Insect biology and resistance

Helicoverpa armigera and H. punctigera are common pests of cotton in Australia, and while H. punctigera is a native [32], H. armigera now has a worldwide distribution [33]. Adults are capable of long-distance migration [34], but most H. armigera within agricultural landscapes disperse <10 km, whereas H. punctigera often fly >10 km [35]. Emerged females produce a sex pheromone that attracts potential male partners, and females may mate with multiple partners over the course of their lives [36, 37]. Although females may produce up to 1500 eggs in a lifetime [38, 39], most of these die in a density-independent manner, so we assume that females produce F = 50 surviving eggs; thus, the greatest possible increase in the population size from one generation to the next is 25 (after accounting for a 50:50 sex ratio). Finally, H. armigera, and to a lesser extent H. punctigera, may enter diapause in the pupal stage towards the end of the summer depending on temperature and light [40].

In addition to cotton, H. armigera has a broad host plant range which includes some native species but mostly exotics (e.g., the introduced weed Paterson’s curse, Echium plantagineum) and crops often planted near cotton: pigeon and chick peas, sorghum, maize, and to a much lesser extent cereals (wheat, barley) [41, 42]. Preference of H. armigera for several crops has been measured in bioassays [43–45]; when females are presented with chick peas, pigeon peas, maize, sorghum and cotton, the proportions of the females that oviposit are 0.98, 0.90, 0.70, 0.57, and 0.40 [45]. For cereals and native vegetation, we assume values of 0.10 and 0.01. The H. punctigera host plant range includes many natives (e.g., everlasting daisies, Rhodanthe floribunda) and introduced plant species; however, it is rarely found on monocotyledonous plants such as maize, sorghum, or cereals [32]. Therefore, we assume H. punctigera has the same preferences as H. armigera for the dicotyledonous crop plants but does not breed from monocots, and we assume that H. punctigera has a broader host range of native species (Table 1). Although we used fixed values for oviposition preference, we acknowledge that preferences change with crop stages, seasonal fluctuations, and climatic conditions.

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Table 1. Baseline Helicoverpa preferences and seasonal availability for different habitat types.

https://doi.org/10.1371/journal.pone.0169167.t001

Densities of larvae in refuges will be substantially higher than in Bt fields, and this will likely lead to higher mortality rates due to density-dependent predation and parasitism, cannibalism, and, for unmandated crop refuges, insecticide or virus applications used to control outbreaks of Helicoverpa and other pests. For models including density-dependent larval survival, we assume that the relative strength of density dependence varies among habitats according to the preference that females show for oviposition. Thus, since the preference of H. armigera females for chick peas is 2.45 (= 0.98/0.40) times greater than for cotton, we assume that the survival of larvae in chick peas is the same as the survival in cotton when the density of eggs oviposited in chick peas is 2.45 times that in cotton. This assumption means that the potential production of pupae from different habitats scales with the oviposition preference that females show for these crops; a field of chick peas can produce the same number of adult moths as a cotton field that is 2.45 times larger. This scaling only affects the relative strength of density dependence among habitats. In the model, the overall strength of density-dependent mortality is determined by the population density: at the population level, the strength of density dependence is whatever is required to give a long-term per capita population growth rate of zero.

Since 2004 roughly 80% of the cotton planted in Australia has been Bollgard II which protects against Helicoverpa. Bollgard II is a two-toxin pyramid consisting of Cry1Ac and Cry2Ab. While the toxicity of these two toxins varies through the growing season (cotton development stage), Cry1Ac is generally the less toxic, and we use relative survivals of susceptible H. armigera and H. punctigera genotypes of s_1SS = 0.15 and s_2SS = 0.05 for Cry1Ac and Cry2Ab, respectively. Because both toxins are expressed in moderate to high doses, resistance is expected to take the form of single diallelic genes that are largely recessive; we assume a dominance of h = 0.05, leading to relative survivals of resistance-susceptible (RS) genotypes on single toxin plants equal to h s_1RR + (1–h) s_1SS = 0.1925 and h s_2RR + (1–h) s_2SS = 0.0975 for Cry1Ac and Cry2Ab, respectively; we assume that resistance of RR individuals is complete, so s_1RR = s_2RR = 1. Finally, for the two-toxin pyramid plants, we assume that survivals are independent (multiplicative), as is expected if toxins have independent modes of action [46]. For example, the survival of an S₁S₁S₂S₂ individual on Bt plants is s_SSSS = s_1SS × s_2SS = 0.0075, and the survival of an R₁S₁R₂S₂ individual is s_1RS × s_2RS = 0.0188. In the cotton-growing region of Australia the current estimated frequencies of alleles conferring resistance against Cry1Ac and Cry2Ab are 0.01 and 0.003, respectively, for H. punctigera, and 0.02 and <0.001 respectively for H. armigera (based on F1 screens: [4, 47] and Downes, unpublished data).

