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I need to generate a random number, but it needs to be selected from the set of binary numbers with equal numbers of set bits. E.g. choose a random byte value with exactly 2 bits set...

00000000 - no
00000001 - no
00000010 - no
00000011 - YES
00000100 - no
00000101 - YES
00000110 - YES
...

=> Set of possible numbers 3, 5, 6...

Note that this is a simplified set of numbers. Think more along the lines of 'Choose a random 64-bit number with exactly 40 bits set'. Each number from the set must be equally likely to arise.

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1  
Choose N random positions for the set bits. –  Daniel Fischer Dec 11 '12 at 15:29
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4 Answers

up vote 5 down vote accepted

Do a random selection from the set of all bit positions, then set those bits.

Example in Python:

def random_bits(word_size, bit_count):
    number = 0
    for bit in random.sample(range(word_size), bit_count):
        number |= 1 << bit
    return number

Results of running the above 10 times:

0xb1f69da5cb867efbL
0xfceff3c3e16ea92dL
0xecaea89655befe77L
0xbf7d57a9b62f338bL
0x8cd1fee76f2c69f7L
0x8563bfc6d9df32dfL
0xdf0cdaebf0177e5fL
0xf7ab75fe3e2d11c7L
0x97f9f1cbb1f9e2f8L
0x7f7f075de5b73362L
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Just make sure you don't select the same one twice. –  Eric Petroelje Dec 11 '12 at 15:40
1  
The set will be nCr sized. C(64,40) = 64! / ( 40! (64 - 40)! ) = 250649105469666120 entries. Too big to fit in memory, might need to compress in some sort. –  Uday Dec 11 '12 at 15:41
1  
you need to account for the fact that you might select the same position twice –  frankc Dec 11 '12 at 15:42
1  
@Uday, I said "bit positions" - there are only 64 of those. I hope the code sample I added makes it clearer. –  Mark Ransom Dec 11 '12 at 15:43
    
@frankc, forgive me if I wasn't clear. By "random selection" I meant choosing from a set where the members of the set are already unique. –  Mark Ransom Dec 11 '12 at 15:44
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Say the number of bits to set is b and the word size is w. I would create a vector v of of length w with the first b values set to 1 and the rest set to 0. Then just shuffle v.

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Interesting. I wonder if it'd be reasonable to write a 'bitwise shuffle' that shuffles the actual bits. –  izb Dec 11 '12 at 15:43
    
it should be possible. The well-known best shuffle is called fisher-yates. It just involves swapping positions cleverly so I don't see why it couldn't be done with bitwise operations –  frankc Dec 11 '12 at 15:44
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Here is another option which is very simple and reasonably fast in practice.

choose a bit at random
if it is already set
    do nothing
else
    set it
    increment count
end if

Repeat until count equals the number of bits you want set.

This will only be slow when the number of bits you want set (call it k) is more than half the word length (call it N). In that case, use the algorithm to set N - k bits instead and then flip all the bits in the result.

I bet the expected running time here is pretty good, although I am too lazy/stupid to compute it precisely right now. But I can bound it as less than 2*k... The expected number of flips of a coin to get "heads" is two, and each iteration here has a better than 1/2 chance of succeeding.

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If you don't have the convenience of Python's random.sample, you might do this in C using the classic sequential sampling algorithm:

unsigned long k_bit_helper(int n, int k, unsigned long bit, unsigned long accum) {
  if !(n && k)
    return accum;
  if (k > rand() % n)
    return k_bit_helper(n - 1, k - 1, bit + bit, accum + bit);
  else
    return k_bit_helper(n - 1, k, bit + bit, accum);
}

unsigned long random_k_bits(int k) {
  return k_bit_helper(64, k, 1, 0);
}

The cost of the above will be dominated by the cost of generating the random numbers (true in the other solutions, also). You can optimize this a bit if you have a good prng by batching: for example, since you know that the random numbers will be in steadily decreasing ranges, you could get the random numbers for n through n-3 by getting a random number in the range 0..(n * (n - 1) * (n - 2) * (n - 3)) and then extracting the individual random numbers:

r = randint(0, n * (n - 1) * (n - 2) * (n - 3) - 1);
rn  = r % n; r /= n
rn1 = r % (n - 1); r /= (n - 1);
rn2 = r % (n - 2); r /= (n - 2);
rn3 = r % (n - 3); r /= (n - 3);

The maximum value of n is presumably 64 or 26, so the maximum value of the product above is certainly less than 224. Indeed, if you used a 64-bit prng, you could extract as many as 10 random numbers out of it. However, don't do this unless you know the prng you use produces independently random bits.

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That tip about slicing up long random numbers into smaller ranges is alone worth remembering. –  izb Dec 11 '12 at 16:37
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