Ratings Percentage Index for D1 College Hockey (2011-2012)

© 1999-2011, Joe Schlobotnik (archives)

URL for this frameset: http://slack.net/~whelan/tbrw/tbrw.cgi?2012/rpi.shtml

Game results taken from College Hockey News's Division I composite schedule

Today's RPI (including games of 2012 March 17)

Team RPI Record RPIRecord Sched Strength Opp Pct Opp Opp Pct RPIStr
Rk Rating Rk W-L-T Pct Rk W-L-T Pct Rk SOS Rk OPct Rk OOPct Rk Rating
Boston Coll 1 .5783 1 29-10-1 .7375 1 29-10-1 .7375 6 .5252 12 .5305 5 .5232 1 .5885
Michigan 2 .5600 9 24-12-4 .6500 8 24-12-4 .6500 1 .5300 2 .5523 8 .5214 3 .5797
Union 3 .5557 2 24-7-7 .7237 2 22-7-7 .7083 31 .5049 24 .5137 34 .5014 4 .5623
North Dakota 4 .5551 4T 25-12-3 .6625 4 25-12-3 .6625 12 .5193 5 .5478 28 .5082 2 .5799
Miami 5 .5488 13 24-14-2 .6250 14 22-14-2 .6053 2 .5300 7 .5406 1 .5259 10 .5478
Ferris State 6 .5488 6 23-11-5 .6538 5 23-11-5 .6538 24 .5138 36 .4920 6 .5222 14 .5373
Minnesota 7 .5486 4T 26-13-1 .6625 9T 24-13-1 .6447 19 .5165 31 .5039 7 .5214 13 .5379
Minn-Duluth 8 .5483 3 24-9-6 .6923 3 22-9-6 .6757 30 .5058 38 .4893 23 .5122 18 .5313
Boston Univ 9 .5466 14 23-14-1 .6184 13 23-14-1 .6184 9 .5226 8 .5370 16 .5170 5 .5598
Maine 10 .5460 12 23-13-3 .6282 12 23-13-3 .6282 15 .5186 23 .5152 11 .5199 11 .5468
Denver U 11 .5450 11 25-13-4 .6429 11 24-13-4 .6341 21 .5153 14 .5267 26 .5109 8 .5511
Mass-Lowell 12 .5428 7 23-12-1 .6528 6 23-12-1 .6528 29 .5061 46 .4753 13 .5181 21 .5250
Western Mich 13 .5415 15 21-13-6 .6000 15 21-13-6 .6000 10 .5220 10 .5321 14 .5181 7 .5511
Cornell 14 .5376 8 18-8-7 .6515 7 18-8-7 .6515 36 .4996 27 .5101 37 .4955 9 .5497
Mich State 15 .5354 21 19-15-4 .5526 21 19-15-4 .5526 3 .5296 1 .5626 18 .5168 6 .5598
Northern Mich 16 .5307 24 17-14-6 .5405 24 17-14-6 .5405 5 .5274 9 .5323 2 .5256 15 .5346
Merrimack 17 .5300 17T 18-12-7 .5811 17T 18-12-7 .5811 25 .5130 25 .5132 21 .5129 17 .5322
Notre Dame 18 .5238 27T 19-18-3 .5125 27T 19-18-3 .5125 4 .5276 4 .5482 12 .5196 12 .5382
Ohio State 19 .5174 29T 15-15-5 .5000 29T 15-15-5 .5000 8 .5232 18 .5232 4 .5232 25 .5167
Harvard 20 .5162 23 13-10-11 .5441 23 13-10-11 .5441 28 .5069 17 .5240 35 .5003 19 .5297
Lake Superior 21 .5150 27T 18-17-5 .5125 27T 18-17-5 .5125 20 .5158 34 .4966 3 .5233 30 .5010
CO College 22 .5148 25 18-16-2 .5278 25 18-16-2 .5278 26 .5104 16 .5245 31 .5050 20 .5254
Air Force 23 .5132 10 21-10-7 .6447 9T 21-10-7 .6447 49 .4693 49 .4640 48 .4714 26 .5146
St Cloud 24 .5131 29T 17-17-5 .5000 29T 17-17-5 .5000 18 .5174 15 .5260 19 .5141 24 .5187
Wisconsin 25 .5108 36 17-18-2 .4865 36 17-18-2 .4865 13 .5189 3 .5518 29 .5062 16 .5335
Quinnipiac 26 .5076 19 20-14-6 .5750 19 20-14-6 .5750 45 .4851 47 .4698 42 .4911 31 .4992
Northeastern 27 .5064 39 13-16-5 .4559 39 13-16-5 .4559 7 .5233 13 .5292 9 .5210 29 .5086
