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I am trying to generate a random set of numbers that exactly mirror a data set that I have (to test it). The dataset consists of 5 variables that are all correlated with different means and standard deviations as well as ranges (they are likert scales added together to form 1 variable). I have been able to get mvrnorm from the MASS package to create a dataset that replicated the correlation matrix with the observed number of observations (after 500,000+ iterations), and I can easily reassign means and std. dev. through z-score transformation, but I still have specific values within each variable vector that are far above or below the possible range of the scale whose score I wish to replicate.

Any suggestions how to fix the range appropriately?

Thank you for sharing your knowledge!

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How about replacing each out-of-range value with the range boundary value? –  zkurtz Jul 6 '13 at 22:10
Getting the right data generating process require serious modeling effort. Finally, The range of a gaussian distribution is directly linked to the choice of mean and variance –  dickoa Jul 6 '13 at 22:39
If after z-score transforms you find that your data extremes are very different, then maybe your original data is not normally distributed? –  flodel Jul 6 '13 at 22:48
this discussion might be of use to you: r.789695.n4.nabble.com/… –  Ricardo Saporta Jul 6 '13 at 23:19

1 Answer 1

up vote 2 down vote accepted

To generate a sample that does "exactly mirror" the original dataset, you need to make sure that the marginal distributions and the dependence structure of the sample matches those of the original dataset. A simple way to achieve this is with resampling

my.data   <- matrix(runif(1000, -1, 2), nrow = 200, ncol = 5)  # Some dummy data
my.ind    <- sample(1:nrow(my.data), nrow(my.data), replace = TRUE)
my.sample <- my.data[my.ind, ]

This will ensure that the margins and the dependence structure of the sample (closely) matches those of the original data.

An alternative is to use a parametric model for the margins and/or the dependence structure (copula). But as staded by @dickoa, this will require serious modeling effort.

Note that by using a multivariate normal distribution, you are (implicity) assuming that the dependence structure of the original data is the Gaussian copula. This is a strong assumption, and it would need to be validated beforehand.

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Thank you for the suggestion and information! This is really good advice. What is typically the process for determining the dependence structure of a dataset? Thanks again! –  Xander Jul 7 '13 at 19:45
This is a statistical modeling question. The keyword would be copula. You might find useful information and references here: stats.stackexchange.com/q/37951/27403. –  QuantIbex Jul 8 '13 at 0:31

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