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DeepLearnToolbox

A Matlab toolbox for Deep Learning.

Deep Learning is a new subfield of machine learning that focuses on learning deep hierarchical models of data. It is inspired by the human brain's apparent deep (layered, hierarchical) architecture. A good overview of the theory of Deep Learning theory is Learning Deep Architectures for AI

For a more informal introduction, see the following videos by Geoffrey Hinton and Andrew Ng.

If you use this toolbox in your research please cite Prediction as a candidate for learning deep hierarchical models of data

@MASTERSTHESIS\{IMM2012-06284,
    author       = "R. B. Palm",
    title        = "Prediction as a candidate for learning deep hierarchical models of data",
    year         = "2012",
}

Contact: rasmusbergpalm at gmail dot com

Directories included in the toolbox

NN/ - A library for Feedforward Backpropagation Neural Networks

CNN/ - A library for Convolutional Neural Networks

DBN/ - A library for Deep Belief Networks

SAE/ - A library for Stacked Auto-Encoders

CAE/ - A library for Convolutional Auto-Encoders

util/ - Utility functions used by the libraries

data/ - Data used by the examples

tests/ - unit tests to verify toolbox is working

For references on each library check REFS.md

Setup

  1. Download.
  2. addpath(genpath('DeepLearnToolbox'));

Everything is work in progress

Example: Deep Belief Network

function test_example_DBN
load mnist_uint8;

train_x = double(train_x) / 255;
test_x  = double(test_x)  / 255;
train_y = double(train_y);
test_y  = double(test_y);

%%  ex1 train a 100 hidden unit RBM and visualize its weights
rng(0);
dbn.sizes = [100];
opts.numepochs =   1;
opts.batchsize = 100;
opts.momentum  =   0;
opts.alpha     =   1;
dbn = dbnsetup(dbn, train_x, opts);
dbn = dbntrain(dbn, train_x, opts);
figure; visualize(dbn.rbm{1}.W');   %  Visualize the RBM weights

%%  ex2 train a 100-100 hidden unit DBN and use its weights to initialize a NN
rng(0);
%train dbn
dbn.sizes = [100 100];
opts.numepochs =   1;
opts.batchsize = 100;
opts.momentum  =   0;
opts.alpha     =   1;
dbn = dbnsetup(dbn, train_x, opts);
dbn = dbntrain(dbn, train_x, opts);

%unfold dbn to nn
nn = dbnunfoldtonn(dbn, 10);
nn.activation_function = 'sigm';

%train nn
opts.numepochs =  1;
opts.batchsize = 100;
nn = nntrain(nn, train_x, train_y, opts);
[er, bad] = nntest(nn, test_x, test_y);

assert(er < 0.10, 'Too big error');

Example: Stacked Auto-Encoders

function test_example_SAE
load mnist_uint8;

train_x = double(train_x)/255;
test_x  = double(test_x)/255;
train_y = double(train_y);
test_y  = double(test_y);

%%  ex1 train a 100 hidden unit SDAE and use it to initialize a FFNN
%  Setup and train a stacked denoising autoencoder (SDAE)
rng(0);
sae = saesetup([784 100]);
sae.ae{1}.activation_function       = 'sigm';
sae.ae{1}.learningRate              = 1;
sae.ae{1}.inputZeroMaskedFraction   = 0.5;
opts.numepochs =   1;
opts.batchsize = 100;
sae = saetrain(sae, train_x, opts);
visualize(sae.ae{1}.W{1}(:,2:end)')

% Use the SDAE to initialize a FFNN
nn = nnsetup([784 100 10]);
nn.activation_function              = 'sigm';
nn.learningRate                     = 1;
nn.W{1} = sae.ae{1}.W{1};

% Train the FFNN
opts.numepochs =   1;
opts.batchsize = 100;
nn = nntrain(nn, train_x, train_y, opts);
[er, bad] = nntest(nn, test_x, test_y);
assert(er < 0.16, 'Too big error');

%% ex2 train a 100-100 hidden unit SDAE and use it to initialize a FFNN
%  Setup and train a stacked denoising autoencoder (SDAE)
rng(0);
sae = saesetup([784 100 100]);
sae.ae{1}.activation_function       = 'sigm';
sae.ae{1}.learningRate              = 1;
sae.ae{1}.inputZeroMaskedFraction   = 0.5;

sae.ae{2}.activation_function       = 'sigm';
sae.ae{2}.learningRate              = 1;
sae.ae{2}.inputZeroMaskedFraction   = 0.5;

opts.numepochs =   1;
opts.batchsize = 100;
sae = saetrain(sae, train_x, opts);
visualize(sae.ae{1}.W{1}(:,2:end)')

% Use the SDAE to initialize a FFNN
nn = nnsetup([784 100 100 10]);
nn.activation_function              = 'sigm';
nn.learningRate                     = 1;

%add pretrained weights
nn.W{1} = sae.ae{1}.W{1};
nn.W{2} = sae.ae{2}.W{1};

% Train the FFNN
opts.numepochs =   1;
opts.batchsize = 100;
nn = nntrain(nn, train_x, train_y, opts);
[er, bad] = nntest(nn, test_x, test_y);
assert(er < 0.1, 'Too big error');

