# Copyright (c) 2020 PaddlePaddle Authors. All Rights Reserved. # # 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 # # http://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. import copy import collections import itertools import six import math import sys import warnings from functools import partial, reduce import numpy as np import paddle import paddle.fluid as fluid from paddle import framework from paddle.device import get_device, get_cudnn_version from paddle.nn import functional as F from paddle.nn import initializer as I from paddle.fluid.dygraph import Layer, LayerList from paddle.fluid.layers import utils from paddle.fluid.layers.utils import map_structure, flatten, pack_sequence_as from paddle.fluid.data_feeder import convert_dtype __all__ = [ 'RNNCellBase', 'SimpleRNNCell', 'LSTMCell', 'GRUCell', 'RNN', 'BiRNN', 'SimpleRNN', 'LSTM', 'GRU', ] def split_states(states, bidirectional=False, state_components=1): r""" Split states of RNN network into possibly nested list or tuple of states of each RNN cells of the RNN network. Parameters: states (Tensor|tuple|list): the concatenated states for RNN network. When `state_components` is 1, states in a Tensor with shape `(L*D, N, C)` where `L` is the number of layers of the RNN network, `D` is the number of directions of the RNN network(1 for unidirectional RNNs and 2 for bidirectional RNNs), `N` is the batch size of the input to the RNN network, `C` is the hidden size of the RNN network. When `state_components` is larger than 1, `states` is a tuple of `state_components` Tensors that meet the requirements described above. For SimpleRNNs and GRUs, `state_components` is 1, and for LSTMs, `state_components` is 2. bidirectional (bool): whether the state is of a bidirectional RNN network. Defaults to False. state_components (int): the number of the components of the states. see `states` above. Defaults to 1. Returns: A nested list or tuple of RNN cell states. If `bidirectional` is True, it can be indexed twice to get an RNN cell state. The first index indicates the layer, the second index indicates the direction. If `bidirectional` is False, it can be indexed once to get an RNN cell state. The index indicates the layer. Note that if `state_components` is larger than 1, an RNN cell state can be indexed one more time to get a tensor of shape(N, C), where `N` is the batch size of the input to the RNN cell, and `C` is the hidden size of the RNN cell. """ if state_components == 1: states = paddle.unstack(states) if not bidirectional: return states else: return list(zip(states[::2], states[1::2])) else: assert len(states) == state_components states = tuple([paddle.unstack(item) for item in states]) if not bidirectional: return list(zip(*states)) else: states = list(zip(*states)) return list(zip(states[::2], states[1::2])) def concat_states(states, bidirectional=False, state_components=1): r""" Concatenate a possibly nested list or tuple of RNN cell states into a compact form. Parameters: states (list|tuple): a possibly nested list or tuple of RNN cell states. If `bidirectional` is True, it can be indexed twice to get an RNN cell state. The first index indicates the layer, the second index indicates the direction. If `bidirectional` is False, it can be indexed once to get an RNN cell state. The index indicates the layer. Note that if `state_components` is larger than 1, an RNN cell state can be indexed one more time to get a tensor of shape(N, C), where `N` is the batch size of the input to the RNN cell, and `C` is the hidden size of the RNN cell. bidirectional (bool): whether the state is of a bidirectional RNN network. Defaults to False. state_components (int): the number of the components of the states. see `states` above. Defaults to 1. Returns: Concatenated states for RNN network. When `state_components` is 1, states in a Tensor with shape `(L\*D, N, C)` where `L` is the number of layers of the RNN network, `D` is the number of directions of the RNN network(1 for unidirectional RNNs and 2 for bidirectional RNNs), `N` is the batch size of the input to the RNN network, `C` is the hidden size of the RNN network. """ if state_components == 1: return paddle.stack(flatten(states)) else: states = flatten(states) componnets = [] for i in range(state_components): componnets.append(states[i::state_components]) return tuple([paddle.stack(item) for item in componnets]) class RNNCellBase(Layer): r""" RNNCellBase is the base class for abstraction representing the calculations mapping the input and state to the output and new state. It is suitable to and mostly used in RNN. """ def get_initial_states(self, batch_ref, shape=None, dtype=None, init_value=0., batch_dim_idx=0): r""" Generate initialized states according to provided shape, data type and value. Parameters: batch_ref (Tensor): A tensor, which shape would be used to determine the batch size, which is used to generate initial states. For `batch_ref`'s shape d, `d[batch_dim_idx]` is treated as batch size. shape (list|tuple, optional): A (possibly nested structure of) shape[s], where a shape is a list/tuple of integer. `-1` (for batch size) will be automatically prepended if a shape does not starts with it. If None, property `state_shape` will be used. Defaults to None. dtype (str|list|tuple, optional): A (possibly nested structure of) data type[s]. The structure must be same as that of `shape`, except when all tensors' in states has the same data type, a single data type can be used. If None and property `cell.state_shape` is not available, current default floating type of paddle is used. Defaults to None. init_value (float, optional): A float value used to initialize states. Defaults to 0. batch_dim_idx (int, optional): An integer indicating which dimension of the of `batch_ref` represents batch. Defaults to 0. Returns: init_states (Tensor|tuple|list): tensor of the provided shape and dtype, or list of tensors that each satisfies the requirements, packed in the same structure as `shape` and `type` does. """ # TODO: use inputs and batch_size batch_ref = flatten(batch_ref)[0] def _is_shape_sequence(seq): if sys.version_info < (3, ): integer_types = ( int, long, ) else: integer_types = (int, ) """For