# Copyright (c) 2018 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. """ All layers just related to the neural network. """ from ..layer_helper import LayerHelper from ..initializer import Normal, Constant from ..framework import Variable from ..param_attr import ParamAttr from layer_function_generator import autodoc from tensor import concat import utils __all__ = [ 'fc', 'embedding', 'dynamic_lstm', 'dynamic_lstmp', 'dynamic_gru', 'gru_unit', 'linear_chain_crf', 'crf_decoding', 'cos_sim', 'cross_entropy', 'square_error_cost', 'chunk_eval', 'sequence_conv', 'conv2d', 'sequence_pool', 'sequence_softmax', 'softmax', 'pool2d', 'batch_norm', 'beam_search_decode', 'conv2d_transpose', 'sequence_expand', 'lstm_unit', 'reduce_sum', 'reduce_mean', 'reduce_max', 'reduce_min', 'reduce_prod', 'sequence_first_step', 'sequence_last_step', 'dropout', 'split', 'ctc_greedy_decoder', 'edit_distance', 'l2_normalize', 'matmul', 'warpctc', 'sequence_reshape', 'transpose', 'im2sequence', 'nce', 'beam_search', 'row_conv', 'multiplex', 'layer_norm', 'softmax_with_cross_entropy', 'smooth_l1', 'one_hot', 'autoincreased_step_counter', 'lod_reset', 'lrn', ] def fc(input, size, num_flatten_dims=1, param_attr=None, bias_attr=None, use_mkldnn=False, act=None, name=None): """ **Fully Connected Layer** The fully connected layer can take multiple tensors as its inputs. It creates a variable called weights for each input tensor, which represents a fully connected weight matrix from each input unit to each output unit. The fully connected layer multiplies each input tensor with its coresponding weight to produce an output Tensor. If multiple input tensors are given, the results of multiple multiplications will be sumed up. If bias_attr is not None, a bias variable will be created and added to the output. Finally, if activation is not None, it will be applied to the output as well. This process can be formulated as follows: .. math:: Out = Act({\sum_{i=0}^{N-1}X_iW_i + b}) In the above equation: * :math:`N`: Number of the input. * :math:`X_i`: The input tensor. * :math:`W`: The weights created by this layer. * :math:`b`: The bias parameter created by this layer (if needed). * :math:`Act`: The activation function. * :math:`Out`: The output tensor. Args: input (Variable|list of Variable): The input tensor(s) of this layer, and the dimension of the input tensor(s) is at least 2. size(int): The number of output units in this layer. num_flatten_dims (int, default 1): The fc layer can accept an input tensor with more than two dimensions. If this happens, the multidimensional tensor will first be flattened into a 2-dimensional matrix. The parameter `num_flatten_dims` determines how the input tensor is flattened: the first `num_flatten_dims` (inclusive, index starts from 1) dimensions will be flatten to form the first dimension of the final matrix (height of the matrix), and the rest `rank(X) - num_flatten_dims` dimensions are flattened to form the second dimension of the final matrix (width of the matrix). For example, suppose `X` is a 6-dimensional tensor with a shape [2, 3, 4, 5, 6], and `num_flatten_dims` = 3. Then, the flattened matrix will have a shape [2 x 3 x 4, 5 x 6] = [24, 30]. param_attr (ParamAttr|list of ParamAttr, default None): The parameter attribute for learnable parameters/weights of this layer. bias_attr (ParamAttr|list of ParamAttr, default None): The parameter attribute for the bias of this layer. If it is set to None, no bias will be added to the output units. act (str, default None): Activation to be applied to the output of this layer. name (str, default None): The name of this layer. Returns: A tensor variable storing the transformation result. Raises: ValueError: If rank of the input tensor is less than 2. Examples: .. code-block:: python data = fluid.layers.data(name="data", shape=[32, 32], dtype="float32") fc = fluid.layers.fc(input=data, size=1000, act="tanh") """ helper = LayerHelper("fc", **locals()) dtype = helper.input_dtype() mul_results = [] for input_var, param_attr in helper.iter_inputs_and_params(): input_shape = input_var.shape param_shape = [ reduce(lambda a, b: a * b, input_shape[num_flatten_dims:], 1) ] + [size] w = helper.create_parameter( attr=param_attr, shape=param_shape, dtype=dtype, is_bias=False) tmp = helper.create_tmp_variable(dtype) helper.append_op( type="mul", inputs={"X": input_var, "Y": w}, outputs={"Out": tmp}, attrs={ "x_num_col_dims": num_flatten_dims, "y_num_col_dims": 1, 'use_mkldnn': use_mkldnn }) mul_results.append(tmp) # sum if len(mul_results) == 1: pre_bias = mul_results[0] else: pre_bias = helper.create_tmp_variable(dtype) helper.append_op( type="sum", inputs={"X": mul_results}, outputs={"Out": pre_bias}) # add bias pre_activation = helper.append_bias_op(pre_bias, dim_start=num_flatten_dims) # add activation return helper.append_activation(pre_activation) def embedding(input, size, is_sparse=False, padding_idx=None, param_attr=None, dtype='float32'): """ **Embedding Layer** This layer is used to lookup embeddings of IDs, provided by :attr:`input`, in a lookup table. The result of this lookup is the embedding of each ID in the :attr:`input`. All the input variables are passed in as local variables to the LayerHelper constructor. Args: input(Variable): The tensor variable containing the IDs. size(tuple|list): The shape of the look up table parameter. It should have two elements which indicate the size of the dictionary of embeddings and the size of each embedding vector respectively. is_sparse(bool): The flag indicating whether to use sparse update. padding_idx(int|long|None): If :attr:`None`, it makes no effect to lookup. Otherwise the given :attr:`padding_idx` indicates padding the output with zeros whenever lookup encounters it in :attr:`input`. If :math:`padding_idx < 0`, the padding_idx to use in lookup is :math:`size[0] + dim`. param_attr(ParamAttr): Parameters for this layer dtype(np.dtype|core.VarDesc.VarType|str): The type of data : float32, float_16, int etc Returns: Variable: The tensor variable storing the embeddings of the \ supplied inputs. Examples: .. code-block:: python dict_size = len(dataset.ids) data = fluid.layers.data(name='ids', shape=[32, 32], dtype='float32') fc = fluid.layers.embedding(input=data, size=[dict_size, 16]) """ helper = LayerHelper('embedding', **locals()) w = helper.create_parameter( attr=helper.param_attr, shape=size, dtype=dtype, is_bias=False) tmp = helper.create_tmp_variable(dtype) padding_idx = -1 if padding_idx is None else padding_idx if padding_idx >= 0 else ( size[0] + padding_idx) helper.append_op( type='lookup_table', inputs={'Ids': input, 'W': w}, outputs={'Out': tmp}, attrs={'is_sparse': is_sparse, 'padding_idx': padding_idx}) return tmp # TODO(qijun): expose H0 and C0 def dynamic_lstm(input, size, param_attr=None, bias_attr=None, use_peepholes=True, is_reverse=False, gate_activation='sigmoid', cell_activation='tanh', candidate_activation='tanh', dtype='float32', name=None): """ **Dynamic LSTM Layer** The defalut implementation is diagonal/peephole connection (https://arxiv.org/pdf/1402.1128.pdf), the formula is as follows: .. math:: i_t & = \sigma(W_{ix}x_{t} + W_{ih}h_{t-1} + W_{ic}c_{t-1} + b_i) f_t & = \sigma(W_{fx}x_{t} + W_{fh}h_{t-1} + W_{fc}c_{t-1} + b_f) \\tilde{c_t} & = act_g(W_{cx}x_t + W_{ch}h_{t-1} + b_c) o_t & = \sigma(W_{ox}x_{t} + W_{oh}h_{t-1} + W_{oc}c_t + b_o) c_t & = f_t \odot c_{t-1} + i_t \odot \\tilde{c_t} h_t & = o_t \odot act_h(c_t) where the :math:`W` terms denote weight matrices (e.g. :math:`W_{xi}` is the matrix of weights from the input gate to the input), :math:`W_{ic}, \ W_{fc}, W_{oc}` are diagonal weight matrices for peephole connections. In our implementation, we use vectors to reprenset these diagonal weight matrices. The :math:`b` terms denote bias vectors (:math:`b_i` is the input gate bias vector), :math:`\sigma` is the non-linear activations, such as logistic sigmoid function, and :math:`i, f, o` and :math:`c` are the input gate, forget gate, output gate, and cell activation vectors, respectively, all of which have the same size as the cell output activation vector :math:`h`. The :math:`\odot` is the element-wise product of the vectors. :math:`act_g` and :math:`act_h` are the cell input and cell output activation functions and `tanh` is usually used for them. :math:`\\tilde{c_t}` is also called candidate hidden state, which is computed based on the current input and the previous hidden state. Set `use_peepholes` to `False` to disable peephole connection. The formula is omitted here, please refer to the paper http://www.bioinf.jku.at/publications/older/2604.pdf for details. Note that these :math:`W_{xi}x_{t}, W_{xf}x_{t}, W_{xc}x_{t}, W_{xo}x_{t}` operations on the input :math:`x_{t}` are NOT included in this operator. Users can choose to use fully-connect layer before LSTM layer. Args: input(Variable): The input of dynamic_lstm layer, which supports variable-time length input sequence. The underlying tensor in this Variable is a matrix with shape (T X 4D), where T is the total time steps in this mini-batch, D is the hidden size. size(int): 4 * hidden size. param_attr(ParamAttr|None): The parameter attribute for the learnable hidden-hidden weights. - Weights = {:math:`W_{ch}, W_{ih}, \ W_{fh}, W_{oh}`} - The shape is (D x 4D), where D is the hidden size. bias_attr(ParamAttr|None): The bias attribute for the learnable bias weights, which contains two parts, input-hidden bias weights and peephole connections weights if setting `use_peepholes` to `True`. 1. `use_peepholes = False` - Biases = {:math:`b_c, b_i, b_f, b_o`}. - The shape is (1 x 4D). 2. `use_peepholes = True` - Biases = { :math:`b_c, b_i, b_f, b_o, W_{ic}, \ W_{fc}, W_{oc}`}. - The shape is (1 x 7D). use_peepholes(bool): Whether to enable diagonal/peephole connections, default `True`. is_reverse(bool): Whether to compute reversed LSTM, default `False`. gate_activation(str): The activation for input gate, forget gate and output gate. Choices = ["sigmoid", "tanh", "relu", "identity"], default "sigmoid". cell_activation(str): The activation for cell output. Choices = ["sigmoid", "tanh", "relu", "identity"], default "tanh". candidate_activation(str): The activation for candidate hidden state. Choices = ["sigmoid", "tanh", "relu", "identity"], default "tanh". dtype(str): Data type. Choices = ["float32", "float64"], default "float32". name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: tuple: The hidden state, and cell state of LSTM. The shape of both \ is (T x D), and lod is the same with the `input`. Examples: .. code-block:: python hidden_dim = 512 forward_proj = fluid.layers.fc(input=input_seq, size=hidden_dim * 4, act=None, bias_attr=None) forward, _ = fluid.layers.dynamic_lstm( input=forward_proj, size=hidden_dim * 4, use_peepholes=False) """ helper = LayerHelper('lstm', **locals()) size = size / 4 weight = helper.create_parameter( attr=helper.param_attr, shape=[size, 4 * size], dtype=dtype) bias_size = [1, 7 * size] if not use_peepholes: bias_size[1] = 4 * size bias = helper.create_parameter( attr=helper.bias_attr, shape=bias_size, dtype=dtype, is_bias=True) hidden = helper.create_tmp_variable(dtype) cell = helper.create_tmp_variable(dtype) batch_gate = helper.create_tmp_variable(dtype) batch_cell_pre_act = helper.create_tmp_variable(dtype) helper.append_op( type='lstm', inputs={'Input': input, 'Weight': weight, 'Bias': bias}, outputs={ 'Hidden': hidden, 'Cell': cell, 'BatchGate': batch_gate, 'BatchCellPreAct': batch_cell_pre_act }, attrs={ 'use_peepholes': use_peepholes, 'is_reverse': is_reverse, 'gate_activation': gate_activation, 'cell_activation': cell_activation, 'candidate_activation': candidate_activation }) return hidden, cell def dynamic_lstmp(input, size, proj_size, param_attr=None, bias_attr=None, use_peepholes=True, is_reverse=False, gate_activation='sigmoid', cell_activation='tanh', candidate_activation='tanh', proj_activation='tanh', dtype='float32', name=None): """ **Dynamic LSTMP Layer** LSTMP (LSTM with recurrent projection) layer has a separate projection layer after the LSTM layer, projecting the original hidden state to a lower-dimensional one, which is proposed to reduce the number of total parameters and furthermore computational complexity for the LSTM, espeacially for the case that the size of output units is relative large (https://research.google.com/pubs/archive/43905.pdf). The formula is as follows: .. math:: i_t & = \sigma(W_{ix}x_{t} + W_{ir}r_{t-1} + W_{ic}c_{t-1} + b_i) f_t & = \sigma(W_{fx}x_{t} + W_{fr}r_{t-1} + W_{fc}c_{t-1} + b_f) \\tilde{c_t} & = act_g(W_{cx}x_t + W_{cr}r_{t-1} + b_c) o_t & = \sigma(W_{ox}x_{t} + W_{or}r_{t-1} + W_{oc}c_t + b_o) c_t & = f_t \odot c_{t-1} + i_t \odot \\tilde{c_t} h_t & = o_t \odot act_h(c_t) r_t & = \overline{act_h}(W_{rh}h_t) In the above formula: * :math:`W`: Denotes weight matrices (e.g. :math:`W_{xi}` is \ the matrix of weights from the input gate to the input). * :math:`W_{ic}`, :math:`W_{fc}`, :math:`W_{oc}`: Diagonal weight \ matrices for peephole connections. In our implementation, \ we use vectors to reprenset these diagonal weight matrices. * :math:`b`: Denotes bias vectors (e.g. :math:`b_i` is the input gate \ bias vector). * :math:`\sigma`: The activation, such as logistic sigmoid function. * :math:`i, f, o` and :math:`c`: The input gate, forget gate, output \ gate, and cell activation vectors, respectively, all of which have \ the same size as the cell output activation vector :math:`h`. * :math:`h`: The hidden state. * :math:`r`: The recurrent projection of the hidden state. * :math:`\\tilde{c_t}`: The candidate hidden state, whose \ computation is based on the current input and previous hidden state. * :math:`\odot`: The element-wise product of the vectors. * :math:`act_g` and :math:`act_h`: The cell input and cell output \ activation functions and `tanh` is usually used for them. * :math:`\overline{act_h}`: The activation function for the projection \ output, usually using `identity` or same as :math:`act_h`. Set `use_peepholes` to `False` to disable peephole connection. The formula is omitted here, please refer to the paper http://www.bioinf.jku.at/publications/older/2604.pdf for details. Note that these :math:`W_{xi}x_{t}, W_{xf}x_{t}, W_{xc}x_{t}, W_{xo}x_{t}` operations on the input :math:`x_{t}` are NOT included in this operator. Users can choose to use fully-connected layer before LSTMP layer. Args: input(Variable): The input of dynamic_lstmp layer, which supports variable-time length input sequence. The underlying tensor in this Variable is a matrix with shape (T X 4D), where T is the total time steps in this mini-batch, D is the hidden size. size(int): 4 * hidden size. proj_size(int): The size of projection output. param_attr(ParamAttr|None): The parameter attribute for the learnable hidden-hidden weight and projection weight. - Hidden-hidden weight = {:math:`W_{ch}, W_{ih}, \ W_{fh}, W_{oh}`}. - The shape of hidden-hidden weight is (P x 4D), where P is the projection size and D the hidden size. - Projection weight = {:math:`W_{rh}`}. - The shape of projection weight is (D x P). bias_attr(ParamAttr|None): The bias attribute for the learnable bias weights, which contains two parts, input-hidden bias weights and peephole connections weights if setting `use_peepholes` to `True`. 1. `use_peepholes = False` - Biases = {:math:`b_c, b_i, b_f, b_o`}. - The shape is (1 x 4D). 2. `use_peepholes = True` - Biases = { :math:`b_c, b_i, b_f, b_o, W_{ic}, \ W_{fc}, W_{oc}`}. - The shape is (1 x 7D). use_peepholes(bool): Whether to enable diagonal/peephole connections, default `True`. is_reverse(bool): Whether to compute reversed LSTM, default `False`. gate_activation(str): The activation for input gate, forget gate and output gate. Choices = ["sigmoid", "tanh", "relu", "identity"], default "sigmoid". cell_activation(str): The activation for cell output. Choices = ["sigmoid", "tanh", "relu", "identity"], default "tanh". candidate_activation(str): The activation for candidate hidden state. Choices = ["sigmoid", "tanh", "relu", "identity"], default "tanh". proj_activation(str): The activation for projection output. Choices = ["sigmoid", "tanh", "relu", "identity"], default "tanh". dtype(str): Data type. Choices = ["float32", "float64"], default "float32". name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: tuple: The projection of hidden state, and cell state of LSTMP. The \ shape of projection is (T x P), for the cell state which is \ (T x D), and both LoD is the same with the `input`. Examples: .. code-block:: python hidden_dim, proj_dim = 512, 256 fc_out = fluid.layers.fc(input=input_seq, size=hidden_dim * 4, act=None, bias_attr=None) proj_out, _ = fluid.layers.dynamic_lstmp(input=fc_out, size=hidden_dim * 4, proj_size=proj_dim, use_peepholes=False, is_reverse=True, cell_activation="tanh", proj_activation="tanh") """ helper = LayerHelper('lstmp', **locals()) size = size / 4 weight = helper.create_parameter( attr=helper.param_attr, shape=[proj_size, 4 * size], dtype=dtype) proj_weight = helper.create_parameter( attr=helper.param_attr, shape=[size, proj_size], dtype=dtype) bias_size = [1, 7 * size] if not use_peepholes: bias_size[1] = 4 * size bias = helper.create_parameter( attr=helper.bias_attr, shape=bias_size, dtype=dtype, is_bias=True) projection = helper.create_tmp_variable(dtype) cell = helper.create_tmp_variable(dtype) ordered_proj0 = helper.create_tmp_variable(dtype) batch_hidden = helper.create_tmp_variable(dtype) batch_gate = helper.create_tmp_variable(dtype) batch_cell_pre_act = helper.create_tmp_variable(dtype) helper.append_op( type='lstmp', inputs={ 'Input': input, 'Weight': weight, 'ProjWeight': proj_weight, 'Bias': bias }, outputs={ 'Projection': projection, 'Cell': cell, 'OrderedP0': ordered_proj0, 'BatchHidden': batch_hidden, 'BatchGate': batch_gate, 'BatchCellPreAct': batch_cell_pre_act }, attrs={ 'use_peepholes': use_peepholes, 'is_reverse': is_reverse, 'gate_activation': gate_activation, 'cell_activation': cell_activation, 'candidate_activation': candidate_activation, 'proj_activation': proj_activation }) return projection, cell def dynamic_gru(input, size, param_attr=None, bias_attr=None, is_reverse=False, gate_activation='sigmoid', candidate_activation='tanh', h_0=None): """ **Dynamic GRU Layer** Refer to `Empirical Evaluation of Gated Recurrent Neural Networks on Sequence Modeling `_ The formula is as follows: .. math:: u_t & = act_g(W_{ux}x_{t} + W_{uh}h_{t-1} + b_u) r_t & = act_g(W_{rx}x_{t} + W_{rh}h_{t-1} + b_r) \\tilde{h_t} & = act_c(W_{cx}x_{t} + W_{ch}(r_t \odot h_{t-1}) + b_c) h_t & = (1-u_t) \odot h_{t-1} + u_t \odot \\tilde{h_t} The :math:`\odot` is the element-wise product of the vectors. :math:`act_g` is the update gate and reset gate activation function and :math:`sigmoid` is usually used for it. :math:`act_c` is the activation function for candidate hidden state and :math:`tanh` is usually used for it. Note that these :math:`W_{ux}x_{t}, W_{rx}x_{t}, W_{cx}x_{t}` operations on the input :math:`x_{t}` are NOT included in this operator. Users can choose to use fully-connect layer before GRU layer. Args: input(Variable): The input of dynamic_gru layer, which supports variable-time length input sequence. The underlying tensor in this Variable is a matrix with shape :math:`(T \\times 3D)`, where :math:`T` is the total time steps in this mini-batch, :math:`D` is the hidden size. size(int): The dimension of the gru cell. param_attr(ParamAttr|None): The parameter attribute for the learnable hidden-hidden weight matrix. Note: - The shape of the weight matrix is :math:`(T \\times 3D)`, where :math:`D` is the hidden size. - All elements in the weight matrix can be divided into two parts. The first part are weights of the update gate and reset gate with shape :math:`(D \\times 2D)`, and the second part are weights for candidate hidden state with shape :math:`(D \\times D)`. bias_attr(ParamAttr): The parameter attribute for learnable the hidden-hidden bias. is_reverse(bool): Whether to compute reversed GRU, default :attr:`False`. gate_activation(str): The activation for update gate and reset gate. Choices = ["sigmoid", "tanh", "relu", "identity"], default "sigmoid". activation(str): The activation for candidate hidden state. Choices = ["sigmoid", "tanh", "relu", "identity"], default "tanh". Returns: Variable: The hidden state of GRU. The shape is :math:`(T \\times D)`, \ and lod is the same with the input. Examples: .. code-block:: python hidden_dim = 512 x = fluid.layers.fc(input=data, size=hidden_dim * 3) hidden = fluid.layers.dynamic_gru(input=x, dim=hidden_dim) """ helper = LayerHelper('gru', **locals()) dtype = helper.input_dtype() weight = helper.create_parameter( attr=helper.param_attr, shape=[size, 3 * size], dtype=dtype) bias = helper.create_parameter( attr=helper.bias_attr, shape=[1, 3 * size], dtype=dtype, is_bias=True) inputs = {'Input': input, 'Weight': weight, 'Bias': bias} if h_0 != None: assert h_0.shape == ( size, size), 'The shape of h0 should be(%d, %d)' % (size, size) inputs['h0'] = h_0 hidden = helper.create_tmp_variable(dtype) batch_gate = helper.create_tmp_variable(dtype) batch_reset_hidden_prev = helper.create_tmp_variable(dtype) batch_hidden = helper.create_tmp_variable(dtype) helper.append_op( type='gru', inputs=inputs, outputs={ 'Hidden': hidden, 'BatchGate': batch_gate, 'BatchResetHiddenPrev': batch_reset_hidden_prev, 'BatchHidden': batch_hidden }, attrs={ 'is_reverse': is_reverse, 'gate_activation': gate_activation, 'activation': candidate_activation }) return hidden def gru_unit(input, hidden, size, weight=None, bias=None, activation='tanh', gate_activation='sigmoid'): """ GRU unit layer. The equation of a gru step is: .. math:: u_t & = actGate(xu_{t} + W_u h_{t-1} + b_u) r_t & = actGate(xr_{t} + W_r h_{t-1} + b_r) m_t & = actNode(xm_t + W_c dot(r_t, h_{t-1}) + b_m) h_t & = dot((1-u_t), m_t) + dot(u_t, h_{t-1}) The inputs of gru unit includes :math:`z_t`, :math:`h_{t-1}`. In terms of the equation above, the :math:`z_t` is split into 3 parts - :math:`xu_t`, :math:`xr_t` and :math:`xm_t`. This means that in order to implement a full GRU unit operator for an input, a fully connected layer has to be applied, such that :math:`z_t = W_{fc}x_t`. The terms :math:`u_t` and :math:`r_t` represent the update and reset gates of the GRU cell. Unlike LSTM, GRU has one lesser gate. However, there is an intermediate candidate hidden output, which is denoted by :math:`m_t`. This layer has three outputs :math:`h_t`, :math:`dot(r_t, h_{t-1})` and concatenation of :math:`u_t`, :math:`r_t` and :math:`m_t`. Args: input (Variable): The fc transformed input value of current step. hidden (Variable): The hidden value of lstm unit from previous step. size (integer): The input dimension value. weight (ParamAttr): The weight parameters for gru unit. Default: None bias (ParamAttr): The bias parameters for gru unit. Default: None activation (string): The activation type for cell (actNode). Default: 'tanh' gate_activation (string): The activation type for gates (actGate). Default: 'sigmoid' Returns: tuple: The hidden value, reset-hidden value and gate values. Examples: .. code-block:: python # assuming we have x_t_data and prev_hidden of size=10 x_t = fluid.layers.fc(input=x_t_data, size=30) hidden_val, r_h_val, gate_val = fluid.layers.gru_unit(input=x_t, hidden = prev_hidden) """ activation_dict = dict( identity=0, sigmoid=1, tanh=2, relu=3, ) activation = activation_dict[activation] gate_activation = activation_dict[gate_activation] helper = LayerHelper('gru_unit', **locals()) dtype = helper.input_dtype() size = size / 3 # create weight if weight is None: weight = helper.create_parameter( attr=helper.param_attr, shape=[size, 3 * size], dtype=dtype) # create bias if bias is None: bias_size = [1, 3 * size] bias = helper.create_parameter( attr=helper.bias_attr, shape=bias_size, dtype=dtype, is_bias=True) gate = helper.create_tmp_variable(dtype) reset_hidden_pre = helper.create_tmp_variable(dtype) updated_hidden = helper.create_tmp_variable(dtype) helper.append_op( type='gru_unit', inputs={'Input': input, 'HiddenPrev': hidden, 'Weight': weight}, outputs={ 'Gate': gate, 'ResetHiddenPrev': reset_hidden_pre, 'Hidden': updated_hidden, }, attrs={ 'activation': 0, 'gate_activation': 1, }) return updated_hidden, reset_hidden_pre, gate def linear_chain_crf(input, label, param_attr=None): helper = LayerHelper('linear_chain_crf', **locals()) size = input.shape[1] transition = helper.create_parameter( attr=helper.param_attr, shape=[size + 2, size], dtype=helper.input_dtype()) alpha = helper.create_tmp_variable(dtype=helper.input_dtype()) emission_exps = helper.create_tmp_variable(dtype=helper.input_dtype()) transition_exps = helper.create_tmp_variable(dtype=helper.input_dtype()) log_likelihood = helper.create_tmp_variable(dtype=helper.input_dtype()) helper.append_op( type='linear_chain_crf', inputs={"Emission": [input], "Transition": transition, "Label": label}, outputs={ "Alpha": [alpha], "EmissionExps": [emission_exps], "TransitionExps": transition_exps, "LogLikelihood": log_likelihood }) return log_likelihood def crf_decoding(input, param_attr, label=None): helper = LayerHelper('crf_decoding', **locals()) transition = helper.get_parameter(param_attr.name) viterbi_path = helper.create_tmp_variable(dtype=helper.input_dtype()) helper.append_op( type='crf_decoding', inputs={"Emission": [input], "Transition": transition, "Label": label}, outputs={"ViterbiPath": [viterbi_path]}) return