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Save karpathy/a4166c7fe253700972fcbc77e4ea32c5 to your computer and use it in GitHub Desktop.
""" Trains an agent with (stochastic) Policy Gradients on Pong. Uses OpenAI Gym. """ | |
import numpy as np | |
import cPickle as pickle | |
import gym | |
# hyperparameters | |
H = 200 # number of hidden layer neurons | |
batch_size = 10 # every how many episodes to do a param update? | |
learning_rate = 1e-4 | |
gamma = 0.99 # discount factor for reward | |
decay_rate = 0.99 # decay factor for RMSProp leaky sum of grad^2 | |
resume = False # resume from previous checkpoint? | |
render = False | |
# model initialization | |
D = 80 * 80 # input dimensionality: 80x80 grid | |
if resume: | |
model = pickle.load(open('save.p', 'rb')) | |
else: | |
model = {} | |
model['W1'] = np.random.randn(H,D) / np.sqrt(D) # "Xavier" initialization | |
model['W2'] = np.random.randn(H) / np.sqrt(H) | |
grad_buffer = { k : np.zeros_like(v) for k,v in model.iteritems() } # update buffers that add up gradients over a batch | |
rmsprop_cache = { k : np.zeros_like(v) for k,v in model.iteritems() } # rmsprop memory | |
def sigmoid(x): | |
return 1.0 / (1.0 + np.exp(-x)) # sigmoid "squashing" function to interval [0,1] | |
def prepro(I): | |
""" prepro 210x160x3 uint8 frame into 6400 (80x80) 1D float vector """ | |
I = I[35:195] # crop | |
I = I[::2,::2,0] # downsample by factor of 2 | |
I[I == 144] = 0 # erase background (background type 1) | |
I[I == 109] = 0 # erase background (background type 2) | |
I[I != 0] = 1 # everything else (paddles, ball) just set to 1 | |
return I.astype(np.float).ravel() | |
def discount_rewards(r): | |
""" take 1D float array of rewards and compute discounted reward """ | |
discounted_r = np.zeros_like(r) | |
running_add = 0 | |
for t in reversed(xrange(0, r.size)): | |
if r[t] != 0: running_add = 0 # reset the sum, since this was a game boundary (pong specific!) | |
running_add = running_add * gamma + r[t] | |
discounted_r[t] = running_add | |
return discounted_r | |
def policy_forward(x): | |
h = np.dot(model['W1'], x) | |
h[h<0] = 0 # ReLU nonlinearity | |
logp = np.dot(model['W2'], h) | |
p = sigmoid(logp) | |
return p, h # return probability of taking action 2, and hidden state | |
def policy_backward(eph, epdlogp): | |
""" backward pass. (eph is array of intermediate hidden states) """ | |
dW2 = np.dot(eph.T, epdlogp).ravel() | |
dh = np.outer(epdlogp, model['W2']) | |
dh[eph <= 0] = 0 # backpro prelu | |
dW1 = np.dot(dh.T, epx) | |
return {'W1':dW1, 'W2':dW2} | |
env = gym.make("Pong-v0") | |
observation = env.reset() | |
prev_x = None # used in computing the difference frame | |
xs,hs,dlogps,drs = [],[],[],[] | |
running_reward = None | |
reward_sum = 0 | |
episode_number = 0 | |
while True: | |
if render: env.render() | |
# preprocess the observation, set input to network to be difference image | |
cur_x = prepro(observation) | |
x = cur_x - prev_x if prev_x is not None else np.zeros(D) | |
prev_x = cur_x | |
# forward the policy network and sample an action from the returned probability | |
aprob, h = policy_forward(x) | |
action = 2 if np.random.uniform() < aprob else 3 # roll the dice! | |
# record various intermediates (needed later for backprop) | |
xs.append(x) # observation | |
hs.append(h) # hidden state | |
y = 1 if action == 2 else 0 # a "fake label" | |
