i'm working on image processing, and i'm writing a parallel algorithm that iterates over all the pixels in an image, and changes the surrounding pixels based on it's value. In this algorithm, minor nondeterministic is acceptable, but i'd rather minimize it by only querying distant pixels simultaneously. Could someone give me an algorithm that bijectively maps the integers below n to the integers below n, in a fast and simple manner, such that two integers that are close to each other before mapping are likely to be far apart after application.
Considering the pixels to be a one dimentional array you could use a hash function j = i*p % n where n is the zero based index of the last pixel and p is a prime number chosen to place the pixel far enough away at each step. % is the remainder operator in C, mathematically I'd write j(i) = i p (mod n). So if you want to jump at least 10 rows at each iteration, choose p > 10 * w where w is the screen width. You'll want to have a lookup table for p as a function of n and w of course. Note that j hits every pixel as i goes from 0 to n. CORRECTION: Use (mod (n + 1)), not (mod n). The last index is n, which cannot be reached using mod n since n (mod n) == 0. 


For simplicity let's say 


Apart from reverting the bit order, you can use modulo. Say N is a prime number (like 521), so for all x = 0..520 you define a function: f(x) = x * fac mod N which is bijection on 0..520. which as you can see is quite uniform and not many numbers are near the diagonal  there are some, but it is a small proportion. 

