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I was wondering what may be the reason to use this median function, instead of just calculating the min + (max - min) / 2:

// used by the random number generator
private static final double  M_E12 = 162754.79141900392083592475;

/**
 * Return an estimate of median of n values distributed in [min,max)
 * @param min the minimum value 
 * @param max the maximum value
 * @param n 
 * @return an estimate of median of n values distributed in [min,max)
 **/
private static double median(double min, double max, int n) 
{
    // get random value in [0.0, 1.0)
    double t = (new Random()).nextDouble();

    double retval;
    if (t > 0.5) {
        retval = java.lang.Math.log(1.0-(2.0*(M_E12-1)*(t-0.5)/M_E12))/12.0;
    } else {
        retval = -java.lang.Math.log(1.0-(2.0*(M_E12-1)*t/M_E12))/12.0;
    }
    // We now have something distributed on (-1.0,1.0)
    retval = (retval+1.0) * (max-min)/2.0;
    retval = retval + min;
    return retval;
}

The only downside of my approach would maybe be its deterministic nature, I'd say?

The whole code can be found here, http://www.koders.com/java/fid42BB059926626852A0D146D54F7D66D7D2D5A28D.aspx?s=cdef%3atree#L8, btw.

Thanks

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  • 1
    (max - min) / 2 That's not the median. Feb 25, 2012 at 19:37

2 Answers 2

8

[trying to cover a range here because it's not clear to me what you're not understanding]

first, the median is the middle value. the median of [0,0,1,99,99] is 1.

and so we can see that the code given is not calculating the median (it's not finding a middle value). instead, it's estimating it from some theoretical distribution. as the comment says.

the forumla you give is for the mid-point. if many values are uniformly distributed between min and max then yes, that is a good estimation of the median. in this case (presumably) the values are not distributed in that way and so some other method is necessary.

you can see why this could be necessary by calculating the mid point of the numbers above - your formula would give 49.5.

the reason for using an estimate is probably that it is much faster than finding the median. the reason for making that estimate random is likely to avoid a bad worst case on multiple calls.

and finally, sorry but i don't know what the distribution is in this case. you probably need to search for the data structure and/or author name to see if you can find a paper or book reference (i thought it might be assuming a power law, but see edit below - it seems to be adding a very small correction) (i'm not sure if that is what you are asking, or if you are more generally confused).

[edit] looking some more, i think the log(...) is giving a central bias to the uniformly random t. so it's basically doing what you suggest, but with some spread around the 0.5. here's a plot of one case which shows that retval is actually a pretty small adjustment.

3
  • Oh, I'm sorry, only now I realized I forgot to put a reference to the source paper in the original post. From the looks of it, I'd say I'd want an uniform distribution of points over space: pdfcast.org/pdf/karp. Feb 25, 2012 at 19:47
  • I don't think so. Try scrolling down and hitting "Download". Feb 25, 2012 at 20:00
  • oh right! hmmm. i don't see anything there. sorry - above (which i have edited) is as much as i know. have you tried removing it and seeing how the peformance changes? tbh it looks like it wouldn't make much difference... Feb 25, 2012 at 20:05
4

I can't tell you what this code is attempting to achieve; for a start it doesn't even use n!

But from the looks of it, it's simply generating some sort of exponentially-distributed random value in the range [min,max]. See http://en.wikipedia.org/wiki/Exponential_distribution#Generating_exponential_variates.


Interestingly, Googling for that magic number brings up lots of relevant hits, none of which are illuminating: http://www.google.co.uk/search?q=162754.79141900392083592475.

1
  • exp(12) would be it, that's also why they divide by 12.0. Feb 25, 2012 at 21:42

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