论文信息 - Approximate disease dynamics in household-structured populations

Approximate disease dynamics in household-structured populations

We argue that the large-dimensional dynamical systems which frequently occur in biological models can sometimes be effectively reduced to much smaller ones. We illustrate this by applying projection operator techniques to a mean-field model of an infectious disease spreading through a population of households. In this way, we are able to accurately approximate the dynamics of the system in terms of a few key quantities greatly reducing the number of equations required. We investigate linear stability in this framework and find a new way of calculating the familiar threshold criterion for household systems.

N M Ferguson | N. Ferguson | P. Dodd | P J Dodd

[1] Alexander Grey,et al. The Mathematical Theory of Infectious Diseases and Its Applications , 1977 .

[2] C. Lubich. Runge-Kutta theory for Volterra integrodifferential equations , 1982 .

[3] N. Ling. The Mathematical Theory of Infectious Diseases and its applications , 1978 .

[4] H. Grabert,et al. Projection Operator Techniques in Nonequilibrium Statistical Mechanics , 1982 .

[5] C. Viboud,et al. A Bayesian MCMC approach to study transmission of influenza: application to household longitudinal data , 2004, Statistics in medicine.

[6] From reversible quantum microdynamics to irreversible quantum transport , 1995, nucl-th/9505009.

[7] Frank Ball,et al. Control of transmission with two types of infection. , 2006, Mathematical biosciences.

[8] A. Stuart,et al. Extracting macroscopic dynamics: model problems and algorithms , 2004 .

[9] Tom Britton,et al. Estimating Vaccine Effects on Transmission of Infection from Household Outbreak Data , 2003, Biometrics.

[10] F. Ball,et al. Epidemics with two levels of mixing , 1997 .