Modeling Epistasis for Continuously Variable Traits

In the classical epistasis analysis, triplets of deletion mutants combine with a wild type to form a contrast. Each contrast includes two single mutants and a double mutant. Each is described relative to the known wild type phenotype. A hypothetical example of a trait affected by two genes, A and B, can be described as follows, where y is the trait value, μ is the expected value of the wild type, β_A and β_B are the effects of deleting each gene, and ε is an error term.

This adheres strictly to the classical definition, but there is a clear problem; there is no provision if the double mutant does not fall neatly into the same category as one of the single mutants. Gene expression traits fit poorly into the classical framework for this reason. Expression is continuous and intermediate levels are expected. Furthermore, even normalized trait values will inevitably include some measurement error. For these reasons, the double mutant observation is rarely the same as either of the single mutant observations or the wild type. Previous studies have attempted to circumvent this problem by relying on differences between the mutants to determine the most similar mutant pair. However, the assumption that expression is completely masked is poor. To address these issues, we move away from comparing trait values directly. Instead, we evaluate each deletion according to whether it significantly affects the expression of the target and associate unique patterns of significance with models of gene action.

We use a linear model to estimate the effect of each deletion. This is a general way to relate all mutants and the wild type without making any assumptions about the nature of the double mutant. We regress the trait value (e.g. expression) on indicator variables representing the presence or absence of each wild type allele and an interaction term. The interaction describes effects that are unique to the double mutant. The same example discussed above can be described as follows.

Trait value = Wild Type+Effect of deleting A+Effect of deleting B+Interaction+error

Various techniques can be used to fit such a linear model. We first fit a full model and then use stepwise backwards selection to drop model terms with coefficients that are not significant at a set level. The resulting reduced model is termed the best-fit model. For any trait, there are eight possible best-fit models. For clarity, we number the reduced models as follows:

When the best-fit model has been determined, we estimate parameter values using that model for each trait. Thus, we have a best-fit model and coefficient estimates for each trait. The terms in each best-fit model represent the significant gene and interaction effects acting on that trait. Individual coefficients represent the estimated effect of deleting each gene. Model 7 corresponds to the classical model above when the interaction between the two deletions offsets the effect of one of them, either β_I = −β_A or β_I = −β_B. Model 8 describes the case in which the deleted loci have no effect on the trait.

A best-fit model describes each gene expression trait. As such, we have dealt with the continuous variable problem. However, by embracing a quantitative genetic model we have lost the appealing feature of the classical experiment: the ability to interpret hierarchical relationships. In the following section we identify sixteen hierarchical relationships and propose that a specific best-fit model supports each.

Interpreting Hierarchical Epistasis

In quantitative genetics, the interaction term in the above model is considered epistasis. However, epistasis in this sense includes both hierarchical and nonhierarchical relationships. Conversely, while Model 7 can clearly be interpreted as hierarchical epistasis with the conditions described above, it does not apply to all possible hierarchies.

We considered all combinations of gene order and action within simple ON/OFF models and then predicted the hypothetical effect of deleting genes on each of them (Figure 1, Figures S1, S2, and S3). There are four points of variation to model for each gene pair relationship. The first is the identity of the upstream gene, i.e. the gene order. Secondly, the upstream gene will turn the downstream gene either on (enhance) or off (repress). Thirdly, the downstream gene can enhance or repress the expression of a target gene for which expression is observed. Lastly, we consider that the upstream gene itself will be enhanced or repressed by some initiating factor such as a developmental cue or environmental perturbation. Avery and Wasserman [18] provide a general framework that has been widely used for interpreting epistasis in response to such signals, and note that the effect of a mutation is only observable for a specific signal state. However, knowing the signal state does not give any information about whether the upstream gene is enhanced or repressed in that state. In our models, we focus on the effect on the upstream gene. This model has sixteen possible variants describing hierarchical relationships between two genes and the target gene.

