Simple attention mechanism implemented in Keras for the following layers:
- Dense (attention 2D block)
- LSTM, GRU (attention 3D block)
inputs = Input(shape=(input_dims,))
attention_probs = Dense(input_dims, activation='softmax', name='attention_probs')(inputs)
attention_mul = merge([inputs, attention_probs], output_shape=input_dims, name='attention_mul', mode='mul')
Let's consider this Hello World example:
- A vector v of 32 values as input to the model (simple feedforward neural network).
- v[1] = target.
- Target is binary (either 0 or 1).
- All the other values of the vector v (v[0] and v[2:32]) are purely random and do not contribute to the target.
We expect the attention to be focused on v[1] only, or at least strongly. We recap the setup with this drawing:
The first two are samples taken randomly from the training set. The last plot is the attention vector that we expect. A high peak indexed by 1, and close to zero on the rest.
Let's train this model and visualize the attention vector applied to the inputs:
We can clearly see that the network figures this out for the inference.
The attention mechanism can be implemented in three lines with Keras:
inputs = Input(shape=(input_dims,))
attention_probs = Dense(input_dims, activation='softmax', name='attention_probs')(inputs)
attention_mul = merge([inputs, attention_probs], output_shape=32, name='attention_mul', mode='mul')
We apply a Dense - Softmax
layer with the same number of output parameters than the Input
layer. The attention matrix has a shape of input_dims x input_dims
here.
Then we merge the Inputs
layer with the attention layer by multiplying element-wise.
Finally, the activation vector (probability distribution) can be derived with:
attention_vector = get_activations(m, testing_inputs_1, print_shape_only=True)[1].flatten()
Where 1
is the index of definition of the attention layer in the model definition (Inputs
is indexed by 0
).
We consider the same example as the one used for the Dense layers. The attention index is now on the 10th value. We therefore expect an attention spike around this value. There are two main ways to apply attention to recurrent layers:
- Directly on the inputs (same as the Dense example above):
APPLY_ATTENTION_BEFORE_LSTM = True
Attention vector applied on the inputs (before)
- After the LSTM layer:
APPLY_ATTENTION_BEFORE_LSTM = False
Attention vector applied on the output of the LSTM layer (after)
Both have their own advantages and disadvantages. One obvious advantage of applying the attention directly at the inputs is that we clearly understand this space. The high dimensional space spanned by the LSTM might be a bit trickier to interpret, although they share the time steps in common with the inputs (return_sequences=True
is used here).
Also, sometimes, the time series can be N-dimensional. It could be interesting to have one attention vector per dimension. Let's say we have a 2-D time series on 20 steps. Setting SINGLE_ATTENTION_VECTOR = False
gives an attention vector of shape (20, 2)
. If SINGLE_ATTENTION_VECTOR
is set to True
, it means that the attention vector will be of shape (20,)
and shared across the input dimensions.
SINGLE_ATTENTION_VECTOR = False
Attention defined per time series (each TS has its own attention)
SINGLE_ATTENTION_VECTOR = True