view baseline/mlp/mlp_nist.py @ 358:31641a84e0ae

Initial commit for the experimental setup of the denoising convolutional network
author humel
date Thu, 22 Apr 2010 00:49:42 -0400
parents 76b7182dd32e
children 60a4432b8071
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"""
This tutorial introduces the multilayer perceptron using Theano.  

 A multilayer perceptron is a logistic regressor where
instead of feeding the input to the logistic regression you insert a
intermidiate layer, called the hidden layer, that has a nonlinear 
activation function (usually tanh or sigmoid) . One can use many such 
hidden layers making the architecture deep. The tutorial will also tackle 
the problem of MNIST digit classification.

.. math::

    f(x) = G( b^{(2)} + W^{(2)}( s( b^{(1)} + W^{(1)} x))),

References:

    - textbooks: "Pattern Recognition and Machine Learning" - 
                 Christopher M. Bishop, section 5

TODO: recommended preprocessing, lr ranges, regularization ranges (explain 
      to do lr first, then add regularization)

"""
__docformat__ = 'restructedtext en'

import sys
import pdb
import numpy
import pylab
import theano
import theano.tensor as T
import time 
import theano.tensor.nnet
import pylearn
import theano,pylearn.version,ift6266
from pylearn.io import filetensor as ft
from ift6266 import datasets

data_path = '/data/lisa/data/nist/by_class/'

class MLP(object):
    """Multi-Layer Perceptron Class

    A multilayer perceptron is a feedforward artificial neural network model 
    that has one layer or more of hidden units and nonlinear activations. 
    Intermidiate layers usually have as activation function thanh or the 
    sigmoid function  while the top layer is a softamx layer. 
    """



    def __init__(self, input, n_in, n_hidden, n_out,learning_rate):
        """Initialize the parameters for the multilayer perceptron

        :param input: symbolic variable that describes the input of the 
        architecture (one minibatch)

        :param n_in: number of input units, the dimension of the space in 
        which the datapoints lie

        :param n_hidden: number of hidden units 

        :param n_out: number of output units, the dimension of the space in 
        which the labels lie

        """

        # initialize the parameters theta = (W1,b1,W2,b2) ; note that this 
        # example contains only one hidden layer, but one can have as many 
        # layers as he/she wishes, making the network deeper. The only 
        # problem making the network deep this way is during learning, 
        # backpropagation being unable to move the network from the starting
        # point towards; this is where pre-training helps, giving a good 
        # starting point for backpropagation, but more about this in the 
        # other tutorials
        
        # `W1` is initialized with `W1_values` which is uniformely sampled
        # from -6./sqrt(n_in+n_hidden) and 6./sqrt(n_in+n_hidden)
        # the output of uniform if converted using asarray to dtype 
        # theano.config.floatX so that the code is runable on GPU
        W1_values = numpy.asarray( numpy.random.uniform( \
              low = -numpy.sqrt(6./(n_in+n_hidden)), \
              high = numpy.sqrt(6./(n_in+n_hidden)), \
              size = (n_in, n_hidden)), dtype = theano.config.floatX)
        # `W2` is initialized with `W2_values` which is uniformely sampled 
        # from -6./sqrt(n_hidden+n_out) and 6./sqrt(n_hidden+n_out)
        # the output of uniform if converted using asarray to dtype 
        # theano.config.floatX so that the code is runable on GPU
        W2_values = numpy.asarray( numpy.random.uniform( 
              low = -numpy.sqrt(6./(n_hidden+n_out)), \
              high= numpy.sqrt(6./(n_hidden+n_out)),\
              size= (n_hidden, n_out)), dtype = theano.config.floatX)

        self.W1 = theano.shared( value = W1_values )
        self.b1 = theano.shared( value = numpy.zeros((n_hidden,), 
                                                dtype= theano.config.floatX))
        self.W2 = theano.shared( value = W2_values )
        self.b2 = theano.shared( value = numpy.zeros((n_out,), 
                                                dtype= theano.config.floatX))

        #include the learning rate in the classifer so
        #we can modify it on the fly when we want
        lr_value=learning_rate
        self.lr=theano.shared(value=lr_value)
        # symbolic expression computing the values of the hidden layer
        self.hidden = T.tanh(T.dot(input, self.W1)+ self.b1)
        
        

        # symbolic expression computing the values of the top layer 
        self.p_y_given_x= T.nnet.softmax(T.dot(self.hidden, self.W2)+self.b2)

        # compute prediction as class whose probability is maximal in 
        # symbolic form
        self.y_pred = T.argmax( self.p_y_given_x, axis =1)
        self.y_pred_num = T.argmax( self.p_y_given_x[0:9], axis =1)
        
        
        
        
        # L1 norm ; one regularization option is to enforce L1 norm to 
        # be small 
        self.L1     = abs(self.W1).sum() + abs(self.W2).sum()

        # square of L2 norm ; one regularization option is to enforce 
        # square of L2 norm to be small
        self.L2_sqr = (self.W1**2).sum() + (self.W2**2).sum()



    def negative_log_likelihood(self, y):
        """Return the mean of the negative log-likelihood of the prediction
        of this model under a given target distribution.

