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Theodore Kolokolnikov Person1 #679886 Killam Professor of Mathematics and Statistics in the Department of Mathematics and Statistics at Dalhousie University. | |
+Αναφορές (3) - ΑναφορέςΠροσθήκη αναφοράςList by: CiterankMapLink[2] Law of mass action and saturation in SIR model with application to Coronavirus modelling
Συγγραφέας: Theodore Kolokolnikov, David Iron Publication date: 10 December 2020 Publication info: Infectious Disease Modelling, Volume 6, 2021, Pages 91-97 Παρατέθηκε από: David Price 7:48 PM 24 November 2023 GMT Citerank: (3) 701037MfPH – Publications144B5ACA0, 701222OMNI – Publications144B5ACA0, 704045Covid-19859FDEF6 URL: DOI: https://doi.org/10.1016/j.idm.2020.11.002
| Απόσπασμα- [Infectious Disease Modelling, 10 December 2020]
When using SIR and related models, it is common to assume that the infection rate is proportional to the product of susceptible and infected individuals. While this assumption works at the onset of the outbreak, the infection force saturates as the outbreak progresses, even in the absence of any interventions. We use a simple agent–based model to illustrate this saturation effect. Its continuum limit leads a modified SIR model with exponential saturation. The derivation is based on first principles incorporating the spread radius and population density. We use the data for coronavirus outbreak for the period from March to June, to show that using SIR model with saturation is sufficient to capture the disease dynamics for many jurstictions, including the overall world-wide disease curve progression. Our model suggests the R0 value of above 8 at the onset of infection, but with infection quickly “flattening out”, leading to a long-term sustained sub-exponential spread. |
Link[3] Modelling of spatial infection spread through heterogeneous population: from lattice to partial differential equation models
Συγγραφέας: Arvin Vaziry, T. Kolokolnikov, P. G. Kevrekidis Publication date: 5 October 2022 Publication info: Royal Society Open Science, 9(10). Παρατέθηκε από: David Price 6:26 PM 4 December 2023 GMT Citerank: (3) 701037MfPH – Publications144B5ACA0, 7015472022/01/04 Theodore KolokolnikovModelling of disease spread through heterogeneous population63E883B6, 703960Spatio-temporal analysis859FDEF6 URL: DOI: https://doi.org/10.1098/rsos.220064
| Απόσπασμα- [Royal Society Open Science, 5 October 2022]
We present a simple model for the spread of an infection that incorporates spatial variability in population density. Starting from first-principle considerations, we explore how a novel partial differential equation with state-dependent diffusion can be obtained. This model exhibits higher infection rates in the areas of higher population density—a feature that we argue to be consistent with epidemiological observations. The model also exhibits an infection wave, the speed of which varies with population density. In addition, we demonstrate the possibility that an infection can ‘jump’ (i.e. tunnel) across areas of low population density towards areas of high population density. We briefly touch upon the data reported for coronavirus spread in the Canadian province of Nova Scotia as a case example with a number of qualitatively similar features as our model. Lastly, we propose a number of generalizations of the model towards future studies. |
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