Model structure – Hyalomma tick population

In contrast to previous similar models (e.g. Medley et al. Reference Medley, Perry and Young1993), rather than simply describing the tick population through the use of a single infection parameter that is applied to the cattle population, in this study the tick population is explicitly described. This approach was adopted for 2 reasons: (1) it allowed an examination of the role of the tick population and its impact on the overall transmission dynamics of the system and (2) the impact of interventions that target these tick states can be explicitly examined.

In this study the proposed model describes a generic Hyalomma tick population that does not differentiate between species, the structure of which is shown in Fig. 1. This is a simplified interpretation of the life cycle of the Hyalomma tick population, and, in particular we assume a two-host life cycle. This can be justified given that the majority of Hyalomma ticks found in the data set were H. marginatum marginatum which is a two-host tick. It has been shown that many species of Hyalomma tick are able to transmit T. annulata (Norval et al. Reference Norval, Perry and Young1992). To the authors’ knowledge, the impact of the species of Hyalomma tick on the transmission of T. annulata has not been investigated, therefore in this study all Hyalomma species have been grouped together. The attached immatures (AI) are ticks that appear on the host and combine feeding larvae, engorged larvae and then following on-host moulting feeding nymphae and engorged nymphae. It is during this state as attached immatures that ticks may become infected with T. annulata. Following detachment from the host, ticks hibernate and moult from nymphs into adults and then actively quest for their second host; these stages all occur in the model as the questing adult (QA) state. Feeding adults (FA) are those ticks that are on a host and feeding, it is during this period that an infected tick may transmit infection to the cattle host. The final state is the egg-laying adult state (ELA), this incorporates all other parts of the tick life-cycle including egg-laying females, eggs, hardening larvae (the period before larvae become active which allows the body cuticle and mouthpart to harden), and questing larvae which are actively seeking a host (Snow, Reference Snow1969).

Fig. 1. Model Structure describing the Hyalomma tick population.

The tick model proposed here is a deterministic model described by a system of differential equations (Appendix I). From Fig. 1 each mutually exclusive department represents a different stage of tick development while the arrows represent the flows through the stages: vertical arrows represent development, and all stages are subject to mortality. It has been shown in previous studies that the growth and progression of Hyalomma ticks is seasonal, closely following temperature (Chaudhuri et al. Reference Chaudhuri, Srivastava and Naithani1969; Snow, Reference Snow1969; Alahmed and Kheir, Reference Alahmed and Kheir2003), although for simplicity only seasonal variation in the rate that ticks become attached immatures (i.e. host seeking of larvae) is considered here (through the use of a cosine function), with remaining parameters being maintained at a constant value throughout the year. While it is acknowledged that additional seasonality could be introduced for other parameters this has not been done as the main focus of the model is considering T. annulata infection within the cattle population. Additionally, there is insufficient detailed, quantitative data available to model the biological processes mechanistically. The empirical process used in the model would have to be adapted to data or patterns from other locales to apply the model to different environment conditions. To prevent the tick population growing exponentially, a density-dependent rate at which attached immatures die is incorporated into the model. To ensure that questing adults (QA) spend a pre-defined length of time in this stage (which includes hibernation and moulting from nymphae), this has been modelled as a sequence of 6 shorter stages with constant rates of transfer between each, generating a gamma-distributed sojourn in the whole stage, with shape parameter 6 and rate parameter, ζ. Consequently, the mean sojourn in this stage is given as ζ/6 with variance ζ/6 (Keeling and Rohani, Reference Keeling and Rohani2007).

Parameterization – Hyalomma tick model

To parameterize this model it is necessary to obtain parameter values from a number of different sources. Where possible parameters were obtained from secondary data sources; however, in many cases these data sources provided information from laboratory conditions (Chaudhuri et al. Reference Chaudhuri, Srivastava and Naithani1969; Snow, Reference Snow1969; Sardey and Ghafoor, Reference Sardey and Ghafoor1971; Ghosh and Azhahianambi, Reference Ghosh and Azhahianambi2007) rather than the field. Parameters for which estimates could not be gained from the literature were estimated from the current data (Table 1).

Table 1. Parameter values used for tick component of the transmission model

(Where estimated parameter values are those obtained by fitting the model to the data, see text.)

