Compartmental models in epidemiology

Compartmental models are a very general modelling technique. They are often applied to the mathematical modelling of infectious diseases. The population is assigned to compartments with labels – for example, S, I, or R, (Susceptible, Infectious, or Recovered). People may progress between compartments. The order of the labels usually shows the flow patterns between the compartments; for example SEIS means susceptible, exposed, infectious, then susceptible again.

The origin of such models is the early 20th century, with important works being that of Ross[1] in 1916, Ross and Hudson in 1917,[2][3] Kermack and McKendrick in 1927,[4] and Kendall in 1956.[5] The Reed–Frost model was also a significant and widely overlooked ancestor of modern epidemiological modelling approaches.[6]

The models are most often run with ordinary differential equations (which are deterministic), but can also be used with a stochastic (random) framework, which is more realistic but much more complicated to analyze.

These models are used to analyze the disease dynamics and to estimate the total number of infected people, the total number of recovered people, and to estimate epidemiological parameters such as the basic reproduction number or effective reproduction number. Such models can show how different public health interventions may affect the outcome of the epidemic.

  1. ^ Ross R (1 February 1916). "An application of the theory of probabilities to the study of a priori pathometry.—Part I". Proceedings of the Royal Society of London. Series A, Containing Papers of a Mathematical and Physical Character. 92 (638): 204–230. Bibcode:1916RSPSA..92..204R. doi:10.1098/rspa.1916.0007.
  2. ^ Ross R, Hudson H (3 May 1917). "An application of the theory of probabilities to the study of a priori pathometry.—Part II". Proceedings of the Royal Society of London. Series A, Containing Papers of a Mathematical and Physical Character. 93 (650): 212–225. Bibcode:1917RSPSA..93..212R. doi:10.1098/rspa.1917.0014.
  3. ^ Ross R, Hudson H (1917). "An application of the theory of probabilities to the study of a priori pathometry.—Part III". Proceedings of the Royal Society of London. Series A, Containing Papers of a Mathematical and Physical Character. 89 (621): 225–240. Bibcode:1917RSPSA..93..225R. doi:10.1098/rspa.1917.0015.
  4. ^ Kermack WO, McKendrick AG (1927). "A Contribution to the Mathematical Theory of Epidemics". Proceedings of the Royal Society of London. Series A, Containing Papers of a Mathematical and Physical Character. 115 (772): 700–721. Bibcode:1927RSPSA.115..700K. doi:10.1098/rspa.1927.0118.
  5. ^ Kendall DG (1956). "Deterministic and Stochastic Epidemics in Closed Populations". Contributions to Biology and Problems of Health. Vol. 4. University of California Press. pp. 149–165. doi:10.1525/9780520350717-011. ISBN 978-0-520-35071-7. MR 0084936. Zbl 0070.15101.
  6. ^ Engelmann, Lukas (2021-08-30). "A box, a trough and marbles: How the Reed-Frost epidemic theory shaped epidemiological reasoning in the 20th century". History and Philosophy of the Life Sciences. 43 (3): 105. doi:10.1007/s40656-021-00445-z. ISSN 1742-6316. PMC 8404547. PMID 34462807.