Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I've implemented an Elo rating system in a game. There is no limit for the number players. Players can join the game constantly so the number of players probably rises gradually.

How the Elo values are exactly calculated isn't important because of this fact: If team A beats team B then A's Elo win equals B's Elo loss.

Hence I've got a problem concerning the starting values for my rating system:

  • Should I use the starting value "0" for every player? The sum of all Elo values would be constant. But since the number of players is increasing there would be some kind of Elo deflation, wouldn't it?
  • Should I use any starting value greater than 0? In this case, the sum of all Elo values would constantly increase. So there could be an Elo inflation. The problem: Elo points lose value but the starting value keeps always the same.

What should I do? Can you help me? Thanks in advance!

share|improve this question
You say below that you don't want Elo to become negative. Then you can't start at 0. If you do start at 0, the sum of all Elo values will not be constant if you artificially clip the score to remain >= 0. –  Alok Singhal Dec 12 '09 at 22:30
Yes, that's right. But even starting at 1000 or so doesn't prevent numbers from becoming negative, does it? –  Marco W. Dec 13 '09 at 15:19
add comment

8 Answers

up vote 27 down vote accepted

You can start at zero and add a fudge factor to the displayed score to keep it above zero, or you can start at 1000 - they are the same thing. Yes, with the 1000 starting point you'll have an increasing number of total ELO points in the system but it will always be the same number per player on average - 1000. The starting value for Elo is always the current average. ELO is a zero sum game, points lost by player A are gained by player B.

When you set a starting point at 1000 what you are essentially saying is that the average player = 1000 pts. With a closed group of initial players (beta testers?) this is true, within that group average = 1000. But if the game is something you improve at with time then your closed group average player becomes highly skilled compared to someone who hasn't played.

Now when you assign a 1000 to a new player you are saying new average players = existing highly skilled average player. This is not true, they are likely to be much less skilled that your original closed group. So the new player loses points and your highly skilled players gain => inflation. What you would need to do is accurately assess the skill of new players and assign them a ranking that is more in keeping with their actual skill. This could be done be assigning them a "provisional ranking" for their first x games until you get a feel for their skill. When provisionally ranked only their ELO score would change, not those of the people they play. Once they join the real system the points they bring into the scored ELO would roughly equate to their actual skill and they wouldn't move up or down dramatically => no inflation or deflation.

In short: Provisional rankings

share|improve this answer
Thank you very much! So I can give every player 1000 starting points. But new players have just a provisional score for the first X games. Correct so far? In these X games, they only gain or lose points as normal but their opponents don't. Right? –  Marco W. Dec 15 '09 at 16:44
Yes, exactly. Then after a few provisional games thy should have a rating which roughly reflects their true ability. Upgrade them to normal player status, with this rating and from then on treat them the same as everyone else. –  Andrew Dec 15 '09 at 17:03
Ok. But the starting value is still a difficult point. By choosing either very weak opponents or quite strong opponents - depending on whether the starting is higher or lower than the average - I can have a strong influence on my starting value after X games. Can't I? –  Marco W. Dec 15 '09 at 18:01
And what to do with negative ratings? Allow them? Or just don't change the rating if it would become negative? –  Marco W. Dec 15 '09 at 18:02
Well this is the same ELO system that is used in chess and they don't get negative ratings. If you start at the same starting point you shouldn't either. The further you move from the average the harder it becomes to keep moving away, there is an effective limit. In chess "average" = 1200 and "grandmaster" = 2500 so if you are able to move 1300 pts away from average you are a grandmaster. To get negative you'd need to move 1200+ pts away from the average - a "negative" grandmaster of poor play. It would be extremely difficult and I doubt it will ever happen. –  Andrew Dec 15 '09 at 19:06
show 6 more comments

This site used the elo rating system. They start at 1200

taken from http://gameknot.com/help-answer.pl?question=29

GameKnot rating system is based on Elo rating system with a fixed K = 20 and the following modifications:

The first 20 games are used to establish player's rating on the website. During the first 20 games, the player's rating is calculated as an average of the ratings of all his/her opponents, +400 in case of a win, -400 in case of a loss, same for a draw. +/-200 points are used when playing against a player with a provisional rating. PLayer's rating is provisional during the first 20 games, after which it becomes established. Player's rating is considered to be equal to 1200 during the first 5 rated games.

