Top

Published in:

2021 | OriginalPaper | Chapter

11. A Fractional-Order SEQAIR Model to Control the Transmission of nCOVID 19

Authors : Jitendra Panchal, Falguni Acharya

Published in: Mathematical Analysis for Transmission of COVID-19

Publisher: Springer Singapore

Activate our intelligent search to find suitable subject content or patents.

search-config

AI-assisted search

Off

Abstract

The ensuing paper expounds a new mathematical model for a pandemic instigated by novel coronavirus (COVID-19) with influence of quarantine on transmission of COVID-19, using Caputo fractional-order derivative for various fractional order. Basic reproduction number for the SEQAIR model has been calculated in the study and additionally proving the existence and uniqueness of the solution using the fixed-point theorem. Furthermore, numerical solution is revealed using the Adams–Bashforth–Moulton method, and its application for real-world data is deliberated.

Dont have a licence yet? Then find out more about our products and how to get one now:

Springer Professional "Wirtschaft+Technik"

Online-Abonnement

Mit Springer Professional "Wirtschaft+Technik" erhalten Sie Zugriff auf:

über 102.000 Bücher
über 537 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Finance + Banking
Management + Führung
Marketing + Vertrieb
Maschinenbau + Werkstoffe
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

inform now

Springer Professional "Technik"

Online-Abonnement

Mit Springer Professional "Technik" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 390 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Maschinenbau + Werkstoffe

Jetzt Wissensvorsprung sichern!

inform now

previous chapter Impact of COVID-19 in India and Its Metro Cities: A Statistical Approach

next chapter Analysis of Novel Corona Virus (COVID-19) Pandemic with Fractional-Order Caputo–Fabrizio Operator and Impact of Vaccination

https://www.who.int/emergencies/diseases/novel-coronavirus-2019/events-as-they-Happen.

https://www.worldometers.info/coronavirus/country/india/.

“Is the World Ready for the corona virus?” Editorial. The New York Times. 29 January 2020. Archived from the original on 30 January 2020.

Atangana, A. (2020). Modelling the spread of COVID-19 with new fractal-fractional operators: Can the lockdown save mankind before vaccination? 136, 109860.

Dighe, A., Jombart, T., van Kerkhove, M., & Ferguson, N. (2019). A mathematical model of the transmission of middle East respiratory syndrome coronavirus in dromedary camels (Camelus dromedarius). International Journal of Infectious Diseases, 79(1), 1–150.CrossRef

Li, C., & Tao, C. (2009). On the fractional Adams method. Computers & Mathematics with Applications, 58(8), 1573–1588.MathSciNetCrossRef

Chen, Y., Cheng, J., Jiang, Y., & Liu, K., (2020). A time delay dynamic system with external source for the local outbreak of 2019-nCoV. Applicable Analysis, 1–12.

Baleanu, D., Jajarmi, A., Mohammadi H., & Rezapour, Sh. (2020). A new study on the mathematical modelling of human liver with Caputo-Fabrizio fractional derivative. Chaos, Solitons & Fractals, 134.

Akbari Kojabad, E., & Rezapour, Sh. (2017). Approximate solutions of a sum-type fractional integro-differential equation by using Chebyshev and Legendre polynomials (p. 351). Eq: Adv. Diff.MATH

10.

Ucar, E., Ozdemir, N., & Altun, E. (2019). Fractional order model of immune cells influenced by cancer cells. Mathematical Modelling of Natural Phenomena, 14(3), 308.MathSciNetCrossRef

11.

Haq, F., Shah, K., Rahman, G., & Shahzad, M. (2017). Numerical analysis of fractional order model of HIV-1 infection of CD4 + T-cells. Computational Methods for Differential Equations, 5(1), 1–11.MathSciNetMATH

12.

Singh, H., Dhar, J., Bhatti, H. S., & Chandok, S. (2016). An epidemic model of childhood disease dynamics with maturation delay and latent period of infection. Modeling Earth Systems and Environment, 2, 79.CrossRef

13.

Koca, I. (2018). Analysis of rubella disease model with non-local and non-singular fractional derivatives. Journal of Theories and Applications, 8(1), 17–25.MathSciNet

14.

Losada, J., & Nieto, J. J. (2015). Properties of the new fractional derivative without singular kernel. Progress in Fractional Differentiation and Applications, 1(2), 87–92.

15.

Tchuenche, J. M., Dube, N., Bhunu, C. P., Smith, R. J., & Bauch, C. T. (2011). The impact of media coverage on the transmission dynamics of human influenza. BMC Public Health, 11(Suppl 1), S5.CrossRef

16.

Khan, A. K., & Atangana, A. (2020). Modelling the dynamics of novel corona virus (2019-nCov) with fractional derivative. Alexandria Engineering Journal, 1–11.

