I was surprised that the deep learning algorithms I had implemented did not work, and I decided to create a very simple example, to understand the functioning of CNN better. Here is my attempt of constructing a small CNN for a very simple task, which provides unexpected results.

I have implemented a simple CNN with only one layer of one filter. I have created a dataset of 5000 samples, the inputs x being 256x256 simulated images, and the outputs y being the corresponding blurred images (y = signal.convolvded2d(x,gaussian_kernel,boundary='fill',mode='same')). Thus, I would like my CNN to learn the convolutional filter which would transform the original image into its blurred version. In other words, I would like my CNN to recover the gaussian filter I used to create the blurred images. Note: As I want to 'imitate' the convolution process such as it is described in the mathematical framework, I am using a gaussian filter which has the same size as my images: 256x256.

It seems to me quite an easy task, and nonetheless, the CNN is unable to provide the results I would expect. Please find below the code of my training function and the results.

# Parameters
size_image = 256
normalization = 1 
sigma = 7

n_train = 4900
ind_samples_training =np.linspace(1, n_train, n_train).astype(int)
nb_epochs = 5
minibatch_size = 5
learning_rate = np.logspace(-3,-5,nb_epochs)

seed = 3                                       

n_train = len(ind_samples_training)   

costs = []                                        

# Create Placeholders of the correct shape
X = tf.placeholder(tf.float64, shape=(None, size_image, size_image, 1), name = 'X')
Y_blur_true = tf.placeholder(tf.float64, shape=(None, size_image, size_image, 1), name = 'Y_true')
learning_rate_placeholder = tf.placeholder(tf.float32, shape=[])

# parameters to learn --should be an approximation of the gaussian filter 
filter_to_learn = tf.get_variable('filter_to_learn',\
                                    shape = [size_image,size_image,1,1],\
                                    dtype = tf.float64,\
                                    initializer = tf.contrib.layers.xavier_initializer(seed = 0),\
                                    trainable = True)

# Forward propagation: Build the forward propagation in the tensorflow graph
Y_blur_hat = tf.nn.conv2d(X, filter_to_learn, strides = [1,1,1,1], padding = 'SAME')

# Cost function: Add cost function to tensorflow graph
cost = tf.losses.mean_squared_error(Y_blur_true,Y_blur_hat,weights=1.0)

# Backpropagation: Define the tensorflow optimizer. Use an AdamOptimizer that minimizes the cost.
opt_adam = tf.train.AdamOptimizer(learning_rate=learning_rate_placeholder)
update_ops = tf.get_collection(tf.GraphKeys.UPDATE_OPS)
with tf.control_dependencies(update_ops):
    optimizer = opt_adam.minimize(cost)

# Initialize all the variables globally
init = tf.global_variables_initializer()

lr = learning_rate[0]
# Start the session to compute the tensorflow graph
with tf.Session() as sess:

    # Run the initialization

    # Do the training loop
    for epoch in range(nb_epochs):

        minibatch_cost = 0.
        seed = seed + 1

        permutation = list(np.random.permutation(n_train))
        shuffled_ind_samples = np.array(ind_samples_training)[permutation]

        # Learning rate update
        if learning_rate.shape[0]>1:
            lr = learning_rate[epoch]

        nb_minibatches = int(np.ceil(n_train/minibatch_size))

        for num_minibatch in range(nb_minibatches):

            # Minibatch indices
            ind_minibatch = shuffled_ind_samples[num_minibatch*minibatch_size:(num_minibatch+1)*minibatch_size]

            # Loading of the original image (X) and the blurred image (Y)
            minibatch_X, minibatch_Y  = load_dataset_blur(ind_minibatch,size_image, normalization, sigma)

            _ , temp_cost, filter_learnt = sess.run([optimizer,cost,filter_to_learn],\
                feed_dict = {X:minibatch_X, Y_blur_true:minibatch_Y, learning_rate_placeholder: lr})

I have run the training on 5 epochs of 4900 samples, with a batch size equal to 5. The gaussian kernel has a variance of 7^2=49. I have tried to initialize the filter to be learnt both with the xavier initiliazer method provided by tensorflow, and with the true values of the gaussian kernel we actually would like to learn. In both cases, the filter that is learnt results too different from the true gaussian one as it can be seen on the two images available at https://github.com/megalinier/Helsinki-project.

  • 1
    Just to debug your network can even learn, try to run it on like 10 samples and make it overfit, might be something with the learning rate. Also to isolate the problem keep the learning rate static - report what happened and we'll debug from there – bluesummers Jun 12 at 8:30
  • Also, what is the loss? You can get a totally different values between your conv kernel and the gaussian and still having a converging loss which does learn - since a convolution is a multiplication and summation, you can get the same sum with different values – bluesummers Jun 12 at 8:43
  • Thank you @bluesummers for your comments. I have run the program with a static learning rate (=0.001) on 10 samples, over 10 epochs. I have uploaded the result on my github depository (results_blurred_example_xavier_learningte1e-3). – 0spirit0 Jun 12 at 12:56
  • About the loss function, I have just added some lines to my code in order to plot the cost after each iteration. It might help to see if the loss is converging indeed. I will make the results available as soon as possible. – 0spirit0 Jun 12 at 12:58

By examining the photos it seems like the network is learning OK, as the predicted image is not so far off the true label - for better results you can tweak some hyperparams but that is not the case.

I think what you are missing is the fact that different kernels can get quite similar results since it is a convolution. Think about it, you are multiplying some matrix with another, and then summing all the results to create a new pixel. Now if the true label sum is 10, it could be a results of 2.5 + 2.5 + 2.5 + 2.5 and -10 + 10 + 10 + 0. What I am trying to say, is that your network could be learning just fine, but you will get a different values in the conv kernel than the filter.


I think this would better serve as a comment as it's somewhat speculative, but it's too long...

Hard to say what exactly is wrong but there could be multiple culprits here. For one, squared error provides a weak signal in the case that target and prediction are already quite similar -- and while the xavier-initalized filter looks quite bad, the predicted (filtered) image isn't too far off the target. You could experiment with other metrics such as absolute error (e.g. 1-norm instead of 2-norm).

Second, adding regularization should help, i.e. add a weight penalty to the loss function to encourage the filter values to become small where they are not needed. As it is, what I suppose happens is: The random values in the filter average out to about 0, leading to a similar "filtering" effect as if they were actually all 0. As such, the learning algorithm doesn't have much incentive to actually pull them to 0. By adding a weight penalty, you provide this incentive.

Third, it could just be Adam messing up. It is known to provide "strange" non-optimal solutions in some very simple (e.g. convex) problems. Maybe try default Gradient Descent with learning rate decay (and possibly momentum).

  • Thank you @xdurch0 for this answer. I will try indeed to change the cost function and/or the optimizer. Among your suggestions, I am particularly interested in your second point, but a bit confused about it. Where would you apply the weight penalty exactly? Are you suggesting to minimize the norm 1 of the filter in the loss function for example? – 0spirit0 Jun 12 at 13:12
  • 1
    Indeed! For example, you could use cost = msq + factor*tf.reduce_sum(tf.abs(filter_to_learn)) where msq is the squared error loss you have right now and factor is some number that determines how "important" the weight penalty is compared to the squared error (gonna have to do some trial & error to find a good value). This will encourage the weights to become smaller. Ideally, weights that are "not needed" (which is most of the filter in this case) would become 0. – xdurch0 Jun 12 at 17:54

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