Model definition.

Let y be a univariate locally stationary signal, as defined in [56]. An auto-regressive (AR) model specifies that y depends linearly on its own p past values, where p is the order of the model: (1) Here, T is the length of the signal and ε is the innovation (or residual) modeled with a Gaussian white noise: . To extend this AR model to a non-linear model, one can assume that the AR coefficients a_i are non-linear functions of a given exogenous signal x, here called the driver: (2) What was proposed in [39, 57] is to consider that the non-linear functions g_i are polynomials: (3) where x(t)^k is x(t) to the power k. Note that one could imagine more complex models for the g_i, yet empirical evidence confirms that polynomials are rich enough for the different neurophysiological signals considered in this work (see S1 Fig).

Inserting the time-dependent AR coefficients (2) into the AR model (1), we obtain the following equation: (4) This can be simplified and rewritten as: (5) where is a one-dimensional vector composed of the scalars a_ik and is a one-dimensional vector composed of the regressors x(t)^k y(t − i). We note the estimated value of A and A^⊤ its transpose.

We also consider a time-varying innovation variance σ(t)² driven by x. This corresponds to the assumption that the power of the signal at time t depends on the driver at this same instant. Since the standard deviation is necessarily positive, we use the following polynomial model for its logarithm: (6) where is a one-dimensional vector composed of the scalars b_k.

This model is called a driven auto-regressive (DAR) model [40]. DAR models are thus a natural extension of well-known AR models and enable analyzing non-stationary or non-linear spectral phenomena observed in neurophysiological time-series. One methodological concern is that the AR coefficients cannot be arbitrary as they should define stable models (see [58], section 3.6). In our case there is an extra difficulty because they are changing over time. To guarantee that each set of coefficients defines a stable filter, it is possible to re-parametrize the model. This requires significantly more complex derivations and leads to a slightly slower optimization, while providing equivalent empirical observations. For simplicity, this manuscript will focus on the simplest model dedicated to CFC analysis, and we refer to [40, 43] for readers interested in more details.

Model estimation.

DAR model eq (4) is non-linear with respect to the given signals x and y, yet it is linear with respect to the regressors x(t)^k y(t − i). Therefore after computing the regressors, it is possible to obtain an analytical expression of the parameters in A.

As the innovation ε(t) is assumed to be a Gaussian white noise, the model likelihood L is obtained via: (7) DAR models are estimated by likelihood maximization. Here, if the innovation variance σ(t)² is considered fixed, maximizing this function boils down to minimizing the sum of squares of the ε(t). Since ε(t) is the residual, the inference of the parameters amounts to maximizing the variance explained by the model. To start the maximization, we first assume that the innovation variance is fixed and equal to the signal’s empirical variance. The likelihood then reads: (8) where C is a constant. We can thus estimate the DAR coefficients by solving the following linear system (a.k.a. normal equations): (9) Given , one can then estimate the vector from the residual ε(t), maximizing the likelihood using off-the-shelf optimization techniques adapted to differentiable problems. We use a Newton-Raphson procedure (see more details in [39]). The instantaneous variance is then updated with B using (6). One can then iterate between the estimation of the coefficients A and B. In our experiments, we observed that one or two iterations are sufficient.

Model selection.

DAR models are probabilistic, which offers a significant advantage over traditional PAC metrics. Indeed, one can evaluate the likelihood of the model L (7), which quantifies the goodness of fit of the data given the model, and select the hyper-parameters that maximize it. To compare models with different number of hyper-parameters (i.e. degrees of freedom), different information criteria can be used such as the Akaike Information Criterion (AIC) [59] or the Bayesian Information Criterion (BIC) [60], which read respectively AIC = −2 log(L) + 2d and BIC = −2 log(L) + d log(T). The integer d is the number of degrees of freedom of the model, which for DAR models equals to d = (p + 1)(m + 1). The BIC has been used extensively for hyper-parameter selection in AR models, and enables the joint estimation of both p and m (see S2 Fig for simulation results).

As the statistical inference with a DAR model is very fast, one can easily estimate models on a full grid of hyper-parameters (p and m) and keep the model that leads to the lowest BIC. Another alternative used in our experiments is the use of cross-validation (CV), consisting of splitting the recorded signals into two sets: a training signal to estimate parameters, and a test signal to evaluate the likelihood of new data. In practice, CV requires that a large amount of data be left for model testing, and that the two datasets be separated by a minimum delay to ensure data independence [61]. In S3 Fig, we present model selection based on cross-validation, applied on real signals.

Model’s power spectral density.

AR models are mainly used for spectral estimation. Since an AR model is a linear filter that is fitted to somehow whiten a particular signal y, the power spectral density (PSD) of this filter is close to the inverse of the PSD of the signal, providing a robust spectral estimation of the signal. For a linear AR model, the PSD at a frequency f is given by: (10) where j² = −1 and a₀ = 1. This estimation is perfect when p → ∞, but in practice, using p ∈ [10, 100] gives satisfying results in most applications.

