I am trying to find a solution to the following problem. I have an index in C-order and I need to convert it into F-order.
To explain simply my problem, here is an example:
Let's say we have a matrix x as:
x = np.arange(1,5).reshape(2,2)
print(x)
array([[1, 2],
[3, 4]])
Then the flattened matrix in C order is:
flat_c = x.ravel()
print(flat_c)
array([1, 2, 3, 4])
Now, the value 3 is at the 2nd position of the flat_c vector i.e. flat_c[2] is 3.
If I would flatten the matrix x using the F-order, I would have:
flat_f = x.ravel(order='f')
array([1, 3, 2, 4])
Now, the value 3 is at the 1st position of the flat_f vector i.e. flat_f[1] is 3.
I am trying to find a way to get the F-order index knowing the dimension of the matrix and the corresponding index in C-order.
I tried using np.unravel_index but this function returns the matrix positions...
We can use a combination of np.ravel_multi_index and np.unravel_index for a ndarray supported solution. Hence, given array shape s of input array a and c-order index c_idx, it would be -
s = a.shape
f_idx = np.ravel_multi_index(np.unravel_index(c_idx,s)[::-1],s[::-1])
So, the idea is pretty simple. Use np.unravel_index to get c-based indices in n-dim, then get flattened-linear index in fortran order by using np.ravel_multi_index on flipped shape and those flipped n-dim indices to simulate fortran behavior.
Sample runs on 2D -
In [321]: a
Out[321]:
array([[ 0, 1, 2, 3, 4],
[ 5, 6, 7, 8, 9],
[10, 11, 12, 13, 14]])
In [322]: s = a.shape
In [323]: c_idx = 6
In [324]: np.ravel_multi_index(np.unravel_index(c_idx,s)[::-1],s[::-1])
Out[324]: 4
In [325]: c_idx = 12
In [326]: np.ravel_multi_index(np.unravel_index(c_idx,s)[::-1],s[::-1])
Out[326]: 8
Sample run on 3D array -
In [336]: a
Out[336]:
array([[[ 0, 1, 2, 3, 4],
[ 5, 6, 7, 8, 9],
[10, 11, 12, 13, 14]],
[[15, 16, 17, 18, 19],
[20, 21, 22, 23, 24],
[25, 26, 27, 28, 29]]])
In [337]: s = a.shape
In [338]: c_idx = 21
In [339]: np.ravel_multi_index(np.unravel_index(c_idx,s)[::-1],s[::-1])
Out[339]: 9
In [340]: a.ravel('F')[9]
Out[340]: 21
Suppose your matrix is of shape (nrow,ncol). Then the 1D index when unraveled in C style for the (irow,icol) entry is given by
idxc = ncol*irow + icol
In the above equation, you know idxc. Then,
icol = idxc % ncol
Now you can find irow
irow = (idxc - icol) / ncol
Now you know both irow and icol. You can use them to get the F index. I think the F index will be given by
idxf = nrow*icol + irow
Please double-check my math, I might have got something wrong...
For the 3D case, if your array has dimensions [n1][n2][n3], then the unraveled C-index for [i1][i2][i3] is
idxc = n2*n3*i1 + n3*i2+i3
Using modulo operations similar to the 2D case, we can recover i1,i2,i3 and then convert to unraveled F index, i.e.
n3*i2 + i3 = idxc % (n2*n3)
i3 = (n3*i2+i3) % n3
i2 = ((n3*i2+i3) - i3) /n3
i1 = (idxc-(n3+i2+i3)) /(n2*n3)
F index would be:
idxf = i1 + n1*i2 +n1*n2*i3
Please check my math.
In simple cases you may also get away with transposing and ravelling the array:
import numpy as np
x = np.arange(2 * 2).reshape(2, 2)
print(x)
# [[0 1]
# [2 3]]
print(x.ravel())
# [0 1 2 3]
print(x.transpose().ravel())
# [0 2 1 3]
x = np.arange(2 * 3 * 4).reshape(2, 3, 4)
print(x)
# [[[ 0 1 2 3]
# [ 4 5 6 7]
# [ 8 9 10 11]]
# [[12 13 14 15]
# [16 17 18 19]
# [20 21 22 23]]]
print(x.ravel())
# [ 0 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23]
print(x.transpose().ravel())
# [ 0 12 4 16 8 20 1 13 5 17 9 21 2 14 6 18 10 22 3 15 7 19 11 23]
I have a 30*30px image and I converted it to a NumPy array. Now I want to divide this 30*30 image into 9 equal pieces (imagine a tic-tak-toe game). I wrote the code below for that purpose but the problem with my code is that it has two nested loops and in python, that means a straight ticket to lower-performance town (specially for large number of datas). So is there a better way of doing this using NumPy and Numpy indexing?
