# Generate a random number from a density object (or more broadly from a set of numbers)

Let's say I have a set of numbers that I suspect come from the same distribution.

``````set.seed(20130613)
x <- rcauchy(10)
``````

I would like a function that randomly generates a number from that same unknown distribution. One approach I have thought of is to create a `density` object and then get the CDF from that and take the inverse CDF of a random uniform variable (see Wikipedia).

``````den <- density(x)

#' Generate n random numbers from density() object
#'
#' @param n The total random numbers to generate
#' @param den The density object from which to generate random numbers
rden <- function(n, den)
{
diffs <- diff(den\$x)
# Making sure we have equal increments
stopifnot(all(abs(diff(den\$x) - mean(diff(den\$x))) < 1e-9))
total <- sum(den\$y)
den\$y <- den\$y / total
ydistr <- cumsum(den\$y)
yunif <- runif(n)
indices <- sapply(yunif, function(y) min(which(ydistr > y)))
x <- den\$x[indices]

return(x)
}

rden(1, den)
## [1] -0.1854121
``````

My questions are the following:

1. Is there a better (or built into R) way to generate a random number from a density object?
2. Are there any other ideas on how to generate a random number from a set of numbers (besides `sample`)?
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The theory behind this is much more subtle. How is the density estimated? Which kernel is used? Are there confidence bands around this estimate? Could it be a mixture model? etc. –  Ferdinand.kraft Jun 13 '13 at 14:12

To generate data from a density estimate you just randomly choose one of the original data points and add a random "error" piece based on the kernel from the density estimate, for the default of "Gaussian" this just means choose a random element from the original vector and add a random normal with mean 0 and sd equal to the bandwidth used:

``````den <- density(x)

N <- 1000
newx <- sample(x, N, replace=TRUE) + rnorm(N, 0, den\$bw)
``````

Another option is to fit a density using the `logspline` function from the `logspline` package (uses a different method of estimating a density), then use the `rlogspline` function in that package to generate new data from the estimated density.

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If all you need is to draw values from your existing pool of numbers, then `sample` is the way to go.
If you want to draw from the presumed underlying distribution, then use `density` , and fit that to your presumed distribution to get the necessary coefficients (mean, sd, etc.), and use the appropriate `R` distribution function.

Beyond that, I'd take a look at Chapter7.3 ("rejection method") of Numerical Recipes in C for ways to "selectively" sample according to any distribution. The code is simple enough to be easily translated into `R` . My bet is someone already has done so and will post a better answer than this.

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