What is the meaning of this FFDNet paper's line - conv-neural-network

I just reviewing one paper of FFDNet which is "FFDNet : Toward a Fast and Flexible Solution for CNN-Based Image Denoising"
In page 6 of this paper
" When the training error keeps unchanged in five sequential epochs,
we merge the parameters of each batch normalization into the adjacent convolution filters."
I can't fully understand the meaning of this line...
Plus, through back propagation, do parameters of batch-normalization trained?
Thanks for reading

Related

The decoder part in a transformer model

I'm fairly new to NLP and I was reading a blog explaining the transformer model. I was quite confused about the input/output for the decoder block (attached below). I get that y_true is fed into the decoder during the training step to combine with the output of the encoder block. What I don't get is, if we already know y_true, why run this step to get the output probability? I just don't quite get the relationship between the bottom right "Output Embedding" and the top right "Output Probabilities". When we use the model, we wouldn't really have y_true, do we just use y_pred and feed them into the decoder instead? This might be a noob question. Thanks in advance.
I get that y_true is fed into the decoder during the training step to
combine with the output of the encoder block.
Well, yes and no.
The job of the decoder block is to predict the next word. The inputs to the decoder is the output of the encoder and the previous outputs of decoder block itself.
Lets take a translation example ... English to Spanish
We have 5 dogs -> Nosotras tenemos 5 perros
The encoder will encode the english sentence and produce a attention vector as output. At first step the decoder will be fed the attention vector and a <START> token. The decoder will (should) produce the first spanish word Nosotras. This is the Yt. In the next step the decoder will be fed again the attention vector as well as the <START> token and the previous output Yt-1 Nosotras. tenemos will be the output, and so on and so forth, till the decoder spits out a <END> token.
The decoder is thus an Autoregressive Model. It relies on its own output to generate the next sequence.
In addition to #Bhupen's answer it is worth highlighting differences to seq-to-seq models based on RNNs, for which this sequential processing is always necessary.
Transformers have the fundamental advantage that you can train them with parallel processing. That means you can use the same parallel forward pass in the decoder also for the encoder during training. This allows for substantial speedups, allowing for larger training set sizes, to which transformer models owe much of their success.
So to answer the original question: The input to the decoder is
all correct predictions, shifted and masked, at once to be processed in parallel
the previous output of the decoder, starting with the special token <start>, until another special token <end> is predicted.
You can look at the excellent tensorflow implementation, i.e. check out:
Inference, which is indeed the sequential processing as described in the previous answer https://www.tensorflow.org/text/tutorials/transformer#run_inference
But also check the decoder, where you can see that there is no inherent sequential nature (only iterating through layers) https://www.tensorflow.org/text/tutorials/transformer#the_decoder_layer

Keras regression - Should my first/last layer have an activation function?

I keep seeing examples floating around the internet where the input and/or output layer have either no activation function, a linear activation function, or None. What I'm confused about is when to use one, and how to know if you should? I also am confused about what the number of nodes should be for the input layer.
Right now I have a regression problem, I'm trying to predict a real value based on an array of inputs (about 54). Should I be using relu in my activation function for the input layer? Should I have linear as my output activation? My data is linearly scaled from 0 to 1 for each feature independently as they're different units. I was also unsure of the number of nodes I should use for my input layer as I see some examples pick an arbitrary number not related to their input shape, and other examples saying to specifically set it to the number of inputs, or number of inputs plus one for a bias. But none of the examples so far have explained their reasoning behind their choices.
Since my model isn't performing very well, I thought asking what the architecture should be could help me fine tune it more.

Where do the input filters come from in conv-neural nets (MNIST Example)

I am a newby to the convolutional neural nets... so this may be an ignorant question.
I have followed many examples and tutorials now on the MNIST example in TensforFlow. In the CNN examples, all authors talk bout using the 'input filters' to run in the CNN. But no one that I can find mentions WHERE they come from. Can anyone answer where these come from? Or are they magically obtained from the input images.
Thanks! Chris
This is an image that one professor uses, be he does not exaplain if he made them or TensorFlow auto-extracts these somehow.
Disclaimer: I am not an expert, more of an enthusiast.
To cut a long story short: filters are the CNN equivalent of weights, and all a neural network essentially does is learning their optimal values.
Which it does by iterating through a training dataset, making predictions, comparing them to the label/value already assigned to each training unit (usually an image in case of a CNN) and adjusting weights to minimize the error function (the difference between the predicted value and the actual value).
Initial values of filters/weights do not matter that much, so although they might affect the speed of convergence to a small degree, I believe they are often assigned random values.
It is the job of the neural network to figure out the optimal weights, not of the person implementing it.

