# Computing generalized mean for extreme values of p

How do I compute the generalized mean for extreme values of p (very close to 0, or very large) with reasonable computational error?

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+1 good question, thought about this for quite a while, I got nothing. Might want to try stats.stackexchange.com –  justaname Feb 24 '11 at 21:00
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## 3 Answers

Here's a hunch:

First convert all your numbers into a representation in base p. Now to raise to a power of 1/p or p, you just have to shift them --- so you can very easily do all powers without losing precision.

Work out your mean in base p, then convert the result back to base two.

If that doesn't work, an even less practical hunch:

Try working out the discrete Fourier transform, and relating that to the discrete Fourier transform of the input vector.

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As per your link, the limit for p going to 0 is the geometric mean, for which bounds are derived.

The limit for p going to infinity is the maximum.

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I think the answer here should be to use a recursive solution. In the same way that mean(1,2,3,4)=mean(mean(1,2),mean(3,4)), you can do this kind of recursion for generalized means. What this buys you is that you won't need to do as many sums of really large numbers and you decrease the likelihood of creating an overflow. Also, the other danger when working with floating point numbers is when adding numbers of very different magnitudes (or subtracting numbers of very similar magnitudes). So to avoid these kinds of rounding errors it might help to sort your data before you try and calculate the generalized mean.

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My guess is that error comes from raising to power p and 1/p. Do you think splitting the mean helps overcome this error? –  Alexandru Feb 25 '11 at 20:08
@Alexandru I am curious why you think that the exponentiation will be the big problem. Would you elaborate? –  Samsdram Feb 26 '11 at 2:45
pow(pow(7, 1e-10), 1e10) == 6.999999653334548, pow(pow(7, 1e-20), 1e20) == 1 –  Alexandru Feb 26 '11 at 12:22
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