I need to generate all permutation of a string with selecting some of the elements. Like if my string is "abc" output would be { a,b,c,ab,ba,ac,ca,bc,cb,abc,acb,bac,bca,cab,cba }.

I thought a basic algorithm in which I generate all possible combination of "abc" which are {a,b,c,ab,ac,bc,abc} and then permute all of them.

So is there any efficient permutation algorithm by which I can generate all possible permutation with varying size.

The code I wrote for this is :

```
#include <iostream>
#include <stdio.h>
#include <stdlib.h>
#include <map>
using namespace std;
int permuteCount = 1;
int compare (const void * a, const void * b)
{
return ( *(char*)a - *(char*)b);
}
void permute(char *str, int start, int end)
{
// cout<<"before sort : "<<str;
// cout<<"after sort : "<<str;
do
{
cout<<permuteCount<<")"<<str<<endl;
permuteCount++;
}while( next_permutation(str+start,str+end) );
}
void generateAllCombinations( char* str)
{
int n, k, i, j, c;
n = strlen(str);
map<string,int> combinationMap;
for( k =1; k<=n; k++)
{
char tempStr[20];
int index =0;
for (i=0; i<(1<<n); i++) {
index =0;
for (j=0,c=0; j<32; j++) if (i & (1<<j)) c++;
if (c == k) {
for (j=0;j<32; j++)
if (i & (1<<j))
tempStr[ index++] = str[j];
tempStr[index] = '\0';
qsort (tempStr, index, sizeof(char), compare);
if( combinationMap.find(tempStr) == combinationMap.end() )
{
// cout<<"comb : "<<tempStr<<endl;
//cout<<"unique comb : \n";
combinationMap[tempStr] = 1;
permute(tempStr,0,k);
} /*
else
{
cout<<"duplicated comb : "<<tempStr<<endl;
}*/
}
}
}
}
int main () {
char str[20];
cin>>str;
generateAllCombinations(str);
cin>>str;
}
```

I need to use a hash for avoiding same combination, so please let me know how can I make this algorithm better.

Thanks, GG

power set, think about incrementing a binary number, where each "digit" corresponds to the number of times an input element was selected to appear in the output. For repeated elements in the input set, some "digits" of the "binary" number will become ternary, or the repetition count of that element. – rwong Oct 2 '10 at 7:13`N`

you'll have`2^N-1`

distinct non-empty subsets in the worst case (if all characters are different) and for each subset consisting of`L`

characters, you'll have`L!`

permutations. – Andre Holzner Oct 2 '10 at 7:25