Estimating malaria transmission intensity from Plasmodium falciparum serological data using antibody density models

A mathematical model was developed to describe the dynamics of acquisition and loss of antibodies in the population. The model assumes that, following exposure to an infectious bite which occurs at rate λ, an individual’s antibody level is boosted by δ(x _t ) where x _t is the base-10 logarithm of antibody density. In the absence of exposure, antibodies are assumed to decay exponentially at a constant rate ρ. Let y(x, t) denote the proportion of the population with antibody level xat time t and K(x ^*, x) denote the probability that individuals with (log₁₀) antibody level x at time t are boosted to level x ^*(x ^* > x) on exposure to an infectious bite between t and δt with K(x ^*, x) = 0 if x ^* ≤ x (∫ _x ^∞ K(x ^*, x) dx ^* = 1). Then the distribution of antibody levels in the population is given by:

With ∫λK(x, x ^*) y(x ^*) dx ^* corresponding to all the individuals with lower antibody levels who get boosted to level xupon exposure. Similarly ∫λK(x ^*, x) y (x)dx ^* corresponds to the individuals with antibody levels xwho get boosted to a higher level upon exposure and \(\rho \frac{\partial y(x)}{\partial x}\) corresponds to the individuals losing their antibodies.

The model was numerically approximated by a version in which the log₁₀ antibody density variable, x, was discretized by dividing the range of the variable into N compartments each of width D, with x _i denoting the value of (log₁₀) antibody density at the mid-point of antibody class i. The first class represents measurements below the LoD, x _min. Here N = 51, with D = 0.052 and x _min  = −2. The resulting discrete model describes the dynamics of the proportion of the population in each antibody density category i, denotedy _i , and is defined by the following set of ordinary differential equations:

where h, i, j index the N antibody level classes. The rates of exposure and decay of antibodies, λ and ρ, are assumed to be independent of antibody density and age. The probability that following exposure, antibody levels are boosted to class i from class j, k _ij , is distributed according to a discretized lognormal distribution:where F(z, δ(x), S)is the cumulative density function at point z of the lognormal distribution with mean δ(x) and standard deviation S. δ(x) is the mean boost size, a function of the current log₁₀ antibody level, x, assumed to be given by:where a, b and η are parameters. This model assumes that exposure increases the log of antibody density by a decreasing amount as current density increases.

The model is run at equilibrium and constant malaria exposure over the years is assumed. As a result, age of individuals is considered as a proxy for time.

A Bayesian approach was used to estimate the model parameters, summarized in Table 1, by fitting the model to the data from the 12 villages simultaneously, allowing only the exposure, λ_v, to vary by village. The rate of decay of antibodies was fixed to 0.7 years⁻¹. Using θ to denote the estimated parameter vector and D the data, the multinomial log-likelihood is given by:

Here n _i,t,v and y _i,t,v are, respectively, the observed number and predicted proportion of individuals in antibody category i in village v at age t. The differential equations were numerically integrated in C using the Runge–Kutta method [20]. MCMC methods (using a Metropolis–Hastings algorithm [21]) were used to calculate the posterior distribution of the parameters. As all parameters were strictly positive we used a log-normal random walk proposal density and assumed uniform priors on [0, max], where max was the maximum permitted value of each parameter as listed in Table 1. Two runs of 500,000 iterations were performed for each run of the MCMC algorithm with a burn-in period of 50,000 steps. Chain convergence was checked visually. The output was then recorded every 200 iterations to generate a sample from the posterior distribution. The standard deviation of the proposal distribution was tuned in order to achieve appropriate mixing of the chains and an acceptance rate close to 20 % [22].

A comparison of the estimates with those obtained using a previously described catalytic model [23] was performed. In this simple model the proportion of individuals who are seropositive at age t is given by:where λ _C is the mean annual rate of conversion from seronegative to seropositive and ρ _C the mean annual rate of reversion from seropositive to seronegative. It should be noted that (for similar decay rates, r) the SCR estimated with the catalytic model is expected to be smaller in absolute magnitude than the exposure rate calculated from the density model, as exposure in the density model may not always lead to an antibody boost sufficient to caused seroconversion by the criterion used in the catalytic model. A Bayesian MCMC approach as described above was used for parameter estimation. The model was fitted to all villages simultaneously, again allowing λ _C to vary by village but with the constraint of estimating a single value forρ _C across all villages. Two methods were considered to define individual’s seropositivity. In the first a fixed cut-off value of antibody density of 0.5 was used based on data from non-exposed European sera [10]. In the second a mixture model was fitted to the antibody level distribution for all the village’s data combined across all age groups. The mixture model assumes that the population is composed of a subpopulation of seropositive individuals making up a proportion p of the whole population, and a seronegative subpopulation containing the rest of the population. Antibody levels of individuals in each sub-population are normally distributed with parameters (μ ₁, σ ₁) for the seronegative group and (μ ₂, σ ₂) for the seropositive group. The parameters of the mixture model were estimated using MCMC methods with the following likelihood:

where \(X_{i}\) is the value of antibody levels X _i ∊ {X ₁, …, X _n } and φ(X, μ, σ) represents the probability density function for an observation X from a Normal distribution \(N\) with mean μ and standard deviation σ. So that the overall distribution of antibody levels is (1 − p) N(μ ₁, σ ₁ ² ) + pN(μ ₂, σ ₂ ² ). For comparison with studies that use fixed cutoff, analyses were also conducted in which individuals with an antibody level greater than μ ₁ + 3σ ₁ are defined as seropositive.