Which dimension should softmax be applied to ?

This code :

```
%reset -f
import torch.nn as nn
import numpy as np
import torch
my_softmax = nn.Softmax(dim=-1)
mu, sigma = 0, 0.1 # mean and standard deviation
train_dataset = []
image = []
image_x = np.random.normal(mu, sigma, 24).reshape((3 , 4, 2))
train_dataset.append(image_x)
x = torch.tensor(train_dataset).float()
print(x)
print(my_softmax(x))
my_softmax = nn.Softmax(dim=1)
print(my_softmax(x))
```

prints following :

```
tensor([[[[-0.1500, 0.0243],
[ 0.0226, 0.0772],
[-0.0180, -0.0278],
[ 0.0782, -0.0853]],
[[-0.0134, -0.1139],
[ 0.0385, -0.1367],
[-0.0447, 0.1493],
[-0.0633, -0.2964]],
[[ 0.0123, 0.0061],
[ 0.1086, -0.0049],
[-0.0918, -0.1308],
[-0.0100, 0.1730]]]])
tensor([[[[ 0.4565, 0.5435],
[ 0.4864, 0.5136],
[ 0.5025, 0.4975],
[ 0.5408, 0.4592]],
[[ 0.5251, 0.4749],
[ 0.5437, 0.4563],
[ 0.4517, 0.5483],
[ 0.5580, 0.4420]],
[[ 0.5016, 0.4984],
[ 0.5284, 0.4716],
[ 0.5098, 0.4902],
[ 0.4544, 0.5456]]]])
tensor([[[[ 0.3010, 0.3505],
[ 0.3220, 0.3665],
[ 0.3445, 0.3230],
[ 0.3592, 0.3221]],
[[ 0.3450, 0.3053],
[ 0.3271, 0.2959],
[ 0.3355, 0.3856],
[ 0.3118, 0.2608]],
[[ 0.3540, 0.3442],
[ 0.3509, 0.3376],
[ 0.3200, 0.2914],
[ 0.3289, 0.4171]]]])
```

So first tensor is prior to softmax being applied, second tensor is result of softmax applied to tensor with dim=-1 and third tensor is result of softmax applied to tensor with dim=1 .

For result of first softmax can see corresponding elements sum to 1, for example [ 0.4565, 0.5435] -> 0.4565 + 0.5435 == 1.

What is summing to 1 as result of of second softmax ?

Which dim value should I choose ?

Update : The dimension `(3 , 4, 2)`

corresponds to image dimension where 3 is the RGB value , 4 is the number of horizontal pixels (width) , 2 is the number of vertical pixels (height). This is an image classification problem. I'm using cross entropy loss function. Also, I'm using softmax in final layer in order to back-propagate probabilities.

without context. Softmax produces a probability distribution i.e. for each element e_i, e_i \in [0, 1] and \sum{e_i} = 1. You must have good reason to do so (are you somehow computing probabilities? Or loss function?). Applying softmax on the dataset without any prior transformation (i.e. operations) does not really make sense to me.