Predicting probability of freedom from bTB in a wild possum population

Possums are a small (2–3 kg) marsupials that were introduced from Australia and are now found in most parts of New Zealand. They are predominantly arboreal folivores and tend to be most abundant in forest (where densities of 5–10/ha are not uncommon) but occur in most other habitats except completely open large areas where there is little or no shrub or tree cover (such as extensive cropland). Infected populations usually have a low prevalence of bTB (1–2% [Reference Coleman, Caley and Montague20]) and are usually surveyed for disease presence using leg-hold trapping.

While our predictive modelling of the probability of disease freedom is novel, it is analogous to the well-established scenario-tree modelling for predicting disease freedom [Reference Martin11–Reference Martin, Cameron and Greiner13]. Our modelling approach is organized such that the basic sampling unit is a spatial grid cell that is one of a grid-cell system superimposed on the area of interest (extent). Following a survey in which disease is not detected (S ⁻; negative surveillance), the probability of bTB freedom for the full extent at time t, P(free|S ⁻)_t, is calculated as a function of the sensitivity of the surveillance system (SSe_t), or the probability of detecting bTB given an infected possum is present in at least one grid cell. Assuming that false-positive results are not possible (we cannot find bTB if it is not present), Bayes theorem is used to estimate a posterior distribution of P(free|S ⁻)_t:

(1)$$P\lpar {\rm free}\vert S^- \rpar _{t} = {{P\lpar {\rm free}\rpar _{t} } \over {1 - SSe_{t} \lowast \lpar 1 - P\lpar {\rm free\rpar }_{t} \rpar }},$$

where P(free)_t is the prior probability of freedom for the full extent, which can be derived from previous analyses, expert opinion or drawn from a non-informative distribution [e.g. uniform (0,1)]. The P(free)_t and SSe_t are distributions from which we sample to obtain the posterior distribution P(free|S ⁻)_t. The prior is updated annually, so that the P(free|S ⁻)_t becomes the following year's prior [P(free)_{t +1}]. If present, the risk of introduction [P(intro)_t] from adjacent areas can also be incorporated into the annual updating of the priors:

(2)$$P\lpar {\rm free\rpar }_{t} = P\lpar {\rm free}\vert S^- \rpar _{t - \setnum{1}} \ast \lpar 1 - P\lpar {\rm intro\rpar }_{t} \rpar ,$$

The SSe_t is calculated by combining all cell-level sensitivities (SeU_i; probability of detecting bTB in grid cell i given it is present). The probability of finding an infected grid cell in any order is given by a hypergeometric distribution [Reference Cameron and Baldock29], which is achieved by sampling without replacement each grid cell with its associated SeU_i. To increase computational efficiency, we used a binomial approximation to the hypergeometric distribution to calculate SSe_t [Reference Cameron and Baldock29]:

(3)$$SSe_{t} = 1 - \left( 1 - SeU{\rm avg\ast }{n \over N}\right) ^{P_{u}^{\ast } \cdot N} ,$$

where SeUavg is the average grid-cell sensitivity of sampled cells, n is the number of grid cells sampled, N is the total number of grid cells across the full extent, and P_u* is the grid cell-level prior or design prevalence [Reference More12, Reference Martin, Cameron and Greiner13]. The P_u* is not related to the actual prevalence of disease and is used to determine the amount of surveillance necessary to achieve the eradication goal [Reference Martin, Cameron and Greiner13]. The P_u* is expressed as the minimum proportion of the total number of grid cells expected to be infected if the extent of interest is in fact infected. We use equation (1) to test the hypothesis that that population (of grid cells) is infected at the design prevalence. If we obtain a high P(free|S ⁻)_t, the likelihood of this hypothesis is low and we can conclude that the population is not infected at or above the design prevalence, but we cannot conclude that it is not infected with a prevalence less than P_u*. Consequently, to obtain a posterior probability of absolute freedom, the P_u* must be 1/N (i.e. no grid cells contain the home-range centre of an infected possum).

