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Molecular signature of epistatic selection: interrogating genetic interactions in the sex-ratio meiotic drive of Drosophila simulans

Published online by Cambridge University Press:  09 July 2009

LUIS-MIGUEL CHEVIN*
Affiliation:
UMR de Génétique Végétale, Ferme du Moulon, 91190Gif Sur Yvette, France Ecologie, Systématique et Evolution, UMR 8079, Université Paris-Sud, 91405Orsay Cedex, France
HÉLOÏSE BASTIDE
Affiliation:
Laboratoire Evolution Génome et Spéciation, UPR9034, CNRS, 91198Gif-sur-Yvette Cedex, France
CATHERINE MONTCHAMP-MOREAU
Affiliation:
Laboratoire Evolution Génome et Spéciation, UPR9034, CNRS, 91198Gif-sur-Yvette Cedex, France
FRÉDÉRIC HOSPITAL
Affiliation:
INRA, UMR 1313 “Génétique Animale et Biologie Intégrative”, 78352Jouy-en-Josas, France
*
*Corresponding author: e-mail: [email protected]
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Summary

Fine scale analyses of signatures of selection allow assessing quantitative aspects of a species' evolutionary genetic history, such as the strength of selection on genes. When several selected loci lie in the same genomic region, their epistatic interactions may also be investigated. Here, we study how the neutral polymorphism pattern was shaped by two close recombining loci that cause ‘sex-ratio’ meiotic drive in Drosophila simulans, as an example of strong selection with potentially strong epistasis. We compare the polymorphism data observed in a natural population with the results of forward stochastic simulations under several contexts of epistasis between the candidate loci for the drive. We compute the likelihood of different possible scenarios, in order to determine which configuration is most consistent with the data. Our results highlight that fine scale analyses of well-chosen candidate genomic regions provide information-rich data that can be used to investigate the genotype–phenotype–fitness map, which can hardly be studied in genome-wide analyses. We also emphasize that initial conditions and time of observation (here, time after the interruption of a partial selective sweep) are crucial parameters in the interpretation of real data, while these are often overlooked in theoretical studies.

Type
Paper
Copyright
Copyright © Cambridge University Press 2009

1. Introduction

Understanding how selection operates at the gene level is one of the main goals of evolutionary genetics. Most of the current effort to identify positively selected genes involves searching for molecular signatures of selection on neutral polymorphism (Nielsen, Reference Nielsen2005). Indeed, the growth experienced by a beneficial mutation partly affects patterns of polymorphism at linked neutral variants through genetic hitchhiking (Maynard-Smith & Haigh, Reference Maynard Smith and Haigh1974), so neutral loci linked to a locus under selection may be distinguished from loci that evolve under pure neutrality. A popular approach in this context consists of analysing the polymorphism pattern around a candidate region that was previously identified through quantitative trait locus (QTL) analysis or association mapping. In contrast to large-scale genome scans (Nielsen et al., Reference Nielsen, Williamson, Kim, Hubisz, Clark and Bustamante2005; Williamson et al., Reference Williamson, Hubisz, Clark, Payseur, Bustamante and Nielsen2007), which provide a global picture of natural selection, fine-scale studies of this kind allow asking detailed questions about how selection affected peculiar regions, up to the order of the Mb. For instance, Kim & Stephan (Reference Kim and Stephan2002) designed a method to jointly estimate the precise location of the target of selection and the selection coefficient involved, thus yielding more quantitative information than the simple presence of positive selection in a genomic region.

Another appealing possibility would be to use the pattern of polymorphism in a candidate region to investigate the relationship between the genotype, the phenotype and fitness. This step is crucial in order to get an integrated view of evolution and adaptation, since selection only operates at the level of phenotypes, not directly on genes. However, in most cases, the genotype–phenotype–fitness map is extremely complex, and cannot be modelled explicitly without huge simplifying assumptions (Gavrilets, Reference Gavrilets2004, chapter 2). And even then, its underlying parameters are often difficult to estimate empirically.

The best examples of integrated investigations of selection, from the phenotype in natura to the molecular level, mainly focused on QTL with very strong additive effects (Rogers & Bernatchez, Reference Rogers and Bernatchez2005; Hoekstra et al., Reference Hoekstra, Hirschmann, Bundey, Insel and Crossland2006). In such studies, the complexity of the traits compels to use a reductive approach that neglects the interactions that may occur (i) between the focal QTL and other genes that contribute to the trait and (ii) between the focal trait and other traits that contribute to fitness. If there were phenotypic traits whose relationship to fitness was clearly characterized, and the interactions between loci were simple and biologically explicit, then we could address specific questions about the functional interactions of genes under selection using molecular signatures of selection.

Selfish genetic elements are very appealing candidates in that respect. They take profit of the genomic machinery in order to increase their own reproductive success, largely independently (and often at the expense) of the fitness of the host organism (Hurst & Werren, Reference Hurst and Werren2001). Hence, their prevailing phenotype is directly their own fitness (besides possible pleiotropic effects on fertility or viability). They thus allow emitting simple, biologically explicit and empirically testable hypotheses about the genotype–phenotype–fitness map. These hypotheses can in turn be tested by various methods, including molecular signatures of selection.

Segregation distorters (Lyttle, Reference Lyttle1991) are among the best-studied examples of selfish genetic elements. They hijack the process of meiosis (meiotic drive) or gametogenesis such as to be found in more than half of the gametes produced by heterozygous individuals that carry them, thus violating Mendel's law of random segregation. This confers them a strong selective advantage, and hence they can affect neutral polymorphism through the hitchhiking effect (Chevin & Hospital, Reference Chevin and Hospital2006). The molecular mechanisms underlying the drive are usually unknown but likely many. In males, the known driving elements kill or disable the alternative gamete (Lyttle, Reference Lyttle1991). In females, they take advantage of the asymmetry of female meiosis to end up into the egg nucleus. When they act on sex chromosomes in the heterogametic sex, they also modify the sex ratio of the population, in which case they are sometimes called sex-ratio distorters (Jaenike, Reference Jaenike2001).

