Genome Sequences

Since the Ae. tauschii genome has not been sequenced, sequences of nine randomly selected megabase-size contigs of BAC clones totaling 9,796 kb were generated for this study [24]. The contigs were located in four of the seven Ae. tauschii chromosomes and originated from both distal and proximal chromosome regions. A total of 90 genes were manually annotated in the Ae. tauschii contigs suggesting an average gene density (excluding pseudogenes) of 1 gene/106 kb and predicting a total of 36,371 genes in the genome [24]. These estimates are close to those inferred for the wheat B genome on the basis of chromosome 3B BAC contig sequencing [20].

The orthologous regions in B. distachyon, rice and sorghum had been shown to harbor 62, 67 and 72 genes, respectively [24]. In all species analyzed, intergenic distances were measured as the distance between the start/end of the coding region of neighboring genes.

Because the Ae. tauschii BAC sequence consisted of, on average, 4.5 scaffolds per BAC [24] and the size of the gaps between scaffolds was unknown, we considered scaffolds as contiguous (that is, no extra bases were added to account for the sequence gaps) for the purpose of calculating the intergenic distances. This is unlikely to affect our analysis as the majority of small intergenic distances analyzed here (97% of intergenic distances ≤20 kb) were derived from genes located on the same scaffold. Also, although 64% of sequence scaffolds within a BAC clone could be ordered based on the overlap with neighboring BAC clones [24], some genes were located on unordered scaffolds. For those genes, we determined both the smallest and largest distance to the nearest gene considering all possible contig orders, and used the average between the two distance measurements in our statistical analyses (Table S1). For genes that were located on different BAC clones, intergenic distances were calculated as described above, but taking into account the overlap between neighboring BAC clones. To analyze the distribution of intergenic distances, all genes annotated in the orthologous regions in Ae. tauschii, B. distachyon, rice, and sorghum were taken into account (Tables S2, S3, S4). To analyze the level of gene island conservation across species, we only considered orthologous gene pairs that were present in all four species analyzed (Table S5).

Distribution of Intergenic Distances

An initial step in the analysis of gene density in the grass genomes is to formally test the pertinent null hypothesis that genes are randomly located along the chromosomes according to a uniform distribution. This distribution will arise if the locations of the genes along the chromosome follow a homogeneous Poisson process [25]. Under this model, gene locations are independent of one another and the expected number of genes in any one region is simply proportional to the length of that region.

A consequence of the gene locations following a homogeneous Poisson process is that the density of intergenic distances will follow an exponential distribution. This implies that rather than directly testing for the Poisson process or the uniform distribution conditional on the total number of genes, we can test for the exponential distribution using the aggregated sample of intergenic distances from the 9 sequenced contigs, viewing the collection as a random sample from the population of all intergenic distances in the genome.

For each of the four species, denoting the density function of the distribution of intergenic distances by , we tested the null hypothesis.H₀: The intergenic distances follow an exponential distribution, i.e.(1)vs H_A: The intergenic distances do not follow an exponential distribution.

(2)This test can be implemented with a chi-square goodness of fit test using 10 cells with varying bin widths. This leads to expected frequencies ranging from 5 to 10 per cell, depending on the species. Under H₀, the rate parameter λ was estimated using the maximum likelihood method. The applicable null distribution is a chi-square distribution with 8 degrees of freedom.

Intergenic Distances Density Estimation

An estimate of the true density of intergenic distances was achieved via non-parametric density estimation. We employed a binning approach, first binning the raw data then applying a local linear kernel smoother on the resulting histograms [26]. The initial histogram density estimate is defined in the following way: Given the random sample from the density of interest , define an equally spaced partition of by where . The bin width is determined by the number of bins so that . We use to denote the count of sample points falling within bin and to denote the midpoint of for so that The histogram density estimate of is given by(3)

We obtain from via local linear smoothing methods [27]. Formally, the estimate is obtained by minimizing the local weighted sums of squares,(4)for each with respect to and from which we obtain We used a Gaussian kernel and chose the bandwidth manually.

Conservation of Gene Islands Across Species

Gene pairs were used to evaluate the preservation of gene islands across species. For the purposes of this analysis we defined a gene pair as two genes that were neighbors in the ancestral grass genome [24] and that were both present in the analyzed species Ae. tauschii, B. distachyon, rice and sorghum. For each pair, we obtained the distance between the neighbors in each of the four species. In addition to 28 gene pairs identified from the Ae. tauschii data set, we also identified 8 gene pairs from sequenced BAC clones of hexaploid wheat cultivar Chinese Spring (J.L. Bennetzen and K.M. Devos, unpublished data) with orthologs in B. distachyon, rice and sorghum. In order to evaluate the preservation of gene islands across species we calculated Kendall's coefficient of concordance W [28], [29] using a correction for ties since the original data consists of raw distances rather than ranks. This statistic was then used to test significance of the coefficient of concordance by testing the null hypothesis .

