# Calculate the accuracy every epoch in PyTorch

I am working on a Neural Network problem, to classify data as 1 or 0. I am using Binary cross entropy loss to do this. The loss is fine, however, the accuracy is very low and isn't improving. I am assuming I did a mistake in the accuracy calculation. After every epoch, I am calculating the correct predictions after thresholding the output, and dividing that number by the total number of the dataset. Is there any thing wrong I did in the accuracy calculation? And why isn't it improving, but getting more worse? This is my code:

net = Model()
criterion = torch.nn.BCELoss(size_average=True)
optimizer = torch.optim.SGD(net.parameters(), lr=0.1)

num_epochs = 100
for epoch in range(num_epochs):
for i, (inputs,labels) in enumerate (train_loader):
inputs = Variable(inputs.float())
labels = Variable(labels.float())
output = net(inputs)
loss = criterion(output, labels)
loss.backward()
optimizer.step()

#Accuracy
output = (output>0.5).float()
correct = (output == labels).float().sum()
print("Epoch {}/{}, Loss: {:.3f}, Accuracy: {:.3f}".format(epoch+1,num_epochs, loss.data[0], correct/x.shape[0]))


And this is the strange output I get:

Epoch 1/100, Loss: 0.389, Accuracy: 0.035
Epoch 2/100, Loss: 0.370, Accuracy: 0.036
Epoch 3/100, Loss: 0.514, Accuracy: 0.030
Epoch 4/100, Loss: 0.539, Accuracy: 0.030
Epoch 5/100, Loss: 0.583, Accuracy: 0.029
Epoch 6/100, Loss: 0.439, Accuracy: 0.031
Epoch 7/100, Loss: 0.429, Accuracy: 0.034
Epoch 8/100, Loss: 0.408, Accuracy: 0.035
Epoch 9/100, Loss: 0.316, Accuracy: 0.035
Epoch 10/100, Loss: 0.436, Accuracy: 0.035
Epoch 11/100, Loss: 0.365, Accuracy: 0.034
Epoch 12/100, Loss: 0.485, Accuracy: 0.031
Epoch 13/100, Loss: 0.392, Accuracy: 0.033
Epoch 14/100, Loss: 0.494, Accuracy: 0.030
Epoch 15/100, Loss: 0.369, Accuracy: 0.035
Epoch 16/100, Loss: 0.495, Accuracy: 0.029
Epoch 17/100, Loss: 0.415, Accuracy: 0.034
Epoch 18/100, Loss: 0.410, Accuracy: 0.035
Epoch 19/100, Loss: 0.282, Accuracy: 0.038
Epoch 20/100, Loss: 0.499, Accuracy: 0.031
Epoch 21/100, Loss: 0.446, Accuracy: 0.030
Epoch 22/100, Loss: 0.585, Accuracy: 0.026
Epoch 23/100, Loss: 0.419, Accuracy: 0.035
Epoch 24/100, Loss: 0.492, Accuracy: 0.031
Epoch 25/100, Loss: 0.537, Accuracy: 0.031
Epoch 26/100, Loss: 0.439, Accuracy: 0.033
Epoch 27/100, Loss: 0.421, Accuracy: 0.035
Epoch 28/100, Loss: 0.532, Accuracy: 0.034
Epoch 29/100, Loss: 0.234, Accuracy: 0.038
Epoch 30/100, Loss: 0.492, Accuracy: 0.027
Epoch 31/100, Loss: 0.407, Accuracy: 0.035
Epoch 32/100, Loss: 0.305, Accuracy: 0.038
Epoch 33/100, Loss: 0.663, Accuracy: 0.025
Epoch 34/100, Loss: 0.588, Accuracy: 0.031
Epoch 35/100, Loss: 0.329, Accuracy: 0.035
Epoch 36/100, Loss: 0.474, Accuracy: 0.033
Epoch 37/100, Loss: 0.535, Accuracy: 0.031
Epoch 38/100, Loss: 0.406, Accuracy: 0.033
Epoch 39/100, Loss: 0.513, Accuracy: 0.030
Epoch 40/100, Loss: 0.593, Accuracy: 0.030
Epoch 41/100, Loss: 0.265, Accuracy: 0.036
Epoch 42/100, Loss: 0.576, Accuracy: 0.031
Epoch 43/100, Loss: 0.565, Accuracy: 0.027
