2.1.

Participants

The data used in this study were originally obtained for a previous study⁴⁶ in which nine three-month-old (mean age, 113 days) infants (six girls and three boys) participated. All infants were studied while they were quietly sleeping. Informed consent was obtained from the parents of the infants prior to the initiation of the experiments. All experiments were approved by the Office for Life Science Research Ethics and Safety, The University of Tokyo.

2.2.

NIRS Measurement

An NIRS system (ETG-100, Hitachi Medical Corporation, Tokyo, Japan)^6,7 was used to measure the hemodynamic responses of infants. The optical fibers for the source and detectors were placed over the temporal cortices on both hemispheres. On the left hemisphere, the source was set on the T3 position on the basis of the international 10–20 system of electrode placement,⁴⁹ and four detectors were mounted in a line at 10, 20, 30, and 40 mm from the source. On the right hemisphere, the source and four detectors were placed on homologous positions. Figure 1 shows the arrangement of the source and detectors in NIRS measurements for hemodynamic responses to auditory stimuli in infants. Thus all the measurement channels in the present study were likely located on the temporal cortex.^16,50 These regions have also been reported to respond to speech sounds while infants are quietly sleeping.⁵¹

Fig. 1

Arrangement of the light sources and detectors in near-infrared spectroscopy (NIRS) measurements for hemodynamic responses to auditory stimuli in infants. Filled and open circles show the positions of the light sources and detectors, respectively. The source optical fibers were placed on the T3 and T4 positions of the International 10/20 system. The position of the measurement channel for recording the changes in oxygenated and deoxygenated hemoglobin (oxy- and deoxy-Hb) signals is defined as the midpoint between the source and detector. Four different detectors placed in a line on each hemisphere detect reflected light from a single incident position. Thus, hemoglobin signals are simultaneously measured by a total of eight channels. The data obtained at source-detector 40-mm channel were not used in the analysis.

Although in the previously obtained data⁴⁶ two different intensities of NIR light were used, i.e., 0.6 mW (0.3 mW for each of the two laser diodes; 780 and 830 nm) and 1.2 mW (0.6 mW for each), in this study only the dataset measured under 1.2 mW was used because the signal-to-noise ratio of the detected light intensity is higher. The data obtained at 40-mm S-D distance were not used for the analysis because signal-to-noise ratios for several participants were not sufficient for applying the MD-ICA method.

2.3.

Stimulation

Details of the stimulation have been described in previous papers.^46,52 The test auditory stimuli consisted of speech sounds of Japanese words provided by a female Japanese speaker. Ten different sets of stimuli (mean duration: 2.68 s; range: 2.54 to 2.81 s) were used.

The experiments were conducted in a sound-attenuated room. The infants sat on the lap of an experimenter and were studied while they were quietly sleeping. The speech sounds were presented at a 73-dB maximum amplitude. We used an event-related paradigm under the speech condition in which the test auditory stimuli were presented every 15 s (i.e., stimulus onset $\text{asynchrony}=15\mathrm{s}$). During interstimulus intervals, we did not present any sound. The measurements lasted 150 s. Under the no-stimulus (control) condition, the infants were given no sound and were measured for 150 s.

2.4.

Preprocess for NIRS Data

For the preprocessing for the NIRS data analysis, the oxy- and deoxy-Hb changes were calculated by using the optical density changes of 780- and 830-nm light in accordance with the modified Beer-Lambert law.^6,53

The analysis flow of this study is shown in Fig. 2. We applied a 0.009 to a 0.2 Hz band-pass filter for suppressing the pulse signals and low-frequency fluctuation. The blocks were not used where the nonfiltered (raw) oxy-Hb signal changed very quickly (over $0.8\mathrm{mM}·\mathrm{mm}$ change in 1 s) at either the S-D 10- or 20-mm channel because such blocks probably contain some artifacts. For the MD-ICA method, continuous data, including blocks, are necessary for applying ICA. If a block was eliminated, the blocks after or before the eliminated block all had to be eliminated, leaving longer continuous data that did not include the eliminated blocks. With this procedure, out of 180 blocks ($9\text{participants}\times 2\text{conditions}\times 10\text{blocks}$), eight were not used.