Data collected from farms in Turkey from 2006 to 2008 that describe the number of attached Hyalomma nymphae and adult ticks collected from cattle were used to parameterize the Hyalomma tick model. Figures 2 and 3 show the average numbers of nymphs and adults collected from cattle during this period along with the model fit to data shown in Fig. 3. From Fig. 2, the majority of animals had very few ticks if any with the counts of ticks on the natural hosts being overdispersed (Petney et al. Reference Petney, van Ark and Spickett1990) and therefore for the purpose of obtaining the likelihood function it has been assumed here that the individual counts were distributed as a negative binomial distribution. To account for potential discrepancies between reported numbers of immature and adult ticks (reduced numbers of immature ticks found during data collection), a correction factor (ρ) was introduced into the model that was estimated during the process of obtaining the model fit to the Hyalomma data (Fig. 3) using maximum likelihood described in Appendix II. There are several competing processes controlling the value of this factor. First, immature ticks are considerably harder to count (they are smaller and do not congregate to specific anatomical areas). Second, immature ticks may feed on smaller, non-bovine hosts (Norval et al. Reference Norval, Perry and Young1992). Third, immature and adult ticks will have different residence times on the host, so that a count of the standing infestation will not be a direct measure of the population size. The value for the correction factor was found to be 53·6 indicating that there are 53·6 times more immature ticks in the system than were actually found during the data collection exercise. This value would appear credible particularly when considering that no larvae were found during data collection, while in a previous study that considered Rhipicephalus appendiculatus for under-reporting purposes the number of larvae reported was multiplied by 100 and for nymphs these were multiplied by 10 (Randolph, Reference Randolph1997).

Fig. 2. The frequency of nymph and adult Hyalomma counts on cattle that were examined in Turkey from 2006 to 2008.

Fig. 3. Average number of Hyalomma nymphae and adult ticks found on cattle in Turkey during 2006–2008, and the model fit to data for immature and adult ticks respectively. (In all but one case the model is within the 95% confidence intervals of the data points, which are not shown due to their size.)

The majority of immature ticks appear on cattle during October–November while the adult ticks generally appear on cattle around March–July. Further studies show similar patterns of seasonality (Bouattour et al. Reference Bouattour, Darghouth and Daoud1999; Sayin et al. Reference Sayin, Dincer, Karaer, Cakmak, Inci, Yukari, Eren, Vatansever and Nalbantoglu2003). The model fittings incorporating the maximum likelihood methods are fully described in Appendix II (Hilborn and Mangel, Reference Hilborn and Mangel1997).

Cattle model parameterization

The model describing cattle population and T. annulata infection is shown in Fig. 4, and parameter values given in Table 2. The model equations and the maximum likelihood techniques used to estimate unknown parameters are described in Appendix II.

Fig. 4. Model structure describing the natural history of Theileria annulata infection in the cattle population stratified by age.

Table 2. Cattle model parameters

(Estimated parameters are those that are obtained by fitting the model to data, see text.)

Calves are born into the susceptible state of the cattle population. Although previous studies have suggested the presence of colostral antibodies that provide immunity for calves during their first 3 months (Gharbi et al. Reference Gharbi, Sassi, Dorchies and Darghouth2006), evidence of this was not found in the infection data (see below), and so was not incorporated in the model. Animals in the susceptible state may become infected by T. annulata and if so move to the incubating infection state. From the incubating state an animal may either become clinically infected or move straight into the carrier state, the probability of this being variable and dependent on age (κ(a)). Cattle that survive initial infection become carriers, and remain in that state until death. In this study the definition of the carrier state is the ability of an infected and recovered host to infect ticks, which are then able to transmit the parasite to susceptible animals (Norval et al. Reference Norval, Perry and Young1992).

A previous study investigating T. annulata in Tunisia (Darghouth et al. Reference Darghouth, Bouattour, Ben, Kilani and Brown1996), found that the risk of disease was age dependent, with older aged animals more likely to become clinically infected at first exposure to T. annulata infection. It was found that the proportion of infections that lead to clinical infection was 12·6% in cattle exposed to 3 or more disease seasons in an area of endemic instability (evidence of past infection <100% in cattle exposed to 4 theileriosis seasons or more) which is a similar situation to that described by the Turkish data (see below). This estimate will increase with age (Norval et al. Reference Norval, Perry and Young1992). For this reason the function κ(a)=1–e^−0·0233a has been used here, representing the increased likelihood of clinical infection at older ages. This function was obtained by assuming that there will be 12·6% of infections resulting in clinical infection at 6 years of age.

Cattle ageing was implemented by realistic age structuring (Schenzle, Reference Schenzle1984) as follows: calves enter the model into the first age cohort (0 years of age) constantly through time; thereafter cattle change age cohorts at the beginning of each calendar year with all cattle being maintained in 1 year cohorts and moved up to the next cohort. Fifty % of cattle are culled on their 1st birthday and then cattle die at a constant rate (0·1987 yr⁻¹) implemented at each year-end with any remaining cattle dying on their 9th birthday. This is implemented in agreement with the age distribution of cattle in Turkey (data not shown). The gender of the cattle is not explicitly modelled: instead it is assumed that 90% of the cattle are female, again in agreement with the Turkish data (data not shown). The birth rate is dependent on the estimated number of female cattle in the population, and is set so that the number of cattle in the herd is kept at a constant value Ω (in this case 1, so that the model can provide an output as proportions).

