Previous results

There is substantial evidence for the RAE in a number of different contexts, as people born shortly after imposed age cut-offs are placed in the subsequent age cohort. As a result, these players can have an age advantage over players born closer to the end of the cut-off. Relative age differences have been found to impact child outcomes such as education [9, 10], self-esteem [11] and physical strength [12]. The RAE can occur for numerous reasons, but in sports, because of the size and maturity advantage for children born right after age cut-offs, relatively older children likely receive more exposure to better competition which contributes to more time for deliberate practice and the development of abilities [5, 6, 13, 14, 15]. In this sense, maturity is mistaken for talent, and those with greater physical maturity are provided more opportunity to train and develop.

Interestingly, when examining the impact of the RAE in sports across a number of sports and countries, results vary. For example, research on German soccer players found that players born shortly after the age cut-off were more likely to play professional soccer [16]. A RAE was also documented for European professional soccer players [17], male and female international basketball players [18], and male and female college volleyball players in Canada [19]. In contrast, the RAE in female sports suggests a more varied pattern than male sports [20, 21, 22, 23, 24]. For example, for females competing in gymnastics and rugby, the RAE appears to be advantageous at younger ages and then have little or no effect in later ages [20, 22]—likely because RAE is sport-specific by gender [24].

Research on the RAE in sports has perhaps been most thoroughly examined among hockey players. Three decades ago, research on players in the NHL and junior hockey (the league that feeds most players to the NHL) found a strong relationship between league participation and birth month [25]. For even younger players (minor hockey), Canadian children born in the first half of the year were more likely to play minor hockey and more likely to play for top teams [6]. More recent research continues to show a strong relationship between birth month and the proportion of players in junior hockey in Canada [3] and the likelihood of being chosen in the NHL draft [2, 5]. Yet, there is growing evidence that the RAE may actually reverse as players advance in professional sports [7, 8]. A reversal has been found in soccer, rugby, handball, cricket, and hockey where relatively younger players appear to suffer disadvantage earlier on, but overcome this disadvantage to earn more money [7, 16], enjoy longer careers [2, 7], score more points [8] and appear on the most elite rosters and squads [2, 26].

Explanations for the RAE reversal

We highlight two compelling explanations in the literature to understand why a RAE reversal might occur. The first is psychological. Smaller players in junior hockey who subsequently make it to the NHL demonstrate higher than average resilience due to their ability to overcome size limitations [16, 27, 28]. To compete against their relatively older and bigger peers, these players learn to work harder [29], resulting in positive peer effects that spark resilience and improve motivation. This initial disadvantage will eventually work in their favor when early differences in size reach parity in young adulthood. The psychological benefit in the NHL is that these “underdogs” are better equipped to overcome subsequent obstacles and succeed in professional play [28]. Thus, this early disadvantage (if they can overcome it) becomes a later advantage in professional play—an underdog effect.

The second explanation suggests that the players born later in the year (relatively younger) who then become successful athletes may not only have a degree of resilience, but also superior ability—a biological explanation. For these younger, smaller players to overcome, “a system that discriminates against them” (372) [16], they need more than grit and determination, they must also be more talented than their relatively larger counterparts to counteract their size disadvantage [16]. It follows that these younger players are likely positively selected (i.e. selected from the right tail of the ability distribution). Therefore, while maturity and size can delay or postpone the screening of talented players into the NHL, talent will ultimately win out when assessing performance outcomes. In the NHL, the proportion of relatively young players with superior ability is potentially larger than that of relatively older players because more of the relatively older player’s success has been artificially enhanced by the RAE.