shape, list/tuple of integer is the finest-grained objection""" if (isinstance(seq, list) or isinstance(seq, tuple)): if reduce(lambda flag, x: isinstance(x, integer_types) and flag, seq, True): return False # TODO: Add check for the illegal if isinstance(seq, dict): return True return (isinstance(seq, collections.Sequence) and not isinstance(seq, six.string_types)) class Shape(object): def __init__(self, shape): self.shape = shape if shape[0] == -1 else ([-1] + list(shape)) # nested structure of shapes states_shapes = self.state_shape if shape is None else shape is_sequence_ori = utils.is_sequence utils.is_sequence = _is_shape_sequence states_shapes = map_structure(lambda shape: Shape(shape), states_shapes) utils.is_sequence = is_sequence_ori # nested structure of dtypes try: states_dtypes = self.state_dtype if dtype is None else dtype except NotImplementedError: states_dtypes = framework.get_default_dtype() if len(flatten(states_dtypes)) == 1: dtype = flatten(states_dtypes)[0] states_dtypes = map_structure(lambda shape: dtype, states_shapes) init_states = map_structure( lambda shape, dtype: paddle.fluid.layers.fill_constant_batch_size_like( input=batch_ref, shape=shape.shape, dtype=dtype, value=init_value, input_dim_idx=batch_dim_idx), states_shapes, states_dtypes) return init_states @property def state_shape(self): r""" Abstract method (property). Used to initialize states. A (possiblely nested structure of) shape[s], where a shape is a list/tuple of integers (-1 for batch size would be automatically inserted into a shape if shape is not started with it). Not necessary to be implemented if states are not initialized by `get_initial_states` or the `shape` argument is provided when using `get_initial_states`. """ raise NotImplementedError( "Please add implementaion for `state_shape` in the used cell.") @property def state_dtype(self): r""" Abstract method (property). Used to initialize states. A (possiblely nested structure of) data types[s]. The structure must be same as that of `shape`, except when all tensors' in states has the same data type, a signle data type can be used. Not necessary to be implemented if states are not initialized by `get_initial_states` or the `dtype` argument is provided when using `get_initial_states`. """ raise NotImplementedError( "Please add implementaion for `state_dtype` in the used cell.") class SimpleRNNCell(RNNCellBase): r""" Elman RNN (SimpleRNN) cell. Given the inputs and previous states, it computes the outputs and updates states. The formula used is as follows: .. math:: h_{t} & = act(W_{ih}x_{t} + b_{ih} + W_{hh}h{t-1} + b_{hh}) y_{t} & = h_{t} where :math:`act` is for :attr:`activation` , and * is the elemetwise multiplication operator. Please refer to `Finding Structure in Time `_ for more details. Parameters: input_size (int): The input size. hidden_size (int): The hidden size. activation (str, optional): The activation in the SimpleRNN cell. It can be `tanh` or `relu`. Defaults to `tanh`. weight_ih_attr (ParamAttr, optional): The parameter attribute for `weight_ih`. Default: None. weight_hh_attr(ParamAttr, optional): The parameter attribute for `weight_hh`. Default: None. bias_ih_attr (ParamAttr, optional): The parameter attribute for the `bias_ih`. Default: None. bias_hh_attr (ParamAttr, optional): The parameter attribute for the `bias_hh`. Default: None. name (str, optional): Name for the operation (optional, default is None). For more information, please refer to :ref:`api_guide_Name`. Attributes: weight_ih (Parameter): shape (hidden_size, input_size), input to hidden weight, corresponding to :math:`W_{ih}` in the formula. weight_hh (Parameter): shape (hidden_size, hidden_size), hidden to hidden weight, corresponding to :math:`W_{hh}` in the formula. bias_ih (Parameter): shape (hidden_size, ), input to hidden bias, corresponding to :math:`b_{ih}` in the formula. bias_hh (Parameter): shape (hidden_size, ), hidden to hidden bias, corresponding to :math:`b_{hh}` in the formula. Inputs: inputs (Tensor): shape `[batch_size, input_size]`, the input, corresponding to :math:`x_t` in the formula. states (Tensor, optional): shape `[batch_size, hidden_size]`, the previous hidden state, corresponding to :math:`h_{t-1}` in the formula. When states is None, zero state is used. Defaults to None. Returns: (outputs, new_states) outputs (Tensor): shape `[batch_size, hidden_size]`, the output, corresponding to :math:`h_{t}` in the formula. states (Tensor): shape `[batch_size, hidden_size]`, the new hidden state, corresponding to :math:`h_{t}` in the formula. Notes: All the weights and bias are initialized with `Uniform(-std, std)` by default. Where std = :math:`\frac{1}{\sqrt{hidden_size}}`. For more information about parameter initialization, please refer to :ref:`api_fluid_ParamAttr`. Examples: .. code-block:: python import paddle x = paddle.randn((4, 16)) prev_h = paddle.randn((4, 32)) cell = paddle.nn.SimpleRNNCell(16, 32) y, h = cell(x, prev_h) print(y.shape) #[4,32] """ def __init__(self, input_size, hidden_size, activation="tanh", weight_ih_attr=None, weight_hh_attr=None, bias_ih_attr=None, bias_hh_attr=None, name=None): super(SimpleRNNCell, self).__init__() std = 1.0 / math.sqrt(hidden_size) self.weight_ih = self.create_parameter( (hidden_size, input_size), weight_ih_attr, default_initializer=I.Uniform(-std, std)) self.weight_hh = self.create_parameter( (hidden_size, hidden_size), weight_hh_attr, default_initializer=I.Uniform(-std, std)) self.bias_ih = self.create_parameter( (hidden_size, ), bias_ih_attr, is_bias=True, default_initializer=I.Uniform(-std, std)) self.bias_hh = self.create_parameter( (hidden_size, ), bias_hh_attr, is_bias=True, default_initializer=I.Uniform(-std, std)) self.input_size = input_size self.hidden_size = hidden_size if activation not in ["tanh", "relu"]: raise ValueError( "activation for SimpleRNNCell should be tanh or relu, " "but get {}".format(activation)) self.activation = activation self._activation_fn = paddle.tanh \ if activation == "tanh" \ else F.relu def forward(self, inputs, states=None): if states is None: states = self.get_initial_states(inputs, self.state_shape) pre_h = states i2h = paddle.matmul(inputs, self.weight_ih, transpose_y=True) if