Model of Cooperative Gating of Sodium Channels

Cooperative gating of channels was modelled as following. We assume that a channel is coupled to neighboring channels such that the opening of each neighbor increases the probability of the channel to open. Kinetics of an activation variable is then described by:(1)Here is the steady state activation curve of an isolated channel or a population of independent channels, is the exponent of the activation function, is the activation time constant, is the fraction of channels available for activation. The probability that a channel is in open state is then , hence the expected number of open neighbor channels that are coupled to the channel is . is a coupling constant. It has units of mV, and measures the strength of coupling by the shift along the activation curve that would increase the open probability of an isolated channel by the same amount as opening of a coupled channel. Note that operationally, a right-hand shift along the activation curve is equivalent to the left-hand shift of the curve itself. Coupling strength depends on both, the coupling constant and the number of coupled neighboring channels . Eq. 1 represents the mean field approximation of a coupled population of Markov models for the individual channels [10]. For , Eq. 1 reduces to the canonical case of independent channel activation.

It is known that inactivation of channels depends on the channel state rather than voltage: open channels inactivate fast at any voltage by proceeding from an open state to an absorbing inactivation state [1], [21]–[23].

To implement this we made the kinetics of inactivation for the cooperative channel fraction dependent on the fraction of open channels. The simplest choice for this is and which increases the rate of inactivation when the cooperative fraction opens. Note that this does not mean that the process of inactivation is itself modelled to be cooperative. Rather, inactivation happens independently but with a rate that increases when the cooperative fraction opens.

We use this formalism to assess signatures of cooperativity in the activation of sodium channels, AP onset dynamics and encoding properties.

Model with a Fraction of Cooperative Channels

To study the impact of channel cooperativity on AP onset dynamics, waveform shape and coding properties of neuronal populations we constructed a conductance based neuron model in which (i) a fraction of channels exhibiting cooperative gating and (ii) the strength of inter-channel coupling can be continuously varied (see Eq. 7 and related text for definition of ). A fraction of cooperative channels was included in previously well-characterized Hodgkin-Huxley type neuron model, the Wang-Buzsaki (WB) model [24]. In this cooperative WB model (cWB), the current balance equation reads(2)Here, and are gating variables for the fraction of cooperative sodium channels, and are gating variables for the remaining non-cooperative sodium channels. Gating variables and kinetic equations for non-cooperative sodium channels as well as variables and equations for all other channels were as in the WB model [24]. Model code is available as supplement to this paper, File S1.

Encoding properties of populations of neuron models were characterized using the established approaches of accessing frequency response function [12]–[14], [16], [17]. We studied the firing rate dynamics of neuronal populations in response to signals of different frequencies immersed in fluctuating current(3)in the model neurons. The constant current level was adjusted to keep the mean firing rate . The background synaptic noise was mimicked by an Ornstein-Uhlenbeck process with correlation time constant . In the linear response regime the instantaneous firing rate of the population fulfills . Encoding of input frequency is characterized by the firing rate modulation at that frequency. Plotting the firing rate modulation against frequency provides the frequency response function of neuronal population.

Activation Kinetics of Cooperative Channels

We first assume a Boltzmannian activation curve of a single channel with slope factor (4)In the limit of very short activation time constant , the fraction of open channels after a step to voltage V, called the collective activation curve is defined by(5)Recent study in central neurons demonstrated that time course of activation of sodium channels was best fitted by a mono-exponential function [25], therefore we start our analysis with . We assessed collective activation curve from responses to voltage steps of increasing amplitude. All voltage steps were applied from the same steady state, so the fraction of available channels is constant, .

