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Simple question, but apparently not a simple answer, because I can't find one. I want to define my own PDF in R that is not a pre-defined PDF. Then I would like to calculate random deviates that follow the distribution.

In this case the distribution is abs(x-y)*e^(-(x+y)) I(x>0) I(y>0)


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Accept-Reject algorithm, MCMC, slice sampling, gibbs sampling, metropolis-hasting algorithm, etc – liuminzhao Nov 24 '12 at 20:21
if you can compute the inverse CDF (quantile function) analytically, then just pick uniform deviates and transform accordingly (although in this case you'll have to compute a 2D quantile function) – Ben Bolker Nov 24 '12 at 20:25
a quick check with Wolfram alpha[(x-y)+Exp[-(x%2By)]%2C+{x%2C0%2Cy‌​}] suggests that int( (x-y) exp(-(x+y)) has a form that is not going to be easy to invert (you'll need at least the Lambert W function), which brings you back to @liuminzhao's hints ... – Ben Bolker Nov 24 '12 at 20:39
You may also want to look at the distr package, it may have tools to help you. – Greg Snow Nov 25 '12 at 0:30

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