AR models have been successfully used for spectral estimation in a wide variety of fields, such as geophysics, radar, radio astronomy, oceanography, speech processing, and many more [62]. Importantly, they can be applied on any signal, even deterministic, as they can be seen as linear predictions based on the p past elements, independently from the way the signal was generated. However, in the specific case of a noisy sum of perfect sinusoids, the peak amplitudes in AR spectral estimates are proportional to the square of the power [62], unlike conventional Fourier spectral estimates where the peak amplitudes are proportional to the power. Pisarenko’s method [63], later extended in the MUSIC algorithm [64], might be more suited for spectral estimation of such ‘ideal’ signals. However, as neurophysiological signals are not perfect sinusoids, AR model are well suited for their analysis. For a good overview of spectral estimation techniques, including AR models, we refer the reader to Kay and Marple [62].

Interestingly, AR models yield a spectral estimation with an excellent frequency resolution. Here, frequency resolution is not defined as the distance between two points in the PSD, which would go to zero as we increase zero-padding in the AR filter. Rather, the frequency resolution is defined as the smallest distance that can be detected between two spectral peaks. With this definition, spectral estimation with AR models has a better frequency resolution than Fourier-based methods [65].

Another benefit of spectral estimation with AR models is the theoretical guarantee in term of maximum entropy. Maximizing the entropy of the spectrum consists in introducing as little as possible artificial information in the spectrum. Assuming that we have p auto-correlations of a wide-sense stationary signal, maximizing the entropy leads to the maximum likelihood estimate of an AR model [66]. In other words, the maximum likelihood estimate of an AR model is the best spectral estimator in term of maximal entropy.

In the case of DAR models, the PSD is a function of the driver’s value x, so we note it PSD_y(x). For a given complex driver’s value x₀, we compute the AR coefficients a_i(x₀) using Eq (2), along with the innovation’s standard deviation σ(x₀) using Eq (6). Since AR models with time-varying coefficients are locally stationary [56], we can compute the PSD at a frequency f with: (11) where j² = −1 and a₀(x₀) = 1. We thus have a different PSD for each driver value x₀, i.e. for each time instant, as the driver x(t) fluctuates in time. Note that the PSD is a function of the driver value and not only its phase, unless the driver has been normalized in amplitude. The varying AR coefficients a_i(t) parametrize the fluctuations of the shape of the PSD, whereas the varying innovation’s standard deviation σ(t) is responsible for the absolute fluctuations in power over all frequencies.

Data preprocessing: Extracting the driver.

In this section, we describe the preprocessing applied to the raw signal z to obtain the signal y and the driver x.

First, the raw signal was downsampled to an appropriate sampling frequency f_s (we used 333 Hz and 625 Hz in our examples), as we only consider frequencies up to f_s/2. Power line noise and its harmonics were removed. As power line noise fluctuates over time, the frequency of the power line noise was estimated by projecting the signal onto sinusoids, and the maximum-power projection was subtracted from the raw signal. When necessary, a high-pass filter was used to detrend the signal (typically at 1 Hz) [67].

A bandpass filter was then used to extract the driver x. The center frequency f_x and bandwidth Δf_x for this filter will be discussed in details in the Results section. The filter equation is: (12) where b(t) is a Blackman window of order ⌊1.65 * f_s/Δf_x⌋ * 2 + 1, chosen to have a bandwidth of Δf_x at −3 dB (the filter attenuation is 50% at f_x ± Δf_x/2). The filter is zero-phase since it is symmetric.

Then, the driver x is subtracted from the raw signal z to create the signal y = z − x. Note that the signal y now contains a frequency gap around f_x, which can be a nuisance for the AR estimate that provides a compact model for the broad band power spectrum density of the signal. To solve this issue, we fill this gap by adding a Gaussian white noise filtered with the filter w, and adjusted in energy to have a smooth power spectral density (PSD) in y. Such a preprocessing step is also commonly used when working with multivariate auto-regressive models (MVAR) on neurophysiological signals corrected for power line noise.

Finally, we whiten y with a linear AR model, by applying the inverse AR filter to the signal. This temporal whitening step is not necessary, yet it reduces the need for high order p in DAR and therefore reduces both the computational cost and the variance of the model. After this whitening step, the PSD of y is mostly flat, and DAR models only contain the modulation of the PSD. Fig 1 shows a time sample of a preprocessed signal, taken from a rodent striatal LFP signal (see below for a description of the data). One can see how the slowing varying driving signal follows the original raw signal and how the high frequencies bursting on the peak of the slow oscillation remain in the processed signal y. The general processing pipeline is summarized in Fig 2(a).

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Fig 1. Example of a preprocessed signal.

