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估计传染病模型中随时间变化的再生数的序贯蒙特卡洛方法:以新冠肺炎为例

A sequential Monte Carlo approach to estimate a time-varying reproduction number in infectious disease models: the Covid-19 case

Journal of the Royal Statistical Society. Series A: Statistics in Society · 2023
被引 25 · 同刊同年前 3%
ABS 3

中文导读

提出一种序贯蒙特卡洛方法,基于每日住院和阳性检测数据,估计挪威新冠肺炎疫情期间每日变化的再生数,为实时监测和管理疫情提供工具。

Abstract

Abstract The Covid-19 pandemic has required most countries to implement complex sequences of non-pharmaceutical interventions, with the aim of controlling the transmission of the virus in the population. To be able to take rapid decisions, a detailed understanding of the current situation is necessary. Estimates of time-varying, instantaneous reproduction numbers represent a way to quantify the viral transmission in real time. They are often defined through a mathematical compartmental model of the epidemic, like a stochastic SEIR model, whose parameters must be estimated from multiple time series of epidemiological data. Because of very high dimensional parameter spaces (partly due to the stochasticity in the spread models) and incomplete and delayed data, inference is very challenging. We propose a state-space formalization of the model and a sequential Monte Carlo approach which allow to estimate a daily-varying reproduction number for the Covid-19 epidemic in Norway with sufficient precision, on the basis of daily hospitalization and positive test incidences. The method was in regular use in Norway during the pandemics and appears to be a powerful instrument for epidemic monitoring and management.

传染病建模贝叶斯推断蒙特卡洛方法新冠肺炎流行病监测