2.2. Results and discussion

We estimated participants’ expertise based on the independent location judgments for the 17 cities that were shown without a previous judgment. As an operationalization of expertise, we computed the mean of the Euclidean distances between the location judgments and the correct positions for each participant. To ensure that larger values indicate higher expertise, we multiplied the average distances by $-1$ . This measure of expertise was included as a continuous predictor in the analyses below. To assess the validity of this task-related expertise measure, we computed the correlation with the self-reported knowledge about the location of European cities. The large, positive correlation of $r = 0.43$ ( $t(279) = 7.91, p < .001$ ) indicates a satisfactory convergent validity.

We tested the effects of participants’ expertise, presented deviation, and their interaction on change probability using a generalized linear mixed model. The model used a logistic link function to predict the decision whether to adjust (= 1) or maintain (= 0) a presented judgment. We standardized our expertise measure for all analyses. Moreover, we applied a mean-centered linear contrast with values $-1.5, -0.5, 0.5$ , and 1.5 for the four levels of deviations between presented and correct locations. Standardizing the expertise measure and applying a mean-centered contrast to the presented deviations allows us to interpret the additive terms in the model as main effects and the multiplicative term as interaction. The model accounts for the nested data structure by including random intercepts for items and participants (Pinheiro and Bates, Reference Pinheiro and Bates2000).Footnote ¹

Figure 3A displays the average change probability for cities depending on participants’ expertise and presented deviation. Table 1 shows the estimated regression coefficients. As expected, the linear contrast of presented deviation was positive and significant ( $\beta = 0.444$ , $CI = [0.392,0.495]$ ). The model also indicated a significant positive relationship between expertise and change probability ( $\beta = 0.622$ , $CI = [0.202,1.042]$ ). Furthermore, we found a significant interaction between expertise and presented deviation ( $\beta = 0.218$ , $CI = [0.165,0.272]$ ).

Figure 3 Change probability and improvement of presented judgments in Experiment 1. Note: Points display empirical means with error bars showing the corresponding 99% between-subjects confidence intervals. Violin plots indicate the distribution of the dependent variable aggregated across items within each person. The plot for improvement only includes presented judgments that were adjusted by participants.

Table 1 Fixed-effects coefficients of the fitted (generalized) linear mixed models

Note: CI = confidence interval. All models included crossed random effects for participants and items. The models for change probability (0 = no adjustment, 1 = adjustment) assumed a logistic link function.

However, contrary to our predictions, Figure 3A shows that individuals with higher expertise changed correct judgments more frequently than individuals with lower expertise. The high change probability for accurate presented judgments may be due to demand effects. In fact, participants did not know that 25% of the presented judgments had a perfect accuracy. Hence, they may not have expected that optimal behavior required maintaining a substantial proportion of the presented judgments.

Next, we examined the effects of presented deviation, expertise, and their interaction on the improvement of presented judgments. As dependent variable, we computed the improvement by subtracting the accuracy of the presented judgments from that of the revised judgments. For this purpose, accuracy was defined as the Euclidean distance between a judgment and the correct position. For the presented judgments, accuracy is thus equivalent to the presented deviation (i.e., a distance of 0, 40, 80, or 120 pixels to the correct position). Positive (negative) values of the improvement measure imply that a revised judgment is more (less) accurate than the presented judgment. Since participants could decide whether to adjust or maintain presented judgments, we only included trials in the analysis in which participants actually adjusted the presented judgments.Footnote ²

We used improvement as dependent variable in a linear mixed model with (standardized) expertise and presented deviation (linear contrast) as independent variables and added random intercepts for participants and items. Figure 3B displays the average improvement in judgment accuracy, whereas Table 1 shows the estimated regression coefficients. As expected, improvement increased for larger presented deviations ( $\beta = 32.289$ , $CI = [31.398,33.181]$ ) and higher expertise ( $\beta = 15.545$ , $CI = [13.492,17.598]$ ). In line with the expected pattern shown in Figure 1, the model also showed a significant interaction such that more knowledgeable participants showed a steeper increase in improvement than less knowledgeable participants ( $\beta = 3.819$ , $CI = [2.930,4.707]$ ).

