This vignette provides a brief introduction to the Poisson distribution for modeling count data along with a short case study about the goals scored at the 2018 FIFA World Cup. It is intended as an illustrative introduction that can be used as self-study material or as a class room exercise in a course covering GLMs.
The classic basic probability distribution employed for modeling count data is the Poisson distribution. Its probability mass function \(f(y; \lambda)\) yields the probability for a random variable \(Y\) to take a count \(y \in \{0, 1, 2, \dots\}\) based on the distribution parameter \(\lambda > 0\):
\[ \text{Pr}(Y = y) = f(y; \lambda) = \frac{\exp\left(-\lambda\right) \cdot \lambda^y}{y!}. \]
The Poisson distribution has many distinctive features, e.g., both its expectation and variance are equal and given by the parameter \(\lambda\). Thus, \(\text{E}(Y) = \lambda\) and \(\text{Var}(Y) = \lambda\). Moreover, the Poisson distribution is related to other basic probability distributions. Namely, it can be obtained as the limit of the binomial distribution when the number of attempts is high and the success probability low. Or the Poisson distribution can be approximated by a normal distribution when \(\lambda\) is large. See Wikipedia (2022) for further properties and references.
In the distributions3
package Poisson distribution
objects can be generated with the Poisson()
function.
Subsequently, the object can be handled like other distribution objects
in distributions3
: print; extract mean and variance;
evaluate density, cumulative distribution, or quantile function; or
simulate random samples.
library("distributions3")
Y <- Poisson(lambda = 1.5)
print(Y)
## [1] "Poisson(lambda = 1.5)"
mean(Y)
## [1] 1.5
variance(Y)
## [1] 1.5
pdf(Y, 0:5)
## [1] 0.22313016 0.33469524 0.25102143 0.12551072 0.04706652 0.01411996
cdf(Y, 0:5)
## [1] 0.2231302 0.5578254 0.8088468 0.9343575 0.9814241 0.9955440
quantile(Y, c(0.1, 0.5, 0.9))
## [1] 0 1 3
set.seed(0)
random(Y, 5)
## [1] 3 1 1 2 3
Using the plot()
method the distribution can also be
visualized which we use here to show how the probabilities for the
counts \(0, 1, \dots, 15\) change when
the parameter is \(\lambda = 0.5, 2, 5,
10\).
plot(Poisson(0.5), main = expression(lambda == 0.5), xlim = c(0, 15))
plot(Poisson(2), main = expression(lambda == 2), xlim = c(0, 15))
plot(Poisson(5), main = expression(lambda == 5), xlim = c(0, 15))
plot(Poisson(10), main = expression(lambda == 10), xlim = c(0, 15))
In this vignette we will illustrate how this infrastructure can be leveraged to obtain predicted probabilities for the number of goals in soccer matches from the 2018 FIFA World Cup.
To investigate the number of goals scored per match in the 2018 FIFA
World Cup, the FIFA2018
data set provides two rows, one for
each team, for each of the 64 matches during the tournament. In the
following, we treat the goals scored by the two teams in the same match
as independent which is a realistic assumption for this particular data
set. We just remark briefly that there are also bivariate
generalizations of the Poisson distribution that would allow for
correlated observations but which are not considered here.
In addition to the goals, the data set provides some basic meta-information for the matches (an ID, team name abbreviations, type of match, group vs. knockout stage) as well as some further covariates that we will revisit later in this document. The data looks like this:
data("FIFA2018", package = "distributions3")
head(FIFA2018)
## goals team match type stage logability difference
## 1 5 RUS 1 A group 0.1530732 0.8638406
## 2 0 KSA 1 A group -0.7107673 -0.8638406
## 3 0 EGY 2 A group -0.2066409 -0.4438080
## 4 1 URU 2 A group 0.2371671 0.4438080
## 5 3 RUS 3 A group 0.1530732 0.3597142
## 6 1 EGY 3 A group -0.2066409 -0.3597142
For now, we will focus on the goals
variable only. A
brief summary yields
summary(FIFA2018$goals)
## Min. 1st Qu. Median Mean 3rd Qu. Max.
## 0.000 0.000 1.000 1.297 2.000 6.000
showing that the teams scored between \(0\) and \(6\) goals per match with an average of \(\bar y = 1.297\) from the observations \(y_i\) (\(i = 1, \dots, 128\)). The corresponding table of observed relative frequencies is:
observed <- prop.table(table(FIFA2018$goals))
observed
##
## 0 1 2 3 4 5 6
## 0.2578125 0.3750000 0.2500000 0.0781250 0.0156250 0.0156250 0.0078125
(Note that in recent versions of R using proportions()
rather than prop.table()
is recommended.)
