• 改善深层神经网络-week2编程题(Optimization Methods)


    1. Optimization Methods

    Gradient descent goes "downhill" on a cost function (J). Think of it as trying to do this:

    **Figure 1** : **Minimizing the cost is like finding the lowest point in a hilly landscape**
    At each step of the training, you update your parameters following a certain direction to try to get to the lowest possible point.

    Notations: As usual, (frac{partial J}{partial a}=) da for any variable a.

    To get started, run the following code to import the libraries you will need.

    import numpy as np
    import matplotlib.pyplot as plt
    import scipy.io
    import math
    import sklearn
    import sklearn.datasets
    
    from opt_utils import load_params_and_grads, initialize_parameters, forward_propagation, backward_propagation
    from opt_utils import compute_cost, predict, predict_dec, plot_decision_boundary, load_dataset
    from testCases import *
    
    %matplotlib inline
    plt.rcParams['figure.figsize'] = (7.0, 4.0) # set default size of plots
    plt.rcParams['image.interpolation'] = 'nearest'
    plt.rcParams['image.cmap'] = 'gray'
    

    1.1 - Gradient Descent

    A simple optimization method in machine learning is gradient descent (GD). When you take gradient steps with respect to all (m) examples on each step, it is also called Batch Gradient Descent.

    Warm-up exercise: Implement the gradient descent update rule. The gradient descent rule is, for (l = 1, ..., L):

    [W^{[l]} = W^{[l]} - alpha ext{ } dW^{[l]} ag{1} ]

    [b^{[l]} = b^{[l]} - alpha ext{ } db^{[l]} ag{2} ]

    where L is the number of layers and (alpha) is the learning rate. All parameters should be stored in the parameters dictionary. Note that the iterator l starts at 0 in the for loop while the first parameters are (W^{[1]}) and (b^{[1]}). You need to shift l to l+1 when coding.

    # GRADED FUNCTION: update_parameters_with_gd
    
    def update_parameters_with_gd(parameters, grads, learning_rate):
        """
        Update parameters using one step of gradient descent
        
        Arguments:
        parameters -- python dictionary containing your parameters to be updated:
                        parameters['W' + str(l)] = Wl
                        parameters['b' + str(l)] = bl
        grads -- python dictionary containing your gradients to update each parameters:
                        grads['dW' + str(l)] = dWl
                        grads['db' + str(l)] = dbl
        learning_rate -- the learning rate, scalar.
        
        Returns:
        parameters -- python dictionary containing your updated parameters 
        """
    
        L = len(parameters) // 2 # number of layers in the neural networks
    
        # Update rule for each parameter
        for l in range(L):
            ### START CODE HERE ### (approx. 2 lines)    
            parameters['W' + str(l+1)] = parameters['W' + str(l+1)] - learning_rate*grads['dW' + str(l+1)]
            parameters['b' + str(l+1)] = parameters['b' + str(l+1)] - learning_rate*grads['db' + str(l+1)]     
            ### END CODE HERE ###
            
        return parameters
    

    测试:

    parameters, grads, learning_rate = update_parameters_with_gd_test_case()
    
    parameters = update_parameters_with_gd(parameters, grads, learning_rate)
    print("W1 = " + str(parameters["W1"]))
    print("b1 = " + str(parameters["b1"]))
    print("W2 = " + str(parameters["W2"]))
    print("b2 = " + str(parameters["b2"]))
    

    输出:
    W1 = [[ 1.63535156 -0.62320365 -0.53718766]
    [-1.07799357 0.85639907 -2.29470142]]
    b1 = [[ 1.74604067]
    [-0.75184921]]
    W2 = [[ 0.32171798 -0.25467393 1.46902454]
    [-2.05617317 -0.31554548 -0.3756023 ]
    [ 1.1404819 -1.09976462 -0.1612551 ]]
    b2 = [[-0.88020257]
    [ 0.02561572]
    [ 0.57539477]]

    A variant of this is Stochastic Gradient Descent (SGD), which is equivalent to mini-batch gradient descent where each mini-batch has just 1 example. The update rule that you have just implemented does not change. What changes is that you would be computing gradients on just one training example at a time, rather than on the whole training set. The code examples below illustrate the difference between stochastic gradient descent and (batch) gradient descent.