In equation (3), all grid cells are considered to have equal risk of being infected. If the landscape is heterogeneous in terms of habitat suitability for possums or from population control history, then not all grid cells would be expected to have equal risk of infection. Put simply, and in the extreme, if grid cells with a particular habitat do not contain any possums, then bTB cannot be present in those grid cells. Incorporating cell-specific relative risks of infection into the calculation of the SSe_t is achieved with the following equation:

(4)$$SSe_{t} = 1 - \left( 1 - SeU{\rm avg} \cdot {n \over N}\right) ^{{\rm EPIavg} \cdot N} ,$$

where

(5)$${\rm EPIavg = }{{P_{u}^{\ast } \sum\nolimits_{k = \setnum{1}}^{n} {{\rm AR}_{i} } } \over n},$$

and AR_i is the adjusted risk for grid cell i. The EPIavg is the effective probability of infection and represents the probability that one of the sampled grid cells is infected. The AR_i is calculated as:

(6)$${\rm AR}_{i} = N \cdot {\rm RR}_{i} \sol \sum\nolimits_{k = \setnum{1}}^{N} {{\rm RR}_{k} , }$$

where RR_i is the relative risk for grid cell i. The RR_i are specified relative to the lowest risk grid cell within the spatial extent of interest. If a habitat preference map is used, then high map values suggest relatively high numbers of possums and associated high risk of bTB relative to habitat areas with low preference. The RR_i values can be calculated from a possum habitat map as follows:

(7)$${\rm RR}_{i} = {{{\rm habitat}_{i} } \over {\min \lpar {\rm habitat}\rpar }},$$

where habitat_i is the value that summarizes the habitat preference for grid cell i.

Possum traps and captured sentinels provide information on the probability that bTB is present. We assume that if a possum population is infected, then sympatric spillover hosts such as pigs, ferrets, and deer will also become infected at some level. Sampling of ‘sentinel’ species therefore provides information on the probability that bTB is in the area. Similarly, if an infected possum was present in an area and the area was surveyed using traps, there is a joint probability that it would be captured and that bTB infection would be detected. Thus, provided no bTB is found, the trapping outcomes also provide information on the probability that bTB is present in possums in the area, regardless of whether or not a possum was actually captured (provided all possums captured within a survey are found to be negative).

Our objective is to use possum traps and sentinels to quantify the probability of detecting bTB in a grid cell given that it is present. We assume that each possum trap j or captured sentinel j ‘searches’ for bTB in multiple grid cells as a function of home-range size and other parameters (see details below). The SeU_i is calculated as a function of the search effort from one or more traps and sentinels:

(8)$$SeU_{i} = 1 - \prod\nolimits_{J = \setnum{1}}^{j} {\lpar 1 - SeU_{ij} \rpar , }$$

where SeU_ij is sensitivity of trap/sentinel j detecting bTB in grid cell i. The mechanisms by which possum traps and captured sentinels detect disease in a grid cell are distinct, and therefore we model separately the contribution that these two groups make to grid-cell sensitivities.

The contribution to the SeU_i that is made by a single trap (whether a possum was trapped or not) is simply the product of the probability of capture [P(capture)_ij] of a possum from cell i in trap j, and the probability that the diagnostic test will detect bTB in an infected animal [P(test⁺)]:

(9)$$SeU_{ij} = P\lpar {\rm capture}\rpar _{ij} \; P\lpar {\rm test}^{ \plus } \rpar.$$

The probability of capture of an infected possum, and therefore the contribution that a trap makes to the sensitivity of a given grid cell will decrease with increasing distance between the trap and the grid cell. We emphasize that equation (9) represents the sensitivity of surveillance using traps, therefore the probability of capture is applied to all traps regardless of whether possums are captured (provided that captured possums are tested and found to be negative).

The probability of trap j capturing an infected possum that has its home-range centre in cell i is calculated as:

(10)$$P\lpar {\rm capture}\rpar _{ij} = 1 - \left( {1 - g_{\setnum{0}} \exp \left( {{{ - d_{ij} ^{\setnum{2}} } \over {2\sigma ^{\setnum{2}} }}} \right)} \right)^{{\rm nights}} ,$$

where d_ij is the distance between a given trap j and cell i, g ₀ is the probability of capturing a possum if the trapping device is placed at the animal's home-range centre [Reference Efford30], σ is the spatial-decay parameter for a home-range kernel [Reference Efford30], and nights represents the number of nights that a trap is set and checked. Consequently, the estimated search effort of a given possum trap for bTB in grid cells is assumed to decay spatially from the trap location with a half-normal kernel up to a maximum distance of twice the radius of a typical possum home range from the trap (4σ).

