The dynamics of entropy in the COVID-19 outbreaks
Autor: | Arnaud Mignan, Marco Broccardo, Didier Sornette, Ziqi Wang |
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Rok vydání: | 2020 |
Předmět: |
0301 basic medicine
Physics - Physics and Society Computer science Bayesian probability Bayesian analysis Markov process FOS: Physical sciences Aerospace Engineering Ocean Engineering Physics and Society (physics.soc-ph) Quantitative Biology - Quantitative Methods Quantitative Biology::Other 03 medical and health sciences symbols.namesake 0302 clinical medicine COVID-19 Nonlinear Markov process Stochastic process Uncertainty quantification Quantitative Biology::Populations and Evolution 030212 general & internal medicine Statistical physics Electrical and Electronic Engineering Quantitative Biology - Populations and Evolution Central element Entropy rate Quantitative Methods (q-bio.QM) Original Paper Applied Mathematics Mechanical Engineering Populations and Evolution (q-bio.PE) 030104 developmental biology Control and Systems Engineering FOS: Biological sciences symbols Probability distribution Epidemic model |
Zdroj: | Nonlinear Dynamics Nonlinear Dynamics, 101 (3) |
ISSN: | 0924-090X 1573-269X |
Popis: | With the unfolding of the COVID-19 pandemic, mathematical modelling of epidemics has been perceived and used as a central element in understanding, predicting, and governing the pandemic event. However, soon it became clear that long-term predictions were extremely challenging to address. In addition, it is still unclear which metric shall be used for a global description of the evolution of the outbreaks. Yet a robust modelling of pandemic dynamics and a consistent choice of the transmission metric is crucial for an in-depth understanding of the macroscopic phenomenology and better-informed mitigation strategies. In this study, we propose a Markovian stochastic framework designed for describing the evolution of entropy during the COVID-19 pandemic together with the instantaneous reproductive ratio. Then, we introduce and use entropy-based metrics of global transmission to measure the impact and the temporal evolution of a pandemic event. In the formulation of the model, the temporal evolution of the outbreak is modelled by an equation governing the probability distribution that describes a nonlinear Markov process of a statistically averaged individual, leading to a clear physical interpretation. The time-dependent parameters are formulated by adaptive basis functions, leading to a parsimonious representation. In addition, we provide a full Bayesian inversion scheme for calibration together with a coherent strategy to address data unreliability. The time evolution of the entropy rate, the absolute change in the system entropy, and the instantaneous reproductive ratio are natural and transparent outputs of this framework. The framework has the appealing property of being applicable to any compartmental epidemic model. As an illustration, we apply the proposed approach to a simple modification of the susceptible–exposed–infected–removed model. Applying the model to the Hubei region, South Korean, Italian, Spanish, German, and French COVID-19 datasets, we discover significant difference in the absolute change of entropy but highly regular trends for both the entropy evolution and the instantaneous reproductive ratio. Nonlinear Dynamics, 101 (3) ISSN:0924-090X ISSN:1573-269X |
Databáze: | OpenAIRE |
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