Sign up ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

Here a couple of examples in a pseudocode to show what I mean.

This produces the combinations (selections disregarding order without repetition) of 1,...,n taking 3 at a time.

Do[Print[i,j,k], {i,1...n-2}, {j,i+1...n-1}, {k,j+1...n}]

The loop works from left to right---for each i, the iterator j will go through its values and for each j, the iterator k will go through its. By adding more variables and changing n, we can generalize what we have above.

Question: can we do the same for permutations? In other words, can we find a way to tweak the iterators to produce the P(n,k)=n!/(p-k)! permutations of 1,...,n? For k=3,

Do[Print[i,j,k], {i, f_1 , g_1(i,n)}, {j, f_2(i), g_2(i,j,n)}, {k, f_3(i,j), g_3(i,j,k,n)}]

Use only basic arithmetic operations and things like modular arithmetic, floor/ceiling fcns.

Because this might smell like a homework problem to you, I'd settle on an answer of "yay" or "nay"; your estimate of the difficulty level would be helpful to me as well.

Thank you.

share|improve this question

2 Answers 2

up vote 1 down vote accepted

Do you mean generating permutations iteratively, without recursion? Yes, it's possible:

See the section "Algorithms to generate permutations"

1. Find the largest index k such that a[k] < a[k + 1]. If no such index exists, the permutation is the last permutation.
2. Find the largest index l such that a[k] < a[l]. Since k + 1 is such an index, l is well defined and satisfies k < l.
3. Swap a[k] with a[l].
4. Reverse the sequence from a[k + 1] up to and including the final element a[n].

This follows your restriction to only use basic arithmetic operations (if you don't like the swap, know that you can swap two numbers by using additions and subtractions).

share|improve this answer

Did you consider using std::next_permutation from <algorithm> ?

At least the source code of any STL implementation should provide you with an answer.

Edit: is a simple pedagogical answer.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.