# Simulating sports matches in online game

In an online manager game (like Hattrick), I want to simulate matches between two teams.

A team consists of 11 players. Every player has a strength value between 1 and 100. I take these strength values of the defensive players for each team and calculate the average. That's the defensive quality of a team. Then I take the strengths of the offensive players and I get the offensive quality.

For each attack, I do the following:

``````\$offFactor = (\$attackerTeam_offensive-\$defenderTeam_defensive)/max(\$attackerTeam_offensive, \$defenderTeam_defensive);
\$defFactor = (\$defenderTeam_defensive-\$attackerTeam_offensive)/max(\$defenderTeam_defensive, \$attackerTeam_offensive);
``````

At the moment, I don't know why I divide it by the higher one of both values. But this formula should give you a factor for the quality of offense and defense which is needed later.

Then I have nested conditional statements for each event which could happen. E.g.: Does the attacking team get a scoring chance?

``````if ((mt_rand((-10+\$offAdditionalFactor-\$defAdditionalFactor), 10)/10)+\$offFactor >= 0)
{ ... // the attack succeeds
``````

These additional factors could be tactical values for example.

Do you think this is a good way of calculating a game? My users say that they aren't satisfied with the quality of the simulations. How can I improve them? Do you have different approaches which could give better results? Or do you think that my approach is good and I only need to adjust the values in the conditional statements and experiment a bit?

I hope you can help me. Thanks in advance!

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What do the 10's in the calculations represent specifically in this simulation? –  Kyle Walsh Sep 3 '09 at 17:47
What about the quality of simulations are they not satisfied with? –  Aaron M Sep 3 '09 at 17:56
@Kyle Walsh: The 10s are only used because the mt_rand() functions takes only integer values. I want to generate a random value between -1 (or higher depending on additional factors) and +1 as a floating point value. –  Marco W. Sep 4 '09 at 15:09
"I don't know why I divide it by the higher one of both values" - if you don't know why that code is there, how did you get it? Don't just add random code - understand the values that you require and add code that produces them. –  Kylotan Sep 7 '09 at 16:09
@Kylotan: Yes, you're right, of course. But now I've found out again why I had added this code: It prevents the factor from getting to big. [8, 4] would be better than [9, 5]. That's correct since there are less goals in a match if the quality of both teams is better. –  Marco W. Sep 8 '09 at 13:32

Here is a way I would do it.

Offensive/Defensive Quality

First lets work out the average strength of the entire team:

``````Team.Strength = SUM(Players.Strength) / 11
``````

Now we want to split out side in two, and work out the average for our defensive players, and our offensive players.]

``````Defense.Strength = SUM(Defensive_Players.Strength)/Defensive_Players.Count
Offense.Strength = SUM(Offense_Players.Strength)/Offense_Players.Count
``````

Now, we have three values. The first, out Team average, is going to be used to calculate our odds of winning. The other two, are going to calculate our odds of defending and our odds of scoring.

A team with a high offensive average is going to have more chances, a team with a high defense is going to have more chance at saving.

Now if we have to teams, lets call them A and B.

Team A, have an average of 80, An offensive score of 85 and a defensive score of 60.

Team B, have an average of 70, An offensive score of 50 and a defensive score of 80.

Now, based on the average. Team A, should have a better chance at winning. But by how much?

Scoring and Saving

Lets work out how many times goals Team A should score:

``````A.Goals = (A.Offensive / B.Defensive) + RAND()
= (85/80) + 0.8;
= 1.666
``````

I have assumed the random value adds anything between -1 and +1, although you can adjust this.

As we can see, the formula indicates team A should score 1.6 goals. we can either round this up/down. Or give team A 1, and calculate if the other one is allowed (random chance).

Now for Team B

``````B.Goals = (B.Offensive / A.Defensive) + RAND()
= (50/60) + 0.2;
= 1.03
``````

So we have A scoring 1 and B scoring 1. But remember, we want to weight this in A's favour, because, overall, they are the better team.