self.bias_ih is not None: i2h += self.bias_ih h2h = paddle.matmul(pre_h, self.weight_hh, transpose_y=True) if self.bias_hh is not None: h2h += self.bias_hh h = self._activation_fn(i2h + h2h) return h, h @property def state_shape(self): return (self.hidden_size, ) class LSTMCell(RNNCellBase): r""" Long-Short Term Memory(LSTM) RNN cell. Given the inputs and previous states, it computes the outputs and updates states. The formula used is as follows: .. math:: i_{t} & = \sigma(W_{ii}x_{t} + b_{ii} + W_{hi}h_{t-1} + b_{hi}) f_{t} & = \sigma(W_{if}x_{t} + b_{if} + W_{hf}h_{t-1} + b_{hf}) o_{t} & = \sigma(W_{io}x_{t} + b_{io} + W_{ho}h_{t-1} + b_{ho}) \widetilde{c}_{t} & = \tanh (W_{ig}x_{t} + b_{ig} + W_{hg}h_{t-1} + b_{hg}) c_{t} & = f_{t} * c_{t-1} + i_{t} * \widetilde{c}_{t} h_{t} & = o_{t} * \tanh(c_{t}) y_{t} & = h_{t} where :math:`\sigma` is the sigmoid fucntion, and * is the elemetwise multiplication operator. Please refer to `An Empirical Exploration of Recurrent Network Architectures `_ for more details. Parameters: input_size (int): The input size. hidden_size (int): The hidden size. weight_ih_attr(ParamAttr, optional): The parameter attribute for `weight_ih`. Default: None. weight_hh_attr(ParamAttr, optional): The parameter attribute for `weight_hh`. Default: None. bias_ih_attr (ParamAttr, optional): The parameter attribute for the `bias_ih`. Default: None. bias_hh_attr (ParamAttr, optional): The parameter attribute for the `bias_hh`. Default: None. name (str, optional): Name for the operation (optional, default is None). For more information, please refer to :ref:`api_guide_Name`. Attributes: weight_ih (Parameter): shape (4 * hidden_size, input_size), input to hidden weight, which corresponds to the concatenation of :math:`W_{ii}, W_{if}, W_{ig}, W_{io}` in the formula. weight_hh (Parameter): shape (4 * hidden_size, hidden_size), hidden to hidden weight, which corresponds to the concatenation of :math:`W_{hi}, W_{hf}, W_{hg}, W_{ho}` in the formula. bias_ih (Parameter): shape (4 * hidden_size, ), input to hidden bias, which corresponds to the concatenation of :math:`b_{ii}, b_{if}, b_{ig}, b_{io}` in the formula. bias_hh (Parameter): shape (4 * hidden_size, ), hidden to hidden bias, which corresponds to the concatenation of :math:`b_{hi}, b_{hf}, b_{hg}, b_{ho}` in the formula. Inputs: inputs (Tensor): shape `[batch_size, input_size]`, the input, corresponding to :math:`x_t` in the formula. states (tuple, optional): a tuple of two tensors, each of shape `[batch_size, hidden_size]`, the previous hidden state, corresponding to :math:`h_{t-1}, c_{t-1}` in the formula. When states is None, zero state is used. Defaults to None. Returns: (outputs, new_states) outputs (Tensor): shape `[batch_size, hidden_size]`, the output, corresponding to :math:`h_{t}` in the formula. states (tuple): a tuple of two tensors, each of shape `[batch_size, hidden_size]`, the new hidden states, corresponding to :math:`h_{t}, c_{t}` in the formula. Notes: All the weights and bias are initialized with `Uniform(-std, std)` by default. Where std = :math:`\frac{1}{\sqrt{hidden_size}}`. For more information about parameter initialization, please refer to :ref:`api_fluid_ParamAttr`. Examples: .. code-block:: python import paddle x = paddle.randn((4, 16)) prev_h = paddle.randn((4, 32)) prev_c = paddle.randn((4, 32)) cell = paddle.nn.LSTMCell(16, 32) y, (h, c) = cell(x, (prev_h, prev_c)) print(y.shape) print(h.shape) print(c.shape) #[4,32] #[4,32] #[4,32] """ def __init__(self, input_size, hidden_size, weight_ih_attr=None, weight_hh_attr=None, bias_ih_attr=None, bias_hh_attr=None, name=None): super(LSTMCell, self).__init__() std = 1.0 / math.sqrt(hidden_size) self.weight_ih = self.create_parameter( (4 * hidden_size, input_size), weight_ih_attr, default_initializer=I.Uniform(-std, std)) self.weight_hh = self.create_parameter( (4 * hidden_size, hidden_size), weight_hh_attr, default_initializer=I.Uniform(-std, std)) self.bias_ih = self.create_parameter( (4 * hidden_size, ), bias_ih_attr, is_bias=True, default_initializer=I.Uniform(-std, std)) self.bias_hh = self.create_parameter( (4 * hidden_size, ), bias_hh_attr, is_bias=True, default_initializer=I.Uniform(-std, std)) self.hidden_size = hidden_size self.input_size = input_size self._gate_activation = F.sigmoid self._activation = paddle.tanh def forward(self, inputs, states=None): if states is None: states = self.get_initial_states(inputs, self.state_shape) pre_hidden, pre_cell = states gates = paddle.matmul(inputs, self.weight_ih, transpose_y=True) if self.bias_ih is not None: gates = gates + self.bias_ih gates += paddle.matmul(pre_hidden, self.weight_hh, transpose_y=True) if self.bias_hh is not None: gates = gates + self.bias_hh chunked_gates = paddle.split(gates, num_or_sections=4, axis=-1) i = self._gate_activation(chunked_gates[0]) f = self._gate_activation(chunked_gates[1]) o = self._gate_activation(chunked_gates[3]) c = f * pre_cell + i * self._activation(chunked_gates[2]) h = o * self._activation(c) return h, (h, c) @property def state_shape(self): r""" The `state_shape` of LSTMCell is a tuple with two shapes: `((hidden_size, ), (hidden_size,))`. (-1 for batch size would be automatically inserted into shape). These two shapes correspond to :math:`h_{t-1}` and :math:`c_{t-1}` separately. """ return ((self.hidden_size, ), (self.hidden_size, )) class GRUCell(RNNCellBase): r""" Gated Recurrent Unit (GRU) RNN cell. Given the inputs and previous states, it computes the outputs and updates states. The formula for GRU used is as follows: .. math:: r_{t} & = \sigma(W_{ir}x_{t} + b_{ir} + W_{hr}x_{t} + b_{hr}) z_{t} & = \sigma(W_{iz}x_{t} + b_{iz} + W_{hz}x_{t} + b_{hz}) \widetilde{h}_{t} & = \tanh(W_{ic}x_{t} + b_{ic} + r_{t} * (W_{hc}x_{t} + b_{hc})) h_{t} & = z_{t} * h_{t-1} + (1 - z_{t}) * \widetilde{h}_{t} y_{t} & = h_{t} where :math:`\sigma` is the sigmoid fucntion, and * is the elemetwise multiplication operator. Please refer to `An Empirical Exploration of Recurrent Network Architectures `_ for more details. Parameters: input_size (int): The input size.. hidden_size (int): The hidden size. weight_ih_attr(ParamAttr, optional): The parameter attribute for `weight_ih`. Default: None. weight_hh_attr(ParamAttr, optional): The parameter attribute for `weight_hh`. Default: None. bias_ih_attr (ParamAttr, optional): The parameter attribute for the `bias_ih`. Default: None. bias_hh_attr (ParamAttr, optional): The parameter attribute for the `bias_hh`. Default: None. name (str, optional): Name for the operation (optional, default is None). For more information, please refer to :ref:`api_guide_Name`. Attributes: weight_ih (Parameter): shape (3 * hidden_size, input_size), input to hidden weight, which corresponds to the concatenation of :math:`W_{ir}, W_{iz}, W_{ic}` in the formula. weight_hh (Parameter): shape (3 * hidden_size, hidden_size), hidden to hidden weight, which corresponds to the concatenation of :math:`W_{hr}, W_{hz}, W_{hc}` in the formula. bias_ih (Parameter): shape (3 * hidden_size, ), input to hidden bias, which corresponds to the concatenation of :math:`b_{ir}, b_{iz}, b_{ic}` in the formula. bias_hh (Parameter): shape (3 * hidden_size, ), hidden to hidden bias, which corresponds to the concatenation of :math:`b_{hr}, b_{hz}, b_{hc}` in the formula. Inputs: inputs (Tensor): A tensor with shape `[batch_size, input_size]`, corresponding to :math:`x_t` in the formula. states (Tensor): A tensor with shape `[batch_size, hidden_size]`. corresponding to :math:`h_{t-1}` in the formula. Returns: (outputs, new_states) outputs (Tensor): shape `[batch_size, hidden_size]`, the output, corresponding to :math:`h_{t}` in the formula. states (Tensor): shape `[batch_size, hidden_size]`, the new hidden state, corresponding to :math:`h_{t}` in the formula. Notes: All the weights and bias are initialized with `Uniform(-std, std)` by default. Where std = :math:`\frac{1}{\sqrt{hidden_size}}`. For more information about parameter initialization, please refer to :ref:`api_fluid_ParamAttr`. Examples: .. code-block:: python import paddle x = paddle.randn((4, 16)) prev_h = paddle.randn((4, 32)) cell = paddle.nn.GRUCell(16, 32) y, h = cell(x, prev_h) print(y.shape) print(h.shape) #[4,32] #[4,32] """ def __init__(self, input_size, hidden_size, weight_ih_attr=None, weight_hh_attr=None, bias_ih_attr=None, bias_hh_attr=None, name=None): super(GRUCell, self).__init__() std = 1.0 / math.sqrt(hidden_size) self.weight_ih = self.create_parameter( (3 * hidden_size, input_size), weight_ih_attr, default_initializer=I.Uniform(-std, std)) self.weight_hh = self.create_parameter( (3 * hidden_size, hidden_size), weight_hh_attr, default_initializer=I.Uniform(-std, std)) self.bias_ih = self.create_parameter( (3 * hidden_size, ), bias_ih_attr, is_bias=True, default_initializer=I.Uniform(-std, std)) self.bias_hh = self.create_parameter( (3 * hidden_size, ), bias_hh_attr, is_bias=True, default_initializer=I.Uniform(-std, std)) self.hidden_size = hidden_size self.input_size = input_size self._gate_activation = F.sigmoid self._activation = paddle.tanh def forward(self, inputs, states=None): if states is None: states = self.get_initial_states(inputs, self.state_shape) pre_hidden = states x_gates = paddle.matmul(inputs, self.weight_ih, transpose_y=True) if self.bias_ih is not None: x_gates = x_gates + self.bias_ih h_gates = paddle.matmul(pre_hidden, self.weight_hh, transpose_y=True) if self.bias_hh is not None: h_gates = h_gates + self.bias_hh x_r, x_z, x_c = paddle.split(x_gates, num_or_sections=3, axis=1) h_r, h_z, h_c = paddle.split(h_gates, num_or_sections=3, axis=1) r = self._gate_activation(x_r + h_r) z = self._gate_activation(x_z + h_z) c = self._activation(x_c + r * h_c) # apply reset gate after mm h = (pre_hidden - c) * z + c return h, h @property def state_shape(self): r""" The `state_shape` of GRUCell is a shape `[hidden_size]` (-1 for batch size would be automatically inserted into shape). The shape corresponds to the shape of :math:`h_{t-1}`. """ return (self.hidden_size, ) class RNN(Layer): r""" Wrapper for RNN, which creates a recurrent neural network with an RNN cell. It performs :code:`cell.forward()` repeatedly until reaches to the maximum length of `inputs`. Parameters: cell(RNNCellBase): An instance of `RNNCellBase`. is_reverse (bool, optional): Indicate whether to calculate in the reverse order of input sequences. Defaults to False. time_major (bool): Whether the first dimension of the input means the time steps. Defaults to False. Inputs: inputs (Tensor): A (possibly nested structure of) tensor[s]. The input sequences. If time major is False, the shape is `[batch_size, time_steps, input_size]` If time major is True, the shape is `[time_steps, batch_size, input_size]` where `input_size` is the input size of the cell. initial_states (Tensor|list|tuple, optional): Tensor of a possibly nested structure of tensors, representing the initial state for the rnn cell. If not provided, `cell.get_initial_states` would be called to produce the initial states. Defaults to None. sequence_length (Tensor, optional): shape `[batch_size]`, dtype: int64 or int32. The valid lengths of input sequences. Defaults to None. If `sequence_length` is not None, the inputs are treated as padded sequences. In each input sequence, elements whose time step index are not less than the valid length are treated as paddings. **kwargs: Additional keyword arguments to pass to `forward` of the cell. Returns: (outputs, final_states) outputs (Tensor|list|tuple): the output sequences. If `time_major` is True, the shape is `[time_steps, batch_size, hidden_size]`, else `[batch_size, time_steps, hidden_size]`. final_states (Tensor|list|tuple): final states of the cell. Tensor or a possibly nested structure of tensors which has the same structure with intial state. Each tensor in final states has the same shape and dtype as the corresponding tensor in initial states. Notes: This class is a low level API for wrapping rnn cell into a RNN network. Users should take care of the state of the cell. If `initial_states` is passed to the `forward` method, make sure that it satisfies the requirements of the cell. Examples: .. code-block:: python import paddle inputs = paddle.rand((4, 23, 16)) prev_h = paddle.randn((4, 32)) cell = paddle.nn.SimpleRNNCell(16, 32) rnn = paddle.nn.RNN(cell) outputs, final_states = rnn(inputs, prev_h) print(outputs.shape) print(final_states.shape) #[4,23,32] #[4,32] """ def __init__(self, cell, is_reverse=False, time_major=False): super(RNN, self).