For this procedure, the p-values are transformed into z-values for which the theoretical distribution (under the null hypothesis) is a standard normal distribution. To take into account that f₀ may be different from the theoretical null distribution, the parameters are estimated from the observed distribution of the z-values as summarized below.

The density f is non-parametrically estimated using a general Poisson linear model, in which log(f(z)) is modeled as a natural spline function with seven degrees of freedom. Then, the null distribution parameters are estimated as follows. The expectation is taken as arg max(f^ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacuWGMbGzgaqcaaaa@2E11@(z)) and the variance is deduced by quadratically approximating log(f^ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacuWGMbGzgaqcaaaa@2E11@(z)) for central z-values (for which f₁(z) is supposed to be null). The proportion π₀ is then estimated by the ratio of the means f(z)¯/f0(z)¯ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaadaqdaaqaaiabdAgaMjabcIcaOiabdQha6jabcMcaPaaacqGGVaWldaqdaaqaaiabdAgaMnaaBaaaleaacqaIWaamaeqaaOGaeiikaGIaemOEaONaeiykaKcaaaaa@37E0@ calculated from these central z-values. The lFDR is finally estimated by lFDR(z)=π0_f0(z)/_f(z)_ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGSbaBcqWGgbGrcqWGebarcqWGsbGucqGGOaakcqWG6bGEcqGGPaqkcqGH9aqpdaqiaaqaaGGaciab=b8aWnaaBaaaleaacqaIWaamaeqaaaGccaGLcmaadaqiaaqaaiabdAgaMnaaBaaaleaacqaIWaamaeqaaOGaeiikaGIaemOEaONaeiykaKIaei4la8cacaGLcmaadaqiaaqaaiabdAgaMjabcIcaOiabdQha6jabcMcaPaGaayPadaaaaa@45D5@. It should be noted that in addition to the normality assumption for the z-values under the null hypothesis, the procedure is also based on the assumptions that central z-values mainly consist of true null hypotheses and that the proportion (1 - π₀) of modified genes is small. In particular, Efron recommends using this procedure for π₀ > 90%.

Assuming that the p-values are uniformly distributed under the null hypothesis (f₀ = 1), the procedure is based on the separate estimations of π₀ and f .

Ordering the p-values (p₍₁₎ ≤...≤ p_(m)), as Aubert et al. 13 did, a natural estimator of f is:

f ^ ( p ( i ) ) = F ^ ( p ( i + 1 ) ) − F ^ ( p ( i − 1 ) ) p ( i + 1 ) − p ( i − 1 ) = 2 m p ( i + 1 ) − p ( i − 1 ) MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=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@6870@

where F^ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacuWGgbGrgaqcaaaa@2DD1@ is the empirical cumulative distribution function of the p-values. The resulting estimator for this lFDR is then lFDR_(p(i))=mπ^0(p(i+1)−p(i−1))2 MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGSbaBdaqiaaqaaiabdAeagjabdseaejabdkfasbGaayPadaGaeiikaGIaemiCaa3aaSbaaSqaaiabcIcaOiabdMgaPjabcMcaPaqabaGccqGGPaqkcqGH9aqpdaWcaaqaaiabd2gaTHGaciqb=b8aWzaajaWaaSbaaSqaaiabicdaWaqabaGccqGGOaakcqWGWbaCdaWgaaWcbaGaeiikaGIaemyAaKMaey4kaSIaeGymaeJaeiykaKcabeaakiabgkHiTiabdchaWnaaBaaaleaacqGGOaakcqWGPbqAcqGHsislcqaIXaqmcqGGPaqkaeqaaOGaeiykaKcabaGaeGOmaidaaaaa@4E89@. However, as noted by Aubert et al. 13, the variance of this estimator is large. A more stable estimator, related to the moving average methodology and corresponding to a generalization of the estimator 6, was given by the authors 13. To estimate the probability π₀, Aubert et al. 13 proposed using an existing procedure, like those proposed by Storey and Tibshirani 16 or Hochberg and Benjamini 17.

