# Most efficient method of generating a random number with a fixed number of bits set

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

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
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
you need to account for the fact that you might select the same position twice –  frankc Dec 11 '12 at 15:42
@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

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

Here is another option which is very simple and reasonably fast in practice.

``````choose a bit at random
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