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I have a list of N items and I am wondering how I can loop through the list to get every combination. There are no doubles, so I need to get all N! orderings. Extra memory is no problem, I'm trying to think of the simplest algorithm but I'm having trouble.

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is it combination or permutation? – sud03r Jan 26 '10 at 19:19
See also an explanation of two different algorithms at stackoverflow.com/questions/352203/… – ShreevatsaR Jul 13 '10 at 13:08
up vote 15 down vote accepted

See std::next_permutation   

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Good call (so to speak). Though to be fair, the OP did ask for the simplest algorithm. – Ben Hoyt Jan 27 '10 at 2:22

Expanding on others' answers, here's an example of std::next_permutation adapted from cplusplus.com

#include <iostream>
#include <algorithm>
using namespace std;

void outputArray(int* array, int size)
  for (int i = 0; i < size; ++i) { cout << array[i] << " "; }

int main ()
  int myints[] = { 1, 2, 3, 4, 5 };
  const int size = sizeof(myints);

  cout << "The 5! possible permutations with 5 elements:\n";

  sort (myints, myints + size);

  bool hasMorePermutations = true;
    outputArray(myints, size);
    hasMorePermutations = next_permutation(myints, myints + size);
  while (hasMorePermutations);

  return 0;
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+1 for providing an example. – Thomas Matthews Jan 26 '10 at 19:59
There doesn't appear to be any point in the bool variable. You can just do { ... } while (std::next_permutation(...)); – Charles Bailey Jan 26 '10 at 22:03
@Charles: It's true, I could do that. For teaching purposes I pulled out the next_permutation since that was the focus of the code. – Bill Jan 26 '10 at 22:18
Fair enough. Personally, I find it clearer without the extra variable but perhaps that's just me. – Charles Bailey Jan 26 '10 at 22:28

C++ STL has next_permutation for this purpose.

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Simple algorithm using Recursion:


getPermutations(CurItemList , CurPermList)

if CurItemList.isempty()
    return CurPermList
    Permutations = {}

    for i = 1 to CurItemList.size() 

        NextItemList = CurItemList.copy()

        Permutations.add(getPermutations(NextItemList, CurPermList))


return Permutations

// To make it look better
    return getPermutations(ItemList, {})

I didnt test it, but should work. Maybe its not the smartest way to do it, but its an easy way. If something is wrong please let me know!

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Try building up the set of combinations recursively with a fixed count of possible elements. The set of all possible combinations will be the union of the sets of combinations of 1 element, 2 elements, ... up to N elements.

Then you can attack each fixed sized combination individually.

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