3.2. Results and discussion

To test whether the manipulation was successful, we examined whether experts showed a higher accuracy than novices for the five items shown without a previous judgment. As a measure of accuracy, we computed the percentage error for each item, defined as the absolute difference between the judgment and the correct answer divided by the correct answer and multiplied by 100. Using this measure allowed us to analyze average accuracy across items even though the number of dots varied from 100 to almost 600. Including only the independent judgments for the five items in the manipulation-check phase, we fitted a linear mixed model with condition as independent variable (dummy-coded with 1 = expert condition, 0 = novice condition). We found a significant negative effect of condition on the percentage error ( $\beta = -16.214$ , $CI = [-23.645,-8.784]$ , $t(117.16) = -4.277$ , $p < .001$ ). The effect of the manipulation of expertise was large with novices showing a mean error of 35.81% and experts showing a mean error of only 19.59%.

We first tested the expected patterns for change probability shown in Figure 1A. While expertise was coded with a dummy contrast (1 = expert condition, 0 = novice condition), we used two orthogonal, centered contrasts for presented deviation. Since the presented deviation includes both over- and underestimation of the correct answer, we used a centered, V-shaped contrast (values: $4, -1, -6, -1, 4$ ) to test whether change probability is lowest for correct presented judgments but increases the more presented judgments deviate from the correct judgment. The regression coefficient of this contrast is positive for a V-shape, negative for an inverse V-shape, and zero in the absence of such an effect. Participants, however, may not equally often adjust over- and underestimated presented judgments. Hence, we also included a centered, linear contrast (values: $2, 1, 0, -1, -2$ ) which tests whether the slope of the V-shaped contrast differs between these two cases. A value of zero indicates a symmetric V-shape, whereas a positive (negative) coefficient indicates a steeper (less steep) slope for underestimated than for overestimated presented judgments.

Figure 5A illustrates the average change probability including 99% confidence intervals. Change probabilities followed the expected V-shape as a function of the presented deviation. Moreover, experts generally changed items more frequently than novices. This impression was confirmed by a significant, positive V-shaped contrast for presented deviation in the linear mixed model ( $\beta = 0.208$ , $CI = [0.160,0.256]$ ) and a significant positive effect of condition ( $\beta = 0.570$ , $CI = [0.169,0.972]$ ) (Table 1). Moreover, we found a positive linear contrast indicating a smaller effect of presented deviation (i.e., a smaller slope of the V-shape) for underestimated than for overestimated judgments ( $\beta = 0.312$ , $CI = [0.176,0.448]$ ). As expected, the interaction between condition and the V-shaped contrast of the presented deviation was positive, meaning that experts better distinguished between accurate and inaccurate judgments ( $\beta = 0.056$ , $CI = [-0.003,0.114]$ ). However, in contrast to our predictions, participants in the expert condition adjusted correct presented judgments more frequently than participants in the novice condition (Figure 5). Besides demand effects, this could be due to the raster-scanning strategy providing only an approximate estimate of the actual number of presented dots. While the approximation leads to improved judgments, it is still prone to errors. Hence, for already accurate presented judgments, participants may have adjusted the judgment even though it was already correct. Lastly, we found a significant interaction between condition and the linear contrast of presented deviation indicating that the V-shape was more symmetric (with respect to over- and underestimated judgments) for experts than for novices ( $\beta = -0.329$ , $CI = [-0.503,-0.155]$ ).

Figure 5 Change probability and improvement of presented judgments for Experiment 2. Note: Points display empirical means with error bars showing the corresponding 99% between-subjects confidence intervals. Violin plots show the distribution of the dependent variable for participants aggregated across items. The plot for improvement only includes trials in which presented judgments were adjusted by participants.