    • (Batch) Gradient Descent:
    X = data_input
    Y = labels
    parameters = initialize_parameters(layers_dims)
    for i in range(0, num_iterations):
        # Forward propagation
        a, caches = forward_propagation(X, parameters)
        # Compute cost.
        cost = compute_cost(a, Y)
        # Backward propagation.
        grads = backward_propagation(a, caches, parameters)
        # Update parameters.
        parameters = update_parameters(parameters, grads)
            
    
    • Stochastic Gradient Descent:
    X = data_input
    Y = labels
    parameters = initialize_parameters(layers_dims)
    for i in range(0, num_iterations):
        for j in range(0, m):
            # Forward propagation
            a, caches = forward_propagation(X[:,j], parameters)
            # Compute cost
            cost = compute_cost(a, Y[:,j])
            # Backward propagation
            grads = backward_propagation(a, caches, parameters)
            # Update parameters.
            parameters = update_parameters(parameters, grads)
    

    In Stochastic Gradient Descent, you use only 1 training example before updating the gradients. When the training set is large, SGD can be faster. But the parameters will "oscillate" toward the minimum rather than converge smoothly. Here is an illustration of this:

    **Figure 1** : **SGD vs GD**
    "+" denotes a minimum of the cost. SGD leads to many oscillations(振动) to reach convergence(收敛). But each step is a lot faster to compute for SGD than for GD, as it uses only one training example (vs. the whole batch for GD).

    Note also that implementing SGD requires 3 for-loops in total:

    1. Over the number of iterations
    2. Over the (m) training examples
    3. Over the layers (to update all parameters, from ((W^{[1]},b^{[1]})) to ((W^{[L]},b^{[L]})))

    In practice, you'll often get faster results if you do not use neither the whole training set, nor only one training example, to perform each update. Mini-batch gradient descent uses an intermediate number of examples for each step. With mini-batch gradient descent, you loop over the mini-batches instead of looping over individual training examples.

    **Figure 2** : **SGD vs Mini-Batch GD**
    "+" denotes a minimum of the cost. Using mini-batches in your optimization algorithm often leads to faster optimization.

    What you should remember:

    • The difference between gradient descent, mini-batch gradient descent and stochastic gradient descent is the number of examples you use to perform one update step.
    • You have to tune a learning rate hyperparameter (alpha).
    • With a well-turned mini-batch size, usually it outperforms either gradient descent or stochastic gradient descent (particularly when the training set is large).

    1.2 - Mini-Batch Gradient descent

    Let's learn how to build mini-batches from the training set (X, Y).

    There are two steps:

    • Shuffle(洗牌): Create a shuffled version of the training set (X, Y) as shown below. Each column of X and Y represents a training example. Note that the random shuffling is done synchronously(同步地) between X and Y. Such that after the shuffling the (i^{th}) column of X is the example corresponding to the (i^{th}) label in Y. The shuffling step ensures that examples will be split randomly into different mini-batches.
    • Partition(分割): Partition the shuffled (X, Y) into mini-batches of size mini_batch_size (here 64). Note that the number of training examples is not always divisible(可分割的) by mini_batch_size. The last mini batch might be smaller, but you don't need to worry about this. When the final mini-batch is smaller than the full mini_batch_size, it will look like this:

    Exercise: Implement random_mini_batches. We coded the shuffling part for you. To help you with the partitioning step, we give you the following code that selects the indexes for the (1^{st}) and (2^{nd}) mini-batches:

    first_mini_batch_X = shuffled_X[:, 0 : mini_batch_size]
    second_mini_batch_X = shuffled_X[:, mini_batch_size : 2 * mini_batch_size]
    ...
    

    Note that the last mini-batch might end up smaller than mini_batch_size=64. Let (lfloor s floor) represents (s) rounded down to the nearest integer (this is math.floor(s) in Python). If the total number of examples is not a multiple of mini_batch_size=64 then there will be (lfloor frac{m}{mini\_batch\_size} floor) mini-batches with a full 64 examples, and the number of examples in the final mini-batch will be ((m-mini_\_batch_\_size imes lfloor frac{m}{mini\_batch\_size} floor)).

    # GRADED FUNCTION: random_mini_batches
    
    def random_mini_batches(X, Y, mini_batch_size = 64, seed = 0):
        """
        Creates a list of random minibatches from (X, Y)
        
        Arguments:
        X -- input data, of shape (input size, number of examples)
        Y -- true "label" vector (1 for blue dot / 0 for red dot), of shape (1, number of examples)
        mini_batch_size -- size of the mini-batches, integer
        
        Returns:
        mini_batches -- list of synchronous (mini_batch_X, mini_batch_Y)
        """
        
        np.random.seed(seed)            # To make your "random" minibatches the same as ours
        m = X.shape[1]                  # number of training examples
        mini_batches = []
            
        # Step 1: Shuffle (X, Y)
        permutation = list(np.random.permutation(m))
        shuffled_X = X[:, permutation]
        shuffled_Y = Y[:, permutation].reshape((1,m))
    
        # Step 2: Partition (shuffled_X, shuffled_Y). Minus the end case.
        num_complete_minibatches = math.floor(m/mini_batch_size) # number of mini batches of size mini_batch_size in your partitionning
        for k in range(0, num_complete_minibatches):
            ### START CODE HERE ### (approx. 2 lines)
            mini_batch_X = shuffled_X[:, k*mini_batch_size : (k+1)*mini_batch_size]
            mini_batch_Y = shuffled_Y[:, k*mini_batch_size : (k+1)*mini_batch_size]
            ### END CODE HERE ###
            mini_batch = (mini_batch_X, mini_batch_Y)
            mini_batches.append(mini_batch)
        
