Accurate numerical treatment on a stochastic SIR epidemic model with optimal control strategy
In this paper, a numerical study has been undertaken on the susceptible-infectedrecovered (SIR) epidemic model that encompasses the mechanisms of the evolution of disease transmission; a prophylactic vaccination strategy in the susceptible populations, depending on the infective individuals. We f...
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my.iium.irep.987282022-07-08T01:13:04Z http://irep.iium.edu.my/98728/ Accurate numerical treatment on a stochastic SIR epidemic model with optimal control strategy Ghosh, Indranil Rashid, Muhammad Mahbubur Ghosh, Pallabi Mawa, Shukranul Roy, Rupal Ahsan, Md Manjurul Gupta, Kishor Datta QA297 Numerical Analysis In this paper, a numerical study has been undertaken on the susceptible-infectedrecovered (SIR) epidemic model that encompasses the mechanisms of the evolution of disease transmission; a prophylactic vaccination strategy in the susceptible populations, depending on the infective individuals. We furnish numerical and graphical simulation combined with explicit series solutions of the proposed model using the New Iterative Method (NIM) and Modified New Iterative Method (MNIM). The analytic-numeric New Iterative Method failed to deliver accurate solution for the large time domain. A new reliable algorithm based on NIM, the coupling of the Laplace transforms, and the New Iterative method is called Modified New Iterative Method (MNIM) which is presented to enhance the validity domain of NIM techniques. The convergence analysis of the MNIM has also been illustrated. The simulation results show that the vaccination strategy can slow down the spread of the epidemic rapidly. Numerical results illustrate the excellent performance of the MNIM and show that the modified method is much more accurate than the NIM. 2022 Article PeerReviewed application/pdf en http://irep.iium.edu.my/98728/7/98728_Accurate%20numerical%20treatment.pdf Ghosh, Indranil and Rashid, Muhammad Mahbubur and Ghosh, Pallabi and Mawa, Shukranul and Roy, Rupal and Ahsan, Md Manjurul and Gupta, Kishor Datta (2022) Accurate numerical treatment on a stochastic SIR epidemic model with optimal control strategy. technologies, 10 (4). pp. 1-20. ISSN 2227-7080 https://www.mdpi.com/2227-7080/10/4/82 |
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QA297 Numerical Analysis |
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QA297 Numerical Analysis Ghosh, Indranil Rashid, Muhammad Mahbubur Ghosh, Pallabi Mawa, Shukranul Roy, Rupal Ahsan, Md Manjurul Gupta, Kishor Datta Accurate numerical treatment on a stochastic SIR epidemic model with optimal control strategy |
| description |
In this paper, a numerical study has been undertaken on the susceptible-infectedrecovered
(SIR) epidemic model that encompasses the mechanisms of the evolution of disease
transmission; a prophylactic vaccination strategy in the susceptible populations, depending on the
infective individuals. We furnish numerical and graphical simulation combined with explicit series
solutions of the proposed model using the New Iterative Method (NIM) and Modified New Iterative
Method (MNIM). The analytic-numeric New Iterative Method failed to deliver accurate solution for
the large time domain. A new reliable algorithm based on NIM, the coupling of the Laplace
transforms, and the New Iterative method is called Modified New Iterative Method (MNIM) which
is presented to enhance the validity domain of NIM techniques. The convergence analysis of the
MNIM has also been illustrated. The simulation results show that the vaccination strategy can slow
down the spread of the epidemic rapidly. Numerical results illustrate the excellent performance of
the MNIM and show that the modified method is much more accurate than the NIM. |
| format |
Article |
| author |
Ghosh, Indranil Rashid, Muhammad Mahbubur Ghosh, Pallabi Mawa, Shukranul Roy, Rupal Ahsan, Md Manjurul Gupta, Kishor Datta |
| author_facet |
Ghosh, Indranil Rashid, Muhammad Mahbubur Ghosh, Pallabi Mawa, Shukranul Roy, Rupal Ahsan, Md Manjurul Gupta, Kishor Datta |
| author_sort |
Ghosh, Indranil |
| title |
Accurate numerical treatment on a stochastic SIR epidemic
model with optimal control strategy |
| title_short |
Accurate numerical treatment on a stochastic SIR epidemic
model with optimal control strategy |
| title_full |
Accurate numerical treatment on a stochastic SIR epidemic
model with optimal control strategy |
| title_fullStr |
Accurate numerical treatment on a stochastic SIR epidemic
model with optimal control strategy |
| title_full_unstemmed |
Accurate numerical treatment on a stochastic SIR epidemic
model with optimal control strategy |
| title_sort |
accurate numerical treatment on a stochastic sir epidemic
model with optimal control strategy |
| publishDate |
2022 |
| url |
http://irep.iium.edu.my/98728/7/98728_Accurate%20numerical%20treatment.pdf http://irep.iium.edu.my/98728/ https://www.mdpi.com/2227-7080/10/4/82 |
| _version_ |
1738510131632537600 |
| score |
13.2014675 |