Analisis Model Epidemi Penyebaran Tuberkulosis Dengan Struktur Umur
Abstract
Keywords
Full Text:
PDF![](https://ejournal.uinib.ac.id/iconimage/icon-doi.png)
![](https://ejournal.uinib.ac.id/iconimage/icon-graph.png)
![](https://ejournal.uinib.ac.id/iconimage/icon-pdf.png)
References
A. Puspitasari, Kamira, dan N. Asiyah, “Analisis Kestabilan dan Kontrol Optimal Model Penyebaran Tuberkulosis ( TB ) dengan Terapi dan,” J. Sains Dan Seni ITS, vol. 8, no. 2, hal. A58–A64, 2019.
A. Wahdi dan D. R. Puspitosari, Mengenal Tuberkulosis. Purwokerto: CV.Pena Persada, 2021.
F. Brauer, P. van den Driessche, dan J. Wu, Mathematical Epidemology (Lecturer Notes in Mathematics 1945). Berlin Heidelberg: Springer, 2008.
H. Anton dan C. Rorres, Elementary Linear Algebra: Applications Version, 11th Ed. Hoboken, New Jersey: John Wiley & Sons, Inc, 2014.
J. Crofton, H. L. Rieder, C.-Y. Chiang, R. Gie, dan D. Enarson, Clinical Tuberculosis, 3rd Ed. Oxford: Macmillan Publishers Limited, 2009.
L. N. Nkamba, T. T. Manga, F. Agouanet, dan M. L. M. Manyombe, “Mathematical model to assess vaccination and effective contact rate impact in the spread of tuberculosis,” J. Biol. Dyn., vol. 13, no. 1, hal. 26–42, 2019.
M. Soleh dan S. Rahma, “Model SEIR Penyakit Campak Dengan Vaksinasi Dan Migrasi,” J. Sains, Teknol. dan Ind., vol. 9, no. 2, hal. 113–123, 2012.
M. Iannelli dan F. Milner, The Basic Approach to Age-Structured Population Dynamics. Models, methods and numerics. Dordrecht: Springer Science + Business Media, 2017.
O. Diekmann dan J. A. P. Heesterbeek, Mathematical Epidemiology of Infectious Disease: Model Building, Analysis and Interpretation. Chichester: John Wiley & Sons Ltd, 2000.
P. N. V. Tu, Dynamical System: An Introduction with Applications in Economics and Biology. New York: Springer-Verlag, 1992.
R. T. Putra, Sukatik, dan S. Nita, “Kestabilan Model Epidemi Seir dengan Matriks Hurwitz,” Poli Rekayasa, vol. 11, no. 2, hal. 74–82, 2016.
S. Side, W. Sanusi, dan A. Bohari, “Pemodelan Matematika SEIR Penyebaran Penyakit Pneumonia pada Balita dengan Pengaruh Vaksinasi di Kota Makassar,” JMathCos (Journal Math. Comput. Stat., vol. 4, no. 1, hal. 1–12, 2021.
T. Atkins, “Modeling Transmission Dynamics Of Tuberculosis Including Various Latent Periods,” Electron. Theses Diss., vol. 3682, hal. 2004–2019, 2008.
WHO, “World Healt Organization, Factsheet on the world tuberculosis report,” 2021. https://www.who.int/en/news-room/fact-sheets/detail/tuberculosis
Z. Guo, H. Xiang, dan H. Huo, “Analysis of an age-structured tuberculosis model with treatment and relapse,” J. Math. Biol., vol. 82, no. 45, hal. 1–37, 2021.
Refbacks
- There are currently no refbacks.
Copyright (c) 2023 Journal of Science and Technology
![Creative Commons License](http://licensebuttons.net/l/by-nc-sa/4.0/88x31.png)
This work is licensed under a Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License.