viterbi_path def cos_sim(X, Y): """ This function performs the cosine similarity between two tensors X and Y and returns that as the output. """ helper = LayerHelper('cos_sim', **locals()) out = helper.create_tmp_variable(dtype=X.dtype) xnorm = helper.create_tmp_variable(dtype=X.dtype) ynorm = helper.create_tmp_variable(dtype=X.dtype) helper.append_op( type='cos_sim', inputs={'X': [X], 'Y': [Y]}, outputs={'Out': [out], 'XNorm': [xnorm], 'YNorm': [ynorm]}) return out def dropout(x, dropout_prob, is_test=False, seed=None): """ Computes dropout. Drop or keep each element of `x` independently. Dropout is a regularization technique for reducing overfitting by preventing neuron co-adaption during training. The dropout operator randomly set (according to the given dropout probability) the outputs of some units to zero, while others are remain unchanged. Args: x(variable): The input tensor. dropout_prob(float): Probability of setting units to zero. is_test(bool): A flag indicating whether it is in test phrase or not. seed(int): A Python integer used to create random seeds. If this parameter is set to None, a random seed is used. NOTE: If an integer seed is given, always the same output units will be dropped. DO NOT use a fixed seed in training. Returns: Variable: A tensor variable. Examples: .. code-block:: python x = fluid.layers.data(name="data", shape=[32, 32], dtype="float32") droped = fluid.layers.dropout(input=x, dropout_rate=0.5) """ helper = LayerHelper('dropout', **locals()) out = helper.create_tmp_variable(dtype=x.dtype) mask = helper.create_tmp_variable(dtype=x.dtype, stop_gradient=True) helper.append_op( type='dropout', inputs={'X': [x]}, outputs={'Out': [out], 'Mask': [mask]}, attrs={ 'dropout_prob': dropout_prob, 'is_test': is_test, 'fix_seed': seed is not None, 'seed': seed if seed is not None else 0 }) return out def cross_entropy(input, label, soft_label=False): """ **Cross Entropy Layer** This layer computes the cross entropy between `input` and `label`. It supports both standard cross-entropy and soft-label cross-entropy loss computation. 1) One-hot cross-entropy: `soft_label = False`, `Label[i, 0]` indicates the class index for sample i: .. math:: Y[i] = -\log(X[i, Label[i]]) 2) Soft-label cross-entropy: `soft_label = True`, `Label[i, j]` indicates the soft label of class j for sample i: .. math:: Y[i] = \sum_j{-Label[i, j] * log(X[i, j])} Please make sure that in this case the summation of each row of `label` equals one. 3) One-hot cross-entropy with vecterized `label`: As a special case of 2), when each row of 'label' has only one non-zero element which is equal to 1, soft-label cross-entropy degenerates to a one-hot cross-entropy with one-hot label representation. Args: input (Variable|list): a 2-D tensor with shape [N x D], where N is the batch size and D is the number of classes. This input is a probability computed by the previous operator, which is almost always the result of a softmax operator. label (Variable|list): the ground truth which is a 2-D tensor. When `soft_label` is set to `False`, `label` is a tensor with shape [N x 1]. When `soft_label` is set to `True`, `label` is a tensor with shape [N x D]. soft_label (bool): a flag indicating whether to interpretate the given labels as soft labels, default `False`. Returns: A 2-D tensor with shape [N x 1], the cross entropy loss. Raises: `ValueError`: 1) the 1st dimension of `input` and `label` are not equal. 2) when `soft_label == True`, and the 2nd dimension of `input` and `label` are not equal. 3) when `soft_label == False`, and the 2nd dimension of `label` is not 1. Examples: .. code-block:: python predict = fluid.layers.fc(input=net, size=classdim, act='softmax') cost = fluid.layers.cross_entropy(input=predict, label=label) """ helper = LayerHelper('cross_entropy', **locals()) out = helper.create_tmp_variable(dtype=input.dtype) helper.append_op( type='cross_entropy', inputs={'X': [input], 'Label': [label]}, outputs={'Y': [out]}, attrs={"soft_label": soft_label}) return out def square_error_cost(input, label): """ **Square error cost layer** This layer accepts input predictions and target label and returns the squared error cost. For predictions, :math:`X`, and target labels, :math:`Y`, the equation is: .. math:: Out = (X - Y)^2 In the above equation: * :math:`X`: Input predictions, a tensor. * :math:`Y`: Input labels, a tensor. * :math:`Out`: Output value, same shape with :math:`X`. Args: input(Variable): Input tensor, has predictions. label(Variable): Label tensor, has target labels. Returns: Variable: The tensor variable storing the element-wise squared error \ difference of input and label. Examples: .. code-block:: python y = layers.data(name='y', shape=[1], dtype='float32') y_predict = layers.data(name='y_predict', shape=[1], dtype='float32') cost = layers.square_error_cost(input=y_predict, label=y) """ helper = LayerHelper('square_error_cost', **locals()) minus_out = helper.create_tmp_variable(dtype=input.dtype) helper.append_op( type='elementwise_sub', inputs={'X': [input], 'Y': [label]}, outputs={'Out': [minus_out]}) square_out = helper.create_tmp_variable(dtype=input.dtype) helper.append_op( type='square', inputs={'X': [minus_out]}, outputs={'Out': [square_out]}) return square_out def chunk_eval(input, label, chunk_scheme, num_chunk_types, excluded_chunk_types=None): """ This function computes and outputs the precision, recall and F1-score of chunk detection. """ helper = LayerHelper("chunk_eval", **locals()) # prepare output precision = helper.create_tmp_variable(dtype="float32") recall = helper.create_tmp_variable(dtype="float32") f1_score = helper.create_tmp_variable(dtype="float32") num_infer_chunks = helper.create_tmp_variable(dtype="int64") num_label_chunks = helper.create_tmp_variable(dtype="int64") num_correct_chunks = helper.create_tmp_variable(dtype="int64") helper.append_op( type="chunk_eval", inputs={"Inference": [input], "Label": [label]}, outputs={ "Precision": [precision], "Recall": [recall], "F1-Score": [f1_score], "NumInferChunks": [num_infer_chunks], "NumLabelChunks": [num_label_chunks], "NumCorrectChunks": [num_correct_chunks] }, attrs={ "num_chunk_types": num_chunk_types, "chunk_scheme": chunk_scheme, "excluded_chunk_types": excluded_chunk_types or [] }) return (precision, recall, f1_score, num_infer_chunks, num_label_chunks, num_correct_chunks) def sequence_conv(input, num_filters, filter_size=3, filter_stride=1, padding=None, bias_attr=None, param_attr=None, act=None): """ This function creates the op for sequence_conv, using the inputs and other convolutional configurations for the filters and stride as given in the input parameters to the function. """ # FIXME(dzh) : want to unify the argument of python layer # function. So we ignore some unecessary attributes. # such as, padding_trainable, context_start. helper = LayerHelper('sequence_conv', **locals()) dtype = helper.input_dtype() filter_shape = [filter_size * input.shape[1], num_filters] filter_param = helper.create_parameter( attr=helper.param_attr, shape=filter_shape, dtype=dtype) pre_bias = helper.create_tmp_variable(dtype) helper.append_op( type='sequence_conv', inputs={ 'X': [input], 'Filter': [filter_param], }, outputs={"Out": pre_bias}, attrs={ 'contextStride': filter_stride, 'contextStart': -int(filter_size / 2), 'contextLength': filter_size }) pre_act = helper.append_bias_op(pre_bias) return helper.append_activation(pre_act) def sequence_softmax(input, param_attr=None, bias_attr=None, use_cudnn=True): helper = LayerHelper('sequence_softmax', **locals()) dtype = helper.input_dtype() softmax_out = helper.create_tmp_variable(dtype) helper.append_op( type="sequence_softmax", inputs={"X": input}, outputs={"Out": softmax_out}, attrs={"use_cudnn": use_cudnn}) return softmax_out def softmax(input, param_attr=None, bias_attr=None, use_cudnn=True): helper = LayerHelper('softmax', **locals()) dtype = helper.input_dtype() softmax_out = helper.create_tmp_variable(dtype) helper.append_op( type="softmax", inputs={"X": input}, outputs={"Out": softmax_out}, attrs={"use_cudnn": use_cudnn}) return softmax_out def conv2d(input, num_filters, filter_size, stride=1, padding=0, dilation=1, groups=None, param_attr=None, bias_attr=None, use_cudnn=True, use_mkldnn=False, act=None, name=None): """ **Convlution2D Layer** The convolution2D layer calculates the output based on the input, filter and strides, paddings, dilations, groups parameters. Input(Input) and Output(Output) are in NCHW format. Where N is batch size, C is the number of channels, H is the height of the feature, and W is the width of the feature. The details of convolution layer, please refer UFLDL's `convolution, `_ . If bias attribution and activation type are provided, bias is added to the output of the convolution, and the corresponding activation function is applied to the final result. For each input :math:`X`, the equation is: .. math:: Out = \sigma (W \\ast X + b) In the above equation: * :math:`X`: Input value, a tensor with NCHW format. * :math:`W`: Filter value, a tensor with MCHW format. * :math:`\\ast`: Convolution operation. * :math:`b`: Bias value, a 2-D tensor with shape [M, 1]. * :math:`\\sigma`: Activation function. * :math:`Out`: Output value, the shape of :math:`Out` and :math:`X` may be different. Example: - Input: Input shape: $(N, C_{in}, H_{in}, W_{in})$ Filter shape: $(C_{out}, C_{in}, H_f, W_f)$ - Output: Output shape: $(N, C_{out}, H_{out}, W_{out})$ Where .. math:: H_{out}&= \\frac{(H_{in} + 2 * paddings[0] - (dilations[0] * (H_f - 1) + 1))}{strides[0]} + 1 \\\\ W_{out}&= \\frac{(W_{in} + 2 * paddings[1] - (dilations[1] * (W_f - 1) + 1))}{strides[1]} + 1 Args: input(Variable): The input image with [N, C, H, W] format. num_filters(int): The number of filter. It is as same as the output image channel. filter_size(int|tuple|None): The filter size. If filter_size is a tuple, it must contain two integers, (filter_size_H, filter_size_W). Otherwise, the filter will be a square. stride(int|tuple): The stride size. If stride is a tuple, it must contain two integers, (stride_H, stride_W). Otherwise, the stride_H = stride_W = stride. Default: stride = 1. padding(int|tuple): The padding size. If padding is a tuple, it must contain two integers, (padding_H, padding_W). Otherwise, the padding_H = padding_W = padding. Default: padding = 0. dilation(int|tuple): The dilation size. If dilation is a tuple, it must contain two integers, (dilation_H, dilation_W). Otherwise, the dilation_H = dilation_W = dilation. Default: dilation = 1. groups(int): The groups number of the Conv2d Layer. According to grouped convolution in Alex Krizhevsky's Deep CNN paper: when group=2, the first half of the filters is only connected to the first half of the input channels, while the second half of the filters is only connected to the second half of the input channels. Default: groups=1 param_attr(ParamAttr): The parameters to the Conv2d Layer. Default: None bias_attr(ParamAttr): Bias parameter for the Conv2d layer. Default: None use_cudnn(bool): Use cudnn kernel or not, it is valid only when the cudnn library is installed. Default: True act(str): Activation type. Default: None name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The tensor variable storing the convolution and \ non-linearity activation result. Raises: ValueError: If the shapes of input, filter_size, stride, padding and groups mismatch. Examples: .. code-block:: python data = fluid.layers.data( name='data', shape=[3, 32, 32], dtype='float32') conv2d = fluid.layers.conv2d( input=data, num_filters=2, filter_size=3, act="relu") """ if stride is None: stride = [1, 1] num_channels = input.shape[1] l_type = 'conv2d' if (num_channels == groups and num_filters % num_channels == 0 and not use_cudnn): l_type = 'depthwise_conv2d' helper = LayerHelper(l_type, **locals()) dtype = helper.input_dtype() if groups is None: num_filter_channels = num_channels else: if num_channels % groups != 0: raise ValueError("num_channels must be divisible by groups.") num_filter_channels = num_channels / groups filter_size = utils.convert_to_list(filter_size, 2, 'filter_size') stride = utils.convert_to_list(stride, 2, 'stride') padding = utils.convert_to_list(padding, 2, 'padding') dilation = utils.convert_to_list(dilation, 2, 'dilation') if not isinstance(use_cudnn, bool): raise ValueError("use_cudnn should be True or False") input_shape = input.shape filter_shape = [num_filters, num_filter_channels] + filter_size def _get_default_param_initializer(): std = (2.0 / (filter_size[0]**2 * num_channels))**0.5 return Normal(0.0, std, 0) filter_param = helper.create_parameter( attr=helper.param_attr, shape=filter_shape, dtype=dtype, default_initializer=_get_default_param_initializer()) pre_bias = helper.create_tmp_variable(dtype) helper.append_op( type=l_type, inputs={ 'Input': input, 'Filter': filter_param, }, outputs={"Output": pre_bias}, attrs={ 'strides': stride, 'paddings': padding, 'dilations': dilation, 'groups': groups, 'use_cudnn': use_cudnn, 'use_mkldnn': use_mkldnn }) pre_act = helper.append_bias_op(pre_bias, dim_start=1, dim_end=2) return helper.append_activation(pre_act) def sequence_pool(input, pool_type): """ This function add the operator for sequence pooling. It pools features of all time-steps of each instance, and is applied on top of the input using pool_type mentioned in the parameters. It supports four pool_type: - average: :math:`Out[i] = \\frac{\sum_i X_i}{N}` - sum: :math:`Out[i] = \sum_jX_{ij}` - sqrt: :math:`Out[i] = \\frac{\sum_jX_{ij}}{\sqrt{len(X_i)}}` - max: :math:`Out[i] = max(X_i)` .. code-block:: text x is a 1-level LoDTensor: x.lod = [[0, 2, 5, 7]] x.data = [1, 3, 2, 4, 6, 5, 1] x.dims = [7, 1] then output is a Tensor: out.dim = [3, 1] with condition len(x.lod[-1]) - 1 == out.dims[0] for different pool_type: average: out.data = [2, 4, 3], where 2=(1+3)/2, 4=(2+4+6)/3, 3=(5+1)/2 sum : out.data = [4, 12, 6], where 4=1+3, 12=2+4+6, 6=5+1 sqrt : out.data = [2.82, 6.93, 4.24], where 2.82=(1+3)/sqrt(2), 6.93=(2+4+6)/sqrt(3), 4.24=(5+1)/sqrt(2) max : out.data = [3, 6, 5], where 3=max(1,3), 6=max(2,4,6), 5=max(5,1) Args: input(variable): The input variable which is a LoDTensor. pool_type (string): The pooling type of sequence_pool. It supports average, sum, sqrt and max. Returns: The sequence pooling variable which is a Tensor. Examples: .. code-block:: python x = fluid.layers.data(name='x', shape=[7, 1], dtype='float32', lod_level=1) avg_x = fluid.layers.sequence_pool(input=x, pool_type='average') sum_x = fluid.layers.sequence_pool(input=x, pool_type='sum') sqrt_x = fluid.layers.sequence_pool(input=x, pool_type='sqrt') max_x = fluid.layers.sequence_pool(input=x, pool_type='max') """ helper = LayerHelper('sequence_pool', **locals()) dtype = helper.input_dtype() pool_out = helper.create_tmp_variable(dtype) max_index = helper.create_tmp_variable(dtype) helper.append_op( type="sequence_pool", inputs={"X": input}, outputs={"Out": pool_out, "MaxIndex": max_index}, attrs={"pooltype": pool_type.upper()}) # when pool_type is max, variable max_index is initialized, # so we stop the gradient explicitly here if pool_type == 'max': max_index.stop_gradient = True return pool_out def sequence_first_step(input): """ This funciton get the first step of sequence. .. code-block:: text x is a 1-level LoDTensor: x.lod = [[0, 2, 5, 7]] x.data = [1, 3, 2, 4, 6, 5, 1] x.dims = [7, 1] then output is a Tensor: out.dim = [3, 1] with condition len(x.lod[-1]) - 1 == out.dims[0] out.data = [1, 2, 5], where 1=first(1,3), 2=first(2,4,6), 5=first(5,1) Args: input(variable): The input variable which is a LoDTensor. Returns: The sequence's first step variable which is a Tensor. Examples: .. code-block:: python x = fluid.layers.data(name='x', shape=[7, 1], dtype='float32', lod_level=1) x_first_step = fluid.layers.sequence_first_step(input=x) """ return sequence_pool(input=input, pool_type="first") def sequence_last_step(input): """ This funciton get the last step of sequence. .. code-block:: text x is a 1-level LoDTensor: x.lod = [[0, 2, 5, 7]] x.data = [1, 3, 2, 4, 6, 5, 1] x.dims = [7, 1] then output is a Tensor: out.dim = [3, 1] with condition len(x.lod[-1]) - 1 == out.dims[0] out.data = [3, 6, 1], where 3=last(1,3), 6=last(2,4,6), 1=last(5,1) Args: input(variable): The input variable which is a LoDTensor. Returns: The sequence's last step variable which is a Tensor. Examples: .. code-block:: python x = fluid.layers.data(name='x', shape=[7, 1], dtype='float32', lod_level=1) x_last_step = fluid.layers.sequence_last_step(input=x) """ return sequence_pool(input=input, pool_type="last") def pool2d(input, pool_size=-1, pool_type="max", pool_stride=1, pool_padding=0, global_pooling=False, use_cudnn=True, ceil_mode=False, use_mkldnn=False, name=None): """ This function adds the operator for pooling in 2 dimensions, using the pooling configurations mentioned in input parameters. """ if pool_type not in ["max", "avg"]: raise ValueError( "Unknown pool_type: '%s'. It can only be 'max' or 'avg'.", str(pool_type)) if global_pooling is False and pool_size == -1: raise ValueError( "When the global_pooling is False, pool_size must be passed " "and be a valid value. Received pool_size: " + str(pool_size)) pool_size = utils.convert_to_list(pool_size, 2, 'pool_size') pool_padding = utils.convert_to_list(pool_padding, 2, 'pool_padding') pool_stride = utils.convert_to_list(pool_stride, 2, 'pool_stride') if not isinstance(use_cudnn, bool): raise ValueError("use_cudnn should be True or False") helper = LayerHelper('pool2d', **locals()) dtype = helper.input_dtype() pool_out = helper.create_tmp_variable(dtype) helper.append_op( type="pool2d", inputs={"X": input}, outputs={"Out": pool_out}, attrs={ "pooling_type": pool_type, "ksize": pool_size, "global_pooling": global_pooling, "strides": pool_stride, "paddings": pool_padding, "use_cudnn": use_cudnn, "ceil_mode": ceil_mode, "use_mkldnn": use_mkldnn }) return pool_out def batch_norm(input, act=None, is_test=False, momentum=0.9, epsilon=1e-05, param_attr=None, bias_attr=None, data_layout='NCHW', name=None, moving_mean_name=None, moving_variance_name=None): """ This function helps create an operator to implement the BatchNorm layer using the configurations from the input parameters. """ helper = LayerHelper('batch_norm', **locals()) dtype = helper.input_dtype() input_shape = input.shape if data_layout == 'NCHW': channel_num = input_shape[1] else: if data_layout == 'NHWC': channel_num = input_shape[-1] else: raise ValueError("unsupported data layout:" + data_layout) param_shape = [channel_num] # create parameter scale = helper.create_parameter( attr=helper.param_attr, shape=param_shape, dtype=dtype, default_initializer=Constant(1.0)) bias = helper.create_parameter( attr=helper.bias_attr, shape=param_shape, dtype=dtype, is_bias=True) mean = helper.create_parameter( attr=ParamAttr( name=moving_mean_name, initializer=Constant(0.0), trainable=False), shape=param_shape, dtype=input.dtype) mean.stop_gradient = True variance = helper.create_parameter( attr=ParamAttr( name=moving_variance_name, initializer=Constant(1.0), trainable=False), shape=param_shape, dtype=input.dtype) variance.stop_gradient = True # create output # mean and mean_out share the same memory mean_out = mean # variance and variance out share the same memory variance_out = variance saved_mean = helper.create_tmp_variable(dtype=dtype, stop_gradient=True) saved_variance = helper.create_tmp_variable(dtype=dtype, stop_gradient=True) batch_norm_out = helper.create_tmp_variable(dtype) helper.append_op( type="batch_norm", inputs={ "X": input, "Scale": scale, "Bias": bias, "Mean": mean, "Variance": variance }, outputs={ "Y": batch_norm_out, "MeanOut": mean_out, "VarianceOut": variance_out, "SavedMean": saved_mean, "SavedVariance": saved_variance }, attrs={"momentum": momentum, "epsilon": epsilon, "is_test": is_test}) return helper.append_activation(batch_norm_out) def layer_norm(input, scale=True, shift=True, begin_norm_axis=1, epsilon=1e-05, param_attr=None, bias_attr=None, act=None, name=None): """ **Layer Normalization** Assume feature vectors exist on dimensions :attr:`begin_norm_axis ... rank(input)` and calculate the moment statistics along these dimensions for each feature vector :math:`a` with size :math:`H`, then normalize each feature vector using the corresponding statistics. After that, apply learnable gain and bias on the normalized tensor to scale and shift if :attr:`scale` and :attr:`shift` are set. Refer to `Layer Normalization `_ The formula is as follows: .. math:: \\mu & = \\frac{1}{H}\\sum_{i=1}^{H} a_i \\sigma & = \\sqrt{\\frac{1}{H}\sum_{i=1}^{H}(a_i - \\mu)^2} h & = f(\\frac{g}{\\sigma}(a - \\mu) + b) Args: input(Variable): The input tensor variable. scale(bool): Whether to learn the adaptive gain :math:`g` after normalization. shift(bool): Whether to learn the adaptive bias :math:`b` after normalization. begin_norm_axis(bool): The normalization will be performed along dimensions from :attr:`begin_norm_axis` to :attr:`rank(input)`. epsilon(float): The small value added to the variance to prevent division by zero. param_attr(ParamAttr|None): The parameter attribute for the learnable gain :math:`g`. bias_attr(ParamAttr|None): The parameter attribute for the learnable bias :math:`b`. act(str): Activation to be applied to the output of layer normalizaiton. Returns: Variable: A tensor variable with the same shape as the input. Examples: .. code-block:: python data = fluid.layers.data( name='data', shape=[3, 32, 32], dtype='float32') x = fluid.layers.layer_norm(input=data, begin_norm_axis=1) """ helper = LayerHelper('layer_norm', **locals()) dtype = helper.input_dtype() # create intput and parameters inputs = {'X': input} input_shape = input.shape param_shape = [reduce(lambda x, y: x * y, input_shape[begin_norm_axis:])] if scale: scale = helper.create_parameter( attr=helper.param_attr, shape=param_shape, dtype=dtype, default_initializer=Constant(1.0)) inputs['Scale'] = scale if shift: assert bias_attr is not False bias = helper.create_parameter( attr=helper.bias_attr, shape=param_shape, dtype=dtype, is_bias=True) inputs['Bias'] = bias # create output mean_out = helper.create_tmp_variable(dtype=dtype, stop_gradient=True) variance_out = helper.create_tmp_variable(dtype=dtype, stop_gradient=True) layer_norm_out = helper.create_tmp_variable(dtype) helper.append_op( type="layer_norm", inputs=inputs, outputs={ "Y": layer_norm_out, "Mean": mean_out, "Variance": variance_out, }, attrs={"epsilon": epsilon, "begin_norm_axis": begin_norm_axis}) return helper.append_activation(layer_norm_out) def beam_search_decode(ids, scores, name=None): helper = LayerHelper('beam_search_decode', **locals()) sentence_ids = helper.create_tmp_variable(dtype=ids.dtype) sentence_scores = helper.create_tmp_variable(dtype=ids.dtype) helper.append_op( type="beam_search_decode", inputs={"Ids": ids, "Scores": scores}, outputs={ "SentenceIds": sentence_ids, "SentenceScores": sentence_scores }) return sentence_ids, sentence_scores def conv2d_transpose(input, num_filters, output_size=None, filter_size=None, padding=0, stride=1, dilation=1, param_attr=None, bias_attr=None, use_cudnn=True, act=None, name=None): """ **Convlution2D transpose layer** The convolution2D transpose layer calculates the output based on the input, filter, and dilations, strides, paddings. Input(Input) and output(Output) are in NCHW format. Where N is batch size, C is the number of channels, H is the height of the feature, and W is the width of the feature. Parameters(dilations, strides, paddings) are two elements. These two elements represent height and width, respectively. The details of convolution transpose layer, please refer to the following explanation and references `therein `_. For each input :math:`X`, the equation is: .. math:: Out = W \\ast X In the above equation: * :math:`X`: Input value, a tensor with NCHW format. * :math:`W`: Filter value, a tensor with MCHW format. * :math:`\\ast` : Convolution transpose operation. * :math:`Out`: Output value, the shape of :math:`Out` and :math:`X` may be different. Example: - Input: Input shape: $(N, C_{in}, H_{in}, W_{in})$ Filter shape: $(C_{in}, C_{out}, H_f, W_f)$ - Output: Output shape: $(N, C_{out}, H_{out}, W_{out})$ Where .. math:: H_{out} &= (H_{in} - 1) * strides[0] - 2 * paddings[0] + dilations[0] * (H_f - 1) + 1 \\\\ W_{out} &= (W_{in} - 1) * strides[1] - 2 * paddings[1] + dilations[1] * (W_f - 1) + 1 Args: input(Variable): The input image with [N, C, H, W] format. num_filters(int): The number of the filter. It is as same as the output image channel. output_size(int|tuple|None): The output image size. If output size is a tuple, it must contain two integers, (image_H, image_W). This parameter only works when filter_size is None. filter_size(int|tuple|None): The filter size. If filter_size is a tuple, it must contain two integers, (filter_size_H, filter_size_W). Otherwise, the filter will be a square. None if use output size to calculate filter_size. padding(int|tuple): The padding size. If padding is a tuple, it must contain two integers, (padding_H, padding_W). Otherwise, the padding_H = padding_W = padding. Default: padding = 0. stride(int|tuple): The stride size. If stride is a tuple, it must contain two integers, (stride_H, stride_W). Otherwise, the stride_H = stride_W = stride. Default: stride = 1. dilation(int|tuple): The dilation size. If dilation is a tuple, it