Fig. 2

Analysis flow.

In individual datasets, we initially divided the continuous time course data into blocks. Each data block ranged from 1 s prior to stimulus onset to 15 s after onset. Then, we corrected the baseline using linear fitting to the mean signal of the first 1 s and that of the last 1 s in each data block. By averaging the signal changes over the data blocks for each subject under each condition, we obtained individual hemodynamic responses for each measurement channel. We finally obtained group-averaged hemodynamic responses at each measurement channel under each condition.

2.5.

Deep-Shallow Signal Separation Method

There are several methods for removing the scalp effect from an NIRS signal.^40,54,55 We previously proposed a method with MD probes to discriminate between the deep- (such as cerebral) and shallow- (scalp) tissue effects on the NIRS signals obtained from adult participants.⁴⁰ We base the present study on the previous work and apply the previously proposed method to infant data.

In the method with MD-ICA, it is assumed that the partial optical path length of the deep layer linearly increases as the S-D distance from $X{i}_{\mathrm{gr}}$ increases, whereas that of the shallow layer does not change. $X{i}_{\mathrm{gr}}$ indicates the shortest S-D distance at which the detected light is sensitive to absorption change in gray matter. This is assumed to be 10.5 mm in adults (experimentally obtained).⁴⁰ For infants, a different $X{i}_{\mathrm{gr}}$ value, i.e., 8 mm, was used as mentioned below. Moreover, we assumed that the NIRS signals at each S-D distance can be expressed by the linear sum of the hemoglobin-change signals that are proportional to the partial optical path length at scalp and gray matter.⁵⁶

In the first step of this method, an ICA^41,42 is used for obtaining signal sources (independent components) to acquire the deep and shallow subcomponents described in the following step. In this step of the analysis, three independent components were obtained for each hemisphere. If enough (e.g., four or more) channels are available, noise components can generally be truncated. However, we did not cut any components in the MD-ICA analysis because not enough channels were available. In the next step, the contribution ratios of the deep and shallow layers are calculated by the dependence of signal amplitudes (i.e., weight of component) on the S-D distance for each independent component. The deep and shallow subcomponents are then calculated by multiplying the independent components by deep/shallow contribution ratios. In the final step, deep and shallow signals are reconstructed using the linear sum of the subcomponents of all the independent components. This analysis supports a model that allows us to calculate an estimation of the relative contributions.

To explain in more detail, the deep and shallow signals are reconstructed by the following equations:

To reconstruct deep and shallow signals, weight ($W$) and contribution ratio ($r$) are used. $W$ is obtained with the ICA process and $r$ is obtained with the $x$-intercept using a product of weight and the effective amplitude of the component along with multiple S-D distances. The effective amplitude of the component is calculated using the root mean square of the time series of the component. Figure 3 shows a geometric explanation for calculating the contribution ratio ($r$) of deep and shallow signals in the original NIRS signal (total signal including deep- and shallow-tissue contributions) under two $x$-intercept conditions. A line, obtained by at least two signal contributions (product of $W$ and the effective component amplitude) is used to obtain an $x$-intercept ($X{i}_{\mathrm{ex}}$). $X{i}_{\mathrm{ex}}$ indicates the experimentally obtained $x$-intercept for an independent component that includes both deep- and shallow-layer effects. A pure deep (brain) component should have $X{i}_{\mathrm{gr}}$ as an $x$-intercept, and the shallow-layer contribution is constant for all S-D distance channels. By using this model, the deep-layer contribution ratio can be calculated by $B/A$ when $X{i}_{\mathrm{ex}}$ is shorter than $X{i}_{\mathrm{gr}}$ [Fig. 3(a)] and by $B/(2B-A)$ when $X{i}_{\mathrm{ex}}$ is longer than $X{i}_{\mathrm{gr}}$ [Fig. 3(b)]. When a component signal is included in both deep and shallow signals, $X{i}_{\mathrm{ex}}$ would be shorter than $X{i}_{\mathrm{gr}}$ [Fig. 3(a)] because contributions from both layers are in the same direction as the sign. Adversely, when a component is positively included in the deep signal and negatively included in the shallow signal (or vice versa), $X{i}_{\mathrm{ex}}$ would be longer than $X{i}_{\mathrm{gr}}$ [Fig. 3(b)].