As for the procedure proposed by Aubert et al., the p-values are supposed to be uniformly distributed under the null hypothesis. Thus, this procedure is based on the separate estimations of π₀ and f . The marginal distribution f is estimated by dividing the interval [0, 1] into 100 equidistant bins from which a corresponding histogram is derived. A smoothing spline with seven degrees of freedom is then used to estimate f.

The probability π₀ is estimated by a stochastic downhill algorithm (summarized below) with the intention of finding the largest subset of genes that could follow a uniform distribution. A penalized Kolmogoroff-Smirnoff score related to the uniform distribution is calculated for the whole gene set:

S ( J ) = max ⁡ i ∈ J | F J ( u i ) − u i | + λ m − | J | m log ⁡ ( m − | J | ) MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGtbWucqGGOaakcqWGkbGscqGGPaqkcqGH9aqpdaWfqaqaaiGbc2gaTjabcggaHjabcIha4bWcbaGaemyAaKMaeyicI4SaemOsaOeabeaakiabcYha8jabdAeagnaaBaaaleaacqWGkbGsaeqaaOGaeiikaGIaemyDau3aaSbaaSqaaiabdMgaPbqabaGccqGGPaqkcqGHsislcqWG1bqDdaWgaaWcbaGaemyAaKgabeaakiabcYha8jabgUcaRGGaciab=T7aSnaalaaabaGaemyBa0MaeyOeI0IaeiiFaWNaemOsaOKaeiiFaWhabaGaemyBa0gaaiGbcYgaSjabc+gaVjabcEgaNjabcIcaOiabd2gaTjabgkHiTiabcYha8jabdQeakjabcYha8jabcMcaPaaa@5EDE@

where m is the total number of genes, J is the set of genes under consideration (first, the whole set of genes), F_J is the empirical cumulative distribution for the set J, and λ is a tuning parameter adaptively chosen (for details on the choice of, λ see 14). Then, iteratively, genes are excluded so that the Kolmogoroff-Smirnoff score decreases. In practice, the procedure stops when the score is not reduced in 2m iterations. The score penalty takes into account the sample size m and avoids overfitting. At the end of the procedure, π₀ is estimated by the proportion of the remaining genes. Then, lFDR is estimated by lFDR_=π0_/f^ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGSbaBdaqiaaqaaiabdAeagjabdseaejabdkfasbGaayPadaGaeyypa0ZaaecaaeaaiiGacqWFapaCdaWgaaWcbaGaeGimaadabeaaaOGaayPadaGaei4la8IafmOzayMbaKaaaaa@391D@.

The procedure proposed by Broberg to estimate lFDR is also based on the assumption that the p-values are uniformly distributed under the null hypothesis. Then, as for the two previous methods, the procedure is based on the separate estimations of π₀ and f . The marginal density f of the p-values is estimated by a Poisson regression, similar to the procedure proposed by Efron. To enforce monotony, Broberg proposed using the Pooling Adjacent Violators algorithm (see 15 for details).

The probability π₀ is then estimated by min_p∈[0,1] f^ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacuWGMbGzgaqcaaaa@2E11@(p). Then, lFDR is estimated by lFDR_=π0_f^ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGSbaBdaqiaaqaaiabdAeagjabdseaejabdkfasbGaayPadaGaeyypa0ZaaSaaaeaadaqiaaqaaGGaciab=b8aWnaaBaaaleaacqaIWaamaeqaaaGccaGLcmaaaeaacuWGMbGzgaqcaaaaaaa@3847@.

Through different estimations of π₀, f₀ and f, these four procedures attempt to estimate an upper bound of lFDR. However, each of these methods has its own drawback. Efron's procedure 612 is restricted to situations in which π₀ > 90%. The method of Aubert et al. 13 yields an estimator with a large variance. Sheid and Spang's procedure 14 is based on an iterative algorithm and requires extensive computational time (for large datasets). Finally, Broberg's approach 15 sometimes substantially underestimates lFDR. Our procedure, developed in details under Methods, is based on a polynomial regression under monotony and convexity constraints of the inverse function of the empirical cumulative distribution. Thus, an estimated upper bound of lFDR with small variability can be expected, regardless of the true value of π₀.

