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Game Courier Ratings for chinese chess

This file reads data on finished games and calculates Game Courier Ratings (GCR's) for each player. These will be most meaningful for single Chess variants, though they may be calculated across variants. This page is presently in development, and the method used is experimental. I may change the method in due time. How the method works is described below.

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SELECT * FROM FinishedGames WHERE Rated='on' AND Game = 'chinese chess'
Game Courier Ratings for chinese chess
Accuracy:96.37%99.86%92.59%
NameUseridGCRPercent wonGCR1GCR2
Francis Fahystamandua171035.0/41 = 85.37%17101710
Chuck Leegyw6t15815.0/5 = 100.00%15801582
Kevin Paceypanther15627.0/11 = 63.64%15581566
Raymond Dlewel15545.0/6 = 83.33%15511557
Daniel Zachariasarx15436.0/9 = 66.67%15511535
Pericles Tesone de Souzaperitezz15332.0/2 = 100.00%15331533
Vitya Makovmakov33315274.0/7 = 57.14%15211533
Cameron Milesshatteredglass15231.0/1 = 100.00%15281519
S Ssim15191.0/1 = 100.00%15211518
Fergus Dunihofergus15182.0/3 = 66.67%15181518
ctzctz15181.0/1 = 100.00%15181519
dax00dax0015181.0/1 = 100.00%15181518
Julien Coll Moratfacteurix15181.0/1 = 100.00%15181518
juan rodriguezrodriguez15181.0/1 = 100.00%15181518
M Wintherkalroten15181.0/1 = 100.00%15181518
yas kumkumagai15181.0/1 = 100.00%15181518
David Levinsmidrael15181.0/1 = 100.00%15181518
Antonio Barratotonno15181.0/1 = 100.00%15181518
whitenerdy53whitenerdy5315181.0/1 = 100.00%15181518
shift2shiftshift2shift15021.0/2 = 50.00%15021502
Erik Lerougeerik15002.0/4 = 50.00%14971502
pallab basupallab15001.0/2 = 50.00%15001499
Play Testerplaytester15001.0/2 = 50.00%15011498
Sagi Gabaysagig7214870.0/1 = 0.00%14881487
mystery playercentipede14870.0/1 = 0.00%14881486
DFA Productions70nyd014870.0/1 = 0.00%14891486
don anezdonanez14870.0/1 = 0.00%14891485
yellowturtleyellowturtle14870.0/1 = 0.00%14901484
sixtysixty14870.0/1 = 0.00%14901484
Michael Christensenjustsojazz14870.0/1 = 0.00%14911483
Jeremy Goodjudgmentality14870.0/1 = 0.00%14911482
hubergerdhubergerd14860.0/1 = 0.00%14911481
Aurelian Floreacatugo14862.0/5 = 40.00%14841489
Jeremy Hook10011014860.0/1 = 0.00%14901481
Omnia Nihilosacredchao14861.0/3 = 33.33%14851486
Gary Giffordpenswift14830.0/1 = 0.00%14841482
blundermanblunderman14830.0/1 = 0.00%14841481
Oisín D.sxg14820.0/1 = 0.00%14831482
Jose Carrilloj_carrillo_vii14820.0/1 = 0.00%14831481
louisvlouisv14820.0/1 = 0.00%14841480
Alisher Bolsaniraja8514820.0/1 = 0.00%14831481
Nick Wolffwolff14810.0/1 = 0.00%14811481
Andy Thomasandy_thomas14810.0/1 = 0.00%14801482
Minh Dangminhdang14810.0/1 = 0.00%14811481
Jon Dannjon_dann14810.0/1 = 0.00%14811481
Dayrom Gilallahukbar14810.0/1 = 0.00%14811481
y kumyasuhiro14810.0/1 = 0.00%14811481
Ryan Schwartzshunoshi14810.0/1 = 0.00%14811481
Daniil Frolovflowermann14810.0/1 = 0.00%14811481
ben chewben558214810.0/1 = 0.00%14811481
Thomas Meehanorangeaurochs14810.0/1 = 0.00%14801481
Jean-Louis Cazauxtimurthelenk14810.0/1 = 0.00%14801481
George Dukegwduke14680.0/2 = 0.00%14681469
Richard milnersesquipedalian14670.0/2 = 0.00%14661468
Samuel de Souzasamsou14660.0/2 = 0.00%14661466
Carlos Cetinasissa14661.0/7 = 14.29%14631469
Steve Hsteve_201014660.0/2 = 0.00%14651466
Arthur Yvrardtorendil14420.0/4 = 0.00%14421442
darren paullramalam14302.0/17 = 11.76%14031456