Here, we study the sex-ratio drive in Drosophila simulans, which has been well characterized genetically. This meiotic drive favours distorter X chromosomes (XSR) against susceptible Y chromosomes in males. At least three independent sex-ratio systems have been found in this species (Tao et al., Reference Tao, Masly, Araripe, Ke and Hartl2007; Jaenike, Reference Jaenike2008). In the most thoroughly analysed case (denoted the ‘Paris’ sex-ratio in TAO et al. (Reference Tao, Masly, Araripe, Ke and Hartl2007) ), the XSR chromosomes have reached high prevalence in southeast Africa and Madagascar (frequency up to 60%), but their effect is now completely suppressed by autosomal and Y-linked suppressors (Atlan et al., Reference Atlan, Mercot, Landre and Montchamp-Moreau1997). Montchamp-Moreau et al. (Reference Montchamp-Moreau, Ogereau, Chaminade, Colard and Aulard2006) investigated the genetic determinism of the ‘Paris’ drive. Using a reference XSR chromosome in a suppressor-free genetic background, they showed that two close genomic regions were both necessary for the drive to occur in the lab, which points towards obligate interaction between the alleles involved in the drive. However, we do not know whether their interaction in the genetic background of the natural populations at the time of their spread was the same as in the drive sensitive genetic context used in the lab. This question can be investigated using molecular signatures of selection.

The polymorphism pattern in the driving region of XSR chromosomes of D. simulans was investigated in two recent studies. Derome et al. (Reference Derome, Metayer, Montchamp-Moreau and Veuille2004) first showed that the Nrg gene located close to the meiotic drive elements of D. simulans exhibits the signature of a selective sweep in the islands of Madagascar and La Réunion. A further study of the sample from Madagascar, using several intragenic markers in the same genomic region, allowed uncovering a spatial pattern consistent with incomplete selective sweeps at two loci (Derome et al., Reference Derome, Baudry, Ogereau, Veuille and Montchamp-Moreau2008). This pattern is reproduced in Fig. 1, including three new markers that were not in Derome et al. (Reference Derome, Baudry, Ogereau, Veuille and Montchamp-Moreau2008). It has three notable features. First, along each of the two causative regions previously identified in the genetic study of Montchamp-Moreau et al. (Reference Montchamp-Moreau, Ogereau, Chaminade, Colard and Aulard2006), the diversity of XSR chromosomes is dramatically reduced relative to that of standard (non-distorter) chromosomes (XST). This is consistent with a strong association of those two regions with the phenotype under study (meiotic drive). Together with the high frequency of the haplotypes associated with the drive, this is also indicative of positive selection (Sabeti et al., Reference Sabeti, Reich, Higgins, Levine, Richter, Schaffer, Gabriel, Platko, Patterson, McDonald, Ackerman, Campbell, Altshuler, Cooper, Kwiatkowski, Ward and Lander2002; Voight et al., Reference Voight, Kudaravalli, Wen and Pritchard2006). Second, the linkage disequilibrium (LD) within each of the candidate regions, and also most notably between them, is very strong as can be seen from both the D′ values and the significance of the Fisher exact test. This feature may have emerged as a result of positive epistasis between the drive loci included in each region. Third, in spite of this (putatively strong epistatic) selection involving two loci only 1 cM apart, the diversity at markers located in between the two regions is high. To understand how selection has shaped this pattern, we need a model with two close loci under selection and varying levels of epistasis.

Fig. 1. Polymorphism pattern in the SR region of D. simulans in Madagascar. (a) Ratio of nucleotide diversities between distorter (SR) and standard (ST) X chromosomes. (b) LD between the markers (in letters), quantified by values of D′ (in bold when equal to 1·0) and P values of Fisher's exact test (white: non-significant, light grey: P<0·05, dark grey: P<0·01, black: P<0·001). Note the high linkage within and between the two candidate regions (letters in bold).

The effect of positive selection at two closely linked loci on neutral polymorphism has been investigated in several recent studies. Kim & Stephan (Reference Kim and Stephan2003) showed that selective sweeps at two closely linked loci have on average less than additive effects on the reduction of heterozygosity at a neutral locus, because the selective interference between the selected loci slow down their dynamics. Chevin et al. (Reference Chevin, Billiard and Hospital2008) further showed that the fine-scale polymorphism pattern around two partially linked loci with independent (multiplicative) effects on fitness can exhibit a spike in diversity in the interval delimited by the selected loci. This occurs because each beneficial mutation can hitchhike a different neutral allele. However, the pattern may be different if there is epistasis between the loci under selection. In the sex-ratio meiotic drive in D. simulans, epistasis is suggested by both the genetic analysis and the strong LD. This genetic system is thus a good example to study the signature of selection at two close loci in the presence of genetic interactions. Because meiotic drive systems are expected to evolve by recruiting interacting elements at linked loci (Crow, Reference Crow1991; Palopoli & Wu, Reference Palopoli and Wu1996), the case is particularly appealing.

In this paper, we investigate the effect of selective interactions on the pattern of neutral polymorphism, in the context of the sex-ratio meiotic drive of D. simulans. We first build a simple model of the interaction between the loci that cause the meiotic drive. This model is used to understand how epistasis between the driving loci influences their LD. Then, we run stochastic simulations using this quantitative framework, to compare the likelihoods of various levels of epistatic interactions between the SR loci, and various scenarios of introduction of the driving mutations on the X chromosome. We focus on the three features of the polymorphism pattern that were emphasized above, because they bear interpretable information. We show that, in a region where several genes have been identified as candidates for selection on a phenotype, the polymorphism pattern can provide more information than the simple presence/absence of selection, and can potentially be enlightening about the fundamental genotype–phenotype–fitness relationship.

2. Methods

Wherever possible we used deterministic numerical computations. However, the evolution of the polymorphism pattern at several neutral loci under the infinite site model of mutation and with complex selection is mathematically intractable, so our analysis mainly relies on stochastic simulations.

