# Algorithm: finding the biggest element of a list

The catch: only comparisons between elements of the list is allowed. For example, suppose we have 1,000,000 chess players, and we are assigned the task of finding the best chess player in the group. We can play one chess player against any other chess player. Now, we want to minimize the maximum number of games any player plays.

If player A beats player B, and B beats C, we can assume that A is better than C. What is the smallest n such that no player plays more than n games?

@Carl: This is not homework; it's actually a subproblem of a larger problem from SPOJ.

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Hooooomewoooooorkkk.... –  Carl Norum Jun 26 '10 at 4:21
I am no algorithms expert; my first guess is to set up a ladder tournament - max games would be log2(number of players). In this case 20. Do you know the answer and are looking for reasoning or do you have a real-world question about this problem? –  Carl Norum Jun 26 '10 at 4:28
@Stephen - No they're not. That's like saying sorting a list and minimizing the number of swaps are unrelated problems –  Jamie Wong Jun 26 '10 at 4:44
I guess Jamie will get my upvotes.... –  Carl Norum Jun 26 '10 at 4:44
+1 to 'Hooooomewoooooorkkk'. It reads wayyy to much like a basic probability math question. "In theory, theory and practice are the same. In practice, they're not". So, if this isn't homework, how could this problem be used in practice? –  Evan Plaice Jun 26 '10 at 5:01
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## 4 Answers

How do I find the biggest element of a list

If the list is ordered, then the biggest element is the first (or last) element of the list.

If the list is not ordered then:

``````Element biggest = list.get(0);
for (Element e : list) {
if (e.compareWith(biggest) > 0) {
biggest = e;
}
}
``````

For example, suppose we have 1,000,000 chess players, and we are assigned the task of finding the best chess player in the group. Now, we want to minimize the maximum number of games any player plays.

With the new constraint of the last sentence ...

Answer #1: zero games played. Compare the chess player's rankings and the one with the best ranking is the objectively best player ... according to the ranking.

Answer #2: at most `ceiling(log2(nos_players))` games played per player. A "knock out" / elimination tournament eliminates half the players in each round, so the number of rounds and hence the maximum number of games played by any one player is `ceiling(log2(nos_players))`.

The corresponding algorithm is trivially:

``````List players = ...
while (players.size() > 1) {
List winners = new ArrayList();
Iterator it = players.iterator();
while (it.hasNext()) {
Player p1 = it.next();
if (it.hasNext()) {
Player p2 = it.next();
int result = p1.compareTo(p2);
if (result < 0) {
winners.add(p2);
} else if (result > 0) {
winners.add(p1);
} else {
throw new Exception("draws are impossible in chess");
}
} else {
winners.add(p1); // bye
}
}
players = winners;
}
``````

(Aside: if you also have a predetermined ranking for the players and the number of players `N` is at least 2 less than `ceiling(log2(N))`, you can arrange that the best 2 players get a bye in one round. If the best 2 players meet in the final, then everyone will have played less than `ceiling(log2(N))` games ... which is an improvement on the solution where the byes are allocated randomly.)

In reality, answer #2 does not work for the game of chess because it does not take account of the fact that a significant percentage of real chess games are draws; i.e. neither player wins. Indeed, the fact that player A beat player B in one game does not mean A is a better player than B. To determine who is the better of any two players they need to play a number of games and tally the wins and losses. In short, the notion that there is a "better than" relation for chess players is TOTALLY unrealistic.

Not withstanding the points above, knock-out is NOT a practical way to organize a chess tournament. Everyone will be camped out on the tournament organizer's desk complaining about having to play games against players much better (or worse) than themselves.

The way a real chess (or similar) tournament works is that you decide on the number of rounds you want to play first. Then in a "round-robin" tournament, you select the top N players by ranking. and arrange that each player plays each other player. The player with the best win / draw score is the winner, and in the event of a tie you use (say) "sum of opponents scores" as a tie breaker. There are other styles of tournament as well that cater for more players / less rounds.

