MRI Data Acquisition

The current research was approved by the Institutional Review Board of Peking University. MRI data was obtained from an open source website (http://fcon_1000.projects.nitrc.org/fcpClassic/FcpTable.html) provided by the ‘1000 Functional Connectomes’ Project. Data (122 females, 76 males, age range: 18–26 years old) was collected by Beijing Normal University and analyzed in the current study. All of the subjects had no history of psychiatric disorders, or any neurological illness. Informed written consent forms were obtained from each participant prior to scanning in accordance with Institutional Review Board guidelines of Beijing Normal University and in compliance with the Declaration of Helsinki.

All data were acquired on a 3.0Tesla MR system (Siemens 3T Trio). All subjects were required to rest with their eyes closed, with no particular thoughts during the scan and they were asked not to fall asleep. A gradient echo T2*-weighted EPI sequence was applied to acquire resting state functional images with the following parameters: TR = 2000 ms, TE = 30 ms, flip angle = 80°; matrix size = 64 × 64, FOV = 240 × 240 mm², which gave an in-plane resolution of 3.75 mm × 3.75 mm, 51 axial slices (3.5 mm thickness with a gap of 1.2 mm). The scan of resting state fMRI lasted 450 seconds, covering 225 brain volumes. In addition, a T1-weighted three-dimensional magnetization prepared rapid gradient echo (MPRAGE) sequence was acquired that covered the entire brain, with the following parameters: 128 slices, TR = 2530 ms, TE = 3.39 ms, flip angle = 7°, inversion time = 1100 ms, FOV = 256 × 256 mm and in-plane resolution = 256 × 256.

Image Preprocessing

Images were analyzed by using both the FMRIB Software Library (FSL: http://www.fmrib.ox.ac.uk/fsl, version 5.0) and Analysis of Functional NeuroImaging (AFNI: http://afni.nimh.nih.gov/afni, version 2011_12_21_1014). The main preprocessing included the following steps: (1) the removal of the first 10 time points for the signal steady state and for the adaptation of the participants to the environment (AFNI: 3dcalc); (2) the correction for the difference in image acquisition time among the slices (AFNI: 3dTshift) and head motion during data acquisition (AFNI: 3dvolreg) on the remaining 215 volumes of the functional BOLD images. Hence, the mean image was acquired by averaging the volumes of each subject (AFNI: 3dTstat). Subjects with translational or rotational parameters exceeding ± 1 mm or ± 1° in their data were excluded, therefore, 161 subjects were eventually included in the analysis; (3) the co-registration of the individual structural image to the mean functional image by using a linear transformation (FSL: flirt) and the estimation of a nonlinear transformation from individual space of the co-registered structural image into MNI152 space (FSL: flirt and fnirt); (4) spatial normalization of the functional image to a standard template (Montreal Neurological Institute) by using the normalization parameters estimated in the last procedure (FSL: applywarp), resulting in a functional image series of 61×73×61 voxels (3-mm isotropic voxels). (5) the performance of a regression of nuisance variables (including white matter, ventricular signals, global signals and the six motion parameters determined in the realignment procedure) from the data to reduce the influence of motion and unspecific physiological effects (AFNI: 3dDeconvolve), but not spatially smoothed as previously suggested [11]; and (6) the regression of the linear trend from the time course of each voxel to remove signal drifts caused by scanner instability or other sources (AFNI: 3dTcat).

Complementary ensemble empirical mode decomposition

CEEMD originates from EMD invented by Huang [20] and extended from ensemble empirical mode decomposition (EEMD) by Wu [21]. The detailed description of EMD was presented in the supplementary materials. The EEMD generates an ensemble of data sets by adding different realizations of a white noise with finite amplitude ε0 to the original data. EMD analysis is then applied to each data series of the ensemble; ultimately, the IMFs are achieved by averaging the respective components in each realization over the ensemble [21]. The averaging effect of the assisted white noise εf decreases as: (1)

In Eq 1, ε = ε0std(y0) and ε0 is the input noise level, where y0 represents the input signal and NE is the ensemble number. Theoretically, NE approaches infinity in order to smooth out the assisted white noise. In practice, ε0 is selected in the interval of 0.1–0.4; NE of the order of 100 will generally produce satisfactory results and render the residual noise less than a fraction of 1% of the error [21].

To further reduce the white noise residue in each IMF component and time consumption, CEEMD was applied here, where white noise was particularly included in pairs to the original data (i.e. one positive and one negative) to generate two sets of ensemble IMFs [22]. Additionally, to visualize the frequency distribution of each IMF component, Hilbert weighted frequency (HWF) of each IMF [23] was applied to reflect the mean oscillation frequency of the IMF [11].