must contain two integers, (dilation_H, dilation_W). Otherwise, the dilation_H = dilation_W = dilation. Default: dilation = 1. param_attr(ParamAttr): The parameters to the Conv2d_transpose Layer. Default: None bias_attr(ParamAttr): Bias parameter for the Conv2d layer. Default: None use_cudnn(bool): Use cudnn kernel or not, it is valid only when the cudnn library is installed. Default: True act(str): Activation type. Default: None name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The tensor variable storing the convolution transpose result. Raises: ValueError: If the shapes of input, filter_size, stride, padding and groups mismatch. Examples: .. code-block:: python data = fluid.layers.data( name='data', shape=[3, 32, 32], dtype='float32') conv2d_transpose = fluid.layers.conv2d_transpose( input=data, num_filters=2, filter_size=3) """ helper = LayerHelper("conv2d_transpose", **locals()) if not isinstance(input, Variable): raise TypeError("Input of conv2d_transpose must be Variable") input_channel = input.shape[1] padding = utils.convert_to_list(padding, 2, 'padding') stride = utils.convert_to_list(stride, 2, 'stride') dilation = utils.convert_to_list(dilation, 2, 'dilation') if not isinstance(use_cudnn, bool): raise ValueError("use_cudnn should be True or False") if filter_size is None: if output_size is None: raise ValueError("output_size must be set when filter_size is None") if isinstance(output_size, int): output_size = [output_size, output_size] h_in = input.shape[2] w_in = input.shape[3] filter_size_h = (output_size[0] - (h_in - 1) * stride[0] + 2 * padding[0] - 1) / dilation[0] + 1 filter_size_w = (output_size[1] - (w_in - 1) * stride[1] + 2 * padding[1] - 1) / dilation[1] + 1 filter_size = [filter_size_h, filter_size_w] else: filter_size = utils.convert_to_list(filter_size, 2, 'conv2d_transpose.filter_size') filter_shape = [input_channel, num_filters] + filter_size img_filter = helper.create_parameter( dtype=input.dtype, shape=filter_shape, attr=helper.param_attr) pre_bias = helper.create_tmp_variable(dtype=input.dtype) helper.append_op( type='conv2d_transpose', inputs={'Input': [input], 'Filter': [img_filter]}, outputs={'Output': pre_bias}, attrs={ 'strides': stride, 'paddings': padding, 'dilations': dilation, 'use_cudnn': use_cudnn }) pre_act = helper.append_bias_op(pre_bias, dim_start=1, dim_end=2) out = helper.append_activation(pre_act) return out def sequence_expand(x, y, ref_level=-1, name=None): """Sequence Expand Layer. This layer will expand the input variable **x** according to specified level lod of **y**. Please note that lod level of **x** is at most 1 and rank of **x** is at least 2. When rank of **x** is greater than 2, then it would be viewed as a 2-D tensor. Following examples will explain how sequence_expand works: .. code-block:: text * Case 1 x is a LoDTensor: x.lod = [[0, 2, 4]] x.data = [[a], [b], [c], [d]] x.dims = [4, 1] y is a LoDTensor: y.lod = [[0, 2, 4], [0, 3, 6, 7, 8]] ref_level: 0 then output is a 1-level LoDTensor: out.lod = [[0, 2, 4, 6, 8]] out.data = [[a], [b], [a], [b], [c], [d], [c], [d]] out.dims = [8, 1] * Case 2 x is a Tensor: x.data = [[a], [b], [c]] x.dims = [3, 1] y is a LoDTensor: y.lod = [[0, 2, 2, 5]] ref_level: -1 then output is a Tensor: out.data = [[a], [a], [c], [c], [c]] out.dims = [5, 1] Args: x (Variable): The input variable which is a Tensor or LoDTensor. y (Variable): The input variable which is a LoDTensor. ref_level (int): Lod level of `y` to be referred by `x`. If set to -1, refer the last level of lod. name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The expanded variable which is a LoDTensor. Examples: .. code-block:: python x = fluid.layers.data(name='x', shape=[10], dtype='float32') y = fluid.layers.data(name='y', shape=[10, 20], dtype='float32', lod_level=1) out = layers.sequence_expand(x=x, y=y, ref_level=0) """ helper = LayerHelper('sequence_expand', input=x, **locals()) dtype = helper.input_dtype() tmp = helper.create_tmp_variable(dtype) helper.append_op( type='sequence_expand', inputs={'X': x, 'Y': y}, outputs={'Out': tmp}, attrs={'ref_level': ref_level}) return tmp def beam_search(pre_ids, ids, scores, beam_size, end_id, level=0): ''' This function implements the beam search algorithm. ''' helper = LayerHelper('beam_search', **locals()) score_type = scores.dtype id_type = ids.dtype selected_scores = helper.create_tmp_variable(dtype=score_type) selected_ids = helper.create_tmp_variable(dtype=id_type) helper.append_op( type='beam_search', inputs={ 'pre_ids': pre_ids, 'ids': ids, 'scores': scores, }, outputs={ 'selected_ids': selected_ids, 'selected_scores': selected_scores, }, attrs={ # TODO(ChunweiYan) to assure other value support 'level': level, 'beam_size': beam_size, 'end_id': end_id, }) return selected_ids, selected_scores def lstm_unit(x_t, hidden_t_prev, cell_t_prev, forget_bias=0.0, param_attr=None, bias_attr=None, name=None): """Lstm unit layer. The equation of a lstm step is: .. math:: i_t & = \sigma(W_{x_i}x_{t} + W_{h_i}h_{t-1} + b_i) f_t & = \sigma(W_{x_f}x_{t} + W_{h_f}h_{t-1} + b_f) c_t & = f_tc_{t-1} + i_t tanh (W_{x_c}x_t + W_{h_c}h_{t-1} + b_c) o_t & = \sigma(W_{x_o}x_{t} + W_{h_o}h_{t-1} + b_o) h_t & = o_t tanh(c_t) The inputs of lstm unit include :math:`x_t`, :math:`h_{t-1}` and :math:`c_{t-1}`. The 2nd dimensions of :math:`h_{t-1}` and :math:`c_{t-1}` should be same. The implementation separates the linear transformation and non-linear transformation apart. Here, we take :math:`i_t` as an example. The linear transformation is applied by calling a `fc` layer and the equation is: .. math:: L_{i_t} = W_{x_i}x_{t} + W_{h_i}h_{t-1} + b_i The non-linear transformation is applied by calling `lstm_unit_op` and the equation is: .. math:: i_t = \sigma(L_{i_t}) This layer has two outputs including :math:`h_t` and :math:`o_t`. Args: x_t (Variable): The input value of current step, a 2-D tensor with shape M x N, M for batch size and N for input size. hidden_t_prev (Variable): The hidden value of lstm unit, a 2-D tensor with shape M x S, M for batch size and S for size of lstm unit. cell_t_prev (Variable): The cell value of lstm unit, a 2-D tensor with shape M x S, M for batch size and S for size of lstm unit. forget_bias (float): The forget bias of lstm unit. param_attr (ParamAttr): The attributes of parameter weights, used to set initializer, name etc. bias_attr (ParamAttr): The attributes of bias weights, if not False, bias weights will be created and be set to default value. name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: tuple: The hidden value and cell value of lstm unit. Raises: ValueError: The ranks of **x_t**, **hidden_t_prev** and **cell_t_prev** not be 2 or the 1st dimensions of **x_t**, **hidden_t_prev** and **cell_t_prev** not be the same or the 2nd dimensions of **hidden_t_prev** and **cell_t_prev** not be the same. Examples: .. code-block:: python x_t = fluid.layers.fc(input=x_t_data, size=10) prev_hidden = fluid.layers.fc(input=prev_hidden_data, size=30) prev_cell = fluid.layers.fc(input=prev_cell_data, size=30) hidden_value, cell_value = fluid.layers.lstm_unit(x_t=x_t, hidden_t_prev=prev_hidden, cell_t_prev=prev_cell) """ helper = LayerHelper('lstm_unit', **locals()) if len(x_t.shape) != 2: raise ValueError("Rank of x_t must be 2.") if len(hidden_t_prev.shape) != 2: raise ValueError("Rank of hidden_t_prev must be 2.") if len(cell_t_prev.shape) != 2: raise ValueError("Rank of cell_t_prev must be 2.") if x_t.shape[0] != hidden_t_prev.shape[0] or x_t.shape[ 0] != cell_t_prev.shape[0]: raise ValueError("The 1st dimensions of x_t, hidden_t_prev and " "cell_t_prev must be the same.") if hidden_t_prev.shape[1] != cell_t_prev.shape[1]: raise ValueError("The 2nd dimensions of hidden_t_prev and " "cell_t_prev must be the same.") if bias_attr is None: bias_attr = ParamAttr() size = cell_t_prev.shape[1] concat_out = concat(input=[x_t, hidden_t_prev], axis=1) fc_out = fc(input=concat_out, size=4 * size, param_attr=param_attr, bias_attr=bias_attr) dtype = x_t.dtype c = helper.create_tmp_variable(dtype) h = helper.create_tmp_variable(dtype) helper.append_op( type='lstm_unit', inputs={"X": fc_out, "C_prev": cell_t_prev}, outputs={"C": c, "H": h}, attrs={"forget_bias": forget_bias}) return h, c def reduce_sum(input, dim=None, keep_dim=False, name=None): """ Computes the sum of tensor elements over the given dimension. Args: input (Variable): The input variable which is a Tensor or LoDTensor. dim (int|None): The dimension along which the sum is performed. If :attr:`None`, sum all elements of :attr:`input` and return a Tensor variable with a single element, otherwise must be in the range :math:`[-rank(input), rank(input))`. If :math:`dim < 0`, the dimension to reduce is :math:`rank + dim`. keep_dim (bool|False): Whether to reserve the reduced dimension in the output Tensor. The result tensor will have one fewer dimension than the :attr:`input` unless :attr:`keep_dim` is true. name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The reduced Tensor variable. Examples: .. code-block:: python # x is a Tensor variable with following elements: # [[0.2, 0.3, 0.5, 0.9] # [0.1, 0.2, 0.6, 0.7]] # Each example is followed by the correspending output tensor. fluid.layers.reduce_sum(x) # [3.5] fluid.layers.reduce_sum(x, dim=0) # [0.3, 0.5, 1.1, 1.6] fluid.layers.reduce_sum(x, dim=-1) # [1.9, 1.6] fluid.layers.reduce_sum(x, dim=1, keep_dim=True) # [[1.9], [1.6]] """ helper = LayerHelper('reduce_sum', **locals()) out = helper.create_tmp_variable(dtype=helper.input_dtype()) helper.append_op( type='reduce_sum', inputs={'X': input}, outputs={'Out': out}, attrs={ 'dim': dim if dim != None else 0, 'keep_dim': keep_dim, 'reduce_all': True if dim == None else False }) return out def reduce_mean(input, dim=None, keep_dim=False, name=None): """ Computes the mean of tensor elements over the given dimension. Args: input (Variable): The input variable which is a Tensor or LoDTensor. dim (int|None): The dimension along which the mean is computed. If :attr:`None`, compute the mean over all elements of :attr:`input` and return a Tensor variable with a single element, otherwise must be in the range :math:`[-rank(input), rank(input))`. If :math:`dim < 0`, the dimension to reduce is :math:`rank + dim`. keep_dim (bool): Whether to reserve the reduced dimension in the output Tensor. The result tensor will have one fewer dimension than the :attr:`input` unless :attr:`keep_dim` is true. name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The reduced Tensor variable. Examples: .. code-block:: python # x is a Tensor variable with following elements: # [[0.2, 0.3, 0.5, 0.9] # [0.1, 0.2, 0.6, 0.7]] # Each example is followed by the correspending output tensor. fluid.layers.reduce_mean(x) # [0.4375] fluid.layers.reduce_mean(x, dim=0) # [0.15, 0.25, 0.55, 0.8] fluid.layers.reduce_mean(x, dim=-1) # [0.475, 0.4] fluid.layers.reduce_mean(x, dim=1, keep_dim=True) # [[0.475], [0.4]] """ helper = LayerHelper('reduce_mean', **locals()) out = helper.create_tmp_variable(dtype=helper.input_dtype()) helper.append_op( type='reduce_mean', inputs={'X': input}, outputs={'Out': out}, attrs={ 'dim': dim if dim != None else 0, 'keep_dim': keep_dim, 'reduce_all': True if dim == None else False }) return out def reduce_max(input, dim=None, keep_dim=False, name=None): """ Computes the maximum of tensor elements over the given dimension. Args: input (Variable): The input variable which is a Tensor or LoDTensor. dim (int|None): The dimension along which the maximum is computed. If :attr:`None`, compute the maximum over all elements of :attr:`input` and return a Tensor variable with a single element, otherwise must be in the range :math:`[-rank(input), rank(input))`. If :math:`dim < 0`, the dimension to reduce is :math:`rank + dim`. keep_dim (bool): Whether to reserve the reduced dimension in the output Tensor. The result tensor will have one fewer dimension than the :attr:`input` unless :attr:`keep_dim` is true. name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The reduced Tensor variable. Examples: .. code-block:: python # x is a Tensor variable with following elements: # [[0.2, 0.3, 0.5, 0.9] # [0.1, 0.2, 0.6, 0.7]] # Each example is followed by the correspending output tensor. fluid.layers.reduce_max(x) # [0.9] fluid.layers.reduce_max(x, dim=0) # [0.2, 0.3, 0.6, 0.9] fluid.layers.reduce_max(x, dim=-1) # [0.9, 0.7] fluid.layers.reduce_max(x, dim=1, keep_dim=True) # [[0.9], [0.7]] """ helper = LayerHelper('reduce_max', **locals()) out = helper.create_tmp_variable(dtype=helper.input_dtype()) helper.append_op( type='reduce_max', inputs={'X': input}, outputs={'Out': out}, attrs={ 'dim': dim if dim != None else 0, 'keep_dim': keep_dim, 'reduce_all': True if