Timeouts are counted as wins only if there were at least 3 moves made in the game (losses are always counted for the timed out players, regardless of how many moves were made).

The higher of two ratings, at the beginning of the game and at the end, is used to calculate the rating adjustments after the game is over.

For example, if during your first 20 rated games, you played 3 games and you won against 1200 player with provisional rating, then against 1400 player with established rating, but lost against 1600 player with established rating, your rating will be: ( (1200 + 200) + (1400 + 400) + (1600 - 400) ) / 3 = 1467

Or, if during your first 20 rated games, you win against 1200 provisional, win against 1400 established, lose against 1600 provisional, draw against 1500, your rating will be: ( (1200 + 200) + (1400 + 400) + (1600 - 200) + 1500 ) / 4 = 1525

share|improve this answer
Thanks, very useful! –  Marco W. Dec 18 '09 at 16:25
add comment
  1. Do players see this score?
  2. Will the players understand Elo?
  3. Will players continue to play if their score becomes negative?

I would start everyone out at some positive point value (10, 100, 1000, it doesn't matter). When two people of relatively capability play each other, the scores trade as expected. Where you need to concentrate is some sort of relative capability between two players.

Suppose, later on in the game's life, I have 25000 points, and you're a n00b with 100. I beat you, I gain nothing and you lose nothing. Why? Because I just pwned a n00b, that's why. There should be no advantage for a new player to take down a starting player. Also, even if you are in some point range, you should implement something where you can only earn so many points from a given player in a certain time range.

Obviously, this will be something that will be continually tweaked throughout your game's life time.

share|improve this answer
Thank you. Players see the score since it is the main criterion for the player ranking. What do you want to say with "Will the players understand Elo"? The Elo score shouldn't become negative. If it would in case of a loss, the loser doesn't get any subtraction but the winner gets his addition as normal. –  Marco W. Dec 12 '09 at 21:42
The thing you mention concerning 25,000 points vs 100 points: That would be an inflation, right? So I just have to avoid inflation. –  Marco W. Dec 13 '09 at 15:21
No matter what, when a new player comes into the game, you will have some amount of inflation - whether you start at 0 or 100. If I have 0, but can't go negative, if you win a contest, you will get points without taking away any. That is adding total points into the system. So once you acknowledge that you must have inflation, now you must decide on measures to curb that inflation. Adjusting awards/penalties based on the relative scores of players is the best way to adjust. –  Jarrett Meyer Dec 13 '09 at 17:02
Actually, marco -- if you're using an ELO system, then if the 25000-point player beats the 100-point player, few points change hands. But if the 100-point player beats the 25000-point player, many points change hands. It's one big advantage of the ELO system. –  Chip Uni Dec 18 '09 at 17:14
add comment

I don't know if it is useful, but Mark Glickman's Ratings Page discusses some issues with Elo ratings, their declines, etc. (see the last few paragraphs there). Also see his rating system, the Glicko system, which seems to account for playing frequency and discusses rating reliability. Finally, his research page has a lot of papers discussing ratings and their reliability.

