# I want to generate n! permutations for a given n in R

suppose n=3 then output should be: a vector containing vectors: 123 213 132 231 321

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``````install.packages("combinat")
require(combinat)
permn(1:3)
``````

Also the functions: choose, combn ,expand.grid Might prove useful for you in the future.

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``````library(gtools)
permutations(3,3)
[,1] [,2] [,3]
[1,]    1    2    3
[2,]    1    3    2
[3,]    2    1    3
[4,]    2    3    1
[5,]    3    1    2
[6,]    3    2    1
``````
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Nicee solution gd. –  Tal Galili Jul 5 '10 at 8:18

The `gregmisc` package should have the `permutations()` function.

``````permutations3,3)
``````
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Is it the same as gtools ? –  Tal Galili Jul 5 '10 at 8:18
yes, older name before it was broken up into smaller pieces –  John Jul 5 '10 at 11:05

Here's some non-recursive code for this:

``````maxdepth <- 4
curdepth <- 1
l <- list()
i <- 0
while (i < maxdepth) {
l <- c(l, 1)
i <- i+1
}
done <- 0
results <- list()
resct <- 1

print(paste(sep=",",l))

while (curdepth > 0) {
if (curdepth == maxdepth) {
results[[resct]] <- l
resct <- resct+1
l[[curdepth]] <- l[[curdepth]]+1
}
if (l[[curdepth]] == maxdepth+1) {
while (!done && l[[curdepth]] == maxdepth+1) {
l[[curdepth]] <- 1
curdepth <- curdepth-1
if (curdepth == 0) {
done <- 1
}
}
if (!done) {
l[[curdepth]] <- l[[curdepth]]+1
}
} else if (curdepth < maxdepth) {
curdepth <- curdepth+1
}
}
``````

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I don't know if it is the case, but I'll give it a try.
If you'd like to do something with huge number of permutations of a bit longer vectors, it is much less demanding and about as good to use Monte Carlo and simply sample the space with large number of random permutations (that might be generated in R with `sample` function).

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``````permutations <- function(n){
if(n==1){
return(matrix(1))
} else {
sp <- permutations(n-1)
p <- nrow(sp)
A <- matrix(nrow=n*p,ncol=n)
for(i in 1:n){
A[(i-1)*p+1:p,] <- cbind(i,sp+(sp>=i))
}
return(A)
}
}
``````

Example:

``````> permutations(3)
[,1] [,2] [,3]
[1,]    1    2    3
[2,]    1    3    2
[3,]    2    1    3
[4,]    2    3    1
[5,]    3    1    2
[6,]    3    2    1
``````
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