Landscapes

Cotton-growing regions of Australia are characterized by a complex mixture of different crops and land uses (Fig 1). A key component of the Bollgard II resistance management plan in Australia is that unsprayed conventional (non-Bt) cotton or pigeon pea must be planted as mandated refuges, at no less than 10% and 5%, respectively, of the area of Bt cotton. In addition to mandated refuges, a considerable area may be planted in non-Bt crops that serve as unmandated refuges, especially for H. armigera that has the broader host range of crop species (Table 1). A second part of the resistance management plan consists of "planting windows" in which Bt cotton and mandated refuges are planted within a specified 6-week period during the spring. Planting windows are required in latitudinal regions where the relatively aseasonal climate would allow, in the absence of planting windows, crop production year round; elsewhere, only an end date to planting is imposed since its start is restricted by climate [48]. Planting windows are primarily designed to limit the exposure of pests to Bt cotton by leaving a 2 to 3-month period in which Bt fields remain fallow; in principle, this means that there is no selection for resistance during the last two of the possible six annual insect generations per year at our study sites.

We used cotton-growing landscapes from three study sites (Cecil Plains, Nandi, and Pampas) in the Darling Downs situated 200 km west of Brisbane, Queensland, Australia. The three landscapes are each approximately 20 km in diameter and separated by approximately 35 km. Land-use information was characterized for five summer cropping seasons, December-March, from 2009/10 to 2013/14. Crop varieties and planting dates were collected by contacting individual growers from each region every season, and confirmed by visiting fields and ground-checking the details. Field boundaries of crop and non-crop habitat were digitized using the satellite image service base map in ArcGIS 10.2 [49]. Land parcels in the landscape maps were partitioned into 27 different use categories including roads, buildings, water storage and different crops and host plants. The areas of these land parcels were then used to calculate proportions of characteristic land use, host plants, and breeding habitat for H. armigera and H. punctigera for each landscape for each season.

Model

The "Helicoverpa model" is designed around H. armigera and H. punctigera in the Darling Downs cotton-growing region. An important biological difference between species is that H. armigera uses a broader range of crops while H. punctigera can use native vegetation to a greater extent (Table 1); therefore, they have contrasting patterns of fluctuations in Q and K. In addition to the Helicoverpa model, we also analyzed a simplified "general model" that more clearly exposes the role of spatio-temporal variation on the rate of resistance evolution as it might affect other pests.

The Helicoverpa model uses the annual distribution of breeding habitat for each of six generations given in Table 1. So that we can focus on in situ resistance evolution of H. punctigera, we ignored the possibility of long-range migratory behavior into and out of the cotton-growing region [41, 50]. The possible consequences of immigration depend on the details of both the frequency of resistance alleles in the immigrant population and the timing of immigration which affects whether mating occurs [51]. Although immigration could change the rate of resistance evolution (e.g., through diluting resistance alleles), it will not change the impact of spatio-temporal variability and hence the qualitative results. Parts of generations 3–5 can delay development or enter diapause and emerge at the start of the following year; specifically, we assume that the proportions of the H. armigera population in diapause are 0.74, 0.95, and 0.95 in generations 3, 4, and 5; for H. punctigera, these are 0, 0.30, and 0.70.