#Factor is saing that the image should be divided into 9 sections 3*3 = 9 (kinda like 3 rows 3 columns)
def section(img , factor = 3):
secs = []
#This basicaly tests if the image can actually get divided into equal sections
if (img.shape[0] % factor != 0):
return False
#number of pixel in each row and column of the sections
pix_num = int(img.shape[0] / factor)
ptr_x_a = 0
ptr_x_b = pix_num -1
for i in range(factor):
ptr_y_a = 0
ptr_y_b = pix_num - 1
for j in range(factor):
secs.append( img[ptr_x_a :ptr_x_b , ptr_y_a : ptr_y_b] )
ptr_y_a += pix_num
ptr_y_b += pix_num
ptr_x_a += pix_num
ptr_x_b += pix_num
return np.array(secs , dtype = "int16")
P.S: Don't mind reading the whole code, just know that it uses pointers to select different areas of the image.
P.S2: See the image below to get an idea of what's happening. It is a 6*6 image divided into 9 pieces (factor = 3)
If you have an array of shape (K * M, K * N), you can transform it into something of shape (K * K, M, N) using reshape and transpose. For example, if you have K = M = N = 3, you want to transform
>>> a = np.arange(81).reshape(9, 9)
into
[[[ 0, 1, 2],
[ 9, 10, 11],
[18, 19, 20]],
[[ 3, 4, 5],
[12, 13, 14],
[21, 22, 23]],
[[ 6, 7, 8],
[15, 16, 17],
[24, 25, 26]],
...
]]]
The idea is that you need to get the elements lined up in memory in the order shown here (i.e. 0, 1, 2, 9, 10, 11, 18, ...). You can do this by adding the appropriate auxiliary dimensions and transposing:
b = a.reshape(K, M, K, N)
c = b.transpose(0, 2, 1, 3)
d = c.reahape(-1, M, N)
As a one-liner:
a.reshape(K, M, K, N).transpose(0, 2 1, 3).reshape(-1, M, N)
The order of the transpose determines the order of the blocks. The first two dimensions, 0, 2, represent the fact that your inner loop iterates the columns faster than the rows. If you wanted to arrange the blocks by column (iterate the rows faster), you could do
c = b.transpose(2, 0, 1, 3)
Reshaping does not change the memory layout of the elements, but transposing copies data if necessary.
In your particular example, K = 3 and M = N = 10. The code above does not change in any way besides that.
As an aside, your loops can be improved by making the ranges directly over the indices you want rather auxiliary quantities, as well as pre-allocating the output:
result = np.zeros(factor * factor, pix_num, pix_num)
n = 0
for r in range(0, img.shape[0], pix_num):
for c in range(0, img.shape[1], pix_num):
result[n, :, :] = img[r:r + pix_num, c:c + pix_num]
n += 1
a = np.arange(36)
a.resize(6, 6)
print(a)
b = list(map(lambda x: np.array_split(x, 3, axis=1), np.array_split(a, 3, axis=0)))
print(np.array(b).reshape(9,2,2))
[[ 0 1 2 3 4 5]
[ 6 7 8 9 10 11]
[12 13 14 15 16 17]
[18 19 20 21 22 23]
[24 25 26 27 28 29]
[30 31 32 33 34 35]]
[[[ 0 1]
[ 6 7]]
[[ 2 3]
[ 8 9]]
[[ 4 5]
[10 11]]
[[12 13]
[18 19]]
[[14 15]
[20 21]]
[[16 17]
[22 23]]
[[24 25]
[30 31]]
[[26 27]
[32 33]]
[[28 29]
[34 35]]]
You can do something like this to get one section:
sec = img[:10]
sec = list(zip(*sec))[:10]
sec = list(zip(*sec))
This will pick out the first 10x10 section.
Is there a way to slice a 2d array in numpy into smaller 2d arrays?
Example
[[1,2,3,4], -> [[1,2] [3,4]
[5,6,7,8]] [5,6] [7,8]]
So I basically want to cut down a 2x4 array into 2 2x2 arrays. Looking for a generic solution to be used on images.
There was another question a couple of months ago which clued me in to the idea of using reshape and swapaxes. The h//nrows makes sense since this keeps the first block's rows together. It also makes sense that you'll need nrows and ncols to be part of the shape. -1 tells reshape to fill in whatever number is necessary to make the reshape valid. Armed with the form of the solution, I just tried things until I found the formula that works.
