Model Equations

Equations describing the dynamics of a two-host, two-vector system are given below, whilst the variables and parameters of the model are defined and described in Table 1. For clarity, we have adopted a similar notation to that used by Gubbins et al. [6]. In short, hosts can be either susceptible, infectious or recovered (and in this case immune), whilst vectors can be either susceptible, latent or infectious. The proportions of susceptible, infectious and recovered hosts are denoted by , and respectively, whilst the numbers of susceptible, latent and infectious vectors are denoted by , and respectively ( in total). Susceptible hosts of type i [where i can be either C (cattle) or S (sheep)] become infectious at rate λ_Hi, which is the sum over vector types indicated by j [where j can be either 1 (C. imicola) or 2 (C. bolitinos)] of . The third term is composed of the ratio of vectors of type j to hosts of type i, the proportion of vectors of type j that are infectious and the proportion of vectors of type j attracted to hosts of type i (i.e. reflecting the preference of vector type j for host type i). So, the third term gives the average number of infectious vectors of type j attracted to a host of type i (after taking into account vector type j's preference for host type i). This is multiplied by , the (temperature-dependent) biting rate of vectors of type j, and , the probability of transmission from a vector of type j to a host given an effective contact. Similarly, susceptible vectors of type j become latent at rate λ_Vj, which is the sum over host types (indicated by i) of . The third term is the probability of a vector of type j being attracted to an infectious host of type i. This is multiplied by , the (temperature-dependent) biting rate of vectors of type j, and , the probability of transmission from a host to a vector of type j given an effective contact. An infectious host remains infectious until it either recovers (at rate r_i) or dies (at rate d_i). After a short extrinsic incubation period (on average 1/ν_j), latent vectors become infectious. They remain infectious until they die, which occurs at rate . Susceptible vectors are added to the system at rate . The model assumes that there is no seasonal aspect to vector recruitment or population size and that there is no latent period in hosts, recovered animals are immune and the host population remains constant except for losses due to disease-induced mortality.

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Table 1. Definitions and descriptions of the variables, parameters and rates that influence the dynamics of the two-host, two-vector system and the parameter values used to estimate R₀.

https://doi.org/10.1371/journal.pone.0053128.t001

Basic Reproduction Ratio

The ability of the pathogen to spread can be expressed in terms of the basic reproduction ratio R₀. Mathematically, R₀ is the dominant eigenvalue of the next-generation matrix K. For vector-borne transmission models like the one described above,where matrix A describes vector to host transmission and matrix B describes host to vector transmission (see Appendix 1 in File S1). We could work directly with the characteristic equation . However, there are significant advantages in using a result shown in Appendix 2 in File S1, namely that R₀ is the square root of the dominant eigenvalue of BA (a 4×4 submatrix of K²). Not only is BA smaller than K but also its elements have an obvious biological interpretation in terms of R_ij, the average number of infectious vectors of type i produced by one infectious vector of type j (necessarily in two generations). It is such biological interpretation that we seek. The utility of working with BA is doubtless associated with the argument that, in contrast to directly-transmitted infections, for vector-borne infections makes more sense biologically [2] and is in fact what is measured in the field (i.e. two-generation ‘like’ to ‘like’ transmission).

Following the above procedure we find that(1)where specifically(2)Note that the proportion of vectors of type j attracted to hosts of type iwhere is a measure of vector type j's preference for host type i and is the total number of hosts of type i. For two host species (cattle C and sheep S), this can be rewritten aswhere vector host preference is now denoted by . In terms of vector to host ratios, where and , the first of these is(3)As Gubbins et al. [6], for clarity we replace and with and respectively.

From Gubbins et al. [6], we know that and for two-host, one-vector systems involving vector type 1 and vector type 2, respectively. For the two-host, two-vector system we find from equations (2) that when , and hence . If vectors 1 and 2 are identical in terms of parameter values (i.e. all parameter values for vector species 1 equal those for vector species 2) and equal in number, then and so . In other words, the two-host, two-vector is greater than the two-host, one-vector by a factor of . So, in this case, if it were assumed that there was only one vector species transmitting the infection, the basic reproduction ratio would be underestimated (because the average number of relevant vectors per host would be underestimated). When the vectors are not identical, as the level of cross-infection increases, increases from (when and ), through (when ) to (when is very large).

