Image I'm working with:


I'm trying to find each of the boxes in this image. The results don't have to be 100% accurate, just as long as the boxes found are approximately correct in position/size. From playing with the example for square detection, I've managed to get contours, bounding boxes, corners and the centers of boxes.

There are a few issues I'm running into here:

  1. bounding rectangles are detected for both the inside and the outside of the drawn lines.
  2. some extraneous corners/centers are detected.
  3. I'm not sure how to match corners/centers with the related contours/bounding boxes, especially when taking nested boxes into account.

Image resulting from code: https://dl.dropbox.com/u/454490/testresult.jpg

Here's the code I'm using to generate the image above:

import numpy as np
import cv2
from operator import itemgetter
from glob import glob
def angle_cos(p0, p1, p2):
    d1, d2 = (p0-p1).astype('float'), (p2-p1).astype('float')
    return abs( np.dot(d1, d2) / np.sqrt( np.dot(d1, d1)*np.dot(d2, d2) ) )
def makebin(gray):
    bin = cv2.adaptiveThreshold(gray, 255, cv2.ADAPTIVE_THRESH_MEAN_C, cv2.THRESH_BINARY, 5, 2)
    return cv2.bitwise_not(bin)
def find_squares(img):
    img = cv2.GaussianBlur(img, (11, 11), 0)
    squares = []
    points = []`
    for gray in cv2.split(img):
        bin = makebin(gray)
        contours, hierarchy = cv2.findContours(bin, cv2.RETR_LIST, cv2.CHAIN_APPROX_SIMPLE)
        corners = cv2.goodFeaturesToTrack(gray,len(contours)*4,0.2,15)
        cv2.cornerSubPix(gray,corners,(6,6),(-1,-1),(cv2.TERM_CRITERIA_MAX_ITER | cv2.TERM_CRITERIA_EPS,10, 0.1))
        for cnt in contours:
            cnt_len = cv2.arcLength(cnt, True)
            if len(cnt) >= 4 and cv2.contourArea(cnt) > 200:
                rect = cv2.boundingRect(cnt)
                if rect not in squares:
    return squares, corners, contours
if __name__ == '__main__':
    for fn in glob('../1 (Small).jpg'):
        img = cv2.imread(fn)
        squares, corners, contours = find_squares(img)
        for p in corners:
            cv2.circle(img, (p[0][0],p[0][3]), 3, (0,0,255),2)
        squares = sorted(squares,key=itemgetter(1,0,2,3))
        areas = []
        moments = []
        centers = []
        for s in squares:
            cv2.rectangle( img, (s[0],s[1]),(s[0]+s[2],s[1]+s[3]),(0,255,0),1)
        for c in contours:
        for m in moments:
            centers.append((int(m["m10"] // m["m00"]), int(m["m01"] // m["m00"])))
        for cent in centers:
            print cent
            cv2.circle(img, (cent[0],cent[1]), 3, (0,255,0),2)
        cv2.imshow('squares', img)
        ch = 0xFF & cv2.waitKey()
        if ch == 27:
  • 1
    Added the images inline for you :).
    – Blair
    Jan 9, 2013 at 23:55

3 Answers 3


I suggest a simpler approach as a starting point. For instance, morphological gradient can serve as a good local detector of strong edges, and threshold on it tends to be simple. Then, you can remove too small components, which is relatively easy for your problem too. In your example, each remaining connected component is a single box, so the problem is solved in this instance.

Here is what you would obtain with this simple procedure:

enter image description here

The red points represent the centroid of the component, so you could grow another box from there that is contained in the yellow one if the yellow ones are bad for you.

Here is the code for achieving that:

import sys
import numpy
from PIL import Image, ImageOps, ImageDraw
from scipy.ndimage import morphology, label

def boxes(orig):
    img = ImageOps.grayscale(orig)
    im = numpy.array(img)

    # Inner morphological gradient.
    im = morphology.grey_dilation(im, (3, 3)) - im

    # Binarize.
    mean, std = im.mean(), im.std()
    t = mean + std
    im[im < t] = 0
    im[im >= t] = 1

    # Connected components.
    lbl, numcc = label(im)
    # Size threshold.
    min_size = 200 # pixels
    box = []
    for i in range(1, numcc + 1):
        py, px = numpy.nonzero(lbl == i)
        if len(py) < min_size:
            im[lbl == i] = 0

        xmin, xmax, ymin, ymax = px.min(), px.max(), py.min(), py.max()
        # Four corners and centroid.
            [(xmin, ymin), (xmax, ymin), (xmax, ymax), (xmin, ymax)],
            (numpy.mean(px), numpy.mean(py))])

    return im.astype(numpy.uint8) * 255, box

orig = Image.open(sys.argv[1])
im, box = boxes(orig)