Correlation of Distances between Neighboring Genes and Location of Contig on the Centromere-telomere Axis

The relative location of each contig on the centromere-telomere axis, ranging from 0 (centromere) to 1.0 (telomere), was downloaded from the Ae. tauschii genetic maps reported by Massa et al. [24]. Distances from the end of a gene to the beginning of the neighboring gene in nucleotides were determined for all nine contigs. Only distances between genes were measured; distances from the first and last gene to the respective contig edge were disregarded. For each contig, the empirical quantile function of intergenic distances was computed and distances within the first quartile were considered intra-insular distances and distances within the fourth quartile were considered inter-insular distances. In order to determine if a relationship exists between location on the centromere-telomere axis and gene island structure, we implemented the regression model:(5)where is the intergenic distance between the ith pair of genes, is the location along the centromere-telomere axis of the ith gene pair and if the pair is categorized as intra-insular and if the pair is categorized as inter-insular by the above quantile approach. For intra-insular distances, , and the model is(6)where represents the intercept and is the slope describing the linear relationship between intra-insular distances and location. For inter-insular distances, , and the model is(7)where represents the intercept and is the slope describing the linear relationship between inter-insular distances and location. This model allows for formal testing of the following two null hypotheses:

Repeat Elements in Intergenic Regions

All intergenic regions in the nine Ae. tauschii contigs that were 100 kb or less in length were analyzed for the presence of LTR retrotransposons by BLASTN searches against the Triticeae Repeat (TREP) database (http://wheat.pw.usda.gov/ITMI/Repeats/). We also conducted a BLASTN search of the intergenic regions against Triticeae sequences in the ‘High Throughput Genomic Sequences’ (HTGS) section of GenBank, which contains several hundred sequenced wheat and Ae. tauschii BAC clones. Intergenic regions with multiple hits were annotated according to the annotation found in the BAC clones deposited in GenBank. Hits with a minimum length of 50 bp and an e-value ≤1e⁻¹⁰ were considered significant (Table S1). LTR retrotransposons in rice intergenic regions were identified using the same criteria by BLASTN searches against the repeat database ISU Cereal Repeat DB 3.1 (http://magi.plantgenomics.iastate.edu) (Table S2).

Density Functions of Intergenic Distances

The graphs of the non-parametrically estimated density functions (dashed lines in Figure 1) show that short distances between neighboring genes are the most frequent distances in all four genomes. Short distances are also most frequent in the graphs of gene locations as captured by the null hypothesis of uniform locations of genes along chromosome arms given by Equation (1) (solid lines in Figure 1). In B. distachyon and rice, the non-parametric density functions do not significantly differ from the fitted exponential density for those species (Figures 1A and 1B and Table 1) and indicate that genes are not clustered in these species. In contrast, in sorghum and Ae. tauschii, non-parametric density functions significantly differ from the fitted exponential density and have several features in common (Figures 1C and 1D and Table 1). In both genomes, the non-parametric density graph is above the fitted exponential density graph for short intergenic distances, indicating the presence of too many short distances, and then below it, indicating too few intermediate distances. This pattern suggests that gene clustering is present. We propose to call these clusters “gene insulae” and the pattern of gene distribution observed in the sorghum and Ae. tauschii genomes as “insular gene distribution”. We propose this new term because the English term “gene islands” has been used for other forms of gene clustering (see Introduction).

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Figure 1. Density functions for intergenic distances in B. distachyon (A), rice (B), sorghum (C), and Ae. tauschii (D).

Shown is the exponential density fitted by Maximum Likelihood (2) (solid) and the non-parametric density estimate (4) (dashed), with bandwidth h = 1.25 (A), h = 1.75 (B), h = 1.50 (C), and h = 15.00 (D).

https://doi.org/10.1371/journal.pone.0054101.g001

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Table 1. Summary of test results for the null hypothesis that gene locations are uniformly distributed in the four species.

https://doi.org/10.1371/journal.pone.0054101.t001

The sorghum and Ae. tauschii non-parametric density graphs display an initial interval of very short intergenic distances on which the estimated non-parametric density function is concave down (Figures 1C and 1D). This portion of the graphs intersects the density function based on the null hypothesis at 3 kb and 22 kb in sorghum and Ae. tauschii, respectively, passes through a local minimum at 8 and 81 kb, respectively, changes to concave up, again intersects the function based on the null hypothesis and reaches a local maximum, with one or more additional concavity changes as the intergenic distances increase (Table 2). We propose using the first local minimum to separate the intra-insular intergenic distances on the left from inter-insular distances on the right. This choice is motivated by cluster analysis based on non-parametric density estimation [30]. The mean intergenic distance shorter than this minimum (i.e. the mean intra-insular distance) is 2.1 kb in sorghum and the average insula contains 3.7 genes. The mean intergenic distance shorter than this minimum is 16.7 kb in Ae. tauschii and the average insula contains 3.9 genes. The average intergenic distance longer than the first local minimum (i.e. the mean inter-insular distance) is 15.1 kb in the sorghum genome but is significantly larger at 205.2 kb in the Ae. tauschii genome (Mann-Whitney Test, P-value = 0). The distances shorter than this critical point represent 70% and 63% of all intergenic distances in the sorghum and Ae. tauschii genomes, respectively.