Epoch 44/100, Loss: 0.576, Accuracy: 0.030
Epoch 45/100, Loss: 0.396, Accuracy: 0.035
Epoch 46/100, Loss: 0.423, Accuracy: 0.034
Epoch 47/100, Loss: 0.489, Accuracy: 0.033
Epoch 48/100, Loss: 0.591, Accuracy: 0.029
Epoch 49/100, Loss: 0.415, Accuracy: 0.034
Epoch 50/100, Loss: 0.291, Accuracy: 0.039
Epoch 51/100, Loss: 0.395, Accuracy: 0.033
Epoch 52/100, Loss: 0.540, Accuracy: 0.026
Epoch 53/100, Loss: 0.436, Accuracy: 0.033
Epoch 54/100, Loss: 0.346, Accuracy: 0.036
Epoch 55/100, Loss: 0.519, Accuracy: 0.029
Epoch 56/100, Loss: 0.456, Accuracy: 0.031
Epoch 57/100, Loss: 0.425, Accuracy: 0.035
Epoch 58/100, Loss: 0.311, Accuracy: 0.039
Epoch 59/100, Loss: 0.406, Accuracy: 0.034
Epoch 60/100, Loss: 0.360, Accuracy: 0.035
Epoch 61/100, Loss: 0.476, Accuracy: 0.030
Epoch 62/100, Loss: 0.404, Accuracy: 0.034
Epoch 63/100, Loss: 0.382, Accuracy: 0.036
Epoch 64/100, Loss: 0.538, Accuracy: 0.031
Epoch 65/100, Loss: 0.392, Accuracy: 0.034
Epoch 66/100, Loss: 0.434, Accuracy: 0.033
Epoch 67/100, Loss: 0.479, Accuracy: 0.031
Epoch 68/100, Loss: 0.494, Accuracy: 0.031
Epoch 69/100, Loss: 0.415, Accuracy: 0.034
Epoch 70/100, Loss: 0.390, Accuracy: 0.036
Epoch 71/100, Loss: 0.330, Accuracy: 0.038
Epoch 72/100, Loss: 0.449, Accuracy: 0.030
Epoch 73/100, Loss: 0.315, Accuracy: 0.039
Epoch 74/100, Loss: 0.450, Accuracy: 0.031
Epoch 75/100, Loss: 0.562, Accuracy: 0.030
Epoch 76/100, Loss: 0.447, Accuracy: 0.031
Epoch 77/100, Loss: 0.408, Accuracy: 0.038
Epoch 78/100, Loss: 0.359, Accuracy: 0.034
Epoch 79/100, Loss: 0.372, Accuracy: 0.035
Epoch 80/100, Loss: 0.452, Accuracy: 0.034
Epoch 81/100, Loss: 0.360, Accuracy: 0.035
Epoch 82/100, Loss: 0.453, Accuracy: 0.031
Epoch 83/100, Loss: 0.578, Accuracy: 0.030
Epoch 84/100, Loss: 0.537, Accuracy: 0.030
Epoch 85/100, Loss: 0.483, Accuracy: 0.035
Epoch 86/100, Loss: 0.343, Accuracy: 0.036
Epoch 87/100, Loss: 0.439, Accuracy: 0.034
Epoch 88/100, Loss: 0.686, Accuracy: 0.023
Epoch 89/100, Loss: 0.265, Accuracy: 0.039
Epoch 90/100, Loss: 0.369, Accuracy: 0.035
Epoch 91/100, Loss: 0.521, Accuracy: 0.027
Epoch 92/100, Loss: 0.662, Accuracy: 0.027
Epoch 93/100, Loss: 0.581, Accuracy: 0.029
Epoch 94/100, Loss: 0.322, Accuracy: 0.034
Epoch 95/100, Loss: 0.375, Accuracy: 0.035
Epoch 96/100, Loss: 0.575, Accuracy: 0.031
Epoch 97/100, Loss: 0.489, Accuracy: 0.030
Epoch 98/100, Loss: 0.435, Accuracy: 0.033
Epoch 99/100, Loss: 0.440, Accuracy: 0.031
Epoch 100/100, Loss: 0.444, Accuracy: 0.033

• Could you post more of the code to provide a better understanding? Jul 31 '18 at 1:39
• Your accuracy formula looks right to me please provide more code Jul 31 '18 at 10:17
• could you post what the x in x.shape[0] is? Aug 3 '18 at 2:23
• could you clarify what's i in this line: for i, (inputs,labels) in enumerate (train_loader): ? is this index the number of training ? Oct 14 '19 at 8:00
• one liner to get accuracy acc == (true == mdl(x).max(1).item() / true.size(0) assuming 0th dimension is the batch size and 1st dimension hold the logits/raw values for classification labels. Aug 5 '20 at 18:00

