Litcius/Paper detail

Fast estimation of time-varying infectious disease transmission rates

Mikael Jagan, Michelle S. deJonge, Olga Krylova, David J. D. Earn

2020PLoS Computational Biology29 citationsDOIOpen Access PDF

Abstract

Compartmental epidemic models have been used extensively to study the historical spread of infectious diseases and to inform strategies for future control. A critical parameter of any such model is the transmission rate. Temporal variation in the transmission rate has a profound influence on disease spread. For this reason, estimation of time-varying transmission rates is an important step in identifying mechanisms that underlie patterns in observed disease incidence and mortality. Here, we present and test fast methods for reconstructing transmission rates from time series of reported incidence. Using simulated data, we quantify the sensitivity of these methods to parameters of the data-generating process and to mis-specification of input parameters by the user. We show that sensitivity to the user's estimate of the initial number of susceptible individuals-considered to be a major limitation of similar methods-can be eliminated by an efficient, "peak-to-peak" iterative technique, which we propose. The method of transmission rate estimation that we advocate is extremely fast, for even the longest infectious disease time series that exist. It can be used independently or as a fast way to obtain better starting conditions for computationally expensive methods, such as iterated filtering and generalized profiling.

Topics & Concepts

Iterated functionTransmission (telecommunications)Computer scienceTransmission rateEstimationStatisticsInfectious disease (medical specialty)Estimation theoryEpidemic modelTime seriesAlgorithmDiseaseMathematicsMedicinePopulationPathologyTelecommunicationsEnvironmental healthMathematical analysisEconomicsManagementCOVID-19 epidemiological studiesData-Driven Disease SurveillanceMathematical and Theoretical Epidemiology and Ecology Models