2 Models of reckless behavior

To identify the psychological processes that best describe people’s reckless behavior, YCNE evaluated several models embodying the reliance-on-small-samples hypothesis (Reference Erev and RothErev & Roth, 2014) and a so-called full-data model.Footnote ¹ The full-data model takes all previous experiences into account and deterministically predicts choice of the option that has yielded the highest average outcome. As illustrated in Figure 2, people following the full-data model should quickly develop a strong preference for the safe option as the cumulative likelihood of experiencing catastrophic events increases. However, as can also be seen, people’s actual preferences developed more moderately. Furthermore, people appeared to dislike both of the two risky options less than predicted by the full-data model. Two tendencies in the data are likely responsible for these behavioral patterns: stochasticity of choices and (as-if) underweighting of rare events. Small-sample models elegantly account for these patterns using a single mechanism: A small sample of outcomes introduces stochasticity, rendering choice proportions less extreme, as well as (as-if) underweighting, accounting for higher-than-expected preference for the risky options under taxation. Consequently, the small-sample models were found to clearly outperform the full-data model across all conditions (see YCNE Tables 1 and 2).

Figure 2: Aggregated choice proportions and predicted choice proportions of the full-data model in Experiment 1. Solid lines indicate participants’ choices and dashed lines indicate the choice probabilities predicted by the model. Error bars indicate the 95% CI.

On a qualitative level, however, it is important to note that the full-data model captured the patterns of results rather well (see also YCNE Figures 3 and 5). Moreover, the sample-size parameter κ in the small-sample models was estimated to be between 24 and 47, and the overall best-performing model was an ensemble model that averages the predictions of a two-stage sampling model with those of the full-data model. These findings suggest that models that take into account many (or even all) samples might in principle be able to accurately describe people’s behavior and are consistent with results from other decisions-from-experience paradigms, where the choice of the option with the higher average mean (also known as the natural-mean heuristic) is considered the benchmark model (Reference Wulff and van den BosWulff et al., 2018).

Figure 3: Aggregated choice proportions and predicted choice proportions of the reinforcement-learning model across the different conditions. Solid lines indicate participants’ choices and dashed lines indicate the choice probabilities predicted by the model. Error bars indicate the 95% CI.

An alternative to the full-data and small-sample models exists in recency-based models as formalized in the framework of reinforcement learning (Reference Sutton and BartoSutton & Barto, 1998). Recency-based models also produce probabilistic choices and (as-if) underweighting of rare events, however, via a different psychological mechanism. Such models assume that people keep track of a long-run reward expectation Q _i of option i that is updated at each time t with incoming reward (or punishment) R _t,i. If people observe a better-than-expected reward, they adjust Q upward and vice versa. A popular and simple implementation of this mechanism is given by the delta-rule model (Reference GershmanGershman, 2015):

In this model, the learning rate α controls the degree to which the expectations are updated. When α is constant over time, the model inevitably produces recency, which means that recent experiences receive more weight than earlier ones. The extent of recency varies with the value of α. For instance, α = .10 implies that an experience ten epochs ago retains about 38% of its original weight, whereas the same experience’s weight essentially drops down to zero under α = .90. Thus, α also controls the number of experiences that effectively influence choices, and with that (quite analogously to the small sample models), the degree of (as-if) underweighting of rare events. The value of α also has a limited effect on stochasticity; however, models of this class typically include extra parameters for additional sources of choice stochasticity.

The recency-based account can be regarded as an instance of “reliance on small samples”, yet it differs in important ways from the sampling-based models used by YCNE to implement this notion, which has implications for both theory and practice. First, the recency-based account can be considered more (cognitively) parsimonious. In contrast to sampling-based models, it does not require an explicit representation of all past experiences or a process of sampling from memory. Instead, people have only to memorize a single value Q and carry out only a minimal set of operations after each choice. Second, in contrast to the small-sample accounts, choices in the recency-based account always reflect all experienced information, even if their influence becomes negligible the further away they are. Third, whereas in sampling-based accounts each experience has equal sway in the long run, the recency-based account predicts that recent outcomes will influence choices more than earlier ones.

