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Modelling infectious diseases. Jean-Fran çois Boivin 25 October 2010. This decline prompted the U.S. Surgeon General to declare in 1967 that "the time has come to close the book on infectious diseases.".
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Modelling infectious diseases Jean-François Boivin 25 October 2010
This decline prompted the U.S. Surgeon General to declare in 1967 that "the time has come to close the book on infectious diseases."
Dear Sir: In your excellent Science paper (28 January 2000), you quote the US Surgeon General ('the time has come to close the book on infectious diseases'). You did not provide a reference for that quote, and I would like very much to know exactly where it comes from for a lecture I am preparing on infectious diseases. Can you help identify this reference? Thank you very much. Jean-François Boivin, MD, ScD Professor Faculty of Medicine McGill University Montreal Canada
I regret that Bob May has been over generous in its attribution. The only reference I have is that the statement was made in 1967 but I have no formal source. Best wishes. George Poste
Two objectives: • Understanding population dynamics of the transmission of infectious agents • Understanding potential impact of interventions
Chickenpox Epidemic spread due to children who do not appear to be sick
Day 10 14 days Parasite becomes infectious for mosquitoes Malaria (Plasmodium falciparum) early treatment may affect transmission
A public health nightmare: HIV days weeks median > 10 years
SiR model S R i 3 population densities (persons per mile2) X + Y + Z = N Reference: Chapter 6 in: Nelson et al. (2001)
Process begins here with 1 infectious subject Infectious subject enters in contact with susceptible and then the movement of subjects begins S i R Assumptions Direct transmission Life-long immunity (prototype: measles) Population is closed (no entry, no exit)
Nelson (2001) βXY = incidence of infection (modelling assumptions) γY = incidence of removals (cured, immune, dead) direct observations from clinical epidemiology
Oxford Textbook of Public Health. Volume 2. Second edition. 1991
Imagine susceptible and infectious individuals behaving as ideal gas particles within a closed system X = number of particles of one gas (susceptibles) Y = number of particles of a second gas (infectious people) β = collision coefficient for the formation of molecules of a new gas from one molecule each of the original gases (i.e. new cases of infection)
Gas particles (individuals) are mixing in a homogeneous manner such that collisions (contacts) occur at random. The law of mass action states that the net rate of production of new molecules (i.e. cases), I, is: I = βXY
The coefficient β is a measure of (i) the rate at which collisions (contacts) occur (ii) the probability that the repellent forces of the gas particles can be overcome to produce new molecules, or, in the case of infection, the likelihood that a contact between a susceptible and an infectious person results in the transmission of infection
X: number of black molecules Y: number of white molecules β: rate of collisions and probability that collision will lead to creation of a new molecule
Under these assumptions, the incidence of infection will be increased by larger numbers of infectious and susceptible persons and/or high probabilities (β) of transmission
Example 1 Area = 1 mile2 S = 8,699 persons i = 1 person R = 0 person • random movement • homogeneous distribution of subjects Area of movement = 0.001 mile2 per person per day Probability of infection per contact = 40% data? Average duration of a case = 2 days Incidence of recoveries = 0.5 case/day Initial rate of infection : (area of movement) (probability of infection) (i x S) = 0.001 mile2 x 0.4 x 1 person x 8,699 persons = 3.48 cases person·day mile2 mile2 day·mile2 Infection rate > recovery rate; infection will spread The initial case lasted 2 days, generating 3.48 x 2 = 6.96 secondary cases = basic reproductive rate
Example 2 Area = 1 mile2 S = 1,249 persons i = 1 person R = 0 person Area of movement = 0.001 mile2 per person per day Probability of infection per contact = 40% Average duration of a case = 2 days Incidence of recoveries = 0.5 case/day Initial rate of infection : (area of movement) (probability of infection) (i x S) = 0.001 mile2 x 0.4 x 1 person x 1,249 persons = 0.5 cases person·day mile2 mile2 day·mile2 Infection rate = recovery rate Infection will not spread The initial case lasted 2 days, generating 0.5 x 2 = 1 secondary case
Basic reproduction ratio = basic reproductive rate (R of R0) = the number of secondary cases generated from a single infective case introduced into a susceptible population = (initial infection rate) x (duration of infection) or : Rate of infection Rate of recovery
Although the population biology of measles depends on many factors,such as seasonality of transmission and the social, spatial,and age structure of the population, the fate of an epidemiccan be predicted by a single parameter: the reproductive numberR, defined as the mean number of secondary infections per infection
If the reproductive number is smaller than one, the diseasewill not persist but will manifest itself in outbreaks of varyingsize triggered by importations of the disease.
If the reproductivenumber approaches one, large outbreaks become increasingly likely,and, if it exceeds one, the disease can become endemic.
If thereproductive number equals one, the situation is said to beat criticality.
A decline in vaccine uptake will lead to increasinglylarge outbreaks of measles and, finally, the reappearance ofmeasles as an endemic disease.
The effect of mass immunization is to reduce the basic reproduction ratio ... Defining R’ to be the basic reproduction ratio after immunization and v to be the proportion vaccinated and effectively immunized, R’ = R(1 – v) (Nelson 2001, page 161)
Nelson KE, William CM, Graham NMH. Infectious disease epidemiology. Theory and practice. Aspen Publishers. Gaithersburg, Maryland. 2001
