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# Laplacian Filter Formula

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

-
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

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

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.

-
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