The steady state solution of is obtained from the intersection points of the two curves and , where is defined as(6)with

(7)When is very small, there is only one intersection point at a small value of close to 0. When is very large, the intersection point shifts to a value close to 1. In a critical range of , there exist three intersection points at certain ranges of voltages. By increasing , a jump of the intersection point occurs from a small value of the fixed point to a larger value near 1. At this transition point, the two curves of and intersect tangentially. The critical value of is thus obtained by solving the system(8)where

The solutions of are obtained from(9)which has real roots only if The value of must be positive, hence . The corresponding coupling strength has to satisfy(10)to produce a finite jump in collective activation curve.

Fig. 2 shows the dependence of the collective activation curve on the effective coupling strength for . With increasing , the activation curve first becomes steeper, and when exceeds the critical coupling strength of the activation curve develops a discontinuity at a threshold voltage .

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Figure 2. Dependence of the sodium channel dynamics on the coupling strength ().

(A,B) Simulated open probability of sodium channels in response to steps of holding potential of increasing amplitude. The voltage-clamp protocol is shown above the traces in (A). Simulations for independent channels (A, ) and for cooperative channels with the critical value of coupling strength (B, ). (C) Collective activation curves of sodium channels with an increasing coupling strength . Discontinuous portions of activation curves for are shown as interrupted lines.

https://doi.org/10.1371/journal.pone.0037629.g002

For stronger coupling () the threshold moves to more negative potentials and the collective activation curve approaches a step function such that almost all channels are closed below but almost all are open above . Similar behavior was found for , as in original Hodgkin-Huxley model [26] and in numerically simulated voltage clamp experiments using Eq. 1 with sodium channel kinetics as in the Wang-Buzsaki (WB) model [24], and to achieve a peak activation time constant of as measured in cortical neurons [25]. In all these simulations, when coupling exceeded the critical value , activation of the current became basically an all-or-none event.

Action Potentials in a Model with a Fraction of Cooperative Channels

Next, we assessed whether the presence of only a fraction of cooperative channels is sufficient to achieve rapid AP onset. We used previously well-characterized neuron model of Hodgkin-Huxley type, the Wang-Buzsaki model [24], and included in it a fraction of cooperative channels. In this cooperative WB (cWB) model, we continuously varied the fraction of channels exhibiting cooperative gating and the strength of inter-channel coupling .

In the cooperative WB model, AP waveform and onset dynamics assessed using vs. phase plots were very sensitive to the fraction of cooperative channels and the coupling strength (Fig. 3). The AP onset was essentially determined by the activation of the cooperative channel fraction, and its rapidness increased with coupling strength. For a small fraction of strongly cooperative channels the AP waveform was typically biphasic (Fig. 3C). For a large fraction of cooperative channels the AP was monophasic with rapid onset (Fig. 3D). APs were considered biphasic if had 3 zero crossings during the AP upstroke, as opposed to 1 zero-crossing for monophasic APs.

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Figure 3. Channel activation and AP dynamics in models with cooperative sodium channels.

(A,B) Activation curves of sodium channels and (C.D) AP phase plots for the models with a small () and a large () fraction of cooperative channels, and a weak coupling (, blue traces) or strong coupling (, red traces).

https://doi.org/10.1371/journal.pone.0037629.g003

This behavior was robust to the details of sodium channel models, e.g., when the kinetics of the cooperative fraction was constructed from of the WB model instead of the Boltzmann kinetics, or when an exponent was used, which in the original Hodgkin-Huxley model leads to a delayed activation of sodium channels [25]. For the latter model, Fig. 4 shows the dependence of the AP dynamics on the coupling strength and the fraction of cooperative channels. The onset rapidness defined as the slope of the phase plot at , increases monotonically with increasing coupling strength. The AP onset is gradual when inter-channel coupling is weak (, left inset in Fig. 4A), but becomes steep with . Notably, APs with steepest onsets were generated by models with a small fraction of strongly coupled channels (, Fig. 4A). These APs were clearly biphasic, with a fast initial phase of cooperative activation followed by a slow rising phase of non-cooperative activation (Fig. 4A, inset bottom right). With increasing fraction of strongly coupled channels, the AP onset becomes less sharp (although still much faster than in models without cooperativity), and the two phases of the AP merge together (inset top right in Fig. 4A and Fig. 3D). In contrast, the peak rate of membrane potential rise increases monotonically with increases of both coupling strength and the fraction of cooperative channels.