Temporal convolution for NLP

I'm trying to follow Kalchbrenner et al. 2014 (http://nal.co/papers/Kalchbrenner_DCNN_ACL14) (and basically most of the papers in the last 2 years which applied CNNs to NLP tasks) and implement the CNN model they describe. Unfortunately, although getting the forward pass right, it seems like I have a problem with the gradients.
What I'm doing is a full convolution of the input with W per row, per kernel, per input in the forward pass (not rotated, so it's actually a correlation).
Then, for the gradients wrt W, a valid convolution of the inputs with the previous delta per row, per kernel, per input (again, not rotated).
And finally, for the gradients wrt x, another valid convolution of the pervious delta with W, again, per row, per kernel, per input (no rotation).
This returns the correct size and dimensionality but the gradient checking is really off when connecting layers. When testing a single conv layer the results are correct, when connecting 2 conv layers - also correct, but then, when adding MLP, Pooling, etc. it starts looking bad. All other types of layers were also tested separately and they are also correct, thus, I'd assume the problem starts with the calculation of the grad. wrt W_conv.
Does anyone have an idea or a useful link to a similar implementation?

Neural Network Always Produces Same/Similar Outputs for Any Input [closed]

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I have a problem where I am trying to create a neural network for Tic-Tac-Toe. However, for some reason, training the neural network causes it to produce nearly the same output for any given input.
I did take a look at Artificial neural networks benchmark, but my network implementation is built for neurons with the same activation function for each neuron, i.e. no constant neurons.
To make sure the problem wasn't just due to my choice of training set (1218 board states and moves generated by a genetic algorithm), I tried to train the network to reproduce XOR. The logistic activation function was used. Instead of using the derivative, I multiplied the error by output*(1-output) as some sources suggested that this was equivalent to using the derivative. I can put the Haskell source on HPaste, but it's a little embarrassing to look at. The network has 3 layers: the first layer has 2 inputs and 4 outputs, the second has 4 inputs and 1 output, and the third has 1 output. Increasing to 4 neurons in the second layer didn't help, and neither did increasing to 8 outputs in the first layer.
I then calculated errors, network output, bias updates, and the weight updates by hand based on http://hebb.mit.edu/courses/9.641/2002/lectures/lecture04.pdf to make sure there wasn't an error in those parts of the code (there wasn't, but I will probably do it again just to make sure). Because I am using batch training, I did not multiply by x in equation (4) there. I am adding the weight change, though http://www.faqs.org/faqs/ai-faq/neural-nets/part2/section-2.html suggests to subtract it instead.
The problem persisted, even in this simplified network. For example, these are the results after 500 epochs of batch training and of incremental training.
Input |Target|Output (Batch) |Output(Incremental)
[1.0,1.0]|[0.0] |[0.5003781562785173]|[0.5009731800870864]
[1.0,0.0]|[1.0] |[0.5003740346965251]|[0.5006347214672715]
[0.0,1.0]|[1.0] |[0.5003734471544522]|[0.500589332376345]
[0.0,0.0]|[0.0] |[0.5003674110937019]|[0.500095157458231]
Subtracting instead of adding produces the same problem, except everything is 0.99 something instead of 0.50 something. 5000 epochs produces the same result, except the batch-trained network returns exactly 0.5 for each case. (Heck, even 10,000 epochs didn't work for batch training.)
Is there anything in general that could produce this behavior?
Also, I looked at the intermediate errors for incremental training, and the although the inputs of the hidden/input layers varied, the error for the output neuron was always +/-0.12. For batch training, the errors were increasing, but extremely slowly and the errors were all extremely small (x10^-7). Different initial random weights and biases made no difference, either.
Note that this is a school project, so hints/guides would be more helpful. Although reinventing the wheel and making my own network (in a language I don't know well!) was a horrible idea, I felt it would be more appropriate for a school project (so I know what's going on...in theory, at least. There doesn't seem to be a computer science teacher at my school).
EDIT: Two layers, an input layer of 2 inputs to 8 outputs, and an output layer of 8 inputs to 1 output, produces much the same results: 0.5+/-0.2 (or so) for each training case. I'm also playing around with pyBrain, seeing if any network structure there will work.
Edit 2: I am using a learning rate of 0.1. Sorry for forgetting about that.