We ran the Helicoverpa model using landscapes made up of Bt cotton, mandated refuges, and unmandated refuges in the same proportions as calculated for Cecil Plains, Nandi, and Pampas regions. To weight habitats by both oviposition preference and density dependence, we multiplied the area of each habitat by the oviposition preference value; for example, chick pea is weighted by 0.98, and cotton is weighted by 0.40. These weighted values were used to calculate both the proportion Q of the adult female population that oviposits in refuge habitats and the total K of the landscape that is potentially breeding habitat. Thus, a landscape made up of 5% chick pea and 80% Bt cotton would have Q = (0.05*0.98)/(0.05*0.98 + 0.80*0.40) = 0.13 and K = 0.05*0.98 + 0.80*0.40 = 0.37.

The models keep track of both allele frequencies and insect densities, and operate in discrete time with a single time step equal to a generation [8]. The order of life-history events within a generation is male movement among fields, mating, female movement and oviposition, selective mortality of larvae by Bt toxins in Bt fields, and density-independent and density-dependent mortality from sources other than Bt toxins. Mating within fields is assumed to be random, and movement is assumed to be “global”, independent of the spatial arrangement of fields.

We investigated density-dependent survival using three separate models: models L, A, and I. For model L (“larval density”) density-dependent larval survival is given by (1 + a_tx)^–1 where x is the density of larvae within a field, and a_t scales the relative strength of density dependence which can vary from one insect generation t to the next. This equation applies to both Bt and non-Bt habitats, although because the larval density in Bt cotton is reduced by mortality of susceptible larvae, the effect of density dependence is correspondingly less. To scale the total area of habitat, we use the population density that a completely resistant insect population would attain if K were constant; if the total availability of breeding habitat is scaled according to the size of the insect population it can support, this gives a_t = (F/2–1)/K_t. If X_B and X_R represent the relative numbers of larvae in Bt and refuge habitats, then density dependence varies with the densities of larvae in Bt crops and refuges given by X_B/(K_t(1 –Q_t)) and X_R/(K_tQ_t), respectively. Thus, the density-dependent survivals of larvae in Bt crops and refuge are (1 + αX_B/(K_t(1 –Q_t)))^–1 and (1 + αX_R/(K_tQ_t))^–1, where α = (F/2–1).

For model A (“adult oviposition limitation”) we assumed the same effect of density dependence on larvae as in model L. In addition, female fecundity depends on the amount of available habitat. In model L all females lay F eggs, even if the total breeding habitat K decreases between generations; this would require all females to find whatever habitat remains. In model A the effective fecundity of females is proportional to the available breeding habitat, F_t = FK_t/K_max, where K_max is the maximum available breeding habitat. This reduction in fecundity is determined by the overall availability of breeding habitat including Bt crops. Therefore, it gives a density-dependent reduction in the population growth rate for the entire population. Because Helicoverpa and other pests of Bt crops have specialized mechanisms for finding breeding habitat, model A is unlikely to be realistic. On the other hand, model L is also likely to be unrealistic when there are large decreases in the amount of breeding habitat each generation. Therefore, models L and A represent extremes of a continuum, with Helicoverpa likely to fall towards the side of model L.

For model I (“independent of density”), there is no density dependence; the model only keeps track of allele frequencies, not densities. The genetic component of the model is identical to models L and A. Matlab code [52] for the models is available in S1 File.

Helicoverpa model

For the Helicoverpa model, we measured the rate of resistance evolution as the time to resistance failure (>50% individuals are resistant) for Cry2Ab, which is more toxic than Cry1Ac. Resistance to both Cry2Ab and Cry1Ac occur at similar times, because once resistance arises to one toxin, Bollgard II is no longer a two-toxin pyramid. Because resistance can take more than six years, we repeated our 6-year landscape data so that year 7 has the same proportions of crops and other vegetation on the landscape as year 1, etc. We parameterized the model for both H. armigera and H. punctigera using three landscapes in the Darling Downs. Here we present the results for the Cecil Plains landscape, with parallel results for Nandi and Pampas in the Supplementary Information (S1 and S2 Figs).