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Figure 1. Modeling the Relationship A Is an Upstream Repressor of B.

B in Turn Enhances a Target Gene X. In this example, deleting A will change the state of the target gene from off to on. Therefore, we include A's effect in the corresponding regression model. Deleting B leaves the target gene in the same state as the wild type and its effect is not included. The AB double mutant is also not expected to deviate from the wild type despite the significance of the A deletion. Since A's effect is already included in the model for this contrast, it must be offset by the interaction term. We conclude that if A is enhanced by the signal, A represses B, and B enhances X, the corresponding best-fit regression model will include coefficients for A and an interaction term. Similar logic applies to the case in which the signal represses A. The signal represses A, thus deleting A has no downstream effects. We expect only the coefficient corresponding to the downstream gene in the best-fit model.

https://doi.org/10.1371/journal.pgen.1000029.g001

The key to our approach is connecting each of the sixteen hierarchical models to one of the eight possible best-fit regression models. If the deletion changes the state of a target gene relative to the wild type in a mutant, then that deletion is predicted to have a significant effect and it will be included in the regression model corresponding to that hierarchical model. Figure 1 gives an example of one possible model, in which A is enhanced by a signal; A is an upstream repressor to B; and B enhances a target gene X. We conclude that the corresponding best-fit regression model will include coefficients for A and an interaction term. Note that if the signal instead represses A, a different best-fit model represents the same relationship between A and B.

We applied the same approach to each of the sixteen cases and note several trends. First, the downstream gene's effect upon the target gene X does not influence the corresponding best-fit model. This allows us to reduce the model space to eight hierarchical relationships (Table 1). This observation is convenient, because expression traits represent all the genes downstream of the deletions. Regardless of the downstream gene's direct effect, some traits will be enhanced while others are repressed. When the upstream gene is a repressor, four distinct regression models represent four unique hierarchical relationships. We can uniquely identify both the gene order and signal effect on the upstream gene. We cannot discern gene order if the upstream gene is an enhancer because the same best-fit model describes both hierarchies. If the upstream gene is merely enhancing the effect of the downstream gene, deleting either gene will affect the trait gene similarly. Six of the eight possible best-fit regression models correspond to the eight hierarchical relationships. It is notable that hierarchies can be indicated even without an interaction effect in the model.

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Table 1. Correspondence Between Regression Models and Biological Models.

https://doi.org/10.1371/journal.pgen.1000029.t001

We must also consider that there is no hierarchical relationship between A and B, or that they do not affect the target gene (Table 1). We can distinguish between two types of parallelism. Model 4, the two-gene additive model with no interaction, represents no epistasis. Model 3 represents buffering epistasis, in which both genes act on the target in the same direction, and the effect of deleting either is not apparent unless both genes are deleted. We refer to this as nonhierarchical epistasis since neither gene is upstream of the other. Deleting a deactivated regulator gene has no effect on the target gene, making it impossible to identify a biological relationship when regulators are deactivated.

The remainder of Table 1 represents cases in which one or both genes do not affect the target gene. Expression traits supporting Model 8 (no significant terms) may represent target genes that do not lie downstream of A or B, and are uninformative. The result is one-to-many relationships between best-fit regression Models 1, 2, and 8 and their corresponding gene expression models. If the upstream gene of a hierarchical pair is turned off, we cannot know whether it is upstream or uninvolved.

Typically, expression is measured from thousands of genes simultaneously and we do not expect them all to be informative. Even with clear interpretations for each trait individually, there is a challenge interpreting all traits together. We examine the distribution of all traits. Among informative traits associated with a best-fit model, the majority may represent the underlying biological relationship between the deleted genes.