Edit 3: Pybrain's "trainUntilConvergence" doesn't get me a fully trained network, either, but 20000 epochs does, with 16 neurons in the hidden layer. 10000 epochs and 4 neurons, not so much, but close. So, in Haskell, with the input layer having 2 inputs & 2 outputs, hidden layer with 2 inputs and 8 outputs, and output layer with 8 inputs and 1 output...I get the same problem with 10000 epochs. And with 20000 epochs.
Edit 4: I ran the network by hand again based on the MIT PDF above, and the values match, so the code should be correct unless I am misunderstanding those equations.
Some of my source code is at http://hpaste.org/42453/neural_network__not_working; I'm working on cleaning my code somewhat and putting it in a Github (rather than a private Bitbucket) repository.
All of the relevant source code is now at https://github.com/l33tnerd/hsann.
I've had similar problems, but was able to solve by changing these:
Scale down the problem to manageable size. I first tried too many inputs, with too many hidden layer units. Once I scaled down the problem, I could see if the solution to the smaller problem was working. This also works because when it's scaled down, the times to compute the weights drop down significantly, so I can try many different things without waiting.
Make sure you have enough hidden units. This was a major problem for me. I had about 900 inputs connecting to ~10 units in the hidden layer. This was way too small to quickly converge. But also became very slow if I added additional units. Scaling down the number of inputs helped a lot.
Change the activation function and its parameters. I was using tanh at first. I tried other functions: sigmoid, normalized sigmoid, Gaussian, etc.. I also found that changing the function parameters to make the functions steeper or shallower affected how quickly the network converged.
Change learning algorithm parameters. Try different learning rates (0.01 to 0.9). Also try different momentum parameters, if your algo supports it (0.1 to 0.9).
Hope this helps those who find this thread on Google!
So I realise this is extremely late for the original post, but I came across this because I was having a similar problem and none of the reasons posted here cover what was wrong in my case.
I was working on a simple regression problem, but every time I trained the network it would converge to a point where it was giving me the same output (or sometimes a few different outputs) for each input. I played with the learning rate, the number of hidden layers/nodes, the optimization algorithm etc but it made no difference. Even when I looked at a ridiculously simple example, trying to predict the output (1d) of two different inputs (1d):
import numpy as np
import torch
import torch.nn as nn
import torch.nn.functional as F
class net(nn.Module):
def __init__(self, obs_size, hidden_size):
super(net, self).__init__()
self.fc = nn.Linear(obs_size, hidden_size)
self.out = nn.Linear(hidden_size, 1)
def forward(self, obs):
h = F.relu(self.fc(obs))
return self.out(h)
inputs = np.array([[0.5],[0.9]])
targets = torch.tensor([3.0, 2.0], dtype=torch.float32)
network = net(1,5)
optimizer = torch.optim.Adam(network.parameters(), lr=0.001)
for i in range(10000):
out = network(torch.tensor(inputs, dtype=torch.float32))
loss = F.mse_loss(out, targets)
optimizer.zero_grad()
loss.backward()
optimizer.step()
print("Loss: %f outputs: %f, %f"%(loss.data.numpy(), out.data.numpy()[0], out.data.numpy()[1]))
but STILL it was always outputting the average value of the outputs for both inputs. It turns out the reason is that the dimensions of my outputs and targets were not the same: the targets were Size[2], and the outputs were Size[2,1], and for some reason PyTorch was broadcasting the outputs to be Size[2,2] in the MSE loss, which completely messes everything up. Once I changed:
targets = torch.tensor([3.0, 2.0], dtype=torch.float32)
to
targets = torch.tensor([[3.0], [2.0]], dtype=torch.float32)
It worked as it should. This was obviously done with PyTorch, but I suspect maybe other libraries broadcast variables in the same way.
For me it was happening exactly like in your case, the output of neural network was always the same no matter the training & number of layers etc.
Turns out my back-propagation algorithm had a problem. At one place I was multiplying by -1 where it wasn't required.
There could be another problem like this. The question is how to debug it?
Steps to debug:
Step1 : Write the algorithm such that it can take variable number of input layers and variable number of input & output nodes.
Step2 : Reduce the hidden layers to 0. Reduce input to 2 nodes, output to 1 node.
Step3 : Now train for binary-OR-Operation.
Step4 : If it converges correctly, go to Step 8.
Step5 : If it doesn't converge, train it only for 1 training sample
Step6 : Print all the forward and prognostication variables (weights, node-outputs, deltas etc)
Step7 : Take pen&paper and calculate all the variables manually.
Step8 : Cross verify the values with algorithm.
Step9 : If you don't find any problem with 0 hidden layers. Increase hidden layer size to 1. Repeat step 5,6,7,8
It sounds like a lot of work, but it works very well IMHO.