Graph Analysis

Network Construction.

In the current study, the automated anatomical labeling (AAL) template image was applied for regional parcellation approach as previously validated by Tzourio-Mazoyer [24]. Thus, each hemisphere was divided into 45 anatomical regions of interest (ROIs), which are listed in Table 1 together with the abbreviated regional labels. Regional mean time series were estimated for each subject across five IMFs by averaging the fMRI time series over all voxels in each of the 90 regions. Pearson correlation coefficient was performed to estimate the IMF dependent correlations between each of the 4005 possible pairs of the 90 cortical and subcortical (90 ROI from the common AAL atlas) BOLD signals derived from each individual set. A set of five (90×90) inter-regional Pearson correlation matrices were then obtained for each subject. False discovery rate (FDR) correction was applied to regulate the expected FDR at the statistical significance threshold as 0.05 in individual level. Thus, five frequency dependent population-based functional connectivity networks were constructed by capturing the underlying common connectivity pattern of the brain.

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Table 1. Cortical and subcortical regions of interest defined in study.

https://doi.org/10.1371/journal.pone.0124681.t001

Reproducibility Analysis

To investigate the reproducibility of the results, a split-half analysis was performed [31]. Two independent age- and gender-matched subgroups were created (80 and 81 participants). For each subgroup, the frequency specific brain networks were separately constructed and analyzed respectively using the same methods as the aforementioned whole-group analysis. The results of the two subgroups were compared to evaluate the reproducibility. In addition, to further verify the reliability of CEEMD and the accuracy of frequency intervals defined by CEEMD and HWF, the BOLD signals were filtered to the same five specific frequency bands, which were defined by CEEMD and HWF, by using filter functions provided in the REST toolbox [35]. For convenience, this comparison method was denoted as “REST”.

Frequency distribution and IMF dependency of FC

The histograms of the HWF distributions were presented in Fig 1, demonstrating the first five IMFs of the voxels in the whole-brain gray matter at different input noise level ε0 using the CEEMD method (Fig 1a–1d) or EMD (Fig 1e) approach across all the subjects. Each of the five histograms in Fig 1a–1e represents the statistic of the whole-brain gray matter voxels within distinct frequency bands, respectively. Considering the very similarity of the frequency content of different voxels at different sites of the brain (and subjects), the same IMF (IMFs, s = 1, 2, 3, 4 or 5) from all of the voxels approximately fell into the same frequency band. Consistent with a previous study [11], these five IMF components were derived to cover a frequency range from 0 to 0.22 Hz, with each interval range.

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Fig 1. Histogram of frequency distribution using CEEMD and EMD, respectively.

From Fig 1a to Fig 1e, each figure represents the HWF distribution histogram determined from gray matter voxels in whole brain across the entire group of subjects (n = 161), with an input noise level ε0 of 0.1, 0.2, 0.3 and 0.4 using CEEMD as well as EMD respectively. The histograms of HWF of IMF1 to IMF5 were colored by red, green, blue, magenta and cyan respectively. The heights of the histograms represent the number of voxels whose HWF equals to the frequency on the horizontal axis.

https://doi.org/10.1371/journal.pone.0124681.g001

Referring to Fig 1a–1d, a high noise level was associated with relatively better concentrated intra-frequency bands and separated inter-frequency bins. Thus, the observed best performance in dividing the BOLD signals into five IMF components was demonstrated in Fig 1d. The presented results were acquired with an input noise level ε0 = 0.4. In addition, the consequences of other conditions (ε0 = 0.1, 0.2, 0.3) were provided as the supplementary materials (S1 Fig). As shown in Fig 1d, the frequency of each IMF fell into a unique frequency band, with the first IMF (IMF1) indicating the highest frequencies from 0.11to 0.22 Hz, IMF2 for 0.05 to 0.11 Hz, IMF3 for 0.025 to 0.05 Hz, IMF4 for 0.01 to 0.025 Hz, and IMF5 for the lowest frequency band from 0 to 0.015 Hz. Meanwhile, the histograms of HWF distributions derived from the EMD method was presented in Fig 1e to demonstrate the frequency bands or mode mixing effects. The FC matrices of each IMF component were displayed in Fig 2b–2f to represent the inter-regional FC subtended by time series components in the frequency bands defined by IMF 1–5. The results suggest that CEEMD can adaptively decompose the original time series into different intrinsic oscillatory modes that can be classified into distinctive frequency bands. Thus, CEEMD can be applied as a non-stationary and non-linear neurological signal processing method.

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Fig 2. Schematic of frequency distribution and specificity of functional connectivity networks.