        .. math::

            \frac{1}{|\mathcal{D}|}\mathcal{L} (\theta=\{W,b\}, \mathcal{D}) = 
            \frac{1}{|\mathcal{D}|}\sum_{i=0}^{|\mathcal{D}|} \log(P(Y=y^{(i)}|x^{(i)}, W,b)) \\
                \ell (\theta=\{W,b\}, \mathcal{D}) 


        :param y: corresponds to a vector that gives for each example the
        :correct label
        """
        return -T.mean(T.log(self.p_y_given_x)[T.arange(y.shape[0]),y])




    def errors(self, y):
        """Return a float representing the number of errors in the minibatch 
        over the total number of examples of the minibatch 
        """

        # check if y has same dimension of y_pred 
        if y.ndim != self.y_pred.ndim:
            raise TypeError('y should have the same shape as self.y_pred', 
                ('y', target.type, 'y_pred', self.y_pred.type))
        # check if y is of the correct datatype        
        if y.dtype.startswith('int'):
            # the T.neq operator returns a vector of 0s and 1s, where 1
            # represents a mistake in prediction
            return T.mean(T.neq(self.y_pred, y))
        else:
            raise NotImplementedError()

def mlp_get_nist_error(model_name='/u/mullerx/ift6266h10_sandbox_db/xvm_final_lr1_p073/8/best_model.npy.npz',
                  data_set=0):
    


    # allocate symbolic variables for the data
    x = T.fmatrix()  # the data is presented as rasterized images
    y = T.lvector()  # the labels are presented as 1D vector of 
                          # [long int] labels

    # load the data set and create an mlp based on the dimensions of the model
    model=numpy.load(model_name)
    W1=model['W1']
    W2=model['W2']
    b1=model['b1']
    b2=model['b2']
    nb_hidden=b1.shape[0]
    input_dim=W1.shape[0]
    nb_targets=b2.shape[0]
    learning_rate=0.1


    if data_set==0:
        dataset=datasets.nist_all()
    elif data_set==1:
        dataset=datasets.nist_P07()


    classifier = MLP( input=x,\
                        n_in=input_dim,\
                        n_hidden=nb_hidden,\
                        n_out=nb_targets,
                        learning_rate=learning_rate)


    #overwrite weights with weigths from model
    classifier.W1.value=W1
    classifier.W2.value=W2
    classifier.b1.value=b1
    classifier.b2.value=b2


    cost = classifier.negative_log_likelihood(y) \
         + 0.0 * classifier.L1 \
         + 0.0 * classifier.L2_sqr 

    # compiling a theano function that computes the mistakes that are made by 
    # the model on a minibatch
    test_model = theano.function([x,y], classifier.errors(y))



    #get the test error
    #use a batch size of 1 so we can get the sub-class error
    #without messing with matrices (will be upgraded later)
    test_score=0
    temp=0
    for xt,yt in dataset.test(20):
        test_score += test_model(xt,yt)
        temp = temp+1
    test_score /= temp


    return test_score*100
    





def mlp_full_nist(      verbose = 1,\
                        adaptive_lr = 0,\
                        data_set=0,\
                        learning_rate=0.01,\
                        L1_reg = 0.00,\
                        L2_reg = 0.0001,\
                        nb_max_exemples=1000000,\
                        batch_size=20,\
                        nb_hidden = 30,\
                        nb_targets = 62,
                        tau=1e6,\
                        lr_t2_factor=0.5,\
                        init_model=0,\
                        channel=0):
   
    
    if channel!=0:
        channel.save()
    configuration = [learning_rate,nb_max_exemples,nb_hidden,adaptive_lr]
    
    #save initial learning rate if classical adaptive lr is used
    initial_lr=learning_rate
    max_div_count=1000
    
    
    total_validation_error_list = []
    total_train_error_list = []
    learning_rate_list=[]
    best_training_error=float('inf');
    divergence_flag_list=[]
    
    if data_set==0:
    	dataset=datasets.nist_all()
    elif data_set==1:
        dataset=datasets.nist_P07()
    elif data_set==2:
        dataset=datasets.PNIST07()
    