To compare our new estimator to the four previously published procedures, we performed a simulation study. Data were generated to mimic a two-class comparison study with normalized log-ratio measurements for m genes (i = 1,...,m) obtained from 20 experiments corresponding to two conditions (j = 1, 2), each with 10 replicated samples (k = 1,...,10), which corresponds to classical sample sizes for differential gene-expression studies. Two total numbers of genes were considered: one small (m = 500) and one larger (m = 5, 000). In each case, all values were independently sampled from a normal distribution, X_i,j,k ~ N(μ_ij, 1). For the first condition (j = 1), all data were simulated with μ_i1 = 0. For the second condition (j = 2), a proportion π₀ of genes was simulated with μ_i2 = 0 (unmodified genes), while modified genes were simulated using three different configurations: (a) μ_i2 = 1 for the first half, μ_i2 = 2 for the second half; (b) μ_i2 = 0.5 for the first half, μ_i2 = 1 for the second half; and (c) μ_i2 = 0.5 for the first third, μ_i2 = 1 for the second third and μ_i2 = 2 for the last third.

In this way, we tried to mimic realistic situations with different patterns. Here, the distribution of modified genes is a simple mixture of two components with small expression differences (configuration (a)) and large expression differences (configuration (b)), or a more complex mixture with three components (configuration (c)).

Four different π₀ values were considered. Because Efron's procedure was developed for situations with π₀ values greater than 0.90, we used π₀ = 0.9 and π₀ = 0.98. We also considered two lower values of π₀ that correspond to realistic situations not considered by Efron (π₀ = 0.8 and π₀ = 0.6). In total, 2 × 3 × 4 = 24 different cases were considered.

To evaluate the behavior of the five procedures in the context of dependent data, we also generated datasets with so-called clumpy dependence (that is, datasets for which the measurements on the genes are dependent in small groups, with each group being independent of the others).

We applied the protocol described in 18 and 19 as follows: First, an independent dataset matrix (x_ijk) was generated, as described above. Then, for each group of 100 genes, a random vector A = {a_jk}, where j = 1, 2 and k = 1,..., 10 was generated from a standard normal distribution. The data matrix (y_ijk) was then built so that: yijk=ρajk+1−ρxijk MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWG5bqEdaWgaaWcbaGaemyAaKMaemOAaOMaem4AaSgabeaakiabg2da9maakaaabaacciGae8xWdihaleqaaOGaemyyae2aaSbaaSqaaiabdQgaQjabdUgaRbqabaGccqGHRaWkdaGcaaqaaiabigdaXiabgkHiTiab=f8aYbWcbeaakiabdIha4naaBaaaleaacqWGPbqAcqWGQbGAcqWGRbWAaeqaaaaa@43FE@ with ρ = 0.5. Thus, in each group, the genes have the same correlation, that is to say for i₁ ≠ i₂, Corr(yi1j,yi2j)=0.5 MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGdbWqcqWGVbWBcqWGYbGCcqWGYbGCcqGGOaakcqWG5bqEdaWgaaWcbaGaemyAaK2aaSbaaWqaaiabigdaXaqabaWccqWGQbGAaeqaaOGaeiilaWIaemyEaK3aaSbaaSqaaiabdMgaPnaaBaaameaacqaIYaGmaeqaaSGaemOAaOgabeaakiabcMcaPiabg2da9iabicdaWiabc6caUiabiwda1aaa@4382@. To render the results comparable with those obtained in the independent setting, the expectations μ_ij used for generating the matrix (x_ijk) were divided by 1−ρ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaadaGcaaqaaiabigdaXiabgkHiTGGaciab=f8aYbWcbeaaaaa@306B@ so that the expectations of the random variables Y_ijk correspond to those described in configurations (a), (b) and (c) for independent data. We also considered other ρ values that gave similar results (data not shown).

In each case, the p-values, calculated under the null hypothesis H₀ : μ_i1 = μ_i2, were obtained from the Student's statistic. Then, we estimated lFDR from our procedure, referred to as polfdr, and the four procedures presented in the background section, referred to as locfdr (Efron), LocalFDR (Aubert et al.), twilight (Scheid and Spang), pava.fdr (Broberg). Although these procedures were not designed to estimate the probability π₀ independently of lFDR, we also compared the estimators of π₀ obtained from the five procedures.

