Just generate them in lexicographic order:

```
123
124
125
...
134
135
...
145
...
234
235
...
245
...
345
```

This assumes you have digits at most 5. For larger bound `B`

, just keep going. Some simple code to do this is:

```
nextW = w;
for (int i=n-1; i>=0; --i) {
// THE LARGEST THE iTH DIGIT CAN BE IS B-(n-i-1)
// OTHERWISE YOU CANNOT KEEP INCREASING AFTERWARDS
// WITHOUT USING A NUMBER LARGER THAN B
if w[i]<B-(n-i-1) {
// INCREMENT THE RIGHTMOST POSITION YOU CAN
nextW[i] = w[i]+1;
// MAKE THE SEQUENCE FROM THERE INCREASE BY 1
for (int j=i+1; j<N; ++j) {
nextW[j] = w[i]+j-i+1;
}
// VOILA
return nextW;
}
}
return NULL;
```

Start with `w = [1,2,3,...,N];`

(easy to make with a `for`

loop), print `w`

, call the function above with `w`

as an input, print that, and continue. With `N = 3`

and `B = 5`

, the answer will be the above list (without the ... lines).

If there is no bound `B`

, then you're SOL because there are infinitely many.

In general, you are computing the `N`

th elementary symmetric function `e_N`

.