dlogps.append(y - aprob) # grad that encourages the action that was taken to be taken (see http://cs231n.github.io/neural-networks-2/#losses if confused) | |
# step the environment and get new measurements | |
observation, reward, done, info = env.step(action) | |
reward_sum += reward | |
drs.append(reward) # record reward (has to be done after we call step() to get reward for previous action) | |
if done: # an episode finished | |
episode_number += 1 | |
# stack together all inputs, hidden states, action gradients, and rewards for this episode | |
epx = np.vstack(xs) | |
eph = np.vstack(hs) | |
epdlogp = np.vstack(dlogps) | |
epr = np.vstack(drs) | |
xs,hs,dlogps,drs = [],[],[],[] # reset array memory | |
# compute the discounted reward backwards through time | |
discounted_epr = discount_rewards(epr) | |
# standardize the rewards to be unit normal (helps control the gradient estimator variance) | |
discounted_epr -= np.mean(discounted_epr) | |
discounted_epr /= np.std(discounted_epr) | |
epdlogp *= discounted_epr # modulate the gradient with advantage (PG magic happens right here.) | |
grad = policy_backward(eph, epdlogp) | |
for k in model: grad_buffer[k] += grad[k] # accumulate grad over batch | |
# perform rmsprop parameter update every batch_size episodes | |
if episode_number % batch_size == 0: | |
for k,v in model.iteritems(): | |
g = grad_buffer[k] # gradient | |
rmsprop_cache[k] = decay_rate * rmsprop_cache[k] + (1 - decay_rate) * g**2 | |
model[k] += learning_rate * g / (np.sqrt(rmsprop_cache[k]) + 1e-5) | |
grad_buffer[k] = np.zeros_like(v) # reset batch gradient buffer | |
# boring book-keeping | |
running_reward = reward_sum if running_reward is None else running_reward * 0.99 + reward_sum * 0.01 | |
print 'resetting env. episode reward total was %f. running mean: %f' % (reward_sum, running_reward) | |
if episode_number % 100 == 0: pickle.dump(model, open('save.p', 'wb')) | |
reward_sum = 0 | |
observation = env.reset() # reset env | |
prev_x = None | |
if reward != 0: # Pong has either +1 or -1 reward exactly when game ends. | |
print ('ep %d: game finished, reward: %f' % (episode_number, reward)) + ('' if reward == -1 else ' !!!!!!!!') |
Did anyone successfully implement the same thing in gym.retro Pong-Atari2600?
Hi, guys
Are all weights of the neural network increased by the same gradient. The gradient is a vector of the epoch, I think. We can add them to make them scalar. My question is are all parameters of the neural network being increased by the same scalar value. When we say theta=learning rate*gradient?
Or is the gradient partially derivated for every weight of the network.
Thanks for the code!
Hi guys
I have just changed a few things in the code so that it works in python-3.
https://colab.research.google.com/drive/1BTiGjP_FD0PdYfazpn61nWPC0YJuZPOE?usp=sharing
I want the paython code of neurel network where: input layer part is composed of two neurons, . The hidden layer is constituted of two under-layers of 20 and 10 neurons for the first under-layer and the second under-layer respectively. The output layer is composed of 5 neurons.
I want the python code of neural network where: input layer part is composed of two neurons, . The hidden layer is constituted of two under-layers of 20 and 10 neurons for the first under-layer and the second under-layer respectively. The output layer is composed of 5 neurons.