The driver x is extracted from the raw signal z with a bandpass filter, and then subtracted from z to give y. A PAC effect is present as we see stronger high frequency oscillations at the peaks of the driver. The signal y is presented here as it looks before the temporal whitening step.

https://doi.org/10.1371/journal.pcbi.1005893.g001

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Fig 2. Example on simulated signals: Pipeline, signal, conditional PSD, and comodulogram.

(a) Pipeline of the method. We applied it with (p, m) = (10, 1) on two simulated signals: (b) Simulated signal with PAC and (c) Simulated signal without PAC. (d) From a fitted model, we computed the PSD conditionally to the driver’s phase ϕ_x; each line is centered independently to show amplitude modulation. PAC can be identified in the fluctuation of the PSD as the driver’s phase varies: around 50 Hz, the PSD has more power for one phase than for another. This figure corresponds to a single driver’s frequency f_x = 3.0 Hz. (e) Applying this method to a range of driver’s frequency, we build a comodulogram, which quantifies the PAC between each pair of frequencies.

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In the case of analyzing CFC between two different channels A and B, we can simply perform the previous steps on both raw signals z_A and z_B, and fit a DAR model on y_A driven by x_B. It could also be possible to not subtract x_A from z_A, but if the low frequency bands x_A and x_B are assumed to be uncorrelated, which might not be the case. In such case, the other preprocessing steps should still be performed on z_A.

Model selection: Optimizing the filtering parameters.

During the preprocessing, the driver x is extracted from the preprocessed signal z through a band-pass filter, with center frequency f_x and bandwidth Δf_x. To select automatically these two parameters, we perform a grid-search and select the driver which yields the highest likelihood. Importantly, the highest likelihood does not necessarily correspond to the highest PAC score, but rather to the model with the highest goodness of fit or explained variance. This detail is crucial, as optimizing for the best fit is a legitimate data-driven approach, whereas optimizing for the highest PAC score is statistically more questionable. One additional benefit of our approach is that other types of filters can be compared using a common methodological approach.

For a fair comparison of the drivers, we need to evaluate the model fitting on the exact same signal y. To do so, we remove from y all the possible drivers tested on this grid-search using a high-pass filter above maximum center frequency f_x. Once again, we fill the frequency gap by adding a Gaussian white noise filtered with a low-pass filter complementary to the high-pass filter.

Phase invariance: Removing the bias using a complex driver.

We consider PAC where high frequencies are coupled with a low frequency driving signal. We denote by ϕ₀ the preferred phase of the coupling, i.e. the phase of the driver that corresponds to the maximum amplitude of the high frequencies. When ϕ₀ = 0, the high frequency bursts happen in the peaks of the driver, whereas when ϕ₀ = π, they happen in the troughs.

The driver extracted as described in previous subsection is real-valued, and the filter used to extract it is based on a cosine. As the cosine has the same value for ϕ and π − ϕ, the PAC estimation is biased and underestimated when ϕ₀ is not equal to 0 or π. Indeed, the model mixes the contribution of ϕ and π − ϕ, which attenuates the effect. This bias was already reported in PAC estimation by [11], and the solution proposed by [22] was to use both cosine and sine to have PAC estimates that are invariant to the preferred phase ϕ₀ of the low frequency oscillation.

The same technique can be used on the DAR models. We not only filter the raw signal with w₁(t) = b(t) cos(2πf_xt) to obtain x₁, but also with w₂(t) = b(t) sin(2πf_xt) to obtain x₂, creating a complex-valued driver x = x₁ + jx₂ where j denotes the complex number, j² = −1. With a complex-valued driver, DAR models are naturally extended by adding more regressors: (13) Instead of p(m + 1) regressors, we now have p(m + 1)(m + 2)/2 regressors, and the number of degrees of freedom of the model is now d = (p + 1)(m + 1)(m + 2)/2. Typical values for m are below 3, so the number of parameters stays within a reasonable range despite the squared dependence in m. The number of parameters in the model remains much lower than the number of time samples and the estimation problem stays therefore well-posed. The innovation variance model is also updated accordingly: (14)

A validation result is presented in the supporting information (S4 Fig), showing that indeed it removes the preferred-phase bias.

Conditional spectrum: Deriving the PSD from the model.

After preprocessing and model estimation, we can compute the conditional power spectral density (PSD) of the DAR model, as described earlier. In Fig 2(b) and 2(c), one can see two simulated signals: one with PAC on the left (b) and one without PAC on the right (c). The simulation process, which does not make use of DAR model, will be detailed and discussed in a following section. In Fig 2(d), one can see an example of PSD_y(x₀), with artificial driver’s values x₀ = ρ exp(jϕ). In practice we set ρ to the median of the empirical driver’s amplitude, ρ = median(|x|), and ϕ spans the entire interval [−π, π]. Computing the PSD on a circle allows to visualize the PSD fluctuations with respect to the driver’s phase, giving a representation similar to other PAC metrics. The PAC is identified by the modulation of the spectrum with respect to the driver’s phase ϕ. Other trajectories could be chosen to visualize also the dependency on the driver’s amplitude. Note that with DAR models, the amplitude modulation of y is modeled jointly on the entire spectrum, as opposed to frequency band by frequency band in most other PAC metrics.

