4.2.1 Are within-subject deviations from serial (in)dependence a result of strategic best response to lower-ranked players or match characteristics?

Experimental and field studies have shown that beliefs about opponents’ rationality can affect the likelihood of reaching the normative solution of a game. Reference Palacios-Huerta and VolijPalacios-Huerta & Volij (2009) find that the subgame-perfect equilibrium in the Centipede game is more likely to result if both players are expert chess players, less likely if chess players are matched with students, and least likely when students play other students. Similarly, Reference Bosch-Domenech, Montalvo, Nagel and SatorraBosch-Domenech et al. (2002) find extensive iterated belief-based reasoning about the sophistication of opponents in a guessing game — many subjects who showed an understanding of the Nash equilibrium nevertheless chose to deviate. For example, suppose that the receiver is susceptible to the representativeness bias concerning random sequences or the law of small numbers (Reference Tversky and KahnemanTversky & Kahneman, 1971), i.e., believes that a switch in the serve direction is more likely after a sequence of the same serve directions. Consequently, even if the server is randomizing efficiently, the receiver will expect the sequence of the serves to over-alternate. The latter could be exploited by a server choosing to under-alternate, leading to an increase in the probability of mismatch in the sender and receiver directions, thereby increasing the probability of the server winning the point.

I examine whether such strategic deviations occur in tennis by using a cross-sectional regression model with fixed effects to absorb the between-subject variation leaving the within-subject variation to be modeled, i.e., within-player strategic adaptation to an opponent and/or match characteristics. The following independent variables are included. The current match rankings (not career-high) of both the server and the receiver (or opponent). The former captures within-player variation in randomization, which may occur as a result of the accumulation of experience/expertise (proxied by the player’s own ranking). The latter represents the combined ability and expertise of the opponent. If lower-ranked players are more susceptible to the law of small numbers, then servers should deviate more from serial independence in the direction of under-alternating, the lower-ranked their opponent is. The current match rankings of both the server and receiver (Rank _t^s,Rank _t^r) are transformed into R _t^own=8−log₂Rank _t^s as suggested by Reference Klaassen and MagnusKlaassen & Magnus (2009); the same transformation is used for R _t^opp where the subscript t denotes the current — not career high — ranking.

Other variables capture possibly important match characteristics. The length of a match, specifically the total number of points played, is included as the variable N _points. This variable could capture the effects of fatigue (and difficulty of the match) on the efficiency of serve randomization. The variable denotes the mean number of shots played per point, or the length of a rally. This variable could influence serve randomization in two possible ways. First, the greater the rally length, the more time that elapses between serves — consequently, a player who incorrectly conditions on prior behavior in a biased attempt to randomize, may actually benefit from greater rally lengths. Second, although the ranking of the opponent would capture the expected difficulty of a match, a greater length rally might indicate that this specific match differs in difficulty.Footnote ⁷ Consequently, this might increase the incentives for a player to exert more effort or greater care in randomizing efficiently. The variable W _diff also captures the difficulty of a specific match as it is the difference between the rate at which the player won and lost points in a given match. If W _diff is close to zero, then the match is relatively even. Finally, the variable ln(Round) denotes the round of the match and is a proxy for the expected tournament payoff (factoring in the probability of winning) and the effects of stress or pressure in the later rounds. The variable Round is coded as follows: if the match is a final (Round = 1), semi-final (Round = 2), quarter-final (Round = 3), pre-quarter-final or Top 16 (Round = 4), or any lower qualifying round (Round = 5). Taking the logarithm of this scale imposes a concave relationship, i.e., that the effects of qualifying for each round have an increasingly larger additional effect through the increase in player incentives (monetary or otherwise).Footnote ⁸

Note, however, that the causality of the variables (N _points,,W _diff) may also run in the opposite direction. That is, poor serve randomization could conceivably have direct effects on these variables. For example, if a server exhibits serial correlation and the receiver exploits this, then the receiver would be more likely to return the serve leading to longer rallies on average. Similarly, this could also affect the percentage of points won by the player or the number of points in the match. To remove the problem of endogeneity, I calculate N _points,,W _diff only using data where the player was the receiver, not the server.

The complete model is shown below in Equation 1, errors are normally distributed.Footnote ⁹ To allow for the possibility that players’ strategic adaptation may depend on whether they are, on average, players who over- or under-alternate, the model estimates the set of coefficients separately for these two groups (the distinction is made on the basis of the sign of r _i^dev). The coefficients are denoted separately as β⁺ for players where r _i^dev > 0 and β⁻ for players where r _i^dev < 0.