For each case, 1,000 datasets were simulated. To compare the different estimators, we considered three different criteria that are described below.

Since the main contribution of lFDR is that it gives each tested hypothesis its own measure of significance, a small bias for any value within the whole interval [0, 1] can be preferable to a smaller bias limited to a subset of values within the interval. For this purpose and to assess the amplitude of the bias for the five procedures, we considered the infinity norm of the integrated error over the interval [0, 1] defined as follows:

b 1 = max ⁡ p ∈ [ 0 , 1 ] | E { l F D R _ ( p ) − l F D R ( p ) } | MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGIbGydaWgaaWcbaGaeGymaedabeaakiabg2da9maaxababaGagiyBa0MaeiyyaeMaeiiEaGhaleaacqWGWbaCcqGHiiIZcqGGBbWwcqaIWaamcqGGSaalcqaIXaqmcqGGDbqxaeqaaOWaaqWaaeaacqWGfbqrcqGG7bWEcqWGSbaBdaqiaaqaaiabdAeagjabdseaejabdkfasbGaayPadaGaeiikaGIaemiCaaNaeiykaKIaeyOeI0IaemiBaWMaemOrayKaemiraqKaemOuaiLaeiikaGIaemiCaaNaeiykaKIaeiyFa0hacaGLhWUaayjcSdaaaa@553B@

and estimated by:

b ^ 1 = max ⁡ i = 1 , ... , m | 1 1 , 000 ∑ k = 1 1 , 000 { l F D R _ ( p i ( k ) ) − l F D R ( p i ( k ) ) } | MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=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@6E08@

where pi(k) MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGWbaCdaqhaaWcbaGaemyAaKgabaGaeiikaGIaem4AaSMaeiykaKcaaaaa@32AE@i = 1,...,m are the m p-values corresponding to the k^th dataset (among the 1,000 simulated datasets for each case). Here, the theoretical values lFDR(pi(k) MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGWbaCdaqhaaWcbaGaemyAaKgabaGaeiikaGIaem4AaSMaeiykaKcaaaaa@32AE@) are calculated from a numerical approximation of the non-centered Student's distribution 20.

The estimated values of b₁ for independent data are reported in the Table 1. Although these values were always less than or equal to 0.17 for the polfdr procedure, the highest b₁ values for the LocalFDR, pava.fdr, twilight and locfdr procedures were 0.20, 0.21, 0.43 and 0.87, respectively. These results also showed that the locfdr method tended to substantially overestimate lDFR. For example, Figure 1 shows the expected lFDR as a function of p for each estimator with m = 500, π₀ = 0.8 and configuration (c) (the figures corresponding to all the other cases are provided in additional files). For these figures, the horizontal scale was log-transformed to better demonstrate the differences between the methods for small p-values. For dependent datasets, the bias of the five estimators increased. While the bias of our estimator was always less than or equal to 0.17, the highest bias values for the methods pava.fdr, LocalFDR, twilight, locfdr were 0.20, 0.23, 0.41 and 0.87, respectively (see additional files, Table 10).

As noted under Background, the five methods were designed to estimate an lFDR upper bound. However, a negative bias can occur in some cases, leading to more false positive results than expected. In this context, we propose investigating with the five procedures the minimal negative bias, denoted b₂, over the interval [0, 1]:

