2.1.1 The cortical modules.

The cortical modules represent the two processing nodes of the left (Fig 1A) and the right primary auditory cortex (Fig 1B) denoted A_1,l and A_1,r respectively. Besides a principal cell neuronal population, (P_A1,l and P_A1,r), these modules include two interneuron populations representing fast-mediated (I_A1,l and I_A1,r) and slow-mediated GABAergic transmission (I’_A1,l and I’_A1,r). The output of these two modules corresponds to the mean membrane potential of P_A1,l and P_A1,r respectively. Two Gaussian additive noise inputs representing non-specific cortical excitation from local cortical neural populations stochastically modulate the excitability of the principal neuronal populations P_A1,l and P_A1,r respectively.

2.1.2 The thalamic modules.

The architecture of the left (Fig 1C) and right (Fig 1D) thalamic modules follows that of the cortical modules. Each of these modules is formed of a principal cell neuronal population, (P_Th,l and P_Th,r) and two interneuron populations representing fast-mediated (I_Th,l and I_Th,r) and slow-mediated GABAergic transmission (I’_Th,l and I’_Th,r). Likewise, the output of the thalamic modules corresponds to the mean membrane potential of P_Th,l and P_Th,r respectively.

2.1.3 The brainstem module.

The brainstem module is composed of two lumped neuronal subpopulations (Fig 1E): an excitatory principal cell population P_BS and an inhibitory neuronal population I_BS. The P_BS population projects excitatory connections to the cortical and thalamic modules and receives in return excitatory feedback from these four modules. A Gaussian additive noise input representing non-specific excitatory local projections stochastically projects to P_BS modulating its excitability. The output of this module corresponds to the mean membrane potential of subpopulation P_BS.

2.1.4 The cochlear module.

The cochlear module (Fig 1F) is the most important module of this model. It presents a lumped representation of the effects of the cochlear stimulation current on the mean firing rate of the auditory nerve. For simplicity, a single electrode of the CI electrode array is represented in this module. The electrochemical diffusion of the stimulation current is represented by a capacitive electrode-electrolyte (cochlea) interface (see [22] for a review). The transfer function of this interface is expressed as follows: (1)

The potential, v_stim, induced by the stimulation current i_stim adds up to the mean membrane potential of the auditory nerve. Its value depends on the impedance of the electrode-cochlea interface, Z_ec, detailed in Eq (2) in the form of a transfer function, and the cochlea’s input resistance R_s.

(2)

The parameter C_dl designates the double layer capacitance of the electrode cochlea interface while Z_f represents its faradaic resistance.

Then, the resulting average potential, v, is transformed into an equivalent mean firing rate via the nonlinear transfer function S(v).S(v) is the sigmoidal wave-to-pulse function as described by Freeman [23] and is expressed formally as follows: (3) where 2e₀ represents the maximal mean firing rate of the auditory nerve, v₀ the corresponding postsynaptic potential at a mean firing rate e₀, and r the slope of the sigmoidal function S(v). Residual hearing was modeled as a Gaussian additive noise input that adds up to the stimulation input of this module. Its parameters are detailed in Table 1 (Appendix–S14 File).

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Table 1. Mutual information (MI) values between the artifactual source and each of the neural sources simulated by the model.

The second column presents the raw estimated values of MI and the third presents the corrected values w.r.t the estimation bias.

https://doi.org/10.1371/journal.pone.0174462.t001

This module is an essential element for simulating the artifact-response mixture for two reasons. Firstly, the dynamics of the mean membrane potential, induced by i_stim, contribute to the simulation of the artifactual component of the EEG dataset. Secondly, the output of this module, representing the mean firing rate of the auditory nerve, is the modulatory input of the simulated temporal dynamics of the five remaining modules. Therefore, this module is the basis for generating the AEP components of the simulated EEG dataset, namely the ASSRs in this study. Consequently, these dynamics depend on the choice of the stimulation current at the input of the cochlear module, which in turn should correspond to the electrical translation of the hypothetical acoustic input.

2.4.1 The ICA algorithms in a blink.

The four algorithms tested, infomax, extended infomax, fastICA and jade, aim at achieving statistically independent sources following non-Gaussian distributions at their output. However, in order to achieve this statistical independence, these methods employ different criteria, or contrast/likelihood functions.

