Dynamics of a network of single compartmental cells (Page 2/2)

The art of the pfug Page 2 / 2

R_{j} (t) = \sum_{k = 1}^{♯ t_{j}} δ (t - t_{j} (k)) .

We illustrate the dynamics of the synaptic conductance in a very simple example presented in Figure 1.

Example of the Dynamics of Synaptic Conductance. In this simple example, cell 2 receives network current from both cell 1 and cell 3. We show the synaptic conductance at the synapse from cell 1 to cell 2 in (a), from cell 3 to cell 2 in (b). The spike times for cell 1 and cell 3 are stored in the vectors $t_{1} = {2, 10}$ ms and $t_{3} = {1, 8}$ ms, respectively. For $j =$ 1 or 3, the synaptic conductance $g_{2 j}$ jumps instantaneously by the amount $G_{2 j}$ , then decays at a rate dictated by the decay constant, $τ_{2 j}$ . For this example, $G_{21} = 1 μ S / c m^{2}$ , $G_{23} = 2 μ S / c m^{2}$ , and $τ_{21} = τ_{23} = 5$ ms.

External current

Similar to the network current, the external current for cell $i$ is given by

I_{i}^{e x t} (t) = g_{i}^{e x t} (t) (E^{e x t} - V_{i} (t)),

where

\frac{d g_{i}^{e x p} (t)}{d t} = - \frac{g_{i}^{e x t} (t)}{τ^{e x t}} + G^{e x t} R_{i}^{e x t} (t), t > 0 .

We assume that all external sources are excitatory and have the same reversal potential, $E^{e x t}$ . This assumption allows us to model the sum of the effects of all external sources as a single effective excitatory synapse with peak conductance $G^{e x t}$ and decay constant $τ^{e x t}$ . The external firing rate, $R_{i}^{e x t}$ , now represents the sum of the firing rates of all external sources. Because the external sources have no input in this model, we must generate their spike trains. To meet this end, we set $R_{i}^{e x t}$ to be a Poisson spike train with mean rate $f_{i}^{e x t}$ .

Model of a hypercolumn in primary visual cortex

We now apply this network model to a network of cells found in a hypercolumn in primary visual cortex. We divide the network neurons into two types: excitatory and inhibitory. Each cell is selective to the orientation of the visual stimulus and is parameterized by its preferred orientation (PO). For excitatory neurons, the PO for cell $i$ is given by $θ_{i} = - \frac{π}{2} + i \frac{π}{N_{e x}}$ , and the reversal potential is uniform and denoted $E_{e x}$ . The PO and reversal potential for inhibitory neurons are defined analogously.

The peak conductance at a network synapse is dependent on the PO of the pre- and postsynaptic neurons. If cell $j$ is excitatory, then the peak conductance at the excitatory synapse from cell $j$ to cell $i$ is given by

G_{i j} (| θ_{i} - θ_{j} |) = \frac{{\bar{G}}_{e x}}{λ_{e x}} exp (| θ_{i} - θ_{j} | / λ_{e x}),

where $λ_{e x}$ is the excitatory decay constant in space. The peak conductance at inhibitory synapses is defined analogously. We assume that no cell synapses onto itself, or $G_{i i} = 0 \forall i$ , and that no inhibitory to inhibitory synapses exist. Figure 2 shows the network architecture for a small network.

Excitatory neurons in the lateral geniculate nucleus (LGN) are the external sources for our network in the primary visual cortex. The total mean firing rate of all external sources to cell $i$ is given by

f_{L G N} (| θ_{i} - θ_{0} |) = {\bar{f}}_{L G N} C [(1 - ϵ) + ϵ cos (2 (θ_{i} - θ_{0}))],

where $θ_{i}$ is the PO of cell $i$ , and $θ_{0}$ is the orientation of the stimulus. The parameter $C$ dictates the stimulus contrast, and the parameter $ϵ$ measures the degree of tuning of the LGN input. The maximum firing rate, ${\bar{f}}_{L G N}$ , is reached if $C = 0$ and $θ_{i} = θ_{0}$ . Note that if $ϵ = 0$ , the LGN input is untuned, and if $ϵ = 0.5$ , the LGN input vanishes when $| θ_{i} - θ_{0} | = \frac{π}{2}$ .

Example Network. Plots (a),(b), and (c) show the peak conductance values for network synapses. The peak conductance is maximal for neurons with the same PO and decreases exponentially as the distance between the pre- and postsynaptic cells increases. Plot (d) shows the mean firing rate for all excitatory network cells as a function of the PO. We used the following parameters for this example: $N_{e x} = 100$ , $N_{i n} = 20, {\bar{G}}_{e x} = {\bar{G}}_{i n} = 0.01 m S / c m^{2}$ , $θ_{0} = 0$ , $ϵ = 0.5$ , $C = 0.5$ , ${\bar{f}}_{L G N} = 1570$ Hz, and $λ_{e x} = λ_{i n} = 5$ rad.

To ensure that we have understood and implemented the model as Shriki intended, we now test our model by reproducing the conductance-based portion of Figure 3 in Shriki's paper [link] . For this simple example, the network in the primary visual cortex consists of $N$ excitatory, homogeneous neurons. The homogeneity of the network means that each neuron is connected to every other neuron with peak conductance $G$ . Also, each neuron has the same PO, implying that the mean firing rate, $f_{L G N}$ , is uniform across all neurons. To model this, we generate $N$ uncorrelated Poisson spike trains with mean firing rate $f_{L G N}$ . We now implement the model for this homogeneous network to show how the firing rate depends on the peak synaptic conductance, $G .$ Our results are shown in Figure 3.

Firing rate versus synaptic conductance in a homogeneous network of fully connected neurons. By implementing the model presented by Shriki et al, we have reproduced the conductance-based portion of Figure 3 and shown the relationship between the firing rate and the peak synaptic conductance. The parameters used for this network are given in the table below.

Parameter values used for figure 3

$N_{e x}$	1000
$G^{e x t}$	0.0035 $m S / c m^{2}$
$f_{L G N}$	1570 Hz
$λ_{e x}$	5 rad
$τ_{e x}$	5 ms
$τ^{e x t}$	5 ms
$V_{r e s t}$	-73 mV
$C_{m}$	1 $μ F / c m^{2}$
$E_{L}$	-65 mV

Conclusion

We have shown how to extend the model of the isolated single compartmental neuron to model a network of neurons receiving external input. Using this model, we have simulated the dynamics of a network of cells in the primary visual cortex receiving input from the LGN. For an excitatory, homogeneous network, we have shown the relationship between the firing rate of the network and the peak synaptic conductance at the network synapses, reproducing results obtained by Shriki et al. The next step needing to be taken for this VIGRE project is to implement the rate equations that are the central focus of the Shriki paper. We could then compare the results obtained from the rate model to those obtained in the conductance-based model presented here and determine if the rate equations are a good approximation for the conductance-based model.

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Source: OpenStax, The art of the pfug. OpenStax CNX. Jun 05, 2013 Download for free at http://cnx.org/content/col10523/1.34

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