global stability of an SI epidemic model with feedback controls, Applied Mathematics Letters 28, 53-55 |
Sách, tạp chí |
| Tiêu đề: |
Global stability of an SI epidemic model with feedback controls |
| Tác giả: |
L. Chen, J. Sun |
| Nhà XB: |
Applied Mathematics Letters |
| Năm: |
2014 |
|
| [9] J. La Salle, S. Lefschetz (1961), Stability by Liapunov’s Direct Method, Academic Press, New York |
Sách, tạp chí |
| Tiêu đề: |
Stability by Liapunov’s Direct Method |
| Tác giả: |
J. La Salle, S. Lefschetz |
| Nhà XB: |
Academic Press |
| Năm: |
1961 |
|
| [10] M. Martcheva (2015), An Introduction to Mathematical Epidemiology, Springer Science+Business Media, New York |
Sách, tạp chí |
| Tiêu đề: |
An Introduction to Mathematical Epidemiology |
| Tác giả: |
M. Martcheva |
| Nhà XB: |
Springer Science+Business Media |
| Năm: |
2015 |
|
| [4] N. T. J. Bailey (1975), The Mathematical Theory of Infectious Diseases and Its Applications, Griffin, London |
Khác |
|
| [5] S. Busenberg, K. Cooke (1993), Vertically Tmnsmitted Diseases: Models and Dynamics, Springer, Berlin |
Khác |
|
| [7] J. K. Hale (2009), Ordinary differential equations, Courier Corporation |
Khác |
|
| [8] A. Korobeinikov, G. C. Wake (2002), Lyapunov functions and global stability for SIR, SIRS, and SIS epidemiological models, Applied Math- ematics Letters, Volume 15, Issue 8, Pages 955-960 |
Khác |
|
| [11] A. Stuart, A. R. Humphries (1998), Dynamical Systems and Numerical Analysis, Cambridge University Press |
Khác |
|
| [12] C. Vargas-De-Leon (2011), On the global stability of SIS, SIR and SIRS epidemic models with standard incidence, Chaos, Solitons & Fractals 44 1106-1110 |
Khác |
|