Wikipedia:Reference desk/Archives/Mathematics/2021 October 12
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October 12
editCombinatorial algorithms
editFor a given natural number k, and a given set S, is there an algorithm - generating all subsets of S, each of which is - a k-combination - i.e. containing k elements of S?
I suspect Wikipedia does not give any information about that algorithm (which I guess is recursive) 84.228.239.160 (talk) 11:10, 12 October 2021 (UTC)
- Of course there is one; see Combination § Enumerating k-combinations. Given a set of sets and an element , let be defined as:
- For example,
- Let denote the set of -combinations of elements of . The following is an explicit recursive function definition.
- --Lambiam 12:23, 12 October 2021 (UTC)
- Thanks. If k is not given in advance, and I want to generate all subsets of a given set S, should your algorithm be used for generating all k-combinations of S for every (whole non-negative) k not larger than the number of elements of S? or there is a simpler algorithm for that? 84.228.239.160 (talk) 13:07, 12 October 2021 (UTC)
- (I've made a correction to the last clause by replacing by which avoids an infinite loop in case ) To get all subsets, just ignore the subscripts controlling the size, as follows:
- (I've made a correction to the last clause by replacing by which avoids an infinite loop in case ) To get all subsets, just ignore the subscripts controlling the size, as follows:
- Thanks. If k is not given in advance, and I want to generate all subsets of a given set S, should your algorithm be used for generating all k-combinations of S for every (whole non-negative) k not larger than the number of elements of S? or there is a simpler algorithm for that? 84.228.239.160 (talk) 13:07, 12 October 2021 (UTC)
- --Lambiam 19:03, 12 October 2021 (UTC)
- Here is a Next Subset algorithm (in Fortran, I think) - you can call it until you get all subsets. When I need to get all subsets, I often do it like counting from 0 to 2n in binary. For instance when it gets to 11002, take the third and fourth members of the set. Also, see several implementations at Rosetta code. Bubba73 You talkin' to me? 04:27, 13 October 2021 (UTC)
OP's comment: Thank y'all. I thought the algorithm should be recursive, but after reviewing all the suggestions you have put forward, I used the common idea behind all of them - to build a non-recursive algorithm which I found most comfortable for me. 84.228.239.160 (talk) (UTC) 19:56, 13 October 2021 (UTC)