Code Golf: Calculate Ratings Percentage Index (RPI)

Problem

The Rating Percentage Index (RPI) is used to rank sports teams (notably NCAA basketball) based upon a team's wins and losses and its strength of schedule. This code golf challenge is to calculate RPI.

Input/output processing is not the focus here, so you are allowed any reasonable (I'll be the judge :-) input/output scheme, i.e., as a file or parameter, convenient formatting for your language of choice, avoiding special characters, etc.

Input is a list of game results: two team names, plus an indication of who was the home team and who won the contest. One example might be:

``````  "Duke" "North Carolina" 1
"Duke" "Maryland" 1
"Wake" "Duke" 0
"North Carolina" "Duke" 1
"Maryland" "Wake" 1
"Wake" "North Carolina" 0
``````

where the home team is listed first and the 1/0 indicates whether the home team won.

Output is a list of the teams in the input data along with their RPI number, e.g.,

``````   Duke 0.641
North Carolina 0.585
Maryland 0.421
Wake 0.235
``````

RPI should be calculated as defined in the Wikipedia entry: Ratings Percentage Index. (Please review the definition, because there are some non-intuitive subtleties!)

Formula:`RPI = (WP * 0.25) + (OWP * 0.50) + (OOWP * 0.25)`

where WP is Winning Percentage, OWP is Opponents' Winning Percentage and OOWP is Opponents' Opponents' Winning Percentage.

There will be no neutral site games or non-Div I teams in the input data.

Example

For the example input above, here are the calculated WPs, OWPs, and OOWPs:

``````   WP

Duke: 0.8125
North Carolina: 0.7692308
Maryland: 0.5
Wake: 0.0

OWP

Duke: (North Carolina 1.0) + (North Carolina 1.0) + (Maryland 1.0) + (Wake 0) / 4: 0.75
North Carolina: (Duke 1.0) + (Duke 1.0) + (Wake 0.0) / 3: 0.66
Maryland: (Duke 0.66) + (Wake 0.0): 0.33
Wake: (Duke 0.66) + (Maryland 0.0) + (North Carolina 0.5) / 3: 0.39

OOWP

Duke: (North Carolina 0.66) + (North Carolina 0.66) + (Maryland 0.33) + (Wake 0.39) / 4 = 0.5139
North Carolina: (Duke 0.75) + (Duke 0.75) + (Wake 0.39) / 3 = 0.6292
Maryland: (Duke 0.75) + (Wake 0.39) / 2 = 0.5695
Wake: (Duke 0.75) + (Maryland 0.33) + (North Carolina 0.66) / 3 = 0.5833
``````

Which results (assuming I didn't make any errors :-) in these RPIs:

``````   Duke 0.707
North Carolina 0.683
Maryland 0.434
Wake 0.340
``````

Reference Implementation

Can be found here

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I added the formula (from the wikipedia page listed) so that interested users do not need to actually visit wikipedia in order to answer the question. –  Brian Jan 21 '11 at 18:12
Thanks, but note that there are some subtleties in how those percentages are calculated and you'll still need to visit the page to understand those. –  Dr. Pain Jan 21 '11 at 19:00
@Dr. Pain: Am I missing something? You have Duke's WP as 0.8125, but I only see Duke as having won 3 of its 4 games. –  Brian Jan 21 '11 at 19:14
@Brian: Yes, you need to look at the definition of WP in the Wikipedia article. Home games count differently than away games. –  Dr. Pain Jan 21 '11 at 21:13
If you like code-golf and programming puzzles, support this proposal on area51. area51.stackexchange.com/proposals/4570/… –  gnibbler Jan 22 '11 at 10:20

Python, 380 characters

``````def A(s):
n=d=0.
for v in s:n+=v[0];d+=v[1]
return n/d
def f(G):
g={};h={};P={}
for x,y,w in G:g[x]=[];g[y]=[];h[x]=[];h[y]=[]
for x,y,w in G:f=14-w*8;g[x]+=[(w*f,f,y)];g[y]+=[(f-w*f,f,x)];h[x]+=[(w,1,y)];h[y]+=[(1-w,1,x)]
for t in h:P[t]=A([(A([(x,y)for x,y,z in h[o]if z!=t]),2)for i,j,o in h[t]])
for t in h:h[t]=A([(P[o],2)for x,y,o in h[t]])+A(g[t])/4+P[t]
return h
``````

call it like this:

``````data = [
["Duke","North Carolina",1],
["Duke","Maryland",1],
["Wake","Duke",0],
["North Carolina","Duke",1],
["Maryland","Wake",1],
["Wake","North Carolina",0],
]
print f(data)
``````

`A` takes a list of tuples and computes the sum of the first element of each tuple divided by the second element of each tuple. `g` and `h` are maps from each team to the list of games they played and the points they got for them (`g` using the modified home/away weighting, `h` using normal weighting). Then WP, OWP, and OOWP can be expressed in terms of `A`, `g`, and `h`.

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