Wiki » History » Version 15
Version 14 (Ramon Martinez, 22 Aug 2014 08:55) → Version 15/23 (Ramon Martinez, 22 Aug 2014 09:19)
## Network models of V1
This project will be used to test implementations in PyNN (and eventually NeuroML) of published models of primary visual cortex (V1) based on spiking point neurons.
An initial focus will be on pubmed:14614078, but other models investigated will include pubmed:19477158 and pubmed:22681694.
This project is part of the [INCF participation in the Google Summer of Code 2014](http://incf.org/gsoc/2014).
### Troyer Model
Here I will describe briefly the implementation of pubmed:9671678.
In order to run this model is necessary to first install [git](http://git-scm.com/) and [PyNN](http://neuralensemble.org/PyNN/) and the appropriate simulator.
After that you can clone directly from git using:
~~~
git clone https://github.com/OpenSourceBrain/V1NetworkModels.git
~~~
##### Overview of the model
As the project stands at this moment the workflow can be briefly described in two steps: first there are two scripts that implement the spatio-temporal filter in the retina and produce the spike-trains for each cell in the Lateral Geniculate Nucelus (LGN) and stores them for further use. Second, there is a file that loads those spike-trains and runs the simulation of the cortical networks in PyNN using them. The first task is executed by two scripts `produce_lgn_spikes_on_cells.py` and ` produce_lgn_spikes_off_cells.py ` which generates pickled files in the folder './data' with the spike trains and positions for a given contrast that is selected in the parameters of the script. After we have run the file to produce the spikes with a given contrast (which can be adjusted in the scripts mentioned above) we can run the main script `full_model.py` with the same contrast in order to run the complete model.
In order to describe the model in more detail we will start by describing `full_model.py`. That is, we will assume that we already have the spikes' data from the LGN that is going to be feed into the other layers. So we will start by describing the general structure of the model which is shown in the following diagram.
![Scheme](http://www.opensourcebrain.org/attachments/download/213/print_model.png)
The model consists in three qualitatvely different types of layers. The LGN with center-surround receptive fields and the inhibitory and excitatory layers which are connected with a Gabor filter profile to the LGN and a correlation based connectivity between them. At the beginning of the `full_model.py` script we have the following parameters that control the general structure of the model and the connections between the layers. First we have the parameters that control the number of cells in each layer which were set accordingly to the values given in the troyer paper. Furthermore we have included a factor constant to decrease the overall size of the model and we also give the user the ability to chose how many LGN population layers he wants to include in the simulation:
~~~
factor = 1.0 # Reduction factor
Nside_exc = int(factor * Nside_exc)
Nside_inh = int(factor * Nside_inh)
Ncell_lgn = Nside_lgn * Nside_lgn
Ncell_exc = Nside_exc ** 2
Ncell_inh = Nside_inh ** 2
N_lgn_layers = 1
~~~
After we also include a series of bolean parameters that give the user the ability to show whether he wants to include certain connections and layers in the simulation. This is very useful to test the effect of a particular connection or layer in the overall behavior of the model.
~~~
## Main connections
thalamo_cortical_connections = True # If True create connections from the thalamus to the cortex
feed_forward_inhibition = True # If True add feed-forward inhibition ( i -> e )
cortical_excitatory_feedback = True # If True add cortical excitatory feedback (e -> e) and ( e -> i )
background_noise = True # If True add cortical noise
correlated_noise = False # Makes the noise coorelated
~~~
This is all regarding the general structure of the model. The remaining part of `full_model.py` is composed of two main sections. The first one determines the parameters of the neurons and the connections and were set according the paper. The second part is the building of the model in PyNN, this is detail in the companion blog of this project. In order to allow the user to interact immediately with the model and to provide with a cleared understanding of how different parts of the Troyer model can be reproduce with our code (and its limitations) we provide a series of scripts that reproduce qualitatively a substantial amount of the figures in Troyer original paper.
#### Figures Scripts
1. First we have the LGN reponse. In order to obtain the results in figure 1a we have to run the file `troyer_plot_1a.py`. 'troyer_plot_1a.py'. We obtain something like the following.