Estimating β₁ and β₂

Fu et al. [20] show that only midges containing ≥10³ TCID₅₀ release detectable amounts of virus in their saliva. So, first we define ‘infectious’ as ‘having a virus titre ≥10³ TCID₅₀’. Next we obtain from Table 2 of Paweska et al. [15], for several different temperatures, the proportion of vectors remaining that are infectious [i.e. (number of infectious vectors)/(number of initially susceptible vectors known to have fed on infected blood and still be alive after the incubation period)]. Each of these data points is equal to β_j at a given temperature. By fitting curves to the data, we can find temperature-dependent functions for β₁ (C. imicola) and β₂ (C. bolitinos). Exponential curves of the form were fitted using a nonlinear least-squares method with bisquare weighting of the residuals. The coefficients and goodness of fit statistics are given in Table 2. The curves (shown in Appendix 3 in File S1) adequately describe the relationships between β₁, β₂ and temperature over this range of temperatures. Note that as temperature varies from 10 to 30°C, the ratio β₂/β₁ varies from 9.85 to 12.91 (i.e. the probability of transmission of C. bolitinos is always about 10 times greater than that of C. imicola).

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Table 2. Coefficients and goodness of fit statistics for exponential curves of the form , where j can be 1 (C. imicola) or 2 (C. bolitinos), fitted to data extracted from Paweska et al. [15].

https://doi.org/10.1371/journal.pone.0053128.t002

Other parameter estimates

The estimates for m_C1, m_C2, m_S1 and m_S2 were based on catch sizes and species composition reported in Venter & Meiswinkel [14] and Venter et al. [17]. They are rough estimates designed to reflect the relative orders of magnitude of each vector species. As in Guis et al. [21], we assume that catch size approximates ratio of vectors to hosts. Estimates for the remaining parameters were taken from Gubbins et al. [6]. Details are given in Table 1. Six of these estimates a_j, ν_j and μ_j (i.e. three for each vector species) depend on temperature. They are positive and increase monotonically for temperatures between 10.4°C and 35.5°C.

Effect of differences in m_ij and β_j

In order to focus on the effects on R₀ of differences in vector competence, vector abundance and vector host preference, the two species of vectors are assumed to be the same in every way except β_j, m_ij and σ_j. We first consider the effect of differences in m_ij for fixed β_j and σ_j.

First note that, as shown in equation (3), φ_Cj varies with m_Cj, m_Sj and σ_j. However, when m_Cj equals m_Sj, φ_Cj (and hence φ_j) depends on σ_j alone. In Figure 1 (and Figure 2 below), m_S1 and m_S2 equal m_C1 and m_C2 respectively and σ₁ = σ₂ = 0.5. Consequently φ₁ and φ₂ are fixed at 0.67. The transmission probabilities β₁ and β₂ are determined (as described in Table 1) by temperature, which is 25°C in Figure 1A and 15°C in Figure 1B. The parameters m_C1 and m_C2 vary independently along the x and y axes respectively. In Figure 1A, we can clearly see that R₀ is greater when vector 2 (C. bolitinos) is more abundant than vector 1 (C. imicola) [i.e. when m_C2 is greater than m_C1] than when the reverse is true. For example, when m_C1 = 50 and m_C2 = 500 (i.e. in the top left-hand corner), R₀ is 7.0, whereas, when m_C1 = 500 and m_C2 = 50 (i.e. in the bottom right-hand corner), R₀ is only 3.1. This large difference is due to the fact that β₂ is approximately 10 times greater than β₁ and illustrates the balance between vector abundance and vector competence for C. imicola and C. bolitinos. The same relationship is observed when the temperature is 15°C (i.e. in Figure 1B), but R₀ is much smaller at this temperature.

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Figure 1. Effect on R₀ of differences in the vector to host ratios m_C1 and m_C2.

In (A) the temperature is 25°C, while in (B) it is 15°C. Parameter values (1 = C. imicola, 2 = C. bolitinos): b₁ = 0.9, b₂ = 0.9, σ₁ = 0.5, σ₂ = 0.5, r_C = 1/20.6, r_S = 1/16.4, d_C = 0, d_S = 0.005, m_S1 = m_C1, m_S2 = m_C2, β₁, β₂, a₁, a₂, μ₁, μ₂, ν₁ and ν₂ are determined by temperature.

https://doi.org/10.1371/journal.pone.0053128.g001

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Figure 2. Effect on R₀ of relative abundance and temperature.

