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I need a function to generate random integers. (assume Java long type for now, but this will be extended to BigInteger or BitSet later.)

The tricky part is there is a parameter P that specifies the (independent) probability of any bit in the result being 1.

If P = 0.5 then we can just use the standard random number generator. Some other values of P are also easy to implement. Here's an incomplete example:

Random random = new Random();

// ...

long nextLong(float p) {
    if      (p == 0.0f)   return 0L;
    else if (p == 1.0f)   return -1L;
    else if (p == 0.5f)   return random.nextLong();
    else if (p == 0.25f)  return nextLong(0.5f) & nextLong(0.5f);
    else if (p == 0.75f)  return nextLong(0.5f) | nextLong(0.5f);
    else if (p == 0.375f) return nextLong(0.5f) & nextLong(0.75f); // etc
    else {
      // What goes here??
      String message = String.format("P=%f not implemented yet!", p);
      throw new IllegalArgumentException(message);

Is there a way to generalise this for any value of P between 0.0 and 1.0?

share|improve this question
Out of curiosity, have you tested that the accepted answer works? How many iterations are necessary to be acceptably close to the given probability? Was the performance still adequate? – Wim Coenen Jan 16 '10 at 13:11
Yes, I capped it at 16 iterations (1 iteration == 1 bit of accuracy) and it generates about 17 million bits per second on my (fairly old) PC. I measured this with irrational probabilities (e.g. 0.1*PI) but it's much faster for round numbers, e.g. 120Mbits/sec for p=0.75. – finnw Jan 16 '10 at 14:04
Is there any particular reason to avoid bit shifting and multiplication? – Svante Jan 18 '10 at 0:03
@Svante, no. My first attempt was too slow and I assumed it was because of the bit shifting/multiplication, but actually it was just that I was generating too many random numbers (by rolling separately for each output bit.) – finnw Jan 18 '10 at 1:01

First a little ugly math that you're already using in your code.

Define x and y are bits with probability of being 1 of X = p(x=1), Y = p(y=1) respectively. Then we have that

 p( x & y = 1) = X Y
 p( x | y = 1) = 1 - (1-X) (1-Y)
 p( x ^ y = 1) = X (1 - Y) + Y (1 - X)

Now if we let Y = 1/2 we get

P( x & y ) = X/2
P( x | y ) = (X+1)/2

Now set the RHS to the probability we want and we have two cases that we can solve for X

X = 2 p        // if we use &
X = 2 p - 1    // if we use |

Next we assume we can use this again to obtain X in terms of another variable Z... And then we keep iterating until we've done "enough".

Thats a bit unclear but consider p = 0.375

0.375 * 2 = 0.75  < 1.0 so our first operation is &
0.75 * 2 = 1.5 > 1.0 so our second operation is |
0.5 is something we know so we stop.

Thus we can get a variable with p=0.375 by X1 & (X2 | X3 )

The problem is that for most variables this will not terminate. e.g.

0.333 *2 = 0.666 < 1.0 so our first operation is &
0.666 *2 = 1.333 > 1.0 so our second operation is |
0.333 *2 = 0.666 < 1.0 so our third operation is &

so p=0.333 can be generated by

X1 & ( X2 | (X3 & (X4 | ( ... ) ) ) )

Now I suspect that taking enough terms in the series will give you enough accuracy, and this can be written as a recursive function. However there might be a better way that that too... I think the order of the operations is related to the binary representation of p, I'm just not sure exactly how... and dont have time to think about it deeper.

Anyway heres some untested C++ code that does this. You should be able to javaify it easily.

uint bitsWithProbability( float p )
   return bitsWithProbabilityHelper( p, 0.001, 0, 10 );

uint bitsWithProbabilityHelper( float p, float tol, int cur_depth, int max_depth )
   uint X = randbits();
   if( cur_depth >= max_depth) return X;
   if( p<0.5-tol)
     return X & bitsWithProbabilityHelper( 2*p, 0.001, cur_depth+1, max_depth );
     return X | bitsWithProbabilityHelper( 2*p-1, 0.001, cur_depth+1, max_depth );
   return X;
share|improve this answer
You can probably adjust tol at easch step and remove max_depth. Again just requires a bit more spare brains than I currently have. – Michael Anderson Jan 16 '10 at 3:02
+1 I had worked about the same thing and was about to test whether it converges – Wim Coenen Jan 16 '10 at 3:10
Yes I think cur_depth is redundant. Multiplying tol by a constant factor like 2.001 will have a similar effect. – finnw Jan 17 '10 at 3:31
@finw Indeed. Infact the error in the probability at truncating the series after N terms is at most pow( 2, -N ). So scaling tol by 2 every iteration is sensible / correct. – Michael Anderson Jan 17 '10 at 8:10
I figured out a way to do it iteratively using the binary representation of P. See my second answer. – finnw Jan 17 '10 at 23:34

