# Round Robin Tournament algorithm in C#

I am having some trouble to achieve this little round robin project. What i try to do is to generate a preview calendar of games

then I want to output;

day 1: Team 1 vs Team 2; Team 3 vs Team 4; Team 5vs Team 6;

day 2 Team 1 vs Team 4; Team 6 vs Team 3; Team 2 vs Team 5;

till the end of the championship;

Here is the code i've got so far but i'm having trouble to let the first team fixed while the rest of the array rotates...:

``````static void Main(string[] args)
{
string[] ListTeam = new string[] {"Equipe1", "Equipe2", "Equipe3", "Equipe4", "Equipe5", "Equipe6"};
IList<Match> ListMatch = new List<Match>();
it NumberOfDays = (ListTeam.Count()-1);
int y = 2;

for (int i = 1; i <= NumberOfDays; i++)
{
Console.WriteLine("\nDay {0} : \n",i);
Console.WriteLine(ListTeam[0].ToString() + " VS " + ListTeam[i].ToString());

for (y =ListTeam.Count(); y>0 ; y--)
{
Console.WriteLine(ListTeam[y].ToString() + " VS " + ListTeam[y+1].ToString());
y++;
}

}
}
``````

EDIT: I found a code sample in java but i cant translate it...

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I cant find the way to encre the first team and still do ouput the other matches –  Polo Aug 18 '09 at 8:51
@John Nolan : sorry for the typos and spelling... –  Polo Aug 18 '09 at 10:54
The Java implementation that you have linked to is very obscure. Also, the fact that the text and variables are in French does not help (me, at least). –  paracycle Aug 19 '09 at 17:17

This should be easy enough to do using modular arithmetic:

UPDATE 2: (As promised correct algorithm)

``````public void ListMatches(List<string> ListTeam)
{
if (ListTeam.Count % 2 != 0)
{
}

int numDays = (numTeams - 1);
int halfSize = numTeams / 2;

List<string> teams = new List<string>();

int teamsSize = teams.Count;

for (int day = 0; day < numDays; day++)
{
Console.WriteLine("Day {0}", (day + 1));

int teamIdx = day % teamsSize;

Console.WriteLine("{0} vs {1}", teams[teamIdx], ListTeam[0]);

for (int idx = 1; idx < halfSize; idx++)
{
int firstTeam = (day + idx) % teamsSize;
int secondTeam = (day  + teamsSize - idx) % teamsSize;
Console.WriteLine("{0} vs {1}", teams[firstTeam], teams[secondTeam]);
}
}
}
``````

which would print each day's team matches.

Let me quickly try to explain how the algorithm works:

I noticed that since we are rotating all the teams except the first one, if we put all the teams in an array except the first one, then we should just read off the first team from that array using index offset based on the day and doing modular arithmetic to wrap around correctly. In practice we would be treating that array as infinitely repeating in both directions and we would be sliding our view incrementally to right (or to the left).

There is one snag, however, and that is the fact that we have to order the teams in a very particular way for this to work correctly. Otherwise, we do not get the correct rotation. Because of this we need to read of the matching second team in a very peculiar way as well.

The correct way to prepare your list is as follows:

• Never put the first team (Team#1) in the list.
• Take the last half of the team list and put them in the front of the list.
• Take the first half of the list, reverse it and put them in the list (but not Team#1).

Now, the correct way to read off the list is as follow:

• For each day, increment the first index you are looking at by `1`.
• For the first team that you see at that location, match that team with Team#1.
• For the next team in the list (`(day + idx) % numDays`), we would normally match it with the team that is offset by half the number of teams minus 1 (minus 1 because we dealt with the first match ourselves). However, since the second half of our list was prepared by reverting, we need to match that offset in the reverted second half of the list. A simpler way to do is to observe that in this is equivalent to matching the same index but from the end of the list. Given the current `day` offset that is `(day + (numDays - idx)) % numDays`.

UPDATE 3: I was not happy that my solution involved such convoluted selection, matching, reversing of array elements. After I got thinking about what my solution involved I realized that I was too hung up about keep the order of the teams as given. However, that is not a requirement and one can get a different but equally valid schedule by not caring about the initial ordering. All that matters is the selection algorithm I describe in the second part of my explanation.