(i) A general 2-locus model of sex-ratio meiotic drive

We model sex chromosome meiotic drive favouring X chromosomes against Y chromosomes in males, and determined by two loci (SR1 and SR2) on the X chromosome. Alleles are noted in italics; SR i denotes the mutant, potentially driving allele at locus SRi, whereas sr i denotes the wild allele. Recombination occurs at rate r between SR1 and SR2 in females, consistently with what was shown for D. simulans, but contrary to other meiotic drive systems that have evolved chromosomal inversions (Jaenike, Reference Jaenike2001). The segregation coefficient k i (1/2⩽k i⩽1) is the proportion of X-bearing sperm produced by males that carry only one driving allele SR i. Note that k i is also the proportion of females in their progeny. If we note αi (0⩽αi⩽1) the proportion of Y-bearing sperms eliminated by the meiotic drive due to SR i (starting from equal amounts of X and Y chromosomes), then k i=1/(2−αi). The phenotypic effect of SR i is thus the elimination of a proportion αi=(2k i−1)/k i of Y-bearing sperm, since we assume no pleiotropic effect of meiotic drive genes on viability or fertility (see Discussion section). We note k 12 the segregation coefficient of individuals carrying both driving alleles SR 1 and SR 2 (and α12 accordingly). In the absence of interaction between the SR loci, each allele SR i eliminates a proportion αi of sperms left intact by the other allele SR j, so that the proportions of surviving Y-bearing sperm are multiplicative between the SR loci. When there is also functional interaction between the SR loci, we consider that the proportion of Y-bearing sperm is further reduced by a factor 1−e (0⩽e⩽1) such that in the general case, the fraction of the initial Y-bearing sperms that survive is

(1)
1 \minus \alpha _{\setnum{12}} \equals \lpar 1 \minus \alpha _{\setnum{1}} \rpar \lpar 1 \minus \alpha _{\setnum{2}} \rpar \lpar 1 \minus e\rpar \equals {{\lpar 1 \minus k_{\setnum{1}} \rpar \lpar 1 \minus k_{\setnum{2}} \rpar \lpar 1 \minus e\rpar } \over {k_{\setnum{1}} k_{\setnum{2}} }}

and

(2)
k_{\setnum{12}} \equals {1 \over {2 \minus \alpha _{\setnum{12}} }} \equals {{k_{\setnum{1}} k_{\setnum{2}} } \over {k_{\setnum{1}} k_{\setnum{2}} \plus \lpar 1 \minus e\rpar \lpar 1 \minus k_{\setnum{1}} \rpar \lpar 1 \minus k_{\setnum{2}} \rpar }}.

The term e quantifies the strength of the interaction between SR loci in an explicit way, related to their phenotypic effect (the destruction of Y-bearing sperm). The combined segregation coefficient k 12 then varies from k 1 (for e=0 and k 2=1/2) to 1 (for e=1). This general framework allows considering different cases of interest regarding the genetic determinism of the meiotic drive, from independent effects of both loci (k 1>1/2, k 2>1/2, e=0) to obligate synergistic effects (k 1=1/2, k 2=1/2, e>0). An intermediate relevant case is the interaction of a driving locus with an enhancer locus otherwise neutral (k 1>1/2, k 2=1/2, e>0).

The dynamics at the SR loci can be calculated deterministically. We use labels a, b, c and d, for the two-locus haplotypes SR 1SR 2, SR 1sr 2, sr 1SR 2 and sr 1sr 2, respectively, and denote x hf and x hm the frequencies of any haplotype h among X chromosomes in male and female gametes, respectively. In eggs, the new frequency of haplotype h after one generation is

(3)
\eqalign{x\prime_{h{\rm f}} \equals \overline{x_{h} } \plus 2\delta r\lpar {\overline{\overline{C}} \minus 1\sol 2\overline{C} } \rpar \comma \quad \delta \equals 1 \ {\rm if} \ h \in \lcub b\comma c\rcub \comma }\cr\tab\quad \delta \equals \minus 1 \ {\rm if} \ h \in \lcub a \comma d \rcub }.

where \overline{x_{h} } \equals \lpar x_{h{\rm m}} \plus x_{h{\rm f}} \rpar\sol 2, \overline{\overline{C}} \equals \overline{x_{a} }\, \overline{x_{d} } \minus \overline{x_{c} } \,\overline{x_{b} } and \overline{C} \equals \lpar C_{\rm m} \plus C_{\rm f}\rpar \sol 2. C m=x amx dmx cmx bm is the LD in sperm and similarly C f the LD in eggs. Note that the ‘’ symbol is used here for the sake of clarity of notation, but does not denote an average value in the population, since the sex ratio is not necessarily 1/2.

In males, the X chromosome is maternally inherited, so the genotypic frequencies in males are equal to those among females in the previous generation. Those frequencies are then affected by the meiotic drive, and the new frequencies of haplotypes a, b, c and d among X chromosomes in sperm after one generation are

(4)
\openup2\eqalign{ x\prime_{a{\rm m}} \tab \equals {{2k_{\setnum{12}} x_{a{\rm f}} } \over {2k_{\setnum{12}} x_{a{\rm f}} \plus 2k_{\setnum{1}} x_{b{\rm f}} \plus 2k_{\setnum{2}} x_{c{\rm f}} \plus x_{d{\rm f}} }}\comma \cr x\prime_{b{\rm m}} \tab \equals {{2k_{\setnum{1}} x_{b{\rm f}} } \over {2k_{\setnum{12}} x_{a{\rm f}} \plus 2k_{\setnum{1}} x_{b{\rm f}} \plus 2k_{\setnum{2}} x_{c{\rm f}} \plus x_{d{\rm f}} }}\comma \cr x\prime_{c{\rm m}} \tab \equals {{2k_{\setnum{2}} x_{c{\rm f}} } \over {2k_{\setnum{12}} x_{a{\rm f}} \plus 2k_{\setnum{1}} x_{b{\rm f}} \plus 2k_{\setnum{2}} x_{c{\rm f}} \plus x_{d{\rm f}} }}\comma \cr x\prime_{d{\rm m}} \tab \equals {{x_{d{\rm f}} } \over {2k_{\setnum{12}} x_{a{\rm f}} \plus 2k_{\setnum{1}} x_{b{\rm f}} \plus 2k_{\setnum{2}} x_{c{\rm f}} \plus x_{d{\rm f}} }}. \cr}

We iterated equations (3) and (4) to calculate the deterministic dynamics of the frequency of XSR chromosomes, and that of the LD between the SR loci. The LD was calculated as D′, which is the classical D (covariance between allelic states at two loci) divided by its maximum expected value based on allelic frequencies (Lewontin, Reference Lewontin1995). Specifically, we calculated the expected D′ in males at the generation when the frequency of XSR chromosomes reached 0·6, which is the frequency observed in natural populations of Madagascar. This allowed us to evaluate the influence of the epistasis parameter e on the association between the SR loci.

