Convolutional neural networks (or ConvNets) are biologically-inspired variants of MLPs, they have different kinds of layers and each different layer works different than the usual MLP layers. If you are interested in learning more about ConvNets, a good course is the CS231n – Convolutional Neural Newtorks for Visual Recognition. The architecture of the CNNs are shown in the images below:

As you can see, the ConvNets works with 3D volumes and transformations of these 3D volumes. I won’t repeat in this post the entire CS231n tutorial, so if you’re really interested, please take time to read before continuing.

Lasagne and nolearn

One of the Python packages for deep learning that I really like to work with is Lasagne and nolearn. Lasagne is based on Theano so the GPU speedups will really make a great difference, and their declarative approach for the neural networks creation are really helpful. The nolearn libary is a collection of utilities around neural networks packages (including Lasagne) that can help us a lot during the creation of the neural network architecture, inspection of the layers, etc.

What I’m going to show in this post, is how to build a simple ConvNet architecture with some convolutional and pooling layers. I’m also going to show how you can use a ConvNet to train a feature extractor and then use it to extract features before feeding them into different models like SVM, Logistic Regression, etc. Many people use pre-trained ConvNet models and then remove the last output layer to extract the features from ConvNets that were trained on ImageNet datasets. This is usually called transfer learning because you can use layers from other ConvNets as feature extractors for different problems, since the first layer filters of the ConvNets works as edge detectors, they can be used as general feature detectors for other problems.

Loading the MNIST dataset

The MNIST dataset is one of the most traditional datasets for digits classification. We will use a pickled version of it for Python, but first, lets import the packages that we will need to use:

import matplotlib import matplotlib.pyplot as plt import matplotlib.cm as cm from urllib import urlretrieve import cPickle as pickle import os import gzip import numpy as np import theano import lasagne from lasagne import layers from lasagne.updates import nesterov_momentum from nolearn.lasagne import NeuralNet from nolearn.lasagne import visualize from sklearn.metrics import classification_report from sklearn.metrics import confusion_matrix

As you can see, we are importing matplotlib for plotting some images, some native Python modules to download the MNIST dataset, numpy, theano, lasagne, nolearn and some scikit-learn functions for model evaluation.

After that, we define our MNIST loading function (this is pretty the same function used in the Lasagne tutorial):

def load_dataset(): url = 'http://deeplearning.net/data/mnist/mnist.pkl.gz' filename = 'mnist.pkl.gz' if not os.path.exists(filename): print("Downloading MNIST dataset...") urlretrieve(url, filename) with gzip.open(filename, 'rb') as f: data = pickle.load(f) X_train, y_train = data[0] X_val, y_val = data[1] X_test, y_test = data[2] X_train = X_train.reshape((-1, 1, 28, 28)) X_val = X_val.reshape((-1, 1, 28, 28)) X_test = X_test.reshape((-1, 1, 28, 28)) y_train = y_train.astype(np.uint8) y_val = y_val.astype(np.uint8) y_test = y_test.astype(np.uint8) return X_train, y_train, X_val, y_val, X_test, y_test

As you can see, we are downloading the MNIST pickled dataset and then unpacking it into the three different datasets: train, validation and test. After that we reshape the image contents to prepare them to input into the Lasagne input layer later and we also convert the numpy array types to uint8 due to the GPU/theano datatype restrictions.

After that, we’re ready to load the MNIST dataset and inspect it:

X_train, y_train, X_val, y_val, X_test, y_test = load_dataset() plt.imshow(X_train[0][0], cmap=cm.binary)

This code above will output the following image (I’m using IPython Notebook):

ConvNet Architecture and Training

Now we can define our ConvNet architecture and then train it using a GPU/CPU (I have a very cheap GPU, but it helps a lot):

net1 = NeuralNet( layers=[('input', layers.InputLayer), ('conv2d1', layers.Conv2DLayer), ('maxpool1', layers.MaxPool2DLayer), ('conv2d2', layers.Conv2DLayer), ('maxpool2', layers.MaxPool2DLayer), ('dropout1', layers.DropoutLayer), ('dense', layers.DenseLayer), ('dropout2', layers.DropoutLayer), ('output', layers.DenseLayer), ], # input layer input_shape=(None, 1, 28, 28), # layer conv2d1 conv2d1_num_filters=32, conv2d1_filter_size=(5, 5), conv2d1_nonlinearity=lasagne.nonlinearities.rectify, conv2d1_W=lasagne.init.GlorotUniform(), # layer maxpool1 maxpool1_pool_size=(2, 2), # layer conv2d2 conv2d2_num_filters=32, conv2d2_filter_size=(5, 5), conv2d2_nonlinearity=lasagne.nonlinearities.rectify, # layer maxpool2 maxpool2_pool_size=(2, 2), # dropout1 dropout1_p=0.5, # dense dense_num_units=256, dense_nonlinearity=lasagne.nonlinearities.rectify, # dropout2 dropout2_p=0.5, # output output_nonlinearity=lasagne.nonlinearities.softmax, output_num_units=10, # optimization method params update=nesterov_momentum, update_learning_rate=0.01, update_momentum=0.9, max_epochs=10, verbose=1, ) # Train the network nn = net1.fit(X_train, y_train)