Infomax and extended infomax separate a blind mixture by minimizing the mutual information among the extracted sources [31, 32]. Although these two methods stem from the same basic mathematical contrast function, extended infomax provides a higher flexibility concerning the statistical distribution of the detected source due to its generalized learning rule. While infomax [31] allows the detection of supra-Gaussian sources only, extended infomax [32] takes sub- and supra-Gaussian sources into account.

The contrast function of the fastICA algorithm is based on maximizing negentropy, which is a measure of the distance between the distribution of the detected source and that of a normal distribution of the same mean and standard deviation [34]. As a matter of fact, it has been shown that maximizing negentropy is mathematically equivalent to minimizing mutual information (see [34]), implying that infomax, extended infomax and fastICA belong to the same family of ICA algorithms. Also, this algorithm takes as input parameter, the type of contrast function used to estimate negentropy [34]. In our simulations, we used the default contrast function, which is a general purpose function based on kurtosis. Finally, jade maximizes the kurtosis of the separated sources by jointly diagonalizing their fourth order cumulant matrices [33].

2.4.2 ICA source constraints.

In order for ICA algorithms to be applicable, two major constraints should be respected: 1) the statistical independence and 2) the non-Gaussianity of the mixed sources. These two constraints have been validated for EEG signals [37]. Any Gaussian source will be perceived as a mixture of two or more non-Gaussian signals, according to the central limit theorem, and will therefore be impossible to detect as a single independent component. Therefore, proving the non-Gaussianity of our simulated sources is important. Similarly, measuring the statistical independence between the artifactual source and each of the neural sources in our simulations is crucial.

The non-Gaussianity of each source was tested using the Anderson-Darling test (adtest Matlab^® statistical toolbox function). This function tests the null hypothesis that the each of the simulated source dynamics follows a normal distribution. Then, the statistical independence between the artifactual source and each of the simulated neural sources was evaluated by calculating the mutual information (MI) based on the Kullback entropy [38] expressed as: (6) where X and Y are two random variables. The naïve algorithm, or the histogram based technique was accordingly implemented to estimate MI. Also the obtained values were corrected by an estimation bias of where M is the number of histogram bins and N is the number of samples in each signal [39].

2.4.3 Comparing efficiency.

These methods are here compared based on the error of estimation of the amplitudes of the expected simulated responses. A significant increase or decrease in response amplitude observed in the denoised dataset is considered as an indication of undesired performance. In other words, a positive estimation error indicates the presence of artifactual residuals in the denoised dataset. Likewise, a negative estimation error implies an imperfect separation of the artifact-response mixture, leading to the rejection of an artifactual independent component actually containing a neural response.

Artifactual components were identified and rejected manually based on their characteristic topographical and frequency distribution calculated by FFT (F_IC). Ten EEG simulations were performed, of 40 s each, and the four ICA algorithms were operated accordingly on each simulation. This aims at taking the stochastic nature of the model and therefore the respective performance of each algorithm into consideration.

More generally, the efficiency of these algorithms can be evaluated as a function of many parameters (stimulation frequency, cochlear dipole position and orientation, etc.) using the model. In this study, the effect of the modulation depth of the input signal on the performance of ICA algorithms was assessed. In fact, a recent study showed the possibility of eliminating the transcranial alternating current stimulation artifact in MEG recordings using beamformers only if an amplitude modulation is applied to the sinusoidal stimulation signal [40]. Therefore, supplementary simulations were performed accordingly for the following values of modulation depth: 100, 75, 50 and 20% in order to evaluate possible effects.

3.3.1 ASSR amplitude estimation error.

Fig 5 depicts the stochastic distribution of the amplitude estimation error (in percentage) induced by each of the tested algorithms as compared to the expected (neural) ASSR amplitudes. These boxplots represent the results of 10 simulations for each method. As observed at all electrodes, infomax and fastICA present the smallest variance and can therefore be considered to be the most stable among the four algorithms. Yet, the estimation error incurred by infomax remains the closest to 0%, thus suggesting that this algorithm retrieves the expected neural ASSR amplitudes at most of the recording electrodes.