Using the fast Fourier transform (FFT) in Eq (11), we are able to compute the PSD for a broad range of frequencies f ∈ [0, f_s/2]. As model estimation is also very fast, we obtain the conditional PSD very quickly: With (p, m) = (10, 1) on a signal with T = 10⁵ time points, the entire DAR estimation and PSD computation lasts 0.12 s. With larger values (p, m) = (90, 2) as selected by cross-validation on the rodent striatal dataset, it lasts 1.34 s.

Comodulogram: Quantifying the modulation at each frequency.

We now detail how comodulograms can be derived from DAR models. To quantify the coupling at a given frequency f, we compute PSD_y(x_c)(f) for a range of n artificial driver’s values x(k) located on a circle of radius ρ = median(|x(t)|), and we normalize it to sum to one: (15) Then, we use the same method as [23] to measure the fluctuation of p_f(k): we compute the Kullback-Leibler divergence between p_f(k) and the uniform distribution q(k) = 1/n, and we normalize it with the maximum entropy log(n): (16) This metric M is between 0 and 1 and allows us to quantify the non-flatness of p_f(k), i.e. the amplitude modulation, frequency by frequency. We can then build a comodulogram, a figure commonly used in the literature which depicts the PAC metric for a grid of frequency (f_x, f). When derived from DAR models as described here, the comodulogram is not affected by the systematic biases presented in the introduction.

Fig 2(e) shows the comodulogram of the two simulated signals, one with and one without PAC. As expected the DAR model reports no coupling when there is none, and reports here a strong coupling between 3 and 50 Hz when it is actually present.

Directionality: Estimating a delay between the signal and the driver.

The DAR model in Eq (4) uses the driver at time t to parametrize the AR coefficients with the assumption that, in PAC, high frequency activity is modulated by the driving signal with no delay. However, one could legitimately ask whether slow fluctuations in oscillatory activity precedes the amplitude modulation of the fast activity or, conversely, whether high frequency activity precedes low frequency fluctuations. This is what we will refer to as directionality estimation.

To assess the problem of directionality estimation with DAR models, we capitalize on the likelihood function. After observing some PAC between y and x, we introduce a delay τ in the driver so as to estimate the goodness of fit of a DAR model between y and x_τ, where x_τ(t) = x(t − τ). Using a grid of values for the delay, one can report the value τ₀ that corresponds to the maximum likelihood. In practice, as we use non-causal filters to extract the driver, and because the AR model uses samples from the past of the y, one might wonder if there is any positive or negative bias in our delay estimation. To address this issue, we apply our analysis on both forward and time-reversed signals, and sum the two models log-likelihood. In this way, the filtering bias is strongly attenuated because it similarly affects both forward and time-reversed models. If the best delay is positive, it means that the past driver yields a better fit than the present driver, i.e. that the slow oscillation precedes the amplitude modulation of the fast oscillation. Inversely, a negative delay means that the amplitude modulation of the fast oscillation follows changes in the slow oscillation.

It is worth noting that the estimation of the delay τ₀ shall not be considered as an alternative way to estimate the preferred phase ϕ₀ defined in a previous section. Although the preferred phase and the delay would be identical should the driver be a perfect stationary sinusoid, in non-stationary neural systems in which the driver’s instantaneous frequency may fluctuate with time, the preferred phase and delay will likely differ. Such a scenario can occur either because signal waveforms are not perfect sinusoids [68] or because the driver actually changes [14]. In other words, τ₀ is a time delay which is identical at all time and corresponds to different phase shifts ϕ(t) = τ₀ * (2πf(t)) which depend on the instantaneous frequency f(t). On the contrary, ϕ₀ is a phase shift that is constant over time and which corresponds to different time delays τ(t) = ϕ₀/(2πf(t)) which also depend on the instantaneous frequency. Fig 3 illustrates these specific points and disentangles the two distinct notions.

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Fig 3. Preferred phase and temporal delay are different.