As you can see, in the parameter layers we’re defining a dictionary of tuples with the layer names/types and then we define the parameters for these layers. Our architecture here is using two convolutional layers with poolings and then a fully connected layer (dense layer) and the output layer. There are also dropouts between some layers, the dropout layer is a regularizer that randomly sets input values to zero to avoid overfitting (see the image below).

After calling the train method, the nolearn package will show status of the learning process, in my machine with my humble GPU I got the results below:

# Neural Network with 160362 learnable parameters ## Layer information # name size --- -------- -------- 0 input 1x28x28 1 conv2d1 32x24x24 2 maxpool1 32x12x12 3 conv2d2 32x8x8 4 maxpool2 32x4x4 5 dropout1 32x4x4 6 dense 256 7 dropout2 256 8 output 10 epoch train loss valid loss train/val valid acc dur ------- ------------ ------------ ----------- --------- --- 1 0.85204 0.16707 5.09977 0.95174 33.71s 2 0.27571 0.10732 2.56896 0.96825 33.34s 3 0.20262 0.08567 2.36524 0.97488 33.51s 4 0.16551 0.07695 2.15081 0.97705 33.50s 5 0.14173 0.06803 2.08322 0.98061 34.38s 6 0.12519 0.06067 2.06352 0.98239 34.02s 7 0.11077 0.05532 2.00254 0.98427 33.78s 8 0.10497 0.05771 1.81898 0.98248 34.17s 9 0.09881 0.05159 1.91509 0.98407 33.80s 10 0.09264 0.04958 1.86864 0.98526 33.40s

As you can see, the accuracy in the end was 0.98526, a pretty good performance for a 10 epochs training.

Prediction and Confusion Matrix

Now we can use the model to predict the entire testing dataset:

preds = net1.predict(X_test)

And we can also plot a confusion matrix to check the performance of the neural network classification:

cm = confusion_matrix(y_test, preds) plt.matshow(cm) plt.title('Confusion matrix') plt.colorbar() plt.ylabel('True label') plt.xlabel('Predicted label') plt.show()

The code above will plot the following confusion matrix:

As you can see, the diagonal is where the classification is more dense, showing the good performance of our classifier.

Filters Visualization

We can also visualize the 32 filters from the first convolutional layer:

visualize.plot_conv_weights(net1.layers_['conv2d1'])

The code above will plot the following filters below:

As you can see, the nolearn plot_conv_weights plots all the filters present in the layer we specified.

Theano layer functions and Feature Extraction

Now it is time to create theano-compiled functions that will feed-forward the input data into the architecture up to the layer you’re interested. I’m going to get the functions for the output layer and also for the dense layer before the output layer:

dense_layer = layers.get_output(net1.layers_['dense'], deterministic=True) output_layer = layers.get_output(net1.layers_['output'], deterministic=True) input_var = net1.layers_['input'].input_var f_output = theano.function([input_var], output_layer) f_dense = theano.function([input_var], dense_layer)

As you can see, we have now two theano functions called f_output and f_dense (for the output and dense layers). Please note that in order to get the layers here we are using a extra parameter called “deterministic“, this is to avoid the dropout layers affecting our feed-forward pass.

We can now convert an example instance to the input format and then feed it into the theano function for the output layer:

instance = X_test[0][None, :, :] %timeit -n 500 f_output(instance) 500 loops, best of 3: 858 µs per loop

As you can see, the f_output function takes an average of 858 µs. We can also plot the output layer activations for the instance:

pred = f_output(instance) N = pred.shape[1] plt.bar(range(N), pred.ravel())

The code above will create the following plot:

As you can see, the digit was recognized as the digit 7. The fact that you can create theano functions for any layer of the network is very useful because you can create a function (like we did before) to get the activations for the dense layer (the one before the output layer) and you can use these activations as features and use your neural network not as classifier but as a feature extractor. Let’s plot now the 256 unit activations for the dense layer:

pred = f_dense(instance) N = pred.shape[1] plt.bar(range(N), pred.ravel())

The code above will create the following plot below:

You can now use the output of the these 256 activations as features on a linear classifier like Logistic Regression or SVM.

I hope you enjoyed the tutorial !