From 0fbfd2dc7024badf2bbfc3ebc23bf13c50dca56a Mon Sep 17 00:00:00 2001 From: Yibing Liu Date: Sun, 28 Jan 2018 20:03:10 -0800 Subject: [PATCH] Simplify the symbol description --- python/paddle/v2/fluid/layers/nn.py | 51 ++++++++++++++++------------- 1 file changed, 29 insertions(+), 22 deletions(-) diff --git a/python/paddle/v2/fluid/layers/nn.py b/python/paddle/v2/fluid/layers/nn.py index c23cd733f17..d11dccfd221 100644 --- a/python/paddle/v2/fluid/layers/nn.py +++ b/python/paddle/v2/fluid/layers/nn.py @@ -435,25 +435,28 @@ def dynamic_lstmp(input, r_t & = \overline{act_h}(W_{rh}h_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}`, - :math:`W_{fc}`, :math:`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 - activation, 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`. Here :math:`h` is usually called the hidden - state and :math:`r` denotes its recurrent projection. And - :math:`\\tilde{c_t}` is also called the candidate hidden state, whose - computation is based on the current input and previous hidden state. - - 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:`\overline{act_h}` is the - activation function for the projection output, usually using `identity` or - same as :math:`act_h`. + 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 @@ -519,12 +522,16 @@ def dynamic_lstmp(input, Examples: .. code-block:: python - hidden_dim = 512 - proj_dim = 256 + 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) + size=hidden_dim * 4, + proj_size=proj_dim, + use_peepholes=False, + is_reverse=True, + cell_activation="tanh", + proj_activation="tanh") """ helper = LayerHelper('lstmp', **locals()) -- GitLab