The temporal delay τ is distinct from the preferred phase ϕ₀. (a) When both are equal to zero, the high frequency bursts happen in the driver’s peaks. (b) When τ = 0 and ϕ ≠ 0, the bursts are shifted in time with respect to the driver’s peaks, and this shift varies depending on the instantaneous frequency of the driver. (c) When τ ≠ 0 and ϕ = 0, the bursts are shifted in time with respect to the driver’s peaks, and this shift is constant over the signal. In this case, note how the driver’s phase corresponding to the bursts varies depending on the instantaneous frequency of the driver. (d) τ and ϕ₀ can also be both non-zero. (e-h) Negative log-likelihood of DAR models, fitted with different delays between the driver and the high frequencies. The method correctly estimates the delay even when ϕ₀ ≠ 0. (i-l) PSD conditional to the driver’s phase, estimated through a DAR model with the best estimated delay. The maximum amplitude occurs at the phase ϕ₀.

https://doi.org/10.1371/journal.pcbi.1005893.g003

Like most PAC metrics, DAR models are invariant with respect to the preferred phase. Both the strength of the coupling and the model likelihood are unchanged with respect to ϕ₀. On the contrary, all PAC metrics including DAR models are strongly affected by a time delay τ when the driver is not a perfect sinusoid. This attenuates the coupling and can potentially modify artificially the preferred phase. When the delay is too large, all metrics would measure zero coupling. This is in fact what justifies the use of surrogate techniques that introduce a large time shift to quantify the variance of the measure in the absence of coupling [6, 23, 24]. Fig 3(e)–3(h) provides the delay estimated with DAR models, obtained by maximizing the likelihood over a grid of delays, as explained previously. In Fig 3(i)–3(l), we show the conditional PSD of the model obtained with the best estimated delay as well as the estimated preferred phase ϕ₀. Using the likelihood, our method is thus able to estimate this delay, thus improving PAC estimation and extending PAC analysis.

The question of delay estimation has been previously addressed in the literature with measures borrowed from information theory. For instance, transfer entropy (TE) [69–71] has been adapted to PAC by applying it on the driver and the envelop of the fast oscillations [72]. The TE from a signal a to a signal b is defined as the mutual information between the present of b and the past of a, conditioned on the past of b. It is similar in this way to Granger causality (GC) [73], which also compares how the present of b can be better predicted by the past of both a and b, than by only the past of b, using AR models. Note that when variables follow a Gaussian distribution, TE and GC are actually equivalent [74]. In the case of PAC, both TE and GC need to be evaluated on the driver x and the envelope of a bandpass filtered y_f. Interestingly, GC has been shown to fail when the signal-to-noise ratios of the two signals are different [75], which is often the case for the driver and the envelop of the high frequencies. Hence, it remains to be investigated how TE/GC compares with DAR models in terms of performances.

Our method is also different from these other methods, since we model directly y and not its envelop, making our method more specific to PAC. This is made possible since DAR models use the delayed driver x_τ not to predict y, but to modulate how y is predicted from its own past. PAC directly arises from this non-linear interaction in DAR models. Inherently to this PAC specificity, our method is also asymmetrical with respect to x and y.

Delay estimation in PAC has also been addressed with another method called Cross-Frequency Directionality (CFD) [76], which is based on the phase slope index (PSI) [77]. PSI is a measure of the phase slope in the cross-spectrum of two signals, and is also used to infer causal relations between signals. CFD adapts this measure by applying it on the driver and the envelop of the fast oscillations. Contrary to TE, CFD is not designed to measure a delay; thus, we modified it so as to compare it qualitatively to our approach (see Results).

If such delay estimation results may not reflect pure causality [24], for instance because of the transitivity of correlation, they nevertheless improve the analysis of PAC going one step further by estimating the delay between the coupled components.

Simulated signals.

In our experiments, methods comparisons and model evaluations, we make an extensive use of simulated signals showing some PAC. The simulations are generated as follows: we simulate a coupling between f_x = 3 Hz and f_y = 50 Hz, with a sampling frequency f_s = 240 Hz, during T time points (T depends on the experiment). We do not use a perfect sinusoidal driver, as using such an ideal oscillatory signal is over-simplistic. Drivers can indeed have a larger band as suggested next by our experiments. Finally, strong empirical evidence suggests that neurophysiological signals have complex morphologies that can be overlooked when studied as ideal sinusoids [32].

To construct a time-varying driver peaking at 3 Hz, we bandpass filter a Gaussian white noise at a center frequency f_x = 3 Hz and with a bandwidth Δf_x = 1 Hz, using the same filter detailed in the preprocessing section. The smaller the bandwidth, the closer the driver is to a perfect sinusoid. We normalize the driver to have unit standard deviation σ_x = 1. We then modulate the amplitude a_y of a sinusoid at, for example, f_y = 50 Hz, using a sigmoid on the driver x: (17) with a sharpness set to λ = 3. By doing so, the amplitude varies between 0 and 1 depending on the driver’s value. We normalize the signal y to have a standard deviation σ_y = 0.4. We then add to the signal y both the driver x and a Gaussian white noise with a standard deviation σ_ε = 1. Note that this simulation procedure is not based on a DAR model. In other words, we do not validate our model using signals that fall perfectly into the category of stochastic signals that are synthesized with a DAR model.

Empirical datasets.