Fig. 3

Geometric explanation for calculation of contribution ratios ($r$) of deep and shallow signals in original NIRS signal under two $x$-intercept conditions: (a) $X{i}_{\mathrm{ex}}<X{i}_{\mathrm{gr}}$ and (b) $X{i}_{\mathrm{ex}}\ge X{i}_{\mathrm{gr}}$. The deep-layer contribution ratios for component Ci are expressed as $r_{\mathrm{dp}}^{Ci}=B/A$ in (a) and $r_{\mathrm{dp}}^{Ci}=B/(2B-A)$ in (b).

To confirm the assumption of a partial optical path length for deep and shallow layers in an infant’s head, we performed a Monte Carlo simulation for photon propagation in an infant’s head under conditions of 10, 20, and 30-mm S-D distances. Absorption and reduced scattering coefficients of the neonatal head model were adopted from Fukui et al. (Table 1 in Ref. 45). The thickness of each tissue layer was proportionally converted from the data of Okada and Delpy (Table 1 in Ref. 57) so that the scalp surface and gray matter surface were 8.5 mm apart (Fig. 3A in Ref. 48). Figure 4 shows partial optical path lengths for scalp and gray matter layers for infants calculated from the Monte Carlo simulation (number of detected photons: 10,000). We assumed that the difference between the $X{i}_{\mathrm{gr}}$ of neonates and three-month-old infants is small enough (considering the difference between the thickness of each layer for neonates and three-month-old infants as reported by Beauchamp et al.).⁴⁸

Table 1

Deep-layer contribution ratio.

Fig. 4

Partial optical path lengths for scalp and gray matter in infant head model by Monte Carlo simulation.

From the simulation, the optical path length in the scalp does not change much between 10- and 30-mm S-D distances, while the optical path length for the gray matter linearly increases. The results were similar to those of simulations performed on an adult head model.^40,58,59 Therefore, the necessary assumption of MD-ICA was validated. The results also showed that the $X{i}_{\mathrm{gr}}$ is 8 mm for the infant head model. In the following, data are analyzed using 8 mm as the $X{i}_{\mathrm{gr}}$. The shortest S-D distance used in this study is 10 mm, which is longer than $X{i}_{\mathrm{gr}}$. Even if an S-D distance shorter than $X{i}_{\mathrm{gr}}$ is used (e.g., 5 mm) and a pure scalp signal is obtained, the contributions of shallow (scalp) and deep (cerebral) signals cannot be correctly quantified when the signals are similar (temporally correlated with each other). To overcome the limitation, we used the dependence of signal components on the S-D distance using multidistance optodes and ICA, where multiple S-D distances longer than the $X{i}_{\mathrm{gr}}$ are used.

2.6.

Analysis After Deep-Shallow Separation

The following analyses were conducted after deep and shallow signals were reconstructed from the original NIRS signals (Fig. 2).

3.1.

Block-Averaged NIRS Time Courses

Block-averaged NIRS time courses for each layer (original/deep/shallow) under the speech condition are shown in Fig. 5. Red solid and blue dashed lines indicate oxy- and deoxy-Hb, respectively. Vertical solid and dashed lines indicate the start (onset) and end of the stimulation period, respectively.

Fig. 5

Block-averaged NIRS time courses (original/deep/shallow) under speech conditions. Translucent patches indicate standard error at each time point among participants.

3.2.

Deep-Layer Contribution

Table 1 lists means and standard deviations among participants of deep-layer contribution ratios for the left and right channels under the no-stimulus and speech conditions.

Table 2 lists three-way ANOVA results for deep-layer contribution ratio ($F$ values). S-D distance had a significant main effect on deep-layer contribution ratios of both oxy- [$F(\mathrm{2,98})=416.0$, $p<0.0005$] and deoxy-Hb [$F(\mathrm{2,98})=298.8$, $p<0.0005$] signals. A post hoc test (Tukey-Kramer) was conducted to identify specific differences among the contribution ratios obtained at the three S-D distances. In the results for both oxy- and deoxy-Hb signals, the mean of the contribution ratios at each S-D distance was significantly different from those at the other S-D distances ($p<0.0005$).

