2

Part of my application is dedicated to recognizing the corners of all the object inside an image. I've found many ways to detect the corners, such as Harris corner detection and GoodFeatureToTrack. After some tests, GoodFeatureToTrack has proved to be the best solution but I'm stuck with the manipulation of the multi-dimensional array.

How can I iterate this type of array to check if inside the list of points there are four coordinates that form a square?

image = cv2.cvtColor(frame, cv2.COLOR_BGR2GRAY)
corners = cv2.goodFeaturesToTrack(image, 150, 0.01, 15)
corners = np.int0(corners) 
print("Points")
for corner in corners:
   x, y = corner.ravel()
   cv2.circle(image, (x, y), 5, (0, 0, 255), -1)
print(corners)

This is the actual result

Points

[[[141 265]]

[[148 176]]

[[136 360]]

[[233 358]]

[[192 218]]

[[130 465]]]
New contributor
Minez97 is a new contributor to this site. Take care in asking for clarification, commenting, and answering. Check out our Code of Conduct.
0

I wrote a function, that looks for square forming points in a list of points and returns the four points if they exist, None if not. For any two points in the list it first calculates their difference and turns this vector 90 degrees. Then it checks if either point1 + this vector and point2 + this vector or point1 - this vector and point2 - this vector are in the list and returns them if this is the case. diffRotated.any() is there just to make sure point1 and point2 are not the same.

def findSquare(points):
    for i, point1 in enumerate(points):
        for point2 in points[i+1:]:
            diffRotated = np.array([point2[1]-point1[1], point1[0]-point2[0]])
            if (diffRotated.any() and np.any(points == point1 + diffRotated) and np.any(points == point2 + diffRotated)):
                return np.array([point1, point2, point1 + diffRotated, point2 + diffRotated])
            elif(diffRotated.any() and np.any(points == point1 - diffRotated) and np.any(points == point2 - diffRotated)):
                return np.array([point1, point2, point1 - diffRotated, point2 - diffRotated])
    return None

For testing I added two entries to your list such that they form a square with two other points from your list:

points = np.array([[141, 265],
                   [148, 176],
                   [136, 360],
                   [233, 358],
                   [192, 218],
                   [130, 465],
                   [145, 167],
                   [ 94, 214]])
print(findSquare(points))
# array([[141, 265],
#        [192, 218],
#        [ 94, 214],
#        [145, 167]])
print(findSquare(points[:-1]))
# None

If you want to get all the squares you will need to modify my code and check that each square is only returned once. Also this code is not very efficient, there could be a way I haven't thought of to do this in a numpy stylish way.

  • Thank you!! I'll try to implement this code – Minez97 Feb 12 at 15:13
  • Your code help me a lot! What I have to modify to retrieve all the square inside the list? @markuscosinus – Minez97 Feb 12 at 20:39
0

Consider all pairs of points in turn (N(N-1)/2 of them), and consider them as the diagonal of a square. Then you can predict the positions of the two other vertices. There are two options:

  • use a point-location structure such as a kD-tree and perform a fixed-radius near-neighbor search (assuming that you allow a small tolerance around the expected location);

  • perform a local search in the image, spiraling from the expected location.

The first method will cost about O(N² Log N) operations, and the second O(N² t²), where t is the allowed tolerance in pixels.

Your Answer

Minez97 is a new contributor. Be nice, and check out our Code of Conduct.

By clicking "Post Your Answer", you acknowledge that you have read our updated terms of service, privacy policy and cookie policy, and that your continued use of the website is subject to these policies.

Not the answer you're looking for? Browse other questions tagged or ask your own question.