Generate the other half of a normal distribution as well using the acceptance-rejection method

The following R code give me only half of a normal distribution; what should I change to the code in order to get the other half?

``````halfnormal <- function(n){
vector <- rep(0,n)
for(i in 1:n){
uni_random <- runif(2)
y <- -log(uni_random)
while(y[2] < (y[1]-1)^2/2){
uni_random <- runif(2)
y <- -log(uni_random)
}
vector[i] <- y[1]
}
vector
}

output <- halfnormal(1000)
hist(output)
``````
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Why don't you use rnorm function? – Jouni Helske Mar 1 '13 at 6:05
try `hist(rnorm(1000))` – Chinmay Patil Mar 1 '13 at 6:10

If you insist on using that code to generate a standard normal (not recommended, as `rnorm` will be much faster and more accurate), just dot product that entire vector by an equal-length vector consisting of random `(-1, +1)` values.

By the way, the half-normal is also known as the Chi distribution (with 1 degree of freedom).

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+1 for the faster way of doing the same thing as in my code. – Jouni Helske Mar 1 '13 at 6:42
I used dot product but got only a number. My code is "vector%*%runif(n, min=-1, max=1)". How can I fix it? Thanks. – Guess Gucci Mar 1 '13 at 17:32
No, you don't want to generate from a uniform distribution, you want to generate random bits. Use `rbinom` with n=1 and p=0.5, or do `runif() < 0.5`. Then replace all occurences of `0` with `-1`. – Andrew Mao Mar 1 '13 at 21:19
sample(c(1,-1),size=n,replace=TRUE) should be faster. – Jouni Helske Mar 2 '13 at 5:26

This looks bit like Ziggurat algorithm with Marsaglia's modification, but it's bit different? If you don't want to use any guaranteed-to-work random number generators in R, perhaps this works:

``````   halfnormal <- function(n){
vector <- rep(0,n)
for(i in 1:n){
uni_random <- runif(2)
y <- -log(uni_random)
while(y[2] < (y[1]-1)^2/2){
uni_random <- runif(2)
y <- -log(uni_random)
}
vector[i] <- sample(c(-1,1),size=1)*y[1] #randomly select the tail
}
vector
}

output <- halfnormal(1000)
hist(output)
``````
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