# Non-Uniform Random Number Generator Implementation?

I need a random number generator that picks numbers over a specified range with a programmable mean.

For example, I need to pick numbers between 2 and 14 and I need the average of the random numbers to be 5.

I use random number generators a lot. Usually I just need a uniform distribution.

I don't even know what to call this type of distribution.

Thank you for any assistance or insight you can provide.

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Are you sure that you provided enough information about the distribution? I believe mean value is not enough. Consider this example: let's say we generate random numbers from {0, 1, 2} with 1 mean. Now take a look at these two generators: Generator1 (0: 40%, 1: 20%, 2: 40%), Generator2 (0:10%, 1: 80%, 2:10%). For both of them average result would be 1. –  Grzegorz Oledzki Oct 7 '09 at 21:38
A near duplicate: stackoverflow.com/questions/977354/…. And non-flat pseudo-random distributions are a standard topic that has been addressed more than once on SO. Give more information and we can point you in the right direction. –  dmckee Oct 7 '09 at 22:11
If the target distribution is not easily represented by a integrable PDF look at: stackoverflow.com/questions/423006/… –  dmckee Oct 7 '09 at 22:26
WRT what GrzegorzOledzki says, you can meet the requirements as stated using uniform distribution except making 2 happen 14 times more often than the other values - ie uniform selection from a list with 14 repeats of the 2. Pretty easy, but not likely to be appropriate. –  Steve314 Oct 7 '09 at 22:33

You might be able to use a binomial distribution, if you're happy with the shape of that distribution. Set n=12 and p=0.25. This will give you a value between 0 and 12 with a mean of 3. Just add 2 to each result to get the range and mean you are looking for.

Edit: As for implementation, you can probably find a library for your chosen language that supports non-uniform distributions (I've written one myself for Java).

A binomial distribution can be approximated fairly easily using a uniform RNG. Simply perform n trials and record the number of successes. So if you have n=10 and p=0.5, it's just like flipping a coin 10 times in a row and counting the number of heads. For p=0.25 just generate uniformly-distributed values between 0 and 3 and only count zeros as successes.

If you want a more efficient implementation, there is a clever algorithm hidden away in the exercises of volume 2 of Knuth's The Art of Computer Programming.

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You haven't said what distribution you are after. Regarding your specific example, a function which produced a uniform distribution between 2 and 8 would satisfy your requirements, strictly as you have written them :)

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I think the OP intends for values from 9-14 to have some probability of being selected. –  fbrereto Oct 7 '09 at 21:36

If you want a non-uniform distribution of the random number, then you might have to implement some sort of mapping, e.g:

// returns a number between 0..5 with a custom distribution
int MyCustomDistribution()
{
int r = rand(100); // random number between 0..100
if (r < 10) return 1;
if (r < 30) return 2;
if (r < 42) return 3;
...
}
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Based on the Wikipedia sub-article about non-uniform generators, it would seem you want to apply the output of a uniform pseudorandom number generator to an area distribution that meets the desired mean.

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You can create a non-uniform PRNG from a uniform one. This makes sense, as you can imagine taking a uniform PRNG that returns 0,1,2 and create a new, non-uniform PRNG by returning 0 for values 0,1 and 1 for the value 2.

There is more to it if you want specific characteristics on the distribution of your new, non-uniform PRNG. This is covered on the Wikipedia page on PRNGs, and the Ziggurat algorithm is specifically mentioned.

With those clues you should be able to search up some code.

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My first idea would be:

• generate numbers in the range 0..1
• scale to the range -9..9 ( x-0.5; x*18)
• shift range by 5 -> -4 .. 14 (add 5)
• truncate the range to 2..14 (discard numbers < 2)

that should give you numbers in the range you want.

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But as you discard the numbers < 2 your average moves upward away from 5 doesn't it? –  user185974 Oct 7 '09 at 21:51

You need a distributed / weighted random number generator. Here's a reference to get you started.

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Assign all numbers equal probabilities,

while currentAverage not equal to intendedAverage (whithin possible margin)

pickedNumber = pick one of the possible numbers (at random, uniform probability, if you pick intendedAverage pick again)

if (pickedNumber is greater than intendedAverage and currentAverage<intendedAverage) or (pickedNumber is less than intendedAverage and currentAverage>intendedAverage)

increase pickedNumber's probability by delta at the expense of all others, conserving sum=100%

else

decrease pickedNumber's probability by delta to the benefit of all others, conserving sum=100%

end if

delta=0.98*delta (the rate of decrease of delta should probably be experimented with)

end while

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