Is x the entire input dataset? If so, you might be dividing by the size of the entire input dataset in correct/x.shape[0] (as opposed to the size of the mini-batch). Try changing this to correct/output.shape[0]

• I am dividing it by the total number of the dataset because I have finished one epoch. You can see that the print statement is inside the epoch loop, not the batch loop.
– H.S
Aug 3 '18 at 4:49
• Yes, I saw that. However, “correct” is still only as large as a mini-batch Aug 3 '18 at 5:15
• Yep. I guess you are correct. The output In this case is the last mini-batch output, where we will validate on for each epoch. So we should be dividing the mini-batch size of the last iteration of the epoch. Thanks for your answer
– H.S
Aug 3 '18 at 5:26

A better way would be calculating correct right after optimization step

for epoch in range(num_epochs):

correct = 0
for i, (inputs,labels) in enumerate (train_loader):
...
output = net(inputs)
...
optimizer.step()

correct += (output == labels).float().sum()

accuracy = 100 * correct / len(trainset)
# probably x in your case

print("Accuracy = {}".format(accuracy))

• perhaps using .item() would be better than .float() Aug 4 '20 at 19:02
• the piece of code you made as pseudo-code/comment is the trickiest part of it and the one I'm seeking for an explanation: max_vals, max_indices = torch.max(mdl(X),1) Aug 4 '20 at 20:53
• @CharlieParker .item() works when there is exactly 1 value in a tensor. Otherwise, it will give an error. (output == labels) is a boolean tensor with many values, by converting it to a float, Falses are casted to 0 and Trues are casted to 1. Then we sum number of Trues (.sum() will probably be enough itself as it should be doing casting stuff) Aug 11 '20 at 15:59

https://stackoverflow.com/a/63271002/1601580

# OLD

I think the simplest answer is the one from the cifar10 tutorial:

total = 0
net.eval()
images, labels = data
outputs = net(images)
_, predicted = torch.max(outputs.data, 1)
total += labels.size(0)
correct += (predicted == labels).sum().item()

print('Accuracy of the network on the 10000 test images: %d %%' % (
100 * correct / total))


so:

acc = (true == pred).sum().item()


If you have a counter don't forget to eventually divide by the size of the data-set or analogous values.

I've used:

N = data.size(0) # since usually it's size (batch_size, D1, D2, ...)
correct += (1/N) * correct


Self contained code:

# testing accuracy function
# https://discuss.pytorch.org/t/calculating-accuracy-of-the-current-minibatch/4308/11
# https://stackoverflow.com/questions/51503851/calculate-the-accuracy-every-epoch-in-pytorch

import torch
import torch.nn as nn

D = 1
true = torch.tensor([0,1,0,1,1]).reshape(5,1)
print(f'true.size() = {true.size()}')

batch_size = true.size(0)
print(f'batch_size = {batch_size}')
x = torch.randn(batch_size,D)
print(f'x = {x}')
print(f'x.size() = {x.size()}')

mdl = nn.Linear(D,1)
logit = mdl(x)
_, pred = torch.max(logit.data, 1)

print(f'logit = {logit}')

print(f'pred = {pred}')
print(f'true = {true}')

acc = (true == pred).sum().item()
print(f'acc = {acc}')


Also, I find this code to be good reference:

def calc_accuracy(mdl, X, Y):
# reduce/collapse the classification dimension according to max op
# resulting in most likely label
max_vals, max_indices = mdl(X).max(1)
# assumes the first dimension is batch size
n = max_indices.size(0)  # index 0 for extracting the # of elements
# calulate acc (note .item() to do float division)
acc = (max_indices == Y).sum().item() / n
return acc


Explaining pred = mdl(x).max(1)see this https://discuss.pytorch.org/t/how-does-one-get-the-predicted-classification-label-from-a-pytorch-model/91649

the main thing is that you have to reduce/collapse the dimension where the classification raw value/logit is with a max and then select it with a .indices. Usually this is dimensions 1 since dim 0 has the batch size e.g. [batch_size,D_classification] where the raw data might of size [batch_size,C,H,W]