Meaning

The ratings are estimates of relative playing strength. Given the ratings of two players, the difference between their ratings is used to estimate the percentage of games each may win against the other. A difference of zero estimates that each player should win half the games. A difference of 400 or more estimates that the higher rated player should win every game. Between these, the higher rated player is expected to win a percentage of games calculated by the formula (difference/8)+50. A rating means nothing on its own. It is meaningful only in comparison to another player whose rating is derived from the same set of data through the same set of calculations. So your rating here cannot be compared to someone's Elo rating.

Accuracy

Ratings are calculated through a self-correcting trial-and-error process that compares actual outcomes with expected outcomes, gradually changing the ratings to better reflect actual outcomes. With enough data, this process can approach accuracy to a high degree, but error remains an essential element of any trial-and-error process, and without enough data, its results will remain error-ridden. Unfortunately, Chess variants are not played enough to give it a large data set to work with. The data sets here are usually small, and that means the ratings will not be fully accurate.

One measure taken to eke out the most data from the small data sets that are available is to calculate ratings in a holistic manner that incorporates all results into the evaluation of each result. The first step of this is to go through pairs of players in a manner that doesn't concentrate all the games of one player in one stage of the process. This involves ordering the players in a zig-zagging manner that evenly distributes each player throughout the process of evaluating ratings. The second step is to reverse the order that pairs of players are evaluated in, recalculate all the ratings, and average the two sets of ratings. This allows the outcome of every game to affect the rating calculations for every pair of players. One consequence of this is that your rating is not a static figure. Games played by other people may influence your rating even if you have stopped playing. The upside to this is that ratings of inactive players should get more accurate as more games are played by other people.

Fairness

High ratings have to be earned by playing many games. They are not available through shortcuts. In a previous version of the rating system, I focused on accuracy more than fairness, which resulted in some players getting high ratings after playing only a few games. This new rating system curbs rating growth more, so that you have to win many games to get a high rating. One way it curbs rating growth is to base the amount it changes a rating on the number of games played between two players. The more games they play together, the more it approaches the maximum amount a rating may be changed after comparing two players. This maximum amount is equal to the percentage of difference between expectations and actual results times 400. So the amount ratings may change in one go is limited to a range of 0 to 400. The amount of change is further limited by the number of games each player has already played. The more past games a player has played, the more his rating is considered stable, making it less subject to change.

Algorithm

  1. Each finished public game matching the wildcard or list of games is read, with wins and draws being recorded into a table of pairwise wins. A win counts as 1 for the winner, and a draw counts as .5 for each player.
  2. All players get an initial rating of 1500.
  3. All players are sorted in order of decreasing number of games. Ties are broken first by number of games won, then by number of opponents. This determines the order in which pairs of players will have their ratings recalculated.
  4. Initialize the count of all player's past games to zero.
  5. Based on the ordering of players, go through all pairs of players in a zig-zagging order that spreads out the pairing of each player with each of his opponents. For each pair that have played games together, recalculate their ratings as described below:
    1. Add up the number of games played. If none, skip to the next pair of players.
    2. Identify the players as p1 and p2, and subtract p2's rating from p1's.
    3. Based on this score, calculate the percent of games p1 is expected to win.
    4. Subtract this percentage from the percentage of games p1 actually won. // This is the difference between actual outcome and predicted outcome. It may range from -100 to +100.
    5. Multiply this difference by 400 to get the maximum amount of change allowed.
    6. Where n is the number of games played together, multiply the maximum amount of change by (n)/(n+10).
    7. For each player, where p is the number of his past games, multiply this product by (1-(p/(p+800))).
    8. Add this amount to the rating for p1, and subtract it from the rating for p2. // If it is negative, p1 will lose points, and p2 will gain points.
    9. Update the count of each player's past games by adding the games they played together.
  6. Reinitialize all player's past games to zero.
  7. Repeat the same procedure in the reverse zig-zagging order, creating a new set of ratings.
  8. Average both sets of ratings into one set.


Written by Fergus Duniho
WWW Page Created: 6 January 2006