You should be able to break your array into "blocks" using some combination of reshape and swapaxes:
def blockshaped(arr, nrows, ncols):
"""
Return an array of shape (n, nrows, ncols) where
n * nrows * ncols = arr.size
If arr is a 2D array, the returned array should look like n subblocks with
each subblock preserving the "physical" layout of arr.
"""
h, w = arr.shape
assert h % nrows == 0, f"{h} rows is not evenly divisible by {nrows}"
assert w % ncols == 0, f"{w} cols is not evenly divisible by {ncols}"
return (arr.reshape(h//nrows, nrows, -1, ncols)
.swapaxes(1,2)
.reshape(-1, nrows, ncols))
turns c
np.random.seed(365)
c = np.arange(24).reshape((4, 6))
print(c)
[out]:
[[ 0 1 2 3 4 5]
[ 6 7 8 9 10 11]
[12 13 14 15 16 17]
[18 19 20 21 22 23]]
into
print(blockshaped(c, 2, 3))
[out]:
[[[ 0 1 2]
[ 6 7 8]]
[[ 3 4 5]
[ 9 10 11]]
[[12 13 14]
[18 19 20]]
[[15 16 17]
[21 22 23]]]
I've posted an inverse function, unblockshaped, here, and an N-dimensional generalization here. The generalization gives a little more insight into the reasoning behind this algorithm.
Note that there is also superbatfish's
blockwise_view. It arranges the
blocks in a different format (using more axes) but it has the advantage of (1)
always returning a view and (2) being capable of handling arrays of any
dimension.
It seems to me that this is a task for numpy.split or some variant.
e.g.
a = np.arange(30).reshape([5,6]) #a.shape = (5,6)
a1 = np.split(a,3,axis=1)
#'a1' is a list of 3 arrays of shape (5,2)
a2 = np.split(a, [2,4])
#'a2' is a list of three arrays of shape (2,5), (2,5), (1,5)
If you have a NxN image you can create, e.g., a list of 2 NxN/2 subimages, and then divide them along the other axis.
numpy.hsplit and numpy.vsplit are also available.
There are some other answers that seem well-suited for your specific case already, but your question piqued my interest in the possibility of a memory-efficient solution usable up to the maximum number of dimensions that numpy supports, and I ended up spending most of the afternoon coming up with possible method. (The method itself is relatively simple, it's just that I still haven't used most of the really fancy features that numpy supports so most of the time was spent researching to see what numpy had available and how much it could do so that I didn't have to do it.)
def blockgen(array, bpa):
"""Creates a generator that yields multidimensional blocks from the given
array(_like); bpa is an array_like consisting of the number of blocks per axis
(minimum of 1, must be a divisor of the corresponding axis size of array). As
the blocks are selected using normal numpy slicing, they will be views rather
than copies; this is good for very large multidimensional arrays that are being
blocked, and for very large blocks, but it also means that the result must be
copied if it is to be modified (unless modifying the original data as well is
intended)."""
bpa = np.asarray(bpa) # in case bpa wasn't already an ndarray
# parameter checking
if array.ndim != bpa.size: # bpa doesn't match array dimensionality
raise ValueError("Size of bpa must be equal to the array dimensionality.")
if (bpa.dtype != np.int # bpa must be all integers
or (bpa < 1).any() # all values in bpa must be >= 1
or (array.shape % bpa).any()): # % != 0 means not evenly divisible
raise ValueError("bpa ({0}) must consist of nonzero positive integers "
"that evenly divide the corresponding array axis "
"size".format(bpa))
# generate block edge indices
rgen = (np.r_[:array.shape[i]+1:array.shape[i]//blk_n]
for i, blk_n in enumerate(bpa))
# build slice sequences for each axis (unfortunately broadcasting
# can't be used to make the items easy to operate over
c = [[np.s_[i:j] for i, j in zip(r[:-1], r[1:])] for r in rgen]