(ii) Simulation method

To study the influence of selection and epistasis on the polymorphism pattern along the recombining region of the X chromosome that includes the SR1 and SR2 distorter loci, we used forward individual-based stochastic simulations. We used a modified version of the program used in Chevin et al. (Reference Chevin, Billiard and Hospital2008), which can simulate several DNA sequence fragments (‘markers’) with mutation within fragments (under the infinite site model) and recombination within and between fragments. Two markers were placed such as to include each of the SR loci (the causative loci were considered to be restricted to a single nucleotide). Another marker was placed in the middle of the SR1–SR2 interval. For each marker, we generated the initial neutral polymorphisms for all the X chromosomes in the population by coalescence simulations using the program ‘ms’ (Hudson, Reference Hudson2002), since coalescence theory remains a good approximation when the sample size is close to the effective population size (Wakeley & Takahashi, Reference Wakeley and Takahashi2003). We assumed that the sex ratio was unbiased before the introduction of the meiotic drive allele(s), so that the size of the population of X chromosomes was N X=3N e, where N e is the effective population size. For each fragment, we simulated 3N e sequences using ‘ms’, with the mutation parameter θ and the recombination parameter ρ defined at the scale of the entire fragment (rather than per nucleotide), as is common practice when using the infinite site model (see for instance Hudson (Reference Hudson2002) and Przeworski (Reference Przeworski2002) ). Empirical estimates of ρ and θ suggest that ρ is roughly twice as large as θ in normally recombining genomic regions of D. simulans (Kliman et al., Reference Kliman, Andolfatto, Coyne, Depaulis, Kreitman, Berry, McCarter, Wakeley and Hey2000), so we used θ=3 and ρ=6, which roughly corresponds to 300 bp long sequences. Then, the selective sweeps at the meiotic drive loci SR1 and SR2 were simulated forward in time. Recombination occurred in females only, at rate r=ρ/(2N e). Segregation distortion occurred in males, as described in the Model section. We assumed that the driving alleles had no deleterious effects on fertility or viability (such an effect would be mostly equivalent to decreasing the strength of the drive). Mutation occurred in both sexes, at a rate μ=θ/3N e. We used an effective population size of N e=10 000. This value is lower than the actual effective size usually reported for fruit flies, and was chosen because it was tractable in individual-based forward simulations. Nevertheless it may not affect our result strongly, since we used relevant values of the population parameters for recombination and mutation inside each fragment. Hence the main consequence of using a small population size in our context is to increase the amount of drift, thus limiting the strength and duration of signatures of selection. This could affect our results quantitatively to some extent, but not qualitatively.

The various simulations differed in the parameters of the meiotic drive (k 1, k 2 and e). The simulations also differed in the scenarios regarding driver alleles at SR1 and SR2, which could be introduced either (i) together on the same haplotype (which represents a migration event from another population), or (ii) separately in time (delayed). In all cases, simulations, where either of the alleles was lost, were discarded as in Chevin et al. (Reference Chevin, Billiard and Hospital2008). When the driving alleles appeared by mutation, they were introduced in five copies in order to decrease computation time. This does not affect the generality of the results (see Chevin et al. (Reference Chevin, Billiard and Hospital2008) ), and relies on the fact that a beneficial mutation that is fated to fixation (i.e. conditional on ultimate fixation) rises quickly in frequency (Barton, Reference Barton1998). In the case of delayed appearance, SR 2 was present but behaved neutrally before the introduction of the driving allele at SR1. Hence SR2 was taken to be one of the neutral polymorphic sites from the ‘ms’ simulation, at which the derived allele was chosen to be the driving allele.

We cancelled the meiotic drive effect when the pooled frequency of distorters – regardless of their quantitative effects – among X chromosomes reached 0·6, the value observed in the natural population of Madagascar (Atlan et al., Reference Atlan, Mercot, Landre and Montchamp-Moreau1997). This was meant to represent the effect of rapidly invading drive suppressors on the Y chromosomes and/or on autosomes (Atlan et al., Reference Atlan, Capillon, Derome, Couvet and Montchamp-Moreau2003), or a frequency-dependent disadvantage of XSR in fertility (Taylor & Jaenike (Reference Taylor and Jaenike2002), see Discussion section). The population was then left to evolve for an additional 200 generations, and 25 samples were drawn from each simulation every 50 generations, from which statistical measures were made. Samples consisted of 10 XSR and 5 XST chromosomes as in Derome et al. (Reference Derome, Baudry, Ogereau, Veuille and Montchamp-Moreau2008).

(iii) Likelihood of scenarios

Our aim was to find which genetic scenario was the most consistent with the observed polymorphism pattern in the region. We chose to study two realistic cases of interest regarding the interaction between SR loci. The first case is obligate interaction of the meiotic drive elements, whereby none has an effect of its own (k 1=0·5 and k 2=0·5), as observed in the lab against standard Y chromosomes. In the second case, SR1 is a meiotic drive locus, whose effect is possibly enhanced by SR2 (otherwise neutral). In this scenario, we chose k 1=0·75 (and still k 2=0·5). This other scenario is consistent with the fact that many meiotic drive systems are thought to evolve by recruiting interacting elements at linked loci during their spread in a population (Crow, Reference Crow1991). Within each of these qualitatively distinct genetic interaction schemes, several values of the epistasis parameter e were simulated (from e=0·33 to e=0·89, corresponding under obligate interaction to k 12=0·6 and k 12=0·9, respectively). Hence, we assessed both the qualitative and quantitative influences of epistasis on the likelihood of the data. We also assessed the importance of the time since the meiotic drive effect stopped. We contrasted the two scenarios of introduction of the SR alleles presented in the ‘Simulation methods’ section (either together on the same haplotype, or one after the other at different generations), since those correspond to two extreme cases regarding the initial LD between SR1 and SR2.