First, change the first hidden neuron size to 20 then the second hidden layers to 10. Using this u need to add new weights in the model dict object. Then use 'Xavier' initialization to initialize the weights. Then the last weight size u need to change it to 10x5. and everything else remains the same. First, u try implementing on your own and then everyone is here to help u with any errors and stuff
thank you
I have problem in updating weights
`import numpy as np
class Neural_Network(object):
def init(self):
#parameters
self.inputSize = 2
self.outputSize = 5
self.hiddenSize = 20
self.hiddenSize2 = 10
#weights
self.W1 = np.random.randn(self.inputSize, self.hiddenSize) # (2x20) weight matrix from input to hidden layer
print(self.W1)
self.W2 = np.random.randn(self.hiddenSize, self.hiddenSize2) # (20x10) weight matrix from hidden to output layer
print(self.W2)
self.W3 = np.random.randn(self.hiddenSize2, self.outputSize) # (10x5) weight matrix from hidden to output layer
print(self.W2)
def forward(self, X):
#forward propagation through our network
self.z = np.dot(X, self.W1) # dot product of X (input) and first set of 2x20 weights
self.z2 = self.sigmoid(self.z) # activation function
self.z3 = np.dot(self.z2, self.W2) # dot product of hidden layer (z2) and second set of 20x10 weights
self.z4 = self.sigmoid(self.z3) # final activation function
self.z5 = np.dot(self.z4, self.W3) # dot product of hidden layer (z2) and second set of 10x5 weights
o = self.sigmoid(self.z5) # final activation function
return o
def sigmoid(self, s):
# activation function
return 1/(1+np.exp(-s))
def sigmoidPrime(self, s):
#derivative of sigmoid
return s * (1 - s)
def backward(self, X, y, o):
self.o_error = y - o # error in output
self.o_delta = self.o_error*self.sigmoidPrime(o) # applying derivative of sigmoid to error
self.z3_error = self.o_delta.dot(self.W3.T) # z2 error: how much our hidden layer weights contributed to output error
self.W3 += self.z4.T.dot(self.o_delta) # adjusting second set (hidden --> output) weights
self.z3_delta = self.z3_error*self.sigmoidPrime(self.z3)
self.W2 +=0.001
self.W3 +=0.001
self.W1 +=0.001
def backprop(self):
# application of the chain rule to find derivative of the loss function with respect to weights2 and weights1
d_weights2 = np.dot(self.layer1.T, (2*(self.y - self.output) * sigmoid_derivative(self.output)))
d_weights1 = np.dot(self.input.T, (np.dot(2*(self.y - self.output) * sigmoid_derivative(self.output), self.weights2.T) * sigmoid_derivative(self.layer1)))
# update the weights with the derivative (slope) of the loss function
self.weights1 += d_weights1
self.weights2 += d_weights2
def train(self, X, y):
o = self.forward(X)
self.backward(X, y, o)
def saveWeights(self):
np.savetxt("w1.txt", self.W1, fmt="%s")
np.savetxt("w2.txt", self.W2, fmt="%s")
def predict(self):
print ("Predicted data based on trained weights: ")
print ("Input (scaled): \n" + str(xPredicted))
print ("Output: \n" + str(self.forward(xPredicted)))
X = (hours studying, hours sleeping), y = score on test, xPredicted = 4 hours studying & 8 hours sleeping (input data for prediction)
X = np.array(([500, 10], [3700, 10], [500, 100], [3700, 100]), dtype=float)
y = np.array(([0.00512,0.0099,0.0051,0.952,0.1155], [0.0088,0.013,0.0101,0.62,0.1835], [890.00398,0.008,0.0034,1.109,0.0872],[0.00416,0.0163,0.0312,0.936,0.0947]), dtype=float)
#xPredicted = np.array(([4,8]), dtype=float)
scale units
#print(X)
X = X/np.amax(X, axis=0) # maximum of X array
y = y/np.amax(y, axis=0) # maximum of X array
#print(X)
#print(xPredicted)
#xPredicted = xPredicted/np.amax(xPredicted, axis=0) # maximum of xPredicted (our input data for the prediction)
#print(xPredicted)
#y = y/100 # max test score is 100
NN = Neural_Network()
for i in range(1000): # trains the NN 1,000 times
print ("# " + str(i) + "\n")
print ("Input (scaled): \n" + str(X))
print ("Actual Output: \n" + str(y))
print ("Predicted Output: \n" + str(NN.forward(X)))
print ("Loss: \n" + str(np.mean(np.square(y - NN.forward(X)))) )# mean sum squared loss
print ("\n")
NN.train(X, y)
NN.saveWeights()
#NN.predict()`
I'm trying to implement a model with Tensorflow following this gist. I'm trying to do it in a more general way to support cases where there can be more than 2 actions, so using sparse categorical cross entropy. I've been spending weeks on this, but can't make it work. Done all sorts of research, tried a lot of approaches (made 12 versions of it - surprisingly found a version which outperforms the original - using MSE for loss, and instead of subtracting the previous state from the current state, to get the state, it just uses the current state, but it should be just accidental luck), did lot of testing, but it performs terrible, actually, it doesn't learn at all.
