Consider all combination of length 3 of the following array of integer {1,2,3}.

I would like to traverse all combination of length 3 using the following algorithm from wikipedia

```
// find next k-combination
bool next_combination(unsigned long& x) // assume x has form x'01^a10^b in binary
{
unsigned long u = x & -x; // extract rightmost bit 1; u = 0'00^a10^b
unsigned long v = u + x; // set last non-trailing bit 0, and clear to the right; v=x'10^a00^b
if (v==0) // then overflow in v, or x==0
return false; // signal that next k-combination cannot be represented
x = v +(((v^x)/u)>>2); // v^x = 0'11^a10^b, (v^x)/u = 0'0^b1^{a+2}, and x ← x'100^b1^a
return true; // successful completion
}
```

What should be my starting value for this algorithm for all combination of {1,2,3}? When I get the output of the algorithm, how do I recover the combination?

I've try the following direct adaptation, but I'm new to bitwise arithmetic and I can't tell if this is correct.

```
// find next k-combination, Java
int next_combination(int x)
{
int u = x & -x;
int v = u + x;
if (v==0)
return v;
x = v +(((v^x)/u)>>2);
return x;
}
```

`x`

as both an input and an output parameter. Java doesn't have those. – Matt Ball Nov 5 '11 at 1:19