In (A) R₀ is plotted against relative abundance (m_C1/m_C2 = N₁/N₂), which varies from 0.1 (when C. bolitinos is 10 times more abundant than C. imicola) to 10 (when C. imicola is 10 times more abundant than C. bolitinos). Temperature is either fixed at 25°C or 15°C or varies from 15°C to 25°C as relative abundance varies from 0.1 to 10. In (B) R₀ is plotted against ln(relative abundance) and temperature. Parameter values (1 = C. imicola, 2 = C. bolitinos): b₁ = 0.9, b₂ = 0.9, σ₁ = 0.5, σ₂ = 0.5, r_C = 1/20.6, r_S = 1/16.4, d_C = 0, d_S = 0.005, m_S1 = m_C1, m_S2 = m_C2, a₁, a₂, μ₁, μ₂, ν₁, ν₂, β₁ and β₂ are determined by temperature.

https://doi.org/10.1371/journal.pone.0053128.g002

It is also clear from Figure 1 that omitting one vector species (i.e. being constrained to one axis) leads to underestimation of R₀ and when that species has a significantly higher vector competence (as does vector species 2) the degree of underestimation can be dramatic.

In Figure 2, β₁ and β₂ vary with temperature, as described in Table 1. The vector to host ratios m_S1 and m_S2 equal m_C1 and m_C2 respectively, which vary simultaneously with x as described below:Relative abundance (m_C1/m_C2 = N₁/N₂) is therefore described by the hyperbola

Figure 2A shows how R₀ varies with relative abundance. Curves 1 (green) and 2 (blue) show the relationship when temperature is fixed at 15°C and 25°C, respectively. Curve 3 (red) is produced when temperature ( for ) and relative abundance vary simultaneously with x. Hence, curve 3 (red) shows the relationship when temperature varies from 15°C to 25°C as relative abundance varies from 0.1 (when C. bolitinos is 10 times more abundant than C. imicola) to 10 (when C. imicola is 10 times more abundant than C. bolitinos). By definition, curve 3 is constrained to start at the same point as curve 1 and end at the same point as curve 2. Curve 3 can be thought of as a path across the landscape, moving from the cooler high-lying regions where C. bolitinos dominates to the warmer low-lying regions where C. imicola dominates. Along this path, temperature (and hence β_j) and relative abundance vary simultaneously.

Figure 2B shows how R₀ varies with relative abundance (y axis) and temperature (x axis) separately. It clearly shows that, for a fixed temperature, R₀ always decreases as relative abundance of C. imicola increases. It also shows that, for fixed relative abundance, R₀ initially increases with temperature, but starts to decrease again beyond 31°C. Curve 3 in Figure 2A corresponds to moving from A to B across the surface in Figure 2B. Along this path, the highest R₀ corresponds to a relative abundance of approximately 1.4 and a temperature of approximately 21.1°C. In this case, for temperatures greater than 21.1°C, R₀ drops with rising temperature because, at the same time, the less competent vector is replacing the more competent one.

In summary, we find that high vector competence can compensate for low vector abundance and that temperature, which determines the transmission probabilities β₁ and β₂ and also influences the abundance and composition of vector species, has a marked effect on R₀.

Effect of differences in σ_j

We now consider the important effect that vector host preference (σ_j) has on R₀. In order to focus on the effect of σ_j, we assume that the vector species differ only in σ_j. Also, to ensure that there is no advantage to choosing cattle over sheep (or vice versa), we set r_C = r_S, d_C = d_S and m_C1 = m_S1 = m_C2 = m_S2. When σ_j = 0, the proportion of vectors of type j attracted to cattle () equals 1. When σ_j = 1 (i.e. no preference), just depends on the relative numbers of each host species, with a greater number resulting in a greater share of the vectors. As σ_j→∞, →0 where all vectors are attracted to sheep. To prevent loss of detail as σ_j→∞, in Figure 3 we use α_j rather than σ_j, where α_j is an alternative measure of vector host preference such that . From this formula we can see that as α_j varies from 0 to 1, σ_j varies from 0 to ∞ and that α_j = 0.5 indicates no preference.

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Figure 3. Effect on R₀ of differences in the vector host preferences α₁ and α₂.

Parameter values (1 = C. imicola, 2 = C. bolitinos): b₁ = b₂ = 0.9, m_C1 = m_C2 = m_S1 = m_S2 = 500, r_C = r_S = 1/16.4, d_C = d_S = 0.005, a₁, a₂, μ₁, μ₂, ν₁, ν₂ and β₁ are determined by temperature T, where T = 25°C, β₂ = β₁.

https://doi.org/10.1371/journal.pone.0053128.g003

Figure 3 clearly shows that the minimum value of R₀ lies on a straight line running from (α₁ = 0, α₂ = 1), where and (i.e. vector type 1 feeds exclusively on cattle while vector type 2 feeds exclusively on sheep), through (α₁ = 0.5, α₂ = 0.5), where and (i.e. neither vector has a preference and so both vector species are equally distributed between both host species), to (α₁ = 1, α₂ = 0), where and (i.e. vector 1 feeds exclusively on sheep while vector 2 feeds exclusively on cattle). Any deviation from this line results in a higher R₀. This figure clearly shows two things: firstly, that different combinations of vector host preferences can result in the same R₀; second, that when both vectors prefer the same host species, R₀ is greater. This result is important because it shows that, when the vector species differ only in host preference and the host species are equally good as hosts (in this case, they share the same infectious period and the same pathogen-induced mortality rate) and equally abundant, overlooking vector host preference can result in an underestimation of R₀.