Example: Convolutional Neural Nets

function test_example_CNN
load mnist_uint8;

train_x = double(reshape(train_x',28,28,60000))/255;
test_x = double(reshape(test_x',28,28,10000))/255;
train_y = double(train_y');
test_y = double(test_y');

%% ex1 Train a 6c-2s-12c-2s Convolutional neural network 
%will run 1 epoch in about 200 second and get around 11% error. 
%With 100 epochs you'll get around 1.2% error
rng(0)
cnn.layers = {
    struct('type', 'i') %input layer
    struct('type', 'c', 'outputmaps', 6, 'kernelsize', 5) %convolution layer
    struct('type', 's', 'scale', 2) %sub sampling layer
    struct('type', 'c', 'outputmaps', 12, 'kernelsize', 5) %convolution layer
    struct('type', 's', 'scale', 2) %subsampling layer
};
cnn = cnnsetup(cnn, train_x, train_y);

opts.alpha = 1;
opts.batchsize = 50;
opts.numepochs = 1;

cnn = cnntrain(cnn, train_x, train_y, opts);

[er, bad] = cnntest(cnn, test_x, test_y);

%plot mean squared error
figure; plot(cnn.rL);

assert(er<0.12, 'Too big error');

Example: Neural Networks

function test_example_NN
load mnist_uint8;

train_x = double(train_x) / 255;
test_x  = double(test_x)  / 255;
train_y = double(train_y);
test_y  = double(test_y);

% normalize
[train_x, mu, sigma] = zscore(train_x);
test_x = normalize(test_x, mu, sigma);

%% ex1 vanilla neural net
rng(0);
nn = nnsetup([784 100 10]);
opts.numepochs =  1;   %  Number of full sweeps through data
opts.batchsize = 100;  %  Take a mean gradient step over this many samples
[nn, L] = nntrain(nn, train_x, train_y, opts);

[er, bad] = nntest(nn, test_x, test_y);

assert(er < 0.08, 'Too big error');

% Make an artificial one and verify that we can predict it
x = zeros(1,28,28);
x(:, 14:15, 6:22) = 1;
x = reshape(x,1,28^2);
figure; visualize(x');
predicted = nnpredict(nn,x)-1;

assert(predicted == 1);
%% ex2 neural net with L2 weight decay
rng(0);
nn = nnsetup([784 100 10]);

nn.weightPenaltyL2 = 1e-4;  %  L2 weight decay
opts.numepochs =  1;        %  Number of full sweeps through data
opts.batchsize = 100;       %  Take a mean gradient step over this many samples

nn = nntrain(nn, train_x, train_y, opts);

[er, bad] = nntest(nn, test_x, test_y);
assert(er < 0.1, 'Too big error');


%% ex3 neural net with dropout
rng(0);
nn = nnsetup([784 100 10]);

nn.dropoutFraction = 0.5;   %  Dropout fraction 
opts.numepochs =  1;        %  Number of full sweeps through data
opts.batchsize = 100;       %  Take a mean gradient step over this many samples

nn = nntrain(nn, train_x, train_y, opts);

[er, bad] = nntest(nn, test_x, test_y);
assert(er < 0.1, 'Too big error');

%% ex4 neural net with sigmoid activation function
rng(0);
nn = nnsetup([784 100 10]);

nn.activation_function = 'sigm';    %  Sigmoid activation function
nn.learningRate = 1;                %  Sigm require a lower learning rate
opts.numepochs =  1;                %  Number of full sweeps through data
opts.batchsize = 100;               %  Take a mean gradient step over this many samples

nn = nntrain(nn, train_x, train_y, opts);

[er, bad] = nntest(nn, test_x, test_y);
assert(er < 0.1, 'Too big error');

%% ex5 plotting functionality
rng(0);
nn = nnsetup([784 20 10]);
opts.numepochs         = 5;            %  Number of full sweeps through data
nn.output              = 'softmax';    %  use softmax output
opts.batchsize         = 1000;         %  Take a mean gradient step over this many samples
opts.plot              = 1;            %  enable plotting

nn = nntrain(nn, train_x, train_y, opts);

[er, bad] = nntest(nn, test_x, test_y);
assert(er < 0.1, 'Too big error');

%% ex6 neural net with sigmoid activation and plotting of validation and training error
% split training data into training and validation data
vx   = train_x(1:10000,:);
tx = train_x(10001:end,:);
vy   = train_y(1:10000,:);
ty = train_y(10001:end,:);

rng(0);
nn                      = nnsetup([784 20 10]);     
nn.output               = 'softmax';                   %  use softmax output
opts.numepochs          = 5;                           %  Number of full sweeps through data
opts.batchsize          = 1000;                        %  Take a mean gradient step over this many samples
opts.plot               = 1;                           %  enable plotting
nn = nntrain(nn, tx, ty, opts, vx, vy);                %  nntrain takes validation set as last two arguments (optionally)

[er, bad] = nntest(nn, test_x, test_y);
assert(er < 0.1, 'Too big error');