    
    

    ishape     = (32,32) # this is the size of NIST images

    # allocate symbolic variables for the data
    x = T.fmatrix()  # the data is presented as rasterized images
    y = T.lvector()  # the labels are presented as 1D vector of 
                          # [long int] labels

    
    # construct the logistic regression class
    classifier = MLP( input=x,\
                        n_in=32*32,\
                        n_hidden=nb_hidden,\
                        n_out=nb_targets,
                        learning_rate=learning_rate)
                        
                        
    # check if we want to initialise the weights with a previously calculated model
    # dimensions must be consistent between old model and current configuration!!!!!! (nb_hidden and nb_targets)
    if init_model!=0:
        old_model=numpy.load(init_model)
        classifier.W1.value=old_model['W1']
        classifier.W2.value=old_model['W2']
        classifier.b1.value=old_model['b1']
        classifier.b2.value=old_model['b2']
   

    # the cost we minimize during training is the negative log likelihood of 
    # the model plus the regularization terms (L1 and L2); cost is expressed
    # here symbolically
    cost = classifier.negative_log_likelihood(y) \
         + L1_reg * classifier.L1 \
         + L2_reg * classifier.L2_sqr 

    # compiling a theano function that computes the mistakes that are made by 
    # the model on a minibatch
    test_model = theano.function([x,y], classifier.errors(y))

    # compute the gradient of cost with respect to theta = (W1, b1, W2, b2) 
    g_W1 = T.grad(cost, classifier.W1)
    g_b1 = T.grad(cost, classifier.b1)
    g_W2 = T.grad(cost, classifier.W2)
    g_b2 = T.grad(cost, classifier.b2)

    # specify how to update the parameters of the model as a dictionary
    updates = \
        { classifier.W1: classifier.W1 - classifier.lr*g_W1 \
        , classifier.b1: classifier.b1 - classifier.lr*g_b1 \
        , classifier.W2: classifier.W2 - classifier.lr*g_W2 \
        , classifier.b2: classifier.b2 - classifier.lr*g_b2 }

    # compiling a theano function `train_model` that returns the cost, but in 
    # the same time updates the parameter of the model based on the rules 
    # defined in `updates`
    train_model = theano.function([x, y], cost, updates = updates )
    
    
   

   
   
    
   
   
   #conditions for stopping the adaptation:
   #1) we have reached  nb_max_exemples (this is rounded up to be a multiple of the train size so we always do at least 1 epoch)
   #2) validation error is going up twice in a row(probable overfitting)
   
   # This means we no longer stop on slow convergence as low learning rates stopped
   # too fast but instead we will wait for the valid error going up 3 times in a row
   # We save the curb of the validation error so we can always go back to check on it 
   # and we save the absolute best model anyway, so we might as well explore
   # a bit when diverging
   
    #approximate number of samples in the nist training set
    #this is just to have a validation frequency
    #roughly proportionnal to the original nist training set
    n_minibatches        = 650000/batch_size
    
    
    patience              =2*nb_max_exemples/batch_size #in units of minibatch
    validation_frequency = n_minibatches/4
   
     

   
    
    best_validation_loss = float('inf')
    best_iter            = 0
    test_score           = 0.
    start_time = time.clock()
    time_n=0 #in unit of exemples
    minibatch_index=0
    epoch=0
    temp=0
    divergence_flag=0
    
    
    
    
    print 'starting training'
    sys.stdout.flush()
    while(minibatch_index*batch_size<nb_max_exemples):
        
        for x, y in dataset.train(batch_size):

            #if we are using the classic learning rate deacay, adjust it before training of current mini-batch
            if adaptive_lr==2:
                    classifier.lr.value = tau*initial_lr/(tau+time_n)
        
            
            #train model
            cost_ij = train_model(x,y)
    
            if (minibatch_index) % validation_frequency == 0: 
                #save the current learning rate
                learning_rate_list.append(classifier.lr.value)
                divergence_flag_list.append(divergence_flag)

                
                
                # compute the validation error
                this_validation_loss = 0.
                temp=0
                for xv,yv in dataset.valid(1):
                    # sum up the errors for each minibatch
                    this_validation_loss += test_model(xv,yv)
                    temp=temp+1
                # get the average by dividing with the number of minibatches
                this_validation_loss /= temp
                #save the validation loss
                total_validation_error_list.append(this_validation_loss)
                
		print(('epoch %i, minibatch %i, learning rate %f current validation error %f ') % 
			(epoch, minibatch_index+1,classifier.lr.value,
			this_validation_loss*100.))
		sys.stdout.flush()
				