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Table 2. Insular structure in sorghum and Ae. tauschii.

https://doi.org/10.1371/journal.pone.0054101.t002

Gene Density along the Centromere-telomere Axis

Gene density increases from the proximal, low-recombination regions towards the distal, high-recombination regions in the Ae. tauschii chromosomes [17]. This gradient could be caused by a change in gene density within gene insulae, a change in the distances between gene insulae, or both. In order to determine which of these three possibilities is most consistent with the data, we fit the regression model in (5) to Ae. tauschii data after removing a single outlier due to its high influence on the parameter estimates. The fitted regression model (5) indicates no relationship between intra-insular distances and gene location along the centromere-telomere axis based on the high P values for parameters and (Table 3). Since cannot be distinguished from zero at the chosen significance level, the significance of indicates that while there is no significant relationship between intra-insular distances and insula location along the centromere-telomere axis there is a significant relationship between inter-insular distances and location along the centromere-telomere axis (Figures 2A and 2B). This relationship between inter-insular distances and gene location is quantified in equation (7) and results are shown in Table 4. The fitted regression model (7) indicates that there is a strong negative relationship between inter-insular distances and insula location along the centromere-telomere axis (Figure 2A). We therefore conclude that increase in gene density towards the ends of Ae. tauschii chromosomes is caused primarily by a decrease in the distances between insulae.

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Figure 2. Relationships between inter-insular distances (A), intra-insular distances (B) and the number of genes per insula (C) and gene location along the centromere-telomere axes of Ae. tauschii chromosome arms.

(A) shows a fitted regression line from Model (7) of the inter-insular distances and gene location on centromere-telomere axes of Ae. tauschii chromosome arms.

https://doi.org/10.1371/journal.pone.0054101.g002

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Table 3. Fitting the full regression model specified in equation (5) to the Ae. tauschii data.

https://doi.org/10.1371/journal.pone.0054101.t003

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Table 4. Fitting the regression model (7) to the Ae. tauschii data.

https://doi.org/10.1371/journal.pone.0054101.t004

It should be noted that as an alternative to the quantile approach to classify intergenic distances as intra-insular or inter-insular used here, we could have used the first local minimum at 81 kb as the boundary between intra-insular and inter-insular distances. In fact, we implemented this method as well and it yielded identical inferences. We report the results of the quantile approach because this method is particularly robust. Similarly, we tried several variance stabilizing transformations prior to fitting the regression model. In all cases, the inferences were identical. We therefore report here the most parsimonious model. Clearly there is a strong signal in the data indicating a negative relationship between inter-insular distances and insula location along the centromere-telomere axis.

To determine if there is a relationship between the insula size and its location on the centromere-telomere axis in Ae. tauschii, we plot the number of genes per insula and insula location on the centromere-telomere axis for 15 Ae. tauschii insulae (Figure 2C). There is no relationship between the number of genes per insula and insula location (r = 0.19, P-value = 0.42). The situation does not change after an obvious outlier (insula with 13 genes) is removed, (r = 0.06, P-value = 0.8). We conclude that the sizes of insulae do not appreciably change along the centromere-telomere axis in the Ae. tauschii genome.

Conservation of gene Insulae

Kendall’s coefficient of concordance W = 0.49, which indicates that there is a high level of concordance of distances between orthologous gene pairs in the four genomes. This means that gene pairs that are relatively close to one another in one genome are likely to be also close to one another in other genomes. Analogously, gene pairs that are relatively distant from each other in one genome are likely to be also far apart in the other three genomes. The null hypothesis that the intergenic distances are independent across genomes is rejected with P<0.001.

Gene Insulae and LTR Retroelements

In the Ae. tauschii genome, all inter-insular intergenic distances (distances >81 kb) contain LTR retrotransposons but only 27% of intra-insular intergenic distances contain LTR retrotransposons or their remnants. As shown in Figures 1C and 1D, most of the intra-insular distances are overrepresented relative to the uniform gene distribution. In the Ae. tauschii genome, only 9% these intergenic distance (distances ≤22 kb, Figure 1D) contain LTR retrotransposon remnants (Table S6), which indicates that the absence of LTR retrotransposon insertions is the primary contributor to the overrepresentation of short intergenic distances and an important attribute of insulae in the Ae. tauschii genome.