__init__() self.cell = cell if not hasattr(self.cell, "call"): # for non-dygraph mode, `rnn` api uses cell.call self.cell.call = self.cell.forward self.is_reverse = is_reverse self.time_major = time_major def forward(self, inputs, initial_states=None, sequence_length=None, **kwargs): final_outputs, final_states = paddle.fluid.layers.rnn( self.cell, inputs, initial_states=initial_states, sequence_length=sequence_length, time_major=self.time_major, is_reverse=self.is_reverse, **kwargs) return final_outputs, final_states class BiRNN(Layer): r""" Wrapper for bidirectional RNN, which builds a bidiretional RNN given the forward rnn cell and backward rnn cell. A BiRNN applies forward RNN and backward RNN with coresponding cells separately and concats the outputs along the last axis. Parameters: cell_fw (RNNCellBase): A RNNCellBase instance used for forward RNN. cell_bw (RNNCellBase): A RNNCellBase instance used for backward RNN. time_major (bool): Whether the first dimension of the input means the time steps. Defaults to False. Inputs: inputs (Tensor): the input sequences of both RNN. If time_major is True, the shape of is `[time_steps, batch_size, input_size]`, else the shape is `[batch_size, time_steps, input_size]`, where input_size is the input size of both cells. initial_states (list|tuple, optional): A tuple/list of the initial states of the forward cell and backward cell. Defaults to None. If not provided, `cell.get_initial_states` would be called to produce the initial states for each cell. Defaults to None. sequence_length (Tensor, optional): shape `[batch_size]`, dtype: int64 or int32. The valid lengths of input sequences. Defaults to None. If `sequence_length` is not None, the inputs are treated as padded sequences. In each input sequence, elements whose time step index are not less than the valid length are treated as paddings. **kwargs: Additional keyword arguments. Arguments passed to `forward` for each cell. Outputs: (outputs, final_states) outputs (Tensor): the outputs of the bidirectional RNN. It is the concatenation of the outputs from the forward RNN and backward RNN along the last axis. If time major is True, the shape is `[time_steps, batch_size, size]`, else the shape is `[batch_size, time_steps, size]`, where size is `cell_fw.hidden_size + cell_bw.hidden_size`. final_states (tuple): A tuple of the final states of the forward cell and backward cell. Notes: This class is a low level API for wrapping rnn cells into a BiRNN network. Users should take care of the states of the cells. If `initial_states` is passed to the `forward` method, make sure that it satisfies the requirements of the cells. Examples: .. code-block:: python import paddle cell_fw = paddle.nn.LSTMCell(16, 32) cell_bw = paddle.nn.LSTMCell(16, 32) rnn = paddle.nn.BiRNN(cell_fw, cell_bw) inputs = paddle.rand((2, 23, 16)) outputs, final_states = rnn(inputs) print(outputs.shape) print(final_states[0][0].shape,len(final_states),len(final_states[0])) #[4,23,64] #[2,32] 2 2 """ def __init__(self, cell_fw, cell_bw, time_major=False): super(BiRNN, self).__init__() self.cell_fw = cell_fw self.cell_bw = cell_bw if cell_fw.input_size != cell_bw.input_size: raise ValueError("input size of forward cell({}) does not equals" "that of backward cell({})".format( cell_fw.input_size, cell_bw.input_size)) for cell in [self.cell_fw, self.cell_bw]: if not hasattr(cell, "call"): # for non-dygraph mode, `rnn` api uses cell.call cell.call = cell.forward self.time_major = time_major def forward(self, inputs, initial_states=None, sequence_length=None, **kwargs): if isinstance(initial_states, (list, tuple)): assert len(initial_states) == 2, \ "length of initial_states should be 2 when it is a list/tuple" outputs, final_states = paddle.fluid.layers.birnn( self.cell_fw, self.cell_bw, inputs, initial_states, sequence_length, self.time_major, **kwargs) return outputs, final_states class RNNBase(LayerList): r""" RNNBase class for RNN networks. It provides `forward`, `flatten_parameters` and other common methods for SimpleRNN, LSTM and GRU. """ def __init__(self, mode, input_size, hidden_size, num_layers=1, direction="forward", time_major=False, dropout=0., weight_ih_attr=None, weight_hh_attr=None, bias_ih_attr=None, bias_hh_attr=None): super(RNNBase, self).__init__() self.mode = mode self.input_size = input_size self.hidden_size = hidden_size self.dropout = dropout self.num_directions = 2 if direction == "bidirectional" else 1 self.time_major = time_major self.num_layers = num_layers self.state_components = 2 if mode == "LSTM" else 1 kwargs = { "weight_ih_attr": weight_ih_attr, "weight_hh_attr": weight_hh_attr, "bias_ih_attr": bias_ih_attr, "bias_hh_attr": bias_hh_attr } if mode == "LSTM": rnn_cls = LSTMCell elif mode == "GRU": rnn_cls = GRUCell else: rnn_cls = SimpleRNNCell kwargs["activation"] = self.activation if direction in ["forward", "backward"]: is_reverse = direction == "backward" cell = rnn_cls(input_size, hidden_size, **kwargs) self.append(RNN(cell, is_reverse, time_major)) for i in range(1, num_layers): cell = rnn_cls(hidden_size, hidden_size, **kwargs) self.append(RNN(cell, is_reverse, time_major)) elif direction == "bidirectional": cell_fw = rnn_cls(input_size, hidden_size, **kwargs) cell_bw = rnn_cls(input_size, hidden_size, **kwargs) self.append(BiRNN(cell_fw, cell_bw, time_major)) for i in range(1, num_layers): cell_fw = rnn_cls(2 * hidden_size, hidden_size, **kwargs) cell_bw = rnn_cls(2 * hidden_size, hidden_size, **kwargs) self.append(BiRNN(cell_fw, cell_bw, time_major)) else: raise ValueError( "direction should be forward, backward or bidirectional, " "received direction = {}".format(direction)) self.could_use_cudnn = get_device().startswith( "gpu:") and get_cudnn_version() self.could_use_cudnn &= direction != "backward" self.could_use_cudnn &= len(self.parameters()) == num_layers * 4 * ( 2 if direction == "bidirectional" else 1) self.could_use_cudnn &= mode == "LSTM" # currently only support LSTM # Expose params as RNN's attribute, which can make it compatible when # replacing small ops composed rnn with cpp rnn