So, I was searching for a good solution for my problem.

I need to generate(print) all the combination of a list of integers, for example: if the array contain integers from 0 to n-1, where n = 5:

```
int array[] = {0,1,2,3,4};
```

the order of integers in the combination are NOT important, meaning {1,1,3}, {1,3,1} and {3,1,1} are actually the same combination because they all contain one 3 and two ones.

so for the above array, all combination of length 3:

```
0,0,0 -> the 1st combination
0,0,1
0,0,2
0,0,3
0,0,4
0,1,1 -> this combination is 0,1,1, not 0,1,0 because we already have 0,0,1.
0,1,2
0,1,3
0,1,4
0,2,2 -> this combination is 0,2,2, not 0,2,0 because we already have 0,0,2.
0,2,3
.
.
0,4,4
1,1,1 -> this combination is 1,1,1, not 1,0,0 because we already have 0,0,1.
1,1,2
1,1,3
1,1,4
1,2,2 -> this combination is 1,2,2, not 1,2,0 because we already have 0,1,2.
.
.
4,4,4 -> Last combination
```

For Now I Wrote Code for doing this, but my problem is: if the numbers in the array are not integer from 0 to n-1, lets say if the array was like this

```
int array[] = {1,3,6,7};
```

my code doesn't work on this case, any algorithm or code for solving this problem,,

Here is my code :

```
unsigned int next_combination(unsigned int *ar, int n, unsigned int k){
unsigned int finished = 0;
unsigned int changed = 0;
unsigned int i;
for (i = k - 1; !finished && !changed; i--) {
if (ar[i] < n - 1) {
/* Increment this element */
ar[i]++;
if (i < k - 1) {
/* Make the elements after it the same */
unsigned int j;
for (j = i + 1; j < k; j++) {
ar[j] = ar[j - 1];
}
}
changed = 1;
}
finished = i == 0;
}
if (!changed) {
/* Reset to first combination */
for (i = 0; i < k; i++){
ar[i] = 0;
}
}
return changed;
}
```

And this is the main:

```
int main(){
unsigned int numbers[] = {0, 0, 0, 0, 0};
const unsigned int k = 3;
unsigned int n = 5;
do{
for(int i=0 ; i<k ; ++i)
cout << numbers[i] << " ";
cout << endl;
}while (next_combination(numbers, n, k));
return 0;
}
```

`numbers`

? Why does it have five elements when (as far as I can tell) the code uses only three? Where would you store`1,3,6,7`

? If`next_combination`

finds the kth combination, aren't you doing a lot of work over and over? – Beta Sep 20 '12 at 22:31