        # Handling the end case (last mini-batch < mini_batch_size)
        if m % mini_batch_size != 0:
            ### START CODE HERE ### (approx. 2 lines)
            mini_batch_X = shuffled_X[:, num_complete_minibatches*mini_batch_size: ]
            mini_batch_Y = shuffled_Y[:, num_complete_minibatches*mini_batch_size: ]
            ### END CODE HERE ###
            mini_batch = (mini_batch_X, mini_batch_Y)
            mini_batches.append(mini_batch)
        
        return mini_batches
    
    X_assess, Y_assess, mini_batch_size = random_mini_batches_test_case()
    mini_batches = random_mini_batches(X_assess, Y_assess, mini_batch_size)
    
    print ("shape of the 1st mini_batch_X: " + str(mini_batches[0][0].shape))
    print ("shape of the 2nd mini_batch_X: " + str(mini_batches[1][0].shape))
    print ("shape of the 3rd mini_batch_X: " + str(mini_batches[2][0].shape))
    
    print ("shape of the 1st mini_batch_Y: " + str(mini_batches[0][1].shape))
    print ("shape of the 2nd mini_batch_Y: " + str(mini_batches[1][1].shape)) 
    print ("shape of the 3rd mini_batch_Y: " + str(mini_batches[2][1].shape))
    
    print ("mini batch sanity check: " + str(mini_batches[0][0][1][0:3]))
    print ("mini batch sanity check: " + str(mini_batches[0][1][0][0:3]))
    

    输出:
    shape of the 1st mini_batch_X: (12288, 64)
    shape of the 2nd mini_batch_X: (12288, 64)
    shape of the 3rd mini_batch_X: (12288, 20)
    shape of the 1st mini_batch_Y: (1, 64)
    shape of the 2nd mini_batch_Y: (1, 64)
    shape of the 3rd mini_batch_Y: (1, 20)
    mini batch sanity check: [ 2.52832571 -0.10015523 -0.61736206]
    mini batch sanity check: [ True False True]

    What you should remember:

    • Shuffling and Partitioning are the two steps required to build mini-batches
    • Powers of two are often chosen to be the mini-batch size, e.g., 16, 32, 64, 128.

    1.3 - Momentum

    Because mini-batch gradient descent makes a parameter update after seeing just a subset of examples, the direction of the update has some variance, and so the path taken by mini-batch gradient descent will "oscillate"(振荡) toward convergence(收敛). Using momentum can reduce these oscillations.

    Momentum takes into account the past gradients to smooth out the update. We will store the 'direction' of the previous gradients in the variable (v). Formally, this will be the exponentially weighted average(指数加权平均) of the gradient on previous steps. You can also think of (v) as the "velocity" of a ball rolling downhill, building up speed (and momentum) according to the direction of the gradient/slope of the hill.

    Figure 3: The red arrows shows the direction taken by one step of mini-batch gradient descent with momentum. The blue points show the direction of the gradient (with respect to the current mini-batch) on each step. Rather than just following the gradient, we let the gradient influence (v) and then take a step in the direction of (v) .

    Exercise: Initialize the velocity. The velocity, (v), is a python dictionary that needs to be initialized with arrays of zeros. Its keys are the same as those in the grads dictionary, that is:
    for (l =1,...,L):

    v["dW" + str(l+1)] = ... #(numpy array of zeros with the same shape as parameters["W" + str(l+1)])
    v["db" + str(l+1)] = ... #(numpy array of zeros with the same shape as parameters["b" + str(l+1)])
    

    Note that the iterator l starts at 0 in the for loop while the first parameters are v["dW1"] and v["db1"] (that's a "one" on the superscript). This is why we are shifting l to l+1 in the for loop.

    # GRADED FUNCTION: initialize_velocity
    
    def initialize_velocity(parameters):
        """
        Initializes the velocity as a python dictionary with:
                    - keys: "dW1", "db1", ..., "dWL", "dbL" 
                    - values: numpy arrays of zeros of the same shape as the corresponding gradients/parameters.
        Arguments:
        parameters -- python dictionary containing your parameters.
                        parameters['W' + str(l)] = Wl
                        parameters['b' + str(l)] = bl
        
        Returns:
        v -- python dictionary containing the current velocity.
                        v['dW' + str(l)] = velocity of dWl
                        v['db' + str(l)] = velocity of dbl
        """
        
        L = len(parameters) // 2 # number of layers in the neural networks
        v = {}
        