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Fig 5. Boxplots of the ASSR amplitude estimation error obtained from 10 denoised datasets after the application of infomax (red), extended infomax (green), jade (blue), fastICA (purple) at the 32 scalp electrodes.

https://doi.org/10.1371/journal.pone.0174462.g005

To confirm the significance of the error estimation difference among the 4 methods, a region of interest was first defined. This concerned all the fronto-central electrodes, Fz, F3, F7, FC5, FC1, C3, Cz, C4, FC6, FC2, F4 and F8. All 10 repetitions were included in the statistical analysis performed with the anova2 function (Statistical toolbox, Matlab^®, Mathworks). The choice of the denoising algorithm proved significant in determining the estimation error (ANOVA: F(3,432) = 76.13, MSE = 3557.67, p < 10⁻⁴). Post-hoc Tukey’s HSD tests showed that the estimation error obtained over all the electrodes considered was significantly minimal (mean value = -2%) when computed by infomax as compared to the other four algorithms. Also, the estimation errors of extended infomax and fastICA were not significantly different for this set of electrodes. Yet, it is worth mentioning, that the estimation error was significantly different between infomax and fastICA over 80% of the electrodes considered when individually tested using ANOVA (p < 10⁻³). Also, the outcome of extended infomax was significantly more variable than that of infomax (ANOVA on estimation error standard deviation; p < 10⁻²).

As for the computational complexity, infomax was the most efficient, converging in an average time of 4.7 (standard deviation 0.2397) seconds. Given that execution time depends on the PC used, the average time needed for infomax to converge will be denoted as . Extended infomax required on average before converging while jade converged in approximately and fastICA in .

In conclusion, this computational investigation advocates the use of infomax given its stability (low variability of the estimation error), its precision in amplitude estimation (error closest to 0%) and its low computational complexity compared to the other algorithms. It is thus the most suitable for this context in comparison to the other 3 ICA algorithms tested and under the simulation parameters considered.

3.3.2 Effects of the modulation depth.

As expected, the computational simulations showed that varying the modulation depth (MD) of the model input has an effect on the performance of the ICA algorithms (Fig 6). For all four algorithms, the ASSR amplitude estimation error increased as the modulation depth diminished. Fig 6 depicts this change at electrodes Fz (Fig 6A), FC1 (Fig 6B), FC2 (Fig 6C) and Cz (Fig 6D) respectively.

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Fig 6.

Effect of the modulation depth on the estimation error of the ICA algorithms tested as measured on electrodes Fz (a), FC1 (b), FC2 (c) and Cz (d). The corresponding p values are indicated in the plot.

https://doi.org/10.1371/journal.pone.0174462.g006

The choice of electrodes can also be justified by the peak values of ASSR amplitudes at these electrodes and their clinical relevance as observed in a pilot study. The represented boxplots indicate that extended infomax presents the least variability as a function of MD (Fig 6 second column) and still has a considerable error interval at 100% MD. On the other hand, the performance of infomax varies significantly (for example on electrode Cz, ANOVA F(3,31) = 20.32; MSE = 15.49,p < 10⁻⁴) as a function of the MD (Fig 6 first column). Despite this variability the estimation error remains confined to the interval [-2; 6%]. Jade presents the highest sensitivity to MD as evidenced by the high variability of its performance (Fig 6 third column). This variability remains statistically insignificant however, thus reflecting an undesired performance for all MD values. Jade can induce up to 40% estimation error when used with low MDs. FastICA follows the same behavior as infomax (Fig 6 fourth column). However, the interval of estimation error remains slightly wider as it extends over [-2; 10%]. Furthermore, the mean of the estimation error only approaches 0% at 100% MD.

3.3.3 Effects of ICA application on the non-Gaussianity of the estimated sources.

Since the maximization of non-Gaussianity is a clear indicator of the performance of an ICA algorithm, the effect of the chosen algorithm on the non-Gaussianity of the separated sources was estimated. Negentropy was chosen as a measure of non-Gaussianity and was calculated based on the estimate provided in [43] and expressed as follows: (8) where y is the considered signal, and g is a Gaussian variable of zero mean and unit variance, and G is a non-quadratic function expressed as follows: (9) and 1 ≤ a ≤ 2. In our simulations, a was fixed to 1. Negentropy reflects the distance between a given distribution and the normal distribution [43]. The further the value of negentropy from zero, the higher the non-Gaussianity of the concerned distibution.