# Now to get the blocks; this is slightly less efficient than it could be
# because numpy doesn't like jagged arrays and I didn't feel like writing
# a ufunc for it.
for idxs in np.ndindex(*bpa):
blockbounds = tuple(c[j][idxs[j]] for j in range(bpa.size))
yield array[blockbounds]
You question practically the same as this one. You can use the one-liner with np.ndindex() and reshape():
def cutter(a, r, c):
lenr = a.shape[0]/r
lenc = a.shape[1]/c
np.array([a[i*r:(i+1)*r,j*c:(j+1)*c] for (i,j) in np.ndindex(lenr,lenc)]).reshape(lenr,lenc,r,c)
To create the result you want:
a = np.arange(1,9).reshape(2,1)
#array([[1, 2, 3, 4],
# [5, 6, 7, 8]])
cutter( a, 1, 2 )
#array([[[[1, 2]],
# [[3, 4]]],
# [[[5, 6]],
# [[7, 8]]]])
Some minor enhancement to TheMeaningfulEngineer's answer that handles the case when the big 2d array cannot be perfectly sliced into equally sized subarrays
def blockfy(a, p, q):
'''
Divides array a into subarrays of size p-by-q
p: block row size
q: block column size
'''
m = a.shape[0] #image row size
n = a.shape[1] #image column size
# pad array with NaNs so it can be divided by p row-wise and by q column-wise
bpr = ((m-1)//p + 1) #blocks per row
bpc = ((n-1)//q + 1) #blocks per column
M = p * bpr
N = q * bpc
A = np.nan* np.ones([M,N])
A[:a.shape[0],:a.shape[1]] = a
block_list = []
previous_row = 0
for row_block in range(bpc):
previous_row = row_block * p
previous_column = 0
for column_block in range(bpr):
previous_column = column_block * q
block = A[previous_row:previous_row+p, previous_column:previous_column+q]
# remove nan columns and nan rows
nan_cols = np.all(np.isnan(block), axis=0)
block = block[:, ~nan_cols]
nan_rows = np.all(np.isnan(block), axis=1)
block = block[~nan_rows, :]
## append
if block.size:
block_list.append(block)
return block_list
Examples:
a = np.arange(25)
a = a.reshape((5,5))
out = blockfy(a, 2, 3)
a->
array([[ 0, 1, 2, 3, 4],
[ 5, 6, 7, 8, 9],
[10, 11, 12, 13, 14],
[15, 16, 17, 18, 19],
[20, 21, 22, 23, 24]])
out[0] ->
array([[0., 1., 2.],
[5., 6., 7.]])
out[1]->
array([[3., 4.],
[8., 9.]])
out[-1]->
array([[23., 24.]])
For now it just works when the big 2d array can be perfectly sliced into equally sized subarrays.
The code bellow slices
a ->array([[ 0, 1, 2, 3, 4, 5],
[ 6, 7, 8, 9, 10, 11],
[12, 13, 14, 15, 16, 17],
[18, 19, 20, 21, 22, 23]])
into this
block_array->
array([[[ 0, 1, 2],
[ 6, 7, 8]],
[[ 3, 4, 5],
[ 9, 10, 11]],
[[12, 13, 14],
[18, 19, 20]],
[[15, 16, 17],
[21, 22, 23]]])
p ang q determine the block size
Code
a = arange(24)
a = a.reshape((4,6))
m = a.shape[0] #image row size
n = a.shape[1] #image column size
p = 2 #block row size
q = 3 #block column size
block_array = []
previous_row = 0
for row_block in range(blocks_per_row):
previous_row = row_block * p
previous_column = 0
for column_block in range(blocks_per_column):
previous_column = column_block * q
block = a[previous_row:previous_row+p,previous_column:previous_column+q]
block_array.append(block)
block_array = array(block_array)
If you want a solution that also handles the cases when the matrix is
not equally divided, you can use this:
from operator import add
half_split = np.array_split(input, 2)
res = map(lambda x: np.array_split(x, 2, axis=1), half_split)
res = reduce(add, res)
Here is a solution based on unutbu's answer that handle case where matrix cannot be equally divided. In this case, it will resize the matrix before using some interpolation. You need OpenCV for this. Note that I had to swap ncols and nrows to make it works, didn't figured why.