We considered the case in which there is a strict planting window for Bt cotton and mandated refuges (conventional cotton and pigeon pea), so that these crops are only available to H. armigera and H. punctigera for generations 2–4 (Table 1). A central concern for resistance management is the effective maintenance of the planting window that confines selection to only generations 2–4. Early planting or late emergence of generation 1 could expose insects in that generation to selection, while late harvesting or early emergence of generation 5 could expose that generation to selection. Therefore, we compared the case of strict planting windows to the case in which 10% of Bt and refuge (conventional) cotton was available in generation 1, or 10% of Bt and refuge cotton was available in generation 5.

Considering first the case of model L and strict planting windows, there are strong seasonal patterns in the total available breeding habitat, K, and the proportion of breeding habitat that is mandated and unmandated refuge, Q (Fig 2, black lines). These generate a strong seasonal pattern for the density of eggs laid in refuges. High egg and larval densities increase density-dependent mortality of larvae, which in turn decreases the fitness of susceptible larvae in refuges relative to the fitness of resistant larvae in Bt fields. This leads to strong selection. For H. armigera, the highest density of eggs in refuges occurs in generation 6, which is caused by the drop in K and hence the limited habitat for female oviposition. There is also a secondary peak in egg density in generation 3; the density is greater than in generation 2 due to the population increase with high K, while in generation 4 the egg density decreases due to larvae entering diapause at the end of generation 3. For H. punctigera, peak densities occur in generation 5, because it does not breed on sorghum and maize that are available to H. armigera. For both species, selection for resistance spikes in generation 3 due to little refuge (low Q) and higher density of larvae in refuges. These spikes in selection are particularly high for H. punctigera, because it has less refuge (lower Q) than H. armigera.

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Fig 2. For model L, selection for resistance in H. armigera and H. punctigera under three scenarios about crop planting: (i) cotton (Bt and conventional) is only available in generations 2–4 (black lines); (ii) like (i) but 10% of cotton is also available for generation 5 (red lines and triangles); and (iii) like (i) but 10% of cotton is also available for generation 1 (green lines and circles).

The relative contributions of different crops and native vegetation for each of six years are based on field data from Cecil Plains. The top panels give K, the total available breeding habitat (Bt cotton, mandated refuges, and unmandated refuges) and the next-lower panels give Q, the proportion of breeding habitat that is refuge. Years are demarcated by vertical dashed lines. The 6-year patterns in Q and K are repeated in the simulations, so the values in first generation (first point on the left) arise from the values in the thirtieth generation (last point on the right). The next-lower panels are the log₁₀ densities of eggs in refuges, measured before density-dependent mortality of larvae. The bottom panels give the strength of selection for resistance, Ф_t (Eq 1). For all simulations, F = 50, and habitat preferences are given in Table 1.

https://doi.org/10.1371/journal.pone.0169167.g002

If 10% of cotton (both Bt and convention) remains available in generation 5, there is strong selection for resistance in H. punctigera (Fig 2, red lines) because cotton represents 40–80% of its breeding habitat (Q = 0.6–0.2) and generation 5 experiences high larval densities within refuges due to relatively low total breeding habitat, K. In contrast, H. armigera is little affected by late-season unharvested cotton, because >95% of the population in generation 5 is in diapause, leading to little exposure to Bt and low densities within refuges.

If 10% of cotton becomes available in generation 1, this generates strong selection for resistance in H. armigera (Fig 2, green lines). For H. armigera there is little unmandated refuge in generation 1, so even if only 10% of the cotton crop is available, Q < 0.8, and in the first year of data (2009) Q < 0.2. Furthermore, the very low value of K in the first generation of 2009 leads to high densities of eggs in the little available breeding habitat, causing a high spike in selection. The low Q in 2009 is due to the absence of chick pea planting. Because this single spike in the first generation of 2009 appears to dominate selection over the 6-year period, we also modeled the case in which the values of Q and K for 2009 were replaced by the values from 2013 (S3 Fig); this replacement caused little change in the overall rate of resistance evolution (S4 Fig). Finally, in contrast to H. armigera, for H. punctigera there is little effect of early cotton on selection due to their low densities in refuges.

