The predictive model

The model's dynamics presented in [Reference Burattini2] are a modified version of previous models [Reference Coutinho5, Reference Coutinho6]. The structure, i.e. the number of compartments, transition rates, etc., is the same as the previous models [Reference Coutinho5, Reference Coutinho6]. However, there is a very important difference. In [Reference Burattini2], the average mosquito population was allowed to increase slowly with time. This included a new variable, which made the system in [Reference Burattini2] non-autonomous in addition to the non-autonomous terms that simulated seasonality presented in the models in [Reference Coutinho5] and [Reference Coutinho6]. This is discussed in more detail in [Reference Burattini2]. We applied this model to test the hypothesis proposed to explain both the low number of dengue cases in 2006 and the high number of cases observed so far in 2007.

The populations involved in the transmission are human hosts, mosquitoes, and their eggs (the latter includes the intermediate stages, e.g. larvae and pupae). The population densities, therefore, are divided in the following compartments: susceptible humans, denoted S _H; infected humans, I _H; recovered (and immune) humans, R _H; total humans, N _H; susceptible mosquitoes, S _M; infected and latent mosquitoes, L _M; infected and infectious mosquitoes, I _M; non-infected eggs, S _E; and infected eggs, I _E.

The model's equations are:

(1)

where c _S(t)=(d ₁ – d ₂ sin(2πft+ϕ))θ(d ₁ – d ₂ sin(2πft+ϕ)) is a climatic factor mimicking seasonal influences in the mosquito population (see below and references [Reference Burattini2, Reference Coutinho6]) and θ is the Heaviside function [Reference Coutinho6]. Those and the remaining parameters are explained in Table 1.

Table 1. The parameters notation, biological meaning and values applied in the simulations

Briefly, we describe some features of the model.

Susceptible humans grow at the rate {r _HN _H[1−(N _H/κ_H)] – μ_HS _H}, where r _H is the birth rate, μ_H is the natural mortality and κ_H is related to the human carrying capacity as explained below.

Humans are subject to a density-dependent birth rate and a linear mortality rate. The population dynamics in the absence of disease is

(2)

where r _H is the birth rate of humans, N _H is the total human population, κ_H is a constant and the human carrying capacity is [(r _H – μ_H)/r _H]κ_H.

Note that we are assuming that close to the carrying capacity the human population growth is checked by a reduction in the birth rate. Alternatively, the control of the population could be done by a term including density dependence in the mortality rate and equation (2) could be written as

(3)

which can be interpreted as density dependence in the mortality rate. However, the net result would be qualitatively the same.

Those susceptible humans who acquire the infection do so at the rate [abI _M(S _H/N _H)], where a is the average daily biting rates of mosquitoes and b _H is the fraction of actually infective bites inflicted by infected mosquitoes, I _M.

The second equation of model 1 describes infected humans, I _H, who may either recover, at rate γ, or die from the disease, at rate (μ_H+α_H).

The third equation of system 1 describes recovered humans, who remain recovered for the rest of their lives.

The fourth, fifth and the sixth equations of system 1 represent the susceptible, latent and infected mosquito population densities, respectively. Susceptible mosquitoes vary in size with a time-dependent rate

(4)

The term μ_M is the natural mortality rate of mosquitoes. The term p _SS _E is the number of eggs hatching per unit time, and which survive beyond the intermediate stages (larvae and pupae). The term c _S(t) simulates the seasonal variation in mosquito production from eggs (see below).

Those susceptible mosquitoes that acquire the infection do so at the rate [acS _M(I _H/N _H)], where a is the average daily biting rates of mosquitoes and c is the fraction of bites inflicted by susceptible mosquitoes on infected humans that result in infected mosquitoes. Infected mosquitoes acquire the infection after biting infected humans at a rate [acS _M(I _H/N _H)], spending some time in a latent period, called the extrinsic incubation period. The fraction of those latent mosquitoes that survive the extrinsic incubation period, with a given probability [exp(–μ_Mτ_I] become infective. Therefore, the rate of mosquitoes becoming infective per unit time is

The term p _II _E is the number of infected eggs hatching per unit time, and which survive beyond the intermediate stages (larvae and pupae).

The seventh and the eight equations represent the dynamics of susceptible and infected eggs, respectively.

In the seventh equation, the term

(5)

represents the oviposition rate of susceptible eggs born from susceptible mosquitoes at rate

(6)

and from a fraction (1 – g) of infected mosquitoes at rate

(7)

The parameter g, therefore, represents the proportion of infected eggs laid by infected female mosquitoes.

The term r _MS _M represents the maximum oviposition rate of female mosquitoes with the number of viable eggs being checked by the availability of breeding places by the term {1 – [(S _E+I _E)/κ_E]}. As in the case of humans, the eggs' carrying capacity is [(r _E – μ_E)/r _E]κ_E, where κ_E varies with time. Once again we choose a density dependent on birth rather than on death. Again, control of the population could be done by a term including density dependence in the mortality rate, but the net result would be qualitatively the same.

Finally, in the last equation the term

(8)

represents the net rate by which infected eggs are produced by infected adult females, i.e. vertical transmission of dengue virus.