We should note that although these two explanations (effort plus talent) might provide persuasive explanations for a RAE reversal among the NHL elite, there might be a less obvious factor influencing the reversal—the NHL draft age cut-offs. The NHL restricts entry into the draft for players who turn 18 years-old by September 15^th, but who are not older than 20 years-old before December 31^st. This means that all 18-year-olds who are drafted in the NHL are born in the first three quarters of the year. Those born in the last quarter of the year must wait another year to enter the draft. Ironically, this means that the same factors that initially benefitted those born in the beginning of the year may reverse their advantage by making them the youngest on their NHL team. For those waiting a year for the NHL eligibility, they will be relatively older than their rookie counterparts. If being slightly older at the start of the NHL career is any advantage, then the initial benefactors of the RAE in junior hockey are now at a disadvantage, simply by another cut-off effect.

Given evidence of the RAE reversal in the literature and compelling explanations for the reversal, we have a simple expectation—the reversal will be greatest among the highest scoring and highest paid athletes in the NHL.

Sample

To examine quarter-of-birth distributions and performance outcomes, we compiled data of nearly all NHL players over 8 consecutive NHL seasons; player data across several years were collected from the 2008–2009 season through the 2015–2016 season. This provided a total of 8,760 player-season observations (i.e. 2,017 individual players). Data were collected from two sources, www.nhl.com and www.capfriendly.com. A total of 20 student researchers entered data and a subset of students reviewed the accuracy of the data entered.

We did not use all the player-season observations, but focus on drafted American and Canadian players who were not goalies, and played in a given season. Undrafted players were excluded because draft related information do not exist (e.g. draft year and draft age), which would prevent comparability across models. Likewise, we excluded goalies from the analyses because goalies’ performance outcomes are not comparable to other positions. For a similar reason, observations on players who belong to an NHL team but in a given season played abroad or in minor leagues are excluded because there was no comparable data available when these players are not in the NHL. Finally, the analyses are restricted to North American players because we do not have information on when non-North American players started to play professionally. This totaled 4,447 player-season observations.

We analyzed this selected population with both descriptive statistics and quantile regression analyses [30]. As descriptive statistics can reveal basic patterns in the data, quantile regression can reveal if the RAE varies across the distribution of points and salary, while also accounting for outliers and other statistical issues [31, 32, 33]. We should note that analyses are of all known players in quarter-of-birth-date distribution and does not necessarily require the use of statistical inference, although results with statistical significance scores are still provided in final models (see [34]).

Analyses of birth dates distributions and NHL drafting rules

To analyze the quarter of birth date distribution, we assess different sub-populations based on age at draft combined with information from the NHL drafting system. To the best of our knowledge, this is the first study to conduct analyses on the RAE on the birth date distribution while accounting for this rule. The NHL’s draft rules establish that only players within a certain age-range in the draft year are eligible for the NHL draft: those who turn 18 years-old by September 15^th up until those who turn 20 years-old by December 31^st in the draft year. The NHL drafting rules limit relatively younger player’s eligibility period (2 years) compared to relatively older peers (3 years).

Quantile regression

Quantile regression is an ideal econometric approach to investigate the change of the RAE along the points and salary distributions, yet, only one study has used this technique before within a similar context (on Italian soccer players’ salaries, see [16]). Compared to ordinary least squares (OLS), this method is not limited by the assumption that the RAE is the same at the lower/upper tail of the distribution as at the mean. The quantile regression describes the relationship between measures in the model across quantiles of the outcome variable [33] and is appropriate for studies of outcome variables characterized by extremely positively skewed distributions. This is particularly true for the case when scholars investigate the distribution of athletes’ salaries because of the presence of superstars [31, 32]. Usually, scholars implement a logarithmic transformation of salaries, which we implement as well. However, although the resulting distribution is less skewed, it may still not be sufficiently normal. As a result, OLS might still provide under- or over-estimates.

Quantile regression is also preferred over the utilization of the OLS when this method is used to examine isolated arbitrary sub-samples, based on different outcome levels. When analyzed this way, the investigation of just sub-samples reduces efficiency, since the estimates are obtained from smaller samples. Also, the investigation of sub-samples causes sample selection bias, which occurs with the arbitrary segmentation of the sample into sub-samples [33].

