There are a limited number of players and a limited number of tennis courts. At each round, there can be at most as many matches as there are courts. Nobody plays 2 rounds without a break. Everyone plays a match against everyone else. Produce the schedule that takes as few rounds as possible. (Because of the rule that there must a break between rounds for everyone, there can be a round without matches.) The output for 5 players and 2 courts could be:

```
| 1 2 3 4 5
-|-------------------
2| 1 -
3| 5 3 -
4| 7 9 1 -
5| 3 7 9 5 -
```

In this output the columns and rows are the player-numbers, and the numbers inside the matrix are the round numbers these two players compete.

The problem is to find an algorithm which can do this for larger instances in a feasible time. We were asked to do this in Prolog, but (pseudo-) code in any language would be useful.

My first try was a greedy algorithm, but that gives results with too many rounds. Then I suggested an iterative deepening depth-first search, which a friend of mine implemented, but that still took too much time on instances as small as 7 players.

(This is from an old exam question. No one I spoke to had any solution.)