V_A is a major determinant of total genetic variance under the classical model

To show the relationship between gene action and classical partitioning of genetic variation, we first consider simple models of genetic architecture that involve one or two loci. Following conventional notation, we arbitrarily assign the genotypic value of the three possible genotypes aa, Aa, and AA at a single bi-allelic locus as −a, d, and +a respectively[2]. Additive and dominant gene actions or genetic models have a clear meaning with this parameterization. An “additive” genetic model refers to the situation in which d = 0, and hence there is a perfect linear relationship between the genotypic value and the number of copies of A alleles. A “dominant” genetic model is when d = ±a, or when the genotypic value is solely determined by the presence of the dominant allele. V_A (see Table 1 for this and other notations and definitions used throughout this study) accounts for the entirety of genetic variation when the true genetic model is an additive model (Fig 1a). V_A also explains the majority of genetic variation under the dominant genetic model unless the dominant allele is at high frequency (Fig 1b). Extending this single-locus model to two unlinked loci, we see that V_A also captures the majority of overall genetic variance—unless alleles at both loci are common—under a two-locus “additive by additive” genetic model (Fig 1c and 1d).

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Table 1. Notations and definitions of variance components in this study.

https://doi.org/10.1371/journal.pgen.1006421.t001

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Fig 1. Additive genetic variance V_A is a major determinant of total genetic variance.

Under additive (a), dominant (b), or additive by additive (c, d) models, the proportion of total genetic variance explained by the additive genetic variance V_A and dominance genetic variance V_D are estimated either analytically (a, b) or numerically by simulation (d).

https://doi.org/10.1371/journal.pgen.1006421.g001

Ideally, a variance component partition should have a one-to-one corresponding relationship with gene actions in order for it to measure the relative importance of gene actions (Fig 2a). The classical V_A + V_D + V_I partition obviously does not possess this property, despite it being an orthogonal partition (uncorrelated variance components) and having suggestive names, i.e., additive genetic variance for V_A, dominance genetic variance for V_D, and epistatic genetic variance for V_I (Fig 2b). Notably, except for additive gene actions, which contribute only to V_A, both dominant and epistatic gene actions contribute to multiple variance components (Figs 1 and 2b). The specific amount of genetic variation each type of gene action contributes depends on the genetic architecture or may even be unmeasurable because different types of gene actions may not be independent from each other. Nonetheless, it is clear that this classical V_A + V_D + V_I partition is a poor indicator of the underlying genetic architecture; purely epistatic genetic architecture can often result in a partition where V_A is large but V_I is small (Fig 1d). These results are not new and have been previously shown by many authors [2,4,6] but are recapitulated here to set the stage for the following results so that one can contrast alternative parameterizations with them.

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Fig 2. Relationship between gene actions and variance components.

(a) Ideally, the variance generated by each type of gene actions is mutually exclusive therefore variance components provide a measure of relative importance of gene actions. (b) In the classical V_A + V_D + V_I variance partition, additive genetic variance V_A has contribution from all of additive, dominant, and epistatic gene actions in most circumstances. With the alternative parameterizations, all types of gene actions contribute to (c) and (d) in most circumstances.

https://doi.org/10.1371/journal.pgen.1006421.g002

The apparent disconnect between gene action and variance components in the classical model is the basis for the statements that epistatic variance V_I can be neglected because epistasis contributes mostly to V_A and V_I is correspondingly small [6]. This is undoubtedly true but vastly misleading. V_I is the residual genetic variance after V_A has been maximized and bears no genetic meaning even though it is called epistatic variance. Indeed, textbooks point out a possible misunderstanding and warn that “the concept of additive variance does not carry with it the assumption of additive gene action; and the existence of additive variance is not an indication that any of the genes act additively (i.e., show neither dominance nor epistasis)” [2].

Alternative parameterizations also capture the majority of genetic variance

The way genetic effects are parameterized in the V_A + V_D + V_I partition necessarily leads to large V_A. This property is best illustrated by the least squares interpretation in a single locus case (Fig 3), in which V_A is the type I sum of squares of regressing genotypic values onto copy number of alleles while V_D is the residual variance. The least squares solution of this regression attempts to maximize V_A and minimize V_D given the assumed additive genetic model, regardless of the actual genetic architecture. The key point, which is often neglected, is to realize that V_A is large not because of the underlying genetic architecture but of the assumed genetic architecture and its corresponding parameterization. When the assumption and parameterization change, the partitioning of variance components also changes.

