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how could i change a random non-uniform distribution to a uniform distribution ? Is there a formula ? thanks .

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I think the question is not well formulated. Can you give more details what you want to achieve ? I think also that this is more suited for math.stackexchange.com or stats.stackexchange.com . –  Andre Holzner Aug 27 '10 at 8:35
Why? Usually it is the other way around, because random numbers are uniform, and need to be transformed to some other distribution. –  starblue Aug 27 '10 at 19:51
Would you care to specify what non-uniform distribution? I think that would help. –  David Thornley Aug 27 '10 at 19:55
thanks Andre for the website suggestion. –  Scheery Aug 28 '10 at 10:53

2 Answers 2

Suppose you have samples from a random variable X with CDF function F_X. Then F_X(X) has a uniform distribution.

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oh i see ...Did u mean F(X) = CDF and i need to find the F(X)square ? –  Scheery Aug 28 '10 at 10:51
or did i need to integrate F(X) by xd(x) ? thanks –  Scheery Aug 28 '10 at 11:05
No integration. Just take samples and stick them into F_X to make uniform samples. For example, the CDF of an exponential random variable is F(x) = 1 - exp(-x). If you take a bunch of samples x_i from an exponential distribution, the numbers F(x_i) have a uniform distribution. –  John D. Cook Aug 28 '10 at 12:56
Usually this theorem is applied the other way around: it's standard to generate uniform samples and then apply the inverse CDF of another distribution family to get samples from that distribution. –  John D. Cook Aug 28 '10 at 12:58
ok thanks a lot ^-^ –  Scheery Aug 29 '10 at 12:06

The standard approach is to only use some lower-order bits, which are reasonably uniform.

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sorry i don't really understand what you meant ...care to explain please ? thanks ! –  Scheery Aug 28 '10 at 11:00

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