We used two types of data: (i) complete genomes; and (ii) synthetic metagenomic fragments. These datasets are described in the following sections.

We now describe how we preprocessed the data to perform our analysis.

The next step is implementing a score function, which provides, under a specific configuration, a score for the degree of separability of the taxonomic classes. To formally define this function, we will adopt the following notation. D = {G, F} is the dataset, in which G represents the genomic sequences and F is the metagenomic synthetic fragments. T = {do, ph, cl, or, fa, ge, sp} is the taxon set, which represents the sequence's taxonomic lineage. N = {1, 2, . . . , 10} is the set of lengths of n-mers and S = {1, 2, ∞, kl} represents the set of similarity measures, where 1 is the 1-norm distance (Equation 1), 2 represents the 2-norm (Euclidean) distance (Equation 2), and ∞ is the ∞-norm distance (Equation 3); kl is the Kullback-Leibler divergence (Equation 4).

s 1 ( x , y ) = ∑ i = 1 4 n | x i - y i | ,

s 2 ( x , y ) = ∑ i = 1 4 n | x i - y i | 2 1 / 2 ,

s ∞ ( x , y ) = max i = 1 , 2 , . . . , 4 n | x i - y i | ,

s k l ( x , y ) = ∑ i = 1 4 n x i ln x i y i .

A ={c, h} is the set of score measures. The element c represents the conventional score measure, in which the configuration is scored considering the sequence separately, and the element h is the hierarchical score measure, in which the configuration is scored with respect to the sequence's taxonomic context (see below). Considering this notation the score function is defined as follows:

f : D × T × N × S × A → [ 0 , 1 ] .

Thus, f (d, t, n, s, a) = y represents a score y to the dataset d, considering the taxon t, using a n-mer length of n to encode the sequences and the similarity measure s to check how similar the sequences are and, finally, using the score measure a. In other words, the score y is a measure of the degree of separability of the taxonomic classes in d at level t under the specific configuration induced by n, s, and a.

We now describe how we defined the score measures that were used to evaluate the classification problem.

The genomic dataset comprises 535 genomes encompassing 386 different species. Considering the conventional score measure, the configuration scores for this type of data at the level of species varied from f (G, sp, 1, kl, c) = 0.275, for the worst configuration, to f (G, sp, 5, 2, c) = 0.512, for the best configuration. The hierarchical scores varied between f (G, sp, 1, 2, h) = 0.378 and f (G, sp, 7, kl, h) = 0.532.

Figure 2 presents the configuration scores that were generated on the genomic dataset over the different taxa for n = 5 (this value was the value of n that generated the highest conventional scores). As shown in the figure, as we go downward in the taxonomic tree (t → species), the configuration score decreases. This decrease is expected, because a correct nearest-neighbor classification at level t implies a correct classification at level t - 1 (but not the converse). Observe that in the left graph in Figure 2 the score function actually increases when one moves from the taxon genus to the species. This increase is due to the removal of unique representatives of some species, as explained above. Surprisingly, varying the similarity measure s did not result in remarkable differences in the scores. As shown in Figure 2, the scores referring to s = 1, s = 2, and s = kl are very similar, and the scores computed with s = ∞ differ only slightly from the others. This phenomenon was observed across all configurations. Thus, from this point on, we will fix the similarity measure at s = kl and study the impact of the other variables over the scores.

Figure 3 shows the genomic scores per n-mer length for the different taxa. In Figure 3, it is difficult to identify the value of n that produces the best score, because from n = 2 to n = 8 the score curve is almost flat. From n = 1 to n = 2 there is a rough increase in the scores. This increase was expected, because n = 1 means counting the frequencies of the nucleotides A, T, C, and G, which does not provide sufficient information about the sequences to discriminate between the classes. In general, a small value for n represents two different sequences in a similar way. As an example, consider the taxonomic tree shown in Figure 4, which includes the phyla Crenarchaeota, Actinobacteria, Bacteroidetes, Thermotogae, and Chlamydiae. Although these phyla are distant from a taxonomic point of view, some of their members give rise to very similar frequency vectors, as shown in Table 1.

