I am looking for an extremely efficient way to generate all possible permutations of a string (or alphabet), where the permutation length it bounded below and above by two variables `(i, j)`

.

So far I have been able to generate permutations a number of ways, e.g...

```
void swap(char *x, char *y){
char w;
w = *x;
*x = *y;
*y = w;
}
void permute(char *str, int start, int n){
int i;
if(start == n-1)
printf("%s\n", str);
else
for(i = start; i < n; i++){
swap(str+i, str+start);
permute(str, start+1, n);
swap(str+i, str+start);
}
}
```

... but no algorithm I have found so far will efficiently limit the length of the resulting strings. An example of this would be if the alphabet was defined as `abcde`

and `i = 2`

, `j = 4`

... this would yield permutations such as `ab`

, `bac`

, `dcea`

, but NOT `a`

, `edcba`

, and since the algorithm is not computing combinations, it would also not yield strings like `aab`

.