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Fig 3. Least squares regression interpretation of V_A.

This representation is adapted from Fig. 7.2 of Reference [2]. Grey circles indicate the genotypic value of each genotype, which is coded as 0, 1, 2 for aa, Aa, and AA respectively. A regression line (red line) is fitted to the data, on which the fitted values are indicated by white circles. The fitted line must pass through the center of the data, as indicated by the cross. The fitted values are equivalent to breeding values. The arrows between the breeding values and the genotypic values are the dominance deviations, which are the same as residuals of the regression. Note that the data points are weighted by their frequencies in the population. A dominance model is used so that the dominance deviation can be illustrated.

https://doi.org/10.1371/journal.pgen.1006421.g003

Perhaps the best way to counter the argument that large V_A is evidence for unimportance of non-additive gene actions is to derive alternative ways of partitioning variance where one of the non-additive components dominates others, a property that has been shown previously only for V_A. This turns out to be easy if the non-additive components are given the priority to explain the genetic variation, as does V_A in the classical model. Using a single-locus parameterization in which the heterozygotes and the homozygotes for the dominant allele are coded identically, we define an alternative dominance variance (Table 1, the prime symbol is used to distinguish this variance from the conventional dominance variance V_D), which is the type I sum of squares of regressing genotypic values onto the dominant allelic coding (Table 1; Fig 4). Consistent with its assumed genetic model, captures the entire genetic variance when the true genetic model is a completely dominant model (Fig 5a). Even when the genetic model is perfectly additive, captures the majority of genetic variation (Fig 5b). This result is remarkable because a variance component under the alternative parameterization seemingly corresponding to the dominant gene action has similar properties and variance explaining abilities as V_A (Fig 2c). Furthermore, an alternative two-locus parameterization (see Methods) allows the variance component (Table 1) to explain the entire genetic variance with an additive by additive genetic model (Fig 5c) while still capturing a majority of genetic variance under most circumstances when the genetic model is purely additive (Figs 5d and 2d).

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Fig 4. Least squares regression interpretation of .

Grey circles indicate the genotypic value of each genotype, which is coded as 0, 2, 2 for aa, Aa, and AA respectively. A regression line (red line) is fitted to the data, on which the fitted values are indicated by white circles. The fitted line must pass through the center of the data, as indicated by the cross. The fitted line must also pass through the circle (half grey and half white to indicate the overlap of the genotypic and fitted values) denoting genotype aa. The fitted values are equivalent to dominance values as defined in this parameterization. The arrows between the dominance values and the genotypic values are the residuals of the regression, which we define as “additive deviation”, therefore the residual variance is . Note that the data points are weighted by their frequencies in the population. An additive model is used so that the additive deviation can be illustrated.

https://doi.org/10.1371/journal.pgen.1006421.g004

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Fig 5. Alternative parameterizations capture the majority of genetic variance.

Using an alternative parameterization that emphasizes dominant gene action, a newly defined dominance variance and additive deviation variance are estimated analytically under dominant (a) and additive (b) models. Using an alternative parameterization that emphasizes additive by additive gene action, a newly defined interaction variance is estimated numerically under additive by additive (c) and additive (d) models.

https://doi.org/10.1371/journal.pgen.1006421.g005

Classical and alternative parameterizations capture the majority of polygenic genetic variance

To extend the single- and two-locus results to polygenic genetic models, we simulated genotypes and phenotypes based on pre-defined genetic architectures (gene actions) and broad sense heritability (H²), and used mixed models to partition phenotypic variance under the classical and alternative parameterizations described above. As expected, when the genetic parameterizations and the corresponding genetic covariance matrices match the true genetic models, the estimated variances fully explain the total genetic variances (Fig 6a–6c). Intriguingly, similar to the single- and two-locus models, all genetic parameterizations are able to capture a large (almost always > 40%) fraction of total genetic variances regardless of the true genetic architecture (Fig 6a–6c). Among the three parameterizations, the classical definition of V_A appears to explain the most genetic variance when the genetic model does not match its parameterization. This is likely because the genotypic coding under the conventional additive parameterization is insensitive to the sign of the allelic effects; while the dominance parameterization requires prior knowledge of the dominant allele, and the additive by additive parameterization requires prior knowledge of the interacting pairs. Nonetheless, it is remarkable that even with random assignment of the dominant allele or random pairing of loci and obvious mischaracterization of the genetic model, and are able to explain the majority of genetic variance when the genetic architecture is additive within and between loci, respectively (Fig 6b and 6c).