The role of density-dependent larval mortality in resistance evolution can be shown by comparing the results from model L with those from models A and I (Fig 3). Models A and I also show sizable effects of cotton harvested late or planted early. Late or early cotton not only affects densities of larvae in refuges (which has little effect in model A and no effect in model I), but also influences Q. Indeed, for H. armigera 10% early cotton can halve the time to resistance failure in models A and I, even though this occurs in only 1 of 6 generations per year and only involves 10% of the Bt cotton. Another feature of all three models is that much of the increase in resistance evolution occurs at very low levels of early or late cotton: 1% early or late cotton leads to loss of durability (time to resistance failure) that is roughly half the loss that occurs with 10% early or late cotton. Finally, although larval density dependence exacerbates the effects of early cotton for H. armigera and late cotton for H. punctigera (compare model L with models A and I), the opposite is true for the effect of early cotton on H. punctigera (Fig 3D) in which models A and I show greater reductions in the time to resistance failure than model L. The explanation for this is that, in model L, early cotton causes a decrease in H. punctigera density in refuges in generation 1, because early cotton provides more total breeding habitat (Fig 2); this mitigates the increase in selection caused by reducing Q. In contrast, in models A and I there is no release from selection caused by the increase in density that occurs in model L (S2 Fig). This specific result in which model L shows less sensitivity to early cotton than models A and I illustrates the possible importance of knowing the scale at which density dependence occurs, at the field scale (model L), at the landscape scale (model A), or not at all (model I).

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Fig 3.

Relative time to control failure for H. armigera (A,B) and H. punctigera (C,D) versus the proportion of cotton crop (Bt and conventional) that is either (A,C) available late to generation 5 or (B,D) available early to generation 1. Results are for model L (black lines), model A (dashed blue lines and +'s) and model I (turquoise dashed lines with x's). Time to control failure is given relative to the case of strict cotton cropping that is available to only generations 2–4, with time to control failure given when the allele frequency of resistance to Cry2Ab reaches 0.5. Habitat proportions are given by the landscape at Cecil Plains for 2009–2014, and the habitat preferences for each species are the same as Fig 2.

https://doi.org/10.1371/journal.pone.0169167.g003

The results in Fig 3 are given in terms of relative changes in times to resistance failure; the relative times to resistance are insensitive to initial allele frequencies provided they are moderately low (< 0.01). The models also differ in absolute times to resistance failure, with density dependence reducing times to resistance [8]. Specifically, for H. armigera with initial allele frequencies of 0.01 for Cry1Ac and 0.003 for Cry2Ab, resistance occurs in 188, 296, and 998 generations for models L, A, and I when the proportion of early or late cotton available is 0. For H. punctigera with initial allele frequencies of 0.02 for Cry1Ac and 0.001 for Cry2Ab, resistance occurs in 81, 152, and 339 generations for models L, A, and I.

General model

To illustrate the effect of variation in Q and K for the general case of an unspecified pest, we built general models designed to clarify the roles of spatio-temporal variation on resistance evolution. The general models are similar to the Helicoverpa models but have s_1SS = s_2SS = 0.01 and h₁ = h₂ = 0.05. We investigated the cases for models L, A, and I in which Q varies by itself, K varies by itself, Q and K vary synchronously (high Q occurs with high K), and Q and K vary asynchronously. Variation in Q is generated by fixing Q₁ = 0.05 and increasing Q₂ up to 0.2, while variation in K is generated by fixing K₁ = 1 and decreasing K₂ down to 0.25. Fig 4 shows the time to resistance failure, the strength of selection Ф, and the density of eggs in the refuge before density dependence occurs. The fact that Ф gives a good measure of the strength of selection can be seen by plotting the simulated rate of resistance evolution against the rate predicted from Ф (Eq 2) for all of the models and cases depicted in Fig 4A–4C (Fig 4I).

