期刊论文详细信息
JOURNAL OF THEORETICAL BIOLOGY 卷:271
Outbreak properties of epidemic models: The roles of temporal forcing and stochasticity on pathogen invasion dynamics
Article
Parham, Paul E.1 
[1] Univ London Imperial Coll Sci Technol & Med, Grantham Inst Climate Change, Dept Infect Dis Epidemiol, London W2 1PG, England
关键词: Master equations;    Temporal variability;    Infectious disease modelling;    Invasion;   
DOI  :  10.1016/j.jtbi.2010.11.015
来源: Elsevier
PDF
【 摘 要 】

Despite temporally forced transmission driving many infectious diseases, analytical insight into its role when combined with stochastic disease processes and non-linear transmission has received little attention. During disease outbreaks, however, the absence of saturation effects early on in well-mixed populations mean that epidemic models may be linearised and we can calculate outbreak properties, including the effects of temporal forcing on fade-out, disease emergence and system dynamics, via analysis of the associated master equations. The approach is illustrated for the unforced and forced SIR and SEIR epidemic models. We demonstrate that in unforced models, initial conditions (and any uncertainty therein) play a stronger role in driving outbreak properties than the basic reproduction number R-0, while the same properties are highly sensitive to small amplitude temporal forcing, particularly when R-0 is small. Although illustrated for the SIR and SEIR models, the master equation framework may be applied to more realistic models, although analytical intractability scales rapidly with increasing system dimensionality. One application of these methods is obtaining a better understanding of the rate at which vector-borne and waterborne infectious diseases invade new regions given variability in environmental drivers, a particularly important question when addressing potential shifts in the global distribution and intensity of infectious diseases under climate change. (C) 2010 Elsevier Ltd. All rights reserved.

【 授权许可】

Free   

【 预 览 】
附件列表
Files Size Format View
10_1016_j_jtbi_2010_11_015.pdf 1716KB PDF download
  文献评价指标  
  下载次数:0次 浏览次数:0次