This confirms that goals are relatively rare events in a soccer game with each team scoring zero to two goals per match in almost 90 percent of the matches. Below we show that this observed frequency distribution can be approximated very well by a Poisson distribution which can subsequently be used to obtain predicted probabilities for the goals scored in a match.
In a first step, we simply assume that goals are scored with a constant mean over all teams and matches and hence just fit a single Poisson distribution for the number of goals. To do so, we obtain a point estimate of the Poisson parameter by using the empirical mean \(\hat \lambda = \bar y = 1.297\) and set up the corresponding distribution object:
In the technical details below we show that this actually corresponds to the maximum likelihood estimation for this distribution.
As already illustrated above, the expected probabilities of observing
counts of \(0, 1, \dots, 6\) goals for
this Poisson distribution can be extracted using the pdf()
method. A comparison with the observed empirical frequencies yields
expected <- pdf(p_const, 0:6)
cbind(observed, expected)
## observed expected
## 0 0.2578125 0.273384787
## 1 0.3750000 0.354545896
## 2 0.2500000 0.229900854
## 3 0.0781250 0.099384223
## 4 0.0156250 0.032222229
## 5 0.0156250 0.008357641
## 6 0.0078125 0.001806469
By and large, all observed and expected frequencies are rather close. However, it is not reasonable that all teams score goals with the same probabilities, which would imply that winning or losing could just be attributed to “luck” or “random variation” alone. Therefore, while a certain level of randomness will certainly remain, we should also consider that there are stronger and weaker teams in the tournament.
To account for different expected performances from the teams in the
2018 FIFA World Cup, the FIFA2018
data provides an
estimated logability
for each team. These have been
estimated by Zeileis, Leitner, and Hornik (2018) prior to the
start of the tournament (2018-05-20) based on quoted odds from 26 online
bookmakers using the bookmaker consensus model of Leitner, Zeileis, and Hornik (2010). The
difference
in logability
between a team and
its opponent is a useful predictor for the number of goals
scored.
Consequently, we fit a generalized linear model (GLM) to the data
that links the expected number of goals per team/match \(\lambda_i\) to the linear predictor \(x_i^\top \beta\) with regressor vector
\(x_i^\top = (1,
\mathtt{difference}_i)\) and corresponding coefficient vector
\(\beta\) using a log-link: \(\log(\lambda_i) = x_i^\top \beta\). The
maximum likelihood estimator \(\hat
\beta\) with corresponding inference, predictions, residuals,
etc. can be obtained using the glm()
function from base R
with family = poisson
:
m <- glm(goals ~ difference, data = FIFA2018, family = poisson)
summary(m)
##
## Call:
## glm(formula = goals ~ difference, family = poisson, data = FIFA2018)
##
## Coefficients:
## Estimate Std. Error z value Pr(>|z|)
## (Intercept) 0.21272 0.08125 2.618 0.00885 **
## difference 0.41344 0.10579 3.908 9.31e-05 ***
## ---
## Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
##
## (Dispersion parameter for poisson family taken to be 1)
##
## Null deviance: 144.20 on 127 degrees of freedom
## Residual deviance: 128.69 on 126 degrees of freedom
## AIC: 359.39
##
## Number of Fisher Scoring iterations: 5
Both parameters can be interpreted. First, the intercept corresponds
to the expected log-goals per team in a match of two equally strong
teams, i.e., with zero difference in log-abilities. The corresponding
prediction for the number of goals can either be obtained manually from
the extracted coef()
by applying exp()
(as the
inverse of the log-link).
Or equivalently the predict()
function can be used with
type = "response"
in order to get the expected \(\hat \lambda_i\) (rather than just the
linear predictor \(x_i^\top \hat
\beta\) that is predicted by default).
As above, we can also set up a Poisson()
distribution
object and obtain the associated expected probability distribution for
zero to six goals in a mathc of two equally strong teams:
p_zero <- Poisson(lambda = lambda_zero)
pdf(p_zero, 0:6)
## [1] 0.290242139 0.359041061 0.222074031 0.091571467 0.028319386 0.007006441
## [7] 0.001444541
Second, the slope of \(0.413\) can be interpreted as an ability elasticity of the number of goals scored. This is because the difference of the log-abilities can also be understood as the log of the ability ratio. Thus, when the ability ratio increases by \(1\) percent, the expected number of goals increases approximately by \(0.413\) percent.