For spillover sentinels, we assume that individuals are killed and necropsied with an estimated probability of detection of the disease if the animal was infected [P(test⁺)]. Unlike traps, we do not use non-capture sentinel survey data in calculating the contribution that captured sentinels make to the SeU_i, because we do not make any assumptions concerning the presence of sentinels, nor do we have any data on the probability of sentinel presence. Thus, because we only use data from animals actually sampled, it is not necessary to include the probability of capturing sentinels, as we did with possums. We model the probability of detecting bTB in possums in grid cell i using a captured sentinel at location j, therefore we must include the uncertainty associated with the probability of disease transmission from an infected possum in a given grid cell to the sampled sentinel. The probability of a sentinel becoming infected in a given grid cell decreases with increasing distance from the point of capture. The contribution that a captured sentinel j makes to the sensitivity of a given grid cell i is:

(11)$$SeU_{ij} = \left[ {1 - \left( {1 - \lambda _{\setnum{0}} \exp \left( {{{ - d_{ij}^{\setnum{2}} } \over {2\sigma ^{\setnum{2}} }}} \right)} \right)^{{\rm age}} } \right]P \, \lpar {\rm test}^{ \plus } \rpar,$$

where λ₀ is the probability that a sentinel becomes infected given that the sentinel's home-range centre is at or very near the home-range centre of an infected possum, and age is the estimated age of the sentinel in years at the time of capture. The exponential term reduces the probability of becoming infected with increasing distance using a half-normal kernel up to a maximum distance of twice the radius of a typical sentinel home range from the capture location (4σ). This search area is selected because we do not have information on the location of the home-range centre. We estimated λ₀ by first calculating the average annual probability that a sentinel would be infected by a single possum occurring within its home range (P_a [Reference Caley and Ramsey31, Reference Nugent32], unpublished data). For each sentinel species and its associated σ, λ₀ was the maximum value (y intercept) of a half-normal distribution with mean P_a.

Parameter sensitivity analysis

We conducted a sensitivity analysis of model parameters to assess how variations in values influence the resulting SSe_t. We evaluated each parameter iteratively across a range of values while holding all other parameters at default values (Table 1). To assess relative parameter sensitivities, the estimated median SSe_t was graphed against the proportional change in parameter value (elasticity [Reference Dekroon33]). This analysis was done on a simulated square 25-km² landscape with a grid-cell size of 1 ha, and no spatial relative risks were present.

Table 1. Default and range of parameter values used in sensitivity analysis of the wildlife disease-surveillance model. Single parameter values were used, and uncertainty was not incorporated into this analysis

† Sensitivity analysis of λ₀ was conducted by randomly placing four pigs in the landscape, as λ₀ only applies to spillover sentinel species. The default σ value used for pigs was 910 m, and all other relevant default parameters were as in this table.

The grid-cell size defines the structure of the model and is not a biological parameter, and the model should not be sensitive to structural parameters. The model and predictions of SSe_t will be insensitive to grid-cell size if P_u* is adjusted to always be 1/N. This is appropriate because the objective is to calculate the probability of absolute freedom (i.e. no grid cells contain the home-range centre of an infected possum). The P_u* was adjusted to be 1/N for each grid-cell size in the sensitivity analysis (Table 2).

Table 2. Details and results of a sensitivity analysis of grid-cell size on a square 25-km² simulated landscape with 50% coverage of a habitat X with a relative risk of 10

Four different grid-cell sizes and associated P_u* values across a varying range of proportion of traps in habitat X were explored. The SSe_t was calculated for each trial and the coefficient of variation (CV) was calculated across trials with different grid-cell sizes. A lack of effect of grid-cell size is indicated by low CV values for trials across grid-cell sizes (across rows). As expected, SSe_t increases with increasing percentage of landscape covered by traps (down columns).

