Theorem 1. When the number k of the pairwise comparisons grows, the ordered averages of ranks (a.o.r) r ̄ have a normal distribution. The mean of this distribution is a + b 2 and its variance is n 2 - 1 12 δ 2 , where a and b are the minimum and the maximum of the observed a.o.r r ̄ , respectively. δ is an average difference between consecutive ordered a.o.r. r ̄ .

Proof. We note r ̄ i = 1 k ∑ j = 1 k r ij the average of the components in r _i . Let us note the expectation and the variance of the ranks in vector r _i by E{r _i } = R _i and Var { r i } = σ R i 2 . Using the central limit theorem ( 24 , page 259) it follows that the quantity k σ R i ( r ̄ i - R i ) converges to a normal distributed variable having a mean of zero and a variance of one when k is high. Hence, we obtain n normal distributed variables R _i .

From the selection theorem ( 24 , page 267), the sequence of the n normal variables has a normal distribution. Expectation and variance of variable R _i are given by

E { R i } = 1 n ∑ i = 1 n R i

Var { R i } = E { R i 2 } - ( E { R i } ) 2

By replacing each normal variable R _i by the average of samples from which it is derived and by using ∑ i = 1 n i = n ( n + 1 ) 2 , we have

E { R i } = 1 n ( a + ( a + δ ) + ( a + 2 δ ) + … + ( a + ( n - 1 ) δ ) )

= 1 n ( na + ( 1 + 2 + … + ( n - 1 ) ) δ )

= 1 n na + n ( n - 1 ) 2 δ = a + ( n - 1 ) 2 δ = a + b 2

By using ∑ i = 1 n i 2 = n ( n + 1 ) ( 2 n + 1 ) 6 , we also have

E { R i 2 } = 1 n ( a 2 + ( a + δ ) 2 + ( a + 2 δ ) 2 + … + ( a + ( n - 1 ) δ ) 2 )

= 1 n ( n a 2 + 2 ( 1 + 2 + … + ( n - 1 ) ) a δ + ( 1 2 + 2 2 + … + ( n - 1 ) 2 ) δ 2 )

= 1 n n a 2 + n ( n - 1 ) a δ + n ( n - 1 ) ( 2 n - 1 ) 6 δ 2

= a 2 + ( n - 1 ) a δ + ( n - 1 ) ( 2 n - 1 ) 6 δ 2

Using equations 9 and 5, relation 2 leads to

Var { R i } = a 2 + ( n - 1 ) a δ + ( n - 1 ) ( 2 n - 1 ) 6 δ 2 - a + ( n - 1 ) 2 δ 2

= ( n - 1 ) 2 n - 1 6 - n - 1 4 δ 2 = n 2 - 1 12 δ 2

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FCROS algorithm

Synthetic datasets 1 To evaluate the behavior of the FCROS method in the presence of noise, we used three different values for the parameter σ _n of MADSIM. 100 simulations corresponding to different initializations (rseed = 10, 20, 30, …, 1000.) were used. All other parameters of MADSIM were set to their default settings. More precisely, m ₁ = m ₂ = 7, n = 10,000 and the proportion of DE genes was set to 0.02. These settings lead to an expected number of 200 DE genes. Additional file 1: Figure S1 shows the M-A plot 31 for 3 datasets which correspond to 3 setting values for parameter σ _n of MADSIM.

For each dataset, i.e. corresponding to a given value for parameters rseed and σ _n , we used the FCROS and the six other methods to determine the DE genes, the number of which was set to that of true DE genes. The genes selected by each method were split into two sets: true and false DE genes. The results are plotted in Figure 2, which shows that the FCROS, FC, RP, SAM and TREAT methods performed well, and that the Ttest and WAD methods had a lower performance. Of note, in these tests, the runtime of the FCROS method was more than hundred times faster than that of the RP method.

Synthetic dataset 2 We used MADSIM to generate a dataset with m ₁ = m ₂ = 15 and default settings for all other parameters. This dataset has 198 true DE genes. Additional file 1: Figure S2 shows the M-A plot 31 of this synthetic dataset. Synthetic dataset2 was used in different scenarios where we specified different values (m ₁ x m ₂) for the control and test samples, and performed the following steps: a) random selection of m ₁ control and m ₂ test samples from their respective sets, b) running the FCROS and the six other methods, c) selection of the top 198 DE genes for each method, and assignment of a value of 1 to true DE genes and of 0 to all other genes. These 3 steps are repeated 100 times and the total occurences of 1 for each method and m ₁ x m ₂ combination is calculated as its score, which is thus comprised between 0 and 100.

Results obtained for the seven methods are shown in Figure 3. The FCROS, FC, RP and TREAT methods had similar power of detection, with the TREAT and RP methods exhibited a slightly better performance for the case 3x3. The Student t-test and the WAD methods gave worse results than the other methods. In addition, we performed another run using the complete dataset (m ₁ = 15, m ₂ = 15). Table 1 shows the results obtained as well as the AUC (area under a ROC curve) values for the seven methods. The TREAT, FC and RP methods had the lowest error while the Ttest and WAD methods had the highest one.

Synthetic dataset 2: Selection, errrors and AUC for the seven methods. Error is calculated as the number of false genes detected divided by 198, the number of true DE genes in the dataset.

We recorded values for parameter δ for runs of the FCROS method. Results obtained are plotted in Additional file 1: Figure S3. The values for δ are close to 1 if control and test samples are not randomized, see panel A of Additional file 1: Figure S3. These values decrease towards 0.7 for random and an increasing number of control and test samples, see panel B of Additional file 1: Figure S3.