Distribute proportional number of bits throughuot the number. Pseudocode:

long generateNumber( double probability ){
  int bitCount = 64 * probability;
  byte[] data = new byte[64]; // 0-filled

  long indexes = getRandomLong();

  for 0 to bitCount-1 {
    do { 
      // distribute this bit to some postition with 0.
      int index = indexes & 64;
      indexes >> 6;
      if( indexes == 0 ) indexes = getRandomLong();
    } while ( data[index] == 0 );
    data[index] = 1;

  return bytesToLong( data );

I hope you get what I mean. Perhaps the byte[] could be replaced with a long and bit operations to make it faster.

share|improve this answer
I hope I understood the question - do you need to guarantee the number of bits being 1, i.e. some bits permutation? – Ondra Žižka Jan 16 '10 at 3:11
Interesting, but doesn't meet the requirement that bits must be independent of each other. This method will always return exactly (64*P) ones in the result. So for example P=1/16 exactly 4 bits are set, so if bits 0-3 are set then all other bits must be clear. – finnw Jan 16 '10 at 3:11
However if this was combined with a binomial-distribution generator to choose bitCount then it could give the right result. – finnw Jan 16 '10 at 3:12
I have now implemented this as a combination of (a) binomial-distribution generator for bitCount and (b) a lookup table of permutations of bits. – finnw Jan 18 '10 at 1:37

Use a random generator that generates a uniform float number r between 0 and 1. If r>p then set the bit to 0, otherwise set it to 1

share|improve this answer
That's what I'm trying to avoid. It's too slow for my application. – finnw Jan 16 '10 at 2:03
ahh, I see what you are getting at. I'll think more about it. – James K Polk Jan 16 '10 at 2:17
You aren't going to get orders of magnitude performance improvement by calculating batches of bits together. – Tom Hawtin - tackline Jan 16 '10 at 2:17
@Tom, actually I do get an order-of-magnitude improvement, at least in the case of p=0.25, because I am generating 4 random words for each output word (assuming the RNG output is 32 bits wide.) If I generate one bit at a time I must generate 64 random words, increasing the cost by a factor of 16. – finnw Jan 16 '10 at 2:39

If you're looking to apply some distribution where with probability P you get a 1 and with probability 1-P you get a 0 at any particular bit your best bet is simply to generate each bit independently with probability P of being a 1 (that sounds like a recursive definition, I know).

Here's a solution, I'll walk through it below:

public class MyRandomBitGenerator

    Random pgen = new Random();

    // assumed p is well conditioned (0 < p < 1)
    public boolean nextBitIsOne(double p){
        return pgen.nextDouble() < p ? true : false;

    // assumed p is well conditioned (0 < p < 1)
    public long nextLong(double p){
        long nxt = 0;
        for(int i = 0; i < 64; i++){
               nxt += 1 << i;
        return nxt;


Basically, we first determine how to generate a value of 1 with probability P: pgen.nextDouble() generates a number between 0 and 1 with uniform probability, by asking if it's less than p we're sampling this distribution such that we expect to see p 1s as we call this function infinitely.

share|improve this answer
My original implementation looks very similar to this, and is very slow. That's why I decided to try bit manipulation to parallelize the bits within a word. If P is a round number like 0.25, 0.5 or 0.75 it gives a huge performance boost. I'm not sure if this is true for other values of P though. – finnw Jan 16 '10 at 2:48

Here's another variant of Michael Anderson's answer

To avoid recursion, we process the bits of P iteratively from right-to-left instead of recursively from left-to-right. This would be tricky in floating-point representation so we extract the exponent/mantissa fields from the binary representation instead.

class BitsWithProbabilityHelper {
    public BitsWithProbabilityHelper(float prob, Random rnd) {
        if (Float.isNaN(prob)) throw new IllegalArgumentException();

        this.rnd = rnd;

        if (prob <= 0f) {
            zero = true;

        // Decode IEEE float
        int probBits = Float.floatToIntBits(prob);
        mantissa = probBits & 0x7FFFFF;
        exponent = probBits >>> 23;

        // Restore the implicit leading 1 (except for denormals)
        if (exponent > 0) mantissa |= 0x800000;
        exponent -= 150;

        // Force mantissa to be odd
        int ntz = Integer.numberOfTrailingZeros(mantissa);
        mantissa >>= ntz;
        exponent += ntz;

    /** Determine how many random words we need from the system RNG to
     *  generate one output word with probability P.
    public int iterationCount() {
        return - exponent;

    /** Generate a random number with the desired probability */
    public long nextLong() {
        if (zero) return 0L;

        long acc = -1L;
        int shiftReg = mantissa - 1;
        for (int bit = exponent; bit < 0; ++ bit) {
            if ((shiftReg & 1) == 0) {
                acc &= rnd.nextLong();
            } else {
                acc |= rnd.nextLong();
            shiftReg >>= 1;
        return acc;

    /** Value of <code>prob</code>, represented as m * 2**e where m is always odd. */
    private int exponent;  
    private int mantissa;

    /** Random data source */
    private final Random rnd;

