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I tried Laplacian filter method but i think I did somethings wrong with its formula.


My original matrix (f)

  a b
a 1 2
b 3 4 

New matrix (g) by padding old matrix and replicating the origial one for using 3x3 filter mask

  a b c d e f
a 1 2 1 2 1 2
b 3 4 3 4 3 4
c 1 2 1 2 1 2
d 3 4 3 4 3 4
e 1 2 1 2 1 2
f 3 4 3 4 3 4

The filter (m)

  a  b  c
a 0  1  0
b 1 -4  1
c 0  1  0

Then I start at [c,c] in the new matrix. What I did in the calculation was
g(c,c) = g (c,c) + -1* (m(a,a)*g(b,b) + m(a,b)*g(b,c) + m(a,c)*g(b,d) + m(b,a)*g(c,b) + m(b,b)*g(c,c) + m(b,c)*g(c,d) + m(c,a)*g(d,b) + m(c,b)*g(d,c) + m(c,c)*g(d,d));


After performing the filter on g(c,c) , g(c,d) , g(d,c) , g (d,d), I crop the matrix as filtered these filter point to the new matrix, but the result look really weird. (not like in the book). I tried doing it in matlab by myself.

Can someday help me with this? Thank you very much

share|improve this question
    
Applying a 3x3 filter to a 2x2 image doesn't really make a lot of sense - the result will be almost completely dominated by how you handle the edges, for which there are several different methods. Try using a more reasonably sized image, e.g. 8x8. – Paul R Nov 29 '12 at 15:19
    
i just wrote like that for simple purpose – Xitrum Nov 29 '12 at 15:23
up vote 3 down vote accepted

To get the same results as Nasser's method using conv2 and filter2 (which are only the same because your filter has symmetric rows), first you can't do it in-place. Previously filtered entries will mess up the subsequent calculations. Second, I'm not sure where that g(c,c) + -1* comes in. A normal filter calculation for g(c,c) would be:

r(c,c) = m(a,a)*g(b,b) + m(a,b)*g(b,c) + m(a,c)*g(b,d) +...
         m(b,a)*g(c,b) + m(b,b)*g(c,c) + m(b,c)*g(c,d) +...
         m(c,a)*g(d,b) + m(c,b)*g(d,c) + m(c,c)*g(d,d);

where r is the result matrix. This method (repeated for the other 3 values in the original matrix) gives:

r =
   c  d
c  6  2
d -2 -6

UPDATE

using:

A =
    1     2     1     2     1     2
    3     4     3     4     3     4
    1     2     1     2     1     2
    3     4     3     4     3     4
    1     2     1     2     1     2
    3     4     3     4     3     4

mask =
    0     1     0
    1    -4     1
    0     1     0

imfilter gives:

imfilter(A,mask)
ans =
    1    -2     3    -2     3    -3
   -6    -6    -2    -6    -2    -9
    4     2     6     2     6     1
   -6    -6    -2    -6    -2    -9
    4     2     6     2     6     1
   -7    -8    -3    -8    -3   -11

The function suggested above,

for i=1:2
    for j=1:2
        r(i,j) = m(1,1)*g(i+1,j+1) + m(1,2)*g(i+1,j+2) + m(1,3)*g(i+1,j+3) +...
                 m(2,1)*g(i+2,j+1) + m(2,2)*g(i+2,j+2) + m(2,3)*g(i+2,j+3) +...
                 m(3,1)*g(i+3,j+1) + m(3,2)*g(i+3,j+2) + m(3,3)*g(i+3,j+3);
    end
end

gives:

ans =
     6     2
    -2    -6

Does this match what you expect to see?

Note: The function above is not how I would implement it, but it follows the example that you gave for clarity.

share|improve this answer
    
g(c,c) + -1* is from the Laplacian formula... and the imfilter is similar to what I tried doing above, but it brings the incorrect result – Xitrum Nov 29 '12 at 17:36
    
@Aptos What results did you expect and what results did you get? – beaker Nov 29 '12 at 17:38
    
when using imfilter with above original matrix and mask, the ans is [3,1,-1,-3], when I applyign the above function, result is [0,0,0,255] – Xitrum Nov 29 '12 at 17:52
    
@Aptos See my answer for updates on the results I got. Also, can you post a link to the Laplace formula you're using? – beaker Nov 29 '12 at 20:59

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