A synthetic example with raw data in 1D as follows:

import torch
import torch.nn as nn

# data dimension [batch-size, D]
D, Dout = 1, 5
batch_size = 16
x = torch.randn(batch_size, D)
y = torch.randint(low=0,high=Dout,size=(batch_size,))

mdl = nn.Linear(D, Dout)
logits = mdl(x)
print(f'y.size() = {y.size()}')
# removes the 1th dimension with a max, which is the classification layer
# which means it returns the most likely label. Also, note you need to choose .indices since you want to return the
# position of where the most likely label is (not it's raw logit value)
pred = logits.max(1).indices
print(pred)

print('--- preds vs truth ---')
print(f'predictions = {pred}')
print(f'y = {y}')

acc = (pred == y).sum().item() / pred.size(0)
print(acc)


output:


y.size() = torch.Size([16])
tensor([3, 1, 1, 3, 4, 1, 4, 3, 1, 1, 4, 4, 4, 4, 3, 1])
--- preds vs truth ---
predictions = tensor([3, 1, 1, 3, 4, 1, 4, 3, 1, 1, 4, 4, 4, 4, 3, 1])
y = tensor([3, 3, 3, 0, 3, 4, 0, 1, 1, 2, 1, 4, 4, 2, 0, 0])
0.25


reference:

• one liner to get accuracy acc == (true == mdl(x).max(1).item() / true.size(0) assuming 0th dimension is the batch size and 1st dimension hold the logits/raw values for classification labels. Aug 5 '20 at 18:01

Here is my solution:

def evaluate(model, validation_loader, use_cuda=True):
model.eval()
acc = .0
X = data[0]
y = data[1]
if use_cuda:
X = X.cuda()
y = y.cuda()
predicted = model(X)
acc+=(predicted.round() == y).sum()/float(predicted.shape[0])
model.train()
return (acc/(i+1)).detach().item()


Note 1: Set the model to eval mode while validating and then back to train mode.

Note 2: I'm not sure if autograd needs to be disabled. Here is a thread on it

For one-hot results torch.max can be used. Example:

correct = 0
total = 0
images, labels = data
outputs = net(images)
_, predicted = torch.max(outputs.data, 1)
total += labels.size(0)
correct += (predicted == labels).sum().item()

print('Accuracy of the network on the 10000 test images: %d %%' % (
100 * correct / total))

• I usually prefer to call this at the top of my experiment script device = torch.device("cuda" if torch.cuda.is_available() else "cpu") then do mdl.to(device) or tensor.to(device) to make it shorter (and model agnostic too) Aug 4 '20 at 19:04
• also, I don't think you need .detach() if you are already using .item(). Aug 4 '20 at 19:04
• why don't you do acc+=(predicted.round() == y).sum().item() / predicted.shape[0].item() or something shorter? It seems your code has a lot of random redundancies... Aug 4 '20 at 19:05
• why is: _, predicted = torch.max(outputs.data, 1)  correct? Aug 4 '20 at 20:54

Lets look at the basics :

  Accuracy = Total Correct Observations / Total Observations


In your code when you are calculating the accuracy you are dividing Total Correct Observations in one epoch by total observations which is incorrect

correct/x.shape[0]


Instead you should divide it by number of observations in each epoch i.e. batch size. Suppose your batch size = batch_size

Solution 1. Accuracy = correct/batch_size
Solution 2. Accuracy = correct/len(labels)
Solution 3. Accuracy = correct/len(input)


Ideally at every epoch, your batch size, length of input (number of rows) and length of labels should be same.

Here check these definitions:

def train(model, train_loader):
model.train()
train_acc, correct_train, train_loss, target_count = 0, 0, 0, 0
for i, (input, target) in enumerate(train_loader):
target = target.cuda()
input_var = Variable(input)
target_var = Variable(target)

output = model(input_var)
loss = criterion(output, target_var)
loss.backward()
optimizer.step()

# accuracy
_, predicted = torch.max(output.data, 1)
target_count += target_var.size(0)
correct_train += (target_var == predicted).sum().item()
train_acc = (100 * correct_train) / target_count
return train_acc, train_loss / target_count

model.eval()
val_acc, correct_val, val_loss, target_count = 0, 0, 0, 0
for i, (input, target) in enumerate(val_loader):
target = target.cuda()
input_var = Variable(input, volatile=True)
target_var = Variable(target, volatile=True)
output = model(input_var)
loss = criterion(output, target_var)
val_loss += loss.item()

# accuracy
_, predicted = torch.max(output.data, 1)
target_count += target_var.size(0)
correct_val += (target_var == predicted).sum().item()
val_acc = 100 * correct_val / target_count
return (val_acc * 100) / target_count, val_loss / target_count

for epoch in range(0, n_epoch):
print("Epoch {0}: train_acc {1} \t train_loss {2} \t val_acc {3} \t val_loss {4}".format(epoch, train_acc, train_loss, val_acc, val_loss))


one liner to get accuracy

acc == (true == mdl(x).max(1).item() / true.size(0)


assuming 0th dimension is the batch size and 1st dimension hold the logits/raw values for classification labels.

