Estimation of the marker effects

Any method that has been proposed in the framework of genomic selection can be used to estimate marker effects in the training population. In our study, RRBLUP and BayesB were used with the following statistical model:(1)where b is a vector of fixed effects (including an overall mean), g_i is the i^th marker effect, N is the total number of markers, X and Z are design matrices corresponding to b and g, and e is a vector of residual errors. In design matrix Z, for SNP markers with alleles 1 and 2, genotypes were represented as 0, 1 and −1 to denote the heterozygous (12) and the two homozygous genotypes (22 and 11), respectively. We assume that the residuals are independent and follow a normal distribution, e∼N(0, Iσ_e²). All marker effects g_i are also assumed to be normally distributed, g_i∼N(0, σ_gi²), where σ_gi² is the variance of effect of marker i, The σ_gi² is assumed to be equal for all markers in RRBLUP and variable in BayesB for which a marker may have a variance of zero with a probability of π or a variance following a scaled inverse chi-square distribution with 1 degree of freedom with a probability of 1−π [31].

In the RRBLUP method, the simulated variance components were used as the true variance in the analyses. The i^th marker variance was calculated from σ_gi² = σ_a²/N, whereσ_a² is the total additive genetic variance, as proposed by Meuwissen et al. [1].

In the BayesB method, the exact ratio of the number of simulated QTL to the total number of markers was used as the prior value of 1−π. The Monte Carlo Markov chain (MCMC) algorithm of BayesB is a mixture of Gibbs sampling and Metropolis-Hastings sampling as described by Meuwissen et al. [1]. In our research, the MCMC chain was run for 10,000 cycles with 100 cycles of Metropolis-Hastings sampling in each Gibbs sampling, and the first 2,000 cycles were discarded as burn-in. All the samples of marker effects from later cycles were averaged to obtain the estimates of marker effects.

Construction of trait specific marker derived relationship matrix (TA)

A relationship matrix constructed using all markers without trait-specific weighting is equivalent to the G matrix in GBLUP, the so-called realized relationship matrix, and is identical for all traits. The trait-specific relationship matrix, in contrast, should specify the genetic covariance between two individuals for the trait of interest. The contribution of each locus to this covariance consists of two components: the IBD between both individuals, which is reflected by their marker genotypes, and the contribution of the locus to the genetic variance in the trait. Thus elements of the TA-matrix were obtained aswhere is the IBD-probability at locus k between individual i and j, is the contribution of locus k to the genetic variance in the trait, and the sum is taken over all loci. This expression ignores covariances of genetic effects at different loci, which may originate e.g. from linkage disequilibrium.

To simplify the arithmetic, we first obtained the full identity by state (IBS) at each locus. Subsequently we calculated the weighted average IBS over all loci, and finally corrected for the population average IBS to obtain a mean relatedness equal to zero. The full IBS at locus k between individual i and j is calculated as [23], [32](2)where I_mn is 1 if allele m in the first individual is identical to allele n in the second individual or 0 otherwise. All four possible combinations are taken into consideration in formula (2). Therefore, the genotype data does not need to be phased. Next, the weighted average IBS for individuals i and e, taking all markers into account, was obtained aswhere N is the total number of loci and w_k is the weight for the k^th marker. In the present study, we compared two different weights, weights were either equal to the posterior variances of marker effects estimated from BayesB (denoted TAB), or weights were equal to the expected variances of marker effects derived from RRBLUP (denoted TAP). For RRBLUP, the expected variance for the k^th marker was calculated as , where the p_k is the frequency of one allele on that locus and is the estimated marker effect. Then we corrected for the mean IBS, using an adjustment based on Wright's F-statisticswhere is the population average of S_ij. Finally, science relatedness equals twice the IBD, we obtained elements of the marker-based relationship matrix asAn overview of different methods to construct the TA matrix is shown in Table 1.

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Table 1. Overview of different methods to construct the trait-specific relationship matrix.

https://doi.org/10.1371/journal.pone.0012648.t001

Estimation of genomic breeding values

For TABLUP, the GEBVs of all genotyped individuals are predicted by solving the MME, which included the TA matrix. The statistical model was(3)where u is the random polygenic effect, which is the EBV in conventional BLUP and GEBV in GBLUP or TABLUP. The solution for u is equal to , where G is the TA matrix for the TABLUP method that was inverted numerically. The simulated variance components were provided to the MME, which were solved by Gauss-Seidel iteration.

For RRBLUP and BayesB, the GEBV of a genotyped individual was calculated as the sum of all estimated marker effects according to its marker genotypes [1].