Additionally, the quantile regression could be used as a robustness check to compare the estimates obtained at the conditional median of the outcome variable, that is, the 50^th percentile of the distribution, to the estimates obtained at the conditional mean of the outcome variable with the OLS. Thus, while in this study we focus on the quantile regression, we also discuss how these results would change if we used the OLS.

For these quantile regression analyses, we use the Stata 14 command qreg2 [35] and focus on the usual 25^th, 50^th, 75^th, and 90^th percentiles of the distribution [15]. This command allows us to compute standard errors clustered on players. Clustered standard errors account for the possibility that the variance of the error term varies by player (i.e. heteroscedasticity), but that it is similar within each player (i.e. in this case a cluster equals an individual player observed over multiple seasons); we use this adjustment because there are repeated observations for individual players that are not likely to be independent. The methodology to compute clustered standard errors for quantile regressions is illustrated in previous research [35].

We conduct robustness checks with four alternative model specifications. First, we conducted analyses on points and salaries with the OLS at the conditional mean. In this model specification, first we insert the quarter of birth dummies and afterwards the other control variables. Second, again with the OLS, we repeat analyses on only Canadian players, and, only for this sub-population, add a dummy variable for players having played in the Canadian Junior Hockey League. In this way, the regression analysis of Canadians works as a an additional robustness check: Canadian and American players trained under the same cut-off (December 31^st) (except for players who grew up in Minnesota—August 31^st): the restriction to Canadian players insures the same cut-off date applies to everyone. Third, we repeat the analyses using experience and its standardized square in place of age, as well as season dummies. Fourth, we repeat these analyses on players who were drafted at 19 and 20 years of age.

The Stata syntax for figures and tables in this paper (as well as results reported in the S1 File) are available in the online material. The syntax also includes additional analyses for robustness checks mentioned in this paper, but not reported here.

Birth date distribution

In this section we analyze the birth date distribution. Fig 1 reports the frequencies of quarter of births for drafted North-American NHL non-goalies (N = 4,447), where January-March is quarter is coded as 0 and so on. October-December is coded as 3. We also investigate the frequency of quarter of birth based on age at draft at 18 (N = 2,363), 19 (N = 1,538) and 20 (N = 546), see Fig 2.

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Fig 1. Quarter of birth rate distribution.

https://doi.org/10.1371/journal.pone.0182827.g001

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Fig 2. Quarter of birth distributions, based on age at draft.

https://doi.org/10.1371/journal.pone.0182827.g002

We also illustrate the distributions of quarter of birth for two additional types of players: i) players who play in NHL, but who were not drafted (N = 935)—they entered NHL as free-agents; ii) observations on players who entered NHL (either as draftees or as free-agents), but play abroad or in minor leagues (N = 819). These results are illustrated in S1 File.

Descriptive statistics of the data are presented below. We use pairwise correlation to show the relationship between measures. We also report mean and standard deviation statistics (see Table 1).

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Table 1. Pairwise correlations and descriptive statistics.

https://doi.org/10.1371/journal.pone.0182827.t001

Additional descriptive statistics by quarter of birth are provided in Tables 2 and 3. In Table 2, we report the points scored by players in the 25^th, 50^th, 75^th, and 90^th percentile of the player-season’s point distribution (upper panel). We do this by quarter and overall. In Table 3 we report equivalent statistics but for salaries.

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Table 2. Points, by quarter and overall at the 25th, 50th, 75th, 90th percentile.

https://doi.org/10.1371/journal.pone.0182827.t002

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Table 3. Ln_Salaries, by quarter and overall at the 25th, 50th, 75th, 90th percentile.

https://doi.org/10.1371/journal.pone.0182827.t003

Figs 3 and 4 provide a visual distribution of scores and salary by birth quarter.