![Toyer1a](http://www.opensourcebrain.org/attachments/download/207/troyer_plot1a.png)
2. Then we have the mechanism that samples connections from a Gabor function shown in figure 2. gabor function. In order to obtain the connectivity pattern and to see how the connectivity parameters affect affects the final outcome the script `troyer_plot2.py` can be used to explore. If run it run. It will produce a figure similar simular to the following one:
![Toyer2](http://www.opensourcebrain.org/attachments/download/212/troyer2.png)
3. We have also a script that plots the excitatory contribution from th LGN to the excitatory layer in figure 3a. In order to play with how the parameters change the profile of this contribution the script `troyer_plot3a.py` can be explored. If run with a particular simulator (run troyer_plot3a.py nest) it will produce an output like this:
![Toyer3a](http://www.opensourcebrain.org/attachments/download/216/troyer3a.png)
![Troyer7a](http://www.opensourcebrain.org/attachments/download/214/troyer7a.png)
Here bellow I describe in more detail all of the parts of the model
#### LGN - spikes
In brief, the Retina and the Thalamus part of the model can be represented by a spatio-temporal filter that, when convolved with the stimuli, will produce the firing rate of a given LGN cell. After that, we can use a non-homogeneous Poisson process to produce the corresponding spikes for each cell. We describe this in detail bellow.
###### Spatio-Temporal Receptive Field (STRF)
The file `kernel_functions.py` contains the code for creating the STRF. The spatial part of the kernel possess a **center-surround** architecture which is model as a different of Gaussians. The temporal part of the receptive field has a **biphasic** structure, we use the implementation describe in Cai et al (1998). The details of the implementation are described in detail in the companion blog of this project [(link)](http://neuralensemble.blogspot.fr/2014/06/gsoc-open-source-brain-retinal-filter-i.html). Down here we present a kernel produce with this classes. The time here runs from left to right and from up to down as usual text, so we can see how the spatial components of the filter change in time with this series of two dimensional maps.
![STRF](http://www.opensourcebrain.org/attachments/download/205/kernel.png)
We also include a small script `center_surround_plot.py` that can be used to visualize the spatial component of the STRF and received immediate feedback on how the overall pattern changes when the parameters and resolutions are changed.
###### Stimuli
The file `stimuli_functions.py` contains the code for creating the stimuli. In particular we used the implementation of a **full field sinusoidal grating** with the parameters described in the paper. Down here we show an example of the stimuli at a particular point in time for illustration purposes:
![stimuli](http://www.opensourcebrain.org/attachments/download/206/sinus_grating.png)
Here we also included a small script `sine_grating_plot.py` to visualize the sine grating at a particular point in time.
###### Convolution
After we have the stimuli and the STRF we can use the **convolution** function defined in the file `analysis_functions.py` to calculate the response of LGN' neurons. The details of how the the convolution is implemented is described in the detail in the following entry of the blog [(link)](http://neuralensemble.blogspot.fr/2014/06/gsoc-open-source-brain-retinal-filter-ii.html). With this in our hand and using the parameters described in the paper we can already reproduce the first plot in Troyer's paper. The file `lgn_firing_rate_troyer_plot1.py` in the repository does this automatically for us and give us the next plot:
![troyer_plot](http://www.opensourcebrain.org/attachments/download/207/troyer_plot1a.png)
Here we can see the firing rate for an on and for an off cell subjected to the same stimuli. Note that they are off-phase and also the contrast dependent response. The responses are rectified after back ground noise was added.
###### Producing Spikes
After we have the firing rate of a neuron we can use the produce_spikes functions in the file `analysis_functions.py`. This functions takes the firing rate and using non-homogeneous Poisson process outputs an array with the spikes times. We provide one file `produce_lgn_spikes_one.py` for testing variations of parameters and as an example showcase.
![example](http://www.opensourcebrain.org/attachments/download/208/spikes_example.png)
###### Storing Spikes
Now we have the complete mechanism of spike creation. In the file `produce_lgn_spikes.py`. This file creates a grid of positions (This should correspond to the grid of LGN cells that we are going to use in PyNN) and produces the list of spikes associated with them as well as the positions. The particular stoage format that we are using is `cPickled`.