Observe also that from n = 8 to n = 10 the scores decrease slightly. This decrease is a consequence of the fact that, when n ≥ 8, the number of possible n-mer sequences is very large, which results in sparse frequency vectors with a low discriminative power. For example, if the similar sequences di = A A ATGGTA and d_j = A G ATGGTA are encoded with n = 8, the result is two vectors with 65, 536 positions filled with zeros in all but one position, which would contain a "1" representing the words d_i and d_j . Hence, we have two extremely similar sequences represented by two different frequency vectors, which clearly disrupts the score function f.

Concerning the two score measures, the hierarchical approach presented slightly better performance than the conventional score, as shown in Figures 2 and 3. This relationship suggests that decomposing the classification task into smaller sub-problems does indeed make the problem easier.

The synthetic dataset comprises 23, 000 fragments with approximately 400bp. As mentioned previously, these sequences were generated with the sequences simulator MetaSim 16 under the sequencing conditions of the 454 pyrosequencer. The configuration scores at the level of species varied between f(F, sp, 8, ∞, c) = 0.007 and f(F, sp, 4, kl, c) = 0.112 for the conventional score function, and between f(F, sp, 7, 1, h) = 0.113 and f(F, sp, 4, 1, h) = 0.5 when the hierarchical measure was considered.

Figure 5 shows the value of the score as a function of the taxonomic level t when n = 4. The first thing that stands out in this figure is the fact that, for the synthetic data, the advantage of using the hierarchical score measure over the conventional measure is much more expressive than with complete genomes. This result indicates that, when sequences are short, the overlap between the classes is less correlated with the taxonomic tree. In other words, the overlap between two classes at level t is not strongly affected by the fact that they belong to the same class at level t - 1. A possible explanation for this phenomenon is that shorter sequences give rise to higher variability within each class.

Again, changing the similarity measure s did not have a significant impact on the scores. Note, however, that with metagenomic fragments the use of s = ∞ has a degenerating impact over the scores which is more noticeable than the trend observed in the case of complete genomes (compare Figures 2 and 5). Figure 6 shows the conventional and hierarchical scores as a function of n when the KL divergence is adopted as the similarity measure. Here we observe curves similar to the curves shown in Figure 3, with the peak of each curve shifted slightly to the left. This change makes sense, because with shorter sequences the "sparsification" of frequency vectors discussed in the previous section occurs at smaller values of n. Additionally, note how the conventional scores of the metagenomic dataset are low at the taxonomic level of order and below. This trend suggests that using a single classifier in this case might not be the best alternative. Such an observation could be particularly helpful in the future development of composition-based classifiers, because one of the major problems with real metagenomic projects is the difficulty of obtaining accurate classification at lower taxonomic levels 8 12 .

In summary, we observed that the scores associated with metagenomic data are in general smaller than the scores generated with genomic data, and using a hierarchical classification approach in this case appears to be even more beneficial. Moreover, the value of n that generated the best results decreased from n ≈ 7 to n ≈ 4, which indicates that, when dealing with metagenomic fragments with approximately 400bp, there is no point in using frequency vectors that have a dimension much higher than 256.

In this section we summarize the results presented in the previous sections and provide an overview of our analysis. To accomplish those goals, we show in Figure 7 the scores that were generated with the genomic data at the level of species as a function of n and s, and in Figure 8 we show the same information for the scores generated with the metagenomic dataset. From examining these figures, we arrive at the following conclusions:

• The scores are an approximately concave function of n with a maximum value that is between 4 and 7; the "optimal" value of n is smaller for the metagenomic dataset.

• Changing the similarity measure s does not have a strong effect on the scores.

• The hierarchical classification scheme appears to be a better alternative for both genomic and metagenomic data; however, in the latter case, its advantage over the conventional classification approach is more evident.

• In general the scores that are associated with the metagenomic data are smaller than the scores that are associated with the genomic data, but the difference is more significant under the conventional classification scheme.

In conclusion, we show in Table 2 the configurations that produced the best results in both datasets. The values shown in Table 2 can serve as a starting point in the development of composition-based metagenomic classifiers.