kernel. # Moreover, `jit.to_static` assumes params are added by current layer # and wouldn't include sublayer's params in current layer, which also # requires these params are added to current layer for `jit.save`. param_names = [] for layer in range(self.num_layers): for direction in range(self.num_directions): suffix = '_reverse' if direction == 1 else '' param_names.extend(['weight_ih_l{}{}', 'weight_hh_l{}{}']) if bias_ih_attr != False: param_names.append('bias_ih_l{}{}') if bias_hh_attr != False: param_names.append('bias_hh_l{}{}') param_names = [x.format(layer, suffix) for x in param_names] for name, param in zip(param_names, self.parameters()): setattr(self, name, param) self.flatten_parameters() def flatten_parameters(self): """ Resets parameter data pointer to address in continuous memory block for cudnn usage. """ if self.could_use_cudnn: # layer.parameters() is depth first and ordered # for i in layer: for j in direct: w_ih, w_hh, b_ih, b_hh # need to reorganize to cudnn param layout: # all bias following all weights params = self.parameters(include_sublayers=False) shape = [np.prod(param.shape) for param in params] self._all_weights = [None] * len(params) for i, param in enumerate(params): offset = 0 if i % 4 < 2 else (2 * self.num_layers * self.num_directions) layer_idx = i // 4 self._all_weights[offset + layer_idx * 2 + i % 2] = param # Wrap using a list to avoid registed into params and saving, maybe # need a better way to handle this later. Use `create_parameter` to # add both to main_program and startup_program for static-graph. # Use Constant initializer to avoid make effect on random generator. self._flat_weight = [ self.create_parameter( shape=[np.sum(shape)], dtype=params[0].dtype, default_initializer=I.Constant(0.0)) ] # dropout state may also can be hided and avoid saving # should dropout state be persistable for static-graph self._dropout_state = self.create_variable( dtype=fluid.core.VarDesc.VarType.UINT8) # for static-graph, append coalesce_tensor into startup program with fluid.program_guard(fluid.default_startup_program(), fluid.default_startup_program()): with framework.no_grad(): self._helper.append_op( type="coalesce_tensor", inputs={"Input": self._all_weights}, outputs={ "Output": self._all_weights, "FusedOutput": self._flat_weight }, attrs={ "copy_data": True, "use_align": False, "dtype": params[0].dtype }) def _cudnn_impl(self, inputs, initial_states, sequence_length): if not self.time_major: inputs = paddle.tensor.transpose(inputs, [1, 0, 2]) # unify LSTM/GRU/SimpleRNN later, currently only support LSTM # TODO(guosheng): use `core.ops.cudnn_lstm` in dygraph mode if support # specify output, since `dropout_state` should be a persistable tensor # rather than a temporary on. out = self._helper.create_variable_for_type_inference(inputs.dtype) last_h = self._helper.create_variable_for_type_inference(inputs.dtype) last_c = self._helper.create_variable_for_type_inference(inputs.dtype) reserve = self._helper.create_variable_for_type_inference( dtype=fluid.core.VarDesc.VarType.UINT8, stop_gradient=True) inputs = { 'Input': inputs, # 'W': self._flat_weight, # would be unused_var 'WeightList': self._all_weights, 'InitH': initial_states[0], 'InitC': initial_states[1], 'SequenceLength': sequence_length } attrs = { 'dropout_prob': self.dropout, 'is_bidirec': self.num_directions == 2, 'input_size': self.input_size, 'hidden_size': self.hidden_size, 'num_layers': self.num_layers, 'is_test': not self.training } outputs = { 'Out': out, 'LastH': last_h, 'LastC': last_c, 'Reserve': reserve, 'StateOut': self._dropout_state, } self._helper.append_op( type="cudnn_lstm", inputs=inputs, outputs=outputs, attrs=attrs) out = paddle.tensor.transpose(out, [1, 0, 2]) if not self.time_major else out states = (last_h, last_c) return out, states def forward(self, inputs, initial_states=None, sequence_length=None): batch_index = 1 if self.time_major else 0 dtype = inputs.dtype if initial_states is None: state_shape = (self.num_layers * self.num_directions, -1, self.hidden_size) if self.state_components == 1: initial_states = paddle.fluid.layers.fill_constant_batch_size_like( inputs, state_shape, dtype, 0, batch_index, 1) else: initial_states = tuple([ paddle.fluid.layers.fill_constant_batch_size_like( inputs, state_shape, dtype, 0, batch_index, 1) for _ in range(self.state_components) ]) if self.could_use_cudnn: # Add CPU kernel and dispatch in backend later return self._cudnn_impl(inputs, initial_states, sequence_length) states = split_states(initial_states, self.num_directions == 2, self.state_components) final_states = [] for i, rnn_layer in enumerate(self): if i > 0: inputs = F.dropout( inputs, self.dropout, training=self.training, mode="upscale_in_train") outputs, final_state = rnn_layer(inputs, states[i], sequence_length) final_states.append(final_state) inputs = outputs final_states = concat_states(final_states, self.num_directions == 2, self.state_components) return outputs, final_states class SimpleRNN(RNNBase): r""" Multilayer Elman network(SimpleRNN). It takes input sequences and initial states as inputs, and returns the output sequences and the final states. Each layer inside the SimpleRNN maps the input sequences and initial states to the output sequences and final states in the following manner: at each step, it takes step inputs(:math:`x_{t}`) and previous states(:math:`h_{t-1}`) as inputs, and returns step outputs(:math:`y_{t}`) and new states(:math:`h_{t}`). .. math:: h_{t} & = act(W_{ih}x_{t} + b_{ih} + W_{hh}h{t-1} + b_{hh}) y_{t} & = h_{t} where :math:`act` is for :attr:`activation` , and * is the elemetwise multiplication operator. Using key word arguments to construct is recommended. Parameters: input_size (int): The input size for the first layer's cell. hidden_size (int): The hidden size for each layer's cell. num_layers (int, optional): Number of layers. Defaults to 1. direction (str, optional): The direction of the network. It can be "forward", "backward" and "bidirectional". When "bidirectional", the way to merge outputs of forward and backward is concatenating. Defaults to "forward". time_major (bool, optional): Whether the first dimension of the input means the time steps. Defaults to