# Enumerating combinations in Matlab

It's easy to enumerate all combinations of n things taken k at a time with NCHOOSEK function.

How to build a one-to-one correspondence of a combination and its index (from 1 to n!/(k!(n-k)!))?

Of course, it's possible using NCHOOSEK, but it's not practical if n is rather large (more than 15 as pointed in documentation).

How to implement COMBINATION_TO_INDEX and INDEX_TO_COMBINATION functions right?

UPD: Found implementation of an index to combination function: ONECOMB. Still looking for reverse function (combination to index).

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Permutations or combinations? –  Oli Charlesworth Mar 4 '12 at 11:58
If I understand you correctly, and I rarely do understand questions on SO correctly, you want to devise a function which outperforms the built-in NCHOOSEK, in particular for cases where n > 15. I won't go so far as to say that it's impossible to write Matlab functions which outperform the intrinsic Matlab functions, but possibly very difficult. –  High Performance Mark Mar 4 '12 at 12:45
Thanks Oli, updated the question. I'm talking about combinations. –  alexey Mar 4 '12 at 12:45
Mark, i'm not talking about implementing another nchoosek function. The task is to make a pair of functions that establish a one-to-one correspondence between a combination and its index. –  alexey Mar 4 '12 at 12:49

If you want to know about permutations, as your title suggest, the perms function produces all possible permutations of a vector.

If you want combinations, you can certainly brute force it using the perms function a-like so:

``````x=zeros(n,1);
x(1:k)=1;

y=unique(perms(x),'rows');
combs=y*yourvector;
``````

This is rather inefficient, as it computes all the permutations, which will usually be orders of magnitude greater than the number of combinations.

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