I'm trying to implement DCT (Discrete Cosine Transform) in Matlab but without using Fast Fourier Transform, just by using the next formula:
I know this can be inefficient but this way I will get how it works.
First I divided my grayscale image in 8x8 blocks, then I apply the formula to each block.
for i=1:8:h for j=1:8:w dctMatrix(i:(i-1)+block,j:(j-1)+block) = dctII(img(i:(i-1)+block,j:(j-1)+block), block); end end
My dctII function looks like this:
function [newB] = dctII(segmento, b) [h w] = size(segmento); segmento = double(segmento); newB = zeros(b,b); for u=0:h-1 for v=0:w-1 if u == 0 Cu = 1/sqrt(2); else Cu = 1; end if v == 0 Cv = 1/sqrt(2); else Cv = 1; end sumRes = summation(segmento,u,v,b); dct = (1/4)*Cu*Cv*sumRes; segmento(u+1,v+1) = dct; end end newB = segmento; end
I also created a summation function to keep things more readable (at least for me).
function [sum] = summation(segmento,u,v,b) [h w] = size(segmento); sum = 0; for x=0:h-1 for y=0:w-1 sum = sum + (double(segmento(x+1,y+1))*cos((((2*x)+1)*u*pi)/(2*b))*cos((((2*y)+1)*v*pi)/(2*b))); end end end
The problem is that the result of my algorithm differs by far the result of Matlab prebuilt function dct2. Maybe I didn't get DCT algorithm at all. Do you know what I'm doing wrong? I know all these nested loops kill performance serverely but I can't imagine how to solve this without using FFT.
Any help would be really appreciated, thanks.