Preprocessing the image makes the statistics work out easier. For your case, a morphological closing with a wide horizontal line followed by Otsu thresholding (statistically optimal) makes the task a lot easier. The morphological opening is interesting here because in will specially make the paper region much lighter. You have two examples where the border region is fuzzy, i.e. it contains light parts too, but that doesn't make this step useless. After that, it is only a matter of summing by column and by row, and delimiting the border based on the mean and standard deviation. If the value is below `mean - x*stddev`

, then it is outside of the paper. This way you can define the top left and bottom right corners for the paper, which you use to crop the image. The easiest way to define such corners is by linearly traversing forwardly and backwardly the sums found, stopping when the earlier condition isn't met.

For your images, `x`

in the range [-1.5, -1] works (as well others, I tested around there). I fixed the size of the horizontal line for the closing operator at 101 points. Here are the results (corners coordinates could be included if needed for comparison):

The problem, as has been pointed out, is that some of these images also contain white borders as in the next case (which are connected to the paper). To handle that, after the image is a binary one consider applying a morphological opening as that will hopefully disconnect the components. You can use a large structuring element, I used one of dimensions 51 x 51, which is not that big for the size of your images. The main limitation is the implementation of the library you are using, as this can get slow if the implementation is a bad one (scipy in specific does not have a fast implementation). After that, keep only the largest component and proceed as usual.

Sample code:

```
import sys
import numpy
import cv2 as cv
from PIL import Image, ImageOps, ImageDraw
from scipy.ndimage import morphology, label
img = ImageOps.grayscale(Image.open(sys.argv[1]))
im = numpy.array(img, dtype=numpy.uint8)
im = morphology.grey_closing(img, (1, 101))
t, im = cv.threshold(im, 0, 1, cv.THRESH_OTSU)
# "Clean noise".
im = morphology.grey_opening(im, (51, 51))
# Keep largest component.
lbl, ncc = label(im)
largest = 0, 0
for i in range(1, ncc + 1):
size = len(numpy.where(lbl == i)[0])
if size > largest[1]:
largest = i, size
for i in range(1, ncc + 1):
if i == largest[0]:
continue
im[lbl == i] = 0
col_sum = numpy.sum(im, axis=0)
row_sum = numpy.sum(im, axis=1)
col_mean, col_std = col_sum.mean(), col_sum.std()
row_mean, row_std = row_sum.mean(), row_sum.std()
row_standard = (row_sum - row_mean) / row_std
col_standard = (col_sum - col_mean) / col_std
def end_points(s, std_below_mean=-1.5):
i, j = 0, len(s) - 1
for i, rs in enumerate(s):
if rs > std_below_mean:
break
for j in xrange(len(s) - 1, i, -1):
if s[j] > std_below_mean:
break
return (i, j)
# Bounding rectangle.
x1, x2 = end_points(col_standard)
y1, y2 = end_points(row_standard)
#img.crop((x1, y1, x2, y2)).save(sys.argv[2]) # Crop.
result = img.convert('RGB')
draw = ImageDraw.Draw(result)
draw.line((x1, y1, x2, y1, x2, y2, x1, y2, x1, y1),
fill=(0, 255, 255), width=15)
result.save(sys.argv[2]) # Save with the bounding rectangle.
```