| Literature DB >> 29249910 |
Zhilan Feng1, Qing Han1, Zhipeng Qiu2, Andrew N Hill3, John W Glasser4.
Abstract
For infectious diseases such as pertussis, susceptibility is determined by immunity, which is chronological age-dependent. We consider an age-structured epidemiological model that accounts for both passively acquired maternal antibodies that decay and active immunity that wanes, permitting reinfection. The model is a 6-dimensional system of partial differential equations (PDE). By assuming constant rates within each age-group, the PDE system can be reduced to an ordinary differential equation (ODE) system with aging from one age-group to the next. We derive formulae for the effective reproduction number ℛ and provide their biological interpretation in some special cases. We show that the disease-free equilibrium is stable when ℛ < 1 and unstable if ℛ > 1.Entities:
Keywords: Age-structured epidemiological model; multiple infections; partial immunity; reproduction numbers
Year: 2015 PMID: 29249910 PMCID: PMC5730097 DOI: 10.3934/dcdsb.2016.21.399
Source DB: PubMed Journal: Discrete Continuous Dyn Syst Ser B ISSN: 1531-3492 Impact factor: 1.327