Some very quick and dirty notes on running on multiple GPUs using the nn.DataParallel module.
I found some code from the dcgan sample. Assume that the layer is written as follows:
layer = nn.Sequential(nn.Conv2d(...),etc.)
Call as follows:
output = layer(input)
To run in parallel, first issue the .cuda() call.
input=input.cuda()
layer=layer.cuda()
Now wrap in the data_parallel clause and do feed forward calculation:
output = nn.parallel.data_parallel(layer,input)
References
1) https://github.com/pytorch/examples/tree/master/dcgan
2) http://pytorch.org/tutorials/beginner/former_torchies/parallelism_tutorial.html
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and 
are of the same size.
a trainable quantity, gated by sending to a sigmoid unit to make it lie between 
and 
. 
a vector, which would turn the products into element wise products. 
. Tacotron uses full, linear connections. 
are neural network outputs obtained by passing through fully connected layers passed through a non-linearity – sigmoid for H and relu (or some other) for T. 
. For that matter, we can pretty much define any kind of loss function 
or maybe 
.
. We would like to maximize the log likelihood implied by this proposition, boiling down to minimizing the mean squared error (MSE). This is maximum likelihood learning.
![-\mathcal{L} = E_{z\sim q_\phi(z|x)} [\log p_\theta(x|z)] - KL(q_\phi(z|x)||p_\theta(z))](https://s0.wp.com/latex.php?latex=-%5Cmathcal%7BL%7D+%3D+E_%7Bz%5Csim+q_%5Cphi%28z%7Cx%29%7D+%5B%5Clog+p_%5Ctheta%28x%7Cz%29%5D+-+KL%28q_%5Cphi%28z%7Cx%29%7C%7Cp_%5Ctheta%28z%29%29+&bg=ffffff&fg=404040&s=0 "-\mathcal{L} = E_{z\sim q_\phi(z|x)} [\log p_\theta(x|z)] - KL(q_\phi(z|x)||p_\theta(z))")
are the encoder and decoder neural network parameters, and the KL term is the so called prior of the VAE.
. In the original VAE, we assume that the samples produced differ from the ground truth in a gaussian way, as noted above. In the present work, the reconstructions and ground truth are sent to a neural network (the GAN discriminator). They assume that the outputs from one of the hidden layers of the discriminator are said to differ in a gaussian way. It is easier written than said.
layer of the discriminator is chosen to measure the difference between real and fake, to be used as VAE loss. This is from the last but one hidden layer. To rationalize the approach, we can take 
as an identify mapping, when it becomes the same as the original formulation in Kingma and Welling.
is a scalar quantity. Originally, I had been using the GAN output 
.
as is usual in the VAE. 
.
. I was a little unsure how to interpret this term, in that we can also use 
. But doing so will mean that we are essentially using the VAE’s encoder output. So it has to be this interpretation. 
, and an auxillary output ![\begin{array}{ll} -\mathcal{L}_{Encoder} &= E_{z\sim p_\phi(z|x)} [\log (p_\theta(x|z))] -KL(q_\phi(z|x)||p_\theta(z))\\ &= -(\mathcal{L}_{D^l} + \mathcal{L}_{prior}) \end{array}](https://s0.wp.com/latex.php?latex=%5Cbegin%7Barray%7D%7Bll%7D+-%5Cmathcal%7BL%7D_%7BEncoder%7D+%26%3D+E_%7Bz%5Csim+p_%5Cphi%28z%7Cx%29%7D+%5B%5Clog+%28p_%5Ctheta%28x%7Cz%29%29%5D+-KL%28q_%5Cphi%28z%7Cx%29%7C%7Cp_%5Ctheta%28z%29%29%5C%5C+%26%3D+-%28%5Cmathcal%7BL%7D_%7BD%5El%7D+%2B+%5Cmathcal%7BL%7D_%7Bprior%7D%29+%5Cend%7Barray%7D+&bg=ffffff&fg=404040&s=0 "\begin{array}{ll} -\mathcal{L}_{Encoder} &= E_{z\sim p_\phi(z|x)} [\log (p_\theta(x|z))] -KL(q_\phi(z|x)||p_\theta(z))\\ &= -(\mathcal{L}_{D^l} + \mathcal{L}_{prior}) \end{array}")
![-\mathcal{L}_{GAN} = E_{x\sim p_{fake}} [\log(1-D(x))] + E_{z_p\sim \mathcal{N}(0,I)} [\log(1-D(G(z)))] + E_{x\sim p_{real}}[\log(D(x))]](https://s0.wp.com/latex.php?latex=-%5Cmathcal%7BL%7D_%7BGAN%7D+%3D+E_%7Bx%5Csim+p_%7Bfake%7D%7D+%5B%5Clog%281-D%28x%29%29%5D+%2B+E_%7Bz_p%5Csim+%5Cmathcal%7BN%7D%280%2CI%29%7D+%5B%5Clog%281-D%28G%28z%29%29%29%5D+%2B+E_%7Bx%5Csim+p_%7Breal%7D%7D%5B%5Clog%28D%28x%29%29%5D+&bg=ffffff&fg=404040&s=0 "-\mathcal{L}_{GAN} = E_{x\sim p_{fake}} [\log(1-D(x))] + E_{z_p\sim \mathcal{N}(0,I)} [\log(1-D(G(z)))] + E_{x\sim p_{real}}[\log(D(x))]")
to create the attention patch.