So what is the chance A will win?

``````Chance A Will Win = (A.Average / B.Average)
= 80 / 70
= 1.14
``````

So we can see the odds are 14% (.14) in favor of A winning the match. We can use this value to see if there is any change in the final score:

``````if Rand() <= 0.14 then Final Score  = A 2 - 1 B Otherwise A 1 - 1 B
``````

If our random number was 0.8, then the match is a draw.

Rounding Up and Further Thoughts

You will definitely want to play around with the values. Remember, game mechanics are very hard to get right. Talk to your players, ask them why they are dissatisfied. Are there teams always losing? Are the simulations always stagnant? etc.

The above outline is deeply affected by the randomness of the selection. You will want to normalise it so the chances of a team scoring an extra 5 goals is very very rare. But a little randomness is a great way to add some variety to the game.

There are ways to edit this method as well. For example instead of the number of goals, you could use the Goal figure as the number of scoring chances, and then have another function that worked out the number of goals based on other factors (i.e. choose a random striker, and use that players individual stats, and the goalies, to work out if there is a goal)

I hope this helps.

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Thank you very much! :) Please have a look at my comment to Kylotan's answer concerning the division. Do you think the division is more adequate than the difference? –  Marco W. Sep 8 '09 at 13:52
+1 - that's a very well-written answer :) –  warren Sep 12 '09 at 15:00
Why would B.Goals = (B.Offensive / A.Defensive) + RAND()? –  Mathias Oct 26 '09 at 7:50
@Mathias In the same way that we take A.Goals = (A.Offensive / B.Defensive) + RAND() we swap the variable around for B.Goals.We compare the offensive of each team against the opposing teams defense. The random is there some variance. –  Sarah Jamie Lewis Oct 27 '09 at 19:39
But you could argue that any function of the form alpha x (B.Offensive/A.Defensive) + beta x Rand() would be as valid. My issue is with the calibration, which is very arbitrary! Ah, I guess I am over-thinking this :) –  Mathias Oct 30 '09 at 7:19

The most basic tactical decision in football is picking formation, which is a set of three numbers which assigns the 10 outfield players to defence, midfield and attack, respectively, e.g. 4/4/2.

If you use average player strength, you don't merely lose that tactic, you have it going backwards: the strongest defence is one with a single very good player, giving him any help will make it more likely the other team score. If you have one player with a rating of 10, the average is 10. Add another with rating 8, and the average drops (to 9). But assigning more people to defence should make it stronger, not weaker.

So first thing, you want to make everything be based on the total, not the average. The ratio between the totals is a good scale-independent way of determining which teams is stronger and by how much. Ratios tend to be better than differences, because they work in a predictable way with teams of any range of strengths. You can set up a combat results table that says how many goals are scored (per game, per half, per move, or whatever).

The next tactical choice is whether it is better to have one exceptional player, or several good ones. You can make that matter that by setting up scenarios that represent things that happen in game, e.g. a 1 on 1, a corner, or a long ball. The players involved in a scenario are first randomly chosen, then the result of the scenario is rolled for. One result can be that another scenario starts (midfield pass leads to cross leads to header chance).

The final step, which would bring you pretty much up to the level of actual football manager games, is to give players more than one type of strength rating, e.g., heading, passing, shooting, and so on. Then you use the strength rating appropriate to the scenario they are in.

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Thank you! "you have it going backwards: the strongest defence is one with a single very good player, giving him any help will make it more likely the other team score." Can you please explain this more detailed? So you would take the ratio instead of the difference? –  Marco W. Sep 13 '09 at 18:19
If you have one player with a rating of 10, the average is 10. Add another with rating 8, and the average drops (to 9). But assigning more people to defence should make it stronger, not weaker. Ratios tend to be better than differences, because they work in a predictable way with teams of any range of strengths. –  soru Sep 14 '09 at 0:31
Thank you very much. Could you please edit your answer and add this additional info? Then I can vote up. –  Marco W. Sep 14 '09 at 9:12
+1 now, very good answer! –  Marco W. Sep 14 '09 at 14:57

The division in your example is probably a bad idea, because it changes the scale of the output variable depending on which side is better. Generally when comparing two quantities you either want interval data (subtract one from the other) or ratio data (divide one by the other) but not both.