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Fig 3. Points distribution, by quarter of birth.

https://doi.org/10.1371/journal.pone.0182827.g003

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Fig 4. Salaries distribution, by quarter of birth.

https://doi.org/10.1371/journal.pone.0182827.g004

Points

In this section we investigate the RAE on points using quantile regression (as a point of reference, see S1 File for OLS results). We focus on the 25^th, 50^th, 75^th and 90^th percentiles of the points distribution of North American players. The results are reported in Table 4. Analyses with the conditional mean and only for Canadian players using OLS is reported in the supporting material (see Table A in S1 File).

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Table 4. The RAE by quarter, on points; quantile regression at the 25th, 50th, 75th, 90th percentile.

https://doi.org/10.1371/journal.pone.0182827.t004

We conducted additional analyses not reported for brevity, but available upon request. First, we control for experience, its standardized square in place of age, and season dummies; the results are equivalent to those in Table 4. Second, we restricted the analyses on players who were drafted at 19 and 20 years of age; these results point in the same direction of those in Table 4, and are even stronger because the best players who were drafted at 18 years of age are excluded.

Salaries

In this section we investigate the RAE on salaries. As with points, we implement the analyses at the 25^th, 50^th, 75^th and 90^th percentiles of the salary distribution of North American players.

As before, OLS analyses of ln(salary), including that with the restricted sample on Canadian players alone, can be found in the supporting material (see Table B in S1 File). Results controlling for experience, its standardized square in place of age, and season dummies, as well as analyses on players drafted at 19 and 20 years of age are not reported for sake of brevity (available upon request). The results from these additional analyses confirm those in Table 5.

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Table 5. The RAE by quarter, on natural logarithm of salaries; quantile regression.

https://doi.org/10.1371/journal.pone.0182827.t005

Three elite players

To illustrate our findings, we compare our results with three NHL “elite” players born in different quarters of the year. The following players, Steven Stamkos, Sydney Crosby, and Patrick Kane, are the highest scoring North American players in the NHL and have the highest points per game average for all North American players over the period we cover in our data (since the 2008–2009 season). Steven Stamkos was born in the first birth quarter (February) and has averaged 65 points per season over his career, which is 15 points higher than the points scored by players in the 90^th percentile of the overall distribution. Sydney Crosby, born in the third birth quarter (August), has averaged 85.5 points per year, which is about 46 points higher than the 90^th percentile. Finally, Patrick Kane, born in the fourth birth quarter (November), has averaged 75 points per year throughout his career, which is about 36 points higher than the 90^th percentile.

Their career average salaries reflect their exceptional productivity above the 90^th percentile of the overall distribution. Steven Stamkos, again born in the first quarter, has an average salary of $5,912,500 per season (a 15.59 on the natural logarithmic scale). Sidney Crosby, born in the third birth quarter, has an average salary of $9,286,364 (a 16.04 on the natural logarithmic scale). Patrick Kane, born in the last birth quarter, has an annual salary of $6,865,909 per year (a 15.74 on the natural logarithmic scale). We see that they are all exceptionally compensated for their productivity at levels much higher than even the top 10 percent of the overall distribution, even as the patterns still reflect a RAE reversal. Although not always true for each individual case, from these comparisons we are able to illustrate what our findings show—a RAE reversal that is more pronounced among the NHL elite.

Limitations

This investigation presents at least two limitations. First, our study is based on data from only two countries: US and Canada. This limits the external validity of our results. Second, these countries share the same cut-off date (except for the state of Minnesota), which could give rise to one problem—we cannot disentangle the RAE from season-of-birth effects, which are shown to exist in the educational system in the US and that could also affect youth hockey teams in the US and elsewhere. These season-of-birth effects are potential confounders because they might impact the performance of players born in different periods of the same calendar year in unknown ways. This effect would be independent from maturity gaps in youth as one study suggests [42]—US winter-children are disproportionately born to single mothers, teenage mothers and mothers without a high-school degree. The impact of family structure could cause negative season-of-birth effects on children, at least for school achievement. Likewise, this could also impact the composition of future hockey players born in winter months. Thus, this type of season-of-birth effect could bias results.