Litcius/Paper detail

Emergence of oscillations in a simple epidemic model with demographic data

Meredith Greer, Raj Saha, Alex Gogliettino, Chialin Yu, Kyle Zollo‐Venecek

2020Royal Society Open Science31 citationsDOIOpen Access PDF

Abstract

A simple susceptible-infectious-removed epidemic model for smallpox, with birth and death rates based on historical data, produces oscillatory dynamics with remarkably accurate periodicity. Stochastic population data cause oscillations to be sustained rather than damped, and data analysis regarding the oscillations provides insights into the same set of population data. Notably, oscillations arise naturally from the model, instead of from a periodic forcing term or other exogenous mechanism that guarantees oscillation: the model has no such mechanism. These emergent natural oscillations display appropriate periodicity for smallpox, even when the model is applied to different locations and populations. The model and datasets, in turn, offer new observations about disease dynamics and solution trajectories. These results call for renewed attention to relatively simple models, in combination with datasets from real outbreaks.

Topics & Concepts

SmallpoxEpidemic modelSimple (philosophy)PopulationOscillation (cell signaling)Mechanism (biology)Population modelBirth–death processComputer scienceForcing (mathematics)Statistical physicsEconometricsMathematicsPhysicsBiologyVirologyDemographyGeneticsQuantum mechanicsEpistemologyMathematical analysisSociologyVaccinationPhilosophyMathematical and Theoretical Epidemiology and Ecology ModelsCOVID-19 epidemiological studiesEvolution and Genetic Dynamics