.
that multiplies (or divides) the read and write operations.
are referred to in the paper as ‘filter banks’ which are essentially gaussian kernels around a point of interest. In 1D, if we say that 
then it will apply a gaussian filter at the point 
. More on that in a dedicated post.
by invoking the bmm method.
with a single RNN – as can be made out from the clipping below from “Generating Sentences from a Continuous Space”:
![h_t^{enc} = RNN^{enc} (h_{t-1}^{enc}, [r_t, h_{t-1}^{dec}])](https://s0.wp.com/latex.php?latex=h_t%5E%7Benc%7D+%3D+RNN%5E%7Benc%7D+%28h_%7Bt-1%7D%5E%7Benc%7D%2C+%5Br_t%2C+h_%7Bt-1%7D%5E%7Bdec%7D%5D%29+&bg=ffffff&fg=404040&s=0 "h_t^{enc} = RNN^{enc} (h_{t-1}^{enc}, [r_t, h_{t-1}^{dec}])")
![[,]](https://s0.wp.com/latex.php?latex=%5B%2C%5D&bg=ffffff&fg=404040&s=0 "[,]")
to concatenate two tensors. ![[u, v] = cat(u, v)](https://s0.wp.com/latex.php?latex=%5Bu%2C+v%5D+%3D+cat%28u%2C+v%29+&bg=ffffff&fg=404040&s=0 "[u, v] = cat(u, v)")
. Furthermore, at each timestep, we take in the same input image 
or the oputput of read:
is the output size, 
is the input size, 
is the padding, 
is the stride.
, setting batch size to 5 and channels to 1, to get 
into a context vector 
for the hidden decoder vector 
. The result is the summed over contribution over all of the input hidden vectors. 
(this could be bidirectional, in which case we concatenate the forward and backward hidden states). Naturally, if the input and output hidden states are ‘aligned’ then 
would be quite high for those states. In practice, more than one input word could be aligned with their output counterparts. For example, for some words in English, we will have a direct correspondences in French (de == of; le, la == the), but some words can have multiple correspondences (je ne suis pas == I am not), so the alignment should register these features. Here we know that (je/i) form a pair; (suis/am) form another pair, but we also know that (ne suis pas/am not) should occur together, and they will have non-zero alphas when we group them together, not to mention the difference in sequence lengths.
which is then softmaxed to make it lie between 
is some function of 
. A most obvious way to combine the two vectors is by concatenating ![[u,v] = concat(u,v)](https://s0.wp.com/latex.php?latex=%5Bu%2Cv%5D+%3D+concat%28u%2Cv%29&bg=ffffff&fg=404040&s=0 "[u,v] = concat(u,v)")
to get![s_i = RNN(s_{i-1}, [c_i, y_{i-1}])](https://s0.wp.com/latex.php?latex=s_i+%3D+RNN%28s_%7Bi-1%7D%2C+%5Bc_i%2C+y_%7Bi-1%7D%5D%29+&bg=ffffff&fg=404040&s=0 "s_i = RNN(s_{i-1}, [c_i, y_{i-1}])")
. The outputs 
are one hot vectors which are transformed into a dense embedding, denoted by the matrix 