dim == None else False }) return out def reduce_min(input, dim=None, keep_dim=False, name=None): """ Computes the minimum of tensor elements over the given dimension. Args: input (Variable): The input variable which is a Tensor or LoDTensor. dim (int|None): The dimension along which the minimum is computed. If :attr:`None`, compute the minimum over all elements of :attr:`input` and return a Tensor variable with a single element, otherwise must be in the range :math:`[-rank(input), rank(input))`. If :math:`dim < 0`, the dimension to reduce is :math:`rank + dim`. keep_dim (bool): Whether to reserve the reduced dimension in the output Tensor. The result tensor will have one fewer dimension than the :attr:`input` unless :attr:`keep_dim` is true. name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The reduced Tensor variable. Examples: .. code-block:: python # x is a Tensor variable with following elements: # [[0.2, 0.3, 0.5, 0.9] # [0.1, 0.2, 0.6, 0.7]] # Each example is followed by the correspending output tensor. fluid.layers.reduce_min(x) # [0.1] fluid.layers.reduce_min(x, dim=0) # [0.1, 0.2, 0.5, 0.7] fluid.layers.reduce_min(x, dim=-1) # [0.2, 0.1] fluid.layers.reduce_min(x, dim=1, keep_dim=True) # [[0.2], [0.1]] """ helper = LayerHelper('reduce_min', **locals()) out = helper.create_tmp_variable(dtype=helper.input_dtype()) helper.append_op( type='reduce_min', inputs={'X': input}, outputs={'Out': out}, attrs={ 'dim': dim if dim != None else 0, 'keep_dim': keep_dim, 'reduce_all': True if dim == None else False }) return out def reduce_prod(input, dim=None, keep_dim=False, name=None): """ Computes the product of tensor elements over the given dimension. Args: input (Variable): The input variable which is a Tensor or LoDTensor. dim (int|None): The dimension along which the product is performed. If :attr:`None`, multipy all elements of :attr:`input` and return a Tensor variable with a single element, otherwise must be in the range :math:`[-rank(input), rank(input))`. If :math:`dim < 0`, the dimension to reduce is :math:`rank + dim`. keep_dim (bool|False): Whether to reserve the reduced dimension in the output Tensor. The result tensor will have one fewer dimension than the :attr:`input` unless :attr:`keep_dim` is true. name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The reduced Tensor variable. Examples: .. code-block:: python # x is a Tensor variable with following elements: # [[0.2, 0.3, 0.5, 0.9] # [0.1, 0.2, 0.6, 0.7]] # Each example is followed by the correspending output tensor. fluid.layers.reduce_prod(x) # [0.0002268] fluid.layers.reduce_prod(x, dim=0) # [0.02, 0.06, 0.3, 0.63] fluid.layers.reduce_prod(x, dim=-1) # [0.027, 0.0084] fluid.layers.reduce_prod(x, dim=1, keep_dim=True) # [[0.027], [0.0084]] """ helper = LayerHelper('reduce_prod', **locals()) out = helper.create_tmp_variable(dtype=helper.input_dtype()) helper.append_op( type='reduce_prod', inputs={'X': input}, outputs={'Out': out}, attrs={ 'dim': dim if dim != None else 0, 'keep_dim': keep_dim, 'reduce_all': True if dim == None else False }) return out def split(input, num_or_sections, dim=-1, name=None): """ Split the input tensor into multiple sub-tensors. Args: input (Variable): The input variable which is a Tensor or LoDTensor. num_or_sections (int|list): If :attr:`num_or_sections` is an integer, then the integer indicates the number of equal sized sub-tensors that the tensor will be divided into. If :attr:`num_or_sections` is a list of integers, the length of list indicates the number of sub-tensors and the integers indicate the sizes of sub-tensors' :attr:`dim` dimension orderly. dim (int): The dimension along which to split. If :math:`dim < 0`, the dimension to split along is :math:`rank(input) + dim`. name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: List: The list of segmented tensor variables. Examples: .. code-block:: python # x is a Tensor variable with shape [3, 9, 5]: x0, x1, x2 = fluid.layers.split(x, num_or_sections=3, dim=1) x0.shape # [3, 3, 5] x1.shape # [3, 3, 5] x2.shape # [3, 3, 5] x0, x1, x2 = fluid.layers.split(x, num_or_sections=[2, 3, 4], dim=1) x0.shape # [3, 2, 5] x1.shape # [3, 3, 5] x2.shape # [3, 4, 5] """ helper = LayerHelper('split', **locals()) input_shape = input.shape dim = (len(input_shape) + dim) if dim < 0 else dim if isinstance(num_or_sections, int): assert num_or_sections > 1, 'num_or_sections must be more than 1.' num = num_or_sections else: assert len(num_or_sections) < input_shape[ dim], 'len(num_or_sections) must not be more than input.shape[dim].' num = len(num_or_sections) outs = [ helper.create_tmp_variable(dtype=helper.input_dtype()) for i in range(num) ] helper.append_op( type='split', inputs={'X': input}, outputs={'Out': outs}, attrs={ 'num': num_or_sections if isinstance(num_or_sections, int) else 0, 'sections': num_or_sections if isinstance(num_or_sections, list) else [], 'axis': dim }) return outs def l2_normalize(x, axis, epsilon=1e-12, name=None): """ **L2 normalize Layer** The l2 normalize layer normalizes `x` along dimension `axis` using an L2 norm. For a 1-D tensor (`dim` is fixed to 0), this layer computes output = x / sqrt(max(sum(x**2), epsilon)) For `x` with more dimensions, this layer independently normalizes each 1-D slice along dimension `axis`. Args: x(Variable|list): The input tensor to l2_normalize layer. axis(int): Dimension along which to normalize the input. epsilon(float): A lower bound value for `x`'s l2 norm. sqrt(epsilon) will be used as the divisor if the l2 norm of `x` is less than sqrt(epsilon). name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The output tensor variable. Examples: .. code-block:: python data = fluid.layers.data(name="data", shape=(3, 17, 13), dtype="float32") normed = fluid.layers.l2_normalize(x=data, axis=1) """ if len(x.shape) == 1: axis = 0 helper = LayerHelper("l2_normalize", **locals()) square = helper.create_tmp_variable(dtype=x.dtype) helper.append_op(type="square", inputs={"X": x}, outputs={"Out": square}) reduced_sum = helper.create_tmp_variable(dtype=x.dtype) helper.append_op( type="reduce_sum", inputs={"X": square}, outputs={"Out": reduced_sum}, attrs={ "dim": 1 if axis is None else axis, "keep_dim": True, "reduce_all": False }) # TODO(caoying) A lower bound value epsilon for the norm is needed to # imporve the numeric stability of reciprocal. This requires a maximum_op. rsquare = helper.create_tmp_variable(dtype=x.dtype) helper.append_op( type="reciprocal", inputs={"X": reduced_sum}, outputs={"Out": rsquare}) # TODO(caoying) the current elementwise_mul operator does not support a # general broadcast rule which broadcasts input(Y) to have the same # dimension with Input(X) starting from a specified dimension. So this # exanpsion is requred. Once a general broadcast rule is spported, this # expanding canbe removed. rsquare_expanded = helper.create_tmp_variable(dtype=x.dtype) expand_times = [1] * len(x.shape) expand_times[axis] = int(x.shape[axis]) helper.append_op( type="expand", inputs={"X": rsquare}, outputs={"Out": rsquare_expanded}, attrs={"expand_times": expand_times}) out = helper.create_tmp_variable(dtype=x.dtype) helper.append_op( type="elementwise_mul", inputs={"X": x, "Y": rsquare_expanded}, outputs={"Out": out}) return out def matmul(x, y, transpose_x=False, transpose_y=False, name=None): """ Applies matrix multiplication to two tensors. Currently, the input tensors' rank can be any, but when the rank of any inputs is bigger than 3, this two inputs' rank should be equal. The actual behavior depends on the shapes of :math:`x`, :math:`y` and the flag values of :attr:`transpose_x`, :attr:`transpose_y`. Specifically: - If a transpose flag is specified, the last two dimensions of the tensor are transposed. If the tensor is rank-1 of shape :math:`[D]`, then for :math:`x` it is treated as :math:`[1, D]` in nontransposed form and as :math:`[D, 1]` in transposed form, whereas for :math:`y` it is the opposite: It is treated as :math:`[D, 1]` in nontransposed form and as :math:`[1, D]` in transposed form. - After transpose, the two tensors are 2-D or n-D and matrix multiplication performs in the following way. - If both are 2-D, they are multiplied like conventional matrices. - If either is n-D, it is treated as a stack of matrices residing in the last two dimensions and a batched matrix multiply supporting broadcast applies on the two tensors. Also note that if the raw tensor :math:`x` or :math:`y` is rank-1 and nontransposed, the prepended or appended dimension :math:`1` will be removed after matrix multiplication. Args: x (Variable): The input variable which is a Tensor or LoDTensor. y (Variable): The input variable which is a Tensor or LoDTensor. transpose_x (bool): Whether to transpose :math:`x` before multiplication. transpose_y (bool): Whether to transpose :math:`y` before multiplication. name(str|None): A name for this layer(optional). If set None, the layer will be named automatically. Returns: Variable: The product Tensor variable. Examples: .. code-block:: python # Examples to clarify shapes of the inputs and output # x: [B, ..., M, K], y: [B, ..., K, N] fluid.layers.matmul(x, y) # out: [B, ..., M, N] # x: [B, M, K], y: [B, K, N] fluid.layers.matmul(x, y) # out: [B, M, N] # x: [B, M, K], y: [K, N] fluid.layers.matmul(x, y) # out: [B, M, N] # x: [M, K], y: [K, N] fluid.layers.matmul(x, y) # out: [M, N] # x: [B, M, K], y: [K] fluid.layers.matmul(x, y) # out: [B, M] # x: [K], y: [K] fluid.layers.matmul(x, y) # out: [1] # x: [M], y: [N] fluid.layers.matmul(x, y, True, True) # out: [M, N] """ def __check_input(x, y): if len(y.shape) > len(x.shape): raise ValueError( "Invalid inputs for matmul. " "x's rank should be always greater than or equal to y'rank.") x_shape = list(x.shape) y_shape = list(y.shape) if len(x_shape) == 1: x_shape = [1] + x_shape if len(y_shape) == 1: y_shape = y_shape + [1] # check the inner 2 dimensions if transpose_x: x_shape[-2], x_shape[-1] = x_shape[-1], x_shape[-2] if transpose_y: y_shape[-2], y_shape[-1] = y_shape[-1], y_shape[-2] if x_shape[-1] != y_shape[-2]: raise ValueError("Invalid inputs for matmul.") if len(y_shape) > 2: for i, dim_x in enumerate(x_shape[:-2]): if dim_x != y_shape[i]: raise ValueError("Invalid inputs for matmul.") __check_input(x, y) helper = LayerHelper('matmul', **locals()) out = helper.create_tmp_variable(dtype=x.dtype) helper.append_op( type='matmul', inputs={'X': x, 'Y': y}, outputs={'Out': out}, attrs={'transpose_X': transpose_x, 'transpose_Y': transpose_y}) return out def edit_distance(input, label, normalized=True, ignored_tokens=None, name=None): """ EditDistance operator computes the edit distances between a batch of hypothesis strings and their references. Edit distance, also called Levenshtein distance, measures how dissimilar two strings are by counting the minimum number of operations to transform one string into anthor. Here the operations include insertion, deletion, and substitution. For example, given hypothesis string A = "kitten" and reference B = "sitting", the edit distance is 3 for A will be transformed into B at least after two substitutions and one insertion: "kitten" -> "sitten" -> "sittin" -> "sitting" Input(Hyps) is a LoDTensor consisting of all the hypothesis strings with the total number denoted by `batch_size`, and the separation is specified by the LoD information. And the `batch_size` reference strings are arranged in order in the same way in the LoDTensor Input(Refs). Output(Out) contains the `batch_size` results and each stands for the edit distance for a pair of strings respectively. If Attr(normalized) is true, the edit distance will be divided by the length of reference string. Args: input(Variable): The indices for hypothesis strings. label(Variable): The indices for reference strings. normalized(bool): Indicated whether to normalize the edit distance by the length of reference string. ignored_tokens(list of int): Tokens that should be removed before calculating edit distance. Returns: Variable: sequence-to-sequence edit distance in shape [batch_size, 1]. Examples: .. code-block:: python x = fluid.layers.data(name='x', shape=[8], dtype='float32') y = fluid.layers.data(name='y', shape=[7], dtype='float32') cost = fluid.layers.edit_distance(input=x,label=y) """ helper = LayerHelper("edit_distance", **locals()) # remove some tokens from input and labels if ignored_tokens is not None and len(ignored_tokens) > 0: erased_input = helper.create_tmp_variable(dtype="int64") erased_label = helper.create_tmp_variable(dtype="int64") helper.append_op( type="sequence_erase", inputs={"X": [input]}, outputs={"Out": [erased_input]}, attrs={"tokens": ignored_tokens}) input = erased_input helper.append_op( type="sequence_erase", inputs={"X": [label]}, outputs={"Out": [erase_label]}, attrs={"tokens": ignored_tokens}) label = erased_label # edit distance op edit_distance_out = helper.create_tmp_variable(dtype="int64") sequence_num = helper.create_tmp_variable(dtype="int64") helper.append_op( type="edit_distance", inputs={"Hyps": [input], "Refs": [label]}, outputs={"Out": [edit_distance_out], "SequenceNum": [sequence_num]}, attrs={"normalized": normalized}) return edit_distance_out, sequence_num def ctc_greedy_decoder(input, blank, name=None): """ This op is used to decode sequences by greedy policy by below steps: 1. Get the indexes of max value for each row in input. a.k.a. numpy.argmax(input, axis=0). 