Data simulation

The simulation started with a base population of 100 individuals, followed by 1,000 non-overlapping generations with the same population size, denoted as generation −999 to generation 0 to indicate historical generations. In the base population and each historical generation, 50 males were randomly mated with 50 females and each mating produced two offspring (one male and one female). After the 1,000 historical generations, six additional generations, numbered 1 to 6, were simulated. In generation 1, the population size was expanded from 100 to 1,000 by randomly mating 50 males with 50 females from generation 0, where each female produced 20 progeny (10 males and 10 females). From generation 1 to 5, 50 males were randomly selected from the 500 male individuals to be the sires of the next generation, and all 500 females were used as dams without selection. The population size of 1,000 for generation 2 to 6 was obtained by randomly mating each male with 10 females and each female produced two offspring. This resulted in a half sib family structure as depicted in Figure 1.

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Figure 1. Overview of the simulated population structure.

https://doi.org/10.1371/journal.pone.0012648.g001

The simulated genome consisted of five chromosomes with a total length of 5 Morgan (1 Morgan per chromosome). On each chromosome, 1,000 marker loci were randomly located and each segment between two markers was considered to harbor a potential QTL, giving 5,000 markers and 4,995 potential QTL in total. Based on the distance between two adjacent loci, Haldane's mapping function was used to calculate the probability of having a recombination between adjacent loci on the same chromosome.

The mutation-drift equilibrium model was used to create polymorphic markers and QTL. In the base population, all markers and QTL had both alleles coded as 1. Mutations were allowed in all historical generations for all loci with a mutation rate of 1.25×10⁻³ per locus, per generation, and per animal. Under the mutation-drift equilibrium model, the expected heterozygosity when the population reaches equilibrium is , where Ne is the effective population size and u is the mutation rate [33]. Therefore, the proposed mutation rate gave an expected heterozygosity of 0.5. For each new mutation on the same locus, a unique allele was created and coded with a new number sequentially starting from 2. In generation 0, recoding of alleles was implemented to obtain bi-allelic SNP markers. For each locus, the allele that had a frequency closest to 0.5 was recoded as 1, while all other alleles were recoded as 2 following Solberg et al. [34] while differing from the rule used by Meuwissen et al. [1], in which only part of the putative loci were polymorphic and available for data analysis. The distribution of minor allele frequencies of our simulated data can be seen in Figure 2.

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Figure 2. The typical distribution of minor allele frequency of the simulated genotypic data.

https://doi.org/10.1371/journal.pone.0012648.g002

For each individual from generation 1 to 6, a true breeding value (TBV) was simulated by summing up all true QTL genotypic values, i.e., , where a_i is the allele substitution effect of the i^th QTL, and Z_i is 0, 1, or −1 corresponding to genotypes 12, 22 and 11, respectively. In our standard scenario, 50 QTL were randomly selected from the 4,995 putative QTL. For each true QTL, the allele substitution effect a_i was drawn from a gamma distribution with the shape parameter and scale parameter . The allele substitution effect a_i sampled from a gamma distribution may be positive or negative with equal probability, following Meuwissen et al. [1].

The total genetic variance was computed as the sum of variances across all QTL with the assumption of no correlation between QTL. The simulated additive genetic variance of each QTL was calculated as [35], where p_i is the allele frequency at the i^th QTL in generation 1, and a_i is the allele substitution effect of the i^th QTL. The allele substitution effects were re-scaled to have a total additive genetic variance (σ_A²) of 1.

Only the 1,000 individuals in generation 1 were assigned a phenotypic record. The phenotypic value P_i of the i^th individual was obtained by , where e_i is randomly sampled from a normal distribution N(0, σ_e²). The environmental variance, σ_e², equaled . In our standard scenario, heritability was set to be 0.5, so that environmental variance was 1. Breeding values of individuals without phenotypic records were predicted using Equation 3. The accuracy of predicted breeding values was evaluated by calculating the correlation between the true and predicted breeding values for individuals without phenotypic records.

To investigate the effect of number of QTL and heritability on the accuracy of GEBVs, two groups of alternative scenarios were simulated in addition to the standard scenario described above. In the first group, four different levels of heritability were simulated: 0.05, 0.1, 0.3 and 0.9. In the second group, different numbers of QTL were simulated: 100, 200, 500 and 1,000. For all these alternatives, only the intended parameter was altered from the standard scenario. For all scenarios, 10 replicates were simulated.