        # Initialize velocity
        for l in range(L):
            ### START CODE HERE ### (approx. 2 lines)
            v['dW' + str(l+1)] = np.zeros(parameters['W'+str(l+1)].shape)
            v['db' + str(l+1)] = np.zeros(parameters['b'+str(l+1)].shape)
            ### END CODE HERE ###
            
        return v
    
    parameters = initialize_velocity_test_case()
    
    v = initialize_velocity(parameters)
    print("v["dW1"] = " + str(v["dW1"]))
    print("v["db1"] = " + str(v["db1"]))
    print("v["dW2"] = " + str(v["dW2"]))
    print("v["db2"] = " + str(v["db2"]))
    

    v["dW1"] = [[0. 0. 0.]
    [0. 0. 0.]]
    v["db1"] = [[0.]
    [0.]]
    v["dW2"] = [[0. 0. 0.]
    [0. 0. 0.]
    [0. 0. 0.]]
    v["db2"] = [[0.]
    [0.]
    [0.]]

    Exercise: Now, implement the parameters update with momentum. The momentum update rule is, for (l = 1, ..., L):

    [ egin{cases} v_{dW^{[l]}} = eta v_{dW^{[l]}} + (1 - eta) dW^{[l]} \ W^{[l]} = W^{[l]} - alpha v_{dW^{[l]}} end{cases} ag{3}]

    [egin{cases} v_{db^{[l]}} = eta v_{db^{[l]}} + (1 - eta) db^{[l]} \ b^{[l]} = b^{[l]} - alpha v_{db^{[l]}} end{cases} ag{4}]

    where L is the number of layers, (eta) is the momentum(动量) and (alpha) is the learning rate. All parameters should be stored in the parameters dictionary. Note that the iterator l starts at 0 in the for loop while the first parameters are (W^{[1]}) and (b^{[1]}) (that's a "one" on the superscript). So you will need to shift l to l+1 when coding.

    # GRADED FUNCTION: update_parameters_with_momentum
    
    def update_parameters_with_momentum(parameters, grads, v, beta, learning_rate):
        """
        Update parameters using Momentum
        
        Arguments:
        parameters -- python dictionary containing your parameters:
                        parameters['W' + str(l)] = Wl
                        parameters['b' + str(l)] = bl
        grads -- python dictionary containing your gradients for each parameters:
                        grads['dW' + str(l)] = dWl
                        grads['db' + str(l)] = dbl
        v -- python dictionary containing the current velocity:
                        v['dW' + str(l)] = ...
                        v['db' + str(l)] = ...
        beta -- the momentum hyperparameter, scalar
        learning_rate -- the learning rate, scalar
        
        Returns:
        parameters -- python dictionary containing your updated parameters 
        v -- python dictionary containing your updated velocities
        """
    
        L = len(parameters) // 2 # number of layers in the neural networks
        
        # Momentum update for each parameter
        for l in range(L):
            
            ### START CODE HERE ### (approx. 4 lines)
            # compute velocities
            v['dW' + str(l+1)] = beta * v['dW' + str(l+1)] + (1-beta)*(grads['dW' + str(l+1)])
            v['db' + str(l+1)] = beta * v['db' + str(l+1)] + (1-beta)*(grads['db' + str(l+1)])
            
            # update parameters
            parameters['W' + str(l+1)] = parameters['W' + str(l+1)] - learning_rate * v['dW' + str(l+1)]
            parameters['b' + str(l+1)] = parameters['b' + str(l+1)] - learning_rate * v['db' + str(l+1)]
            ### END CODE HERE ###
            
        return parameters, v
    

    测试:

    parameters, grads, v = update_parameters_with_momentum_test_case()
    parameters, v = update_parameters_with_momentum(parameters, grads, v, beta = 0.9, learning_rate = 0.01)
    print("W1 = " + str(parameters["W1"]))
    print("b1 = " + str(parameters["b1"]))
    print("W2 = " + str(parameters["W2"]))
    print("b2 = " + str(parameters["b2"]))
    print("v["dW1"] = " + str(v["dW1"]))
    print("v["db1"] = " + str(v["db1"]))
    print("v["dW2"] = " + str(v["dW2"]))
    print("v["db2"] = " + str(v["db2"]))
    

    输出:
    W1 = [[ 1.62544598 -0.61290114 -0.52907334]
    [-1.07347112 0.86450677 -2.30085497]]
    b1 = [[ 1.74493465]
    [-0.76027113]]
    W2 = [[ 0.31930698 -0.24990073 1.4627996 ]
    [-2.05974396 -0.32173003 -0.38320915]
    [ 1.13444069 -1.0998786 -0.1713109 ]]
    b2 = [[-0.87809283]
    [ 0.04055394]
    [ 0.58207317]]
    v["dW1"] = [[-0.11006192 0.11447237 0.09015907]
    [ 0.05024943 0.09008559 -0.06837279]]
    v["db1"] = [[-0.01228902]
    [-0.09357694]]
    v["dW2"] = [[-0.02678881 0.05303555 -0.06916608]
    [-0.03967535 -0.06871727 -0.08452056]
    [-0.06712461 -0.00126646 -0.11173103]]
    v["db2"] = [[0.02344157]
    [0.16598022]
    [0.07420442]]

    Note that:

    • The velocity is initialized with zeros. So the algorithm will take a few iterations to "build up" velocity and start to take bigger steps.
    • If (eta = 0), then this just becomes standard gradient descent without momentum.

