English

Pair Approximation Models for Disease Spread

Populations and Evolution 2013-06-04 v5

Abstract

We consider a Susceptible-Infective-Recovered (SIR) model, where the mechanism for the renewal of susceptibles is demographic, on a ring with next nearest neighbour interactions, and a family of correlated pair approximations (CPA), parametrized by a measure of the relative contributions of loops and open triplets of the sites involved in the infection process. We have found that the phase diagram of the CPA, at fixed coordination number, changes qualitatively as the relative weight of the loops increases, from the phase diagram of the uncorrelated pair approximation to phase diagrams typical of one-dimensional systems. In addition, we have performed computer simulations of the same model and shown that while the CPA with a constant correlation parameter cannot describe the global behaviour of the model, a reasonable description of the endemic equilibria as well as of the phase diagram may be obtained by allowing the parameter to depend on the demographic rate.

Keywords

Cite

@article{arxiv.q-bio/0510005,
  title  = {Pair Approximation Models for Disease Spread},
  author = {Jerome Benoit and Ana Nunes and Margarida Telo da Gama},
  journal= {arXiv preprint arXiv:q-bio/0510005},
  year   = {2013}
}

Comments

6 pages, 3 figures, LaTeX2e+SVJour+AmSLaTeX, NEXTSigmaPhi 2005; metadata title corrected wrt paper title