In Figures 1 and 2 and Table 3, we used  =  = 0.5 (which corresponds to  =  = 1/3) as many Culicoides species prefer to feed on cattle [14], [16]. However, while it is clear that C. imicola also feeds on sheep (and even horses and pigs too), there is some evidence that C. bolitinos does not – instead feeding exclusively on cattle and horses [16], [17]. A strong association between C. bolitinos and cattle is further suggested by the fact that C. bolitinos breeds in cattle dung [14], rather than soil like C. imicola. In terms of R₀, if C. bolitinos does not feed on sheep, then  = 0 (i.e.  = 0) and the true value of R₀ will be higher than our estimates based on  = 0.5.

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Table 3. 2-host, 2-vector R₀ and possible approximations based on the 2-host, 1-vector formula.

https://doi.org/10.1371/journal.pone.0053128.t003

R₀ approximations

The need for the two-host, two-vector formula is further emphasised when we consider several approximations based on the two-host, one-vector formula for R₀, which is(4)

Suppose we have information on two vectors that are circulating in the same area and feeding on the same host populations. We might think it reasonable to assume that the vectors are acting independently, merely feeding on the same hosts. In which case, one option would be to calculate R₀ for each vector separately and add them together. We refer to this approximation as R_0,sum (i.e. ). It incorporates the idea that there is no cross-infection. Table 3 contains the true value of R₀ (i.e. calculated using the two host, two vector formula) and the value of R_0,sum under different scenarios. In examples a and b the temperature is 25°C and C. imicola is 10 times more abundant than C. bolitinos (representing warmer low-lying areas), whereas in examples c and d the temperature is 15°C and C. bolitinos is 10 times more abundant than C. imicola (representing cooler high-lying areas). In a and c, the vectors are assumed to have the same preference for cattle (i.e. σ₁ = σ₂ = 0.5) so . In b and d, C. imicola is assumed to have no preference for a particular host, while C. bolitinos is assumed to feed exclusively on cattle (i.e. σ₁ = 1, σ₂ = 0) so . In these examples, R_0,sum consistently overestimates R₀ by between 5% and 45%.

An alternative approach would be to pool the vectors (e.g. and ) and use average values (e.g. and ). In the examples in Table 3, we have assumed that the vectors are very similar and so share many parameter values. In fact, we have assumed that they differ only in vector to host ratio (m_ij), host to vector transmission probability (β_j) and vector host preference (σ_j). So, R_0,ave can be obtained by substituting , , and into equation (4). Surprisingly, the examples reveal that R_0,ave can sometimes overestimate and sometimes underestimate the true value by a significant amount.

Another possible approximation is obtained by first calculating the lower and upper bounds given by R_0,minβ and R_0,maxβ and then taking the weighted average (R_0,wtsum). R_0,minβ is calculated in the same way as R_0,ave except that the host to vector transmission probability (β) takes the minimum value (β₁, where ), rather than the average, and the proportion of vectors attracted to cattle () takes the minimum value (, where ), rather than the average. R_0,maxβ is the equivalent calculation using the maximum host to vector transmission probability (in this case β₂) and the maximum proportion of vectors attracted to cattle (in this case ) . R_0,wtsum is then the weighted sum of R_0,minβ and R_0,maxβ (i.e. , where and ). We can see from Table 3 that R_0,wtsum can provide a fairly good approximation to R₀. In our examples, it consistently underestimates R₀, but never by more than 19% and sometimes by as little as 2%. Alternative formulations in terms of R₁₁ and R₂₂ are given in Table 3 for comparison with R_0,sum. Note however that, for R_0,ave, R_0,minβ, R_0,maxβ and R_0,wtsum, the formula given is for only. There is insufficient space to give the more general expression.

These examples suggest that, even when the vectors are very similar and share many parameter values, simply summing the contribution from each vector species (R_0,sum) will lead to overestimation of R₀ and that the degree of overestimation can be large. R_0,wtsum appears to provide a more consistent estimate. Table 3 also shows that intuitive approximations like R_0,ave can be very misleading, sometimes underestimating and sometimes overestimating the true value of R₀.