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you have a biased random number generator that produces a 1 with a probability p and 0 with a probability (1-p). you do not know the value of p. using this make an unbiased random number generator which produces 1 with a probability 0.5 and 0 with a probability 0.5.

Note: this problem is an exercise problem from Introduction to Algorithms by Cormen, Leiserson, Rivest, Stein.(clrs)

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Do you get to know 'p' in advance? –  fennec Dec 31 '09 at 19:47
I would guess the answer has to do with using the biased generator once the standard way and once as an inverse function so that you have a p probability of a 0 once and a (1-p) probability of a 0 the second iteration and mix the two results to balance the distribution. I don't know the exact math behind it though. –  Eric J. Dec 31 '09 at 19:50
@fennec: you do not know the value of p. –  Mark Byers Dec 31 '09 at 19:52
Eric- yeah, if you did (rand() + (1-rand()))/2, you could reasonably expect to get an unbiased result. Note that in the above you should be calling rand() twice- otherwise you just always get .5 –  JohnE Dec 31 '09 at 19:57
@JohnE: Essentially that's what I was thinking, but that doesn't leave you with a straight 0 or 1, which is requested. I think pau hit the nail on the head with his answer. –  Eric J. Dec 31 '09 at 20:02

4 Answers 4

up vote 12 down vote accepted

The events (p)(1-p) and (1-p)(p) are equiprobable. Taking them as 0 and 1 respectively and discarding the other two pairs of results you get an unbiased random generator.

In code this is done as easy as:

int UnbiasedRandom()
    int x, y;

        x = BiasedRandom();
        y = BiasedRandom();
    } while (x == y);

    return x;
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Oh, see, now, that's using Math! Cheating!! ;) –  fennec Dec 31 '09 at 20:00
Perfect. Historically, this device is due to Von Neumann who we are all familiar with (perhaps without realizing it). –  jason Dec 31 '09 at 20:19

You need to draw pairs of values from the RNG until you get a sequence of different values, i.e. zero followed by one or one followed by zero. You then take the first value (or last, doesn't matter) of that sequence. (i.e. Repeat as long as the pair drawn is either two zeros or two ones)

The math behind this is simple: a 0 then 1 sequence has the very same probability as a 1 then zero sequence. By always taking the first (or the last) element of this sequence as the output of your new RNG, we get an even chance to get a zero or a one.

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Here's one way, probably not the most efficient. Chew through a bunch of random numbers until you get a sequence of the form [0..., 1, 0..., 1] (where 0... is one or more 0s). Count the number of 0s. If the first sequence is longer, generate a 0, if the second sequence is longer, generate a 1. (If they're the same, try again.)

This is like what HotBits does to generate random numbers from radioactive particle decay:

Since the time of any given decay is random, then the interval between two consecutive decays is also random. What we do, then, is measure a pair of these intervals, and emit a zero or one bit based on the relative length of the two intervals. If we measure the same interval for the two decays, we discard the measurement and try again

HotBits: How It Works

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The trick attributed to von Neumann of getting two bits at a time, having 01 correspond to 0 and 10 to 1, and repeating for 00 or 11 has already come up. The expected value of bits you need to extract to get a single bit using this method is 1/p(1-p), which can get quite large if p is especially small or large, so it is worthwhile to ask whether the method can be improved, especially since it is evident that it throws away a lot of information (all 00 and 11 cases).

Googling for "von neumann trick biased" produced this paper that develops a better solution for the problem. The idea is that you still take bits two at a time, but if the first two attempts produce only 00s and 11s, you treat a pair of 0s as a single 0 and a pair of 1s as a single 1, and apply von Neumann's trick to these pairs. And if that doesn't work either, keep combining similarly at this level of pairs, and so on.

Further on, the paper develops this into generating multiple unbiased bits from the biased source, essentially using two different ways of generating bits from the bit-pairs, and giving a sketch that this is optimal in the sense that it produces exactly the number of bits that the original sequence had entropy in it.

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