Fig 2a represents the histograms of HWF of IMF1 to IMF5 using CEEMD (n = 161, ε₀ = 0.04), which is the same as Fig 1d. These IMFs occupy different frequency bands in a descending order (IMF1: 0.11–0.22 Hz; IMF2: 0.05–0.11 Hz; IMF3: 0.025–0.05 Hz; IMF4: 0.01–0.025 Hz; IMF5: 0–0.015 Hz, respectively). Fig 2b–2f denote the group-mean inter-regional correlation matrices of each IMF component (AAL template, 90×90 correlation matrix, only the positive value was presented), and the number from 1 to 90 represents the corresponding ROI in AAL template, for details, refer to Table 1.

https://doi.org/10.1371/journal.pone.0124681.g002

Frequency dependent small world networks

Previous studies have demonstrated that the small-world topology exists in large-scale brain functional and structural networks in humans [1, 32], in which the shortest path length between any pair of nodes is approximately equivalent to a comparable random network, but with greater local interconnectivity than a random network [28]. In the current study, the small world properties were investigated in each frequency specific brain networks. As shown in Fig 3, all five FCNs showed small-world architecture with more locally clustered (γ>1, Fig 3f) but almost identical path length (λ≈1, Fig 3g) over a wide range of densities. Inconsistent with Achard’s study [15], the small-worldness of these five FCNs was compared at multi-density and identified to be frequency-sparsity dependent. The saliency of small-worldness mainly covered three frequency bands at distinct density intervals. Specifically, small world architecture was prominent in the IMF1, IMF3and IMF5 components (Fig 3h). The mean clustering coefficient increased from IMF1 to IMF5 across most density intervals (Fig 3d), while the characteristic path length exhibited an opposite variation (Fig 3e). Additionally, network weighted degree or efficiency analysis demonstrated that lower frequency bands were associated with higher weighted degree or global or local network efficiency (Fig 3a–3c). The results also suggested that high-frequency band IMF1 exhibited small world properties, which may be discarded in conventional FC analysis.

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Fig 3. Small world properties in the frequency specific FCNs.

From Fig 3a to Fig 3e, each figure shows the plot of global topological patterns of distinct frequency intervals (y-axis) versus sparsity (x-axis), including the weighted degree, local network efficiency (locE), global network efficiency (gE), mean clustering coefficient (Cp) and shortest path length (Lp) respectively. The ratio Gamma (Fig 3f) and Lambda (Fig 3g) of five frequency specific FCNs showed a much higher Cp and identical Lp value, compared with closely matched random networks across much sparsity. The saliency of small-worldness, Sigma, dynamically covered different frequency bands at various density intervals. Specifically, small world architecture is prominent in the IMF1, IMF3 and IMF5 component at a range of density threshold from 0.05 to 0.12, 0.12 to 0.18, and 0.24 to 0.4, respectively.

https://doi.org/10.1371/journal.pone.0124681.g003

Spatial distribution of hub regions in distinct frequency bands

The difference was observed extensively in the frequency dependent global topological patterns in brain networks, therefore, it is hypothesized that the nodal characteristics may vary in the frequency specific brain networks. Nevertheless the spatial distribution of hubs defined by nodal betweenness, weighted degree or nodal efficiency was similar across different frequency bands (Fig 4). Consistent with previous studies [15, 25, 31, 36–38], all the hubs are mainly concentrated on association, primary and paralimbic cortex. Remarkably, low frequency interval, particularly smaller than 0.1 Hz, is under investigation in previous FC studies [4, 5, 39]. On the contrary, in the present study, consistent spatial distribution of hub regions was observed in both low frequency (< 0.1 Hz) bands and higher frequency bands (IMF1 > 0.1 Hz). Fig 4 provided the 3D representations of the hub distributions to visualize these hubs in distinct frequency intervals. In addition, the detailed value of nodal topological characteristics in each frequency specific brain networks were listed in S1, S2, S3 Tables.

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Fig 4. The spatial distribution of hub regions.

Three dimensional rendering maps show hub regions defined by nodal betweenness (A), nodal weighted degree (B), and nodal efficiency (C) in five IMFs. The hub nodes shown in red, green, cyan and magenta color donate Associations, Primary, Paralimibic and Subcortical regions respectively as described by Achard et al. (2006) The size of the node represents their nodal topological characteristics. Hub regions are visualized using the BrainNet viewer (NKLCNL, Beijing Normal University). For the abbreviations of the regions, refer to Table 1.