For 10 model simulations (MD = 75%), the values of negentropy were calculated and averaged over the 32 channels of EEG_mix, over the 25 sources detected by each of infomax, extended infomax and jade, and over the 4 sources detected by fastICA. Table 2 depicts the average of the obtained values per method as well as the standard deviation. These results are also presented in the form of boxplots in S1 Fig. In fact, the application of each of the ICA algorithms incurred a significant (ANOVA; p < 10⁻⁴) increase of the order of 10⁴ times in average negentropy among the EEG_mix channels simulated and the sources estimated. This increase in negentropy translates into an increase in non-Gaussianity and therefore validates the convergence of the ICA algorithms applied to the simulated data. Moreover, the increase in negentropy proved to be significantly (ANOVA; p < 10⁻⁴) the highest for solutions obtained by infomax in comparison to each of the other algorithms. This can further corroborate its higher efficiency in comparison to the other algorithms tested in the context of our study.

3.4.1 The extracted artifact.

As an illustration, Fig 7 shows two of the artifactual independent components rejected by infomax. These two major components reflect the artifact’s temporal spread, which is about 50% for this patient. Note that this percentage may vary from one patient to another due to the variability of the subjective pulse duration among patients. This wide temporal spread of the artifactual contamination justifies once again the need to find an alternative method to blanking for this type of stimulation.

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Fig 7. The temporal artifactual spread as observed in real data.

CI1 and CI7 are two of the independent components rejected by infomax.

https://doi.org/10.1371/journal.pone.0174462.g007

3.4.2 The resulting topographies.

Applying the different ICA algorithms to the EEG recording of a CI patient (section 2.5) resulted in slightly different estimations of the ASSR amplitude topography among algorithms (Fig 8). The presented topographies color-code only the detected response amplitudes. In the absence of response detection at certain electrodes (e.g., Oz), the response amplitude is color-coded with a zero amplitude response (dark blue). This implies that the phase coherence of the detected amplitude is not significant of sufficient phase-locking. For precision, a maximum of 20% of the estimated components (i.e., 5 components out of 31) was allowed in manual rejection for every algorithm. Namely, 5 components were rejected for infomax and extended infomax, 4 for jade, and 3 for fastICA.

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Fig 8.

ASSR amplitudes in nV obtained from the undenoised (a) real dataset and their corresponding (b) phase values. ASSR amplitude topographies (nV) of a real CI patient recording denoised by (c) infomax, (d) extended infomax, (e) jade and (f) fastICA.

https://doi.org/10.1371/journal.pone.0174462.g008

Fig 8A represents the topography of the amplitudes of the detected responses obtained from a patient’s undenoised dataset. Note that the visual inspection of this patient’s data showed negligible contamination at electrodes Fz, Cz, Pz and Oz. The phase values of the detected responses are depicted in degrees in Fig 8B. The phase value for this type of stimulation cannot be easily used to confirm or reject the quality of the denoised results as is the case with amplitude modulated biphasic symmetric stimulations [18]. This can be explained by the morphology of the artifact (Fig 7), i.e. the passive components will contribute more or less to the contamination at a given electrode as a function of its distance from the implantation site. Contralateral electrodes exhibit only sharp peaks of contamination as the amplitude of the other two passive phases of the artifact will be of the same order of magnitude as that of the neural activity. The contamination schemes can also vary by the variation in the implantation coordinates and the orientation of the stimulation dipole.

In this study, we did not aim at reproducing computationally the topographies of the recorded patient, but at investigating the subtle variation in ASSR amplitude estimation as a function of the denoising method used. By analogy with the computational results, the equipotential lines of the topographies of infomax (Fig 8C), jade (Fig 8E), and fastICA (Fig 8F) did not present significant differences from those obtained in the model. In other words, the measured ASSR amplitudes were of the same order of magnitude for infomax (Fig 6A) and fastICA (Fig 6D). The topography obtained with jade (Fig 8E) showed a slight decrease in ASSR amplitudes in comparison with the model’s prediction. Finally, the response amplitude topography measured after denoising by extended infomax (Fig 8D) did not present a deviation from the infomax topography as predicted by our computational framework. This discrepancy can be explained by the high variability in the performance of extended infomax for the given recording conditions (MD = 75%). In conclusion, it can be assumed that the order of the induced amplitude change predicted by the model remains credible for the four ICA algorithms tested.