2. For each sequence in result of step1, merge repeated tokens between two blanks and delete all blanks. A simple example as below: .. code-block:: text Given: input.data = [[0.6, 0.1, 0.3, 0.1], [0.3, 0.2, 0.4, 0.1], [0.1, 0.5, 0.1, 0.3], [0.5, 0.1, 0.3, 0.1], [0.5, 0.1, 0.3, 0.1], [0.2, 0.2, 0.2, 0.4], [0.2, 0.2, 0.1, 0.5], [0.5, 0.1, 0.3, 0.1]] input.lod = [[0, 4, 8]] Then: output.data = [[2], [1], [3]] output.lod = [[0, 2, 3]] Args: input(Variable): (LoDTensor), the probabilities of variable-length sequences, which is a 2-D Tensor with LoD information. It's shape is [Lp, num_classes + 1], where Lp is the sum of all input sequences' length and num_classes is the true number of classes. (not including the blank label). blank(int): the blank label index of Connectionist Temporal Classification (CTC) loss, which is in thehalf-opened interval [0, num_classes + 1). Returns: Variable: CTC greedy decode result. If all the sequences in result were empty, the result LoDTensor will be [-1] with LoD [[0]] and dims [1, 1]. Examples: .. code-block:: python x = fluid.layers.data(name='x', shape=[8], dtype='float32') cost = fluid.layers.ctc_greedy_decoder(input=x, blank=0) """ helper = LayerHelper("ctc_greedy_decoder", **locals()) # top 1 op topk_out = helper.create_tmp_variable(dtype=input.dtype) topk_indices = helper.create_tmp_variable(dtype="int64") helper.append_op( type="top_k", inputs={"X": [input]}, outputs={"Out": [topk_out], "Indices": [topk_indices]}, attrs={"k": 1}) # ctc align op ctc_out = helper.create_tmp_variable(dtype="int64") helper.append_op( type="ctc_align", inputs={"Input": [topk_indices]}, outputs={"Output": [ctc_out]}, attrs={"merge_repeated": True, "blank": blank}) return ctc_out def warpctc(input, label, blank=0, norm_by_times=False): """ An operator integrating the open source Warp-CTC library (https://github.com/baidu-research/warp-ctc) to compute Connectionist Temporal Classification (CTC) loss. It can be aliased as softmax with CTC, since a native softmax activation is interated to the Warp-CTC library, to to normlize values for each row of the input tensor. Args: input(Variable): (LodTensor, default: LoDTensor), the unscaled probabilities of variable-length sequences, which is a 2-D Tensor with LoD information. It's shape is [Lp, num_classes + 1], where Lp is the sum of all input sequences' length and num_classes is the true number of classes. (not including the blank label). label(Variable): (LodTensor, default: LoDTensor), the ground truth of variable-length sequence, which is a 2-D Tensor with LoD information. It is of the shape [Lg, 1], where Lg is th sum of all labels' length. blank: (int, default: 0), the blank label index of Connectionist Temporal Classification (CTC) loss, which is in the half-opened interval [0, num_classes + 1). norm_by_times: (bool, default: false), whether to normalize the gradients by the number of time-step, which is also the sequence's length. There is no need to normalize the gradients if warpctc layer was follewed by a mean_op. Returns: Variable: The Connectionist Temporal Classification (CTC) loss, which is a 2-D Tensor of the shape [batch_size, 1]. Examples: .. code-block:: python y = layers.data( name='y', shape=[11, 8], dtype='float32', lod_level=1) y_predict = layers.data( name='y_predict', shape=[11, 1], dtype='float32') cost = layers.warpctc(input=y_predict, label=y) """ helper = LayerHelper('warpctc', **locals()) loss_out = helper.create_tmp_variable(dtype=input.dtype) grad_out = helper.create_tmp_variable(dtype=input.dtype) helper.append_op( type='warpctc', inputs={'Logits': [input], 'Label': [label]}, outputs={'WarpCTCGrad': [grad_out], 'Loss': [loss_out]}, attrs={'blank': blank, 'norm_by_times': norm_by_times}) return loss_out def sequence_reshape(input, new_dim): """ **Sequence Reshape Layer** This layer will rearrange the input sequences. The new dimension is set by user. Length of each sequence is computed according to original length, original dimension and new dimension. The following example will help to illustrate the function of this layer: .. code-block:: text x is a LoDTensor: x.lod = [[0, 2, 6]] x.data = [[1, 2], [3, 4], [5, 6], [7, 8], [9, 10], [11, 12]] x.dims = [6, 2] set new_dim = 4 then out is a LoDTensor: out.lod = [[0, 1, 3]] out.data = [[1, 2, 3, 4], [5, 6, 7, 8], [9, 10, 11, 12]] out.dims = [3, 4] Currently, only 1-level LoDTensor is supported and please make sure (original length * original dimension) can be divided by new dimension with no remainder for each sequence. Args: input (Variable): (LodTensor, default: LoDTensor), a 2-D LoDTensor with shape being [N, M] where M for dimension. new_dim (int): New dimension which the input LoDTensor is reshaped to. Returns: Variable: Reshaped LoDTensor according to new dimension. Examples: .. code-block:: python x = fluid.layers.data(name='x', shape=[5, 20], dtype='float32', lod_level=1) x_reshaped = layers.sequence_reshape(input=x, new_dim=10) """ helper = LayerHelper('sequence_reshape', **locals()) out = helper.create_tmp_variable(helper.input_dtype()) helper.append_op( type='sequence_reshape', inputs={'X': [input]}, outputs={'Out': [out]}, attrs={'new_dim': new_dim}) return out @autodoc() def nce(input, label, num_total_classes, sample_weight=None, param_attr=None, bias_attr=None, num_neg_samples=None): helper = LayerHelper('nce', **locals()) assert isinstance(input, Variable) dim = input.shape[1] assert isinstance(label, Variable) num_true_class = label.shape[1] w = helper.create_parameter( attr=helper.param_attr, shape=[num_total_classes, dim], is_bias=False, dtype=input.dtype) b = helper.create_parameter( attr=helper.bias_attr, shape=[num_total_classes, 1], is_bias=True, dtype=input.dtype) cost = helper.create_tmp_variable(dtype=input.dtype) sample_logits = helper.create_tmp_variable(dtype=input.dtype) sample_labels = helper.create_tmp_variable(dtype=label.dtype) if num_neg_samples is None: num_neg_samples = 10 else: num_neg_samples = int(num_neg_samples) attrs = { 'num_total_classes': int(num_total_classes), 'num_neg_samples': num_neg_samples } helper.append_op( type='nce', inputs={ 'Input': input, 'Label': label, 'Weight': w, 'Bias': b, 'SampleWeight': sample_weight if sample_weight is not None else [] }, outputs={ 'Cost': cost, 'SampleLogits': sample_logits, 'SampleLabels': sample_labels }, attrs=attrs) return cost / (num_neg_samples + 1) def transpose(x, perm, name=None): """ **transpose Layer** Permute the dimensions of `input` according to `perm`. The `i`-th dimension of the returned tensor will correspond to the perm[i]-th dimension of `input`. Args: input (Variable): (Tensor), A Tensor. perm (list): A permutation of the dimensions of `input`. Returns: Variable: A transposed Tensor. Examples: .. code-block:: python x = fluid.layers.data(name='x', shape=[5, 10, 15], dtype='float32') x_transposed = layers.transpose(x, perm=[1, 0, 2]) """ if len(perm) != len(x.shape): raise ValueError( "Input(perm) is the permutation of dimensions of Input(input). " "It's length shoud be equal to Input(input)'s rank.") for idx, dim in enumerate(perm): if dim >= len(x.shape): raise ValueError( "Each element in perm should be less than x's rank. " "%d-th element in perm is %d which accesses x's rank %d." % (idx, perm[idx], len(x.shape))) helper = LayerHelper('transpose', **locals()) out = helper.create_tmp_variable(x.dtype) helper.append_op( type='transpose', inputs={'X': [x]}, outputs={'Out': [out]}, attrs={'axis': perm}) return out def im2sequence(input, filter_size=1, stride=1, padding=0, name=None): """ Extracts image patches from the input tensor to form a tensor of shape {input.batch_size * output_height * output_width, filter_size_H * filter_size_W * input.channels} which is similar with im2col. This op use filter / kernel to scan images and convert these images to sequences. After expanding, the number of time step are output_height * output_width for an image, in which output_height and output_width are calculated by below equation: .. math:: output\_size = 1 + \ (2 * padding + img\_size - block\_size + stride - 1) / stride And the dimension of each time step is block_y * block_x * input.channels. Args: input (Variable): The input should be a tensor in NCHW format. filter_size(int|tuple|None): The filter size. If filter_size is a tuple, it must contain two integers, (filter_size_H, filter_size_W). Otherwise, the filter will be a square. stride(int|tuple): The stride size. If stride is a tuple, it must contain two integers, (stride_H, stride_W). Otherwise, the stride_H = stride_W = stride. Default: stride = 1. padding(int|tuple): The padding size. If padding is a tuple, it can contain two integers like (padding_H, padding_W) which means padding_up = padding_down = padding_H and padding_left = padding_right = padding_W. Or it can use (padding_up, padding_left, padding_down, padding_right) to indicate paddings of four direction. Otherwise, a scalar padding means padding_up = padding_down = padding_left = padding_right = padding Default: padding = 0. name (int): The name of this layer. It is optional. Returns: output: The output is a LoDTensor with shape {input.batch_size * output_height * output_width, filter_size_H * filter_size_W * input.channels}. If we regard output as a matrix, each row of this matrix is a step of a sequence. Examples: As an example: .. code-block:: text Given: x = [[[[ 6. 2. 1.] [ 8. 3. 5.] [ 0. 2. 6.]] [[ 2. 4. 4.] [ 6. 3. 0.] [ 6. 4. 7.]]] [[[ 6. 7. 1.] [ 5. 7. 9.] [ 2. 4. 8.]] [[ 1. 2. 1.] [ 1. 3. 5.] [ 9. 0. 8.]]]] x.dims = {2, 2, 3, 3} And: filter = [2, 2] stride = [1, 1] padding = [0, 0] Then: output.data = [[ 6. 2. 8. 3. 2. 4. 6. 3.] [ 2. 1. 3. 5. 4. 4. 3. 0.] [ 8. 3. 0. 2. 6. 3. 6. 4.] [ 3. 5. 2. 6. 3. 0. 4. 7.] [ 6. 7. 5. 7. 1. 2. 1. 3.] [ 7. 1. 7. 9. 2. 1. 3. 5.] [ 5. 7. 2. 4. 1. 3. 9. 0.] [ 7. 9. 4. 8. 3. 5. 0. 8.]] output.dims = {8, 9} output.lod = [[0, 4, 8]] The simple usage is: .. code-block:: python output = fluid.layers.im2sequence( input=layer, stride=[1, 1], filter_size=[2, 2]) """ if isinstance(filter_size, int): filter_size = [filter_size, filter_size] if isinstance(stride, int): stride = [stride, stride] if isinstance(padding, int): padding = [padding, padding] if len(padding) == 2: padding.append(padding[0]) padding.append(padding[1]) helper = LayerHelper('im2sequence', **locals()) out = helper.create_tmp_variable(dtype=helper.input_dtype()) helper.append_op( type='im2sequence', inputs={'X': input}, outputs={'Out': out}, attrs={ 'kernels': filter_size, 'strides': stride, 'paddings': padding, }) return out def row_conv(input, future_context_size, param_attr=None, act=None): """Row Conv Operator. This layer will apply lookahead convolution to **input**. The input variable should be a 2D LoDTensor with shape [T, D]. Parameters with shape [future_context_size + 1, D] will be created. The math equation of row convolution is as follows: .. math:: Out_{i} = \sum_{j = i} ^ {i + \\tau} X_{j} \odot W_{i - j} In the above equation: * :math:`Out_{i}`: The i-th row of output variable with shape [1, D]. * :math:`\\tau`: Future context size. * :math:`X_{j}`: The j-th row of input variable with shape [1, D]. * :math:`W_{i-j}`: The (i-j)-th row of parameters with shape [1, D]. More details about row_conv please refer to the paper \ (http://www.cs.cmu.edu/~dyogatam/papers/wang+etal.iclrworkshop2016.pdf) and the design document \ (https://github.com/PaddlePaddle/Paddle/issues/2228#issuecomment-303903645). Args: input (Variable): Input variable, a 2D LoDTensor with shape [T, D]. future_context_size (int): Future context size. Please note, the shape of convolution kernel is [future_context_size + 1, D]. param_attr (ParamAttr): Attributes of parameters, including name, initializer etc. act (str): Non-linear activation to be applied to output variable. Returns: Variable: The output tensor with same shape as input tensor. Examples: .. code-block:: python x = fluid.layers.data(name='x', shape=[16], dtype='float32', lod_level=1) out = fluid.layers.row_conv(input=x, future_context_size=2) """ helper = LayerHelper('row_conv', **locals()) dtype = helper.input_dtype() filter_shape = [future_context_size + 1, input.shape[1]] filter_param = helper.create_parameter( attr=helper.param_attr, shape=filter_shape, dtype=dtype) out = helper.create_tmp_variable(dtype) helper.append_op( type='row_conv', inputs={'X': [input], 'Filter': [filter_param]}, outputs={'Out': [out]}) return helper.append_activation(out) def multiplex(inputs, index): """ **Multiplex Layer** Referring to the given index variable, this layer selects rows from the input variables to construct a multiplex variable. Assuming that there are :math:`m` input variables and :math:`I_i` represents the i-th input variable and :math:`i` is in [0, :math:`m`). All input variables are tensors with same shape [:math:`d_0`, :math:`d_1`, ..., :math:`d_R`]. Please note that rank of the input tensor should be at least 2. Each input variable will be treated as a 2-D matrix with shape [:math:`M`, :math:`N`] where :math:`M` for :math:`d_0` and :math:`N` for :math:`d_1` * :math:`d_2` * ... * :math:`d_R`. Let :math:`I_i[j]` be the j-th row of the i-th input variable. The given index variable should be a 2-D tensor with shape [:math:`M`, 1]. Let `ID[i]` be the i-th index value of the index variable. Then the output variable will be a tensor with shape [:math:`d_0`, :math:`d_1`, ..., :math:`d_R`]. If we treat the output tensor as a 2-D matrix with shape [:math:`M`, :math:`N`] and let :math:`O[i]` be the i-th row of the matrix, then `O[i]` is equal to :math:`I_{ID[i]}[i]`. Args: inputs (list): A list of variables to gather from. All variables have the same shape and the rank is at least 2. index (Variable): Tensor, index variable which is a 2-D tensor with shape [M, 1] where M is the batch size. Returns: Variable: Multiplex variable gathered from input variables. Examples: .. code-block:: python x1 = fluid.layers.data(name='x1', shape=[4], dtype='float32') x2 = fluid.layers.data(name='x2', shape=[4], dtype='float32') index = fluid.layers.data(name='index', shape=[1], dtype='int32') out = fluid.layers.multiplex(inputs=[x1, x2], index=index) """ helper = LayerHelper('multiplex', **locals()) if not isinstance(inputs, list) and len(inputs) < 2: raise ValueError("inputs should be a list object and contains at least " "2 elements.") out = helper.create_tmp_variable(inputs[0].dtype) helper.append_op( type='multiplex', inputs={'X': inputs, 'Ids': index}, outputs={'Out': [out]}) return out def softmax_with_cross_entropy(logits, label, soft_label=False): """ **Softmax With Cross Entropy Operator.** Cross entropy loss with softmax is used as the output layer extensively. This operator computes the softmax normalized values for each row of the input tensor, after which cross-entropy loss is computed. This provides a more numerically stable gradient. Because this operator performs a softmax on logits internally, it expects unscaled logits. This operator should not be used with the output of softmax operator since that would produce incorrect results. When the attribute soft_label is set false, this operators expects mutually exclusive hard labels, each sample in a batch is in exactly one class with a probability of 1.0. Each sample in the batch will have a single label. The equation is as follows: 1) Hard label (one-hot label, so every sample has exactly one class) .. math:: loss_j = -\\text{logit}_{label_j} + \\log\\left(\\sum_{i=0}^{K}\\exp(\\text{logit}_i)\\right), j = 1,..., K 2) Soft label (each sample can have a distribution over all classes) .. math:: loss_j = -\\sum_{i=0}^{K}\\text{label}_i \\left(\\text{logit}_i - \\log\\left(\\sum_{i=0}^{K} \\exp(\\text{logit}_i)\\right)\\right), j = 1,...,K Args: logits (Variable): The unscaled log probabilities, which is a 2-D tensor with shape [N x K]. N is the batch_size, and K is the class number. label (Variable): The ground truth which is a 2-D tensor. If soft_label is set to false, Label is a Tensor with shape [N x 1]. If soft_label is set to true, Label is a Tensor with soft_label (bool): A flag to indicate whether to interpretate the given labels as soft labels. By default, `soft_label` is set to False. Returns: Variable: The cross entropy loss is a 2-D tensor with shape [N x 1]. Examples: .. code-block:: python data = fluid.layers.data(name='data', shape=[128], dtype='float32') label = fluid.layers.data(name='label', shape=[1], dtype='int64') fc = fluid.layers.fc(input=data, size=100) out = fluid.layers.softmax_with_cross_entropy(logits=fc, label=label) """ helper = LayerHelper('softmax_with_cross_entropy', **locals()) softmax = helper.create_tmp_variable(dtype=logits.dtype) loss = helper.create_tmp_variable(dtype=logits.dtype) helper.append_op( type='softmax_with_cross_entropy', inputs={'Logits': logits, 'Label': label}, outputs={'Softmax': softmax, 'Loss': loss}, attrs={'soft_label': soft_label}) return loss def smooth_l1(x, y, inside_weight=None, outside_weight=None, sigma=None): """ **Smooth L1 Loss Operator. ** This operator computes the smooth l1 loss for X and Y. The operator takes the first dimension of X and Y as batch size. For each instance, it computes the smooth l1 loss element by element first and then sums all the losses. So the shape of Out is [batch_size, 1]. Args: x (Variable): A tensor with rank at least 2. The input value of smooth l1 loss op with shape [batch_size, dim1, ..., dimN]. y (Variable): A tensor with rank at least 2. The target value of smooth l1 loss op with same shape as x. inside_weight (Variable|None): A tensor with rank at least 2. This input is optional and should have same shape with x. If provided, the result of (x - y) will be multiplied by this tensor element by element. outside_weight (Variable|None): A tensor with rank at least 2. This input is optional and should have same shape with x. If provided, the out smooth l1 loss will be multiplied by this tensor element by element. sigma (float|None): Hyper parameter of smooth l1 loss op. A float scalar with default value 1.0. Returns: Variable: A tensor with rank be 2. The output smooth l1 loss with shape [batch_size, 1]. Examples: .. code-block:: python data = fluid.layers.data(name='data', shape=[128], dtype='float32') label = fluid.layers.data(name='label', shape=[100], dtype='int64') fc = fluid.layers.fc(input=data, size=100) out = fluid.layers.smooth_l1(x=fc, y=label) """ helper = LayerHelper('smooth_l1_loss', **locals()) diff = helper.create_tmp_variable(dtype=x.dtype) loss = helper.create_tmp_variable(dtype=x.dtype) helper.append_op( type='smooth_l1_loss', inputs={ 'X': x, 'Y': y, 'InsideWeight': inside_weight, 'OutsideWeight': outside_weight }, outputs={'Diff': diff, 'Out': loss}, attrs={'sigma': sigma}) return loss def one_hot(input, depth): """ One Hot Operator. This operator creates the one-hot representations for input index values. The following example will help to explain the function of this operator. Args: input(variable): A Tensor/LodTensor of indices, last dimension must be 1. depth(scalar): an interger defining the depth of the one hot dimension. Returns: The one-hot tensor or LodTensor, same as input. Examples: X is a LoDTensor: X.lod = [[0, 1, 4]] X.shape = [4, 1] X.data = [[1], [1], [3], [0]] set depth = 4 Out is a LoDTensor: Out.lod = [[0, 1, 4]] Out.shape = [4, 4] Out.data = [[0., 1., 0., 0.], [0., 1., 0., 0.], [0., 0., 0., 1.], [1., 0., 0., 0.]] """ helper = LayerHelper("one_hot", **locals()) one_hot_out = helper.create_tmp_variable(dtype='float32') helper.append_op( type="one_hot", inputs={'X': input}, attrs={'depth': depth}, outputs={'Out': one_hot_out}) return one_hot_out def autoincreased_step_counter(counter_name=None, begin=1, step=1): """ NOTE: The counter will be automatically increased by 1 every mini-batch Return the run counter of the main program, which is started with 1. Args: counter_name(str): The counter name, default is '@STEP_COUNTER@'. begin(int): The first value of this counter. step(int): The increment step between each execution. Returns(Variable): The global run counter. """ helper = LayerHelper('global_step_counter') if counter_name is None: counter_name = '@STEP_COUNTER@' counter, is_new_var = helper.create_or_get_global_variable( name=counter_name, dtype='int64', shape=[1], persistable=True) if is_new_var: helper.set_variable_initializer( counter, initializer=Constant(value=begin - 1)) helper.main_program.global_block().prepend_op( type='increment', inputs={'X': [counter]}, outputs={'Out': [counter]}, attrs={'step': float(step)}) counter.stop_gradient = True return counter def lod_reset(x, y=None, target_lod=None): """ LoD Reset Operator. Set LoD of **x** to a new one specified by **y** or **target_lod**. When **y** provided, **y.lod** would be considered as target LoD first, otherwise **y.data** would be considered as target LoD. If **y** is not provided, target LoD should be specified by **target_lod**. If target LoD is specified by **Y.data** or **target_lod**, only one level LoD is supported. .. code-block:: text * Example 1: Given a 1-level LoDTensor x: x.lod = [[ 0, 2, 5 6 ]] x.data = [[1.0], [2.0], [3.0], [4.0], [5.0], [6.0]] x.dims = [6, 1] target_lod: [0, 4, 6] then we get a 1-level LoDTensor: out.lod = [[ 0, 4, 6 ]] out.data = [[1.0], [2.0], [3.0], [4.0], [5.0], [6.0]] out.dims = [6, 1] * Example 2: Given a 1-level LoDTensor x: x.lod = [[ 0, 2, 5 6 ]] x.data = [[1.0], [2.0], [3.0], [4.0], [5.0], [6.0]] x.dims = [6, 1] y is a Tensor: y.data = [[0, 2, 6]] y.dims = [1, 3] then we get a 1-level LoDTensor: out.lod = [[ 0, 2, 6 ]] out.data = [[1.0], [2.0], [3.0], [4.0], [5.0], [6.0]] out.dims = [6, 1] * Example 3: Given a 1-level LoDTensor x: x.lod = [[ 0, 2, 5 6 ]] x.data = [[1.0], [2.0], [3.0], [4.0], [5.0], [6.0]] x.dims = [6, 1] y is a 2-level LoDTensor: y.lod = [[0, 2, 4], [0, 2, 5, 6]] y.data = [[1.1], [2.1], [3.1], [4.1], [5.1], [6.1]] y.dims = [6, 1] then we get a 2-level LoDTensor: out.lod = [[0, 2, 4], [0, 2, 5, 6]] out.data = [[1.0], [2.0], [3.0], [4.0], [5.0], [6.0]] out.dims = [6, 1] Args: x (Variable): Input variable which could be a Tensor or LodTensor. y (Variable|None): If provided, output's LoD would be derived from y. target_lod (list|tuple|None): One level LoD which should be considered as target LoD when y not provided. Returns: Variable: Output variable with LoD specified by this operator. Raises: ValueError: If y and target_lod are both None. Examples: .. code-block:: python x = layers.data(name='x', shape=[10]) y = layers.data(name='y', shape=[10, 20], lod_level=2) out = layers.lod_reset(x=x, y=y) """ helper = LayerHelper("lod_reset", **locals()) out = helper.create_tmp_variable(dtype=x.dtype) if y is not None: helper.append_op( type="lod_reset", inputs={'X': x, 'Y': y}, outputs={'Out': out}) elif target_lod is not None: helper.append_op( type="lod_reset", inputs={'X': x}, attrs={'target_lod': target_lod}, outputs={'Out': out}) else: raise ValueError("y and target_lod should not be both None.") return out def lrn(input, n=5, k=1.0, alpha=1e-4, beta=0.75, name=None): """ Local Response Normalization Layer. This layer performs a type of "lateral inhibition" by normalizing over local input regions. The formula is as follows: .. math:: Output(i, x, y) = Input(i, x, y) / \left( k + \alpha \sum\limits^{\min(C, c + n/2)}_{j = \max(0, c - n/2)} (Input(j, x, y))^2 \right)^{\beta} In the above equation: * :math:`n`: The number of channels to sum over. * :math:`k`: The offset (avoid being divided by 0). * :math:`alpha`: The scaling parameter. * :math:`beta`: The exponent parameter. Refer to `ImageNet Classification with Deep Convolutional Neural Networks `_ Args: input (Variable): The input tensor of this layer, and the dimension of input tensor must be 4. n (int, default 5): The number of channels to sum over. k (float, default 1.0): An offset (usually positive to avoid dividing by 0). alpha (float, default 1e-4): The scaling parameter. beta (float, default 0.75): The exponent. name (str, default None): A name for this operation. Raises: ValueError: If rank of the input tensor is not 4. Returns: A tensor variable storing the transformation result. Examples: .. code-block:: python data = fluid.layers.data(name="data", shape=[3, 112, 112], dtype="float32") lrn = fluid.layers.lrn(input=data) """ helper = LayerHelper('lrn', **locals()) dtype = helper.input_dtype() input_shape = input.shape dims = len(input_shape) if dims != 4: raise ValueError( "dims of input must be 4(not %d), and it's order must be NCHW" % (dims)) mid_out = helper.create_tmp_variable(dtype=dtype, stop_gradient=True) lrn_out = helper.create_tmp_variable(dtype) helper.append_op( type="lrn", inputs={"X": input}, outputs={ "Out": lrn_out, "MidOut": mid_out, }, attrs={"n": n, "k": k, "alpha": alpha, "beta": beta}) return lrn_out