Validating the Two-Step Modeling Framework

Van Driessche et al. used Dictyostellium discoideum wild type [20] and deletion mutant strains [21] to infer hierarchical epistasis among genes of the protein kinase (PKA) pathway. Each strain's gene expression profile was measured using cDNA microarrays with a common reference over 24 hours. These data are well suited for testing our methods for two reasons. First, the epistatic relationships between the deleted genes already have been characterized experimentally. Secondly, the mutant strains are genetically identical at all loci except the few being studied, i.e. there is no variation in their genetic background.

The PKA pathway is associated with the developmental aggregation response to nutrient deprivation, which initiated midway through the time course. Data before and after aggregation were considered separately so we can clearly interpret the deletion effects in each signal state. The data represented fold-change on a logarithmic scale, which made the distribution of expression measurements approximately normal; we consider the implications of this in the discussion. We studied 1553 expression traits. The genes we used were measured in both experiments and differentially expressed in the wild type during aggregation [20]. Five deletion strains target genes of the protein kinase A (PKA) pathway that is involved in the response to starvation and activates aggregation. This provided three contrasts: pufA/pkaC, pufA/yakA, and regA/pkaR. Although there are ten possible contrasts for these five genes, only these three double mutants were generated, presumably because these are known direct relationships.

For each contrast, some traits supported each model (Figure 2). Additionally, large number of traits showed no deletion effects (i.e. support Model 8). At a significance threshold of p<0.01, a majority of traits supported Model 8 for every contrast pre-aggregation (Figure S4) and for the regA/pkaR contrast post-aggregation. According to our interpretive models, Model 8 can indicate three possibilities. The first two are hierarchical relationships in which an upstream enhancing gene is turned off during aggregation. The last possibility is that the genes are uninvolved in the expression of the target and the deletions have no effect.

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Figure 2. Post-Aggregation Distribution of Best-Fit Models at p<0.01 Significance Threshold.

The frequency distribution of best-fit regression models can be interpreted as hierarchical relationships between genes. Model 8 corresponds to no deletion effects and is supported by a large number of traits in each contrast; these genes are likely not downstream of the deletions. The model supported by the majority of remaining traits is assumed to represent the true relationship.

https://doi.org/10.1371/journal.pgen.1000029.g002

Since not all target genes are downstream of the PKA pathway, it is logical that the deletions have no effect on these genes. Similarly, the PKA pathway is invoked during aggregation and it follows that the deletions may affect expression only after aggregation has begun. We assume that the target genes supporting Model 8 are not downstream of the pathway, and that the majority of the remaining target genes reflect the relationship within the pathway. To test this assumption, we looked at the overlap between the expression traits supporting Model 8 for each contrast. We found that all of the expression traits supporting Model 8 for the pufA/yakA contrast also supported Model 8 for the other two contrasts. These traits strongly support the assumption that they are not downstream of the PKA pathway.

When we looked at these genes for both the pufA/pkaC and pufA/yakA contrasts, there was strong support for one model over all others post-aggregation. Not only did these models explain more traits post-aggregation, but the models also fit better. On average, the best-fit model explained over half of the expression variation (R²≥0.5, adjusted for degrees of freedom in the model) for traits in the pufA/pkaC and pufA/yakA contrasts, and for both contrasts the R² increased post-aggregation (t-test with p<0.0001).

For the pufA/pkaC contrast, Model 2 had the most support of the seven non-null models. Model 2 corresponds to two possible interpretations. The first is that pkaC is the downstream gene, that pufA is a repressor, and that the pufA is turned off in the presence of the aggregation signal. Alternately, we could interpret it to mean that only pkaC has an effect on the downstream targets and that pufA is unrelated. For the pufA/yakA contrast, Model 6 had the most support among non-null models. This model has a one-to-one correspondence to our interpretive models. It asserts that yakA is an upstream repressor of pufA, and that yakA is turned on at aggregation. These conclusions both agree with what has been determined previously about the roles these three genes play during development [22]. YakA represses pufA, which then ceases to repress pkaC.

