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GTN implementation

By Petr Hlubuček
GoodAI

This is a partial implementation of Generative Teaching Networks by Such et al. (Uber AI Labs, 2019)

An MNIST Teacher/Learner was implemented using PyTorch and higher with the aim to confirm and further investigate curriculum generation properties of GTN.

We were able to (approximately) reproduce the curriculum generation results; see below for more details. We did not attempt to reproduce the architecture search results, although given a working implementation of the base algorithm, this should now be a straightforward endeavour.

Motivation

At GoodAI, we’re interested in multi-agent architectures that can learn to rapidly adapt to new and unseen environments. In our proposed architecture (for more see Badger), we expect the behavior and adaptation to be learned through communication of homogeneous units inside a single agent, allowing for better generalization.

We believe that the right curriculum is key to the search of the effective learning policy inside the agent’s brain. For this reason, we were curious to experiment with the automated curricula that GTN can generate in a differentiable way.

We were motivated to:

  • create tasks and environments for our agent with gradually increasing difficulty,
  • analyze existing GTN tasks/environments for graduality properties - i.e. if learning of some task makes it easier to learn some other task.

I would like to thank my colleague Martin Poliak for helping me with this project. This is the first publicly available implementation for PyTorch and we are happy to contribute to the AI community efforts.

We’d love to hear your feedback. If you’re interested to discuss the curricula that facilitate gradual and continuous learning, or work with us on general AI, get in touch!

GTN overview

GTN is composed of two neural networks (both use CNN + linear layers):

  • teacher - takes random vectors as input and produces MNIST-like images
  • learner - learns to classify images produced by the teacher

A nice property of GTN is that a learner taught only on the teacher-generated images will perform well on real data and the architecture's performance on GTN-generated data should be indicative of its performance on real data (a much larger dataset).

GTN is learned through a meta-learning setup, using two loops:

  • inner-loop - "normal" learning - the learner learns to classify images produced by the teacher, the teacher is not updated
  • outter-loop - meta-learning - the learned learner is evaluated on real data (MNIST dataset in our case), final loss is computed and backpropagated through unrolled inner-loop steps back to the teacher, which is updated this time (by meta gradients)

An overview of the GTN setup as presented in the original paper - Figure 1(a):
image

Results

We setup the teacher and learner and set out to investigate (1) what type of artificial data the teacher will generate for the learner and (2) if we can replicate the emergence of a accuracy-increasing curriculum from the original paper.

Three experiment configuration were run:

  • Experiment A: batch_size: 32, inner_loop_steps: 20 (640 teacher-generated MNIST-images in total)
  • Experiment B: batch_size: 32, inner_loop_steps: 10 (320)
  • Experiment C: batch_size: 16, inner_loop_steps: 10 (160)

The input tensor of the teacher network (teacher_input) that defines the learned curriculum has the following dimensions: [inner_loop_steps, batch_size, 64].

For each experiment configuration three variants of GTN were tested, varying in input data of the teacher network (teacher_input):

  • "learned" - input tensor was initialized randomly and learned as a parameter of the teacher network
  • "random_fixed" - input tensor was initialized randomly and fixed during the whole experiment run
  • "random" - input tensor was re-initialized with random data for each inner-loop iteration

resulting in a total of 9 experiments.

Experiment A: batch_size: 32, inner_loop_steps: 20

chart

The figure above shows the testing accuracy for the three variants of GTN. Notice the practically identical performance of "learned" and "random_fixed" variants. Moreover, when the network was prevented from using a curriculum ("random"), the performance of the learned network suffered.

In order to confirm that the teacher indeed learned a beneficial curriculum in the "learned" and "random_fixed" variants, teacher input tensors were shuffled in the meta-testing phase (by the first dimension - order in which inputs were presented to learner during inner loop was randomized).

chart

The chart above shows that both “learned” and “random_fixed” variants suffered a big accuracy drop due to the shuffling, while “random” was not affected. An explanation for this behavior is that both “learned” and “random_fixed” variants developed a curriculum (ordering of data samples presented to learner) that improves the accuracy. “learned” was designed with this property in mind, but “random_fixed” was a surprise - a curriculum is encoded in teacher weights.

Generated dataset visualization

The pictures below visualize the dataset generated by the teacher. Each row represents a batch that the learner takes as input during inner_loop steps, starting from the top row. The number of rows is inner_loop_steps and number of columns is batch_size.

Images produced by teacher - variant "learned":
chart

Images produced by teacher - variant "random_fixed":
chart

Images produced by teacher - variant "random":
chart

Experiment B: batch_size: 32, inner_loop_steps: 10

The charts and illustrations below are analogous to those of experiment A. The inner loop training was reduced by 10 steps, which resulted in a 1% drop of testing accuracy.

chart

chart

Images produced by teacher - variant "learned":
chart

Images produced by teacher - variant "random_fixed":
chart

Images produced by teacher - variant "random":
chart

Experiment C: batch_size: 16, inner_loop_steps: 10

The charts and illustrations below are analogous to those of experiments A and B. Further drop in accuracy can be attributed to decreased batch size. Notice that the learner network was trained using only 1/4 of data from experiment A, yet still it suffers only a 2% drop in accuracy in the "learned" and "random_fixed" variants (compare to the 6% drop in the "random" variant).

chart

chart

Images produced by teacher - variant "learned":
chart

Images produced by teacher - variant "random_fixed":
chart

Images produced by teacher - variant "random":
chart

Discussion

  • We were able to almost match the GTN results on MNIST dataset from the original paper, compare:
GTN results paper - Figure 1(c) Experiment A results
image chart

We attribute the lower accuracy of our result to the smaller batch_size (32 in our experiment vs 128 in GTN paper) and possibly to a lack of some features and fine tuning - like weight normalization and gradient checkpointing.

  • It was shown that the teacher created a curriculum
  • Note the nice gradual images generated by the "learned" teacher in Experiment B

How to Install

Requires python version >= 3.7

  1. pip install -r requirements.txt
  2. Install higher library
  3. (Optional - results visualization) Run local sacred/omniboard by
    1. Install Docker and Docker Compose
    2. cd sacred
    3. docker-compose up -d
    4. Open localhost:9000 in browser (note port 9000 can be changed in sacred/docker-compose.yml)

How to Run

Run a single experiment using the experiments/mnist_experiment.py file.
Run multiple experiments using experiments/run_tasks.py - current setup will replicate the presented results.
View results using omniboard or experiments/ntb_result_analyzer.ipynb notebook - running all cells will generate images and charts presented in the results (sacred run ids have to be changed)

Notes:

  • Weight Normalization and gradient checkpointing were not implemented as not being necessary - learning showed almost no variance and model fit into 11GB of GPU memory
  • BatchNorm and Kaiming initialization were necessary for stable learning

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