    How do you choose (eta)?

    • The larger the momentum (eta) is, the smoother the update because the more we take the past gradients into account. But if (eta) is too big, it could also smooth out the updates too much.
    • Common values for (eta) range from 0.8 to 0.999. If you don't feel inclined to tune this, (eta = 0.9) is often a reasonable default.
    • Tuning the optimal (eta) for your model might need trying several values to see what works best in term of reducing the value of the cost function (J).

    What you should remember:

    • Momentum takes past gradients into account to smooth out the steps of gradient descent. It can be applied with batch gradient descent, mini-batch gradient descent or stochastic gradient descent.
    • You have to tune a momentum hyperparameter (eta) and a learning rate (alpha).

    1.4 - Adam

    Adam is one of the most effective optimization algorithms for training neural networks. It combines ideas from RMSProp (described in lecture) and Momentum.

    How does Adam work?

    1. It calculates an exponentially weighted average of past gradients, and stores it in variables (v) (before bias correction) and (v^{corrected}) (with bias correction).
    2. It calculates an exponentially weighted average of the squares of the past gradients, and stores it in variables (s) (before bias correction) and (s^{corrected}) (with bias correction).
    3. It updates parameters in a direction based on combining information from "1" and "2".

    The update rule is, for (l = 1, ..., L):

    [egin{cases} v_{dW^{[l]}} = eta_1 v_{dW^{[l]}} + (1 - eta_1) frac{partial mathcal{J} }{ partial W^{[l]} } \ v^{corrected}_{dW^{[l]}} = frac{v_{dW^{[l]}}}{1 - (eta_1)^t} \ s_{dW^{[l]}} = eta_2 s_{dW^{[l]}} + (1 - eta_2) (frac{partial mathcal{J} }{partial W^{[l]} })^2 \ s^{corrected}_{dW^{[l]}} = frac{s_{dW^{[l]}}}{1 - (eta_1)^t} \ W^{[l]} = W^{[l]} - alpha frac{v^{corrected}_{dW^{[l]}}}{sqrt{s^{corrected}_{dW^{[l]}}} + varepsilon} end{cases}]

    where:

    • t counts the number of steps taken of Adam
    • L is the number of layers
    • (eta_1) and (eta_2) are hyperparameters that control the two exponentially weighted averages(指数加权平均).
    • (alpha) is the learning rate
    • (varepsilon) is a very small number to avoid dividing by zero

    As usual, we will store all parameters in the parameters dictionary

    # GRADED FUNCTION: initialize_adam
    
    def initialize_adam(parameters) :
        """
        Initializes v and s as two python dictionaries with:
                    - keys: "dW1", "db1", ..., "dWL", "dbL" 
                    - values: numpy arrays of zeros of the same shape as the corresponding gradients/parameters.
        
        Arguments:
        parameters -- python dictionary containing your parameters.
                        parameters["W" + str(l)] = Wl
                        parameters["b" + str(l)] = bl
        
        Returns: 
        v -- python dictionary that will contain the exponentially weighted average of the gradient.
                        v["dW" + str(l)] = ...
                        v["db" + str(l)] = ...
        s -- python dictionary that will contain the exponentially weighted average of the squared gradient.
                        s["dW" + str(l)] = ...
                        s["db" + str(l)] = ...
    
        """
        
        L = len(parameters) // 2 # number of layers in the neural networks
        v = {}
        s = {}
        
        # Initialize v, s. Input: "parameters". Outputs: "v, s".
        for l in range(L):
        ### START CODE HERE ### (approx. 4 lines)
            v['dW' + str(l+1)] = np.zeros(parameters['W' + str(l+1)].shape)
            v['db' + str(l+1)] = np.zeros(parameters['b' + str(l+1)].shape)
            s['dW' + str(l+1)] = np.zeros(parameters['b' + str(l+1)].shape)
            s['db' + str(l+1)] = np.zeros(parameters['b' + str(l+1)].shape)
        ### END CODE HERE ###
        
        return v, s
    

    测试:

    parameters = initialize_adam_test_case()
    
    v, s = initialize_adam(parameters)
    print("v["dW1"] = " + str(v["dW1"]))
    print("v["db1"] = " + str(v["db1"]))
    print("v["dW2"] = " + str(v["dW2"]))
    print("v["db2"] = " + str(v["db2"]))
    print("s["dW1"] = " + str(s["dW1"]))
    print("s["db1"] = " + str(s["db1"]))
    print("s["dW2"] = " + str(s["dW2"]))
    print("s["db2"] = " + str(s["db2"]))
    

    输出:
    v["dW1"] = [[0. 0. 0.]
    [0. 0. 0.]]
    v["db1"] = [[0.]
    [0.]]
    v["dW2"] = [[0. 0. 0.]
    [0. 0. 0.]
    [0. 0. 0.]]
    v["db2"] = [[0.]
    [0.]
    [0.]]
    s["dW1"] = [[0.]
    [0.]]
    s["db1"] = [[0.]
    [0.]]
    s["dW2"] = [[0.]
    [0.]
    [0.]]
    s["db2"] = [[0.]
    [0.]
    [0.]]

