team2 := teams[1] team2Count := team2.PlayerCount() totalPlayers := team1Count + team2Count betaSqr := numerics.Sqr(gi.Beta) team1MeanSum := team1.Accum(skills.MeanSum) team1VarSum := team1.Accum(skills.VarianceSum) team2MeanSum := team2.Accum(skills.MeanSum) team2VarSum := team2.Accum(skills.VarianceSum) // This comes from equation 4.1 in the TrueSkill paper on page 8 // The equation was broken up into the part under the square root sign and // the exponential part to make the code easier to read. betaSqrPlayers := betaSqr * float64(totalPlayers) sqrtPart := math.Sqrt(betaSqrPlayers / (betaSqrPlayers + team1VarSum + team2VarSum)) expPart := math.Exp(-.5 * numerics.Sqr(team1MeanSum-team2MeanSum) / (betaSqrPlayers + team1VarSum + team2VarSum)) return expPart * sqrtPart } var ( twoTeamTeamRange = numerics.Exactly(2) twoTeamPlayerRange = numerics.AtLeast(1) )
validatePlayersPerTeam(teams, twoPlayerPlayerRange) team1 := teams[0] p1 := team1.Players()[0] p1Rating := team1.PlayerRating(p1) team2 := teams[1] p2 := team2.Players()[0] p2Rating := team2.PlayerRating(p2) // We just use equation 4.1 found on page 8 of the TrueSkill 2006 paper: betaSqr := numerics.Sqr(gi.Beta) p1var := p1Rating.Variance() p2var := p2Rating.Variance() // This is the square root part of the equation: sqrtPart := math.Sqrt(2 * betaSqr / (2*betaSqr + p1var + p2var)) // This is the exponent part of the equation: numerator := -numerics.Sqr(p1Rating.Mean() - p2Rating.Mean()) denominator := 2 * (2*betaSqr + p1var + p2var) expPart := math.Exp(numerator / denominator) return sqrtPart * expPart } var ( twoPlayerTeamRange = numerics.Exactly(2) twoPlayerPlayerRange = numerics.Exactly(1) )