. ![s_i = (1-z_i) \circ s_{i-1} + z_i \circ s_i \\ \tilde{s}_i = \tanh (W Ey_{i-1} + U [r_i \circ s_{i-1}] + Cc_i)\\ z_i = \sigma(W_z Ey_{i-1} + U_z s_{i-1} + C_z c_i)\\ r_i = \sigma(W_r Ey_{i-1} + U_r s_{i-1} + C_r c_i)](https://s0.wp.com/latex.php?latex=s_i+%3D+%281-z_i%29+%5Ccirc+s_%7Bi-1%7D+%2B+z_i+%5Ccirc+s_i+%5C%5C+%5Ctilde%7Bs%7D_i+%3D+%5Ctanh+%28W+Ey_%7Bi-1%7D++%2B+U+%5Br_i+%5Ccirc+s_%7Bi-1%7D%5D+%2B+Cc_i%29%5C%5C+z_i+%3D+%5Csigma%28W_z+Ey_%7Bi-1%7D+%2B+U_z+s_%7Bi-1%7D+%2B+C_z+c_i%29%5C%5C+r_i+%3D+%5Csigma%28W_r+Ey_%7Bi-1%7D+%2B+U_r+s_%7Bi-1%7D+%2B+C_r+c_i%29++&bg=ffffff&fg=404040&s=0 "s_i = (1-z_i) \circ s_{i-1} + z_i \circ s_i \\ \tilde{s}_i = \tanh (W Ey_{i-1} + U [r_i \circ s_{i-1}] + Cc_i)\\ z_i = \sigma(W_z Ey_{i-1} + U_z s_{i-1} + C_z c_i)\\ r_i = \sigma(W_r Ey_{i-1} + U_r s_{i-1} + C_r c_i)")
are a concatenation of the forward and backward hidden vectors which are then used to compute context vectors.![h_j = concat(\overrightarrow{h}_j, \overleftarrow{h}_j) = [\overrightarrow{h}_j, \overleftarrow{h}_j] \\ c_i= \sum_j \alpha_{ij} h_j](https://s0.wp.com/latex.php?latex=h_j+%3D+concat%28%5Coverrightarrow%7Bh%7D_j%2C+%5Coverleftarrow%7Bh%7D_j%29+%3D+%5B%5Coverrightarrow%7Bh%7D_j%2C+%5Coverleftarrow%7Bh%7D_j%5D+%5C%5C+c_i%3D+%5Csum_j+%5Calpha_%7Bij%7D+h_j+&bg=ffffff&fg=404040&s=0 "h_j = concat(\overrightarrow{h}_j, \overleftarrow{h}_j) = [\overrightarrow{h}_j, \overleftarrow{h}_j] \\ c_i= \sum_j \alpha_{ij} h_j")
is a function of 
, going into the softmax operation to get the probability of the next word. ![t_i = [max\left\{\tilde{t}_{i, 2j-1}, \tilde{t}_{i,2j}\right\}]](https://s0.wp.com/latex.php?latex=t_i+%3D+%5Bmax%5Cleft%5C%7B%5Ctilde%7Bt%7D_%7Bi%2C+2j-1%7D%2C+%5Ctilde%7Bt%7D_%7Bi%2C2j%7D%5Cright%5C%7D%5D+&bg=ffffff&fg=404040&s=0 "t_i = [max\left\{\tilde{t}_{i, 2j-1}, \tilde{t}_{i,2j}\right\}]")
![\tilde{t}_i = f(s_{i-1}, [Ey_{i-1}, c_i])](https://s0.wp.com/latex.php?latex=%5Ctilde%7Bt%7D_i+%3D+f%28s_%7Bi-1%7D%2C+%5BEy_%7Bi-1%7D%2C+c_i%5D%29&bg=ffffff&fg=404040&s=0 "\tilde{t}_i = f(s_{i-1}, [Ey_{i-1}, c_i])")
of size 
, from which we pick the maximum between two adjacent elements of the vector. If we want to get element 
of the vector 
, we select the maximum of elements 
from the vector 
words in the output dictionary, and 
, the quantities are of the following shapes:
for source and target. ![\begin{array}{lll} a_{ij} & =& s_{i-1}^T h_j \ (dot) \\ & = & s_{i-1}^T W_a h_j \ (general) \\ & = & v^T \tanh(W_a[s_{i-1}, h_j]) \ concat (Bahdanau) \end{array}](https://s0.wp.com/latex.php?latex=%5Cbegin%7Barray%7D%7Blll%7D+a_%7Bij%7D++%26+%3D%26++s_%7Bi-1%7D%5ET+h_j+%5C+%28dot%29+%5C%5C+++%26+%3D+%26+s_%7Bi-1%7D%5ET+W_a+h_j+%5C+%28general%29+%5C%5C+++%26+%3D+%26+v%5ET+%5Ctanh%28W_a%5Bs_%7Bi-1%7D%2C+h_j%5D%29+%5C+concat+%28Bahdanau%29+%5Cend%7Barray%7D+&bg=ffffff&fg=404040&s=0 "\begin{array}{lll} a_{ij} & =& s_{i-1}^T h_j \ (dot) \\ & = & s_{i-1}^T W_a h_j \ (general) \\ & = & v^T \tanh(W_a[s_{i-1}, h_j]) \ concat (Bahdanau) \end{array}")