b 2 = | min ⁡ p ∈ [ 0 , 1 ] ( E [ l F D R _ ( p ) − l F D R ( p ) ] × 1 { E [ l F D R _ ( p ) − l F D R ( p ) ] < 0 } ) | MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGIbGydaWgaaWcbaGaeGOmaidabeaakiabg2da9maaemaabaWaaCbeaeaacyGGTbqBcqGGPbqAcqGGUbGBaSqaaiabdchaWjabgIGiolabcUfaBjabicdaWiabcYcaSiabigdaXiabc2faDbqabaGcdaqadaqaaiabdweafjabcUfaBjabdYgaSnaaHaaabaGaemOrayKaemiraqKaemOuaifacaGLcmaacqGGOaakcqWGWbaCcqGGPaqkcqGHsislcqWGSbaBcqWGgbGrcqWGebarcqWGsbGucqGGOaakcqWGWbaCcqGGPaqkcqGGDbqxcqGHxdaTcqaIXaqmdaWgaaWcbaGaei4EaSNaemyrauKaei4waSLaemiBaW2aaecaaeaacqWGgbGrcqWGebarcqWGsbGuaiaawkWaaiabcIcaOiabdchaWjabcMcaPiabgkHiTiabdYgaSjabdAeagjabdseaejabdkfasjabcIcaOiabdchaWjabcMcaPiabc2faDjabgYda8iabicdaWiabc2ha9bqabaaakiaawIcacaGLPaaaaiaawEa7caGLiWoaaaa@7351@

and estimated by:

b ^ 2 = | min ⁡ i = 1 , ... , m ( 1 1000 ∑ k = 1 1000 { l F D R _ ( p i ( k ) ) − l F D R ( p i ( k ) ) } × 1 { 1 1000 ∑ k = 1 1000 { l F D R _ ( p i ( k ) ) − l F D R ( p i ( k ) ) } < 0 } ) | MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=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@A09E@

Results for independent datasets (Table 2) indicated that all the estimators have non-negligible minimal negative biases. However, while b₂ was always less than or equal to 0.08 for our method, the maximal b₂ values were 0.11, 0.18, 0.21 and 0.43 for the estimators locfdr, LocalFDR, pava.fdr and twilight, respectively. More precisely, while our estimator slightly underestimated lFDR in some cases, when π₀ was close to 1, the twilight method tended to underestimate lFDR for small p-values (see Figure 1) and the pava.fdr method tended to substantially underestimate lFDR for all p-values (for example, see Figure 2). The pava.fdr method underestimation can be attributed to the upper bound of π₀, which is estimated by min[f^ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacuWGMbGzgaqcaaaa@2E11@(p_(i))], because E{min[f^ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacuWGMbGzgaqcaaaa@2E11@(p_(i))]} ≤ min[Ef^ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacuWGMbGzgaqcaaaa@2E11@(p_(i))}]. Thus, even though this method can sometimes lead to a low bias (because its negative bias compensates for the gap between the upper bound and the true value), this estimator can generate high negative bias (see Figure 2). These results also indicated that even though the locfdr method tended to overestimate lFDR for the majority of p-values, it also tended to underestimate lFDR for p-values close to 1.

To evaluate the accuracy of the five procedures at all points simultaneously, we estimated the root mean integrated square error (RMISE) of the five estimators which is defined by:

R M I S E = E [ ∫ 0 1 ( l F D R _ ( p ) − l F D R ( p ) ) 2 d p ] MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaacqWGsbGucqWGnbqtcqWGjbqscqWGtbWucqWGfbqrcqGH9aqpdaGcaaqaaiabdweafnaadmaabaWaa8qmaeaadaqadaqaaiabdYgaSnaaHaaabaGaemOrayKaemiraqKaemOuaifacaGLcmaacqGGOaakcqWGWbaCcqGGPaqkcqGHsislcqWGSbaBcqWGgbGrcqWGebarcqWGsbGucqGGOaakcqWGWbaCcqGGPaqkaiaawIcacaGLPaaadaahaaWcbeqaaiabikdaYaaakiabdsgaKjabdchaWbWcbaGaeGimaadabaGaeGymaedaniabgUIiYdaakiaawUfacaGLDbaaaSqabaaaaa@5149@

and estimated by:

R M I S E _ = 1 1 , 000 ∑ k = 1 1 , 000 ∑ i = 1 m [ ( l F D R _ ( p i ( k ) ) − l F D R ( p i ( k ) ) ) 2 × ( p ( i + 1 ) ( k ) − p ( i ) ( k ) ) ] MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=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@7F8F@

As shown in Table 3, these results indicated that, except for the pava.fdr method (which can substantially underestimate lFDR, as shown above), our method gave the lowest RMISE in 15/24 cases. For the 6 cases with π₀ close to one (π₀ = 0.98), the locfdr method yielded the lowest RMISE. For the last 3 cases, the difference between our method's RMISE and the lowest value (obtained with the twilight estimator) did not exceed 0.4% (case 7). Moreover, these results also indicated that the LocalFDR estimator, despite a small bias in all cases had a higher RMISE than our estimator due to its wide variance.