https://doi.org/10.1371/journal.pone.0124681.g004

Reproducibility of the findings

To test the stability of brain FCNs construction and the corresponding topological properties, split-half reliability was performed by dividing all participants into two independent subgroups. Visual examination indicated that the FC patterns of each IMF were similar between the two datasets (Fig 5A & 5B) and in the aforementioned whole group (Fig 2). Further statistical analyses (IMF1: r = 0.98, P < 0.0001; IMF2: r = 0.99, P < 0.0001; IMF3, r = 0.99, P < 0.0001; IMF4, r = 0.97, P < 0.0001; IMF5, r = 0.96, P < 0.0001) revealed a significant inter-group correlation between the mean FCNs of each IMF (Fig 5C). In addition, the global topological patterns of each frequency band were calculated in both subgroups (Fig 6) to demonstrate similar patterns with whole group analysis (Fig 3). The comparison between CEEMD and REST also indicated the effectiveness of CEEMD and the rational specific frequency bands in each IMF component. Visual inspections indicated that the FC patterns of each specific frequency band were similar within either CEEMD or REST (Fig 7A & 7B). Further statistical analyses (0.11–0.22 Hz, r = 0.97, P < 0.0001; 0.05 to 0.11 Hz, r = 0.98, P < 0.0001; 0.025 to 0.05Hz, r = 0.97, P < 0.0001; 0.01 to 0.025 Hz, r = 0.97, P < 0.0001; 0–0.015 Hz, r = 0.95, P < 0.0001) revealed a significant correlation in the mean FCNs of each frequency bin between the two methods (Fig 7C). In addition, the global topological patterns of frequency specific FCNs were calculated by using a rectangular window to perform band-pass filtering (Fig 8).

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Fig 5. Split-half reproducibility of the frequency dependent functional connectivity weighted networks.

(A) and (B) represent the group-mean frequency specific FC weighted networks of two specific subgroups in each IMF component. (C) denotes the corresponding correlation maps between each pair of frequency specific FCNs in the two subgroups.

https://doi.org/10.1371/journal.pone.0124681.g005

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Fig 6. Split-half reproducibility of global topological patterns in both subgroups.

From top to bottom, subgroup1 and subgroup2 were presented respectively. Both subgroups had the similar patterns with the whole group results (Fig 3), showing that ultra-low frequency bands (IMF5) have both salient local and global connectivity patterns. The saliency of small-worldness dynamically covered different frequency bands at various density intervals.

https://doi.org/10.1371/journal.pone.0124681.g006

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Fig 7. Comparison between the CEEMD and REST methods.

(A) and (B) represent the group-mean frequency specific FC weighted networks of these two methods, namely CEEMD in current study and conventional rectangular window band-pass filter (REST), in each IMF component. (C) denotes the corresponding correlation maps between each pair of frequency specific FCNs using the two methods.

https://doi.org/10.1371/journal.pone.0124681.g007

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Fig 8. Small world properties in the frequency specific FCNs using REST.

Fig 8 show the plot of global topological patterns of distinct frequency intervals (y-axis) separated by a conventional ideal rectangular window band-pass filter versus sparsity (x-axis). The meaning of these figures is the same as in Fig 3.

https://doi.org/10.1371/journal.pone.0124681.g008

Methodology consideration

In the FC analysis in BOLD fMRI, there is no consensus on the necessity to correct global signals in fMRI time courses [46]. One previous study [46] suggested that without global signal correction, nodes along the inter-hemispheric fissure would be highly connected while some nodes and subgraphs around white-matter tracts would become disconnected from the rest of the network. In the present study, on one hand, the discussion of regression with or without global signal is out of our scope; on the other hand, the consequences of topological patterns without regressing out the global signal were provided in supplementary materials (S3 and S4 Figs, S4, S5, S6 Tables). Results showed that the variation trends of topological patterns among five specific frequencies were not influenced by the regression of global signals. In addition, typical graph analyses of weighted networks ignored negative ties while recent studies proposed to incorporate negative weights into analyses of subgraph detection. Here, we followed the traditional approach.

Limitations

The present study should be considered as a preliminary study to investigate the frequency specificities of brain networks and has a few limitations. The influence of head motion on the frequency specificities in the small world network was not discussed, because a number of recent studies [47, 48] have reported decreased long range connectivity and increased local connectivity due to head motion. Thus, head motion is required to be concerned in our further study. In addition, the analysis of the node definition was limited to AAL template-based brain networks. A previous study suggest that the topological organization of brain networks may be affected according to the different parcellation strategies applied [49]. Future studies will be needed to clarify the difference resulting from various node definitions. Moreover, short-range connectivity patterns such as modularity or motif were not considered in the current study, and future efforts integrating the findings from other network parameters will provide valuable additions to our observations. Last but not least, the highest frequency in this study is smaller than 0.25 Hz, however, higher frequency fMRI data can be generated by using the most recently developed technology multiband echo planar imaging [50]. Future efforts are required to investigate the potential applications of combining CEEMD with multiband echo planar imaging.