Hope that helps.

share|improve this answer
Thank you. I want to use the Elo algorithm. That's sure. But I don't know where to start: 0 or any positive number (e.g. 1000). –  Marco W. Dec 13 '09 at 15:34
If you're worried about rating deflation/inflation, you will have to make some changes to the algorithm: such as a variable k factor, injection of rating points, or both. I haven't looked at the Glicko system in a lot of detail, but it deals with the shortcomings of the Elo algorithm. It's a tricky problem: good luck! –  Alok Singhal Dec 13 '09 at 15:42
New idea: The starting value for the Elo score is always the current average. So if I have users with 0, 300, 200 and 150, the fifth user will get 163 to start. Would this be good? –  Marco W. Dec 13 '09 at 16:21
I think you're better off with either injection of points, or with a variable K-factor, or with a combination of both. Statistically, I can't prove (yet) if your method takes care of inflation or deflation. By the way, Glicko system is Elo's algorithm, but also has a reliability factor, so in principle you could use it. It seems that it's already used in many places. –  Alok Singhal Dec 13 '09 at 19:49
add comment

Maybe, make points not be able to go below the starter about and put the amount of he loss in some "pocket.

Lets say players start with 0. One player has elo 0 and lose 10 points. He will lose nothing and this points will go to some pocket. Now lets imagine the player won the next game and got 11 points. Instead of getting those 11 points, he would get just 1 point. And now his "pocket" would have 0 points.

share|improve this answer
add comment

I think that most ELO-like systems on the Internet will have a problem with ratings creep.

Assume that all new players start at a rating of zero. LousyPlayer loses a dozen games, and his rating goes far below zero. What stops him from clearing his browser, registering a new account under a new email address, and starting over?

If this is possible, then low-ranked accounts will lay fallow, moving up the practical average rating.

share|improve this answer
Thank you very much, I didn't think of this. So I can't completely prevent inflation or deflation, right? –  Marco W. Dec 18 '09 at 16:24
Nope! ELO works perfectly when everyone plays everyone else... but not when people move in and out of the system. You should look at what other gaming systems use to prevent inflation or deflation. –  Chip Uni Dec 18 '09 at 17:15
add comment

I understand the concepts of the ELO like systems. I also understand different ways on how an 'established' rating can be accomplished by comparing the results from provisional against established rated players. But what I'm interested in is how do I start out if none of the players have an established rating? I could assign them all a default starting value and take the first 20 results and start with that value as established. But my concern about this method is that these established ratings are all based on this fictional starting value. And even more important, players starting out after all players have an established rating could benefit from the fact that his rating will be based on opponents with established ratings. Are my concerns valid or should I neglect this fact?

share|improve this answer
I had these concerns, too. This could really be a problem. Especially, if you have ELO deflation or inflation in your system. Maybe you let people start with 1500 ELO points in the beginning. But then you have an enormous inflation so that 1500 points are now at the bottom of your ranking. –  Marco W. May 16 '10 at 15:09
add comment

Elo works on the difference in the ratings of the two players or teams, the actual value is irrelevant. You can start at any number you like. I run a system for the Facebook Scrabble League with a starting value of 5000 simply to distinguish it from other Scrabble ratings systems out there.

Inflation does not result from over-rated newcomers losing points to experienced players - that all evens out in time. Inflation results from people with less than average ratings leaving the system. This is what tends to happen in online games unlike real life chess, where deflation is a problem because highly rated players retire and take their points out of the system.

But do you need to worry about inflation? The only time it is important is if you wish to compare the performance of current players with historical figures - not a problem any online gamers are likely to face. Even if you do worry about inflation, it's easy to correct. Find the mean rating of all your current players and compare it with the start figure, if it's too high, reduce everyone's rating to bring it back in line. In my experience a reduction of 1 or 2 points per ratings period does the trick and accounts for a lot of newcomers who get thrashed and don't come back.

Many systems give newcomers higher K values in order that they find their level more quickly.

Another approach is not to rate newcomers until they have played their first ratings period, at which point you calculate the rating based on what if would have to have been for Elo to predict the results correctly. This is impossible if you have all unrated players together and (I think) would involve recursion if you have multiple newcomers in a tournament. It also undermines the zero-sum principle of Elo and removes your ability to measure inflation. However, talking to people who use this system, I am told "it all evens out" in practice.

share|improve this answer
add comment

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.