Litcius/Paper detail

Analysis of a Model for Coronavirus Spread

Youcef Belgaid, Mohamed Helal, Ezio Venturino

2020Mathematics15 citationsDOIOpen Access PDF

Abstract

The spread of epidemics has always threatened humanity. In the present circumstance of the Coronavirus pandemic, a mathematical model is considered. It is formulated via a compartmental dynamical system. Its equilibria are investigated for local stability. Global stability is established for the disease-free point. The allowed steady states are an unlikely symptomatic-infected-free point, which must still be considered endemic due to the presence of asymptomatic individuals; and the disease-free and the full endemic equilibria. A transcritical bifurcation is shown to exist among them, preventing bistability. The disease basic reproduction number is calculated. Simulations show that contact restrictive measures are able to delay the epidemic’s outbreak, if taken at a very early stage. However, if lifted too early, they could become ineffective. In particular, an intermittent lock-down policy could be implemented, with the advantage of spreading the epidemics over a longer timespan, thereby reducing the sudden burden on hospitals.

Topics & Concepts

Basic reproduction numberOutbreakCoronavirus disease 2019 (COVID-19)PandemicBistabilityEpidemic modelBifurcationMathematical economicsDiseaseDemographyEconomicsBiologyMedicineVirologyPhysicsInfectious disease (medical specialty)Nonlinear systemEnvironmental healthPopulationSociologyQuantum mechanicsPathologyCOVID-19 epidemiological studiesMathematical and Theoretical Epidemiology and Ecology ModelsEvolution and Genetic Dynamics