False. dropout (float, optional): The droput probability. Dropout is applied to the input of each layer except for the first layer. Defaults to 0. activation (str, optional): The activation in each SimpleRNN cell. It can be `tanh` or `relu`. Defaults to `tanh`. weight_ih_attr (ParamAttr, optional): The parameter attribute for `weight_ih` of each cell. Defaults to None. weight_hh_attr (ParamAttr, optional): The parameter attribute for `weight_hh` of each cell. Defaults to None. bias_ih_attr (ParamAttr, optional): The parameter attribute for the `bias_ih` of each cells. Defaults to None. bias_hh_attr (ParamAttr, optional): The parameter attribute for the `bias_hh` of each cells. Defaults to None. name (str, optional): Name for the operation (optional, default is None). For more information, please refer to :ref:`api_guide_Name`. Inputs: inputs (Tensor): the input sequence. If `time_major` is True, the shape is `[time_steps, batch_size, input_size]`, else, the shape is `[batch_size, time_steps, hidden_size]`. initial_states (Tensor, optional): the initial state. The shape is `[num_layers * num_directions, batch_size, hidden_size]`. If initial_state is not given, zero initial states are used. sequence_length (Tensor, optional): shape `[batch_size]`, dtype: int64 or int32. The valid lengths of input sequences. Defaults to None. If `sequence_length` is not None, the inputs are treated as padded sequences. In each input sequence, elements whose time step index are not less than the valid length are treated as paddings. Returns: (outputs, final_states) outputs (Tensor): the output sequence. If `time_major` is True, the shape is `[time_steps, batch_size, num_directions * hidden_size]`, else, the shape is `[batch_size, time_steps, num_directions * hidden_size]`. Note that `num_directions` is 2 if direction is "bidirectional" else 1. final_states (Tensor): final states. The shape is `[num_layers * num_directions, batch_size, hidden_size]`. Note that `num_directions` is 2 if direction is "bidirectional" else 1. Attributes: weight_ih_l[k]: the learnable input-hidden weights of the k-th layer, If `k = 0`, the shape is `[hidden_size, input_size]`. Otherwise, the shape is `[hidden_size, num_directions * hidden_size]`. weight_hh_l[k]: the learnable hidden-hidden weights of the k-th layer, with shape `[hidden_size, hidden_size]`. bias_ih_l[k]: the learnable input-hidden bias of the k-th layer, with shape `[hidden_size]`. bias_hh_l[k]: the learnable hidden-hidden bias of the k-th layer, with shape `[hidden_size]`. Examples: .. code-block:: python import paddle rnn = paddle.nn.SimpleRNN(16, 32, 2) x = paddle.randn((4, 23, 16)) prev_h = paddle.randn((2, 4, 32)) y, h = rnn(x, prev_h) print(y.shape) print(h.shape) #[4,23,32] #[2,4,32] """ def __init__(self, input_size, hidden_size, num_layers=1, direction="forward", time_major=False, dropout=0., activation="tanh", weight_ih_attr=None, weight_hh_attr=None, bias_ih_attr=None, bias_hh_attr=None, name=None): if activation == "tanh": mode = "RNN_TANH" elif activation == "relu": mode = "RNN_RELU" else: raise ValueError("Unknown activation '{}'".format(activation)) self.activation = activation super(SimpleRNN, self).__init__( mode, input_size, hidden_size, num_layers, direction, time_major, dropout, weight_ih_attr, weight_hh_attr, bias_ih_attr, bias_hh_attr) class LSTM(RNNBase): r""" Multilayer LSTM. It takes a sequence and an initial state as inputs, and returns the output sequences and the final states. Each layer inside the LSTM maps the input sequences and initial states to the output sequences and final states in the following manner: at each step, it takes step inputs(:math:`x_{t}`) and previous states(:math:`h_{t-1}, c_{t-1}`) as inputs, and returns step outputs(:math:`y_{t}`) and new states(:math:`h_{t}, c_{t}`). .. math:: i_{t} & = \sigma(W_{ii}x_{t} + b_{ii} + W_{hi}h_{t-1} + b_{hi}) f_{t} & = \sigma(W_{if}x_{t} + b_{if} + W_{hf}h_{t-1} + b_{hf}) o_{t} & = \sigma(W_{io}x_{t} + b_{io} + W_{ho}h_{t-1} + b_{ho}) \widetilde{c}_{t} & = \tanh (W_{ig}x_{t} + b_{ig} + W_{hg}h_{t-1} + b_{hg}) c_{t} & = f_{t} * c_{t-1} + i_{t} * \widetilde{c}_{t} h_{t} & = o_{t} * \tanh(c_{t}) y_{t} & = h_{t} where :math:`\sigma` is the sigmoid fucntion, and * is the elemetwise multiplication operator. Using key word arguments to construct is recommended. Parameters: input_size (int): The input size for the first layer's cell. hidden_size (int): The hidden size for each layer's cell. num_layers (int, optional): Number of layers. Defaults to 1. direction (str, optional): The direction of the network. It can be "forward", "backward" and "bidirectional". When "bidirectional", the way to merge outputs of forward and backward is concatenating. Defaults to "forward". time_major (bool, optional): Whether the first dimension of the input means the time steps. Defaults to False. dropout (float, optional): The droput probability. Dropout is applied to the input of each layer except for the first layer. Defaults to 0. weight_ih_attr (ParamAttr, optional): The parameter attribute for `weight_ih` of each cell. Default: None. weight_hh_attr (ParamAttr, optional): The parameter attribute for `weight_hh` of each cell. Default: None. bias_ih_attr (ParamAttr, optional): The parameter attribute for the `bias_ih` of each cells. Default: None. bias_hh_attr (ParamAttr, optional): The parameter attribute for the `bias_hh` of each cells. Default: None. name (str, optional): Name for the operation (optional, default is None). For more information, please refer to :ref:`api_guide_Name`. Inputs: inputs (Tensor): the input sequence. If `time_major` is True, the shape is `[time_steps, batch_size, input_size]`, else, the shape is `[batch_size, time_steps, hidden_size]`. initial_states (tuple, optional): the initial state, a tuple of (h, c), the shape of each is `[num_layers * num_directions, batch_size, hidden_size]`. If initial_state is not given, zero initial states are used. sequence_length (Tensor, optional): shape `[batch_size]`, dtype: int64 or int32. The valid lengths of input sequences. Defaults to None. If `sequence_length` is not None, the inputs are treated as padded sequences. In each input sequence, elements whos time step