For dependent data, the RMISE of the five estimators increased and the differences were smaller. Our method yielded the lowest RMISE for 7/24 cases (see the Table 12 in additional files).

However, because in practice, some investigators might want to select only genes with low lFDR, we also reported the results obtained with the 3 criteria over the interval [0, 0.2] (See additional files). They showed that our method maintained good performances compared to the four others. Other thresholds for the p-values were considered (10% and 40%) and gave similar results (data not shown).

To compare the performance of the different estimators of the parameter π₀ obtained with the different methods, we evaluated their expectations and their root mean square errors.

Table 4 gives the means of the five estimators of the parameter π₀ over the 1,000 simulated independent datasets (results for dependent datasets are provided in additional files, Tables 13–14). The average bias over the 24 simulated datasets was the smallest for our new method (0.1%) with a maximal positive bias of 12% (for m = 5, 000, π₀ = 60% and configuration (b)) and a maximal negative bias of 4% (for m = 500, π₀ = 98% and configuration (c)). It is worth noting that the method with the highest positive bias was locfdr (29%), while the one with the highest negative bias was pava.fdr (13%).

The estimated root mean square errors for each estimator of the parameter π₀ are given in Table 5. Note that the root mean square errors of our estimator were less than or equal to 0.126 for the 24 simulated datasets, while it could reach 0.130, 0.132, 0.145 and 0.292 for locfdr, LocalFDR, twilight and pava.fdr methods, respectively.

Concerning computing time, our procedure was rapid, while the twilight method was cumbersome and impracticably long for large numbers of tested hypotheses. For example, the means of computing times on a personal computer (over 20 simulated datasets) for m = 5, 000, π₀ = 0.6 and configuration (c) were 50s, 2s, 1s, 1s and 1s for the methods twilight, LocalFDR, polfdr, pava.fdr and locfdr, respectively. For a larger number tested hypotheses m = 50, 000 (not considered in the simulation study), the means of computing times were 7,261s, 162s, 108s, 2s and 1s, respectively.

Our method, together with twilight, LocalFDR, locfdr and pava.fdr, was applied to two datasets from genomic breast-cancer studies (Hedenfalk et al. 21 and Wang et al. 22).

Let's consider ϕ = F^-1(p), the inverse cumulative distribution function of the p-values. Then, ∀p ∈ [0, 1], ϕ(F(p)) = p and 1/f is the first derivative of the function ϕ. Indeed, since ϕ ∘ F is the identity function:

d ϕ ( F ( p ) ) d p = 1 . MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaadaWcaaqaaiabdsgaKHGaciab=v9aQjabcIcaOiabdAeagjabcIcaOiabdchaWjabcMcaPiabcMcaPaqaaiabdsgaKjabdchaWbaacqGH9aqpcqGGUaGlaaa@3A66@

Moreover:

d ϕ ( F ( p ) ) d p = d F ( p ) d p × d ϕ ( F ( p ) ) d F ( p ) = f ( p ) × d ϕ ( F ( p ) ) d F ( p ) . MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaadaWcaaqaaiabdsgaKHGaciab=v9aQjabcIcaOiabdAeagjabcIcaOiabdchaWjabcMcaPiabcMcaPaqaaiabdsgaKjabdchaWbaacqGH9aqpdaWcaaqaaiabdsgaKjabdAeagjabcIcaOiabdchaWjabcMcaPaqaaiabdsgaKjabdchaWbaacqGHxdaTdaWcaaqaaiabdsgaKjab=v9aQjabcIcaOiabdAeagjabcIcaOiabdchaWjabcMcaPiabcMcaPaqaaiabdsgaKjabdAeagjabcIcaOiabdchaWjabcMcaPaaacqGH9aqpcqWGMbGzcqGGOaakcqWGWbaCcqGGPaqkcqGHxdaTdaWcaaqaaiabdsgaKjab=v9aQjabcIcaOiabdAeagjabcIcaOiabdchaWjabcMcaPiabcMcaPaqaaiabdsgaKjabdAeagjabcIcaOiabdchaWjabcMcaPaaacqGGUaGlaaa@696B@