Infection dynamics

In order to model the flow of T. annulata in the tick and cattle populations, attached immatures, questing adults, and feeding adults are stratified as either susceptible or infected. It has been assumed here that the infection does not have any impact on the behavioural or demographical characteristics of the ticks and consequently this does not have any impact on the previously calculated parameter values for the tick model. Infection in the cattle population is due to infected adult ticks attaching to susceptible cattle, while ticks themselves may become infected as immature ticks when they come into contact with infectious cattle. This approach is based on that described in previous studies (Medley et al. Reference Medley, Perry and Young1993; O'Callaghan et al. Reference O'Callaghan, Medley, Peter and Perry1998), and is modelled through a system of deterministic equations (see Appendix I). Further assumptions related to the infection dynamics of T. annulata that are applied in this study are as follows (1) ticks will attach to infected and susceptible cattle with equal likelihood. (2) Ticks are infected homogeneously; that is, the variation in the level of infectivity between infected ticks is not considered. (3) The period of clinical infection in cattle is the same irrespective of outcome (survival or death).

Infection parameters – parameterization

The infection status of cattle was assessed in the same study as the tick counts. Blood samples were subject to both an immunofluorescence antibody test (IFAT) and a reverse line blot (RLB) test. The tests were implemented between May and September from 2006 to 2008 starting in June 2006 and ending in September 2008. For those samples that received both tests, trends in the prevalence of positive test results did not vary over time either seasonally or annually (not shown). The results of both tests by age are shown in Fig. 5.

Fig. 5. Proportion of cattle test positive by age.

Using the specificity and sensitivity of the RLB (sensitivity=80%, specificity=0·99) and IFAT (Sensitivity=80%, specificity=90%) (Darghouth et al. Reference Darghouth, Sassi, Gharbi, Soudani, Karoui and Krichi2004) an estimate for the true prevalence of infection for the data at each time-point is obtained. The model is then fitted to data using maximum likelihood to obtain estimates for the parameters C_z and π which are the proportion of immature ticks feeding on carrier cattle that become infected, and the probability of infection in cattle due to an attached infected adult tick respectively. The model fit to the data is shown in Fig. 6, with the resulting parameter values shown in Table 2.

Fig. 6. Model fit to infection data, where each panel is an age group showing the estimated prevalence of infection for samples tested for both IFAT and RLB (see text).

In order to obtain estimates of C_z and π, it was necessary to fix the value of C_c, the proportion of ticks that become infected when feeding on clinically infected cattle (=0·1). In the endemic equilibrium state, the majority of cattle are carriers and the period during which cattle are clinically infected is very short. This means that due to the lack of the number of clinically infected cattle and coupled with the short period of infection, it is unlikely that ticks will feed on clinically infected cattle compared to cattle that are carriers, therefore the equilibrium is relatively insensitive to this parameter. However, the impact of this fixed value (C_c) and the other key parameters that describe the transmission of infection between ticks and cattle (C_z, and π) was investigated through sensitivity analysis.

Interventions

Interventions that reduce the tick population are considered. Interventions can either be applied at one time-point, or continuously, and can target either the tick population attached to cattle or in the environment, combining to give 4 basic strategies. In the case of targeting the ticks that are on the cattle, this will represent a situation in which the cattle are sprayed with acaricides, while for the environmental intervention this may represent a similar type of intervention or perhaps the application of rough casting, i.e. plastering of all surfaces with smooth cement to block the cracks and crevices to reduce the size of the ideal environment for the hibernating and questing ticks (Ghosh et al. Reference Ghosh, Azhahianambi and de la Fuente2006).

Four single (one-off) intervention scenarios are described in Table 3. Any intervention that targets ticks of a specific status will affect all the ticks that are in the same location (environment or cattle) and not just those that have been specifically targeted. All ticks in the location are instantaneously reduced by 90%, and then the death rate for these ticks set to 5/tick/day for 30 days following the intervention, before reverting back to their previous levels.

Table 3. Summary of the single (one-off) hypothetical interventions investigated here

The continuous interventions are modelled by increasing the death rates for the whole period of the simulation. Four continuous interventions were investigated for each of the tick population states. As with the one-off interventions the intervention was assumed to be implemented when the targeted tick state was at its maximum size (see timing in Table 3). For each of the interventions the death rate of the targeted tick state was permanently increased to 5/tick/day. Again all these interventions were assumed to have been implemented in 2010.