4.1.1 Simulating the artifactual contamination.

The model takes into consideration the six main contributors to the artifact-response (ASSR) mixture in CI patients. This model deliberately models artifactual contamination by stimulation pulses and ignores the representation of the radio-frequency transmission artifact induced by the processor’s antenna for the following reasons. First, the frequency of the RF signal is 4 MHz which is not likely to contaminate responses at the frequency of interest of 39 Hz. Second, even when this signal occurs every time a stimulation pulse is active, it would affect the frequency range around the stimulation frequency and not the modulation frequency. Third, we did not observe unidentified artifactual components in our dataset that could be representative of the RF-induced DC offset artifact [11, 19]. The two DC phases surrounding the active stimulation pulse in the artifactual component IC1 (Fig 7) correspond to two passive stimulation phases of the CI aiming at balancing the Faradaic charge injected by the active pulse.

4.1.2 Construction of the head model.

Concerning the head model, the values of layer conductivities used date back to the first reported study on the matter which determined the brain scalp conductivity ratio to be of the order of 1/80 [28]. Although more recent studies report varying values of this ratio mostly dependent on the method of measurement (see [47] for a review), we assume that these values will not drastically affect the simulations of this computational framework as a tool for comparing denoising algorithms. This ratio remains user defined in our implementation.

4.1.3 Relevance of modeling to testing denoising algorithms.

To our knowledge, neural mass models and forward EEG models have never been proposed or used before for studying CI artifact denoising algorithms. However, it is worth noting that simulated data have already been exploited to evaluate the performance of denoising algorithms in eliminating artifacts of physiological (muscular, ocular, etc.) and non-physiological origin (mostly related to technical issues) from EEG recordings (see [48] for a review). For instance, Makeig and his colleagues [49] simulated realistic 6-channel ERP data by injecting a noise-free 4-channel ECoG recording into 4 simulated dipolar sources of a 3-layer spherical head model in order to evaluate the performance of ICA in separating the simulated mixture. Also, in order to assess the performance of ICA algorithms in eliminating muscular artifacts from EEG recordings, a realistic 3D head model (3 layers) was used to generate realistic EEG datasets from dipolar sources by solving the forward problem [50].

4.2.1 The algorithms’ performance in silico.

Nevertheless, the choice of the denoising algorithm has also an effect on the responses obtained. In the results section, it is computationally demonstrated that the performance of four common ICA algorithms (infomax, extended infomax, jade and fastICA) in attenuating the CI stimulation artifact is different. Computationally, infomax is the most efficient method in reconstituting the expected response amplitudes and remains stable for varying levels of modulation depths. FastICA presents a similar stability but tends to incur a negligible increase (< 4%) in the expected amplitude at 75% MD. On the contrary, the extended infomax and jade algorithms present a significant variability in their outcome. On average, the estimation error of extended infomax is centered on 0% with a probable deviation of about ±10% at 75% MD as depicted in the second column of Fig 6. Similarly, jade has also a wide variability in its outcome ([-5; 20%]) at 75% MD (Fig 5 and Fig 6) but will on average incur an overestimation of the response amplitude.

4.2.2 The difference in algorithm efficiency.

The variability in performance observed among the four algorithms tested computationally in this paper is most probably due to the slight difference in the mathematical approach that they use to optimize statistical independence. For instance, as infomax and extended infomax use mutual information to estimate independence, their mean output is not statistically different. However, given that the source of interest, the artifact, follows a supra-Gaussian distribution (kurtosis 74.4), the infomax algorithm proves highly sufficient to isolate it. While extended infomax takes into consideration sub- and supra-Gaussian sources increasing its computational complexity (i.e. convergence time), its outcome presents significantly more variability than that of infomax (ANOVA test on mean error standard deviation per electrode; p = 0.002). Since extracting sub-Gaussian sources was not part of the studied application, the extended infomax algorithm did not provide an enhancement to the infomax algorithm.

On the other hand, the performance of the fastICA algorithm in silico seems to be also justified by the particular contrast function used to estimate statistical independence, negentropy, which is also equivelant to mutual information (see section 2.4.1). This algorithm initializes by estimating the number of independent components to retrieve, 4 in our simulations. This is probably due to the interdependencies between the two thalamic sources as well as the two cortical sources (see section 3.2), which reduces the number of independent elements to 4. Furthermore, the slight positive error in ASSR amplitude estimation (< 4%) may be attributed to the choice of the mathematical contrast function used to estimate negentropy (kurtosis based). As a matter of fact, this general purpose function is kurtosis-based and best suits sub-Gaussian sources [34]. It is not optimal for separating supra-Gaussian sources [34], which is the case of the simulated artifactual source. According to the authors of [34], a Gaussian-based contrast function is better suited to highly supra-Gaussian sources.