17.

Lauer, S. A., Grantz, K. H., Bi, Q., Jones, F. K., Zheng, Q., Meredith, H. R., Azman, A. S., Reich, N. G., & Lessler, J. (2020). The Incubation Period of corona virus disease 2019 (COVID-19) from publicly reported confirmed cases: Estimation and application. Annals of Internal Medicine, 172, 9.

18.

Dokuyucu, M. A., Celik, E., Bulut, H., & Baskonus, H. M. (2018). Cancer treatment model with the Caputo-Fabrizio fractional derivative. European Physical Journal—Plus, 133, 92.CrossRef

19.

Caputo, M., & Fabrizio, M. (2015). A new definition of fractional derivative without singular kernel. Progress in Fractional Differentiation and Applications, 1(2), 73–85.

20.

Talaee, M., Shabibi, M., Gilani, A., & Rezapour, Sh. (2020). On the existence of solutions for a pointwise defined multi-singular integro-differential equation with integral boundary condition. Advances in Difference Equations, 2020, 41.

21.

Owolabi, K. M., & Atangana, A. (2019). Mathematical analysis and computational experiments for an epidemic system with nonlocal and nonsingular derivative. Chaos, Solitons & Fractals, 1(126), 41–49.

22.

Panchal, J., & Acharya, F. (2020). Mathematical Model on Impact of Quarantine to control the transmission of Corona Virus Disease 2019 (COVID-19). International Journal of Advanced Science and Technology, 29(7s), 4235–4244.

23.

Rothan HA, Byrareddy SN (2020). The epidemiology and pathogenesis of corona virus disease (COVID-19) outbreak. Journal of Autoimmunity. https://doi.org/10.1016/j.jaut.2020.102433

24.

Upadhyay, R. K., & Roy, P. (2014). Spread of a disease and its effect on population dynamics in an eco-epidemiological system. Communications in Nonlinear Science and Numerical Simulation, 19(12), 4170–4184.MathSciNetCrossRef

25.

Rezapour, S., Mohammadi, H., & Samei, M. E. (2020). SEIR epidemic model for COVID-19 transmission by Caputo derivative of fractional order. Advances in Difference Equations, 490.

26.

Samko, S. G., Kilbas A. A., & Marichev, O. I. (1993). Fractional integrals and derivatives: Theory and applications. CRC Press.

27.

Qureshi, S., & Memon, Z. N. (2020). Monotonically decreasing behavior of measles epidemic well captured by Atangana-Baleanu-Caputo fractional operator under real measles data of Pakistan. Chaos. Solitons and Fractals, 131, 109478.

28.

Rida, S. Z., Arafa, A. A. M., & Gaber, Y. A. (2016). Solution of the fractional epidemic model by L-ADM. Journal of Fractional Calculus and Applications, 7(1), 189–195.MathSciNet

29.

Tang, B., Wang, X., Li, Q., Bragazzi, N. L., Tang, S., Xiao, Y. et al. (2020). Estimation of the transmission risk of the 2019-nCoV and its implication for public health interventions. Journal of Clinical Medicine, 9(2), 462.CrossRef

30.

Tuan, N. H., Mohammadi, H., & Rezapour, S. (2020). A mathematical model for COVID-19 transmission by using the Caputo fractional derivative. Chaos. Solitons & Fractals, 140, 110107.

31.

Zhou, Y., Ma Z., and Brauer, F. (2004). A discrete epidemic model for SARS transmission and control in China. Mathematical and Computer Modelling, 40(13), 1491–1506.

32.

Zhao, Z., Zhu, Y. Z., Xu, J. W., Hu, Q. Q., Lei, Z., Rui, J., Liu, X., Wang, Y., Luo, L., Yu, S. S., & Li, J. (2020). A mathematical model for estimating the age-specific transmissibility of a novel corona virus; medRxiv.

33.

Zhong, L., Mu, L., Li, J., Wang, J., Yin, Z., & Liu, D. (2020). Early Prediction of the 2019 Novel corona virus Outbreak in the Mainland China based on simple mathematical model. IEEE Access, 51761–51769.

Title: A Fractional-Order SEQAIR Model to Control the Transmission of nCOVID 19
Authors: Jitendra Panchal
Falguni Acharya
Publisher: Springer Singapore
Book: Mathematical Analysis for Transmission of COVID-19
Print ISBN: 978-981-336-263-5

Electronic ISBN: 978-981-336-264-2

Copyright Year: 2021
DOI: https://doi.org/10.1007/978-981-33-6264-2_11

Springer Professional

Abstract

Please log in to get access to your license.

Dont have a licence yet? Then find out more about our products and how to get one now:

Springer Professional "Wirtschaft+Technik"

Springer Professional "Technik"

Premium Partners