index are not less than the valid length are treated as paddings. Returns: (outputs, final_states) outputs (Tensor): the output sequence. If `time_major` is True, the shape is `[time_steps, batch_size, num_directions * hidden_size]`, If `time_major` is False, the shape is `[batch_size, time_steps, num_directions * hidden_size]`. Note that `num_directions` is 2 if direction is "bidirectional" else 1. final_states (tuple): the final state, a tuple of two tensors, h and c. The shape of each is `[num_layers * num_directions, batch_size, hidden_size]`. Note that `num_directions` is 2 if direction is "bidirectional" else 1. Attributes: weight_ih_l[k]: the learnable input-hidden weights of the k-th layer, If `k = 0`, the shape is `[hidden_size, input_size]`. Otherwise, the shape is `[hidden_size, num_directions * hidden_size]`. weight_hh_l[k]: the learnable hidden-hidden weights of the k-th layer, with shape `[hidden_size, hidden_size]`. bias_ih_l[k]: the learnable input-hidden bias of the k-th layer, with shape `[hidden_size]`. bias_hh_l[k]: the learnable hidden-hidden bias of the k-th layer, with shape `[hidden_size]`. Examples: .. code-block:: python import paddle rnn = paddle.nn.LSTM(16, 32, 2) x = paddle.randn((4, 23, 16)) prev_h = paddle.randn((2, 4, 32)) prev_c = paddle.randn((2, 4, 32)) y, (h, c) = rnn(x, (prev_h, prev_c)) print(y.shape) print(h.shape) print(c.shape) #[4,23,32] #[2,4,32] #[2,4,32] """ def __init__(self, input_size, hidden_size, num_layers=1, direction="forward", time_major=False, dropout=0., weight_ih_attr=None, weight_hh_attr=None, bias_ih_attr=None, bias_hh_attr=None, name=None): super(LSTM, self).__init__( "LSTM", input_size, hidden_size, num_layers, direction, time_major, dropout, weight_ih_attr, weight_hh_attr, bias_ih_attr, bias_hh_attr) class GRU(RNNBase): r""" Multilayer GRU. It takes input sequencse and initial states as inputs, and returns the output sequences and the final states. Each layer inside the GRU maps the input sequences and initial states to the output sequences and final states in the following manner: at each step, it takes step inputs(:math:`x_{t}`) and previous states(:math:`h_{t-1}`) as inputs, and returns step outputs(:math:`y_{t}`) and new states(:math:`h_{t}`). .. math:: r_{t} & = \sigma(W_{ir}x_{t} + b_{ir} + W_{hr}x_{t} + b_{hr}) z_{t} & = \sigma(W_{iz}x_{t} + b_{iz} + W_{hz}x_{t} + b_{hz}) \widetilde{h}_{t} & = \tanh(W_{ic}x_{t} + b_{ic} + r_{t} * (W_{hc}x_{t} + b_{hc})) h_{t} & = z_{t} * h_{t-1} + (1 - z_{t}) * \widetilde{h}_{t} y_{t} & = h_{t} where :math:`\sigma` is the sigmoid fucntion, and * is the elemetwise multiplication operator. Using key word arguments to construct is recommended. Parameters: input_size (int): The input size for the first layer's cell. hidden_size (int): The hidden size for each layer's cell. num_layers (int, optional): Number of layers. Defaults to 1. direction (str, optional): The direction of the network. It can be "forward", "backward" and "bidirectional". When "bidirectional", the way to merge outputs of forward and backward is concatenating. Defaults to "forward". time_major (bool, optional): Whether the first dimension of the input means the time steps. Defaults to False. dropout (float, optional): The droput probability. Dropout is applied to the input of each layer except for the first layer. Defaults to 0. weight_ih_attr (ParamAttr, optional): The parameter attribute for `weight_ih` of each cell. Default: None. weight_hh_attr (ParamAttr, optional): The parameter attribute for `weight_hh` of each cell. Default: None. bias_ih_attr (ParamAttr, optional): The parameter attribute for the `bias_ih` of each cells. Default: None. bias_hh_attr (ParamAttr, optional): The parameter attribute for the `bias_hh` of each cells. Default: None. name (str, optional): Name for the operation (optional, default is None). For more information, please refer to :ref:`api_guide_Name`. Inputs: inputs (Tensor): the input sequence. If `time_major` is True, the shape is `[time_steps, batch_size, input_size]`, else, the shape is `[batch_size, time_steps, hidden_size]`. initial_states (Tensor, optional): the initial state. The shape is `[num_layers * num_directions, batch_size, hidden_size]`. If initial_state is not given, zero initial states are used. Defaults to None. sequence_length (Tensor, optional): shape `[batch_size]`, dtype: int64 or int32. The valid lengths of input sequences. Defaults to None. If `sequence_length` is not None, the inputs are treated as padded sequences. In each input sequence, elements whos time step index are not less than the valid length are treated as paddings. Returns: (outputs, final_states) outputs (Tensor): the output sequence. If `time_major` is True, the shape is `[time_steps, batch_size, num_directions * hidden_size]`, else, the shape is `[batch_size, time_steps, num_directions * hidden_size]`. Note that `num_directions` is 2 if direction is "bidirectional" else 1. final_states (Tensor): final states. The shape is `[num_layers * num_directions, batch_size, hidden_size]`. Note that `num_directions` is 2 if direction is "bidirectional" else 1. Attributes: weight_ih_l[k]: the learnable input-hidden weights of the k-th layer, If `k = 0`, the shape is `[hidden_size, input_size]`. Otherwise, the shape is `[hidden_size, num_directions * hidden_size]`. weight_hh_l[k]: the learnable hidden-hidden weights of the k-th layer, with shape `[hidden_size, hidden_size]`. bias_ih_l[k]: the learnable input-hidden bias of the k-th layer, with shape `[hidden_size]`. bias_hh_l[k]: the learnable hidden-hidden bias of the k-th layer, with shape `[hidden_size]`. Examples: .. code-block:: python import paddle rnn = paddle.nn.GRU(16, 32, 2) x = paddle.randn((4, 23, 16)) prev_h = paddle.randn((2, 4, 32)) y, h = rnn(x, prev_h) print(y.shape) print(h.shape) #[4,23,32] #[2,4,32] """ def __init__(self, input_size, hidden_size, num_layers=1, direction="forward", time_major=False, dropout=0., weight_ih_attr=None, weight_hh_attr=None, bias_ih_attr=None, bias_hh_attr=None, name=None): super(GRU, self).__init__( "GRU", input_size, hidden_size, num_layers, direction, time_major, dropout, weight_ih_attr, weight_hh_attr, bias_ih_attr, bias_hh_attr)