We assessed whether the recency-based account can accurately describe the data of YCNE, including people’s responses to varying levels of taxation (see Appendix for technical details and https://osf.io/q7pkf/ for the full analysis code). We fitted the delta-rule model to the aggregate choice proportions of YCNE’s three between-subject conditions. The model’s predictions were derived by determining, across all participants, the proportion of trials for which Q _i was highest. A single parameter (α) was used to fit, overall, 14 independent choice proportions (6 from Experiment 1, 4 from each condition from Experiment 2). A learning rate of α = .16 yielded the best fit with a resulting mean squared error of .006. Most predictions fell within the 95% confidence interval of the observed choice proportions and the model accurately accounted for the qualitative patterns of taxation (see Figure 3). Moreover, when we used the model to predict the data of one experiment on the basis of the respective other experiment, we observed mean squared errors of .006 (Experiment 1) and .010 (Experiment 2), outperforming all sampling-based models evaluated by YCNE except for the I-SAW2 model, which achieved a slightly better performance in Experiment 2 (see Table 1 for all within- and cross-experiment predictions).

Table 1: Aggregate-Level Comparison of Recency- and Sampling-based Models for the Data of Experiment 1 and 2 of YCNE

Note. MSE = mean squared error. Fit is the MSE obtained by fitting the respective model to the choice proportions of the respective experiment. Prediction is the MSE obtained by fitting the respective model to the other experiment and predicting the respective experiment’s choice proportions (in the case of non-reinforcement-learning models, the parameters were obtained by relying on other sources; see Reference Yakobi, Cohen, Naveh and ErevYakobi et al., 2020, for details). Reinforcement learning = delta-rule reinforcement-learning model. Naïve sampler = small-samples model used by Reference Yakobi, Cohen, Naveh and ErevYakobi et al. (2020) in Experiment 1. Two-stage naïve sampler = small-samples model that first eliminates one of the two riskier options and then compares the winner with the safe option, as used by Reference Yakobi, Cohen, Naveh and ErevYakobi et al. (2020) in Experiment 1. Extended two-stage naive sampler = Two-stage Inertia, Sampling and Weighting model (I-SAW2) used by Reference Yakobi, Cohen, Naveh and ErevYakobi et al. (2020) in Experiment 2.

According to these aggregate-level analyses, the recency-based account given by the delta-rule model captures the aggregate data at least as well as the sampling-based accounts. However, aggregate-level analyses always bear the risk of misrepresenting the mechanisms that actually are at work at lower levels of analysis, sometimes leading to drastically wrong conclusions (e.g., Reference Regenwetter and RobinsonRegenwetter & Robinson, 2017; Reference Wulff and van den BosWulff & van den Bos, 2018; Reference BirnbaumBirnbaum, 2011). Moreover, they can obscure crucial individual differences in both behavior and mechanism. This can be particularly problematic when a single identified mechanism serves as the basis for behavioral interventions. In the next section, we therefore use the delta-rule model to evaluate people’s behavior at the individual and trial level.

2.1 Individual differences in recency and reckless behavior

To test the recency-based account more rigorously and address possible aggregation problems, we fitted the delta-rule model separately to each individual’s trial-level choices. To achieve this, the model had to be equipped with an additional mechanism that maps subjective expectations Q to choice probabilities, accounting for the stochasticity in people’s behavior (Reference Hey and OrmeHey & Orme, 1994). We implemented an є-greedy (Reference Sutton and BartoSutton & Barto, 1998) choice rule which predicts the choice of the option with the highest subjective expectation with probability 1−є and a randomly selected option with the error probability є. In analyses reported in the Appendix, we found the є-greedy choice rule to fit participants’ behavior better than a popular alternative, the softmax choice rule, and, more importantly, to produce substantially lower parameter correlations, implying a cleaner separation of the psychological mechanisms.

Fitting separate learning rates α and error probabilities є to each individual’s choices using maximum likelihood, we observed an overall sum of Bayesian information criteria (BIC; Reference SchwarzSchwarz, 1978) of 90,101. This value was considerably lower than that of an aggregate model fitting all trial-level choices using a single learning rate α and error probability є (BIC = 109,759) and that of an aggregate baseline model assuming random guessing (BIC = 126,780). Furthermore, we found the delta-rule model to produce lower BICs for 91.1% (224 out of 246) of individuals than an individual-level baseline model.