Thus you can simplify the following lines:

``````teams.AddRange(ListTeam.Skip(halfSize).Take(halfSize));
``````

to:

``````teams.AddRange(ListTeam); // Copy all the elements.
teams.RemoveAt(0); // To exclude the first team.
``````
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So far so good but if you try to ouput Team 1 vs Team 2 you'll get an exeption –  Polo Aug 18 '09 at 11:06
I see but cant it be done with two loops to get A vs B, C vs D .... –  Polo Aug 18 '09 at 11:14
There you go. I updated it. –  paracycle Aug 18 '09 at 11:30
Nop i get twice the same games day 2 : Team4 vs Team 5 day 5: Team5 vs Team4 same for Team3 vs Team4 –  Polo Aug 18 '09 at 12:13
Hey, sorry, I see the mistake in my implementation. Will fix it. –  paracycle Aug 18 '09 at 12:27
show 9 more comments

It sounds like you want to schedule a round-robin tournament. The wp article contains the algorithm.

I don't see where you are even trying to rotate the array. The permutation will look something like: 1 -> 2 -> 3 -> 4 ... -> n/2 - 1 -> n - 1 -> n - 2 -> n - 3 -> ... -> n/2 -> 1 (and 0 stays fixed). You can do that in 2 loops (top row and bottom row).

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Thank you for the answer but is there a way to generate it by random? –  Polo Aug 18 '09 at 7:38
where? i could only find the methode –  Polo Aug 18 '09 at 12:18
? method should lead directly to an appropriate algorithm. Adding a random labeling of the teams is a trivial addition and satisfies your requirements. It might be noted that the 'clockwise rotation' the wp page speaks is of a ring, so, 1 2 3 4, rotated clockwise one is 4 1 2 3. –  nlucaroni Aug 18 '09 at 14:50
You can randomly permute both teams and days. –  bmm6o Aug 18 '09 at 16:15
hmm, I don't remember the link to an algorithm being there when I answered. –  bmm6o Aug 19 '09 at 17:58
show 2 more comments

I made some improvements in the answered code block that calculates double round-robin schedule

``````GameEntities db = new GameEntities();

private void btnTeamFixtures_Click(object sender, RoutedEventArgs e)
{
txtResults.Text = null;

var allTeams = db.Team.Select(t => t.TeamName);

int numDays = allTeams.Count() - 1;
int halfsize = allTeams.Count() / 2;

List<string> temp = new List<string>();
List<string> teams = new List<string>();

teams.RemoveAt(0);

int teamSize = teams.Count;

for (int day = 0; day < numDays * 2; day++)
{
//Calculate1stRound(day);
if (day % 2 == 0)
{
txtResults.Text += String.Format("\n\nDay {0}\n", (day + 1));

int teamIdx = day % teamSize;

txtResults.Text += String.Format("{0} vs {1}\n", teams[teamIdx], temp[0]);

for (int idx = 0; idx < halfsize; idx++)
{
int firstTeam = (day + idx) % teamSize;
int secondTeam = ((day + teamSize) - idx) % teamSize;

if (firstTeam != secondTeam)
{
txtResults.Text += String.Format("{0} vs {1}\n", teams[firstTeam], teams[secondTeam]);
}
}
}

//Calculate2ndRound(day);
if (day % 2 != 0)
{
int teamIdx = day % teamSize;

txtResults.Text += String.Format("\n\nDay {0}\n", (day + 1));

txtResults.Text += String.Format("{0} vs {1}\n", temp[0], teams[teamIdx]);

for (int idx = 0; idx < halfsize; idx++)
{
int firstTeam = (day + idx) % teamSize;
int secondTeam = ((day + teamSize) - idx) % teamSize;

if (firstTeam != secondTeam)
{
txtResults.Text += String.Format("{0} vs {1}\n", teams[secondTeam], teams[firstTeam]);
}
}
}
}
}
``````

If u want u can create 2 methods and pass and integer(Day) like i did in the 2 commented lines, to separate the code.

If you have any questions or suggestions feel free to reply.

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It may be a convoluted method, but this can be reduced to a graph theory problem. Create a graph vertex for each team, and create an edge between every vertex (so it is a complete graph). Then for the algorithm:

For each day i = 1 .. n :

• Pick any two unmarked vertices that are directly connected and label the edge between them with i. Mark both vertices.
• Repeat until all vertices are marked.
• Output the labelled edges (i.e. team1 vs team2, team3 vs team4 etc)
• Delete the labelled edges from the graph and reset all vertices to unmarked.
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thats a bit to tought, i'm begining –  Polo Aug 18 '09 at 12:14
Fair enough. It's a bit of a theoretical rather than a practical solution. –  Tom Woolfrey Aug 18 '09 at 19:29