问题
While implementing a Kronecker-product for pedagogical reasons (without using the obvious and readily available np.kron()
), I obtained a 4 dimensional array as an intermediate result, which I've to reshape to get the final result.
But, I still can't wrap my head around reshaping these high dimensional arrays. I have this 4D
array:
array([[[[ 0, 0],
[ 0, 0]],
[[ 5, 10],
[15, 20]]],
[[[ 6, 12],
[18, 24]],
[[ 7, 14],
[21, 28]]]])
This is of shape (2, 2, 2, 2)
and I'd like to reshape it to (4,4)
. One might think that this is obvious to do with
np.reshape(my4darr, (4,4))
But, the above reshape does not give me the expected result which is:
array([[ 0, 5, 0, 10],
[ 6, 7, 12, 14],
[ 0, 15, 0, 20],
[18, 21, 24, 28]])
As you can see, all the elements in the expected result are present in the 4D
array. I just can't get the hang of doing the reshape correctly as needed. In addition to the answer, some explanation of how to do the reshape
for such high dimensional arrays would be really helpful. Thanks!
回答1:
General idea for nd
to nd
transformation
The idea with such nd
to nd
transformation is using just two things -
Permute axes (with numpy.transpose or numpy.moveaxis or numpy.rollaxis if the needed permute order is a rolled one or numpy.swapaxes if just two axes need to be swapped) and
Reshape.
Permute axes : To get the order such that the flattened version corresponds to the flattened version of output. So, if you somehow end up using it twice, look again because you shouldn't.
Reshape : To split the axes or bring the final output to the desired shape. Splitting axes is needed mostly at the start, when the input is of lower-dim and we are needed to split into blocks. Again, you shouldn't need this more than twice.
Hence, generally we would have three steps :
[ Reshape ] ---> [ Permute axes ] ---> [ Reshape ]
Create more axes Bring axes Merge axes
into correct order
Back-tracking method
The safest way to solve, given the input and output is through, what one could call as the back-tracking method, i.e. split the axes of the input (when going from smaller nd
to bigger nd
) or split the axes of the output (when going from bigger nd
to smaller nd
). The idea with the splitting is to bring the number of dims of the smaller nd
one same as the bigger nd
one. Then, study the strides of the output and match it up against the input to get the required permute order. Finally, a reshape (default way or C order) might be needed at the end, if the final one is a smaller nd
one, to merge axes.
If both input and output are of same number of dims, then we would need to split both and break into blocks and study their strides against each other. In such cases, we should have the additional input parameter of block sizes, but that's probably off-topic.
Example
Let's use this specific case to demonstrate how to apply those strategies. In here, the input is 4D
, while output is 2D
. So, most probably, we won't need reshape to split. So, we need to start with permuting axes. Since, the final output is not 4D
, but a 2D
one, we would need a reshape at the end.
Now, the input here is :
In [270]: a
Out[270]:
array([[[[ 0, 0],
[ 0, 0]],
[[ 5, 10],
[15, 20]]],
[[[ 6, 12],
[18, 24]],
[[ 7, 14],
[21, 28]]]])
The expected output is :
In [271]: out
Out[271]:
array([[ 0, 5, 0, 10],
[ 6, 7, 12, 14],
[ 0, 15, 0, 20],
[18, 21, 24, 28]])
Also, this is a bigger nd
to smaller nd
transformation, so the back-tracking method would involve, splitting the output and studying its strides and matching up against the corresponding values in input :
axis = 3
--- -->
axis = 1
------>
axis=2| axis=0| [ 0, 5, 0, 10],
| [ 6, 7, 12, 14],
v
| [ 0, 15, 0, 20],
v
[18, 21, 24, 28]])
Hence, the permuted order needed is (2,0,3,1)
:
In [275]: a.transpose((2, 0, 3, 1))
Out[275]:
array([[[[ 0, 5],
[ 0, 10]],
[[ 6, 7],
[12, 14]]],
[[[ 0, 15],
[ 0, 20]],
[[18, 21],
[24, 28]]]])
Then, simply reshape to the expected shape :
In [276]: a.transpose((2, 0, 3, 1)).reshape(4,4)
Out[276]:
array([[ 0, 5, 0, 10],
[ 6, 7, 12, 14],
[ 0, 15, 0, 20],
[18, 21, 24, 28]])
More examples
I dug up my history and found few Q&As
based on nd
to nd
transformations. These could serve as other example cases, albeit with lesser explanation (mostly). As mentioned earlier, at most two reshapes
and at most one swapaxes
/transpose
did the job everywhere. They are listed below :
- Python Reshape 3d array into 2d
- reshape an array using python/numpy
- Merging non-overlapping array blocks
- Conversion from a Numpy 3D array to a 2D array
- how to reshape an N length vector to a 3x(N/3) matrix in numpy using reshape
- Construct image from 4D list
- Reshaping/Combining several sub-matrices to one matrix in multi-dimensional space
- Interlace various small 2D matrices into a bigger one
- how to retrieve every section by 3X3?