I know, that for the original post this is far, too late but maybe I can help someone with this, as I faced the same problem.
For me the problem was, that my input data had missing values in important columns, where the training/test data were not missing. I replaced these values with zero values and voilĂ , suddenly the results were plausible. So maybe check your data, maybe it si misrepresented
It's hard to tell without seeing a code sample but it is possible occure for a net because its number of hidden neron.with incresing in number of neron and number of hiden layer it is not possible to train a net with small set of training data.until it is possible to make a net with smaller layer and nerons it is amiss to use a larger net.therefore perhaps your problem solved with attention to this matters.
I haven't tested it with the XOR problem in the question, but for my original dataset based on Tic-Tac-Toe, I believe that I have gotten the network to train somewhat (I only ran 1000 epochs, which wasn't enough): the quickpropagation network can win/tie over half of its games; backpropagation can get about 41%. The problems came down to implementation errors (small ones) and not understanding the difference between the error derivative (which is per-weight) and the error for each neuron, which I did not pick up on in my research. #darkcanuck's answer about training the bias similarly to a weight would probably have helped, though I didn't implement it. I also rewrote my code in Python so that I could more easily hack with it. Therefore, although I haven't gotten the network to match the minimax algorithm's efficiency, I believe that I have managed to solve the problem.
I faced a similar issue earlier when my data was not properly normalized. Once I normalized the data everything ran correctly.
Recently, I faced this issue again and after debugging, I found that there can be another reason for neural networks giving the same output. If you have a neural network that has a weight decay term such as that in the RSNNS package, make sure that your decay term is not so large that all weights go to essentially 0.
I was using the caret package for in R. Initially, I was using a decay hyperparameter = 0.01. When I looked at the diagnostics, I saw that the RMSE was being calculated for each fold (of cross validation), but the Rsquared was always NA. In this case all predictions were coming out to the same value.
Once I reduced the decay to a much lower value (1E-5 and lower), I got the expected results.
I hope this helps.
I was running into the same problem with my model when number of layers is large. I was using a learning rate of 0.0001. When I lower the learning rate to 0.0000001 the problem seems solved. I think algorithms stuck on local minumums when learning rate is too low
It's hard to tell without seeing a code sample, but a bias bug can have that effect (e.g. forgetting to add the bias to the input), so I would take a closer look at that part of the code.
Based on your comments, I'd agree with #finnw that you have a bias problem. You should treat the bias as a constant "1" (or -1 if you prefer) input to each neuron. Each neuron will also have its own weight for the bias, so a neuron's output should be the sum of the weighted inputs, plus the bias times its weight, passed through the activation function. Bias weights are updated during training just like the other weights.
Fausett's "Fundamentals of Neural Networks" (p.300) has an XOR example using binary inputs and a network with 2 inputs, 1 hidden layer of 4 neurons and one output neuron. Weights are randomly initialized between +0.5 and -0.5. With a learning rate of 0.02 the example network converges after about 3000 epochs. You should be able to get a result in the same ballpark if you get the bias problems (and any other bugs) ironed out.
Also note that you cannot solve the XOR problem without a hidden layer in your network.
I encountered a similar issue, I found out that it was a problem with how my weights were being generated.
I was using:
w = numpy.random.rand(layers[i], layers[i+1])
This generated a random weight between 0 and 1.
The problem was solved when I used randn() instead:
w = numpy.random.randn(layers[i], layers[i+1])
This generates negative weights, which helped my outputs become more varied.
I ran into this exact issue. I was predicting 6 rows of data with 1200+ columns using nnet.
Each column would return a different prediction but all of the rows in that column would be the same value.
I got around this by increasing the size parameter significantly. I increased it from 1-5 to 11+.
I have also heard that decreasing your decay rate can help.
I've had similar problems with machine learning algorithms and when I looked at the code I found random generators that were not really random. If you do not use a new random seed (such Unix time for example, see http://en.wikipedia.org/wiki/Unix_time) then it is possible to get the exact same results over and over again.

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