Last, we conducted a sensitivity analysis of trap placement in landscapes with spatial relative risks of bTB infection (RR). The 25-km² landscape had a baseline RR of 1 and was covered by a varying proportion of a second habitat type (X; Fig. 1). Estimated SSe_t values were graphed across a range of proportions of traps in habitat X (0–100%). In the first test, X was set to cover 50% of the landscape and we compared estimated SSe_t values when RR(X) = 50, 10, 3·33 and 0 (i.e. no RR). The no-RR test was conducted to explore the effect of non-even placement of traps across the landscape. Next we examined the effect of placing a range of proportion of traps in habitat X when RR(X) = 10 and the percentage of cover of habitat X was 20% and 80%. Third, we assessed the effect of placing a varying proportion of 250, 500, 1000 and 1500 traps in habitat X when RR(X) = 10 and habitat X covered 50% of the landscape.

Fig. 1. The estimated median SSe_t was graphed against the proportional change in parameter value (elasticity) to assess the relative sensitivities of parameters. This analysis was done on a simulated square 25-km² landscape with a grid-cell size of 1 ha, and no spatial relative risks were present.

Case study: Blythe Valley

Blythe Valley is an ∼13 000-ha bTB vector control zone in the South Island of New Zealand (173·287°, −42·954°), in which NZ$0·6 million was spent on reducing possum and ferret populations from 2000 to 2009. The area is comprised of pastureland with a mosaic of patches of shrubland and forest, which were the main possum habitat. The surveillance data consisted of 81, 2382, 2642 and 2054 possum traps, and 18, 53, 34 and 37 ferrets captured in the years 2006–2009, respectively. The number of possums killed annually decreased from >3700 in 2000 to 17 in 2009. No bTB has been detected in possums or ferrets since 2004. We applied the spatial bTB surveillance model to possum-trapping and sentinel ferret-necropsy data during the period 2006–2009 to predict the probability of bTB freedom. Although no capture data exist for pigs, we simulated three pig captures per year at random locations in the Blythe Valley for comparative purposes and to illustrate the effect of using multiple data sources on bTB-freedom predictions.

We set grid-cell size to 1 ha and P_u* to 1/N (0·000077). Grid-cell size should be smaller than the expected possum home-range size, and 1 ha was appropriate given that forest-dwelling possums at low density have mean home-range sizes of ∼9 ha [Reference Pech34]. To examine the effect of including habitat-based relative risks in the surveillance modelling, we used a predictive spatial model of possum-carrying capacity based on 36 vegetation classes [Reference Efford and Montague35]. Relative risk values in our study area varied from 1 to 24.

We accounted for uncertainty in model parameters by repeating the model 500 times, and with each iteration new parameter values were drawn for each possum trap or sentinel from the respective distributions (Table 3). The spatial-decay parameters (σ) were drawn from a normal distribution with a mean and standard deviation for each species (Table 3). The parameters g ₀, λ₀, and P(test⁺) were drawn from beta distributions where α and β were derived from a mean and standard deviation (Table 3). The initial prior probability of freedom was drawn in each iteration from a beta distribution derived from a mean = 0·5 and standard deviation of 0·2. Given that the intensive possum control history had probably resulted in a >95% reduction in the possum population over the 2000–2006 period, this is a highly ‘pessimistic’ or conservative prior as modelling predicts that sustained reduction in possum density of this magnitude is likely to quickly eliminate bTB from possum populations (see [Reference Ramsey and Efford36]).

Table 3. Mean and standard deviation of distributions for parameters used in surveillance-data modelling in the Blythe Valley case study

σ, Home-range size parameter; g ₀, probability of capture at home-range centre; P(test⁺), diagnostic sensitivity; λ₀, probability of disease transmission from a possum to a sentinel with home-range overlap; n.a., not applicable.

Source of parameter values: * [Reference Ramsey40], † [Reference Pech34], ‡ [Reference Nugent32], § unpublished data.

The posterior P(free|S ⁻)_t distribution created by 500 model iterations encompasses parameter uncertainty, which is expressed as credible intervals (CIs). Given uncertainty in model predictions, it is critical to evaluate both the central tendency and the spread of the predictions. We assessed the posterior distributions by evaluating the median, 90% CIs, and the credible interval value (CIV [Reference McBride and Johnstone37]). The CIV examines the posterior distribution by asking what proportion of the posterior probability of freedom is >0·90 (CIV threshold), thus incorporating both the central tendency and the spread in the distribution. Using a CIV threshold of 0·90, we compared results of the Blythe Valley analysis to a target CIV value of 0·95, or the probability that 95% of the posterior P(free|S ⁻)_t distribution is >0·90.