Thus:

1 f ( p ) = d ϕ ( F ( p ) ) d F ( p ) MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaadaWcaaqaaiabigdaXaqaaiabdAgaMjabcIcaOiabdchaWjabcMcaPaaacqGH9aqpdaWcaaqaaiabdsgaKHGaciab=v9aQjabcIcaOiabdAeagjabcIcaOiabdchaWjabcMcaPiabcMcaPaqaaiabdsgaKjabdAeagjabcIcaOiabdchaWjabcMcaPaaaaaa@41B9@

Equation 16, illustrated in the Figure 5, is linked to the geometrical relationship between the FDR and lFDR, as noted by Efron 6.

Because the lFDR (and thus 1/f) is non-negative, the function ϕ is non-decreasing. Moreover, assuming that lFDR is non-decreasing with p (that is to say that, the closer a p-value is to one, the greater the probability that the null hypothesis is true), the function ϕ is convex. Then, we propose using a convex 10-degree polynomial for ϕ.

Therefore, we consider the following linear formulation to represent the relationship between the p-values and the empirical cumulative distribution function:

p = F ( p ) ˜ A + E MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaaieqacqWFWbaCcqGH9aqpdaaiaaqaaiab=zeagjabcIcaOiab=bhaWjabcMcaPaGaay5adaGae8xqaeKaey4kaSIae8xraueaaa@3703@

where p = t(p₍₁₎,...,p_(m)) is the column vector of observed p-values, F(p)˜=(F(p)˜0,...,F(p)˜d) MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaadaaiaaqaaGqabiab=zeagjabcIcaOiab=bhaWjabcMcaPaGaay5adaGaeyypa0ZaaeWaaeaadaaiaaqaaiabdAeagjabcIcaOiab=bhaWjabcMcaPaGaay5adaWaaWbaaSqabeaacqaIWaamaaGccqGGSaalcqGGUaGlcqGGUaGlcqGGUaGlcqGGSaaldaaiaaqaaiabdAeagjabcIcaOiab=bhaWjabcMcaPaGaay5adaWaaWbaaSqabeaacqWGKbazaaaakiaawIcacaGLPaaaaaa@4524@, F(p)˜ MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaadaaiaaqaaiabdAeagjabcIcaOGqabiab=bhaWjabcMcaPaGaay5adaaaaa@31A4@ is the vector of the empirical cumulative distribution function of the p-values, A = t(a₀,...,a_d) is the column vector of the polynomial's coefficients, d is the degree of the polynomial, and E, the error term, is a random vector for which the expectation is 0.

The estimator of the polynomial regression coeffcients' vector A can be obtained by solving the following least-square minimization problem with constraints:

min ⁡ C A ≥ 0 ‖ F ( p ) ˜ A − p ‖ 2 MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaadaWfqaqaaiGbc2gaTjabcMgaPjabc6gaUbWcbaacbeGae83qamKae8xqaeKaeyyzImRae8hmaadabeaakmaafmaabaWaaacaaeaacqWFgbGrcqGGOaakcqWFWbaCcqGGPaqkaiaawoWaaiab=feabjabgkHiTiab=bhaWbGaayzcSlaawQa7amaaCaaaleqabaGaeGOmaidaaaaa@4261@

where

C = ( 0 ⋯ d ( d − 1 ) ( 1 m ) d − 2 ⋯ k ( k − 1 ) ( i m ) k − 2 ⋯ 0 ⋯ d ( d − 1 ) ( m m ) d − 2 0 ⋯ d ( 1 m ) d − 1 ⋯ k ( i m ) k − 1 ⋯ 0 ⋯ d ( m m ) d − 1 ) MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=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@880F@