Table 2

Three-way analysis of variance (ANOVA) results (F values) for deep-layer contribution ratio.

The test conditions (no stimulus/speech) had significant main effects on the deep-layer contribution ratios of both oxy-Hb [$F(\mathrm{1,98})=8.6$, $p<0.005$] and deoxy-Hb [$F(\mathrm{1,98})=8.6$, $p<0.005$] signals. Interactions between hemispheres and conditions were significant for both oxy-Hb ($p<0.025$) and deoxy-Hb ($p<0.025$) signals.

3.3.

Mean Signal Amplitude

Mean signal amplitudes for each condition are shown in Fig. 6. In the data obtained at S-D 20 and 30 mm, original- and deep-layer signals showed similar changes in mean signal amplitudes. In the data obtained at S-D 10 mm, which included relatively higher scalp effects than other longer S-D distances, more significant signal changes in oxy- and deoxy-Hb were obtained in the deep signal than in the original and shallow signals. No significant change in the mean signal amplitude was obtained under the no-stimulus condition.

Fig. 6

Mean signal amplitude. (a) Original oxy-Hb, (b) original deoxy-Hb, (c) deep oxy-Hb, (d) deep deoxy-Hb, (e) shallow oxy-Hb, and (f) shallow deoxy-Hb signals. Single (∗), double (∗∗), and triple (∗∗∗) asterisks denote statistical significance at $p<0.05$, 0.01, and 0.005, respectively.

Three-way ANOVA results ($F$ values) for the mean signal change are shown in Table 3. Under the speech condition, the S-D distance had a significant main effect on the mean signal change of both oxy-Hb [$F(\mathrm{2,148})=24.9$, $p<0.0005$] and deoxy-Hb [$F(\mathrm{2,148})=12.7$, $p<0.0005$] signals. A post hoc test (Tukey-Kramer) was conducted to identify specific differences among mean signal changes obtained at the three S-D distances. In the results, the mean signal change at each S-D distance was significantly different from those at the other two S-D distances ($p<0.005$) only for the oxy-Hb signals. The layer value (original/deep/shallow) also had a significant main effect on the mean signal change of both oxy-Hb [$F(\mathrm{2,148})=18.7$, $p<0.0005$] and deoxy-Hb [$F(\mathrm{2,148})=8.7$, $p<0.0005$] signals. The results of a post hoc test (Tukey-Kramer) show that the absolute value of the shallow signal was significantly smaller than those of the other (original and deep) signals ($p<0.0005$ for oxy-Hb, $p<0.005$ for deoxy-Hb). Interactions between the S-D distance and layer (original/deep/shallow) were significant only for the oxy-Hb signal ($p<0.0005$).

Table 3

Three-way ANOVA results (F values) for mean signal change.

Under the no-stimulus condition, no factor had a significant main effect on the mean signal change of either oxy- or deoxy-Hb ($p>0.0125$). Interactions between the three factors were not significant ($p>0.3$).

3.4.

Correlation Between Left-Right Channels

Correlation coefficients (Fisher’s $Z$) between the left and right channels for all participants are shown in Fig. 7. Bar graphs indicate means among the participants. Table 4 lists the three-way ANOVA results ($F$ values) for correlation coefficients between the left and right channels. The S-D distance had a significant main effect on correlation coefficients for both oxy-Hb [$F(\mathrm{2,148})=33.3$, $p<0.0005$] and deoxy-Hb [$F(\mathrm{2,148})=10.4$, $p<0.0005$] signals. For both cases of oxy- and deoxy-Hb signals, post hoc tests (Tukey-Kramer) showed that correlation coefficients of the S-D 10-mm data were significantly smaller than those of the other S-D distance data (20 and 30 mm) ($p<0.0005$ for both oxy- and deoxy-Hb), whereas there was no difference between the correlation coefficients of the S-D 20- and 30-mm data ($p>0.9$ for both oxy- and deoxy-Hb).