Colgate 28 .5050 26 19-17-3 .5256 26 19-17-3 .5256 37 .4981 20 .5170 43 .4908 23 .5194
Bemidji State 29 .5036 35 17-18-3 .4868 35 17-18-3 .4868 27 .5092 32 .5022 25 .5119 32 .4979
Niagara 30 .5024 17T 17-11-9 .5811 17T 17-11-9 .5811 47 .4762 35 .4965 50 .4682 22 .5202
RIT 31 .5014 16 20-13-6 .5897 16 20-13-6 .5897 48 .4720 43 .4832 51 .4677 27 .5130
New Hampshire 32 .4998 42 15-19-3 .4459 42 15-19-3 .4459 16 .5177 26 .5115 10 .5201 34 .4931
Mass-Amherst 33 .4979 43T 13-18-5 .4306 43T 13-18-5 .4306 11 .5203 6 .5412 24 .5122 28 .5102
Yale 34 .4942 29T 16-16-3 .5000 29T 16-16-3 .5000 42 .4923 40 .4889 40 .4936 35 .4920
Michigan Tech 35 .4933 37T 16-19-4 .4615 37T 16-19-4 .4615 34 .5039 33 .4991 30 .5058 36 .4886
Providence 36 .4915 45 14-20-4 .4211 45 14-20-4 .4211 23 .5149 19 .5217 22 .5123 33 .4935
NE-Omaha 37 .4898 41 14-18-6 .4474 41 14-18-6 .4474 33 .5039 37 .4910 27 .5089 39 .4788
Mercyhurst 38 .4878 22 20-16-4 .5500 22 20-16-4 .5500 51 .4671 52 .4558 47 .4715 37 .4821
AK-Fairbanks 39 .4854 47 12-20-4 .3889 47 12-20-4 .3889 17 .5176 21 .5168 15 .5179 38 .4810
Clarkson 40 .4840 34 16-17-6 .4872 34 16-17-6 .4872 46 .4830 50 .4637 44 .4905 45 .4703
Holy Cross 41 .4833 20 20-15-4 .5641 20 20-15-4 .5641 58 .4563 58 .4369 55 .4639 42 .4725
Dartmouth 42 .4802 40 13-16-4 .4545 40 13-16-4 .4545 43 .4887 45 .4781 41 .4928 44 .4715
Bowling Green 43 .4800 48 14-25-5 .3750 48 14-25-5 .3750 22 .5150 28 .5100 17 .5170 43 .4722
St Lawrence 44 .4770 43T 14-19-3 .4306 43T 14-19-3 .4306 40 .4925 41 .4889 38 .4940 41 .4725
Robert Morris 45 .4760 29T 17-17-5 .5000 29T 17-17-5 .5000 50 .4680 51 .4637 49 .4697 40 .4738
Bentley 46 .4693 29T 16-16-8 .5000 29T 16-16-8 .5000 54 .4590 57 .4373 52 .4675 48 .4548
Princeton 47 .4671 46 9-16-7 .3906 46 9-16-7 .3906 41 .4925 39 .4893 39 .4938 46 .4617
Connecticut 48 .4608 37T 16-19-4 .4615 37T 16-19-4 .4615 53 .4606 54 .4514 54 .4641 49 .4543
MSU-Mankato 49 .4589 51 12-24-2 .3421 51 12-24-2 .3421 38 .4978 42 .4849 32 .5028 51 .4449
RPI 50 .4573 50 12-24-3 .3462 50 12-24-3 .3462 39 .4944 30 .5061 45 .4898 47 .4613
Brown 51 .4539 49 9-18-5 .3594 49 9-18-5 .3594 44 .4854 44 .4796 46 .4876 50 .4460
AK-Anchorage 52 .4468 53 9-25-2 .2778 53 9-25-2 .2778 35 .5032 29 .5074 33 .5016 52 .4431
Vermont 53 .4369 57 6-27-1 .1912 57 6-27-1 .1912 14 .5189 11 .5314 20 .5140 53 .4362
Canisius 54 .4337 52 10-22-4 .3333 52 10-22-4 .3333 52 .4671 48 .4685 53 .4666 54 .4306
American Intl 55 .4072 54 8-26-3 .2568 54 8-26-3 .2568 55 .4574 56 .4423 56 .4632 56 .3904
AL-Huntsville 56 .3985 58 2-28-1 .0806 58 2-28-1 .0806 32 .5045 22 .5164 36 .4999 55 .3944
Army 57 .3982 55 4-23-7 .2206 55 4-23-7 .2206 56 .4574 55 .4445 57 .4624 58 .3818
Sacred Heart 58 .3936 56 6-28-3 .2027 56 6-28-3 .2027 57 .4573 53 .4547 58 .4582 57 .3841

