# Backtracking for listing k elements

Can someone give me a hand here. I am new to backtracking and preparing for an interview. I couldn't even attempt this question. Please help.

Describe a back tracking algorithm for efficiently listing all k-element subsets of `n` items.

For `n = 5` the 3 element subsets are `(1,2,3), (1,2,4), (1,2,5), (1,3,4), (1,3,5), (1,4,5), (2,3,4), (2,3,5), (2,4,5), (3,4,5)`

In particular, I am interested in first describing the solution vector representation to use, and then how I would partition the work among construct-candidates, is-a-solution and process-solution functions.

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Could this be a duplicate of this question: stackoverflow.com/questions/5095407/n-choose-k-implementation –  jogojapan Apr 23 '13 at 2:26
In any case, the link provided there to Howard Hinnant's permutation algorithms seems to be what you need, specifically the `for_each_permutation` algorithm. –  jogojapan Apr 23 '13 at 2:27

I don't think that the optimal algorithm does backtracking. What if you represented the sets as ascending sequences of k elements and compute the sequences lexicographically from (1, ..., k) to (n - k + 1, ..., n)? It seems to be what you did with pen and paper, considering your example.

I hope you're familiar with c++, here's some code that hopfully works

``````#include <cstdio>
#include <vector>
using namespace std;

int main() {
int n, k;
scanf("%d%d", &n, &k);

vector<int> v;
for(int i = 1; i <= k; ++i)
v.push_back(i);

while(true) {
for(int i = 0; i < k; ++i)
printf("%d ", v[i]);
printf("\n");

int i = 0;
while(k - 1 - i >= 0 && v[k - 1 - i] == n - i) //i iterate backwards as long as suffix is maximal like (..., n-3, n-2, n-1, n)
++i;

int lnm = k - 1 - i; //index of the last number in sequence that is not maximal

if(lnm < 0) //that means v = (n - k + 1, ..., n), so it's lexicographically last
break;

v[lnm] = v[lnm] + 1;
for(i = lnm + 1; i < k; ++i)
v[i] = v[i-1] + 1;

}
}
``````
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