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Fig 6. Conventional and alternative parameterizations capture the majority of polygenic genetic variance.

Simulation is used to generate data sets with the additive (A), dominant (D), and additive by additive (AxA) genetic models and V_A, and are estimated using linear mixed models. The results are presented as the proportion of heritability explained by the genetic variance component; corresponds to V_A (a), to (b), and to (c).

https://doi.org/10.1371/journal.pgen.1006421.g006

V_A, , and explain a large fraction of phenotypic variance for human height

It has been previously shown that V_A accounts for a large fraction of phenotypic variance in human adult height using a genetic covariance matrix computed from genome-wide SNP data under the conventional parameterization [8]. Based on our above results, we necessarily expect this observation regardless of the true genetic architecture for human height. We indeed recapitulated this result using genotype and height data for individuals from the GENEVA project (Fig 7). We then asked if our alternative parameterizations of and can perform with real data as they do in simulated data (Fig 6b and 6c). Remarkably, under the naive assumptions that minor alleles are recessive and by randomly pairing interacting SNPs, both and can explain a substantial fraction of phenotypic variance, with even larger point estimates than V_A (Fig 7). This is important, because and and their corresponding parameterizations are consistent with dominant and epistatic gene actions. If we use the same argument that large V_A in the classical model suggests the unimportance of non-additive gene actions, large and in the alternative parameterizations suggest the unimportance of additive gene actions. Neither argument is correct.

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Fig 7. Variance component analyses of human height data.

Phenotypic variation of height (in cm) observed in the GENEVA study is partitioned into genetic variance components as indicated (color-coded bars) and environmental variance (V_e, grey bar). The colors of bars correspond to the colors of the text indicating the variance components. Error bars indicate standard errors of the variance component estimates provided by GCTA. Proportions of the components are also indicated.

https://doi.org/10.1371/journal.pgen.1006421.g007

To further illustrate how parameterizations may affect genetic variance partitioning, we focus on the simple task of partitioning “additive” and “dominance” variances. A recent study reported a major contribution of V_A (additive variance) and a minor contribution of V_D (dominance variance) for a number of quantitative traits, using the classical parameterization for the additive genetic variance to estimate V_A, and a frequency-dependent parameterization (Table 1) orthogonal to the additive genetic value to estimate V_D[9]. This observation led to the conclusion that dominance variation contributes little to quantitative trait variation. We observed similar relative contributions of V_A and V_D for human height in the GENEVA data (Fig 7). However, as we have illustrated above, this is only one of the many possible ways of partitioning variance. Using our alternatively defined parameterizations and a similar frequency-dependent parameterization orthogonal to the dominant genetic value (Table 1), we find a much more substantial contribution of dominance variance, i.e., (Fig 7). The key difference between this alternative partition and the classical V_A + V_D (V_I is ignored here) is that the variance component seemingly consistent with the dominant gene action is allowed to explain the variance first, while the “additive” component () only enters the model after has been maximized (Fig 4). This result clearly demonstrates the problem of using variance partitioning to measure the relative importance of gene actions, because they change as the parameterizations and models change.

Least squares regression interpretation of V_A

Consider a single biallelic locus in a diploid genome with alleles A and a, each with frequency p and q(p + q = 1); and assign genotypic values y = − a, d, and +a to genotypes aa, Aa, and AA respectively. The average effects of A and a are then qα and − pα respectively, where α = a + d(q − p) is the allele substitution effect and measures the change in phenotype in an individual if an allele a is substituted with A [2]. The breeding value, defined as the expected genotypic value of the progeny an individual produces, is the sum of average allelic effects each diploid individual carries, and is − 2pα, qα − pα, and 2pα for aa, Aa, and AA respectively. With only one locus, the total genetic variation in a randomly mating (thus in Hardy-Weinberg equilibrium) population can be partitioned into two orthogonal components, the additive genetic variance V_A, which is defined as the variance due to breeding values, 2pqα², and the dominance genetic variance V_D = (2pqd)² (Table 1) [2].

