thecaffeinedev/neural_network.py

## neural_network.py
from numpy import exp, array, random, dot


class NeuralNetwork():
    def __init__(self):
        # Seed the random number generator, so it generates the same numbers
        # every time the program runs.
        random.seed(1)

        # We model a single neuron, with 3 input connections and 1 output connection.
        # We assign random weights to a 3 x 1 matrix, with values in the range -1 to 1
        # and mean 0.
        self.synaptic_weights = 2 * random.random((3, 1)) - 1

    # The Sigmoid function, which describes an S shaped curve.
    # We pass the weighted sum of the inputs through this function to
    # normalise them between 0 and 1.
    def __sigmoid(self, x):
        return 1 / (1 + exp(-x))

    # The derivative of the Sigmoid function.
    # This is the gradient of the Sigmoid curve.
    # It indicates how confident we are about the existing weight.
    def __sigmoid_derivative(self, x):
        return x * (1 - x)

    # We train the neural network through a process of trial and error.
    # Adjusting the synaptic weights each time.
    def train(self, training_set_inputs, training_set_outputs, number_of_training_iterations):
        for iteration in range(number_of_training_iterations):
            # Pass the training set through our neural network (a single neuron).
            output = self.think(training_set_inputs)

            # Calculate the error (The difference between the desired output
            # and the predicted output).
            error = training_set_outputs - output

            # Multiply the error by the input and again by the gradient of the Sigmoid curve.
            # This means less confident weights are adjusted more.
            # This means inputs, which are zero, do not cause changes to the weights.
            adjustment = dot(training_set_inputs.T, error * self.__sigmoid_derivative(output))

            # Adjust the weights.
            self.synaptic_weights += adjustment

    # The neural network thinks.
    def think(self, inputs):
        # Pass inputs through our neural network (our single neuron).
        return self.__sigmoid(dot(inputs, self.synaptic_weights))


if __name__ == "__main__":

    #Intialise a single neuron neural network.
    neural_network = NeuralNetwork()

    print("Random starting synaptic weights: ")
    print(neural_network.synaptic_weights)

    # The training set. We have 4 examples, each consisting of 3 input values
    # and 1 output value.
    training_set_inputs = array([[0, 0, 1], [1, 1, 1], [1, 0, 1], [0, 1, 1]])
    training_set_outputs = array([[0, 1, 1, 0]]).T

    # Train the neural network using a training set.
    # Do it 10,000 times and make small adjustments each time.
    neural_network.train(training_set_inputs, training_set_outputs, 10000)

    print("New synaptic weights after training: ")
    print(neural_network.synaptic_weights)

    # Test the neural network with a new situation.
    print("Considering new situation [1, 0, 0] -> ?: ")
    print(neural_network.think(array([1, 0, 0])))
	from numpy import exp, array, random, dot


	class NeuralNetwork():
	def __init__(self):
	# Seed the random number generator, so it generates the same numbers
	# every time the program runs.
	random.seed(1)

	# We model a single neuron, with 3 input connections and 1 output connection.
	# We assign random weights to a 3 x 1 matrix, with values in the range -1 to 1
	# and mean 0.
	self.synaptic_weights = 2 * random.random((3, 1)) - 1

	# The Sigmoid function, which describes an S shaped curve.
	# We pass the weighted sum of the inputs through this function to
	# normalise them between 0 and 1.
	def __sigmoid(self, x):
	return 1 / (1 + exp(-x))

	# The derivative of the Sigmoid function.
	# This is the gradient of the Sigmoid curve.
	# It indicates how confident we are about the existing weight.
	def __sigmoid_derivative(self, x):
	return x * (1 - x)

	# We train the neural network through a process of trial and error.
	# Adjusting the synaptic weights each time.
	def train(self, training_set_inputs, training_set_outputs, number_of_training_iterations):
	for iteration in range(number_of_training_iterations):
	# Pass the training set through our neural network (a single neuron).
	output = self.think(training_set_inputs)

	# Calculate the error (The difference between the desired output
	# and the predicted output).
	error = training_set_outputs - output

	# Multiply the error by the input and again by the gradient of the Sigmoid curve.
	# This means less confident weights are adjusted more.
	# This means inputs, which are zero, do not cause changes to the weights.
	adjustment = dot(training_set_inputs.T, error * self.__sigmoid_derivative(output))

	# Adjust the weights.
	self.synaptic_weights += adjustment

	# The neural network thinks.
	def think(self, inputs):
	# Pass inputs through our neural network (our single neuron).
	return self.__sigmoid(dot(inputs, self.synaptic_weights))


	if __name__ == "__main__":

	#Intialise a single neuron neural network.
	neural_network = NeuralNetwork()

	print("Random starting synaptic weights: ")
	print(neural_network.synaptic_weights)

	# The training set. We have 4 examples, each consisting of 3 input values
	# and 1 output value.
	training_set_inputs = array([[0, 0, 1], [1, 1, 1], [1, 0, 1], [0, 1, 1]])
	training_set_outputs = array([[0, 1, 1, 0]]).T

	# Train the neural network using a training set.
	# Do it 10,000 times and make small adjustments each time.
	neural_network.train(training_set_inputs, training_set_outputs, 10000)

	print("New synaptic weights after training: ")
	print(neural_network.synaptic_weights)

	# Test the neural network with a new situation.
	print("Considering new situation [1, 0, 0] -> ?: ")
	print(neural_network.think(array([1, 0, 0])))