In analysing the polymorphism pattern, we focused on the three features described in the introduction. First, Derome et al. (Reference Derome, Baudry, Ogereau, Veuille and Montchamp-Moreau2008) showed that diversity is very low in XSR chromosomes relative to the standard chromosomes at two regions involved in the sex-ratio distortion (Fig. 1). Defining R π=π(SR)/π(ST) as the ratio of nucleotide diversities of distorter over standard X chromosomes, our first criterion was then R π=0 for the markers that include SR1 or SR2. The proportions of simulations satisfying the criterion for each locus yielded probabilities P_{{\rm SR}_{\setnum{1}} } and P_{{\rm SR}_{\setnum{2}} }, respectively.

The second feature was the LD between the SR loci, measured by D′. Derome et al. (Reference Derome, Baudry, Ogereau, Veuille and Montchamp-Moreau2008) found strong LD between the two SR candidate regions (D′=1, see Fig. 1). In our simulation results, we treated each of the two markers encompassing the SR loci as a biallelic locus, by considering the most frequent haplotype against all the others. This gave a measure of D′. Then we calculated P LD as the proportion of simulations satisfying the criterion D′=1.

The third feature was the relative nucleotide diversity at markers located between the SR loci, in the middle of the interval, which we denote R π(m). In the data R π(m)≈1, so the third probability we calculated was P m, the proportion of simulations with R π(m)⩾1.

Finally, we scored the likelihood as the joint probability of all the above-mentioned events, namely Λ=Pr((R π(1)=0) and (R π(2)=0) and (R π(m)⩾1) and (D′⩾1)). Note that this is not equal to the product of the above-mentioned probabilities, since some of these events may be strongly correlated.

3. Results

To elucidate how selection and epistasis may have shaped the polymorphism pattern in X chromosomes of D. simulans, we proceeded in three steps. First, we used deterministic recursions to investigate how epistasis influences the expected LD between the selected loci in this context. This allowed us to assess what type of interaction between the SR loci could lead to high LD between them. Second, we simulated the evolution of neutral polymorphism across the region that encompasses the driving loci, in order to contrast two scenarios of introduction of the driving alleles: either simultaneously on the same haplotype, or at different generations on two distinct chromosomes. The polymorphism pattern was averaged over many replicate simulations for each scenario. This did not however account for the stochasticity of population genetics, which may produce outcomes different from the expected ones. Therefore in the third and final part, we calculated the probability of the observed polymorphism pattern for several values of epistasis and modes of introduction of the driving alleles, in order to identify which scenario is the most consistent with the molecular data.

(i) Epistasis and LD

The high LD between the regions involved in the sex-ratio drive of D. simulans in the natural population of Madagascar (Fig. 1b) suggests that epistatic interactions exist between the genes underlying the drive. However, this does not necessarily imply obligate interaction of the SR loci as observed in the lab against standard chromosomes (Montchamp-Moreau et al., Reference Montchamp-Moreau, Ogereau, Chaminade, Colard and Aulard2006). Obligate interaction would imply that SR 1 and SR 2 both drifted neutrally before they reached high frequency and recombined together, which may seem like an unlikely assumption. Alternatively, the high LD may have been caused by less extreme interaction, as occurs for instance when SR 2 is an enhancer allele. We used deterministic numerical recursions to assess how likely it is to observe high LD under various types of epistasis. Figure 2 plots the LD (measured as D′) when the frequency of XSR chromosomes reaches 0·6, the value observed in Madagascar, against the epistasis parameter e. The LD between SR loci increases logistically with e. Moreover for a given value of e (except at very low values), D′ increases with decreasing k 1. Indeed, when k 1 is low, most of the effect of the meiotic drive is due to the genetic interaction, so it is a gene combination that is selected, which results in strong LD. As a result, a strong LD between the SR loci (i.e. D′~1) can be achieved over a large range of epistasis values, not only when SR 1 does not drive on its owns (obligate interaction of SR loci) but also when its own drive effect is moderate (for instance when k 1=0·6, for 0·4<e<1, which correspond to k 12⩾0·7, Fig. 2). Therefore in the following, we compare the case of an enhancer locus with that of obligate interaction between the SR loci.

Fig. 2. Epistasis and LD: the expected LD between SR1 and SR2 (measured as D′) when the frequency of XSR chromosomes reaches 0·6 in the population is plotted against the value of the epistasis parameter e. Results were obtained by recursions of equations (3) and (4), with population size N=10 000, and the driver alleles introduced simultaneously in one copy on different haplotypes. Dashed line: k 1=0·5, k 2=0·5 (obligate interaction), thin line: k 1=0·6, k 2=0·5 (SR2 enhancer), heavy line: k 1=0·75, k 2=0·5 (SR2 enhancer).

(ii) Average polymorphism pattern

Beside the strong LD between regions involved in the sex-ratio distortion, the X polymorphism in the Malagasy populations of D. simulans exhibits a striking pattern, with reduced R π=π(SR)/π(ST) at the causative regions, but a high R π in between. We investigated this pattern using forward stochastic simulations. Their results (averaged over 500 replicates) are shown in Fig. 3 in the case of obligate interaction between the loci, with a low level of drive (k 12=60%). Distinctive patterns emerge depending on the scenario of introduction of the driver alleles.

Fig. 3. Example of simulated polymorphism pattern close to the SR loci: the ratio R π of nucleotide diversities between XSR (driver) and XST (non-driver) chromosomes is plotted against the location along the chromosome (in cM, the location of the first driving locus SR1 is set to 0, the second locus SR2 is at 1 cM). Values are averaged over 500 simulations under obligate interaction (k 1=k 2=0·5), and with low combined effect of the SR loci on the meiotic drive (e=0·33, k 12=0·6). (a) Both driving alleles introduced together on the same haplotype, (b) driving allele at SR2 drawn from the standing genetic variation. T: time after the interruption of the selective sweeps.

If both driver alleles are introduced together on the same haplotype (Fig. 3a) – thus mimicking migration – then the diversity in XSR when the meiotic drive effect stops (T=0) is strongly reduced relative to XST chromosomes in the whole SR1–SR2 interval. This reflects the propensity of this region to behave functionally like a single locus as a consequence of the obligate interaction between the SR loci, even if the level of drive is moderate. After the meiotic drive effect has stopped, the frequency of XSR chromosomes (i.e. SR 1SR 2 genotypes) drifts in the population, and recombination shuffles neutral polymorphisms between XSR and XST backgrounds, thus increasing the ratio R π. Note however that with obligate interaction, at least two recombination events are required to introduce new polymorphisms on XSR chromosomes in this region.