Finally, the distinct performance of the jade algorithm can be attributed to its distinct core algorithm, which seeks to achieve the statistical independence of its output sources by maximizing their kurtosis through the joint diagonalization of their fourth order cumulant matrices. The resulting separated sources in our simulations do not seem to achieve a clear separation of the artifactual and the neural sources based on this approach.

4.2.3 Performance on real data.

In this study, we did not aim at reproducing the exact values of the patient’s ASSR amplitudes in the model. We basically investigated the performance of four commonly used ICA algorithms in separating the artifact from the neural data in silico and then we investigated the outcome of these algorithms in a CI patient’s recordings. Furthermore, the results established on the EEG recording of a CI patient proved in line with the computational results. The algorithms infomax and fastICA yielded similar topographies in the computational simulations (Fig 4C and 4F). The similarity of outcome can be also observed in the real data (Fig 8C and 8F). The jade algorithm (Fig 8E) slightly diminished the amplitude topography in comparison with what was observed for infomax (Fig 8C). As for extended infomax, the algorithm worked quite well on this recording, yielding its average outcome and inducing a comparable topography to that of infomax (Fig 8C). More importantly, the variation in the obtained outcome may not be crucial at a stimulation of 75 dB SPL. However, it can play an important role at threshold detection. Therefore, optimal artifact attenuation is of considerable importance.

4.2.4 The use of ICA for CI artifact denoising.

ICA algorithms are rarely compared for CI artifact suppression in the context of AEPs using real datasets. And when compared [30], it is generally to test the detectability of an uncontaminated AEP independent component. Conversely, our approach aims at detecting and suppressing artifactual components in CI patient raw data ahead of applying preprocessing (averaging, filtering, etc.) for AEP detection. Although Castaneda-Villa [30] reported that it was not possible to retrieve an uncontaminated AEP independent component using extended infomax, it remains the most popular ICA algorithm for CI artifact attenuation [10, 14, 51] followed by infomax [36, 52] and then jade [35]. Regardless, it is worth noting that the performance of a denoising algorithm is also related to the targeted application and the recording conditions (sampling frequency, number of electrodes, etc.). While many studies [10, 14, 17, 35, 36, 51, 52] successfully used ICA algorithms to extract auditory brain responses from CI patient data, some others failed [53]. The possible absence of statistical independence between the CI artifact and the neural responses due to their time-locking was indicated as a possible reason behind the malfunctioning of ICA algorithms in some applications [54]. Although this might relatively be true, the statistical independence of the stimulation artifact and the relevant neural response (the ASSR in our study), seems to go beyond the notion of time-locking or phase-locking. As a matter of fact, the choice of the recording parameters (sampling frequency, anti-alaising filters …) plays an important role. Applying these preprocessing procedures may deform the electrical stimulation artifact (sampling rate of 125 kHz), extracting its envelope, thus necessitating an extra interpolation procedure to attenuate the artifactual residue after low-pass filtering as illustrated by [13]. In some cases, the artifact residue is more correlated with the neural response than the artifact itself. This is particularly true for ASSRs, sinusoid-like responses time-locked to the stimulus whose envelope is also a sinusoid of the same frequency as the expected response. Therefore, the use of low sampling frequencies at acquisition may hinder the correct application of ICA. Furthermore, it was reported that the ICA algorithm infomax successfully denoised the CI artifact in CI-patient ASSR recordings; the sampling frequency used was 8192 Hz [17]. Moreover, using our computational framework, we show that the modulation depth of the stimulus also affects the performance of the ICA algorithms considered in the context of ASSRs. Finally, it is worth noting that spatial filters, such as beamformers, are inapplicable in the case of ASSRs as they require response-free artifact-only time windows to function properly, i.e., a time window in which the neural response is not yet generated. These algorithms are therefore mostly efficient for CI artifact suppression in the context of late AEPs [55].

In conclusion, given 1) the fast convergence of infomax, 2) its conservation of the original neural topography (Figs 4A) and 3) the stability of its outcome (Figs 5 and 6), it is advised to privilege the use of infomax in the context of ASSRs if an ICA algorithm is to be used. The algorithm fastICA may be also considered although its convergence remains bound to the choice of the initial conditions.