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Fig 4. For models L, A and I, the effects of variation in Q and/or K for four scenarios: (i) only Q varies, with Q₁ = 0.05 and Q₂ ranging from 0.05 to 0.2 (indicated on the horizontal axis labeled "Variation" which is scaled from 0 to 1 as Q₂ goes from 0.05 to 0.2), while K₁ = K₂ = 1 (solid line); (ii) only K varies, with K₁ = 1 and K₂ in the ranging from 1 to 0.25 (indicated by values of "Variation" ranging from 0 to 1), while Q₁ = Q₂ = 0.05 (dashed line); (iii) Q and K vary asynchronously, with Q₁ = 0.05 and Q₂ ranging from 0.05 to 0.2, and K₁ = 1 and K₂ ranging from 1 to 0.25 (↑Q↓K, dotted line); and (iv) Q and K vary synchronously, as in (iii) but with high values of Q₂ coinciding with high values of K₂ (↑Q↑K, dot-dashed line).

(A-C) give the times to control failure (when resistance allele frequency reaches 0.5) for models L, A, and I, respectively. (D-F) give the strength of selection Ф_t (Eq 1) for four consecutive generations for models L, A and I, respectively, and for scenarios (i)—(iv). (G-H) give the densities of eggs (numbers/[Q_tK_t]) in refuges before density-dependent mortality and averaged over both generations for models L and A, respectively. (I) The predicted relative time to control failure from the approximation giving T_c (Eq 2) and the observed time to control failure for all of the simulated runs for all three models shown in (A-C). Other parameter values are: F = 50, s₁ = 0.01, s₂ = 0.01, and h₁ = h₂ = 0.05.

https://doi.org/10.1371/journal.pone.0169167.g004

Considering first the case of variation in Q (Fig 4, solid lines), for model I increasing variation increases the time to resistance (Fig 4C). This occurs because increasing variation in Q by increasing Q₂ increases the mean of Q from 0.05 to 0.1 when Q₂ = 0.2; variation in Q if the mean is kept the same has no effect on resistance evolution in model I. In contrast, in model L increasing variation in Q decreases the time to resistance. This is caused by a spike in the strength of selection over 60 (Fig 4D), compared to 20 in model I (Fig 4F). The greater selection in model L occurs because the large number of females produced when Q₂ is high leads to high density of eggs in the following generation when Q₁ is low; the resulting increase in density-dependent mortality of larvae in refuges decreases the survival of susceptible larvae and increases the relative fitness of resistant larvae. Model A shows the same results of varying Q as model L, because in model A females cannot distinguish between refuge and Bt fields, and therefore they lay the same number of eggs as in model L.

Variation in K (Fig 4, dashed lines) has no effect in model I, since this model does not include density. In model L it also has little effect on the overall rate of resistance evolution (Fig 4A) and the density in refuges (Fig 4G), even though it leads to fluctuations in selection (Fig 4D). Selection increases in the generation when K is low, because this decreases the density in refuges and hence density-dependent mortality. Nonetheless, in the following generation when K is high, the density in the refuge is low so selection decreases, balancing out the higher selection in the preceding generation. In model A, variation in K increases the time to resistance (Fig 4B). This occurs because when K decreases, the number of eggs produced per female decreases, leading to lower average densities in the refuge. When densities drop to very low levels at high variation in K, there is little density dependence, and model A gives the same times to resistance (Fig 4B) and selection (Fig 4E) as model I that contains no density dependence.

When both Q and K vary, their net effect depends on whether they vary synchronously or asynchronously, and on the model. For model I, because variation in K has no effect, the results when both Q and K vary are identical to the results when only Q varies (Fig 4C and 4F). For model L, when Q and K vary asynchronously (Fig 4, dotted lines), their effects on selection (Fig 4D) largely cancel each other out, because the reduction in the proportion of refuge when Q is low is compensated for by the increase in total area of breeding habitat when K is high. Thus, there is little change in the density in refuges (Fig 4G; the dotted line and the solid line for only Q varying are almost identical). In contrast, when Q and K vary synchronously (Fig 4, dot-dashed lines) their effects are compounded, leading to both rapid resistance and high average densities in the refuge. Although for model L synchronous fluctuations in K compound the effect of variation in Q, in model A the effects of synchronous fluctuations in Q and K are intermediate between the cases of fluctuations in only Q and only K. This illustrates the possible complexities arising from fluctuations in both Q and K, with their combined effects depending on how pests respond behaviorally to changes in breeding habitat K.