The pattern is quite different when SR 2 exists in the population and drifts neutrally before SR 1 is introduced by mutation (Fig. 3b). In such a case, selection of both SR 1 and SR 2 is triggered by the recombination event(s) that bring(s) them together. During the selective sweep, XSR chromosomes (SR 1SR 2 genotypes) can recombine with several of the sr 1SR 2 chromosomes that are in non-negligible frequency in the population (frequency drawn from the neutral distribution under the infinite site model (Ewens, Reference Ewens2004)). These single recombination events introduce new polymorphisms in the SR 1SR 2 genotypic class, thus increasing the ratio R π within the [SR1–SR2] interval relative to the case in Fig. 3a. Similarly, R π at SR2 at the end of the selective sweep is also higher than in Fig. 3a, since several haplotypes carrying the SR 2 mutation may have swept to high frequency. The presence of several different haplotypes carrying the SR 2 mutation at the beginning of the sweep makes the selective sweep at SR2 similar to a ‘soft sweep’ from the standing genetic variation (Innan & Kim, Reference Innan and Kim2004; Hermisson & Pennings, Reference Hermisson and Pennings2005; Przeworski et al., Reference Przeworski, Coop and Wall2005), a particular case of ‘traffic’ selection (Kirby & Stephan, Reference Kirby and Stephan1996) where the alleles under selection are at the same site, and are identical by descent. Here, however, contrary to the usual ‘soft sweep’ models, selection of the SR 2 allele is controlled by its genetic background rather than by the environment: only the copies of SR 2 associated with a SR 1 allele become selected, while the others remain effectively neutral.

(iii) Likelihood of evolutionary scenarios

The simulation results described above are averaged over many replicates, and allow comparing models and data qualitatively, not quantitatively. They do not account for the stochasticity in the population genetics processes involved and in the sampling. Since stochasticity may cause the observed pattern to differ substantially from the expected one, we also calculated the probability to observe the polymorphism pattern under the various scenarios presented above and for various levels of epistasis.

The proportions of simulations (P) that satisfied each of the criteria defined in the Methods section are shown in Fig. 4, using a colour plot (with lighter colour for higher values). Maximum and minimum values are also indicated. As seen in the first row of Fig. 4, the probability of a high value of D′ between SR1 and SR2 at the end of the sweep is high under the four situations presented, and decreases with time as recombination events accumulate. In the case of obligate interaction (columns 1 and 3), epistasis also influences the LD: higher values of e induce higher P LD at the time when meiotic drive is interrupted, and even afterwards, as is apparent from the inclined iso-P LD in Fig. 4 under obligate interaction.

Fig. 4. Likelihood of the polymorphism pattern. Each figure shows the proportions of simulations (Probabilities P …) that satisfied each of the criteria defined in the Methods section, where the ordinate is the strength of the epistatic interaction e between SR1 and SR2, and the abscissa is the time T after the end of the meiotic drive effect. Lighter colours correspond to higher values, and the minimum and maximum values are indicated for each plot. On each line, the maximum value over all conditions is written in bold characters. Probabilities are that: P LD: the scaled LD D′ between the markers that carry the SR loci equals 1; P_{SR_{\setnum{1}} } or P_{SR_{\setnum{2}} }: the relative diversity R π is zero at the haplotypes carrying the SR loci; P m:R π in the middle of the interval is greater than 1; or Λ: all those criteria are satisfied together. ‘Coupling’: introduction of the driver alleles at SR1 and SR2 on the same haplotype; ‘SR 2 from standing variation’: SR 2 is a neutral (derived) allele drawn from the background variation at the beginning of the simulation. Parameters are as described in the ‘Simulation method’ section.

The trend for P_{SR_{\setnum{1}} } is very similar to that for P LD, but there is less variation between scenarios (columns) and between parameter values within each scenario. Indeed, SR1 always experiences strong selection through its effect on the meiotic drive, so a strong signature of selection at SR1 is a general outcome of all the scenarios considered here. For the reason explained above, the epistasis parameter e has also more influence on the signature at SR1 under obligate interaction.

Consistent with the results of the qualitative approach, the high relative diversity between the SR loci is very difficult to obtain under all scenarios, as can be seen by the very low values of P m. Indeed, in all the scenarios investigated, the epistatic interaction (and the strong initial LD in the ‘coupling’ case) leaves little opportunity for the selective sweeps at SR1 and SR2 to interfere in their hitchhiking effects, as described in Chevin et al. (Reference Chevin, Billiard and Hospital2008). However in all cases, P m increases sharply after the selective sweeps are interrupted (a 30+ fold increase from T=0 to T=200 in the first column), as a consequence of recombination with single mutant genotypes (SR 1sr 2 or sr 1SR 2). Higher P m values are reached under the ‘soft sweep’ scenario, due to the traffic selection of several haplotypes. Comparing the modes of interaction between SR loci shows that P m is higher when SR2 is an enhancer of the drive than with obligate interaction. Indeed in such a case, recombination events that produce SR 1sr 2 genotypes also increase R π.

Diversity at SR2 is the most variable feature of the polymorphism pattern. For instance, when the selective sweeps stop (T=0), P_{SR_{\setnum{2}} } \equals 0{\cdot}95 under obligate interaction with initial coupling, whereas P_{SR_{\setnum{2}} } \equals 0{\cdot}17 in the enhancer case with selection from the standing genetic variation. Besides, the influence of the epistasis parameter e on P_{SR_{\setnum{2}} } depends on the scenario: P_{SR_{\setnum{2}} } is most sensitive to e in the case of obligate interaction and selection from the standing variation (soft sweep or traffic selection). Those results can be interpreted as follows. SR 2 is necessary for the drive to occur only in the case of obligate epistasis. When SR 2 is an enhancer allele, the signature of selection at SR2 can be strong only if SR 2 is recruited early in the course of the sweep at SR1. If SR 2 is already present when SR 1 is introduced in the population, then it can combine earlier with a SR 1 background and become selected, which may strengthen the signature of selection at SR2. However, the larger the initial number of SR 2 copies in the population, the higher the probability of trafficking, and so the weaker the signature of selection at SR2. This latter effect dominates, and so the probability P_{SR_{\setnum{2}} } to observe no diversity at the marker located at SR2 is low in this case.

