# Math::Combinatorics
This module provides a few combinatoric functions.
## USAGE
The functions in this module can be selectively imported, eg.
use Math::Combinatorics < multicombinations variations >;
Or you can import everything with the `:ALL` tag
use Math::Combinatorics :ALL;
## FUNCTIONS
### multicombinations
Also known as 'combinations with replacement', 'k-multicombinations', or 'multisubsets'
say multicombinations(, 2);
# OUTPUT: ((A A) (A B) (A C) (A D) (B B) (B C) (B D) (C C) (C D) (D D))
> Implemented in NQP
### variations
Also known as 'k-permutations of n'. I opted to give this the more archaic name of `variations` rather than creating a multi of `permutations`.
say variations(, 2);
# OUTPUT: ((A B) (A C) (A D) (B A) (B C) (B D) (C A) (C B) (C D) (D A) (D B) (D C))
> Implemented in NQP
### partitions
Also known as 'integer partitions'.
say partitions(5);
# OUTPUT: ((1 1 1 1 1) (1 1 1 2) (1 1 3) (1 2 2) (1 4) (2 3) (5))
> Implemented in NQP
### derangements
Essentially the permutations where no element is in it's original place
say derangements()
# OUTPUT: ((B A D C) (B C D A) (B D A C) (C A D B) (C D A B) (C D B A) (D A B C) (D C A B) (D C B A))
> implemented in Raku
### factorial and subfactorial
Since several functions rely on getting the factorial (or subfactorial) of a number, I have those functions defined as well.
say factorial(6); # OUTPUT: 720
say factorial(6); # OUTPUT: 256
## NOTES
The goal of this module is to be something similar to Perl's [Algorithm::Combinatorics](https://metacpan.org/pod/Algorithm::Combinatorics), implemented in NQP for fast performance. Not all functions are implemented in NQP, and if there's a function you'd like to add, I'm happy to accept pull requests for more algorithms, even in pure Raku. I - or others - can always work towards translating them to NQP later as time permits.
## CAVEATS & LIMITATIONS
I held off on publishing this module for many years because I wanted to polish it, provide more functions, and implement faster `.skip` on things like `permutations` (where the n-th permutation in a sequence can be determined algorithmically). Unfortunately, I have learned that my life doesn't always permit the long periods of time to dedicate to this.
My skill with NQP is that of a amateur, so I may not have written the _most_ efficient code, however the implementations written in NQP should at least be noticeably faster than most pure-Raku functions implementing the same algorithms.
As always - pull requests are welcome, both for new functions, and improvements to the existing ones.
## LICENSE
The Artistic License 2.0
See LICENSE file in the repository for the full license text.