How to pick exactly k bits from a Java BitSet of length m with n bits turned on, where k≤n≤m?

Example input: m=20, n=11 enter image description here

Example output: k=3 enter image description here

The naive approach

Choose a random number 0≤ i ≤ m-1.if it's turned on on the input and not turned on on the output, turn it on in the output, until k bits are turned on in the output.

This approach fails when n is much smaller than m. Any other ideas?


You could scan the set from the first bit to the last, and apply reservoir sampling to the bits that are set.

The algorithm has O(m) time complexity, and requires O(k) memory.


How about finding n positions of all set bits and placing them in a collection as the first step, and them choosing k positions from that collection randomly?


If the constraints allow it you can solve the task by:

Construct a List holding all the set bits indexes. Do Collections#shuffle on it. Choose the first k indexes from the shuffled list.

EDIT As per the comments this algorithm can be inefficient if k is really small, whilst n is big. Here is an alternative: generate k random, different numbers in the interval [0, n]. If in the generation of a number the number is already present in the set of chosen indices, do the chaining approach: that is increase the number by 1 until you get a number that is not yet present in the set. Finally the generated indices are those that you choose amongst the set bits.

  • It's inefficient for small k and large n values. – Adam Matan May 1 '12 at 7:28
  • 2
    @AdamMatan I am not totally sure. The alternative with random probation can result in infinite loop with small n. The complexity of my approach is O(m) both in memory and time. You can not reduce the time if you want the algorithm to be really random. You can reduce the memory for small k probably. I will try to edit with this improvement. – Boris Strandjev May 1 '12 at 7:31
  • Thanks, Boris - Memory improvements would be great. – Adam Matan May 1 '12 at 7:49
  • Boris, The second approach isn't random because it favors sparse bits over dense clusters. Consider 000000001000000011111. The leftmost bit has more chances of being picked than the ones clustered in the right chunk. – Adam Matan May 1 '12 at 8:30
  • @AdamMatan nope I consider only the set bits, thus I generate k random numbers upto n, not m. – Boris Strandjev May 1 '12 at 16:44

If n is much larger than k, you can just pare down the Fisher-Yates shuffle algorithm to stop after you've chosen as many as you need:

private static Random rand = new Random();
public static BitSet chooseBits(BitSet b, int k) {
    int n = b.cardinality();
    int[] indices = new int[n];
    // collect indices:
    for (int i = 0, j = 0; i < n; i++) {
        indices[i] =j++;
    // create returning set:
    BitSet ret = new BitSet(b.size());
    // choose k bits:
    for (int i = 0; i<k; i++) {
        //The first n-i elements are still available.
        //We choose one:
        int pick = rand.nextInt(n-i);
        //We add it to our returning set:
        //Then we replace it with the current (n-i)th element
        //so that, when i is incremented, the 
        //first n-i elements are still available:
        indices[pick] = indices[n-i-1];
    return ret;
  • The memory complexity os O(n), right? It's inefficient for very large values of n where k is very small. – Adam Matan May 1 '12 at 11:31
  • @AdamMatan Yes, reservoir sampling seems like the way to go so long as your prng is very fast, since you'd call it m-k times. If it isn't, you could just choose k values in [0..n), skipping duplicates (k/n is approx. 0, so this is efficient), into a sorted set. Then the only thing you'd need to do at the m scale would be counting set bits, and noting whenever your count is in your set of random values. Obtaining n could be problematic, as it would require an extra pass to count. – maybeWeCouldStealAVan May 1 '12 at 17:17

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