We tested DAR models on three different datasets, with invasive recordings in humans and rodents:

1. A rodent local field potential (LFP) recording in the dorso-medial striatum from [78](S2 Fig), (1800 seconds down-sampled at 333 Hz)
2. A rodent LFP recording in the hippocampus from [79] collected during rapid eye movement (REM) sleep (100 seconds down-sampled at 625 Hz)
3. A human electro-corticogram (ECoG) channel in auditory cortex from [6] (730 seconds down-sampled at 333 Hz)

We refer the reader to corresponding articles for more details on the recording modalities of these neurophysiological signals.

Simulation study: Validating the approach.

To validate our approach, we tested on simulated signals whether both center frequency f_x and bandwidth Δf_x were correctly estimated. For this, we simulated signals using f_x(simu) = 4 Hz and Δf_x(simu) ∈ [0.2, 0.4, 0.8, 1.6, 3.2] Hz. To mimic the duration of our three real signals, we used T = ⌊100f_s⌋ time points, for a duration of 100 seconds.

As the noise mainly affected the amplitude modulation but barely altered the driver, we also added a Gaussian white noise low-pass filtered at 20 Hz, and scaled to have a PSD difference of 10 dB at f_x = 4 Hz between the driver and the noise. In this way, the driver was also altered by noise.

Given the simulated signal, we performed a grid-search over f_x and Δf_x, extracting the driver, fitting the model and computing the likelihood of the model. Results are presented in Fig 4. As expected, the center frequency f_x was correctly estimated for all bandwidths Δf_x. More importantly, the negative log-likelihood was minimal at the correct simulated bandwidth.

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Fig 4. Driver’s frequency and bandwidth selection (simulations).

(a,b) Two examples of grid-search over both f_x and Δf_x, over simulated signals with (a) Δf_x(simu) = 0.4 Hz and (b) Δf_x(simu) = 1.6 Hz. For all bandwidths (except 6.4 Hz), the negative log-likelihood is minimal at the correct frequency f_x = 4 Hz. (c) To see more precisely the bandwidth estimation, we plot the negative log-likelihood (relative to each minimum for readability), for several ground-truth bandwidth Δf_x(simu), with f_x = 4 Hz. For each line, the minimum correctly estimates the ground-truth bandwidth (depicted as a diamond), showing empirically that the parameter selection method gives satisfying results.

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This simulation confirms that the likelihood can be used to estimate the correct parameters for the driver’s filtering step, and that does not present any obvious bias in the estimation.

Driver estimates on human and rodent recordings.

The outcome of the model selection procedure on the three real neurophysiological signals are reported in Fig 5. Two general observations can be made. First, for all three signals, the optimal bandwidth was relatively large (3.2 Hz). Second, the optimal center frequency changed as we increased the bandwidth. Interestingly, this phenomenon was not observed in the simulation study, suggesting that in real data the optimal driver is wide-band and has an asymmetrical spectrum. In other words, the driver’s frequency is not precisely defined, and a large band-pass filter should be preferred to extract the driver.

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Fig 5. Driver’s frequency and bandwidth selection (real signals).

(a,c,d) Negative log-likelihood of the fitted model for a grid of filtering parameters f_x and Δf_x: (a) rodent striatum, (c) rodent hippocampus, (d) human auditory cortex. The optimal bandwidth was very large (3.2 Hz), and the optimal center frequency changed as the bandwidth increased, suggesting that the optimal driver had a wide asymmetrical spectrum. (b) This portion of the rodent striatal signal shows two examples of driver with different bandwidths: The wide-band driver better follows the raw signal, and independently also leads to a better fit in DAR models.

https://doi.org/10.1371/journal.pcbi.1005893.g005

These observations thus question which parameters should be used in practice. The classical approach is to build a comodulogram to select the best driver frequency f_x, choosing arbitrarily the bandwidth Δf_x. This bandwidth is typically quite narrow, e.g. 0.4 Hz, and chosen to clearly isolate the maximum frequency in the comodulogram. However, this approach relies on the assumption that the driver is nearly sinusoidal, which is unrealistic [32]. On the contrary, our data-driven approach selects the frequency and bandwidth that lead to the highest goodness of fit of our model.

To further describe the implications of our observations, we focused on the rodent striatal LFP signal. We compared an arbitrary choice of driver bandwidth (0.4 Hz) and the optimal choice with respect to the model likelihood (3.2 Hz). For these two bandwidths, we selected the optimal center frequencies, 2.2 Hz and 4.0 Hz respectively. Fig 5(b) shows a time sample of the raw signal and the two extracted drivers. The wide-band driver (in green) followed very well the raw signal, which was not a perfect sinusoid. On the contrary, the narrow-band driver (in blue) seemed poorly related to the slow oscillation of the raw-signal. To know which of these two slow varying signals best captured the temporal amplitude modulations of the high frequencies, we fitted a model using each of these two drivers. We used the same high-pass filtered signal y, i.e. where we removed all frequencies below 16 Hz.

