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Im currently trying to implement harris corner detection. I use mask [-1,0,1] and its transpose to get the the gradient in x and y direction: Ix, Iy.

Ix[pos] = (double) image[pos - 1] * mask[2]
    + (double) image[pos + 1] * mask[0];
Iy[pos] = (double) image[pos - width] * mask[2]
    + (double) image[pos + width] * mask[0];

then, get the Ix^2, Iy^2, and Ixy:

Ixy[pos] = Ix[pos] * Iy[pos];
Ix[pos] = Ix[pos] * Ix[pos];
Iy[pos] = Iy[pos] * Iy[pos];

next, use gaussian to smooth Ix2, Iy2, and Ixy. then use them to calculate cornerness R. then put the location whose R exceeds threshold and is the max in its 3X3 neighbours to the corner list. I use sigma=2, and threshold= 50,000. (sorry for this scary lenna):

enter image description here

I got many edge points.And the flat region even got a larger R. I debuged many hours, cant find where is the problem. could anyone give some suggestion? Thanks.

--UPDATE--- Oh God, finally the problem I found is I forget to convert my byte array image to int value. Sorry for this stupid mistake. However, what old-ufo said actually makes sense, and I do get a better result after slightly blurring my origin image. Thanks.

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1 Answer 1

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You have to do gaussian filtering before computing gradient and use normalized kernel = 0.5*[-1 0 1]. And how exactly do you compute cornerness?

Btw,if you use matlab, use can use function conv2 for gradients:

Ix = conv2(1, [1 0 -1]/2, image, 'same');
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I use R = det(M) - k*Trace(M)^2, where M=[x^2,xy,xy,Y^2], k =0.04. I think gaussian is for letting det(M) not equal to 0, but not for blurring the image before calculate gradient. here also apply Gaussian after getting gradient. link –  hakunami Nov 16 '13 at 0:24
    
Applying gradient to a not blurred image leads to noise magnification, so you get lots of maximas. Actually, blurring defines scale at which you detect the corner. Non-blurred image means you detect corners at scale 1 pixel - it fires on any pixel difference. Small blurring leads to detect "more real" corners. It is base for Harris-Laplace (en.wikipedia.org/wiki/…) –  old-ufo Nov 16 '13 at 0:42
    
So, I need to apply Gaussian twice? first on the original image, second on Ix2, Iy2, and Ixy? –  hakunami Nov 16 '13 at 1:20
    
Yes, with different sigmas. It is called integration and derivation scales (kernels). ee.surrey.ac.uk/CVSSP/Publications/papers/… –  old-ufo Nov 16 '13 at 1:36
    
Yes, this makes sense. Actually I do got some better result by blurring origin image. Thanks. But finally I figure that I forget to convert my byte image to int.Stupid mistake, ha. –  hakunami Nov 16 '13 at 13:43

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