Explanation of the Table

RPI
The Ratings Percentage Index is one of the NCAA's selection criteria for college hockey. It is a sum of .25 times a team's winning percentage, .21 times their opponents' winning percentage (q.v.) and .54 times their opponents' opponents' winning percentage (q.v.). Equivalently, it can be calculated as .25 times their winning percentage plus .75 times their Strength Of Schedule (SOS; q.v.).
Record
Winning percentage (Pct) is calculated as described on the rating system comparison page; in particular, it is calculated with a tie counting as half a win and half a loss.
RPI Record
This is the record in games that contribute towards a team's RPI, not including "bad" wins which were dropped because they would have lowered the rating.
Sched Strength
The Strength Of Schedule (SOS) as measured by RPI is given by 0.28 times a team's opponents' winning percentage (q.v.) plus 0.72 times their opponents' opponents' winning percentage (q.v.). This number, along with the OPct and OOPct, is calculated only from the games that are left after omitting "bad wins".
Opp Pct
The Opponents' Winning Percentage (OPct) for a team is calculated by averaging the winning percentages of all their opponents in games not involving that team. The weighting factor is the number of games a team played against a particular opponent. Because games against the team in question are left out, it is not simply a weighted average of the winning percentages.
Opp Opp Pct
The Opponents' Opponents' Winning Percentage (OOPct) for a team is a weighted average of the Opponents' Winning Percentages (OPct; q.v.) of each of their opponents. Once again, the weighting factor is the number of games played against each opponent, but this time no extra games are left out, so each opponent's contribution can be read from the OPct column for that opponent.
RPIStr
The "strength" of a team (as a prospective opponent) for RPI purposes is given by 0.28 times their winning percentage plus 0.72 times their Opponents' Winning Percentage (OPct; q.v.). Since head-to-head games have to be left out of the RPI calculation, a team's strength of schedule is not exactly the weighted average of the RPIStr numbers for all its opponents, but RPIStr gives a sense of how RPI will evaluate the strength of each opponent. (Each team's name in the table above is a link to a rundown of selection criteria which includes a list of their opponents with their actual contribution to that team's strength of schedule.) Note that with the original formula (see below) RPIStr was much more heavily weighted towards winning percentage than RPI itself, but with the 25/21/54 weightings, it's much less so.

RPI Fudges

Because of various shortcomings of the RPI (see below), the NCAA has over the years added assorted tweaks and hacks.

To deal with the fact that their rating system allows teams to hurt their ratings by beating a sufficiently weak opponent, the NCAA simply omits from a team's RPI any wins which would lower their overall RPI. This is implemented in the table above, and the difference between "Record" and "RPI Record" shows how many wins have been dropped.