Fig. 7

Correlation coefficients ($Z$) between left and right channels for all participants. Bar graphs indicate means among participants.

Table 4

Three-way ANOVA results (F values) for correlation coefficients between left and right channels.

The type of layer (original/deep/shallow) had a significant main effect on correlation coefficients for both oxy-Hb [$F(\mathrm{2,148})=10.5$, $p<0.0005$] and deoxy-Hb [$F(\mathrm{2,148})=7.0$, $p<0.005$] signals. For both cases of oxy- and deoxy-Hb signals, post hoc test results showed that correlation coefficients of the shallow signals were significantly smaller than those of the other layer (original and deep) signals ($p<0.0005$ for oxy-Hb, $p<0.025$ for deoxy-Hb), whereas there was no difference between the correlation coefficients of original and deep signals ($p>0.9$ for both oxy- and deoxy-Hb).

4.1.

Deep-Layer Contribution Ratio

The present study analyzing data of three-month-old infants showed that the deep-layer contribution ratios (averaged between left and right channels) at a 30-mm S-D distance under the speech condition for oxy- and deoxy-Hb were 82 and 78%, respectively, as shown in Table 1. Note that Funane et al.⁴⁰ reported that in adults, the mean deep-layer contribution ratios at the S-D 30-mm channels for oxy- and deoxy-Hb were 65 and 67% among several tasks, respectively. Thus, the deep-layer effect in infants was greater than that in adults. For 20-mm channels, deep-layer contribution ratios (averaged between left and right channels) under the speech condition for oxy- and deoxy-Hb were 72 and 66%, respectively, while for the 10-mm channels, deep-layer contribution ratios were $<35\%$. Thus, a significant amount of signal originates from deep (such as cerebral) tissue at 20- and 30-mm S-D distances. This was also the case under the no-stimulus condition, suggesting that NIRS signals largely reflect spontaneous changes in cerebral blood oxygenation.

Because the deep-layer contribution ratio is high enough for both 20- and 30-mm channels, the optimal S-D distance depends on a trade-off between probe density and the area covered by a limited number of optodes. If the probe density needs to be high, the S-D distance should be 20 mm, whereas if the covered probe area needs to be larger, the S-D distance should be 30 mm, for example.

According to Table 2, the interaction between hemisphere and condition was significant for both oxy- and deoxy-Hb. This was possibly because the contribution of the deep signal induced by stimulation may be larger in the channel for a large response than that in the channel for a smaller response in an infant’s head.

The deep-layer contribution of the oxy-Hb signal is slightly more than that of the deoxy-Hb signal. Franceschini et al.,⁶² on the other hand, reported that oxy-Hb may be more altered by systemic changes than the deoxy-Hb in adult participants. If the systemic signal contribution is significant, the deep-layer contribution should decrease because such systemic signals are included in both cerebral and extracerebral tissues as reported by Scholkmann et al.⁹ Therefore, in infants, the extracerebral effect might be smaller than that in adults. Nonetheless, the task dependency of extracranial and systemic effects on NIRS signals in infants is an important issue³⁰ to be further investigated.

4.2.

Effect of Deep-Shallow Separation on Mean Signal Amplitude

As shown in Fig. 6, at S-D 20 and 30 mm, original and deep layer signals in oxy- and deoxy-Hb showed similar changes in mean signal amplitudes. For S-D 10-mm channel, where the most scalp effects are included among the three S-D distances, more significant signal changes in oxy-Hb were obtained in deep signals than in original signals. Significant signal changes were obtained only for the deep signal, especially for the left channel. From this result, MD-ICA effectively extracts a deep signal from infants’ NIRS signals when it is assumed that the deep signal (i.e., such as a cerebral signal) is induced during the stimulation. The amplitude of deep and shallow signals has the dependence on S-D distance that is expected from optical path length. For example, the shallow signal amplitude does not change much as the S-D distance is changed [Figs. 6(e) and 6(f)]. This result demonstrated that the assumed model for infants was valid enough to extract deep and shallow signals. In the ANOVA results, the significant interactions between the S-D distance and type of layer (original/deep/shallow) existed for the oxy-Hb signal because the signal obtained at a longer S-D distance includes a larger contribution from the deep layer based on optical partial path length.