Here's the code:
import tensorflow as tf
import numpy as np
import gym
class Model(tf.keras.Model):
def __init__(self, h_units, y_size):
super().__init__()
self.whs = [tf.keras.layers.Dense(h_size, 'relu') for h_size in h_units]
self.wy = tf.keras.layers.Dense(y_size, 'sigmoid')
def call(self, x):
for wh in self.whs:
x = wh(x)
y = self.wy(x)
return y
def prepro(state):
""" prepro 210x160x3 uint8 frame into 6400 (80x80) 1D float vector """
state = state[35:195] # crop
state = state[::2,::2,0] # downsample by factor of 2
state[state == 144] = 0 # erase background (background type 1)
state[state == 109] = 0 # erase background (background type 2)
state[state != 0] = 1 # everything else (paddles, ball) just set to 1
return state.ravel().reshape([1, -1])
class Environment:
def __init__(self, state_preprocessor):
self.env = gym.make('Pong-v0')
self.state_preprocessor = state_preprocessor
self.prev_s = None
def init(self):
cur_s = self.env.reset()
cur_s = self.state_preprocessor(cur_s)
s = cur_s - tf.zeros_like(cur_s)
self.prev_s = cur_s
return s
def step(self, action):
cur_s, r, done, info = self.env.step(action + 2)
cur_s = self.state_preprocessor(cur_s)
s = cur_s - self.prev_s
self.prev_s = cur_s
return s, r, done
# Runs model (policy) with x (input),
# samples y (action) from y_pred (probability of actions).
# Takes:
# - x - the input, 1D tensor of the current state
# - model - policy, returns probability of actions from state
# - loss function to calculate loss
# Returns:
# - gradients of model's weights based on loss
# - loss from y, and y_pred with loss_fn
# - y - 1D tensor, the sampled value what the action should be
@tf.function
def sample_action(x, model):
y_pred = model(x)
samples = tf.random.uniform([1])
y = y_pred - samples
y = tf.reshape(tf.argmax(y, 1), [-1, 1])
return y
def get_gradients(x, y, r, model, loss_fn):
with tf.GradientTape() as tape:
y_pred = model(x)
loss = loss_fn(y, y_pred, r)
gradients = tape.gradient(loss, model.trainable_variables)
return gradients
# Discounting later rewards more than sooner.
# Because the final reward happened much more likely
# because of a recent action than one at the beginning.
# Takes:
# - full value rewards of timesteps
# - discount multiplier
# Returns:
# - discounted sum of rewards of timesteps
def discount_rewards(d):
def discount(rs):
d_rs = np.zeros_like(rs)
sum_rt = 0
for t in reversed(range(rs.shape[0])):
if rs[t] != 0: sum_rt = 0
# add rt to the discounted sum of rewards at t
sum_rt = sum_rt * d + rs[t]
d_rs[t] = sum_rt
d_rs -= np.mean(d_rs)
d_rs /= np.std(d_rs)
return d_rs
return discount
model = Model([200], 2)
env = Environment(prepro)
loss_fn = tf.keras.losses.SparseCategoricalCrossentropy(reduction=tf.keras.losses.Reduction.NONE)
optimizer = tf.keras.optimizers.RMSprop(0.0001, 0.99)
discounter = discount_rewards(0.99)