    /** Zero flag (special case) */
    private boolean zero;
share|improve this answer
This looks good. Only disadvantage to my method is that you can't specify a tolerance in the probability to limit the number of random numbers generated. However it would be easy to implement a clipping of the bits in the mantissa that would give a better result than using tol for guaranteed reduced running time. – Michael Anderson Jan 18 '10 at 0:18
Actually there's something wrong with that inner loop for very small p. I think -exponent can be bigger than the length of the shiftReg, and in those cases you do more work than is necessary. I'm also concerned that it might be doing the wrong thing for denomralised numbers. Maybe you could do a long binrep = p * 0xFFFFFFFF and loop through the bits in binrep rather than playing with the bits of a float?. Then you'd have a fixed length loop and known max error in the approximation. – Michael Anderson Jan 18 '10 at 0:31
You can apply a tolerance by calling iterationCount() first and if the answer is too high use a different method. The smallest non-zero value for a single-precision float is 2**-149, so the worst-case iteration count would be 149. Denormalised numbers are handled in line 9 (mantissa |= 0x800000 restores the implicit 1 bit of normal numbers, this is skipped for denormalised numbers.) If -exponent is huge then unfortunately you do need to loop that many times in order to get the probability down, even though the shiftReg will be zero for most iterations. – finnw Jan 18 '10 at 1:10
It wasn't handling zero correctly though. I've added a special case for P=0. – finnw Jan 18 '10 at 1:14
up vote 1 down vote accepted

Here's how I solved it in the end.

  1. Generate an integer N between 0..16, following the binomial distribution. This gives the number of '1' bits in the 16-bit partial result.
  2. Randomly generate an index into a lookup table that contains 16-bit integers containing the desired number of '1' bits.
  3. Repeat 4 times to get four 16-bit integers.
  4. Splice these four 16-bit integers together to get a 64-bit integer.

This was partly inspired by Ondra Žižka's answer.

The benefit is that it reduces the number of calls to Random.nextLong() to 8 calls per 64 bits of output. For comparison, rolling for each individual bit would require 64 calls. Bitwise AND/OR uses between 2 and 32 calls depending on the value of P

Of course calculating binomial probabilities is just as expensive, so those go in another lookup table.

It's a lot of code, but it's paying off in terms of performance.

Update - merged this with the bitwise AND/OR solution. It now uses that method if it guesses it will be more efficient (in terms of calls to Random.next().)

share|improve this answer

Suppose the size of bit array is L. If L=1, the chance that the 1st bit is 1 will be P, and that being 0 will be 1-P. For L=2, the probability of getting a 00 is (1-P)2, a 01 or 10 is P(1-P) each and 11 is P2. Extending this logic, we can first determine the first bit by comparing a random number with P, then scale the random number such that we can again get anything between 0 to 1. A sample javascript code:

function getRandomBitArray(maxBits,probabilityOf1) {
    var randomSeed = Math.random();
    bitArray = new Array();
    for(var currentBit=0;currentBit<maxBits;currentBit++){
            //fill 0 at current bit
            //scale the sample space of the random no from [0,1)
            //to [0.probabilityOf1)
            //fill 1 at current bit
            //scale the sample space to [probabilityOf1,1)
            randomSeed = (randomSeed-probabilityOf1)/(1-probabilityOf1);

EDIT: This code does generate completely random bits. I will try to explain the algorithm better.

Each bit string has a certain probability of occurring. Suppose a string has a probability of occurrence p; we want to choose that string if our random number falls is some interval of length p. The starting point of the interval must be fixed, but its value will not make much difference. Suppose we have chosen upto k bits correctly. Then, for the next bit, we divide the interval corresponding to this k-length bit-string into two parts of sizes in the ratio P:1-P (here P is the probability of getting a 1). We say that the next bit will be 1 if the random number is in the first part, 0 if it is in the second part. This ensure that the probabilities of strings of length k+1 also remain correct.

Java code:

public ArrayList<Boolean> getRandomBitArray(int maxBits, double probabilityOf1) {
    double randomSeed = Math.random();
    ArrayList<Boolean> bitArray = new ArrayList<Boolean>();
    for(int currentBit=0;currentBit<maxBits;currentBit++){
            //fill 0 at current bit
            //scale the sample space of the random no from [0,1)
            //to [0.probabilityOf1)
            //fill 1 at current bit
            //scale the sample space to [probabilityOf1,1)
            randomSeed = (randomSeed-probabilityOf1)/(1-probabilityOf1);
    return  bitArray;
share|improve this answer
@finnw I see that you didn't understand the algorithm properly. I have improved the explanation. Please go through it carefully. And about wrong language, I think the code is pretty simple to understand even for people unfamiliar with javascript if treated as a pseudo-code. Still, I am adding Java code. – Kartik Kale Nov 14 '14 at 8:44
If only double had infinite precision, this would work :-) Sorry but I did try running your code, and as I expected there is a lot of correlation among the low-order output bits. – finnw Nov 16 '14 at 3:59
Yes, this would work only if you want only as many random bits as the size of double. (More precisely, the entropy of the random number generator, say E). So, you can use one random number per E bits (like you did in your solution, generating blocks of bits). But that is a problem with any solution using a fixed number of random numbers. You cannot somehow squeeze more than one random bit from a coin toss, after all. Apart from that, i do not understand why you 'expect' this solution to generate a correlation among the bits. – Kartik Kale Nov 17 '14 at 5:35

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