		#save temp results to check during training
                numpy.savez('temp_results.npy',config=configuration,total_validation_error_list=total_validation_error_list,\
                learning_rate_list=learning_rate_list, divergence_flag_list=divergence_flag_list)
    
                # if we got the best validation score until now
                if this_validation_loss < best_validation_loss:
                    # save best validation score and iteration number
                    best_validation_loss = this_validation_loss
                    best_iter = minibatch_index
                    #reset divergence flag
                    divergence_flag=0
                    
                    #save the best model. Overwrite the current saved best model so
                    #we only keep the best
                    numpy.savez('best_model.npy', config=configuration, W1=classifier.W1.value, W2=classifier.W2.value, b1=classifier.b1.value,\
                    b2=classifier.b2.value, minibatch_index=minibatch_index)

                    # test it on the test set
                    test_score = 0.
                    temp =0
                    for xt,yt in dataset.test(batch_size):
                        test_score += test_model(xt,yt)
                        temp = temp+1
                    test_score /= temp
                    
		    print(('epoch %i, minibatch %i, test error of best '
			'model %f %%') % 
				(epoch, minibatch_index+1,
				test_score*100.))
                    sys.stdout.flush()
                                    
                # if the validation error is going up, we are overfitting (or oscillating)
                # check if we are allowed to continue and if we will adjust the learning rate
                elif this_validation_loss >= best_validation_loss:
                   
                    
                    # In non-classic learning rate decay, we modify the weight only when
                    # validation error is going up
                    if adaptive_lr==1:
                        classifier.lr.value=classifier.lr.value*lr_t2_factor
                           
                   
                    #cap the patience so we are allowed to diverge max_div_count times
                    #if we are going up max_div_count in a row, we will stop immediatelty by modifying the patience
                    divergence_flag = divergence_flag +1
                    
                    
                    #calculate the test error at this point and exit
                    # test it on the test set
                    test_score = 0.
                    temp=0
                    for xt,yt in dataset.test(batch_size):
                        test_score += test_model(xt,yt)
                        temp=temp+1
                    test_score /= temp
                    
                    print ' validation error is going up, possibly stopping soon'
                    print(('     epoch %i, minibatch %i, test error of best '
                        'model %f %%') % 
                                (epoch, minibatch_index+1,
                                test_score*100.))
                    sys.stdout.flush()
                                    
                    
    
            # check early stop condition
            if divergence_flag==max_div_count:
                minibatch_index=nb_max_exemples
                print 'we have diverged, early stopping kicks in'
                break
            
            #check if we have seen enough exemples
            #force one epoch at least
            if epoch>0 and minibatch_index*batch_size>nb_max_exemples:
                break


                       
    
    
            time_n= time_n + batch_size
            minibatch_index =  minibatch_index + 1
            
        # we have finished looping through the training set
        epoch = epoch+1
    end_time = time.clock()
   
    print(('Optimization complete. Best validation score of %f %% '
        'obtained at iteration %i, with test performance %f %%') %  
                (best_validation_loss * 100., best_iter, test_score*100.))
    print ('The code ran for %f minutes' % ((end_time-start_time)/60.))
    print minibatch_index
    sys.stdout.flush()
        
    #save the model and the weights
    numpy.savez('model.npy', config=configuration, W1=classifier.W1.value,W2=classifier.W2.value, b1=classifier.b1.value,b2=classifier.b2.value)
    numpy.savez('results.npy',config=configuration,total_train_error_list=total_train_error_list,total_validation_error_list=total_validation_error_list,\
    learning_rate_list=learning_rate_list, divergence_flag_list=divergence_flag_list)
    
    return (best_training_error*100.0,best_validation_loss * 100.,test_score*100.,best_iter*batch_size,(end_time-start_time)/60)


if __name__ == '__main__':
    mlp_full_mnist()

def jobman_mlp_full_nist(state,channel):
    (train_error,validation_error,test_error,nb_exemples,time)=mlp_full_nist(learning_rate=state.learning_rate,\
										nb_max_exemples=state.nb_max_exemples,\
										nb_hidden=state.nb_hidden,\
										adaptive_lr=state.adaptive_lr,\
										tau=state.tau,\
										verbose = state.verbose,\
										lr_t2_factor=state.lr_t2_factor,
                                        data_set=state.data_set,
                                        channel=channel)
    state.train_error=train_error
    state.validation_error=validation_error
    state.test_error=test_error
    state.nb_exemples=nb_exemples
    state.time=time
    pylearn.version.record_versions(state,[theano,ift6266,pylearn])
    return channel.COMPLETE