epochs = 10000
batch_size = 10
# Train runs the model with the environment,
# collects gradients per execution, and optimizes
# the model's weights at each epoch.
# Takes:
# - model (policy), which takes the input x (state), and returns y (action)
# - environment, which performs the action, and returns the new state, and reward
# must have methods:
# - init() - initialize the state
# - step(action) - perform the action, return new state, reward, and indicator if episode is over
def train(model, env, loss_fn, optimizer, discounter, epochs, batch_size):
for i in range(epochs):
xs = []
ys = []
rs = []
ep_rs = []
for e in range(batch_size):
done = False
x = env.init()
ep_r = 0
while not done:
xs.append(x)
y = sample_action(x, model)
ys.append(y)
x, r, done = env.step(y.numpy().astype('int'))
rs.append(r)
ep_r += r
ep_rs.append(ep_r)
print('Epoch:', i, 'Episode:', e, 'Reward:', ep_r)
xs = tf.concat(xs, 0)
ys = tf.concat(ys, 0)
rs = np.vstack(rs)
rs = discounter(rs)
gradients = get_gradients(xs, ys, rs, model, loss_fn)
optimizer.apply_gradients(zip(gradients, model.trainable_variables))
print('Epoch:', i, 'Avg episode reward:', np.array(ep_rs).mean())
train(model, env, loss_fn, optimizer, discounter, epochs, batch_size)
So in summary, set up a model with 2 dense layers, output the number of possible actions, subtract the random number from the output, get the index of the highest one, use it as the action. Run the environment with it, get the next state, and reward. Store all selected actions, rewards, states. If the number of episodes reach the batch size, rerun the model with the collected states, get the predictions, run sparse categorical cross entropy with the selected actions, and predictions, use the discounted rewards as sample weights for the losses, get the gradients, optimize the weights. Repeat.
During making those versions, and testing them, I realized that somehow the initial version makes a lot better random guesses before any training (10 episodes) with a mean of 20, while the tensorflow version keeps guessing -21 for all 10 episodes in multiple independent tries.
All makes sense, but doesn't work. Why?
@Grsz That is a perfect question for StackOverflow...
Python3 version of pg-pong.py with the minimum changes to make it work:
https://gist.github.com/haluptzok/d2a3eba5d25d238d6c2cbe847bc58b6b
Still a great policy gradient blog post and python script - but Python2 is so 2016 : )
Most folks reading this now will fire it up in python3 and blow up and not get the fun experience
For those interested in seeing this implemented on top of TensorFlow 2 running entirely on graph mode here's the repo:
https://github.com/WillianFuks/Pong
The AI trained fairly quickly, in a day it already reached average return of ~14 points. But then it stops there and doesn't quite improve much after all. Not sure on how to further improve it then, other than keep tweaking the hyperparams.
May 19th 2022
I modify some lines of pg-pong.py because this is too old (but gold).
In my case rendering option did not work because of openai-gym issue.
pls check this code if you want to train agent playing pong in py38, gym>=0.21.0
In case someone wants to share a cool colab demo still - here is my notebook that ended up achieving level performance with the human opponent
https://colab.research.google.com/drive/1KZeGjxS7OUHKotsuyoT0DtxVzKaUIq4B?usp=sharing
I created a variation of the original demo by adding another layer of hidden variables. This new variations converges much faster than the original solution. I also fixed a bunch of bugs/issues introduced because of new versions of libraries. Have fun!
https://colab.research.google.com/drive/1w1EklesVqWaCOK2KyidJbauarn7kUoaV#scrollTo=TwjiwKisQM19
https://gist.github.com/CPPAlien/91388eb16a85e80ec55689069bda0c25
I implemented this code by pytorch, and it seems the positive reward not increase during the training process. Are there any mistakes of my code?
PyTorch version - https://gist.github.com/xanderex-sid/ae6cd3ea0c3759c1e3f92835ebd6e158
You can use the code above to create various types of CNN or MLP models to train your ATARI Pong agent. The code is compatible with GPU usage as well.
It has been successfully training on Google Colab, so feel free to use it in your experiments. If you find any bugs or have suggestions for improvements, please let me know, as it will help me enhance my skills.
I have also attached a code to test your agent against the default OpenAI Pong agent.
Hey guys,
I want to know how can I implement the policy gradient with baseline? Baseline seems to have its own calculation so I am getting confused how to put that in policy gradient.