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I want to turn a continuous random variable X with cdf F(x) into a continuous random variable Y with cdf F(y) and am wondering how to implement it in R.

For example, perform a probability transformation on data following normal distribution (X) to make it conform to a desirable Weibull distribution (Y).

(x=0 has CDF F(x=0)=0.5, CDF F(y)=0.5 corresponds to y=5, then x=0 corresponds to y=5 etc.)

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Most people here would probably look more favorably on your question if your post demonstrated some prior effort at programming a solution. –  Mark Miller Jun 27 '13 at 21:11
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I think perhaps this should go on cross-validated rather than stack overflow? –  TooTone Jun 27 '13 at 21:56
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2 Answers

There are many built in distribution functions, those starting with a 'p' will transform to a uniform and those starting with a 'q' will transform from a uniform. So the transform in your example can be done by:

y <- qweibull( pnorm( x ), 2, 6.0056 )

Then just change the functions and/or parameters for other cases.

The distr package may also be of interest for additional capabilities.

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In general, you can transform an observation x on X to an observation y on Y by

  • getting the probability of X≤x, i.e. FX(x).
  • then determining what observation y has the same probability,

I.e. you want the probability Y≤y = FY(y) to be the same as FX(x).

This gives FY(y) = FX(x).

Therefore y = FY-1(FX(x))

where FY-1 is better known as the quantile function, QY. The overall transformation from X to Y is summarized as: Y = QY(FX(X)).

In your particular example, from the R help, the distribution functions for the normal distribution is pnorm and the quantile function for the Weibull distribution is qweibull, so you want to first of all call pnorm, then qweibull on the result.

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