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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

share|improve this question
    
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
3  
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
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1 Answer

up vote 0 down vote accepted

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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