We found that the model with the wide-band driver explained more variance in the high frequencies than the model with the narrow-band driver, that is, that the model better explained the amplitude fluctuations of the high frequencies. As we used the same signal y for both models and as the driver lied in different frequency intervals, it should be noted that the fitting to the slow oscillation visible in Fig 5(b) and the quality of the fit of the amplitude modulation in the high frequencies were two independent observations. By optimizing for the latter, one observe in Fig 5(b) that it leads to a more realistic extraction of the driving neural oscillation.

More generally, our results emphasize the complexity of the choice of parameters in PAC analysis. With our method, we were able to easily compare different parameters, even on non-simulated data, which offered a principled way to set them and helped avoiding misinterpretation due to bad choices. We now investigate the conditional PSDs and the comodulograms estimates on these three datasets.

PSDs and comodulograms estimates of human and rodent neurophysiological recordings.

Fig 6 shows for each signal the PSD (in dB) depending on the driver’s phase, estimated through DAR models. The hyper-parameters (p, m) for the rodent striatal, the rodent hippocampal and the human cortical data were (90, 2), (15, 2), and (24, 2), respectively. These parameters were chosen by cross-validation with an exhaustive grid search: p ∈ [1, 100] and m ∈ [0, 3]. The filtering parameters (f_x, Δf_x) were chosen to maximize the likelihood as described in previous section, and are respectively (8.2, 3.2) Hz, (5.2, 3.2) Hz and (4.0, 3.2) Hz (Fig 6 bottom).

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Fig 6. PSD conditional to the driver’s phase.

Dataset: Rodent striatum (a,d), rodent hippocampus (b,e), human auditory cortex (c,f). We derive the conditional PSD from the fitted DAR models. In one plot, each line shows at a given frequency the amplitude modulation with respect to the driver’s phase. The driver bandwidth Δf_x is 0.4 Hz (top row) and 3.2 Hz (bottom row). Note that the maximum amplitude is not always at a phase of 0 or π (i.e. respectively the peaks or the troughs of the slow oscillation). In figure (d), we can also observe that the peak frequency is slightly modulated by the phase of the driver (phase-frequency coupling).

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For comparison, we also show the PSD obtained with a bandwidth Δf_x = 0.4 Hz, with the center frequency chosen to maximize the likelihood. We used (6.4, 0.4) Hz, (3.2, 0.4) Hz and (2.2, 0.4) Hz (Fig 6 top), respectively.

We observed two kinds of phenomena. In the rodent striatal and hippocampal data, the coupling was mainly concentrated around a given high frequency (i.e. 80 Hz and 125 Hz, respectively), whereas in the human cortical data, the coupling was observed at all frequencies, with a maximum around 20 Hz. The smoothness of the figures depends on the parameter p: a low value leads to a smoother PSD. Please note that the interpretation of the results depends on the filtering parameters.

The two phenomena can also be visualized in Fig 7, where we plotted comodulograms for all three signals, computed with four different PAC metrics: the mean vector length first proposed in [6] and updated by [26], the parametric model of [22] based on GLM, the modulation index of [23] that uses the Kullback-Leibler divergence, and our method based on DAR models.

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Fig 7. Comodulograms with parameters optimizing the likelihood.

Dataset: rodent striatum (top), rodent hippocampus (middle) and human auditory cortex (down). Methods, from left to right: [Ozkurt et al. 2011] [26], [Penny et al. 2008] [22], [Tort et al. 2010] [23], DAR models (ours). The DAR model parameters and the driver bandwidth are chosen to be optimal with respect to the likelihood. White lines outline the regions with p < 0.01.

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In DAR models, the hyper-parameters used are the cross-validated values described above. With other methods, high frequencies were extracted with a bandwidth Δf_y twice the highest driver frequency used: 14 Hz, 28 Hz, and 20 Hz respectively. For all methods, the drivers were extracted with the optimal bandwidth Δf_x = 3.2 Hz.

The white lines crop the regions with a p-value p < 0.01. To compute such p-value, we added a random time shift between x and y, recomputed the entire comodulogram, and kept only the maximum value. We repeated this process 1000 times to have a distribution of maxima in the case of uncoupled surrogate signals. Then, we took the 99-percentile of this distribution to obtain the threshold associated with the p-value p = 0.01. This method does not suffer from multiple testing issues contrary to the approach that estimates a different null distribution for each frequency couple in a comodulogram. We also avoided using a z-score since we cannot assume the distributions to be Gaussian.

The resulting comodulograms did not look like typically reported comodulograms, as we used a much larger bandwidth (3.2 Hz) than what was found in the literature. With an arbitrary choice of parameters, we could have obtained more classical comodulograms, as shown in Fig 8. However, these results could be misleading because they suggest a coupling between sinusoidal oscillators, although the corresponding drivers are not perfectly sinusoidal (see Fig 5(b)).

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Fig 8. Comodulograms with parameters optimizing the comodulgoram sharpness.