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I see the two questions as inherently linked; the asker is simply asking for an algorithm to find the largest element in the list with an access cost for the element's value. Your first solution will find the max, but it has a worst-case scenario of n accesses to the largest element, if it is at the beginning of the list. Clearly, there is a better algorithm with a much lower worst-case scenario. The tournament method, I believe, is optimal, because its worst-case is log n instead of n. Furthermore, the constraint of the asker is that if A>B and B>C, then A>C. It works. –  Justin L. Jun 26 '10 at 7:52
"Round Robin" is at best a meta-heuristic, and is hardly a formal algorithmic method, as the asker is looking for. You are focusing too much on the chess example. Round Robin would be an incredibly inefficient algorithm, as if A > B and B > C, you don't need to test A & C, given the specification of the asker's question. –  Justin L. Jun 26 '10 at 7:54
@Justin. L - I know that. But it is a more realistic solution to running a chess tournament than is the knock-out meta-heuristic. –  Stephen C Jun 26 '10 at 9:09
point taken =). –  Justin L. Jun 26 '10 at 9:26
@Justin. L - Also, if the OP wants to give an (IMO) bogus example, and everyone else chimes in to say that this is a "good" question, then the bogus example is what I'm going to use in my answer ... if only to illustrate the example's bogosity. –  Stephen C Jun 26 '10 at 9:27
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I would wager a guess that the answer is the binary log of the number of people.

You set up a binary tree as a tournament ladder. This means the most games anyone plays is the height of the tree. The height of the binary tree would be `log n`

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Yes, it is a basic divide-and-conquer just like merge sort. –  Justin Peel Jun 26 '10 at 4:48
I do think that this is the most conceptually concise and fastest solution, given the constraints of the asker. I believe that `log n` can be proven to be the optimum. –  Justin L. Jun 26 '10 at 7:57
While the worst case number of comparisons for a given element is O(log n), the total number of comparisons is O(n), for an average number of comparisons of of O(1) per element. If the cost is comparing elements you might as well just walk the list in order. If there is some side effect of comparing a given element (like a player gets to play a game) then simulating a tournament ladder works, but keep in mind that it will require more space, since you have to copy the list. –  Alex M. Jun 26 '10 at 8:43
This is indeed the solution with the smallest maximum number of comparisons per element. You can prove this by demonstrating that, working bottom-up, it recursively halves the number of elements, which is the best one can do with a binary comparison. –  Nick Johnson Jun 26 '10 at 9:57
@Nick, @Jamie: This post proves nothing. It just tells us that n <= log M by demonstrating an algorithm which achives the max to be log M, M being the number of people. The crucial (and more difficult to prove) part that n >= log M is completely missing. (n is the notation used by OP, so I am using that). –  Aryabhatta Jun 26 '10 at 13:18
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As far as I know there is no algorithm to solve your problem without any additional outside information to rank the players (such as seeding). If you could seed the players appropriately you can find the best player in less rounds than the worst case suggested by J. Wong.

Example of the results of 2 rounds of 10 players: A is the best, ceil(log 10) = 4

A > B; C > D; E > F; G > H; I > J

A > C; B > E; F > G; D > I

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+1, a good example that if you know something extra about a problem you can often make it easier. This solution doesn't apply directly to the OP's question (since you lose generality), but it's a point worth making I think. –  Carl Norum Jun 26 '10 at 5:00
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Instead of building an Abstract Data Structure such as a binary tree and resolving a tournament, you could re-interpret your goal in a different light:

Eliminate all the elements on the list that are not the largest

You will find that doing this may be much more algorithmically expedient than building a tree and seeding a "tournament".

I can demonstrate that eliminating all elements on a list that are not the largest can be done with a worst-case scenario of `log n` calls/comparisons per element.

Work on a copy of your original list if possible.

1. Pair off consecutive elements and remove from the list the lower-valued of the two. Ignore the unpaired element, if there is one.

This can be done by iterating from 0 <= `i` < int(n/2) and comparing indices `2i` and `2i+1`.

i.e., for n=7, int(n/2) = 3, `i` = 0,1,2; compare indices 0 and 1, 2 and 3, 4 and 5.

2. There should be a total of int(n/2) indices eliminated. Subtract that count from n. Then, repeat 1 until there is only one index remaining. This will be your largest.

Here is an implementation in Ruby:

``````def find_largest(list)

n = list.size
working_list = list.clone()

while n > 1

temp_list = Array.new()

for i in (0...n/2)          # remember to cast n/2 to integer if not automatic
if working_list[2*i] > working_list[2*i+1]
new_list.push(working_list[2*i])
else
new_list.push(working_list[2*i+1])
end
end

working_list = temp_list

n -= n/2                    # remember to cast n/2 to integer if not automatic

end

return working_list[0]

end
``````
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Like how you turn the problem on its head. As Charlie Munger says, "Invert. Always invert!" –  Jordan Dea-Mattson Feb 18 '11 at 5:12
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