Next, we tested whether expertise, presented deviation, and their interaction affect the improvement of presented judgment. Similar to Experiment 1, improvements were computed as the difference between the percentage errors of the presented and the revised judgment. Again, positive (negative) values indicate that presented judgments are improved (worsened). We used a linear mixed model to predict the improvement of presented judgments using the same contrasts for condition and presented deviation as in the model for change probability. Similar as in Experiment 1, we only included trials in which participants adjusted the presented judgment.Footnote ⁴ Figure 5B displays the mean improvement of presented judgments including 99% confidence intervals and violin plots; Table 1 shows the estimated regression coefficients. As expected, presented deviation had a significant V-shaped effect on improvement such that presented judgments were improved more the larger the deviation from the correct judgment was ( $\beta = 6.782$ , $CI = [6.323,7.240]$ ). Compared with the novice condition, participants in the expert condition improved presented judgments more if there was room for improvement and also worsened correct judgments less ( $\beta = 8.827$ , $CI = [4.458,13.196]$ ). Furthermore, the model showed a positive interaction between condition and the V-shaped contrast for presented deviation ( $\beta = 0.647$ , $CI = [0.191,1.104]$ ). These results are closely in line with the expected patterns derived from our theoretical framework (Figure 1).

4.2. Results and discussion

We computed the same dependent measures as in Experiment 2. As a manipulation check, we fitted a linear mixed model to test whether the independent judgments for the five items during the manipulation-check phase were more accurate for experts than for novices. As expected, the expertise manipulation leads to a decrease in the percentage error ( $\beta = -28.898$ , $CI = [-36.319, -21.477]$ , $t(117.16) = -4.277$ , $p < .001$ ), indicating that judgments of experts were twice as accurate as those of novices ( $\text {mean error} = 27.46$ % vs. $\text {mean error} = 56.36$ %, respectively).

4.2.1. Effects of one step in sequential collaboration

Replicating the analyses of Experiment 2, we first tested the effects of presented deviation, expertise, and their interaction on change probability and improvement of presented judgments in a single sequential step. We analyzed change probabilities in the sequential phase by including only those participants who saw preselected judgments (but not those who saw the judgments of other participants). Similarly as in Experiment 2, we fitted a generalized linear mixed model to predict whether a presented judgment was changed using the same contrasts for presented deviation and condition.

Figure 6A displays the average change probabilities in Experiment 3. As expected, the V-shaped effect of presented deviation emerged, with a steeper slope for underestimated than for overestimated judgments. In contrast to Experiment 2, the plot does not indicate a main effect of condition. These impressions were supported by the model-based analysis (Table 1) showing a significant V-shaped contrast of presented deviation ( $\beta = 0.141$ , $CI = [0.116, 0.167]$ ), but no effect of experimental condition ( $\beta = 0.052$ , $CI = [-0.297, 0.401]$ ). The linear contrast of deviation was also significant, indicating a steeper slope for the left than the right limb of the V-shaped effect ( $\beta = 0.367$ , $CI = [0.292,0.441]$ ). Most importantly for sequential collaboration, Figure 6A illustrates the interaction of expertise and presented deviation on change probability. In line with our expectations, experts adjusted presented judgments less often than novices if judgments were already correct, but more often if judgments deviated by $\pm 70\%$ from the correct answer. In the mixed model, the corresponding interaction term of condition and the V-shaped contrast was significant ( $\beta = 0.075$ , $CI = [0.040, 0.111]$ ). As described in the Introduction, given that we predicted and found a crossed interaction (Figure 1), the absence of a main effect of expertise may simply be due to a limited range of presented deviations.

Figure 6 Change probability, and percentage improvement of presented judgments for Experiment 3. Note: Points display empirical means with error bars showing the corresponding 99% between-subjects confidence intervals. Violin plots show the distribution of the dependent variable for participants aggregated across items. The plot for improvement only includes trials in which presented judgments were adjusted by participants.

Next, we tested the effect of expertise and presented deviation on the improvement of presented judgments. For this analysis, we only included participants at the first chain position.Footnote ⁵ Figure 6B displays the improvement of presented judgments which followed a V-shaped pattern, with already correct presented judgments being slightly worsened. We fitted a linear mixed model for the percentage improvement again using the same contrasts for condition and presented deviation. In line with our hypotheses, the model showed a V-shaped effect of presented deviation ( $\beta = 6.653$ , $CI = [6.290,7.016]$ ), a main effect of condition, indicating more improvement of judgments provided by participants in the expertise than in the novice condition ( $\beta = 16.518$ , $CI = [10.701,22.336]$ ), but no interaction of condition and presented deviation ( $\beta = -0.024$ , $CI = [-0.527,0.479]$ ). Moreover, the interaction between the linear slope for presented deviation and expertise was significant, indicating a steeper slope for the left than the right limb of the V-shape for experts compared with novices ( $\beta = -1.516$ , $CI = [-2.745,-0.287]$ ).