The global likelihood Λ gives the probability to jointly observe all the features of the polymorphism pattern. Its behaviour depends on the scenario and on the type of interaction. In the case of obligate interaction between the SR loci, when SR 1 and SR 2 are initially on the same haplotype, Λ mainly reflects the behaviour of P m, which indeed is the most variable feature in this context (column 1 in Fig. 4). In this case, the time T after the end of the meiotic drive mainly determines the probability to observe the data, since with increasing T more diversity is introduced by recombination between SR1 and SR2. In all other cases, the global likelihood Λ depends in a complex way on the interaction of all the previously described probabilities, so it cannot be predicted directly by their product (not shown). For instance, for a ‘soft’ sweep at SR2 under obligate interaction, Λ is maximized for intermediate values of epistasis and older sweeps. The pattern is even more complex in the ‘enhancer’ case: intermediate values of e and of T are favoured if SR 1 and SR 2 are introduced on the same haplotype, whereas low values of both T and e are favoured if SR 2 is introduced first. Indeed in this latter case P_{SR_{\setnum{2}} } is the most variable feature (fourth column in Fig. 3), such that T close to 0 is favoured. Among all the cases studied here, the most consistent with the data would be those where both driving loci are necessary for the drive (i.e. the ‘obligate interaction’). The case where both driving alleles are introduced together on the same haplotype seems more likely, although we lack power to rule out the possibility that SR 2 was introduced first. Hence, the diversity between the SR loci on XSR chromosomes seems to have been introduced by recombination events that occurred after the meiotic drive effect had stopped, rather than through the effect of two interfering selective sweeps as in Chevin et al. (Reference Chevin, Billiard and Hospital2008). A purely enhancer SR2 locus is not sufficient to cause substantial reduction of diversity at SR2 in the context we studied here.

4. Discussion and conclusions

We studied the polymorphism pattern in the SR region of the X chromosome of D. simulans, where two genomic regions putatively interact to cause sex chromosome meiotic drive in the natural populations of Madagascar. Using stochastic forward simulations, we investigated what type and strength of epistatic interactions were the most consistent with the observed polymorphism data. We showed that, under simple scenarios, despite the high diversity between the candidate regions for the drive, the polymorphism pattern was best explained by strong obligate epistasis between the SR loci, which is consistent with what was otherwise observed in the lab using a peculiar X–Y pair of chromosomes (Montchamp-Moreau et al., Reference Montchamp-Moreau, Ogereau, Chaminade, Colard and Aulard2006).

That the diversity in-between the candidate regions for the meiotic drive is as high in XSR as in XST chromosomes seems at first contradictory with strong positive epistasis between two close loci under selection. However, if the selective sweeps at the driver loci have been interrupted in their course, recombination has had opportunity to shuffle polymorphisms between XSR and XST chromosomes after selection has stopped. Hence, the polymorphism pattern in this case may reflect recombination events that took place not only while the mutations were sweeping through the population, but also afterwards, contrary to cases of completed selective sweeps. Our result do not allow to conclusively decide which scenario is most likely between the introduction of both driver alleles on the same initial haplotype, or the presence of one of the driver alleles in a neutral state in the population before the introduction of the driver allele at the other locus. The presence of several haplotypes at intermediate frequencies between the candidate regions for the drive on XSR chromosomes (Derome et al., Reference Derome, Baudry, Ogereau, Veuille and Montchamp-Moreau2008) seems more consistent with this second possibility.

Here, we assumed that the selective sweeps at the SR loci had been stopped suddenly by suppressors (not explicitly modelled). Another possibility would be that the XSR chromosomes have been held in check by a disadvantage in sperm competition against XST chromosomes, as modelled by Taylor & Jaenike (Reference Taylor and Jaenike2002). Both in the case of suppressors and of sperm competition, the dynamics are expected to be frequency dependent, since opposing mechanisms are triggered by the spread of XSR chromosomes, either through direct competition or as a by-product of the change in the sex ratio (which increases the disadvantage of XSR in male fertility). This frequency dependence was overlooked here for the sake of clarity. On the one hand, the dynamics of a complete suppressor on the Y chromosome is expected to be very quick once the frequency of XSR chromosomes is sufficiently high, such that the spread of the suppressor is well mimicked by instantaneous cancellation of the meiotic drive (results not shown). On the other hand, if the drive had been stopped as a consequence of frequency-dependent deleterious effects, it is not clear how quickly the dynamics of the SR loci would stop. We should, however, point out that sperm competition is expected to impact the dynamics of XSR chromosomes in a restricted range of sex ratio values (combining high male and female mating rates), and to depend on frequency independent factors such as local population density, for instance. In any case, since the time after the end of the drive was expected to affect several features of the polymorphism pattern, we needed to assess the consequences of an interruption of the selective sweeps. That the selective sweeps may have stopped progressively to some extent, instead of suddenly, should not strongly affect our results, at least qualitatively.

