# How to generate a random field with truncated marginal distributions?

Is there an R package or functions which can generate a random field with truncated distributions?

I am trying to simulate a lognormal spatial random field but I need the simulated value in a certain range. So I need some easy to use functions to generate a truncated Gaussian field to start with. To be specific, I need a function like `GaussRF` from the RandomFields package or `grf` from the geoR package to generate a random field with truncated marginal distributions and a correlation structure with a specified range direclty.

If there is no availabe read-to-use functions or packages,is it possible that I write my own very easily?

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Welcome to StackOverflow! Could you make a more specific example? For instance, are you looking for a function analogous to `rlnorm` that instead returns a random number from a truncated log-normal instead of a log-normal? Or are you looking for an analogue to `dlnorm` (the density function)? –  David Robinson Nov 6 '12 at 16:29
@DavidRobinson thanks for the quick reply. No, I am not looking for a function to generate a truncated distribution, but a function like `GaussRF` in the RandomFieds package to generate a truancated random field directly. –  Zhenglei Nov 6 '12 at 16:45
You need to explain why you cannot simply truncate a (non-truncated) random field at the bounds of your specification. This is known as "rejection sampling". –  BondedDust Nov 6 '12 at 17:21
To add to DWin's comment: if you can write the distribution function, you can easily use it as the weighting function argument `prob` in the function `sample` . –  Carl Witthoft Nov 6 '12 at 18:32
this doesn't strike me as a necessarily simple question. Multivariate normal distributions have very special properties, and it's not guaranteed that there's any easy way to generate a spatial random field with the desired correlation structure and a marginal truncated lognormal distribution (although even exponentiating, i.e. generating the lognormal from the normal, modifies the variance-covariance structure) –  Ben Bolker Nov 6 '12 at 18:54
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