# Applications of matrix addition to image processing?

What are the applications of matrix addition to image processing?And also is there any application in image processing which modifies current pixel value based on values of neighbour pixels?

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Strict addition is rare, but subtraction is more common, like when you subtract one image from its filtered one. For example you may subtract one image from its low pass filter and obtain its details.

Edit 1: Examples: image addition (averaging) for noise suppression. Subtraction for change enhancement.

Lots of image processing algorithms modify the pixels based on its neighbors, like many digital image filters. Take for example the prewit filter which emphasizes horizontal edges. Its kernel is:

``````[1 1 1
0 0 0
-1 -1 -1]
``````

Here the current pixel value will be replaced by the sum of its the north-west, north and north-east pixel value, minus the sum of its south-west, south and south-east pixel value. Similar kernels, for other applications, include average, gaussian, laplacian, sobel, etc.. Its is also possible to compute fast rough distance maps.

Note 1: By the way, your acceptance rate is very low. People here may understand that you are ungrateful for the answers, and therefore won't bother to answer at all. Since you're new, I'm sure it's just because you need to understand how the system works. For any answer that has usefulness, click the arrow up. At some point, chose one of the answers as "the best one" and accept it (the green V tick sign.)

Note 2: TBH the question is actually quite vague, and would address a full book of digital image processing. In the future, try to be more specific (and, for stackoverflow, ask within programming).

All the best.

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For matrix addition,I want specific application where you do addition several times..i have some background knowledge of DIP but i don't know exact area where it is crucial.. –  username_4567 Nov 28 '11 at 10:59
In edit I added noise suppression and change enhancement, which are two applications of addition for the whole image. –  Hugues Nov 28 '11 at 16:38