I am training a neural network for a multi-class classification task. The loss function I am using is the CrossEntropyLoss implemented in pytorch, which is, according to the documents, a combination of logsoftmax and negative log likelihood loss (forgive me for not knowing much about them, all I know is that cross entropy is frequently used for classification). I started out with a loss of 2.4 and then it descends to and fluctuates in the range 0.65~0.7. Can I infer from this value how accurate my model is now? I remember reading in an article that a cross entropy loss of 0.69 is equal to random guess in the binary classification case, is it different somehow in the multi-class classification? Or does it mean my model is basically guessing randomly?

More details, if they matter:

  • I am running on CIFAR10, so there are 10 classes.

  • The loss is calculated per sample, so the batch size is not reflected here.


2 Answers 2


is it different somehow in the multi-class classification? Or does it mean my model is basically guessing randomly?

You have to understand how you get the score of a random baseline.

Suppose you have a binary classification problem where classes are balanced, that is, the pmf of the labels in your dataset is $q_i=1/2$. If you do random guesses, you don't even look at the inputs (images in your case) and assign probability $p_i=1/2$ to the two classes all the time. The cross-entropy you obtain is $H[q,p] = - \sum_i q_i \log p_i = - 2 * 1/2 * \log(1/2) = \log(2) = 0.69$ (using the natural log).

From there, you can generalise this reasoning in the 10-classes case by yourself. In the unbalanced case (CIFAR10 is balanced so you won't need that, but I'm still explaining), of course you simply change the $q_i$.

Understanding the above, you 1) understand why the model starts out with a loss around $2.4$ and 2) know whether you are doing better than guessing at random. Leave a comment if that is not the case.

Can I infer from this value how accurate my model is now?

Accuracy has a precise meaning in evaluation of classification model and I don't know if that's what you mean. You can not infer accuracy from the cross-entropy. Accuracy is defined as the proportion of labels that are correctly classified by your classifier on the test set. How do you "classify" using a probabilistic model? You choose the class that has the highest probability, this is called the Bayes classifier.


The following chart demonstrates distribution of cross-entropy for random guessing based on the label distribution. It is clear that in the middle of the chart the cross-entropy reaches its maximum (.69) as there the randomness is maximum too.

enter image description here



import numpy as np
def cross_entropy_by_dist(positive_percent):
    negative_percent = 1-positive_percent
    sc = positive_percent*np.log(positive_percent)+negative_percent*np.log(negative_percent)
    return -sc

out = []
for i in np.arange(0.05, 1, .05):
import matplotlib.pyplot as plt
plt.plot(np.arange(.05, 1, .05), out)

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