# IDCT (inverse discrete cosine transformation) for Scheme impl. of jpeg decoder

Could someone explain me the inverse discrete cosine transform function and probably give me an implementation of it in Scheme/Racket which operates on 8x8 blocks? If you don't know scheme maybe you could help me out with some pseudo code.

``````The mathematical definition of Forward DCT (FDCT) and Inverse DCT (IDCT) is :
FDCT:
c(u,v)     7   7                 2*x+1                2*y+1

F(u,v) = --------- * sum sum f(x,y) * cos (------- *u*PI)* cos (------ *v*PI)

4       x=0 y=0                 16                   16

u,v = 0,1,...,7

{ 1/2 when u=v=0

c(u,v) = {

{  1 otherwise

IDCT:

1     7   7                      2*x+1                2*y+1

f(x,y) =  --- * sum sum c(u,v)*F(u,v)*cos (------- *u*PI)* cos (------ *v*PI)

4    u=0 v=0                      16                   16

x,y=0,1...7
``````
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I could give you an example in Python, that's almost pseudo code. :) – onemasse Jun 9 '11 at 13:35

This is just based on your definition of the dct above; I couldn't find any good example values for that formula, so this can't be considered tested.

``````(define pi 3.14) ; set this to however accurate you want

(define c
(lambda (u v)
(if (and (= u 0)
(= v 0))
1/2
1)))

(define fdct
(lambda (f u v)
(* (/ (c u v)
4)
(let x-loop ((x 0)
(x-sum 0))
(if (< x 7)
(x-loop (+ x 1)
(+ x-sum
(let y-loop ((y 0)
(y-sum 0))
(if (< y 7)
(y-loop (+ y 1)
(+ y-sum (* (f x y)
(cos (* (/ (+ (* 2 x)
1)
16)
u
pi))
(cos (* (/ (+ (* 2 y)
1)
16)
v
pi)))))
y-sum))))
x-sum)))))

(define idct
(lambda (f x y)
(* 1/4
(let u-loop ((u 0)
(u-sum 0))
(if (< u 7)
(u-loop (+ u 1)
(+ u-sum
(let v-loop ((v 0)
(v-sum 0))
(if (< v 7)
(v-loop (+ v 1)
(+ v-sum
(* (c u v)
(f u v)
(cos (* (/ (+ (* 2 x)
1)
16)
u
pi))
(cos (* (/ (+ (* 2 x)
1)
16)
u
pi)))))
v-sum))))
u-sum)))))
``````
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