Geodesic
Accounting for Symptomatic and Asymptomatic in a SEIR-type model of COVID-19
Jayrold P. Arcede1 ; Randy L. Caga-anan2 ; Cheryl Q. Mentuda13 ; Youcef Mammeri3
1 Department of Mathematics, Caraga State University, Butuan City, Philippines.
2 Department of Mathematics and Statistics, MSU-Iligan Institute of Technology, Iligan City, Philippines.
3 Laboratoire Amiénois de Mathématique Fondamentale et Appliquée, CNRS UMR 7352, Université de Picardie Jules Verne, 80069 Amiens, France.
Mathematical modelling of natural phenomena, Tome 15 (2020), article no. 34.

Voir la notice de l'article provenant de la source EDP Sciences

A mathematical model was developed describing the dynamic of the COVID-19 virus over a population considering that the infected can either be symptomatic or not. The model was calibrated using data on the confirmed cases and death from several countries like France, Philippines, Italy, Spain, United Kingdom, China, and the USA. First, we derived the basic reproduction number, , and estimated the effective reproduction for each country. Second, we were interested in the merits of interventions, either by distancing or by treatment. Results revealed that total and partial containment is effective in reducing the transmission. However, its duration may be long to eradicate the disease (104 days for France). By setting the end of containment as the day when hospital capacity is reached, numerical simulations showed that the duration can be reduced (up to only 39 days for France if the capacity is 1000 patients). Further, results pointed out that the effective reproduction number remains large after containment. Therefore, testing and isolation are necessary to stop the disease.
DOI : 10.1051/mmnp/2020021

Jayrold P. Arcede 1 ; Randy L. Caga-anan 2 ; Cheryl Q. Mentuda 1, 3 ; Youcef Mammeri 3

1 Department of Mathematics, Caraga State University, Butuan City, Philippines.
2 Department of Mathematics and Statistics, MSU-Iligan Institute of Technology, Iligan City, Philippines.
3 Laboratoire Amiénois de Mathématique Fondamentale et Appliquée, CNRS UMR 7352, Université de Picardie Jules Verne, 80069 Amiens, France. 
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     title = {Accounting for {Symptomatic} and {Asymptomatic} in a {SEIR-type} model of {COVID-19}},
     journal = {Mathematical modelling of natural phenomena},
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Jayrold P. Arcede; Randy L. Caga-anan; Cheryl Q. Mentuda; Youcef Mammeri. Accounting for Symptomatic and Asymptomatic in a SEIR-type model of COVID-19. Mathematical modelling of natural phenomena, Tome 15 (2020), article  no. 34. doi : 10.1051/mmnp/2020021. https://geodesic-test.mathdoc.fr/articles/10.1051/mmnp/2020021/

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