import numpy as np
import cv2
import math
def blockshaped(arr, r_nbrs, c_nbrs, interp=cv2.INTER_LINEAR):
"""
arr a 2D array, typically an image
r_nbrs numbers of rows
r_cols numbers of cols
"""
arr_h, arr_w = arr.shape
size_w = int( math.floor(arr_w // c_nbrs) * c_nbrs )
size_h = int( math.floor(arr_h // r_nbrs) * r_nbrs )
if size_w != arr_w or size_h != arr_h:
arr = cv2.resize(arr, (size_w, size_h), interpolation=interp)
nrows = int(size_w // r_nbrs)
ncols = int(size_h // c_nbrs)
return (arr.reshape(r_nbrs, ncols, -1, nrows)
.swapaxes(1,2)
.reshape(-1, ncols, nrows))
a = np.random.randint(1, 9, size=(9,9))
out = [np.hsplit(x, 3) for x in np.vsplit(a,3)]
print(a)
print(out)
yields
[[7 6 2 4 4 2 5 2 3]
[2 3 7 6 8 8 2 6 2]
[4 1 3 1 3 8 1 3 7]
[6 1 1 5 7 2 1 5 8]
[8 8 7 6 6 1 8 8 4]
[6 1 8 2 1 4 5 1 8]
[7 3 4 2 5 6 1 2 7]
[4 6 7 5 8 2 8 2 8]
[6 6 5 5 6 1 2 6 4]]
[[array([[7, 6, 2],
[2, 3, 7],
[4, 1, 3]]), array([[4, 4, 2],
[6, 8, 8],
[1, 3, 8]]), array([[5, 2, 3],
[2, 6, 2],
[1, 3, 7]])], [array([[6, 1, 1],
[8, 8, 7],
[6, 1, 8]]), array([[5, 7, 2],
[6, 6, 1],
[2, 1, 4]]), array([[1, 5, 8],
[8, 8, 4],
[5, 1, 8]])], [array([[7, 3, 4],
[4, 6, 7],
[6, 6, 5]]), array([[2, 5, 6],
[5, 8, 2],
[5, 6, 1]]), array([[1, 2, 7],
[8, 2, 8],
[2, 6, 4]])]]
I publish my solution. Notice that this code doesn't' actually create copies of original array, so it works well with big data. Moreover, it doesn't crash if array cannot be divided evenly (but you can easly add condition for that by deleting ceil and checking if v_slices and h_slices are divided without rest).
import numpy as np
from math import ceil
a = np.arange(9).reshape(3, 3)
p, q = 2, 2
width, height = a.shape
v_slices = ceil(width / p)
h_slices = ceil(height / q)
for h in range(h_slices):
for v in range(v_slices):
block = a[h * p : h * p + p, v * q : v * q + q]
# do something with a block
This code changes (or, more precisely, gives you direct access to part of an array) this:
[[0 1 2]
[3 4 5]
[6 7 8]]
Into this:
[[0 1]
[3 4]]
[[2]
[5]]
[[6 7]]
[[8]]
If you need actual copies, Aenaon code is what you are looking for.
If you are sure that big array can be divided evenly, you can use numpy splitting tools.
to add to #Aenaon answer and his blockfy function, if you are working with COLOR IMAGES/ 3D ARRAY here is my pipeline to create crops of 224 x 224 for 3 channel input
def blockfy(a, p, q):
'''
Divides array a into subarrays of size p-by-q
p: block row size
q: block column size
'''
m = a.shape[0] #image row size
n = a.shape[1] #image column size
# pad array with NaNs so it can be divided by p row-wise and by q column-wise
bpr = ((m-1)//p + 1) #blocks per row
bpc = ((n-1)//q + 1) #blocks per column
M = p * bpr
N = q * bpc
A = np.nan* np.ones([M,N])
A[:a.shape[0],:a.shape[1]] = a
block_list = []
previous_row = 0
for row_block in range(bpc):
previous_row = row_block * p
previous_column = 0
for column_block in range(bpr):
previous_column = column_block * q
block = A[previous_row:previous_row+p, previous_column:previous_column+q]
# remove nan columns and nan rows
nan_cols = np.all(np.isnan(block), axis=0)
block = block[:, ~nan_cols]
nan_rows = np.all(np.isnan(block), axis=1)
block = block[~nan_rows, :]
## append
if block.size:
block_list.append(block)
return block_list
then extended above to
for file in os.listdir(path_to_crop): ### list files in your folder
img = io.imread(path_to_crop + file, as_gray=False) ### open image
r = blockfy(img[:,:,0],224,224) ### crop blocks of 224 x 224 for red channel
g = blockfy(img[:,:,1],224,224) ### crop blocks of 224 x 224 for green channel
b = blockfy(img[:,:,2],224,224) ### crop blocks of 224 x 224 for blue channel
for x in range(0,len(r)):
img = np.array((r[x],g[x],b[x])) ### combine each channel into one patch by patch
img = img.astype(np.uint8) ### cast back to proper integers
img_swap = img.swapaxes(0, 2) ### need to swap axes due to the way things were proceesed
img_swap_2 = img_swap.swapaxes(0, 1) ### do it again
Image.fromarray(img_swap_2).save(path_save_crop+str(x)+"bounding" + file,
format = 'jpeg',
subsampling=0,
quality=100) ### save patch with new name etc