The better performance of the individual-level models suggests meaningful individual differences, which also came through clearly in the distribution of individual-level parameter estimates: Learning rates followed a bimodal distribution (see Figure 4a), such that a vast majority of people fell into two clearly distinct groups: myopic and emmetropic learners. Myopic learners (32%) are characterized by a high learning rate of α = [.85, 1], implying that only the last one or two observations form the basis of their choices. Emmetropic learners (64%), on the other hand, are characterized by a low learning rate of α = (0, .15], implying that even the most distant experiences are still factored into their choices. The distribution of error rates, by contrast, was clearly unimodal and reflected a maximization rate of 70%, which is in line with previous research (Reference Harless and CamererHarless & Camerer, 1994). Furthermore, error rates barely covaried with learning rates (r = .09), suggesting that the estimated learning rates reflect systematic differences in people’s tendency to focus on recent experiences and are not merely the result of identifiability problems known for many computational models (Reference Spektor and KellenSpektor & Kellen, 2018).

Figure 4: (a) Distribution of individual-level learning rates α and error rates є across the three between-subject conditions. Parameters were estimated using maximum-likelihood estimation. Shaded areas represent classification according to 0 ≤ α ≤ .15 (emmetropic) or .85 ≤ α ≤ 1 (myopic). (b) Relative weights of past experiences implied by the estimated learning rates. Each line represents one individual and the weight attached to each observation (up to 12 observations into the past).

To evaluate whether the individual differences in learning rates reflect clear and systematic differences in behavior, we plotted the modal choices of all individuals ordered by their estimated learning rate, separately for all conditions (Figure 5). This analysis revealed that whereas most emmetropic individuals quickly learned to choose the safe option (dark blue), especially under high taxation, most myopic learners exhibited persistent preferences for whichever risky options offered the better outcome most of the time (gray = moderate risk, yellow = high risk). These patterns were most pronounced in the presence of an attractive safe option in Experiment 2.

Figure 5: Modal choices in bins of 10 trials for each participant in each experiment, ordered by the learning rate from low (top) to high (bottom). Dark blue represents a modal choice of the safe option, gray represents of the low-risk option, and yellow of the high-risk option. Individuals are grouped according to their classification, emmetropic (0 ≤ α ≤ .15), myopic (.85 ≤ α ≤ 1) or unclassified. Crosses indicate that individuals suffered an accident in the corresponding bin.

The sustained preference for risky options observed for myopic individuals suggests that they might not have learned at all from their experiences. However, using a mixed-effects regression accounting for participant random effects nested within condition, we found preferences for the safe option to be substantially elevated immediately after the observation of an accident (OR = 2.59, p < .001) , but not one (OR = 0.82, p = .45) or two (OR = 1.14, p = .58) trials later, relative to all other trials. Thus, consistent with the high learning-rates estimates, myopic individuals learned about and reacted to accidents, but then discounted them very quickly as they continued. Emmetropic individuals, by contrast, showed an increased preference for the safe option not only immediately after the accident (OR = 2.30, p < .001), but also one (OR = 1.38, p = .017) and two (OR = 1.37, p = .026) trials later. Furthermore, consistent with the lower learning rate of emmetropic individuals, preference for the safe option right after the accident was somewhat less pronounced than for myopic individuals.

The existence of two groups of individuals has critical implications for our understanding of reckless behavior in the face of taxation. Considering only moderate- and high-taxation situations, the data showed that myopic individuals experienced, on average, 3.08 accidents, whereas emmetropic individuals experienced only 1.82 accidents (see Figure 6). More importantly, compared to moderate taxation, myopic individuals suffered 0.8 accidents more under high taxation, whereas emmetropic individuals suffered only 0.36 more accidents. These analyses suggest that myopic individuals not only suffered considerably more accidents in general, but also that they were much more susceptible to the negative effects of over-taxation.

Figure 6: Distribution of experienced accidents, split by taxation amount. Individuals are grouped according to their classification, emmetropic (0 ≤ α ≤ .15) or myopic (.85 ≤ α ≤ 1). Shaded areas in the violin plots indicate the central 50% interval.