#### LGN - Network
This project will be used to test implementations in PyNN (and eventually NeuroML) of published models of primary visual cortex (V1) based on spiking point neurons.
An initial focus will be on pubmed:14614078, but other models investigated will include pubmed:19477158 and pubmed:22681694.
This project is part of the [INCF participation in the Google Summer of Code 2014](http://incf.org/gsoc/2014).
### Troyer Model
Here I will describe briefly the implementation of pubmed:9671678.
In order to run this model is necessary to first install [git](http://git-scm.com/) and [PyNN](http://neuralensemble.org/PyNN/) and the appropriate simulator.
After that you can clone directly from git using:
~~~
git clone https://github.com/OpenSourceBrain/V1NetworkModels.git
~~~
##### Overview of the model
As the project stands at this moment the workflow can be briefly described in two steps: first there are two scripts that implement the spatio-temporal filter in the retina and produce the spike-trains for each cell in the Lateral Geniculate Nucelus (LGN) and stores them for further use. Second, there is a file that loads those spike-trains and runs the simulation of the cortical networks in PyNN using them. The first task is executed by two scripts `produce_lgn_spikes_on_cells.py` and ` produce_lgn_spikes_off_cells.py ` which generates pickled files in the folder './data' with the spike trains and positions for a given contrast that is selected in the parameters of the script. After we have run the file to produce the spikes with a given contrast (which can be adjusted in the scripts mentioned above) we can run the main script `full_model.py` with the same contrast in order to run the complete model.
In order to describe the model in more detail we will start by describing `full_model.py`. That is, we will assume that we already have the spikes' data from the LGN that is going to be feed into the other layers. So we will start by describing the general structure of the model which is shown in the following diagram.
![Scheme](http://www.opensourcebrain.org/attachments/download/213/print_model.png)
The model consists in three qualitatvely different types of layers. The LGN with center-surround receptive fields and the inhibitory and excitatory layers which are connected with a Gabor filter profile to the LGN and a correlation based connectivity between them. At the beginning of the `full_model.py` script we have the following parameters that control the general structure of the model and the connections between the layers. First we have the parameters that control the number of cells in each layer which were set accordingly to the values given in the troyer paper. Furthermore we have included a factor constant to decrease the overall size of the model and we also give the user the ability to chose how many LGN population layers he wants to include in the simulation:
~~~
factor = 1.0 # Reduction factor
Nside_exc = int(factor * Nside_exc)
Nside_inh = int(factor * Nside_inh)
Ncell_lgn = Nside_lgn * Nside_lgn
Ncell_exc = Nside_exc ** 2
Ncell_inh = Nside_inh ** 2
N_lgn_layers = 1
~~~
After we also include a series of bolean parameters that give the user the ability to show whether he wants to include certain connections and layers in the simulation. This is very useful to test the effect of a particular connection or layer in the overall behavior of the model.
~~~
## Main connections
thalamo_cortical_connections = True # If True create connections from the thalamus to the cortex
feed_forward_inhibition = True # If True add feed-forward inhibition ( i -> e )
cortical_excitatory_feedback = True # If True add cortical excitatory feedback (e -> e) and ( e -> i )
background_noise = True # If True add cortical noise
correlated_noise = False # Makes the noise coorelated
~~~
This is all regarding the general structure of the model. The remaining part of `full_model.py` is composed of two main sections. The first one determines the parameters of the neurons and the connections and were set according the paper. The second part is the building of the model in PyNN, this is detail in the companion blog of this project. In order to allow the user to interact immediately with the model and to provide with a cleared understanding of how different parts of the Troyer model can be reproduce with our code (and its limitations) we provide a series of scripts that reproduce qualitatively a substantial amount of the figures in Troyer original paper.
#### Figures Scripts
1. First we have the LGN reponse. In order to obtain the results in figure 1a we have to run the file `troyer_plot_1a.py`. 'troyer_plot_1a.py'. We obtain something like the following.