More details:

def calc_error(mdl: torch.nn.Module, X: torch.Tensor, Y):
# acc == (true != mdl(x).max(1).item() / true.size(0)
train_acc = calc_accuracy(mdl, X, Y)
train_err = 1.0 - train_acc
return train_err

def calc_accuracy(mdl: torch.nn.Module, X: torch.Tensor, Y: torch.Tensor) -> float:
"""
Get the accuracy with respect to the most likely label

:param mdl:
:param X:
:param Y:
:return:
"""
# get the scores for each class (or logits)
y_logits = mdl(X)  # unnormalized probs
# return the values & indices with the largest value in the dimension where the scores for each class is
# get the scores with largest values & their corresponding idx (so the class that is most likely)
max_scores, max_idx_class = mdl(X).max(dim=1)  # [B, n_classes] -> [B], # get values & indices with the max vals in the dim with scores for each class/label
# usually 0th coordinate is batch size
n = X.size(0)
assert( n == max_idx_class.size(0))
# calulate acc (note .item() to do float division)
acc = (max_idx_class == Y).sum().item() / n
return acc


# Step by step example

Here is a step by step explanation with self contained code as an example:

#%%

# refs:
# https://stackoverflow.com/questions/51503851/calculate-the-accuracy-every-epoch-in-pytorch
# https://discuss.pytorch.org/t/how-to-calculate-accuracy-in-pytorch/80476/5
# https://discuss.pytorch.org/t/how-does-one-get-the-predicted-classification-label-from-a-pytorch-model/91649

# how to get the class prediction

batch_size = 4
n_classes = 2
y_logits = torch.randn(batch_size, n_classes)  # usually the scores
print('scores (logits) for each class for each example in batch (how likely a class is unnormalized)')
print(y_logits)
print('the max over entire tensor (not usually what we want)')
print(y_logits.max())
print('the max over the n_classes dim. For each example in batch returns: '
'1) the highest score for each class (most likely class)\n, and '
'2) the idx (=class) with that highest score')
print(y_logits.max(1))

print('-- calculate accuracy --')

# computing accuracy in pytorch
"""
random.choice(a, size=None, replace=True, p=None)
Generates a random sample from a given 1-D array

for pytorch random choice https://stackoverflow.com/questions/59461811/random-choice-with-pytorch
"""

import torch
import torch.nn as nn

in_features = 1
n_classes = 10
batch_size = n_classes

mdl = nn.Linear(in_features=in_features, out_features=n_classes)

x = torch.randn(batch_size, in_features)
y_logits = mdl(x)  # scores/logits for each example in batch [B, n_classes]
# get for each example in batch the label/idx most likely according to score
# y_max_idx[b] = y_pred[b] = argmax_{idx \in [n_classes]} y_logit[idx]
y_max_scores, y_max_idx = y_logits.max(dim=1)
y_pred = y_max_idx  # predictions are really the inx \in [n_classes] with the highest scores
y = torch.randint(high=n_classes, size=(batch_size,))
# accuracy for 1 batch
assert (y.size(0) == batch_size)
acc = (y == y_pred).sum() / y.size(0)
acc = acc.item()

print(y)
print(y_pred)
print(acc)


output:

scores (logits) for each class for each example in batch (how likely a class is unnormalized)
tensor([[ 0.4912,  1.5143],
[ 1.2378,  0.3172],
[-1.0164, -1.2786],
[-1.6685, -0.6693]])
the max over entire tensor (not usually what we want)
tensor(1.5143)
the max over the n_classes dim. For each example in batch returns: 1) the highest score for each class (most likely class)
, and 2) the idx (=class) with that highest score
torch.return_types.max(
values=tensor([ 1.5143,  1.2378, -1.0164, -0.6693]),
indices=tensor([1, 0, 0, 1]))
-- calculate accuracy --
tensor([6, 1, 3, 5, 3, 9, 6, 5, 6, 6])
tensor([5, 5, 5, 5, 5, 7, 7, 5, 5, 7])
0.20000000298023224