# a non recursive approach to the problem of generating combinations at fault

I wanted a non recursive approach to the problem of generating combination of certain set of characters or numbers.

So, given a subset k of numbers n, generate all the possible combination n!/k!(n-k)!

The recursive method would give a combination, given the previous one combination.

A non recursive method would generate a combination of a given value of loop index i.

I approached the problem with this code:

Tested with n = 4 and k = 3, and it works, but if I change k to a number > 3 it does not work.

Is it due to the fact that (n-k)! in case of n = 4 and k = 3 is 1. and if k > 3 it will be more than 1?

Thanks.

``````int facto(int x);

int len,fact,rem=0,pos=0;
int str[7];
int avail[7];

str[0] = 1;
str[1] = 2;
str[2] = 3;
str[3] = 4;
str[4] = 5;
str[5] = 6;
str[6] = 7;

int tot=facto(n) / facto(n-k) / facto(k);

for (int i=0;i<tot;i++)
{

avail[0]=1;
avail[1]=2;
avail[2]=3;
avail[3]=4;
avail[4]=5;
avail[5]=6;
avail[6]=7;

rem = facto(i+1)-1;
cout<<rem+1<<". ";
for(int j=len;j>0;j--)
{
int div = facto(j);
pos = rem / div;
rem = rem % div;
cout<<avail[pos]<<" ";
avail[pos]=avail[j];

}
cout<<endl;
}

int facto(int x)
{
int fact=1;
while(x>0) fact*=x--;
return fact;
}
``````
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Is this homework? Please tag it as such. –  Marcelo Cantos May 1 '10 at 0:15
What does "at fault" mean? And did you search previous questions? –  Potatoswatter May 1 '10 at 0:27
–  Potatoswatter May 1 '10 at 0:28

Err.. why not use `std::next_permutation`? It does exactly what you're looking for and doesn't require you to write (and debug and maintain) your own.

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well, is not a permutation I'm looking for, is a combination I'm looking for, so for instance in 1 2 3 4 , 3 out of 4 would be 1 2 3 1 2 4 1 3 4 2 3 4 –  Mark May 1 '10 at 0:14
@mark: Edit that into your question then. –  Billy ONeal May 1 '10 at 0:18
@mark: You can use binary permutations of length n as a filter. –  tiftik May 1 '10 at 0:18
The question was clear, combinations not permutations. –  Vicente Botet Escriba May 1 '10 at 2:11
@Vicente Botet Escriba: I misunderstood the meaning of the word "combinations" true, but the example output he is showing is what he should edit into is question. –  Billy ONeal May 1 '10 at 3:47

Consider that your iterator is a number of k digits in base n. In C/C++ you can represent it as an array of `ints` of size k where every element is in the range from `0` to `n-1`).

Then, to iterate from one position to the next you only need to increment the number.

That will give you all the permutations. In order to get combinations you have to impose an additional condition that is that digits must be in ascending order.

For instance with `k = 3, n = 3: 000 001 002 011 012 022 111 112 122 222`

Implementing that constraint in C is also pretty simple, on the increment operation used to iterate, instead of setting the rightmost digits to zero when there is a carry, you have to set them to the same value as the leftmost digit changed.

update: some code:

``````#include <stdio.h>
#include <stdlib.h>
#include <string.h>

#define MAXK 100

int
main(int argc, char *argv[]) {
int digits[MAXK];

int k = atol(argv[1]);
int n = atol(argv[2]);
int i, left;

memset(digits, 0, sizeof(digits));

while(1) {
for (i = k; i--; ) {
printf("%d", digits[i]);
printf((i ? "-" : "\n"));
}

for (i = k; i--; ) {
left = ++digits[i];
if (left < n) {
while (++i < k) digits[i] = left;
break;
}
}
if (i < 0) break;
}
}
``````
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