![Toyer1a](http://www.opensourcebrain.org/attachments/download/207/troyer_plot1a.png)
2. Then we have the mechanism that samples connections from a Gabor function shown in figure 2. gabor function. In order to obtain the connectivity pattern and to see how the connectivity parameters affect affects the final outcome the script `troyer_plot2.py` can be used to explore. If run it run. It will produce a figure similar simular to the following one:
![Toyer2](http://www.opensourcebrain.org/attachments/download/212/troyer2.png)
3. We have also a script that plots the excitatory contribution from th LGN to the excitatory layer in figure 3a. In order to play with how the parameters change the profile of this contribution the script `troyer_plot3a.py` can be explored. If run with a particular simulator (run troyer_plot3a.py nest) it will produce an output like this:
![Toyer3a](http://www.opensourcebrain.org/attachments/download/216/troyer3a.png)
![Troyer7a](http://www.opensourcebrain.org/attachments/download/214/troyer7a.png)
Here bellow I describe in more detail all of the parts of the model
#### LGN - spikes
In brief, the Retina and the Thalamus part of the model can be represented by a spatio-temporal filter that, when convolved with the stimuli, will produce the firing rate of a given LGN cell. After that, we can use a non-homogeneous Poisson process to produce the corresponding spikes for each cell. We describe this in detail bellow.
###### Spatio-Temporal Receptive Field (STRF)
The file `kernel_functions.py` contains the code for creating the STRF. The spatial part of the kernel possess a **center-surround** architecture which is model as a different of Gaussians. The temporal part of the receptive field has a **biphasic** structure, we use the implementation describe in Cai et al (1998). The details of the implementation are described in detail in the companion blog of this project [(link)](http://neuralensemble.blogspot.fr/2014/06/gsoc-open-source-brain-retinal-filter-i.html). Down here we present a kernel produce with this classes. The time here runs from left to right and from up to down as usual text, so we can see how the spatial components of the filter change in time with this series of two dimensional maps.
![STRF](http://www.opensourcebrain.org/attachments/download/205/kernel.png)
We also include a small script `center_surround_plot.py` that can be used to visualize the spatial component of the STRF and received immediate feedback on how the overall pattern changes when the parameters and resolutions are changed.
###### Stimuli
The file `stimuli_functions.py` contains the code for creating the stimuli. In particular we used the implementation of a **full field sinusoidal grating** with the parameters described in the paper. Down here we show an example of the stimuli at a particular point in time for illustration purposes:
![stimuli](http://www.opensourcebrain.org/attachments/download/206/sinus_grating.png)
Here we also included a small script `sine_grating_plot.py` to visualize the sine grating at a particular point in time.
###### Convolution
After we have the stimuli and the STRF we can use the **convolution** function defined in the file `analysis_functions.py` to calculate the response of LGN' neurons. The details of how the the convolution is implemented is described in the detail in the following entry of the blog [(link)](http://neuralensemble.blogspot.fr/2014/06/gsoc-open-source-brain-retinal-filter-ii.html). With this in our hand and using the parameters described in the paper we can already reproduce the first plot in Troyer's paper. The file `lgn_firing_rate_troyer_plot1.py` in the repository does this automatically for us and give us the next plot:
![troyer_plot](http://www.opensourcebrain.org/attachments/download/207/troyer_plot1a.png)
Here we can see the firing rate for an on and for an off cell subjected to the same stimuli. Note that they are off-phase and also the contrast dependent response. The responses are rectified after back ground noise was added.
###### Producing Spikes
After we have the firing rate of a neuron we can use the produce_spikes functions in the file `analysis_functions.py`. This functions takes the firing rate and using non-homogeneous Poisson process outputs an array with the spikes times. We provide one file `produce_lgn_spikes_one.py` for testing variations of parameters and as an example showcase.
![example](http://www.opensourcebrain.org/attachments/download/208/spikes_example.png)
###### Storing Spikes
Now we have the complete mechanism of spike creation. In the file `produce_lgn_spikes.py`. This file creates a grid of positions (This should correspond to the grid of LGN cells that we are going to use in PyNN) and produces the list of spikes associated with them as well as the positions. The particular stoage format that we are using is `cPickled`.
#### LGN - Network