A better approach in this case would be to simply divide the offensive score by the defensive score. If both are equal, the result will be 1. If the attacker is better than the defender, it will be greater than 1, and if the defender is stronger, it will be less than one. These are easy numbers to work with.

Also, instead of averaging the whole team, average parts of the team depending on the formations or tactics used. This will allow teams to choose to play offensively or defensively and see the pros and cons of this.

And write yourself some better random number generation functions. One that returns floating point values between -1 and 1 and one that works from 0 to 1, for starters. Use these in your calculations and you can avoid all those confusing 10s everywhere!

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Thank you very much! I don't think that dividing the two strength values is a good idea. The factors will change in an unbalanced way and you'll get a parabola: 6/1=6, 6/2=3, 6/3=2 This shouldn't be the case, should it? The difference is a quite better way I think. –  Marco W. Sep 8 '09 at 13:38
Another argument against division: The values from 4/2 to 4/3 are falling whereas the values from 2/4 to 3/4 are rising. That's totally unwanted, isn't it? This would mean: As a home team, it's good to be stronger. As a guest team, it's good to be weaker. ;) –  Marco W. Sep 8 '09 at 13:45
I already take the averages of parts of the team. I have \$attackTeam_offensive and \$attackTeam_defensive. Or do you mean that I should even divide the offensive into several parts like right and left side? –  Marco W. Sep 8 '09 at 13:46
If you divide, you get a ratio result. As long as you treat it as a ratio then it's fine. You get the flip-side of the same problem with the difference method: should a team that scores 101 be 100pts better than a team that scores 1? If so, what about a team that is 6100pts compared to 6000 - surely they are not so different? But with your system, they are. Neither way is right or wrong. Only you can decide this, and it depends exactly on what you mean by strength. –  Kylotan Sep 8 '09 at 14:38
If you know what the baseline is going to be and that most games will be close to that, it doesn't matter what you use. What matters is what you do with the resulting value that expresses the difference between the teams and verifying that it does what you expect in all circumstances (eg. how should the results of a very strong team vs a strong team differ from the results of a weak team vs a very weak team?) If the number of players in every block is equal, then it doesn't matter if you sum or average. But averaging doesn't really serve any purpose in that case either. –  Kylotan Sep 9 '09 at 17:09

You might also want to ask the users what about the simulation they don't like. It's possible that, rather than seeing the final outcome of the game, they want to know how many times their team had an opportunity to attack but the defense regained control. So instead of

`"Your team wins 2-1"`
They want to see match highlights:
```"Your team wins 2-1:
- scored at minute 15,
- other team took control and went for tried for a goal at minute 30,
but the shoot was intercepted,
- we took control again and \$PLAYER1 scored a beautiful goal!
... etc
```

You can use something like what Jamie suggests for a starting point, choose the times at random, and maybe pick who scored the goal based on a weighted sampling of the offensive players (i.e. a player with a higher score gets a higher chance of being the one who scored). You can have fun and add random low-probability events like a red card on a player, someone injuring themselves, streakers across the field...

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Yes, the users definitely want to have this! Good ideas! –  Marco W. Sep 13 '09 at 18:17

The average should be the number of players... using the max means if you have 3 player teams:

[4 4 4]

[7 4 1]

The second one would be considered weaker. Is that what you want? I think you would rather do something like:

(Total Scores / Total Players) + (Max Score / Total Players), so in the above example it would make the second team slightly better.

I guess it depends on how you feel the teams should be balanced.

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Thanks for your answer. I know how to calculate the average values and I've already implemented this. \$attackerTeam_offensive is the average of the attacker's offense and \$defenderTeam_defensive is the average of the defender's defense. But I don't know why I divide their difference by the higher one of both values. And I don't know if my technique/method is good. –  Marco W. Sep 4 '09 at 15:12