# Random access random permutations [closed]

I want to generate a very large pseudorandom permutation p : [0,n-1] -> [0,n-1], and then compute m specific values p[i], where m << n. Is it possible to do this in O(m) time? The motivation is a large parallel computation where each processor only needs to see a small piece of the permutation, but the permutation must be consistent between processors.

Note that in order to help in the parallel case, different processes computing disjoint sets of i values shouldn't accidentally produce p[i] == p[j] for i != j.

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Mostly a duplicate of stackoverflow.com/questions/10054732/…. –  Geoffrey Irving Dec 29 '12 at 1:59

## closed as not a real question by Mitch Wheat, Praveen Kumar, Bohemian♦, palaѕн, NeoliskDec 29 '12 at 21:27

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

EDIT: There is a much more clever algorithm based on block ciphers that I think Geoff will write up.

There are two common algorithms for generating permutations. Knuth's shuffle is inherently sequential so not a nice choice for parallelism. The other is random selection with retry any time repetition is encountered. Random selection is clearly equivalent when applied in any order, thus I propose the following simple algorithm:

1. Randomly sample candidate `p[i]` in `[0,n-1]` for each `i` in `Needed` (in parallel).
2. Remove all non-collided entries from `Needed`, as well as (optionally) some deterministic choice from the collisions (e.g., keep `p[i]` if `i < {j | p[j] = p[i]}`).
3. Repeat from step 1 with new (smaller) set `Needed`.

Since we haven't lost entropy in this process, the result is essentially equivalent to sequential random sampling in some different order, starting with the locations `i` that did not collide (we just didn't know that order in advance). Note that if we used the computed value in a comparison, for example, we would have introduced bias.

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This solution does answer the question as stated, but doesn't solve the motivating problem where different parallel processes need to coordinate which permutation is chosen. I'll edit the question. –  Geoffrey Irving Dec 29 '12 at 2:17