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Is it more efficient to begin with a possibly random ordering of objects in a range, using next_permutation to step through all greater permutations, followed by stepping down, beginning again with the original ordering, using prev_permutation to reach the last.

Or, to sort the range before permuting, then to use only next_permutation to step through all of them?

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up vote 7 down vote accepted

next_permutation will step through all permutations, not only through greater permutations. No need to revert and use prev_permutation, and certainly no need to sort.

You only need take care of the fact that next_permutation will return false once it “rolls over” into the lexicographically lowest permutation so you need to keep track of the number of the current permutation to know when to stop.

That is, the following will iterate through all possible permutations of a range, no matter how the starting range looks like.

size_t const num_permutations = multinomial_coefficient(range);

for (size_t i = 0; i < num_permutations; ++i) {
    next_permutation(range.begin(), range.end());
    // use permutation.

Where multinomial_coefficient is the multinomial coefficient of the number of distinct elements in the range. In the simple case where all elements are distinct, this is equivalent to N!, the factorial of the number of elements.

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Thank you, the few examples I found would start with a basically sorted range then walk all the way up to the false and stop. I was unable to find one that directly said yeah, rolls over, and keeps going. – drb Jul 11 '11 at 15:35
fact(range.size()) will exceed size_t for surprising small number of elements. – René Richter Jul 11 '11 at 17:07
@René That is correct, and in fact my solution will only work for small ranges for that matter. That said, enumerating all permutations will also only work in practice for small ranges (albeit somewhat bigger ranges, granted). – Konrad Rudolph Jul 11 '11 at 17:34
@Konrad: I agree with you. Maybe I should have pointed out to @drb. – René Richter Jul 11 '11 at 17:37
From what I've read, this use of fact will be wrong anyway, if there are duplicate items in the range, since next_permutation apparently handles that by not producing duplicate permutations. – Rob I Jan 18 '13 at 20:50

To get all permutations, start with a sorted range, then

  // something
} while(next_permutation(range.begin(), range.end());

It stops, when range is sorted again. The process is O(n!).

When you start with randomized range, you will miss some permutations.

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There's no difference at all, the algorithm doesn't reuse previous results so there's no need to sort beforehand.

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curious about the truthfulness of this claim. – Unicornist Apr 26 '14 at 5:41
@lccarrasco #include <iostream> #include <string> #include <algorithm> // std::next_permutation, std::sort using namespace std; int main () { int myints[] = {3,2,1}; //std::sort (myints,myints+3); std::cout << "The 3! possible permutations with 3 elements:\n"; do { std::cout << myints[0] << ' ' << myints[1] << ' ' << myints[2] << '\n'; } while ( std::next_permutation(myints,myints+3) ); std::cout << "After loop: " << myints[0] << ' ' << myints[1] << ' ' << myints[2] << '\n'; return 0; } – qqqqq Oct 1 '15 at 19:23

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