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I built a Neural Network with Dropout using Keras in Python. I want to find out how this network updates the weights. For simplicity, only one training data was prepared.

I trained the model under the following conditions: (1): Model that doesn't include the Dropout layer (2): Model that includes the Dropout layer and has the keyword training = False (Dropout is ignored during the prediction stage) (3): Model that includes the Dropout layer and sets the keyword training = True (Dropout is also used in the prediction stage)

(I want to use (3) to evaluate the uncertainty of the predicted value.)

After the model completed the training phase, I looked at the amount of weight updates in the model. Specifically, I show source code and execution results.

[Program]

drrate = 0.5

sample_x = np.array([[10]])
sample_y = np.array([1])

# Model
input_layer = Input(shape=(1,))
dence = input_layer
dence = Dropout(drrate)(dence, training=False) # In Condition (1), this line doesn't use.
dence = Dense(2,
                kernel_initializer= wi.glorot_normal(seed=0),
                bias_initializer= wi.glorot_normal(seed=1)
                )(dence)
dence = Activation("sigmoid")(dence)
dence = Dense( 1 ,
                kernel_initializer= wi.glorot_normal(seed=2),
                bias_initializer= wi.glorot_normal(seed=3)
              )(dence)
dence = Activation("linear")(dence)

model = Model(inputs=input_layer, outputs=dence)
model.compile(loss='mean_squared_error', optimizer='adam', metrics=['accuracy'])
model.summary()

model.fit(sample_x, sample_y)
weights = model.get_weights()
print("-----------Training-----------")
print(weights)
print("w11 : ", (weights[0][0][0] - w_11) )
print("w12 : ", (weights[0][0][1] - w_12) )
print("w21 : ", (weights[2][0][0] - w_21) )
print("w22 : ", (weights[2][1][0] - w_22) )

print("b11 : ", (weights[1][0] - b_11) )
print("b12 : ", (weights[1][1] - b_12) )
print("b21 : ", (weights[3][0] - b_21) )

[Result] We ran several simulations and summarized their results. (The result shows the "update amount" of the weight.)

(Condition : 1)
・Pattern - 1
w11 :  0.00074356794
w12 :  0.00074353814
w21 :  -0.00073981285
w22 :  -0.0007440895
b11 :  0.00073862076
b12 :  0.00073826313
b21 :  -0.0007441044


(Condition : 2)
・Pattern - 1
w11 :  0.00074356794
w12 :  0.00074353814
w21 :  -0.00073981285
w22 :  -0.0007440895
b11 :  0.00073862076
b12 :  0.00073826313
b21 :  -0.0007441044

・Pattern - 2
w11 :  0.0009992719
w12 :  0.0009991974
w21 :  -0.0009942055
w22 :  -0.0009999275
b11 :  0.0009925961
b12 :  0.0009920597
b21 :  -0.0009999275

(Condition : 3)
・Pattern - 1
w11 :  0.0009864867
w12 :  0.0009983182
w21 :  -0.0008209944
w22 :  -0.0009999424
b11 :  0.0007850528
b12 :  0.0009675026
b21 :  -0.0009999275

・Pattern - 2
w11 :  0.0
w12 :  0.0
w21 :  0.0009999871
w22 :  0.0009999871
b11 :  -0.0009999275
b12 :  -0.0009996891
b21 :  0.0010000467

・Pattern - 3
w11 :  0.0007340908
w12 :  0.0007428825
w21 :  -0.0006109476
w22 :  -0.0007440895
b11 :  0.0005841851
b12 :  0.0007199049
b21 :  -0.0007441044

The results showed that:

・ Update amount is corrected when Dropout is enabled

・ The correction method differs depending on whether the training is True or False.

However, I have the following questions:

・ Why there is no "pattern whose update amount is 0" in condition 2?

・ Why do you get 3 patterns results instead of 2 patterns in condition 3?

・Why doesn't condition 3 produce the same result as condition 1 and 2?

I don't understand how Keras behaves when Dropout exists. Help me.

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    I don't get why are you looking at the weights and its relation to Dropout.
    – Dr. Snoopy
    Commented Jan 16, 2020 at 7:30
  • I want to understand how is NN with Dropout trained and does compute output, because I can trust the calculation result. If I cannot explain their behavior, I think I should not use them.
    – Tine
    Commented Jan 17, 2020 at 0:16
  • Sure, but what does Dropout have to do with weights? What do you understand about how dropout works?
    – Dr. Snoopy
    Commented Jan 17, 2020 at 0:18
  • From prior knowledge and experimental results, I believe that Dropout works as follows during the learning phase. training = False: Change output value to 0 with probability drrate, output value does not change with probability (1-drrate). training = True: Output value is changed to 0 with probability drrate, and output value is multiplied by 1 / (1-drrate) with probability (1-drrate).
    – Tine
    Commented Jan 17, 2020 at 8:23
  • On the other hand, I believe that Dropout works at the prediction stage as follows. training = False: Dropout layer is completely ignored. (i.e. In most cases, the network at the prediction stage is larger than the network at the learning stage) training = True: Output value is changed to 0 with probability drrate, and output value is multiplied by 1 / (1-drrate) with probability (1-drrate).
    – Tine
    Commented Jan 17, 2020 at 8:23

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