This yields a different predicted Poisson distribution for each
team/match in the tournament. We can set up the vector of all \(128\) Poisson()
distribution
objects by extracting the vector of all fitted point estimates \((\hat \lambda_1, \dots, \hat
\lambda_{128})^\top\):
p_reg <- Poisson(lambda = fitted(m))
length(p_reg)
## [1] 128
head(p_reg)
## 1 2
## "Poisson(lambda = 1.7680)" "Poisson(lambda = 0.8655)"
## 3 4
## "Poisson(lambda = 1.0297)" "Poisson(lambda = 1.4862)"
## 5 6
## "Poisson(lambda = 1.4354)" "Poisson(lambda = 1.0661)"
Note that specific elements from the vector p_reg
of
Poisson distributions can be extracted as usual, e.g., with an index
like p_reg[i]
or using the head()
and
tail()
functions etc.
As an illustration, the following goal distributions could be expected for the FIFA World Cup final (in the last two rows of the data) that France won 4-2 against Croatia:
tail(FIFA2018, 2)
## goals team match type stage logability difference
## 127 4 FRA 64 Final knockout 0.8865638 0.6289619
## 128 2 CRO 64 Final knockout 0.2576019 -0.6289619
p_final <- tail(p_reg, 2)
p_final
## 127 128
## "Poisson(lambda = 1.6044)" "Poisson(lambda = 0.9538)"
pdf(p_final, 0:6)
## d_0 d_1 d_2 d_3 d_4 d_5
## 127 0.2010078 0.3224993 0.2587107 0.13835949 0.05549639 0.017807808
## 128 0.3852791 0.3674743 0.1752462 0.05571586 0.01328527 0.002534265
## d_6
## 127 0.0047618419
## 128 0.0004028582
This shows that France was expected to score more goals than Croatia but both teams scored more goals than expected, albeit not unlikely many.
Assuming independence of the number of goals scored, we can obtain
the table of possible match results (after normal time) by multiplying
the marginal probabilities (again only up to six goals). In R this be
done using the outer()
function which by default performs a
multiplication of its arguments.
res <- outer(pdf(p_final[1], 0:6), pdf(p_final[2], 0:6))
round(100 * res, digits = 2)
## [,1] [,2] [,3] [,4] [,5] [,6] [,7]
## [1,] 7.74 7.39 3.52 1.12 0.27 0.05 0.01
## [2,] 12.43 11.85 5.65 1.80 0.43 0.08 0.01
## [3,] 9.97 9.51 4.53 1.44 0.34 0.07 0.01
## [4,] 5.33 5.08 2.42 0.77 0.18 0.04 0.01
## [5,] 2.14 2.04 0.97 0.31 0.07 0.01 0.00
## [6,] 0.69 0.65 0.31 0.10 0.02 0.00 0.00
## [7,] 0.18 0.17 0.08 0.03 0.01 0.00 0.00
For example, we can see from this table that the expected probability for France winning against Croatia 1-0 is \(12.43\) percent while the probability that France loses 0-1 is only \(7.39\) percent.
The advantage of France can also be brought out more clearly by aggregating the probabilities for winning (lower triangular matrix), a draw (diagonal), or losing (upper triangular matrix). In R these can be computed as:
sum(res[lower.tri(res)]) ## France wins
## [1] 0.5245018
sum(diag(res)) ## draw
## [1] 0.2497855
sum(res[upper.tri(res)]) ## France loses
## [1] 0.2242939
Note that these probabilities do not sum up to \(1\) because we only considered up to six goals per team but more goals can actually occur with a small probability.