    Exercise: Now, implement the parameters update with Adam. Recall the general update rule is, for (l = 1, ..., L):

    [egin{cases} v_{W^{[l]}} = eta_1 v_{W^{[l]}} + (1 - eta_1) frac{partial J }{ partial W^{[l]} } \ v^{corrected}_{W^{[l]}} = frac{v_{W^{[l]}}}{1 - (eta_1)^t} \ s_{W^{[l]}} = eta_2 s_{W^{[l]}} + (1 - eta_2) (frac{partial J }{partial W^{[l]} })^2 \ s^{corrected}_{W^{[l]}} = frac{s_{W^{[l]}}}{1 - (eta_2)^t} \ W^{[l]} = W^{[l]} - alpha frac{v^{corrected}_{W^{[l]}}}{sqrt{s^{corrected}_{W^{[l]}}}+varepsilon} end{cases}]

    Note that the iterator l starts at 0 in the for loop while the first parameters are (W^{[1]}) and (b^{[1]}). You need to shift l to l+1 when coding.

    # GRADED FUNCTION: update_parameters_with_adam
    
    def update_parameters_with_adam(parameters, grads, v, s, t, learning_rate = 0.01,
                                    beta1 = 0.9, beta2 = 0.999,  epsilon = 1e-8):
        """
        Update parameters using Adam
        
        Arguments:
        parameters -- python dictionary containing your parameters:
                        parameters['W' + str(l)] = Wl
                        parameters['b' + str(l)] = bl
        grads -- python dictionary containing your gradients for each parameters:
                        grads['dW' + str(l)] = dWl
                        grads['db' + str(l)] = dbl
        v -- Adam variable, moving average of the first gradient, python dictionary
        s -- Adam variable, moving average of the squared gradient, python dictionary
        learning_rate -- the learning rate, scalar.
        beta1 -- Exponential decay hyperparameter for the first moment estimates 
        beta2 -- Exponential decay hyperparameter for the second moment estimates 
        epsilon -- hyperparameter preventing division by zero in Adam updates
    
        Returns:
        parameters -- python dictionary containing your updated parameters 
        v -- Adam variable, moving average of the first gradient, python dictionary
        s -- Adam variable, moving average of the squared gradient, python dictionary
        """
        
        L = len(parameters) // 2                 # number of layers in the neural networks
        v_corrected = {}                         # Initializing first moment estimate, python dictionary
        s_corrected = {}                         # Initializing second moment estimate, python dictionary
        
        # Perform Adam update on all parameters
        for l in range(L):
            # Moving average of the gradients. Inputs: "v, grads, beta1". Output: "v".
            ### START CODE HERE ### (approx. 2 lines)   
            v['dW' + str(l+1)] = beta1 * v['dW' + str(l+1)] + (1-beta1) * grads['dW' + str(l+1)]
            v['db' + str(l+1)] = beta1 * v['db' + str(l+1)] + (1-beta1) * grads['db' + str(l+1)]
            ### END CODE HERE ###
    
            # Compute bias-corrected first moment estimate. Inputs: "v, beta1, t". Output: "v_corrected".
            ### START CODE HERE ### (approx. 2 lines)
            v_corrected['dW' + str(l+1)] = v['dW' + str(l+1)] / (1 - np.power(beta1, t))
            v_corrected['db' + str(l+1)] = v['db' + str(l+1)] / (1 - np.power(beta1, t))
            
            ### END CODE HERE ###
    
            # Moving average of the squared gradients. Inputs: "s, grads, beta2". Output: "s".
            ### START CODE HERE ### (approx. 2 lines)    
            s['dW' + str(l+1)] = beta2 * s['dW' + str(l+1)] + (1-beta2) * np.power(grads['dW' + str(l+1)], 2)
            s['db' + str(l+1)] = beta2 * s['db' + str(l+1)] + (1-beta2) * np.power(grads['db' + str(l+1)], 2)
            ### END CODE HERE ###
    
            # Compute bias-corrected second raw moment estimate. Inputs: "s, beta2, t". Output: "s_corrected".
            ### START CODE HERE ### (approx. 2 lines)
            s_corrected['dW' + str(l+1)] = s['dW' + str(l+1)] / (1 - np.power(beta2, t))
            s_corrected['db' + str(l+1)] = s['db' + str(l+1)] / (1 - np.power(beta2, t))
            ### END CODE HERE ###
    
