# Loss function for class imbalanced binary classifier in Tensor flow

I am trying to apply deep learning for a binary classification problem with high class imbalance between target classes (500k, 31K). I want to write a custom loss function which should be like: minimize(100-((predicted_smallerclass)/(total_smallerclass))*100)

Appreciate any pointers on how I can build this logic.

You can add class weights to the loss function, by multiplying logits. Regular cross entropy loss is this:

loss(x, class) = -log(exp(x[class]) / (\sum_j exp(x[j])))
= -x[class] + log(\sum_j exp(x[j]))


in weighted case:

loss(x, class) = weights[class] * -x[class] + log(\sum_j exp(weights[class] * x[j]))


So by multiplying logits, you are re-scaling predictions of each class by its class weight.

For example:

ratio = 31.0 / (500.0 + 31.0)
class_weight = tf.constant([ratio, 1.0 - ratio])
logits = ... # shape [batch_size, 2]
weighted_logits = tf.mul(logits, class_weight) # shape [batch_size, 2]
xent = tf.nn.softmax_cross_entropy_with_logits(
weighted_logits, labels, name="xent_raw")


There is a standard losses function now that supports weights per batch:

tf.losses.sparse_softmax_cross_entropy(labels=label, logits=logits, weights=weights)


Where weights should be transformed from class weights to a weight per example (with shape [batch_size]). See documentation here.

The code you proposed seems wrong to me. The loss should be multiplied by the weight, I agree.

But if you multiply the logit by the class weights, you end with:

weights[class] * -x[class] + log( \sum_j exp(x[j] * weights[class]) )


The second term is not equal to:

weights[class] * log(\sum_j exp(x[j]))


To show this, we can be rewrite the latter as:

log( (\sum_j exp(x[j]) ^ weights[class] )


So here is the code I'm proposing:

ratio = 31.0 / (500.0 + 31.0)
class_weight = tf.constant([[ratio, 1.0 - ratio]])
logits = ... # shape [batch_size, 2]

weight_per_label = tf.transpose( tf.matmul(labels
, tf.transpose(class_weight)) ) #shape [1, batch_size]
# this is the weight for each datapoint, depending on its label

xent = tf.mul(weight_per_label
, tf.nn.softmax_cross_entropy_with_logits(logits, labels, name="xent_raw") #shape [1, batch_size]
loss = tf.reduce_mean(xent) #shape 1

• I am facing the same issue, but in trying to understand the code above I do not understand \sum_ - can you please explain that? It seems to be latex code; does that work in Python? – Ron Cohen Aug 15 '16 at 15:18
• But in fact the best approach is to build balanced mini-batches!! – JL Meunier Aug 19 '16 at 8:30
• @Ron: the equation just says that it is different to: multiply the logit by the class weight vs multiply the distance (cross entropy) by the weights. The code at bottom does work in Python. But overall, just manage to balance each minibatch and you will get a better model! – JL Meunier Aug 19 '16 at 8:33
• I think this should be the accepted answer, since we want to multiply the distance and not the logits by the weights. – Roger Trullo Oct 23 '16 at 2:01
• @JLMeunier Can you explain / provide a citation justifying why balanced minibatches are better? They are certainly a much bigger pain to implement. – Emma Strubell Dec 16 '16 at 17:20

Use tf.nn.weighted_cross_entropy_with_logits() and set pos_weight to 1 / (expected ratio of positives).

• I'm still newbie in deep learning so excuse me if my question is a naïve. what do you mean by expected ratio of positives? and what is the difference between this function and 'sigmoid_cross_entropy'? – Maystro Dec 20 '17 at 23:22

You can check the guides at tensorflow https://www.tensorflow.org/api_guides/python/contrib.losses

...

While specifying a scalar loss rescales the loss over the entire batch, we sometimes want to rescale the loss per batch sample. For example, if we have certain examples that matter more to us to get correctly, we might want to have a higher loss that other samples whose mistakes matter less. In this case, we can provide a weight vector of length batch_size which results in the loss for each sample in the batch being scaled by the corresponding weight element. For example, consider the case of a classification problem where we want to maximize our accuracy but we especially interested in obtaining high accuracy for a specific class:

inputs, labels = LoadData(batch_size=3)
logits = MyModelPredictions(inputs)

# Ensures that the loss for examples whose ground truth class is 3 is 5x
# higher than the loss for all other examples.
weight = tf.multiply(4, tf.cast(tf.equal(labels, 3), tf.float32)) + 1

onehot_labels = tf.one_hot(labels, num_classes=5)
tf.contrib.losses.softmax_cross_entropy(logits, onehot_labels, weight=weight)


I had to work with a similar unbalanced dataset of multiple classes and this is how I worked through it, hope it will help somebody looking for a similar solution:

This goes inside your training module:

from sklearn.utils.class_weight import compute_sample_weight
#use class weights for handling unbalanced dataset
if mode == 'INFER' #test/dev mode, not weighing loss in test mode
sample_weights = np.ones(labels.shape)
else:
sample_weights = compute_sample_weight(class_weight='balanced', y=labels)


This goes inside your model class definition:

#an extra placeholder for sample weights
#assuming you already have batch_size tensor
self.sample_weight = tf.placeholder(dtype=tf.float32, shape=[None],
name='sample_weights')
cross_entropy_loss = tf.nn.sparse_softmax_cross_entropy_with_logits(
labels=self.label, logits=logits,
name='cross_entropy_loss')
cross_entropy_loss = tf.reduce_sum(cross_entropy_loss*self.sample_weight) / batch_size


Did ops tf.nn.weighted_cross_entropy_with_logits() for two classes:

classes_weights = tf.constant([0.1, 1.0])
cross_entropy = tf.nn.weighted_cross_entropy_with_logits(logits=logits, targets=labels, pos_weight=classes_weights)