Actually, I think you *do* want lexicographic order, but descending rather than ascending. In addition:

- It's not clear to me from your description that A, B, ... D play any role in your answer (except possibly as the container for the values).
- I think your question example is simply "For each integer at least 5, up to the maximum possible total of two values, how many distinct pairs from the set {3, 3, 2, 1} have sums of that integer?"
- The interesting part is the early bailout, once no possible solution can be reached (remaining achievable sums are too small).

~~I'll post sample code later.~~

Here's the sample code I promised, with a few remarks following:

```
public class Combos {
/* permanent state for instance */
private int values[];
private int length;
/* transient state during single "count" computation */
private int n;
private int limit;
private Tally<Integer> tally;
private int best[][]; // used for early-bail-out
private void initializeForCount(int n, int limit) {
this.n = n;
this.limit = limit;
best = new int[n+1][length+1];
for (int i = 1; i <= n; ++i) {
for (int j = 0; j <= length - i; ++j) {
best[i][j] = values[j] + best[i-1][j+1];
}
}
}
private void countAt(int left, int start, int sum) {
if (left == 0) {
tally.inc(sum);
} else {
for (
int i = start;
i <= length - left
&& limit <= sum + best[left][i]; // bail-out-check
++i
) {
countAt(left - 1, i + 1, sum + values[i]);
}
}
}
public Tally<Integer> count(int n, int limit) {
tally = new Tally<Integer>();
if (n <= length) {
initializeForCount(n, limit);
countAt(n, 0, 0);
}
return tally;
}
public Combos(int[] values) {
this.values = values;
this.length = values.length;
}
}
```

### Preface remarks:

This uses a little helper class called Tally, that just isolates the tabulation (including initialization for never-before-seen keys). I'll put it at the end.

To keep this concise, I've taken some shortcuts that aren't good practice for "real" code:

- This doesn't check for a null value array, etc.
- I assume that the value array is already sorted into descending order, required for the early-bail-out technique. (Good production code would include the sorting.)
- I put transient data into instance variables instead of passing them as arguments among the private methods that support
`count`

. That makes this class non-thread-safe.

### Explanation:

An instance of `Combos`

is created with the (descending ordered) array of integers to combine. The `value`

array is set up once per instance, but multiple calls to `count`

can be made with varying population sizes and limits.

The `count`

method triggers a (mostly) standard recursive traversal of unique combinations of `n`

integers from `values`

. The `limit`

argument gives the lower bound on sums of interest.

The `countAt`

method examines combinations of integers from `values`

. The `left`

argument is how many integers remain to make up `n`

integers in a sum, `start`

is the position in `values`

from which to search, and `sum`

is the partial sum.

The early-bail-out mechanism is based on computing `best`

, a two-dimensional array that specifies the "best" sum reachable from a given state. The value in `best[n][p]`

is the largest sum of `n`

values beginning in position `p`

of the original `values`

.

The recursion of `countAt`

bottoms out when the correct population has been accumulated; this adds the current `sum`

(of `n`

values) to the `tally`

. If `countAt`

has not bottomed out, it sweeps the `values`

from the `start`

-ing position to increase the current partial `sum`

, as long as:

- enough positions remain in
`values`

to achieve the specified population, and
- the
`best`

(largest) subtotal remaining is big enough to make the `limit`

.

A sample run with your question's data:

```
int[] values = {3, 3, 2, 1};
Combos mine = new Combos(values);
Tally<Integer> tally = mine.count(2, 5);
for (int i = 5; i < 9; ++i) {
int n = tally.get(i);
if (0 < n) {
System.out.println("found " + tally.get(i) + " sums of " + i);
}
}
```

produces the results you specified:

```
found 2 sums of 5
found 1 sums of 6
```

Here's the Tally code:

```
public static class Tally<T> {
private Map<T,Integer> tally = new HashMap<T,Integer>();
public Tally() {/* nothing */}
public void inc(T key) {
Integer value = tally.get(key);
if (value == null) {
value = Integer.valueOf(0);
}
tally.put(key, (value + 1));
}
public int get(T key) {
Integer result = tally.get(key);
return result == null ? 0 : result;
}
public Collection<T> keys() {
return tally.keySet();
}
}
```