We impose the constraints CA ≥ 0 on our minimization problem due to the convexity and monotony of ϕ, which can be written: ∀i ∈ {1,...,m}, ϕ″(i/m)=∑k=2d{k(k−1)(im)k−2×ak}≥0 MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaaiiGacuWFvpGAgaGbaiabcIcaOiabdMgaPjabc+caViabd2gaTjabcMcaPiabg2da9maaqadabaWaaiWabeaacqWGRbWAcqGGOaakcqWGRbWAcqGHsislcqaIXaqmcqGGPaqkdaqadaqaamaalaaabaGaemyAaKgabaGaemyBa0gaaaGaayjkaiaawMcaamaaCaaaleqabaGaem4AaSMaeyOeI0IaeGOmaidaaOGaey41aqRaemyyae2aaSbaaSqaaiabdUgaRbqabaaakiaawUhacaGL9baaaSqaaiabdUgaRjabg2da9iabikdaYaqaaiabdsgaKbqdcqGHris5aOGaeyyzImRaeGimaadaaa@5392@ and ϕ′(i/m)=∑k=1d{k(im)k−1×ak}≥0 MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaaiiGacuWFvpGAgaqbaiabcIcaOiabdMgaPjabc+caViabd2gaTjabcMcaPiabg2da9maaqadabaWaaiWabeaacqWGRbWAdaqadaqaamaalaaabaGaemyAaKgabaGaemyBa0gaaaGaayjkaiaawMcaamaaCaaaleqabaGaem4AaSMaeyOeI0IaeGymaedaaOGaey41aqRaemyyae2aaSbaaSqaaiabdUgaRbqabaaakiaawUhacaGL9baaaSqaaiabdUgaRjabg2da9iabigdaXaqaaiabdsgaKbqdcqGHris5aOGaeyyzImRaeGimaadaaa@4E9F@. Quadratic programming is used to calculate the solution (29). Finally, an estimate of 1/f(p) = ϕ'(p) is deduced from the estimated regression coefficients.

Classical approaches attempted to estimate π₀ from f(1), which is the lowest upper bound of π₀ based on the mixture model (4). Indeed, if no assumption is made for f₁, π₀ is not identifiable and f(1) is the lowest upper bound based on the equation (4). Here, we propose using the same model to estimate π₀ that is used to estimate 1/f. Therefore, we consider the reciprocal of the function ϕ. However, due to higher bias and variance at the boundaries of the domain, estimating π₀ from a value close (but not equal) to 1 is more appropriate. In order to obtain a less sensitive estimator with respect to ϕ', it is reasonable to estimate π₀ at the point where ϕ" is at its minimum:

π ^ 0 = 1 ϕ ′ ( arg ⁡ min ⁡ x > a ( ϕ ″ ( x ) ) ) . MathType@MTEF@5@5@+=feaafiart1ev1aaatCvAUfKttLearuWrP9MDH5MBPbIqV92AaeXatLxBI9gBaebbnrfifHhDYfgasaacH8akY=wiFfYdH8Gipec8Eeeu0xXdbba9frFj0=OqFfea0dXdd9vqai=hGuQ8kuc9pgc9s8qqaq=dirpe0xb9q8qiLsFr0=vr0=vr0dc8meaabaqaciaacaGaaeqabaqabeGadaaakeaaiiGacuWFapaCgaqcamaaBaaaleaacqaIWaamaeqaaOGaeyypa0ZaaSaaaeaacqaIXaqmaeaacuWFvpGAgaqbaiabcIcaOiGbcggaHjabckhaYjabcEgaNjGbc2gaTjabcMgaPjabc6gaUnaaBaaaleaacqWG4baEcqGH+aGpcqWGHbqyaeqaaOGaeiikaGIaf8x1dOMbayaacqGGOaakcqWG4baEcqGGPaqkcqGGPaqkcqGGPaqkaaGaeiOla4caaa@48F6@

In practice, we propose setting a = 0.5. Note that the estimation of π₀ is not sensitive to the choice of a and other values can be considered.