Estimates of QTL effects

The simulated (true) QTL effects and the marker effects estimated from RRBLUP and BayesB from one random replicate of the standard scenario are shown in Figure 3. While the simulated absolute QTL effects ranged from 0 to 0.6 (Figure 3A), the estimated absolute marker effects ranged from 0 to 0.5 for BayesB (Figure 3B) and 0 to 0.025 for RRBLUP (Figure 3C; beware of the difference in scale between Figures 3A, B and C). Most segments containing big QTL were mapped by both methods. However the resolution of BayesB was higher than that of RRBLUP.

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Figure 3. True and estimated QTL effects from a randomly selected replicate.

Panel A shows the absolute values of the simulated true QTL effects throughout the simulated genome. Panel B shows the absolute estimates of the marker effects throughout the genome use the BayesB approach. Panel C shows the absolute estimates of the marker effects throughout the genome use the RRBLUP approach. There were 50 true QTL and 5,000 markers. Beware of the scale difference in panel C.

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Pearson correlation, rank correlation and regression coefficient

Table 2 shows the Pearson correlations and rank correlations between the predicted breeding values (GEBVs) and the simulated true breeding values (TBVs) as well as the regression of TBVs on GEBVs in generation 2. In terms of accuracy, which is defined as the Pearson correlation between GEBVs and TBVs, both TABLUP methods (TAB and TAP) performed better than RRBLUP and GBLUP. TAB performed better than TAP but a little worse than BayesB. However, the difference between TAP and TAB (0.042) was much smaller than that between RRBLUP and BayesB (0.085). In other words, the TABLUP appears to be less sensitive to the genetic architecture than either RRBLUP or BayesB.

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Table 2. Correlation and rank correlation between estimated and true breeding values as well as regression of true breeding values on estimated breeding values in generation 2 (N_qtl = 50, h² = 0.5).

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In breeding practice, rank correlation is more important than Pearson correlation, especially in truncation selection. On average, the rank correlation is 0.013 lower than the Pearson correlation. The ranking of the methods and the trend of both correlations were the same (Table 2).

The regression coefficient of TBVs on GEBVs was used to measure the biases of GEBVs from different methods (Table 2). RRBLUP and BayesB gave almost unbiased estimates of GEBVs, while both TABLUP methods slightly underestimated GEBVs.

It is notable that GBLUP and RRBLUP performed equally in terms of correlations, which confirms the theoretical equivalence of the two methods. However, the regression coefficient was slightly different between these two methods (Table 2).

Decline of accuracy over generations

The decline of accuracy of GEBVs over generations can be a measure of the persistency of the predicting ability for different methods. As shown in Figure 4, the average decreases in accuracy per generation from generation 2 to 6 were 0.021 and 0.026 for TAB and TAP, and 0.020 and 0.036 for BayesB and RRBLUP, respectively. Due to the high persistency of TAP, the advantage of TAP over RRBLUP in accuracy increased from 0.016 in generation 2 to 0.065 in generation 6. Again, GBLUP showed the same decline pattern as RRBLUP.

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Figure 4. Accuracy of genomic breeding values (GEBVs) using 5 different approaches.

The graph shows the correlation between estimated and true breeding values in generations 2–6 using GEBVs derived by a variable selection approach (BayesB), an approach using infinitesimal model (RRBLUP), BLUP methods with the trait-specific matrix using BayesB weights (TAB), the trait-specific matrix using infinitesimal model weights (TAP) and the average genomic relationship matrix using the infinitesimal model (GBLUP).

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Effect of number of simulated QTL

With the increase of the number of simulated QTL from 50 to 1,000, the accuracy of GEBVs in generation 2 decreased consistently for BayesB, increased consistently for RRBLUP and GBLUP (except for the case of 200 QTL), and decreased first (from 50 to 200 QTL) and then increased (from 200 to 1000 QTL) for both TABLUP methods, as shown in Table 3. A general tendency is that the differences between different methods reduced along with the increase of the number of QTL. It seems that BayesB is more sensitive to the number of QTL than the other methods, in particular when the number of QTL increased from 50 to 200. Therefore, the advantage of BayesB over the other methods decreased with the increase of number of QTL.

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Table 3. Accuracy of GEBVs for different simulated QTL numbers in generation 2 (h² = 0.5).

https://doi.org/10.1371/journal.pone.0012648.t003

Effect of heritability

Table 4 shows the accuracies of GEBVs for different methods while varying the heritability. By decreasing the heritability from 0.9 to 0.05, the accuracies of all methods decreased as expected. Again, TAB performed slightly worse than BayesB but better than all other BLUP-type methods in all cases, although its advantage declined with the decrease of heritability.

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Table 4. Accuracy of GEBVs for different heritability in generation 2 (N_qtl = 50).

https://doi.org/10.1371/journal.pone.0012648.t004