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What's a computationally sane way to, given a natural number n, generate a random number that is relatively prime to n?

I'm willing to sacrifice some randomness and coverage of all possibilities for speed. That is, if I only ever hit perhaps 75% of the possible (smaller) relative primes, that's fine.

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What do you need the numbers for? –  starblue Jul 26 '11 at 10:58

3 Answers 3

up vote 2 down vote accepted

in simple words:

unsigned random_prime(unsigned n){
     unsigned r = rand(), t;
     while ((t = gcd(r, n)) > 1)
         r /= t;
     return r;
}
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Nice! This works great. –  andyvn22 Jul 26 '11 at 3:15

"I'm willing to sacrifice randomness and coverage of all possibilities for speed." Given n, select n+1.

You're going to need to be more specific.

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1  
Or n-1. For hash tables something like this is possibly not a bad idea, and there is likely to be empirical work done (I seem to remember a mention of this in Algorithms in C++). –  user786653 Jul 25 '11 at 21:42
1  
Fantastic answer. I'm not even sure he needs to get more specific; you answered his question as written. –  Stephen Canon Jul 25 '11 at 21:42
1  
@user786653: good point about n-1. I guess that could add some more randomness to it. ;D –  Patrick87 Jul 25 '11 at 21:45
    
@Stephen: hah, yeah, I thought I did, too. Still, maybe he didn't mean what he actually asked for. –  Patrick87 Jul 25 '11 at 21:45
1  
Gah, not all the randomness! :) Lack of clarity + SO = a mess. –  andyvn22 Jul 25 '11 at 21:50

The probability that two random integers are relatively prime to one another works out to 6/pi^2 (in the limit, for large N), or approximately 61%. So generate-and-test should be a viable strategy -- the GCD calculation is about O(log n), and you will probably get a result in 2 or 3 trials.

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3  
Good idea. You know, you could even put an upper bound on the running time of this by doing at most 3 tries, and then defaulting to either (n+1) or (n-1). –  Patrick87 Jul 25 '11 at 21:43
1  
For us mathematically challenged readers, I'm curious how you know/found/ciphered the 6/pi^2 number. –  Michael Burr Jul 25 '11 at 23:11
    
mathworld.wolfram.com/RelativelyPrime.html is my guess :P –  andyvn22 Jul 26 '11 at 3:13
    
+1 Generate and test is almost certainly cheaper than factoring the number, computing the totient, computing a random number below the totient, and mapping that back to relatively prime numbers below n. Even for the product of primes up to 23 the success rate is better than 16%, which is the worst case for 32 bit numbers. –  starblue Jul 26 '11 at 11:21

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