I'm new to tensor flow, and have been looking at the examples here. I wanted to rewrite the multilayer perceptron classification model to be a regression model. However I encountered some strange behaviour when modifying the loss function. It works fine with `tf.reduce_mean`

, but if I try using `tf.reduce_sum`

it gives nan's in the output. This seems very strange, as the functions are very similar - the only difference is that the mean divides the sum result by the number of elements? So I can't see how nan's could be introduced by this change?

```
import tensorflow as tf
# Parameters
learning_rate = 0.001
# Network Parameters
n_hidden_1 = 32 # 1st layer number of features
n_hidden_2 = 32 # 2nd layer number of features
n_input = 2 # number of inputs
n_output = 1 # number of outputs
# Make artificial data
SAMPLES = 1000
X = np.random.rand(SAMPLES, n_input)
T = np.c_[X[:,0]**2 + np.sin(X[:,1])]
# tf Graph input
x = tf.placeholder("float", [None, n_input])
y = tf.placeholder("float", [None, n_output])
# Create model
def multilayer_perceptron(x, weights, biases):
# Hidden layer with tanh activation
layer_1 = tf.add(tf.matmul(x, weights['h1']), biases['b1'])
layer_1 = tf.nn.tanh(layer_1)
# Hidden layer with tanh activation
layer_2 = tf.add(tf.matmul(layer_1, weights['h2']), biases['b2'])
layer_2 = tf.nn.tanh(layer_2)
# Output layer with linear activation
out_layer = tf.matmul(layer_2, weights['out']) + biases['out']
return out_layer
# Store layers weight & bias
weights = {
'h1': tf.Variable(tf.random_normal([n_input, n_hidden_1])),
'h2': tf.Variable(tf.random_normal([n_hidden_1, n_hidden_2])),
'out': tf.Variable(tf.random_normal([n_hidden_2, n_output]))
}
biases = {
'b1': tf.Variable(tf.random_normal([n_hidden_1])),
'b2': tf.Variable(tf.random_normal([n_hidden_2])),
'out': tf.Variable(tf.random_normal([n_output]))
}
pred = multilayer_perceptron(x, weights, biases)
# Define loss and optimizer
#se = tf.reduce_sum(tf.square(pred - y)) # Why does this give nans?
mse = tf.reduce_mean(tf.square(pred - y)) # When this doesn't?
optimizer = tf.train.GradientDescentOptimizer(learning_rate=learning_rate).minimize(mse)
# Initializing the variables
init = tf.global_variables_initializer()
sess = tf.Session()
sess.run(init)
training_epochs = 10
display_step = 1
# Training cycle
for epoch in range(training_epochs):
avg_cost = 0.
# Loop over all batches
for i in range(100):
# Run optimization op (backprop) and cost op (to get loss value)
_, msev = sess.run([optimizer, mse], feed_dict={x: X, y: T})
# Display logs per epoch step
if epoch % display_step == 0:
print("Epoch:", '%04d' % (epoch+1), "mse=", \
"{:.9f}".format(msev))
```

The problematic variable `se`

is commented out. It should be used in place of `mse`

.

With `mse`

the output looks like this:

```
Epoch: 0001 mse= 0.051669389
Epoch: 0002 mse= 0.031438075
Epoch: 0003 mse= 0.026629323
...
```

and with `se`

it ends up like this:

```
Epoch: 0001 se= nan
Epoch: 0002 se= nan
Epoch: 0003 se= nan
...
```