4.2.3. Effects on chains of sequential judgments

We tested the expected impact of experts at the chain level based on data of participants at the second chain position. We first fitted a generalized linear mixed model to predict whether change probability for the second contributor in a sequential chain differed between the four compositions of sequential chains (i.e., novice–novice, expert–novice, novice–expert, or expert–expert). For this purpose, we implemented two contrasts: The first compared novice–novice chains against expert–novice chains, whereas the second compared novice–expert chains against expert–expert chains. In line with our expectations, change probability was larger for experts correcting novices than for expert correcting other experts ( $\beta = 0.326$ , $CI = [0.063,0.588]$ , $z = 2.432$ , $p = .015$ ). In contrast, novices changed the entries of experts and novices similarly frequently ( $\beta = 0.136$ , $CI = [-0.098,0.370]$ , $z = 1.140$ , $p = .254$ ). These patterns are illustrated in Figure 7A.

Figure 7 Change probability, improvement, and accuracy of judgments for the four compositions of sequential chains in Experiment 3. Note: Points display empirical means with error bars showing the corresponding 99% between-subjects confidence intervals. Violin plots illustrate the distribution of changes and judgments aggregated for each participant across items.

To test how novices and experts improve each other’s judgments, we only considered judgments that were adjusted by participants at the second chain positionFootnote ⁶ and implemented a linear mixed model with percentage improvement as dependent variable and composition of sequential chain as predictor. We additionally used Helmert contrasts to test our expectations concerning the improvement of each other’s judgments by contrasting the novice–expert chain with all other chains, the expert–novice chain with the novice–novice and expert–expert chains, and, lastly, testing the novice–novice and expert–expert chains against each other. Figure 7B displays the empirical means for percentage improvement for all compositions of sequential chains. In line with this pattern, we found a significant Helmert contrast for the novice–expert sequential chain ( $\beta = 3.760$ , $CI = [1.264,6.256]$ , $t(215.08) = 2.952$ , $p = .004$ ). Furthermore, we found a significant contrast for the expert–novice chain ( $\beta = -3.852$ , $CI = [-7.227,-0.477]$ , $t(221.47) = -2.237$ , $p = .026$ ). In fact, Figure 7 shows that novices worsen judgments of experts. Lastly, we did not find a significant difference in improvement between expert–expert and novice–novice groups ( $\beta = -5.965$ , $CI = [-12.137,0.208]$ , $t(222.70) = -1.894$ , $p = .060$ ). Overall, these findings are in line with our expectations that experts improve judgments of novices most, novices worsen judgments of experts, and only little improvement can be found when novices correct novices and experts correct experts.

Finally, we tested which composition of sequential chains lead to the most accurate estimates at the end of a sequential chain. We fitted a linear mixed model with percentage error of the final judgment in a sequential chain as dependent variable and chain composition as predictor. Depending on whether the two participants in each chain adjusted the presented judgment, the final judgment could either be the presented judgment, the judgment entered by the first participant, or the judgment entered by the second participant. We used a linear contrast to test whether percentage error decreases, or equivalently, whether accuracy increases across chain compositions.

As expected, we found a significant linear trend between chain composition and accuracy of the final estimates ( $\beta = 5.779$ , $CI = [2.199,9.359]$ , $t(216.79) = 3.164$ , $p = .002$ ). Figure 7C illustrates this pattern with the percentage error being largest for sequential chains with two novices and smallest for sequential chains with two experts. Regarding mixed sequential chains which included both an expert and a novice, the percentage error was smaller when chains ended rather than started with an expert. Overall, the more and the later experts enter sequential chains, the better the final estimates.