- Reshaping 3D Numpy Array to a 2D array
- Iterate in submatrices through a bigger matrix
- Reorganizing a 2D numpy array into 3D
- Numpy change shape from (3, 512, 660, 4) to (3,2048,660,1)
- Numpy: rotate sub matrix m of M
- Split a 3D numpy array into 3D blocks
- Converting 3D matrix to cascaded 2D Matrices
- Rearranging numpy array
- Numpy: Reshape array along a specified axis
- How to construct 2d array from 2d arrays
- How to form a matrix from submatrices?
- Python: Reshape 3D image series to pixel series
回答2:
It seems like you're looking for a transpose followed by a reshape.
x.transpose((2, 0, 3, 1)).reshape(np.prod(x.shape[:2]), -1)
array([[ 0, 5, 0, 10],
[ 6, 7, 12, 14],
[ 0, 15, 0, 20],
[18, 21, 24, 28]])
To help you understand why a transposition is needed, let's analyse your incorrectly shaped output (obtained by a single reshape
call) to understand why it is incorrect.
A simple 2D reshaped version of this result (without any transposition) looks like this -
x.reshape(4, 4)
array([[ 0, 0, 0, 0],
[ 5, 10, 15, 20],
[ 6, 12, 18, 24],
[ 7, 14, 21, 28]])
Now consider this output with respect to your expected output -
array([[ 0, 5, 0, 10],
[ 6, 7, 12, 14],
[ 0, 15, 0, 20],
[18, 21, 24, 28]])
You'll notice that your actual result is obtained by a Z-like traversal of your incorrectly shaped output -
start
| /| /| /|
|/ | / |/ |
/ / /
/ / /
| /| / | /|
|/ |/ |/ |
end
This implies that you must move over the array in varying strides to get your actual result. In conclusion, a simple reshape is not enough. You must transpose the original array, in such a manner that these Z-like elements are made to be contiguous to each other, such that a subsequent reshape call gives you the output you need.
To understand how to transpose correctly, you should trace the elements along the input and figure out what axes you need to jump to get to each one in the output. The transposition follows accordingly. Divakar's answer does a sterling job of explaining this.
回答3:
The Divarkar's answer is great, though sometimes it is easier for me just to check all possible cases which transpose
and reshape
cover.
For example, the following code
n, m = 4, 2
arr = np.arange(n*n*m*m).reshape(n,n,m,m)
for permut in itertools.permutations(range(4)):
arr2 = (arr.transpose(permut)).reshape(n*m, n*m)
print(permut, arr2[0])
gives me all what one can get from 4-dimensional array using transpose
+ reshape
. Since, I know how the output should look like, I will just pick the permutation that showed me the correct answer. If I didn't get what I wanted, then transpose
+ reshape
is not general enough to cover my case and I have to do something more complicated.
来源:https://stackoverflow.com/questions/47977238/intuition-and-idea-behind-reshaping-4d-array-to-2d-array-in-numpy