Alternatively, we can define a random variable x_A as:

This parameterization has the convenient interpretation that x_A is equal to the number of A alleles. It is easy to show that the allele substitution effect α as defined above is the slope of the least squares regression of genotypic value y on x_A in an idealized population with random mating (Fig 3). The additive genetic variance is then V_A = Var(ŷ) = Var(αx_A) = α²Var(x_A) = 2pqα² and the dominance genetic variance V_D is the residual variance. It is easy to see that the least squares solution for this regression seeks to maximize V_A and minimize V_D. This least squares interpretation is not new and dates back to the early days of quantitative genetics [1].

By extension of this least squares regression interpretation of genetic variation, if we arbitrarily define any one random variable x or more than one of them and fit a linear model of form y = βx + ϵ, we can partition genetic variance due to the assumed genetic model Var(ŷ) = Var(βx) and residual variance Var(ϵ).

Derivation of dominance variance using least squares regression

Now we illustrate the idea of using least squares regression to partition genetic variance due to dominant gene action and the remaining genetic variance. We define the random variable as:

The least square solution for the linear model can be easily found to be (Fig 4). Therefore the variance due to is . The residuals from this regression are 0, , and , for genotypes aa, Aa, and AA respectively. Similar to V_A and V_D, we define the residual variance as an “additive deviation” variance , which can be found to be .

Finding numerically

Extending the least squares regression interpretation of genetic variance to any arbitrary random variable x and finding the solution is not always easy. However, it is computationally trivial to find. For example, to numerically estimate the additive by additive variance , we define as follows for two independently segregating loci with alleles A/a, and B/b respectively:

Then, . We randomly draw 100,000 individuals with the specific genotypes according to pre-defined allele frequencies and assign genotypic values with pre-defined genetic models. The slopes can be easily found by numerically regressing y onto x. The proportion of genetic variation explained by this parameterization is then just the R² of the regression.

Mixed model analysis of simulated and real data

To extend the single- and two-locus models to polygenic models, we used mixed model analysis to partition phenotypic variation in simulated and real data. To simulate phenotypic data with pre-defined genetic models, we first drew 1,000 realizations from the U-shaped distribution [6] , which took possible values of 0.01, 0.02, …, 0.99. Genotypes for these p = 1,000 loci were randomly assigned according to their Hardy-Weinberg frequencies to n = 5,000 individuals. Genetic values were then assigned to the 5,000 individuals using this general formula g = Xβ. Each of the columns of the n × p matrix X was coded by the additive parameterization x_A as defined above for the additive genetic model, for the dominance genetic model. Similarly for the additive by additive genetic model, pairs of loci were parameterized as defined above using . The vector β was drawn from standard normal distribution. The phenotypic value y for each individual was then simulated by adding random noise such that Y = g + ϵ, where ϵ was normally distributed with zero mean and variance equal to . H² was the broad sense heritability and was always set to 0.5.

We standardized columns of X and computed the covariance matrix as XX^T, which was further scaled by the mean of its diagonal values. A linear mixed model Y = μ1 + Zu + ϵ was fitted to the data, where μ was the population mean, Z was the incidence matrix and in all cases in this study the identity matrix, u was a random effect with variance covariance matrix Gσ², where G was simply the scaled XX^T above and σ² was the part of genetic variance due to the specific parameterization. We fitted this model using the GCTA software[17] with REML and performed simulations 100 times. We defined the heritability explained by σ² as h²/H², where , and H² was the simulated broad sense heritability.

To analyze real data where the genetic architecture cannot be known a priori, we downloaded genotype and phenotype data from dbGaP for the GENEVA Genes and Environment Initiatives in Type 2 Diabetes study (phs000091.v2.p1). We pruned the data set to contain 5,497 unrelated (nominal genetic relationship as calculated by GCTA < 0.05) individuals with European ancestry based on both self-reported ethnicity and principal component analysis. We then computed genetic covariance matrices as defined above using autosomal SNPs and partitioned phenotypic variance using GCTA where sex was fitted as a fixed effect in the model. We used the parameterization (Table 1) as defined in a recent study[9] to partition phenotypic variance into V_A, V_D, and V_e. We also partitioned phenotypic variance into , , and V_e, where was defined as above and was estimated by defining a new variable (Table 1), where