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Tools for examining the causal structure of artificial neural networks built with PyTorch

Project description

deep-ei

PyPI version Documentation Status

This code accompanies the paper "Examining the Causal Structures of Artificial Neural Networks Using Information Theory" by Simon Mattsson, Eric J. Michaud, and Erik Hoel

What's here?

This repository contains all the code used in the paper (notebooks for creating figures, experiment scripts, etc) in the experiments directory, but most importantly holds the open-source deep-ei module. We encourage people to install deep-ei and perform their own experiments on new datasets, neural network architectures, etc. There are so many experiments we'd like to do, but haven't had time to yet! If you'd like to contribute to code, just submit a pull request! (note that all the code is currently structured as a single module, but may eventually be restructured as a package if that makes sense).

Installation:

The simplest way to install the deep_ei module is with:

pip install deep-ei

Becaues pytorch can be fragile, it is recommended that you install and test pytorch before installing deep-ei (such as with conda install pytorch -c pytorch). To install deep-ei directly from this repository:

git clone https://github.com/EI-research-group/deep-ei.git
cd deep-ei
pip install .

Basic tests can be executed with:

python setup.py test

Note that we have also provided an anaconda environment file. You can use it to create a new environment with deep-ei and all its dependencies:

conda env create --file environment.yml

Experiments

Experiments have been grouped into four directories:

experiments/
├── iris
├── mnist
├── other
└── simple

Where simple contains notebooks for generating the simple figures for A -> B and A, B -> C networks included in the paper. The iris and mnist folders contain the code and notebooks for running iris and mnist experiments and generating the corresponding figures, and other contains miscilaneous other experiments (like testing extrapolation, etc.).

Using deep-ei

Detailed documentation can be found at readthedocs.io, but here are some basic examples:

import torch
import torch.nn as nn

from deep_ei import topology_of, ei_of_layer

device = torch.device('cuda' if torch.cuda.is_available() else 'cpu')
dtype = torch.float32
torch.set_default_dtype(dtype)

network = nn.Linear(10, 10, bias=False).to(device)
top = topology_of(network, input=torch.zeros((1, 10)).to(device))

EI = ei_of_layer(network, top,
                    threshold=0.05,
                    batch_size=100, 
                    in_range=(0, 1),
                    in_bins=64,
                    out_range=(0, 1),
                    out_bins=64,
                    activation=nn.Sigmoid(), 
                    device=device)

This will compute the EI of a 10 -> 10 dense layer using a sigmoid activation. By default, this function will increase the number of samples it uses until the EI levels off (characterized by whether it will change by more than threshold of its current value even if we doubled the number of samples).

The function topology_of creates a networkx graph representing the connectivity of the network. ei_of_layer can infer argument values using this graph, such as the ranges of the inputs and outputs of the layer and its activation function:

network = nn.Sequential(
    nn.Linear(20, 10, bias=False),
    nn.Sigmoid(),
    nn.Linear(10, 5, bias=False),
    nn.Tanh()
)
top = topology_of(network, input=torch.zeros((1, 20)).to(device))

layer1, _, layer2, _ = network

EI_layer1 = ei_of_layer(layer1, top,
                    threshold=0.05,
                    batch_size=100, 
                    in_range=(0, 1),
                    in_bins=64,
                    out_bins=64, 
                    device=device)

EI_layer2 = ei_of_layer(layer2, top,
                    threshold=0.05,
                    batch_size=100, 
                    in_bins=64,
                    out_bins=64, 
                    device=device)

Which will use an activation of nn.Sigmoid and an out_range of (0, 1) for the first layer and an activation of nn.Tanh and an out_range of (-1, 1) for the second layer. Note that we have to specify an in_range for the first layer.

Instead of specifying a threshold, you can instead manually specify a number of samples to use when computing effective information:

network = nn.Linear(10, 10, bias=False).to(device)
top = topology_of(network, input=torch.zeros((1, 10)).to(device))

EI = ei_of_layer(network, top,
                    samles=50000,
                    batch_size=100, 
                    in_range=(0, 1),
                    in_bins=64,
                    out_range=(0, 1),
                    out_bins=64,
                    activation=nn.Sigmoid(), 
                    device=device)

Sometimes, EI takes millions of samples to converge, so be careful of specifying a value too low.

You can also measure the sensitivity of a layer like so:

network = nn.Linear(10, 10, bias=False).to(device)
top = topology_of(network, input=torch.zeros((1, 10)).to(device))

sensitivity = sensitivity_of_layer(network, top,
                            samples=1000,
                            batch_size=100, 
                            in_range=(0, 1),
                            in_bins=64,
                            out_range=(0, 1),
                            out_bins=64,
                            activation=nn.Sigmoid(), 
                            device=device)

If you want to compute the EI of each edge in a layer, use the ei_of_layer_matrix function:

network = nn.Linear(20, 10, bias=False).to(device)
top = topology_of(network, input=torch.zeros((1, 20)).to(device))

EI = ei_of_layer_matrix(network, top,
                    samles=50000,
                    batch_size=100, 
                    in_range=(0, 1),
                    in_bins=64,
                    out_range=(0, 1),
                    out_bins=64,
                    activation=nn.Sigmoid(), 
                    device=device)

Which will return a 20 x 10 matrix where the rows correspond with in-neurons and the columns correspond with out-neurons.

Ideas for future experiments

We'd love for people to use and expand on this code to make new discoveries. Here are some questions we haven't looked into yet:

  • How does dropout effect the EI of a layer? In otherwise identical networks, does dropout increase or decrease the EI of the network layers?
  • What can EI tell us about generalization? Does EI evolve in the causal plane in different ways when a network is memorizing a dataset vs generalizing? To test this, train networks on some dataset as you would normally, but then randomize the labels in the training dataset and train new networks. This label randomization will force the network to memorize the dataset.
  • On harder tasks, where deep networks are required (in MNIST and Iris, which we studied, it is unnecessary that networks be deep for them to achieve good acuracy), do the hidden layers differentiate in the causal plane?
  • Can EI be measured in recurrent networks? How would this work?

Contributing & Questions:

We'd welcome feedback and contributions! Feel free to email me at eric.michaud99@gmail.com if you have questions about the code.

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