Dataset: rodent striatum (top), rodent hippocampus (middle) and human auditory cortex (down). Methods, from left to right: [Ozkurt et al. 2011] [26], [Penny et al. 2008] [22], [Tort et al. 2010] [23], DAR models (our). The driver bandwidth is chosen to have a well defined maximum in driver frequency: Δf_x = 0.4 Hz. The DAR model parameters are chosen to give similar results than the other methods: (p, m) = (10, 2). White lines outline the regions with p < 0.01.

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On these comodulograms, the four methods yielded comparable results as the data we used were very long: 1800, 100, and 730 seconds for the rodent striatal, the rodent hippocampal and the human cortical data, respectively. However, as we will see in the next section, differences emerge between methods when the signals are shorter.

Simulations and comparisons.

To validate the directionality estimations approach, we simulated signals with T = 1024 time points (4 seconds). We introduced a delay between the slow oscillation and the amplitude modulation of the fast oscillation, and verified that our method could correctly estimate the delays. We did not use a perfect sinusoidal driver, as the delay would only end up in a phase shift, and would not change the strength of the PAC. We used a bandwidth Δf_x = 2 and a noise level σ_ε = 0.4.

We compared our method, using a DAR model with (p, m) = (10, 1), to the cross-frequency directionality (CFD) approach described in [76]. This method makes use of the phase slope index (PSI) [77] for PAC estimation. In [76], the PSI over a frequency band F is defined as: (18) where C_xy is the complex coherence, ℑ is the imaginary part, and δ_f is the frequency resolution. As the PSI was not designed to provide an estimation of the delay, we modify it into: (19) where n_F is the number of frequencies in set F. Note that this delay estimator was correct only if the coherence was almost perfect C_xy(f) ≈ 1 and if the phase slope was small enough to have sin(ϕ(f + δ_f) − ϕ(f)) ≈ ϕ(f + δ_f) − ϕ(f). As these assumptions are rarely met in practice, we only used this estimator to compare qualitatively with our own estimator.

Results presented in Fig 10 show the mean estimated delay with ±1 standard deviation computed over 20 simulations. The delay was correctly estimated in both time directions, with no visible bias. As expected, the modified CFD was biased, and showed a higher variance than the DAR-based approach.

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Fig 10. Estimating delays over 20 simulations for each delay.

The delays are estimated on both direct time (a) and reverted time (b). The delays are normalized: τ = 1 corresponds to one driver oscillation, i.e. 1/f_x sec. The modified CFD shows a bias and only serves for qualitative comparison. The delay estimation based on DAR models correctly estimates the delays, with no visible bias.

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Delay estimates of human and rodent data.

We applied this delay estimation method on the three experimental recordings, with both direct time and reverted time. Once again, note that the comparison with the CFD [76] is only qualitative, since the CFD was not designed as a delay estimator. The temporal delay was estimated with DAR models with the parameters obtained from the cross-validation selection. The driver we used was obtained with the best filtering parameters found in our grid-search: (f_x, Δf_x) are respectively (4.0, 3.2) Hz, (8.2, 3.2) Hz, and (5.2, 3.2) Hz.

The results are presented in Fig 11, where we display the delay estimated with maximum likelihood over multiple DAR models. We also display error bars which correspond to the standard deviation obtained with a block-bootstrap strategy [80]. This strategy consists in splitting the signal into n = 100 non-overlapping blocks of equal length, to draw at random (with replacement) n blocks, and to evaluate the delay on this new signal. We repeated this process 20 times and computed the standard deviation of the 20 estimated delays. Such strategy is used to estimate empirically the variance of a general statistic from stationary time series.

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Fig 11. Estimated delays on rodent and human datasets.

(a) Negative log likelihood for multiple delays, with the human cortical signal. (b) Optimal delay for the three signals, computed with model selection on DAR models, and with a CFD method modified to provide a delay. The error bars indicate the standard deviation obtained with a block-bootstrap strategy. For the rodent hippocampal data, the delay is positive: the low frequency oscillation precedes the high frequency oscillation. For the human cortical data and the rodent striatal data, the delay is negative: The high frequency oscillation precedes the low frequency oscillation.

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First, one can observe that the results were qualitatively similar between the two methods. The CFD was biased toward zero for large delays, as was previously shown in the simulations. One can also note that the directionality was not always the same. For the rodent striatal and the human cortical data, the delay was negative and the best model fit happened between the signal y and the future driver x. Inversely, in the rodent hippocampal data, the delay was positive, and the best model fit was between the signal y and the past driver x. Further experiments need to be performed to better understand the origin of such delays but we demonstrate here the use of DAR models to estimate them.

Note that our method does not select the delay that leads to the maximum PAC, which would not be statistically valid. On the contrary, we select the delay that leads to the best fit of the model on the data. This approach is more rigorous since we maximize the variance explained by our model, and not the effect of interest.