Next, we update the expected frequencies table by averaging across the expectations per team/match from the regression model.
expected <- pdf(p_reg, 0:6)
head(expected)
## d_0 d_1 d_2 d_3 d_4 d_5 d_6
## 1 0.1706693 0.3017480 0.2667494 0.15720674 0.069486450 0.024570788 0.0072403041
## 2 0.4208316 0.3642392 0.1576286 0.04547703 0.009840349 0.001703409 0.0002457231
## 3 0.3571261 0.3677207 0.1893148 0.06497703 0.016726166 0.003444474 0.0005911098
## 4 0.2262357 0.3362265 0.2498462 0.12377196 0.045986787 0.013668909 0.0033857384
## 5 0.2380213 0.3416546 0.2452047 0.11732187 0.042100811 0.012086260 0.0028914265
## 6 0.3443506 0.3671104 0.1956873 0.06954039 0.018534163 0.003951835 0.0007021718
expected <- colMeans(expected)
cbind(observed, expected)
## observed expected
## 0 0.2578125 0.294374450
## 1 0.3750000 0.340171469
## 2 0.2500000 0.214456075
## 3 0.0781250 0.098236077
## 4 0.0156250 0.036594546
## 5 0.0156250 0.011726654
## 6 0.0078125 0.003332718
As before, observed and expected frequencies are reasonably close, emphasizing that the model has a good marginal fit for this data. To bring out the discrepancies graphically we show the frequencies on a square root scale using a so-called hanging rootogram (Kleiber and Zeileis 2016). The gray bars represent the square-root of the observed frequencies “hanging” from the square-root of the expected frequencies in the red line. The offset around the x-axis thus shows the difference between the two frequencies which is reasonably close to zero.
bp <- barplot(sqrt(observed), offset = sqrt(expected) - sqrt(observed),
xlab = "Goals", ylab = "sqrt(Frequency)")
lines(bp, sqrt(expected), type = "o", pch = 19, lwd = 2, col = 2)
abline(h = 0, lty = 2)
Finally, we want to point out that while the log-abilities (and thus their differences) had been obtained based on bookmakers odds prior to the tournament, the calibration of the intercept and slope coefficients was done “in-sample”. This means that we have used the data from the tournament itself for estimating the GLM and the evaluation above can only be made ex post. Alternatively, one could have used previous FIFA World Cups for calibrating the coefficients so that probabilistic forecasts for the outcome of all matches (and thus the entire tournament) could have been obtained ex ante. This is the approach used by Groll et al. (2019) and Groll et al. (2021) who additionally added further explanatory variables and used flexible machine learning regression techniques rather than a simple Poisson GLM.
Fitting a single Poisson distribution with constant \(\lambda\) to \(n\) independent observations \(y_1, \dots, y_n\) using maximum likelihood estimation can be done analytically using basic algebra. First, we set up the log-likelihood function \(\ell\) as the sum of the log-densities per observation:
\[ \begin{align*} \ell(\lambda; y_1, \dots, y_n) & = \sum_{i = 1}^n \log f(y_i; \lambda) \\ \end{align*} \]
For solving the first-order condition analytically below we need the score function, i.e., the derivative of the log-likelihood with respect to the parameter \(\lambda\). The derivative of the sum is simply the sum of the derivatives:
\[ \begin{align*} \ell^\prime(\lambda; y_1, \dots, y_n) & = \sum_{i = 1}^n \left\{ \log f(y_i; \lambda) \right\}^\prime \\ & = \sum_{i = 1}^n \left\{ -\lambda + y_i \cdot \log(\lambda) - \log(y_i!) \right\}^\prime \\ & = \sum_{i = 1}^n \left\{ -1 + y_i \cdot \frac{1}{\lambda} \right\} \\ & = -n + \frac{1}{\lambda} \sum_{i = 1}^n y_i \end{align*} \]
The first-order condition for maximizing the log-likelihood sets its derivative to zero. This can be solved as follows:
\[ \begin{align*} \ell^\prime(\lambda; y_1, \dots, y_n) & = 0 \\ -n + \frac{1}{\lambda} \sum_{i = 1}^n y_i & = 0 \\ n \cdot \lambda & = \sum_{i = 1}^n y_i \\ \lambda & = \frac{1}{n} \sum_{i = 1}^n y_i = \bar y \end{align*} \]
Thus, the maximum likelihood estimator is simply the empirical mean \(\hat \lambda = \bar y.\)
Unfortunately, when the parameter \(\lambda\) is not constant but depends on a
linear predictor through a log link \(\log(\lambda_i) = x_i^\top \beta\), the
corresponding log-likelihood of the regression coefficients \(\beta\) can not be maximized as easily.
There is no closed-form solution for the maximum likelihood estimator
\(\hat \beta\) which is why the
glm()
function employs an iterative numerical algorithm
(so-called iteratively weighted least squares) for fitting the
model.