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Figure 4. AP onset rapidness and threshold variability in models with cooperative channels.

(A) Dependence of the AP onset rapidness measured as the phase slope at on the coupling strength and the fraction of cooperative channels. White contours delimit the bounder lines between the monophasic and the biphasic APs (see insets). (B) Dependence of the threshold variability (blue symbols, scale on the left) and onset rapidness (red symbols, scale on the right) on the coupling strength for a model with a small fraction () of cooperative channels. Fluctuating current for injection that mimicked background synaptic noise was synthesized as described in Methods (see Eq. 3) (C) Relation between threshold variability and AP onset rapidness for the same model, data from (B).

https://doi.org/10.1371/journal.pone.0037629.g004

APs of cortical neurons exhibit an onset rapidness of at least [10], [11], and are often biphasic [11], [27]. These features can be quantitatively reproduced in our model with a fraction of tightly coupled () channels (Fig. 4). Assuming that each channel is coupled to neighbors, this would imply that opening of a single channel leads to a shift of the activation curve of its coupled neighbors. Such a strong inter-channel coupling is expected to lead to highly synchronized gating such that a cluster of coupled channels behaves as one functional unit. Exactly this type of highly synchronized opening and closing of channels was observed in the direct reports of coupled activation [2], [3], [5]–[8] (see however [28]).

In Hodgkin-Huxley type models, AP onset rapidness and threshold variability (standard deviation of the threshold, defined as voltage at which ) are intrinsically antagonistic [10]. This was not the case in the cooperative model. With strong channel cooperativity, APs are initiated at the discontinuous jump of at voltage threshold :(11)This relation implies that the threshold variability caused by different levels of channel inactivation is not affected by the coupling strength . Numerical simulations of the model defined by Eqs. (1–4) subject to fluctuating input current confirmed this analytical result. With weak channel coupling, threshold variability and AP onset rapidness were antagonistic, but at critical coupling strength () this relation was reversed, and APs with faster onsets expressed higher threshold variability (Fig. 4B,C). In neurons, variability of spike threshold may be further increased due to modulation of cell excitability by inhibition and potassium conductances [29], [30].

Neuronal Encoding in a Model with Cooperative Channels

What are the coding properties of AP generators with cooperative channel gating? We assessed temporal properties of population coding by using the established approaches of measuring frequency response function [12]–[14], [16], [17]. Encoding of signal of a frequency by a neuronal population is characterized by the modulation of the population firing rate by the frequency . Plots of the firing rate modulation against the input signal frequency (Fig. 5) show that modulation by high frequency signals is improved substantially in the models with cooperative channels gating. At input frequencies , the modulation in these models was almost one order of magnitude larger than in the models with uncoupled channels. For high frequency signals, the modulation gain in models with cooperative channels decays roughly exponentially, deviating from power law behaviors reported for conventional conductance based models [12]–[17]. This difference was robust. It remained unaffected by changing time constants of the background noise () from 20 to 60 ms, or by a 10-fold increase of channel density in non-cooperative model that led to a strong increase of the peak of APs (Fig. 5), but did not improve encoding of high frequencies. These results show that the presence of a small fraction of channels with cooperative gating can dramatically improve the encoding of high frequencies by populations of spiking neurons.

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Figure 5. Cooperative channel gating improves the response of a conductance-based model to high-frequency inputs.

Frequency response functions for the Wang-Buzsaki model with independent sodium channels and a standard or 10× fold increased density density of sodium channels (WB, triangles); for cooperative WB model with of cooperative channels, , measured with 3 different correlation time constants of background noise (cWB, squares).

https://doi.org/10.1371/journal.pone.0037629.g005