# R: generate all permutations of vector without duplicated elements [duplicate]

Is there a straightforward way to generate all possible permutations of a vector of integers (1 to max 999) that specifically excludes duplicated elements?

For example, for a vector with three elements in a range of 1 to 9 the sequence `1 2 3` would be acceptable, as would `1 2 9` but `1 2 2` would be invalid. The sequence must contain exactly `n` elements (in this case, three). EDIT: to avoid confusion, the order is significant, so `1 2 9` and `9 2 1` are both valid and required.

There are many questions on permutations and combinations using R on SO (such as this and this) but none that seem to fit this particular case. I'm hoping there's an obscure base R or package function out there that will take care of it without me having to write a graceless function myself.

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## marked as duplicate by krlmlr, joran, rcs, Krishnabhadra, Viruss mcaOct 30 '13 at 10:06

Yes, the order is important as well as the elements themselves. – SlowLearner Feb 5 '13 at 9:37
Well, the answer without the edited clarification was surely `sample` and I'm sure this is a duplicate, but the cited duplicate is not a good answer. – 42- Oct 29 '13 at 18:51
As a warning to those who follow: the number of permutations of `n` items is `n!`, which gets big really fast. For the 999 elements mentioned in this question there are about 4 * 10^2564 permutations. – Gregor Apr 9 '15 at 19:17

Using `gtools` package:

``````require(gtools)
permutations(n = 9, r = 3, v = 1:9)
# n -> size of source vector
# r -> size of target vector
# v -> source vector, defaults to 1:n
# repeats.allowed = FALSE (default)
``````
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EDIT: This is not what the OP asked for, but I leave this answer, to avoid confusion.

My math is a little bit rusty, but i think you are describing combinations, not permutations. The base function`combn()` returns combinations.

I illustrate with a manageable set - all combinations of length 3, from the vector `1:4`:

``````combn(4, 3)
[,1] [,2] [,3] [,4]
[1,]    1    1    1    2
[2,]    2    2    3    3
[3,]    3    4    4    4
``````

The difference between `combinations` and `permutations` is that in `combinations` the order doesn't matter. So, `(2, 3, 4)` and `(4, 3, 2)` is the same combination, but different permutations.

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This is not all possible permutations, is it? ex: (4,3,2) isn't here...? – Arun Feb 5 '13 at 9:35
@Andrie I'm certain my math is rustier. But doesn't the above require a check after generation to remove duplicates? Or should I be reading down the columns rather than across the rows of the matrix above? – SlowLearner Feb 5 '13 at 9:36
@SlowLearner, you should read down columns. So, you were looking for combinations..? – Arun Feb 5 '13 at 9:37
@Arun But the order is also significant. So `2 3 4` and `4 3 2` are different but both are required. – SlowLearner Feb 5 '13 at 9:39
@SlowLearner, that is what my answer gives, but this is just combinations. – Arun Feb 5 '13 at 9:40

`utils::combn` ; `combinat::combn` or `combinat::permn` are alternatives.

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