Under the speech condition, the deoxy-Hb signal at the S-D 10-mm channel did not show any significant change (only the left deep signal [Fig. 6(d)] is significant). This was not the case for the oxy-Hb signal. This result can be partly explained as a result of the signal amplitude of the deoxy-Hb signal being smaller than that of the oxy-Hb when comparing their variances, as shown in Fig. 5 (original, S-D 10-mm data). For both oxy- and deoxy-Hb signals, on the other hand, the significance of the changes was increased from original to deep signals ($p$ values were decreased). This means that in deep signals, even though the signal amplitudes were lower than those of the original signals, the significance of the signal change increased, which was caused by a reduced signal variance. It has also been shown that the variance in the S-D 10-mm original signal during the set time window is largely caused by the shallow signal.

There are some differences between Figs. 6(e) and 6(f). Specifically, significant signal changes were obtained only for the oxy-Hb signal under the speech condition. According to Table 1, however, the deep-layer contribution of the oxy-Hb signal is higher than that of the deoxy-Hb signal. The signal amplitudes were calculated using only a task period (block data), whereas the deep-layer contribution reflects all measurement periods (continuous data). That result, therefore, suggests that low-frequency physiological fluctuations other than a task-related signal may have more effect on deep signals for the deoxy-Hb signal than those for the oxy-Hb signal. In other words, the task-related signal contributes more to the oxy-Hb signal than the deoxy-Hb signal. On the other hand, for deep signals [Figs. 6(c) and 6(d)], larger amplitudes and higher significant changes were obtained for oxy-Hb than for deoxy-Hb, which explains the higher deep-layer contribution for the oxy-Hb signal from another standpoint.

In principle, the shallow signal reconstructed by the MD-ICA method mainly reflects light absorption changes in the scalp, and the deep signal reflects those in tissue other than the scalp. From the results of the mean amplitude, the stimulation-related response cannot be explained only using the shallow signal. Therefore, the deep signal mainly originates from cerebral tissue when the blood change in the extracerebral layers in a relatively deeper area (e.g., blood vessels on the brain surface) is negligible.

Note that cerebral (originated from local neuronal activity) and systemic signals are not separated by the deep-shallow signal separation method (MD-ICA) because the method only uses signal depth on the basis of optical path length.

4.3.

Interhemispheric Functional Connectivity

ANOVA and post hoc test results of layer (original/deep/shallow) effects showed that correlation coefficients of the original signals mainly reflect the correlation coefficients of the deep signals and that the left-right correlation cannot be accounted for only by the shallow layer. The significance of the S-D distance main effects also suggests that deep-layer signals largely contribute to the correlation coefficient between the left and right channels because the left-right correlation coefficients are significantly smaller at the S-D 10-mm channel than at other S-D distances. These results ensure that the functional connectivity obtained in infants in the previous study¹⁹ largely reflects correlations of deep (such as cerebral) hemodynamic changes.

4.4.

Limitation

The infant head model was adopted from the literature^45,57 and our original simulation, and $X{i}_{\mathrm{gr}}$ was assumed to be 8 mm for all participants. The effects of the model error and linearity of the amplitude of the gray matter signal still need to be investigated, as it does in the case for the application of the MD-ICA method to adults.

In this study, one light source is shared by four detectors at one side; therefore, the measurement channel of each detector does not reflect the same position. That is, the channel of the further detector reflects changes observed in the closer detectors and those in the more posterior region in the head. In the MD-ICA method, the homogeneous absorption change in each layer (deep or shallow) is assumed, so the displacement of the channel positions may affect the analytical result and should be as small as possible.

Since this study focused only on the temporal cortex of the brain, the shallow-layer effect at other cortices of the brain should be further investigated. The shortest S-D distance at which the detected light is sensitive to absorption change in gray matter depends on the extracerebral tissue thickness, which has a variance around the head. It is, thus, necessary in the future to use structural data (extracerebral tissue thickness) for target areas.