For example, say I have a 2D array of pixels (in other words, an image) and I want to arrange them into groups so that the number of groups will add up perfectly to a certain number (say, the total items in another 2D array of pixels). At the moment, what I try is using a combination of ratios and pixels, but this fails on anything other than perfect integer ratios (so 1:2, 1:3, 1:4, etc). When it does fail, it just scales it to the integer less than it, so, for example, a 1:2.93 ratio scale would be using a 1:2 scale with part of the image cut off. I'd rather not do this, so what are some algorithms I could use that do not get into Matrix Multipication? I remember seeing something similar to what I described at first mentioned, but I cannot find it. Is this an NP-type problem?
For example, say I have a 12-by-12 pixel image and I want to split it up into exactly 64 sub-images of n-by-m size. Through analysis one could see that I could break it up into 8 2-by-2 sub-images, and 56 2-by-1 sub-images in order to get that exact number of sub-images. So, in other words, I would get 8+56=64 sub-images using all 4(8)+56(2)=144 pixels.
Similarly, if I had a 13 by 13 pixel image and I wanted to 81 sub-images of n-by-m size, I would need to break it up into 4 2-by-2 sub-images, 76 2-by-1 sub-images, and 1 1-by-1 sub-image to get the exact number of sub-images needed. In other words, 4(4)+76(2)+1=169 and 4+76+1=81.
Yet another example, if I wanted to split the same 13 by 13 image into 36 sub-images of n-by-m size, I would need 14 4-by-2 sub-images, 7 2-by-2 sub-images, 14 2-by-1 sub-images, and 1 1-by-1 sub-image. In other words, 8(13)+4(10)+2(12)+1=169 and 13+10+12+1=36.
Of course, the image need not be square, and neither the amount of sub-images, but neither should not be prime. In addition, the amount of sub-images should be less than the number of pixels in the image. I'd probably want to stick to powers of two for the width and height of the sub-images for ease of translating one larger sub image into multiple sub images, but if I can find an algorithm which didn't do that it'd be better. That is basically what I'm trying to find an algorithm for.