            # Update parameters. Inputs: "parameters, learning_rate, v_corrected, s_corrected, epsilon". Output: "parameters".
            ### START CODE HERE ### (approx. 2 lines)
            parameters['W' + str(l+1)] = parameters['W' + str(l+1)] - learning_rate * v_corrected['dW' + str(l+1)] / np.sqrt(s_corrected['dW' + str(l+1)] + epsilon)
            parameters["b" + str(l+1)] = parameters['b' + str(l+1)] - learning_rate * v_corrected['db' + str(l+1)] / np.sqrt(s_corrected['db' + str(l+1)] + epsilon)
            ### END CODE HERE ###
    
        return parameters, v, s
    

    测试:

    parameters, grads, v, s = update_parameters_with_adam_test_case()
    parameters, v, s  = update_parameters_with_adam(parameters, grads, v, s, t = 2)
    
    print("W1 = " + str(parameters["W1"]))
    print("b1 = " + str(parameters["b1"]))
    print("W2 = " + str(parameters["W2"]))
    print("b2 = " + str(parameters["b2"]))
    print("v["dW1"] = " + str(v["dW1"]))
    print("v["db1"] = " + str(v["db1"]))
    print("v["dW2"] = " + str(v["dW2"]))
    print("v["db2"] = " + str(v["db2"]))
    print("s["dW1"] = " + str(s["dW1"]))
    print("s["db1"] = " + str(s["db1"]))
    print("s["dW2"] = " + str(s["dW2"]))
    print("s["db2"] = " + str(s["db2"]))
    

    2. Model with different optimization algorithms

    Lets use the following "moons" dataset to test the different optimization methods. (The dataset is named "moons" because the data from each of the two classes looks a bit like a crescent-shaped moon.)

    train_X, train_Y = load_dataset()
    

    We have already implemented a 3-layer neural network. You will train it with:

    • Mini-batch Gradient Descent: it will call your function:
      • update_parameters_with_gd()
    • Mini-batch Momentum: it will call your functions:
      • initialize_velocity() and update_parameters_with_momentum()
    • Mini-batch Adam: it will call your functions:
      • initialize_adam() and update_parameters_with_adam()
    def model(X, Y, layers_dims, optimizer, learning_rate = 0.0007, mini_batch_size = 64, beta = 0.9,
              beta1 = 0.9, beta2 = 0.999,  epsilon = 1e-8, num_epochs = 10000, print_cost = True):
        """
        3-layer neural network model which can be run in different optimizer modes.
        
        Arguments:
        X -- input data, of shape (2, number of examples)
        Y -- true "label" vector (1 for blue dot / 0 for red dot), of shape (1, number of examples)
        layers_dims -- python list, containing the size of each layer
        learning_rate -- the learning rate, scalar.
        mini_batch_size -- the size of a mini batch
        beta -- Momentum hyperparameter
        beta1 -- Exponential decay hyperparameter for the past gradients estimates 
        beta2 -- Exponential decay hyperparameter for the past squared gradients estimates 
        epsilon -- hyperparameter preventing division by zero in Adam updates
        num_epochs -- number of epochs
        print_cost -- True to print the cost every 1000 epochs
    
        Returns:
        parameters -- python dictionary containing your updated parameters 
        """
    
        L = len(layers_dims)             # number of layers in the neural networks
        costs = []                       # to keep track of the cost
        t = 0                            # initializing the counter required for Adam update
        seed = 10                        # For grading purposes, so that your "random" minibatches are the same as ours
        
        # Initialize parameters
        parameters = initialize_parameters(layers_dims)
    
        # Initialize the optimizer
        if optimizer == "gd":
            pass # no initialization required for gradient descent
        elif optimizer == "momentum":
            v = initialize_velocity(parameters)
        elif optimizer == "adam":
            v, s = initialize_adam(parameters)
        
        # Optimization loop
        for i in range(num_epochs):
            
            # Define the random minibatches. We increment the seed to reshuffle differently the dataset after each epoch
            seed = seed + 1
            minibatches = random_mini_batches(X, Y, mini_batch_size, seed)  # [(x^{1},y^{1}), ......(x^{t}), y^{t}]
    
            for minibatch in minibatches:            
                # Select a minibatch
                (minibatch_X, minibatch_Y) = minibatch
    
                # Forward propagation
                a3, caches = forward_propagation(minibatch_X, parameters)
    
                # Compute cost
                cost = compute_cost(a3, minibatch_Y)
    
                # Backward propagation
                grads = backward_propagation(minibatch_X, minibatch_Y, caches)
    
                # Update parameters
                if optimizer == "gd":
                    parameters = update_parameters_with_gd(parameters, grads, learning_rate)
                elif optimizer == "momentum":
                    parameters, v = update_parameters_with_momentum(parameters, grads, v, beta, learning_rate)
                elif optimizer == "adam":
                    t = t + 1 # Adam counter
                    parameters, v, s = update_parameters_with_adam(parameters, grads, v, s,
                                                                   t, learning_rate, beta1, beta2,  epsilon)
            
            # Print the cost every 1000 epoch
            if print_cost and i % 1000 == 0:
                print ("Cost after epoch %i: %f" %(i, cost))
            if print_cost and i % 100 == 0:
                costs.append(cost)
                    
        # plot the cost
        plt.plot(costs)
        plt.ylabel('cost')
        plt.xlabel('epochs (per 100)')
        plt.title("Learning rate = " + str(learning_rate))
        plt.show()
    
        return parameters
    

    You will now run this 3 layer neural network with each of the 3 optimization methods.