The Nitty-Gritty

The definitions above provide all the information needed to calculate the RPI, but to spell out the formula explicitly, if Vij is the number of times team i has beaten team j (with ties as always counting as half a win and half a loss), Nij=Vij+Vji is the number of times they've played, Vi=∑jVij is the total number of wins for team i and Ni=∑jNij is the total number of games they've played, then team i's RPI is given by

0.25*Vi/Ni + 0.21 * ∑j(Nij/Ni)*(Vj-Vji)/(Nj-Nji) + 0.54 * ∑j(Nij/Ni)*[∑k(Njk/Nj)*(Vk-Vkj)/(Nk-Nkj)]

Some Background

The RPI was developed for general-purpose use within the NCAA over the course of the past couple of decades. The original definition weighted the terms at 25, 50, and 25 percent for Winning Percentage, Opponents' Winning Percentage, and Opponents' Opponents' Winning Percentage, respectively. However, the impact of strength of schedule on the ratings meant it was possible for a team to hurt its RPI by playing a weak opponent, even if they won the game. (Specific examples of this from the 1994-1995 season were Colorado College vs Air Force and Bowling Green vs Ohio State. In the latter case BGSU split two non-conference games with OSU and fell just short of making the NCAAs; if they had won both games, they still would have missed the tournament, but not playing them at all would have improved their RPI enough to get an at-large bid.)

Presumably in response to this, the weighting of the terms in college hockey's RPI was changed to the 35/50/15. However, that was found to give too little weight to strength of schedule (see "Shortcomings of RPI" below), so the weighting was changed back to the original 25/50/25, effective with the start of the 2003-2004 season.

In an attempt to try to avoid both problems, the NCAA has changed the weightings once again, to 25/21/54.

Shortcomings of RPI

A more extreme problem with the RPI was brought to light in the 1998-1999 season, when the Metro-Atlantic Athletic Conference (MAAC) began play and six more Division I teams were suddenly eligible for the NCAAs. Because they played most of their games against each other, the winning percentages which contributed to their strength of schedule were on average not much worse that those of the rest of the NCAA, even though those out of conference games that were played indicated that, top-to-bottom, the MAAC was nowhere near as strong as the other conferences. (The revised weighting, with increased improtance given to a team's own winning percentage, only exacerbated the situation.) This led to the fact that in the first two years of competition, MAAC regular season champion Quinnipiac ended up in the top 12 in the nation according to the RPI by compiling a high winning percentage against a mostly MAAC schedule. The NCAA selection committee anticipated this at the beginning of the MAAC's first season, and reserved the right to overrule RPI and the other selection criteria if it judged based on "overall conference strength" that there was a lack of "competitive equity" between conferences.

In response to this, the NCAA returned to the original weighting of 25/50/25. However, the previous shortcomings of possibly hurting one's RPI by beating a weak team, which prompted the change away from that weighting in the first place, remained.

Now they've changed once more, to the bizarre-looking 25/21/54. You can use our do-it-yourself ratings calculator to try any combination you want.

Alternatives to RPI

It was observed at the time that while Quinnipiac, for reasons described above, was rated significantly higher than they should have been by the RPI, several other rating systems ranked them much lower down, where it was felt they deserved to be. Many of the other ranking systems, like CHODR, CCHP, and Massey, take into consideration factors, like margin of victory and/or home ice, which are deliberately ignored by the RPI. The HEAL and RHEAL rating systems, while only considering won-lost-tied outcomes of each game, make distinctions based on which of a team's games it won or lost (so that beating a good team and losing to a bad team will get you more highly ranked than losing to a good team and beating a bad team).

One ranking system which, like the RPI, considers only a team's overall winning percentage and the strengths of the teams they played, is the Bradley-Terry ranking system, which goes under the name of KRACH when applied to college hockey. KRACH has been described as a system which does correctly what RPI is intended to do: provide a rating which evaluates a team's won-lost-tied performance over the entire season, taking into account the strength of their schedule. Much more on this system can be found at our KRACH page.

See also


Last Modified: 2012 March 26

Joe Schlobotnik / joe@amurgsval.org

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