README

Math::Combinatorics

This module provides a few functions for generating combinatoric sequences.

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(<A B C D>, 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(<A B C D>, 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(<A B C D>)
# 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 subfactorial(6);  # OUTPUT: 256

NOTES

The goal of this module is to be something similar to Perl's 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.

Math::Combinatorics v0.0.5

Combinatoric functions

Authors

  • github:0racle

License

Artistic-2.0

Dependencies

Test Dependencies

Provides

  • Math::Combinatorics
  • Math::Combinatorics::Derangements
  • Math::Combinatorics::Multicombinations
  • Math::Combinatorics::Partitions
  • Math::Combinatorics::Utils
  • Math::Combinatorics::Variations

Documentation

The Camelia image is copyright 2009 by Larry Wall. "Raku" is trademark of the Yet Another Society. All rights reserved.