Data sources and collection

Data on the total population of Hong Kong in 2003 was obtained from statistics of the Census and Statistic Department, The Government of the Hong Kong Special Administrative Region (http://www.censtatd.gov.hk/home/). Data on cumulative cases, deaths and recoveries during the SARS epidemics in Hong Kong was obtained from Global Alert and Response databases of the WHO (http://www.who.int/csr/sars/country/en/index.html).

Modelling

The model was developed following the four-step sequence proposed by system dynamics methodology [Reference Sterman16]. First, the real data from the Hong Kong SARS epidemics (Fig. 1) together with other evidences and our professional experience were used to create a mental modelling of the reality of the outbreak. Second, the model structure that is able to explain the evolution of the epidemics was represented as a Forrester diagram (Fig. 2). Third, the outbreak was mathematically modelled as a continuous dynamic process represented by a set of differential and algebraic equations (Tables 1–3). Finally, the model was optimized to fit the real data from Figure 1.

Fig. 1.

Real data from the Hong Kong SARS outbreak. (a) Daily reported new cases, deaths, and recovered. (b) Cumulative cases, dead, and recovered.

Fig. 2.

Graphical description of the model using Vensim software. Stock variables are represented inside boxes; flow variables are designed as arrows with a valve; the rest of the variables are auxiliary (inside circles) or parameters (in bold); single lines with arrow are used as connectors to specify that the destination variable is affected by the variable of origin.

Table 1.

Differential equations for the five model stocks

* Hong Kong's population in 2003 was about 6·5 million people who were susceptible to infection with the SARS virus.

† It is considered that the Hong Kong outbreak originated from an infected person from the province of Guangdong [13].

Table 2.

Algebraic equations for the four model flows

Table 3.

Algebraic equations for the eight model auxiliary variables

A dynamic compartmental model provides a framework for the study of transport between different compartments of a system, i.e. well known epidemiological compartmental models [Reference Anderson and May20]. To explain how the protective measures taken by the government of Hong Kong allowed the rapid control of the epidemic we consider a dynamic model with five compartments (states) and four transitions (physical flows) between them. This model is based on two assumptions. First, the individuals are classified into five subgroups (susceptible, latent, infected, recovered, dead). Although, the last subgroup is not strictly needed, it is used to keep an account of those dead. Second, every day there is a different number of people: who are infected without symptoms of the disease (incidence); who develop signs and symptoms of the illness (sick per day); who recover from the disease (daily recovered), and who die (daily deaths) as consequence of the outbreak.

The model structure built with Vensim software (Ventana Systems Inc., USA) (Fig. 2) contains the five states and the four flows mentioned above and also eight auxiliary variables (inside circles) and six parameters (in bold). These elements are linked by the physical flows (double line with arrow) and by the information transmissions (single line with arrow) according to the mathematical model represented by the set of differential and algebraic equations (Tables 1–3).

The five differential equations in Table 1 establish the mass balance (inflows minus outflows) in the compartments, and as such, they describe the changes in the number of people (stocks) in the five subgroups. The four algebraic equations of Table 2 express that the physical transitions depend directly from the stock in the compartment of origin and indirectly from other stocks and parameters through the corresponding auxiliary variables. These equations involve three stocks (susceptible, latent, infected), three auxiliary variables (prevalence, contagion rate, recovery rate) and three parameters (incubation period, case fatality, disease duration). For instance, the incidence flow is proportional to the number of susceptible people, the prevalence and the contagion rate. The contagion rate or transmission coefficient theoretically depends on the number of contacts per unit time and the probability of effective contact, i.e. the probability that a contact between an infectious source and susceptible host results in a successful transfer whereby the susceptible host becomes infected.

The first three algebraic equations of Table 3 express the auxiliary variables (prevalence, contagion rate, recovery rate) used in the equations of Table 2. In turn, these depend on other auxiliary variables, stocks and parameters. For instance, prevalence is defined as the ratio between number of infected people and the total population [Table 3, equation (1)]. The recovery rate depends on the illness duration and case fatality [Table 3, equation (2)]. Equation (3) in Table 3 expresses the contagion rate which is directly dependent on the auxiliary variable ‘frequency of contacts’ and the parameter ‘infectivity’.

One of the key variables in the model is frequency of contacts because it tries to reproduce the control measures carried out by the Hong Kong Government to control the SARS outbreak. We assumed that: (1) the control measures gave, as consequence, a marked reduction of daily contacts in Hong Kong; (2) the control measures were based on the cumulative attack rate, measured as the ratio between cumulative cases and total population [Table 3, equation (6)]. Therefore, we decided to use the frequency of contacts as the daily contacts modulated by the repression Hill function (Fig. 3), in accordance with the equation (7) of Table 3. Despite the complexity level of biological systems several cases have been modelled using the Hill function, in order to simulate repressor activities of enzymatic reactions and the regulation mechanisms of several transcription factors [Reference Omony21]. In our model this repressor function allows the establishment of the relationship between frequency of contacts and the cumulative attack rate. Note that the cumulative attack rate is used as an active repressor, so half-maximal repression occurs when the cumulative attack rate is equal to the threshold, and almost total repression occurs when this cumulative attack rate is double the threshold.