# Boxes found.

# Draw perfect rectangles and the component centroid.
img = Image.fromarray(im)
visual = img.convert('RGB')
draw = ImageDraw.Draw(visual)
for b, centroid in box:
    draw.line(b + [b[0]], fill='yellow')
    cx, cy = centroid
    draw.ellipse((cx - 2, cy - 2, cx + 2, cy + 2), fill='red')
  • From reading further, morphological gradient is the dilation minus the erosion, but your code is the dilation minus the source. Is there a reason to go with one or the other? Jan 10, 2013 at 7:25
  • 1
    @CrawfordComeaux there are at least 3 morphological gradients. The "standard one" is the one you are mentioning. The problem with it in this situation is that it might join objects because this method produces twice as thick contours. But there are also other morphological gradients, namely internal (img - erosion) and external (dilation - img). These will give one-thickness contour.
    – mmgp
    Jan 10, 2013 at 13:14
  • I just noticed there is a white dot near the bottom right corner of the image shown. That component was left there because the loop range(1, numcc) is off by one, it should be range(1, numcc + 1).
    – mmgp
    Jan 10, 2013 at 19:24
  • Thanks for the update. I'm putting the OpenCV port on hold & moving onto the next phase of the project because I'm not quickly finding a labeling function in OpenCV. Time to dig into SciPy! Update: Looks like it won't be long before OpenCV does have this, though: Pull request merged 12 hours ago Jan 11, 2013 at 0:23

I see you have already got the answer. But I think there is a much more simpler,shorter and better method available in OpenCV to resolve this problem.

While finding contours, you are also finding the hierarchy of the contours. Hierarchy of the contours is the relation between different contours.

So the flag you used in your code, cv2.RETR_TREE provides all the hierarchical relationship.

cv2.RETR_LIST provides no hierarchy while cv2.RETR_EXTERNAL gives you only external contours.

The best one for you is cv2.RETR_CCOMP which provides you all the contour, and a two-level hierarchical relationship. ie outer contour is always parent and inner hole contour always is child.

Please read following article for more information on hierarchy : Contour - 5 : Hierarchy

So hierarchy of a contour is a 4 element array in which last element is the index pointer to its parent. If a contour has no parent, it is external contour and it has a value -1. If it is a inner contour, it is a child and it will have some value which points to its parent. We are going to exploit this feature in your problem.

import cv2
import numpy as np

# Normal routines
img = cv2.imread('square.JPG')
gray = cv2.cvtColor(img,cv2.COLOR_BGR2GRAY)
ret,thresh = cv2.threshold(gray,50,255,1)

# Remove some small noise if any.
dilate = cv2.dilate(thresh,None)
erode = cv2.erode(dilate,None)

# Find contours with cv2.RETR_CCOMP
contours,hierarchy = cv2.findContours(erode,cv2.RETR_CCOMP,cv2.CHAIN_APPROX_SIMPLE)

for i,cnt in enumerate(contours):
    # Check if it is an external contour and its area is more than 100
    if hierarchy[0,i,3] == -1 and cv2.contourArea(cnt)>100:
        x,y,w,h = cv2.boundingRect(cnt)

        m = cv2.moments(cnt)
        cx,cy = m['m10']/m['m00'],m['m01']/m['m00']


Result :

enter image description here

  • Threshold on a fixed arbitrary value is a sure way to not make the method any better. Making it simpler in that regard is making it worse, just change the illumination conditions and this "recipe" fails easily. As shortness contest goes, this is pointless, as OpenCV is going to lose basically every time against Mathematica.
    – mmgp
    Jan 11, 2013 at 22:01
  • 1
    I thought the question here is to select only external contour leaving out internal contour behind, not to solve illumination problem. So my emphasis was on that part only, not illumination change. Since questioner has already got all the contours, I thought his only problem is to remove inner contours. That is why I selected fixed threshold. Otherwise, me too won't use fixed threshold in these kind of problems. Jan 12, 2013 at 3:32

This question is related to python image recognition. A solution is given in squres.py demo.

  • I'll see if I can hack it together, though it's using the ctypes port of OpenCV. It's based on a square detector provided with OpenCV, but it's way outdated and uses a much older version. Maybe I can update it for OpenCV 2.4.3. Jan 10, 2013 at 1:26

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