    2.1 - Mini-batch Gradient descent

    Run the following code to see how the model does with mini-batch gradient descent.

    # train 3-layer model
    layers_dims = [train_X.shape[0], 5, 2, 1]
    parameters = model(train_X, train_Y, layers_dims, optimizer = "gd")
    
    # Predict
    predictions = predict(train_X, train_Y, parameters)
    
    # Plot decision boundary
    plt.title("Model with Gradient Descent optimization")
    axes = plt.gca()
    axes.set_xlim([-1.5,2.5])
    axes.set_ylim([-1,1.5])
    plot_decision_boundary(lambda x: predict_dec(parameters, x.T), train_X, train_Y)
    

    输出:
    Cost after epoch 0: 0.690736
    Cost after epoch 1000: 0.685273
    Cost after epoch 2000: 0.647072
    Cost after epoch 3000: 0.619525
    Cost after epoch 4000: 0.576584
    Cost after epoch 5000: 0.607243
    Cost after epoch 6000: 0.529403
    Cost after epoch 7000: 0.460768
    Cost after epoch 8000: 0.465586
    Cost after epoch 9000: 0.464518

    Accuracy: 0.7966666666666666

    2.2 - Mini-batch gradient descent with momentum

    Run the following code to see how the model does with momentum. Because this example is relatively simple, the gains from using momemtum are small; but for more complex problems you might see bigger gains.

    # train 3-layer model
    layers_dims = [train_X.shape[0], 5, 2, 1]
    parameters = model(train_X, train_Y, layers_dims, beta = 0.9, optimizer = "momentum")
    
    # Predict
    predictions = predict(train_X, train_Y, parameters)
    
    # Plot decision boundary
    plt.title("Model with Momentum optimization")
    axes = plt.gca()
    axes.set_xlim([-1.5,2.5])
    axes.set_ylim([-1,1.5])
    plot_decision_boundary(lambda x: predict_dec(parameters, x.T), train_X, train_Y)
    

    Cost after epoch 0: 0.690741
    Cost after epoch 1000: 0.685341
    Cost after epoch 2000: 0.647145
    Cost after epoch 3000: 0.619594
    Cost after epoch 4000: 0.576665
    Cost after epoch 5000: 0.607324
    Cost after epoch 6000: 0.529476
    Cost after epoch 7000: 0.460936
    Cost after epoch 8000: 0.465780
    Cost after epoch 9000: 0.464740

    Accuracy: 0.7966666666666666

    2.3 - Mini-batch with Adam mode

    Run the following code to see how the model does with Adam.

    # train 3-layer model
    layers_dims = [train_X.shape[0], 5, 2, 1]
    parameters = model(train_X, train_Y, layers_dims, optimizer = "adam")
    
    # Predict
    predictions = predict(train_X, train_Y, parameters)
    
    # Plot decision boundary
    plt.title("Model with Adam optimization")
    axes = plt.gca()
    axes.set_xlim([-1.5,2.5])
    axes.set_ylim([-1,1.5])
    plot_decision_boundary(lambda x: predict_dec(parameters, x.T), train_X, train_Y)
    

    Cost after epoch 0: 0.690552
    Cost after epoch 1000: 0.185501
    Cost after epoch 2000: 0.150830
    Cost after epoch 3000: 0.074454
    Cost after epoch 4000: 0.125959
    Cost after epoch 5000: 0.104344
    Cost after epoch 6000: 0.100676
    Cost after epoch 7000: 0.031652
    Cost after epoch 8000: 0.111973
    Cost after epoch 9000: 0.197940

    Accuracy: 0.94

    2.4 - Summary

    **optimization method** **accuracy** **cost shape**
    Gradient descent 79.7% oscillations
    Momentum 79.7% oscillations
    Adam 94% smoother

    Adam on the other hand, clearly outperforms mini-batch gradient descent and Momentum. Adam converges a lot faster.

    Adam 包含的优点:

    • 相对较低的内存需求 (though higher than gradient descent and gradient descent with momentum)
    • 即使很少的调试超参数,也可以工作的很好 (except (alpha))
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  • 原文地址:https://www.cnblogs.com/douzujun/p/13092358.html
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