Fig. 3.

Normalized representation of repression Hill function. The solid line corresponds to a value of n = 3 [as used in equation (7) of Table 3]. The dotted line corresponds to the threshold repression function (when n tends to infinity). The representation is normalized to the threshold of cumulative attack rate on the abscissa axis and the value of the discontinuity (daily contacts) on the ordinate axis.

Equation (8) in Table 3 is used to report on the basic reproductive number (R ₀), which is defined as the expected number of secondary infectious cases generated by an average infectious case in an entirely susceptible population [Reference Anderson and May20]. In our model this number is calculated as the ratio between the contagion rate and the recovery rate. If R ₀ < 1, then the infected individuals in the total population fail to replace themselves, and the disease does not spread. However, if R ₀ > 1, the number of cases generally increases over time and the disease spreads.

Parameterization

One of the most challenging issues in system dynamics modelling is to establish the value of the model parameters. The parameters can be estimated taking advantage of the known information available in the literature and can be optimized by means of an iterative process of simulation. Using this approach, we set values for the six parameters of our model which are summarized in Table 4.

Table 4.

Values for the six model parameters

Infectivity expresses the ability of the pathogen to penetrate, survive and multiply in the host and it is measured through the secondary attack rate which is defined as the probability that infection occurs in susceptible persons within a reasonable incubation period following known contact with an infectious person or an infectious source. Epidemiological studies in Singapore showed that 80% of individuals infected with SARS-CoV did not cause secondary infections, suggesting low infectivity [22]. After the optimization process, the final value set for infectivity was 0·022, which is in agreement with a previous work examining the probability of transmission for SARS-CoV [Reference Pitzer, Leung and Lipsitch23].

The incubation period of the disease, during which time the individual is asymptomatic appears to be between 2 and 10 days with an average value of 5·3 days [Reference McBryde24]. Similarly, although the duration of the disease is variable depending on the case, the average of the most severe and the mildest cases is 26 days [Reference McBryde24]. During this time period the virus can be transmitted to other people.

Several studies have shown that the case fatality of SARS-CoV was also variable in the 2003 outbreak depending on different factors. It has been estimated that the mean case fatality for SARS in Hong Kong was around 0·17 [Reference Hirose25].

Social contact patterns have been shown to be highly relevant on the transmission dynamics of respiratory infections such as measles, rubella and influenza [Reference Fine and Clarkson26–Reference Anderson and May28]. Quantifying this parameter is critical for estimating the impact of such infections, for designing and targeting preventive interventions, and for modelling their impact. In our model the daily contacts parameter, indicating the mean number of contacts of a person in 1 day, was set to 16·8 after the optimization process, which is in agreement with previous studies quantifying these social mixing patterns [Reference Edmunds, O'Callaghan and Nokes29, Reference Mossong30].

The parameter ‘threshold of cumulative attack rate’ is critical in our model since it allows setting the value of the cumulative attack rate at which control measures were established by the Hong Kong authorities. This parameter was finally set at 7·8 × 10⁻⁵. Therefore, according to the Hill function of Figure 3, for any number of the cumulative attack rate below the 78 cases by million, the frequency of contacts will be greater than 8·4 (half of the daily contacts), and in the opposite case the frequency of contacts will be markedly reduced.

As explained before, our dynamic model was subjected to successive rounds of simulation and optimization in order to fine-tune the parameters of the model. In all these simulations we assumed that the Hong Kong epidemic originated from a traveller from Guangdong in China [13], and at the beginning of the outbreak the entire population of Hong Kong was susceptible to SARS-CoV infection. These assumptions are represented by the initial values in the five stocks (Table 1). Moreover, based on the reported data, the simulation period was set to 146 days with a time step of 1 day.

Sensitivity analysis

Parameters of system dynamics models are subject to uncertainty. Sensitivity analyses were conducted to provide insight into how uncertainty in the parameters affects the model outputs and which parameters tend to drive these variations. In this task it is essential to define the probabilistic distribution patterns of the model parameters, which are shown in Table 5, together with the references that support these patterns.

Table 5.

Probabilistic distribution patterns of the model parameters

* The distribution values for normal distributions are mean and standard deviation, whereas for gamma distributions they are order/shift/stretch.

The most influential parameters were estimated by univariate analyses, in which changes in the model output were studied after disturbance in each parameter value independently. In complex models, univariate sensitivity analysis can be insufficient for a comprehensive study of the model. Simultaneous fluctuations in the value of more than one parameter may create an unexpected output change due to nonlinear relationships in different model components. Thus, to test the influence of simultaneous changes in the model parameters, the univariate analyses were followed by Monte-Carlo multivariate sensitivity analysis, in which the values of the six parameters were altered at the same time.

Software

Modelling process, simulations and sensitivity analyses were performed using Vensim DSS software v. 5.7a (Ventana Systems).