(1)

The results of the regression are displayed in Table 4 — the top half of the table presents the coefficients for players that over-alternate on average, the bottom half those that under-alternate. A joint F-test of the null hypothesis that the set of independent variables are not different from zero cannot be rejected (F(12,3941)=0.38,p=0.97). Similarly, tests for each independent variable cannot be rejected at the 5% level. I conclude that players do not systematically strategically manipulate their serve randomization according to the rank of their opponent, and furthermore that there is also no significant effect of match characteristics on behavior. This finding is robust to adding interactions between R _t^own and the other variables in the regression model, which would allow sensitivity to match characteristics to depend on a player’s own rank — see Table 8 (Appendix D) for the regression results. Importantly, there is significant heterogeneity in r _i^dev between players as captured by the estimated fixed-effects (F(382,3941)=1.19,p=0.01).

Table 4: The dependence of deviations in runs r _{pg i}^dev on player rankings and match characteristics

Table 5 presents individual regressions using the same set of regressors as above for the players in the high-power group. These regressions allow for the possibility of heterogeneity not only in the fixed-effects but also in the estimated coefficients of the independent variables. For example, it is possible that top-ranked players may adapt strategically to their opponent or the characteristics of each match, but lower ranked players may lack this ability. The prior regression on the whole set of players may thus have masked this heterogeneity. Note, that the bulk of the observations of R _t^own in these individual regressions fall within the Top 10 ranking range. Therefore, conclusions regarding the within-subject variation in randomization with rank are valid only within this range — it is possible that learning more efficient randomization may occur at much lower rankings. By contrast, there is significant variation in R _t^opp allowing for more general conclusions.

Table 5: Individual regressions of r _{pg i}^dev on player and match characteristics

^* denotes significance at the 5% level.

From Table 5, none of the variables are statistically significant for Federer and Murray; however, the β₁(R _t^own) coefficient for Nadal and β₃(N _points) and β₅(W _diff) coefficients for Djokovic are significantly different from zero (p=0.023,0.025 and 0.036, respectively). Of course, by increasing the sample size enough it is possible to reject any hypothesis for an arbitrarily small effect size. Therefore, the economic significance, or effect size, of the deviations is important — if they are small, then we should be cautious in concluding that players are not serving optimally even if statistical significance is found. Relatively small deviations may be either too difficult or too costly to detect and/or exploit. The economic significance, or effect size of these coefficients is more clearly illustrated by ω² or converting them to standardized beta coefficients.Footnote ¹⁰ For Nadal, ω² for β₁(R _t^own) is equal to 0.015. For Djokovic, ω² for β₃(N _points) and β₅(W _diff) is 0.016 and 0.014, respectively. Consequently, I conclude that, while statistically significant, these within-subject findings explain very little variation, particularly compared to the between-subject (unconditional) deviations from serial independence for these players found above. In conjunction with the insignificant findings in the panel regression (Table 4), I conclude that there is no significant and systematic evidence of the existence of strategic deviations conditional either on the opponent’s rank or the characteristics of a match.

4.2.2 Are between-subject deviations from serial independence dependent on a player’s own career-high ranking?

Since the previous results have ruled out any systematic within-subject variation in serve randomization, in this section I focus solely on the between-player variation after averaging the r _{pg i}^dev observations into the player averages r _i^dev. Figure 2 shows the estimated function for all players relating , where , where the subscript max indicates the career-high rank.Footnote ¹¹ The coefficient δ₀ + 8δ₁ corresponds to the mean value of r _i^dev for No. 1 ranked players. To account for the different number of observations determining r _i^dev for each player i, a weighted regression is employed with weights proportional to the number of point-games available for each player. Robustness tests were performed by running the same regression not only on the whole set of players, but also the Top 100, Top 20 and Top 10 players separately — see regressions (1)–(4) in Table 6. In all regressions, the estimate δ₁ was negative and statistically different from zero, i.e., players were increasingly less prone to under-alternating and more prone to over-alternating the lower ranked they were. Indicatively, the conditional on player rankings [1,10,20,50,100,500] are [−2.8,1.9,3.3,5.2,6.6,9.8] respectively (for the regression including all players) — see the plotted regression fit in Figure 2. In all the regressions, the value of is negative and significantly different from zero.Footnote ¹² GPW also find that more highly ranked men players’ behavior is closer to equilibrium, but their estimated logit regression on serve directions does not imply under-alternation on average for No. 1 ranked players.

Figure 2: Estimated weighted regression of the relationship between r _i^dev and career-high rank (circle size is proportional to the number of point-games)

Table 6: Regressions of r _i^dev on the rank of players.

The group of players ranked No. 1 and No. 2 therefore exhibit an average tendency to under-alternate, although at the individual player level analysis above, we rejected serial independence for some Top 2 players both because of under- and over-alternating. Although under-alternating serves is not an equilibrium strategy, if the majority of players are over-alternating as receivers, then this would be consistent with a best-response to the population of receivers. Recall however, that no evidence was found of conditioning server randomization on the opponent’s rank, so players would have to be learning deviations at the population level. Unfortunately, this cannot be directly tested because the receivers’ actions are not easily observable. They would depend on the exact position of the player in the court (further to the left or right), also the grip they are using on the tennis racket, i.e., whether it is more appropriate for a backhand or forehand shot, and any other preparation to receive the serve whether mental or physical.