The regA/pkaR was problematic because almost all traits supported Model 8, the model with no effect terms. For the previous two cases, we assumed that these traits were not downstream of the pathway. Given this assumption, we could have concluded that regA and pkaR were not involved with aggregation. However, the other two contrasts had 435 and 528 traits supporting Model 8, while regA/pkaR has 1497. Because of this discrepancy, we suggest that some proportion of these genes support the hierarchical model corresponding to Model 8: that one gene is an enhancer of the other and is deactivated by aggregation. According to previously published results, regA and pkaR work together to repress pkaC pre-aggregation and are in fact deactivated post-aggregation [23]. This is consistent with the potential hierarchical relationship.

Because we are modeling nonadditive interactions, the logarithmic scale transformation on these data can potentially alter the results relative to untransformed data [3],[24]. To test this, we exponentiated the data and repeated our method. Despite dramatic changes to the shape of the data distribution, the resulting distribution of best-fit models agreed with the results presented above. Again, a majority of traits showed no deletion effects (i.e. support Model 8). Model 2 had the most support for the pufA/pkaC contrast, Model 6 had the most support for the pufA/yakA contrast, and Model 8 had near complete support for the regA/pkaR contrast using the post-aggregation data (Figure S5). Interestingly, this does not imply that each trait supports the same model regardless of the scale transformation. In fact, only 57% and 47% of traits support the same model with the untransformed data for the pufA/pkaC contrast and pufA/yakA contrast respectively. However, in both these cases the vast majority of changed traits support Model 8. This result amends our previous interpretation of the traits supporting Model 8; in addition to genes not downstream of the pathway, there may be some proportion of genes for which expression changes due to deletion is not detectable due to issues of scale. Fewer traits supported Model 8 using transformed data, suggesting that these data may be more informative using the logarithmic transformation.

Thus, in all three cases our best-fit regression models correspond to a set of interpretative models that includes the true relationship between the genes. Certain regression models have a one-to-many relationship with the interpretive models, but in these cases the number of candidate interpretive models is reduced to a few. Only one interpretation corresponds to Model 6, which makes the pufA/yakA contrast straightforward to describe. In evaluating pufA/pkaC, Model 2 corresponds to one hierarchical model and one single-gene model. Since the pufA/yakA contrast provides evidence that deleting pufA has an effect, the hierarchical model is a preferable interpretation to the pkaC only model. As we vary the significance threshold for model selection, our results are robust. The best-fit model among models 1–7 was the same for p-value thresholds from 0.05 to 0.001 (Figure S6). As the selection criterion becomes stricter we reject more effects as not significant, and more traits support Model 8.

Dictyostellium Gene Expression Data

We used data originally presented by Van Driessche et al. We use data from Dictyostellium discoideum wild type [20] and eight deletion mutant strains (pufA⁻, pkaC⁻, pufA⁻pkaC⁻, yakA⁻, pufA⁻yakA⁻, regA⁻, pkaR⁻, regA⁻pkaR⁻) [21]. They measured each strain's gene expression profile over a time course using cDNA microarrays and a common reference that was pooled from all time points. Expression was measured thirteen times over 24 hours and captured the developmental aggregation response to nutrient deprivation, which initiated midway through the time course. We grouped observations before (hours 0,2,4,6) and after (hours 14,16,18,20) aggregation. Expression at these time points is highly correlated ([Figure 2 in 20]) and consistent with the regulatory changes previously reported. This data pooling increased the sample size for our regression analysis. Observations during the transitional period (hours 8,10, and 12) were disregarded, as were observations in the late stages of development that were less correlated (hours 22 and 24). The data represented fold-change on a logarithmic scale. We studied 1553 genes that were measured in both experiments and differentially expressed in the wild type during aggregation [20].

Regression Analysis

We fit models in the R statistical environment [26]. Stepwise backwards selection entails fitting a fully parameterized model, then eliminating model terms that do not meet a specified significance threshold. The model is refit with the remaining terms until no further terms can be dropped.