Many-to-one attention mechanism for Keras.
pip install attention
import numpy as np
from tensorflow.keras import Input
from tensorflow.keras.layers import Dense, LSTM
from tensorflow.keras.models import load_model, Model
from attention import Attention
def main():
# Dummy data. There is nothing to learn in this example.
num_samples, time_steps, input_dim, output_dim = 100, 10, 1, 1
data_x = np.random.uniform(size=(num_samples, time_steps, input_dim))
data_y = np.random.uniform(size=(num_samples, output_dim))
# Define/compile the model.
model_input = Input(shape=(time_steps, input_dim))
x = LSTM(64, return_sequences=True)(model_input)
x = Attention(32)(x)
x = Dense(1)(x)
model = Model(model_input, x)
model.compile(loss='mae', optimizer='adam')
print(model.summary())
# train.
model.fit(data_x, data_y, epochs=10)
# test save/reload model.
pred1 = model.predict(data_x)
model.save('test_model.h5')
model_h5 = load_model('test_model.h5')
pred2 = model_h5.predict(data_x)
np.testing.assert_almost_equal(pred1, pred2)
print('Success.')
if __name__ == '__main__':
main()
Browse examples.
Install the requirements before running the examples: pip install -r examples/examples-requirements.txt
.
In this experiment, we demonstrate that using attention yields a higher accuracy on the IMDB dataset. We consider two LSTM networks: one with this attention layer and the other one with a fully connected layer. Both have the same number of parameters for a fair comparison (250K).
Here are the results on 10 runs. For every run, we record the max accuracy on the test set for 10 epochs.
Measure | No Attention (250K params) | Attention (250K params) |
---|---|---|
MAX Accuracy | 88.22 | 88.76 |
AVG Accuracy | 87.02 | 87.62 |
STDDEV Accuracy | 0.18 | 0.14 |
As expected, there is a boost in accuracy for the model with attention. It also reduces the variability between the runs, which is something nice to have.
Let's consider the task of adding two numbers that come right after some delimiters (0 in this case):
x = [1, 2, 3, 0, 4, 5, 6, 0, 7, 8]
. Result is y = 4 + 7 = 11
.
The attention is expected to be the highest after the delimiters. An overview of the training is shown below, where the top represents the attention map and the bottom the ground truth. As the training progresses, the model learns the task and the attention map converges to the ground truth.
We consider many 1D sequences of the same length. The task is to find the maximum of each sequence.
We give the full sequence processed by the RNN layer to the attention layer. We expect the attention layer to focus on the maximum of each sequence.
After a few epochs, the attention layer converges perfectly to what we expected.