We also chose to focus on simple scenarios regarding the type of interaction between the SR loci and the introduction of the driver alleles, which appeared consistent with the current knowledge of the biology of the species and the specificities of this genetic system (Atlan et al., Reference Atlan, Mercot, Landre and Montchamp-Moreau1997, Reference Atlan, Joly, Capillon and Montchamp-Moreau2004; Montchamp-Moreau et al., Reference Montchamp-Moreau, Ogereau, Chaminade, Colard and Aulard2006). The history of the Paris sex-ratio meiotic drive may also have been governed by more complex dynamics. Indeed, meiotic drive elements induce genetic conflicts that can lead to arms races (Hurst et al., Reference Hurst, Atlan and Bengtsson1996; Hurst & Werren, Reference Hurst and Werren2001), in which meiotic drive genes that sweep through the population are stopped by suppressors on the Y chromosomes and on autosomes, before being followed by another bout of meiotic drive and subsequent suppression. Such an antagonistic intragenomic coevolution seems to be confirmed by the existence of two other sex-ratio systems in the same species, which are apparently independent of the one studied here, and likely suppressed in natural populations (Tao et al., Reference Tao, Masly, Araripe, Ke and Hartl2007; Jaenike, Reference Jaenike2008). Hence, one alternative to the scenarios considered here could be that a distorter allele at one of the loci was stopped in its course by (a) suppressor gene(s), and then restored in its drive ability by an enhancer allele at the other locus. The outcome of this scenario may be similar to some extent to the ‘soft sweep from the standing genetic variation’ (or ‘traffic’) scenarios considered here, except that the driving allele already present in the population would have been selected in a recent past instead of being neutral. This would be consistent with the low relative diversity found around the two drive loci. It may also be possible that each locus had an effect of its own on meiotic drive, besides their combined effect through their genetic interaction. However in this case, there is only a small subset of parameter values that allows both driver alleles to reach similar frequencies simultaneously, and even then the likelihood of the data remains far below the values reported here (not shown). Finally, we could also envision less parsimonious scenarios involving balancing or negative selection at another locus between the SR loci to explain the high relative nucleotide diversity observed in this region. One interesting situation in that respect would be the one where a deleterious mutation linked to one of the distorter alleles would favour recombination to purge XSR chromosomes from their load. This is particularly appealing since one of the two-drive locus in the Paris sex-ratio system is associated with a segmental duplication containing several genes (Montchamp-Moreau et al., Reference Montchamp-Moreau, Ogereau, Chaminade, Colard and Aulard2006).

Finally here, the structure of the data allowed asking questions of interest, since it combined polymorphism information around two (previously demonstrated) selective sweeps that had not reached fixation (which allowed using the LD together with diversity measures), with phenotypic information about meiotic drive in the lab. Yet there were not enough degrees of freedom to estimate all possibly relevant parameters together (individual segregation coefficients k i, epistatic interaction, possible delay between the introduction of the driving mutations, time since the end of the selective sweep). Instead, this study allowed comparing markedly different realistic scenarios and gave hints to guide further investigations in the lab or in natura. Indeed, the ideal data to study epistatic interaction with a population genetics perspective would imply serial measures of temporal variations in allelic frequencies and LD. While this is difficult to acquire, it may be easier to compare several populations in which it is suspected that the selected genes have been introduced at different times. This should be possible in the case of the Paris sex-ratio system of D. simulans, because a spread of distorter alleles is likely in progress from an African location in this worldwide species (Derome et al., Reference Derome, Metayer, Montchamp-Moreau and Veuille2004, Jutier et al., Reference Jutier, Derome and Montchamp-Moreau2004).

We hope that this work illustrates how well chosen molecular data can indeed help deciphering gene by gene interactions, as already emphasized in recent papers (Caicedo et al., Reference Caicedo, Stinchcombe, Olsen, Schmitt and Purugganan2004; Derome et al., Reference Derome, Baudry, Ogereau, Veuille and Montchamp-Moreau2008), and guide further experimentation. Future work will tell whether it is possible to quantitatively estimate the strength of genetic interactions for fitness using molecular population genetic data, and to compare those estimates with measures obtained in the lab. The present paper is a first step in this direction, which will hopefully motivate other attempts in the future.

We thank Michel Cazemajor, Xavier Vekemans and Sylvain Billiard for helpful discussions throughout this project, and two anonymous reviewers for comments that helped improving the quality of this manuscript. L.-M. C., C. M.-M. and F. H. were supported by the ANR-06-BLAN-0128 grant from the Agence Nationale de la Recherche.

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Figure 0

Fig. 1. Polymorphism pattern in the SR region of D. simulans in Madagascar. (a) Ratio of nucleotide diversities between distorter (SR) and standard (ST) X chromosomes. (b) LD between the markers (in letters), quantified by values of D′ (in bold when equal to 1·0) and P values of Fisher's exact test (white: non-significant, light grey: P<0·05, dark grey: P<0·01, black: P<0·001). Note the high linkage within and between the two candidate regions (letters in bold).

Figure 1

Fig. 2. Epistasis and LD: the expected LD between SR1 and SR2 (measured as D′) when the frequency of XSR chromosomes reaches 0·6 in the population is plotted against the value of the epistasis parameter e. Results were obtained by recursions of equations (3) and (4), with population size N=10 000, and the driver alleles introduced simultaneously in one copy on different haplotypes. Dashed line: k1=0·5, k2=0·5 (obligate interaction), thin line: k1=0·6, k2=0·5 (SR2 enhancer), heavy line: k1=0·75, k2=0·5 (SR2 enhancer).

Figure 2

Fig. 3. Example of simulated polymorphism pattern close to the SR loci: the ratio Rπ of nucleotide diversities between XSR (driver) and XST (non-driver) chromosomes is plotted against the location along the chromosome (in cM, the location of the first driving locus SR1 is set to 0, the second locus SR2 is at 1 cM). Values are averaged over 500 simulations under obligate interaction (k1=k2=0·5), and with low combined effect of the SR loci on the meiotic drive (e=0·33, k12=0·6). (a) Both driving alleles introduced together on the same haplotype, (b) driving allele at SR2 drawn from the standing genetic variation. T: time after the interruption of the selective sweeps.

Figure 3

Fig. 4. Likelihood of the polymorphism pattern. Each figure shows the proportions of simulations (Probabilities P …) that satisfied each of the criteria defined in the Methods section, where the ordinate is the strength of the epistatic interaction e between SR1 and SR2, and the abscissa is the time T after the end of the meiotic drive effect. Lighter colours correspond to higher values, and the minimum and maximum values are indicated for each plot. On each line, the maximum value over all conditions is written in bold characters. Probabilities are that: PLD: the scaled LD D′ between the markers that carry the SR loci equals 1; P_{SR_{\setnum{1}} } or P_{SR_{\setnum{2}} }: the relative diversity Rπ is zero at the haplotypes carrying the SR loci; Pm:Rπ in the middle of the interval is greater than 1; or Λ: all those criteria are satisfied together. ‘Coupling’: introduction of the driver alleles at SR1 and SR2 on the same haplotype; ‘SR2 from standing variation’: SR2 is a neutral (derived) allele drawn from the background variation at the beginning of the simulation. Parameters are as described in the ‘Simulation method’ section.