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Disclaimer: This is not an official Google product.

Copyright 2017 Google Inc.

Licensed under the Apache License, Version 2.0 (the "License"); you may not use this file except in compliance with the License. You may obtain a copy of the License at

https://www.apache.org/licenses/LICENSE-2.0

Unless required by applicable law or agreed to in writing, software distributed under the License is distributed on an "AS IS" BASIS, WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied. See the License for the specific language governing permissions and limitations under the License.

SVCCA for Deep Learning Dynamics and Interpretability

This repository contains the core code for implementing Canonical Correlation Analysis on deep neural network representations, which was used for the results in the paper:

Maithra Raghu, Justin Gilmer, Jason Yosinski, Jascha Sohl-Dickstein (2017). "SVCCA: Singular Vector Canonical Correlation Analysis for Deep Learning Dynamics and Interpretability". Neural Information Processing Systems (NIPS) 2017.

Dependencies

This code was written in Python 2.7 and relies on the numpy and pandas modules

Usage

The main function to compute CCA similarities between two representations is the get_cca_similarity function in cca_core.py. This takes in two arrays of shape (num neurons1, num datapoints) , (num neurons2, num_datapoints), and outputs pairs of aligned directions, how well aligned they are, as well as coefficients to transform from the original neuron basis to the aligned directions.

The dft_ccas.py module builds on this functionality to work with convolutional networks. Convolutional layers have a more natural basis in terms of the number of channels, not raw neurons. Using some of the mathematical properties of the Discrete Fourier Transform, we have a computationally efficient method for comparing CCA similarity for convolutional layers. See Section 3 in the paper for more details. The fourier_ccas function in dft_ccas.py implements exactly this, taking the raw convolutional activations (num datapoints, height1, width1, num channels1), (num datapoints, height2, width2, num channels2)

Note that according to the theory, we get an exact result if the datapoints used to generate (not train) the activations are translation invariant (any 2d translation of a datapoint x is also in the set of datapoints). But even without this, we can get very good results (see Examples section).

Examples

In the paper, we apply this method to understand several aspects of neural network representations, and we give a couple of examples below.

  • Sensitivity to different classes: we compare the CCA similarity of an output neuron corresponding to a particular class with the representations learned in intermediate layers on the Imagenet Resnet. We find that CCA similarity can distinguish between visually different classes (firetruck and dog breeds in the image below) and also show similarities between visually similar classes (husky and eskimo dog, two types of terriers).

  • Learning Dynamics: we also compare all pairs of layers in a neural network across time, ending up with pane plots showing how the representational similarity of different layers evolves with time. We find evidence of a bottom up convergence pattern. Layers closer to the input solidify to their final representations first, before layers higher up in the network. This comparison method also highlights other structure properties of the architecture. We see (below top row) that 2x2 blocks are caused by batch norm layers, which are representationally identical to the previous layer. We also see that residual layers (bottom row) result in grid like patterns, having higher representational similarity with previous layers.

  • Model Interpretability across Training Runs: The code can also be used to interpret representations learned by networks over different training runs. We apply CCA to corresponding layers across different random initializations. Note that the raw neuron outputs over the sorted classes (left pane below) don't have any visible similarity, but the aligned representations with CCA show that both networks have learned similar latent representations (right pane below). Furthermore these directions are also somewhat naturally interpretable. The grey dotted lines represent different class boundaries, and we can see that the top CCA directions clearly turn on for certain classes and off for others.

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