Free choice preference across different extrinsic reward probabilities

In experiment 1 (n = 58 subjects), we varied the overall expected value by varying the probability of extrinsic reward delivery (P) across different blocks of trials. These probabilities ranged from 0.5 to 1 across the blocks (i.e., low to high), and the programmed probabilities in free and forced 2^nd-stage rewards were equal (Fig 2A). For example, in high probability blocks, we set the probabilities of the forced terminal action and of one of the free terminal actions (a1) to 1 and set the probability of the second free terminal action (a2) to 0. Therefore, the maximum expected value was equal for the free and forced options.

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Fig 2. Choice preference across different average extrinsic reward probabilities.

A. Experiment 1 task design where maximal extrinsic reward probabilities increased equally across free and forced options. B. Subject preference for free option during 1^st-stage. Colored points indicate individual subject mean choice preference per block, plotted against the average obtained rewards. Black diamonds indicate the average of subject means per block. Line indicates the estimated choice preference from a GAMM, with 95% CI. C. Dynamics of free option preference across test phase blocks for low (left), medium (middle) and high (right) extrinsic reward probabilities. Each point represents the average free option preference as a function of trial within a block (smoothed with a 2-point moving average). Diamonds: as in B. Lines indicate the estimated choice preference from a GAMM, with 95% CI. D to E. Dynamics of the selection of the most rewarded 2^nd-stage targets in free option for low (left), medium (middle) and high (right) blocks during the training (D) and test (E) phases. Note that in left panels, the extrinsic reward probability is equal for the two 2^nd-stage targets (P = 0.5) and that in the right panel (P = 1), 24 trials were sufficient to train the subjects (see Materials and Methods). For P > 0.5, choice proportion indicates choice of the fractal associated with the higher reward probability. Triangles represent the final average selection at the end of the training phases. Lines: as in C.

https://doi.org/10.1371/journal.pcbi.1010551.g002

Subjects chose to choose more frequently, selecting the free option in 64% of test trials on average (Fig 2B). The level of preference did not differ significantly across blocks (low = 65%, medium = 62%, high = 66%; χ² = 4.49, p = 0.106; see Fig A in S1 Text for individual subject data). We also examined 1^st-stage reaction times (RT), which were not significantly different across different reward probabilities (estimated trend = 0.054, 95% CI = [-0.062, 0.175], p = 0.370; Fig B(A) in S1 Text). We found that subjects immediately expressed above chance preference for the free option (Fig 2C) despite never having actualized 1^st-stage choices during training. Looking within a block, we found that subjects’ preference remained constant across trials in medium and high reward probability blocks (χ² = 0.7, p = 0.215 and χ² = 0, p = 0.664 for nonlinear smooth by trial deviating from a flat line, respectively; Fig 2C, middle and right panels). In low probability blocks, subjects started with a lower choice preference that gradually increased to match that observed in the medium and high probability blocks (χ² = 13.2, p = 0.001 for nonlinear smooth by trial; Fig 2C left panel). The lower reward probability may have prevented subjects from developing accurate reward representations by the end of the training phase, which may have led to additional sampling of the three 2^nd-stage targets (two in free and one in forced) in the beginning of the test phase.

Second-stage performance following free selection

We investigated participants’ 2^nd-stage choices following free selection to exclude the possibility that choice preference arose because reward contingencies had not been learned. During the training phase, when P>0.5, participants quickly learned to choose the most rewarded fractal targets (at P = 0.5, all fractal targets were equally rewarded) (Fig 2D). During the test phase, participants continued to select the same targets (Fig 2E), confirming stable application of learned contingencies (p > 0.1 for nonlinear smooth by trial deviating from a flat line for all blocks).

Choice preference was not explained by subjects obtaining more extrinsic rewards following selection of free compared to forced options. Obtained reward proportions were not significantly different in the low (following selection of free vs. forced, 0.493 vs. 0.509, χ² = 0.622, p = 0.430) or medium (0.730 vs. 0.750, χ² = 1.83, p = 0.176) probability blocks. In contrast, in high probability blocks, subjects received significantly fewer rewards on average after free selection than after forced selection (0.989 vs. 1, χ² = 9.97, p = 0.002). In this block, reward was fully deterministic, and forced selection always led to a reward, whereas free selections could lead to missed rewards if subjects chose the incorrect target. Choice preference in the deterministic condition cannot be explained by post-choice revaluation, which appears to occur only after choosing between closely valued options [30,34]. In this condition there is no cognitive dissonance to resolve when the choice is between a surely rewarded action and a never rewarded action.

Trading extrinsic rewards for choice opportunities

Since manipulating the overall expected reward did not alter choice seeking behavior at the group-level, we investigated the effect of changing the relative expected reward between 1^st-stage options. In experiment 2, we tested a new group of 36 subjects for whom we decreased the relative objective value of the free versus forced options. This allowed us to assess the point at which these options were equally valued and potentially reversed to favor the initially non-preferred (forced) option (Fig 3A). Thus, we assessed the value of choice opportunity by increasing the reward probabilities following forced selection (block 1: P_forced = 0.75; block 2: P_forced = 0.85; block 3: P_forced = 0.95), while keeping the reward probabilities following free selection fixed (P_free|a1 = 0.75, P_free|a2 = 0.25 for all blocks).

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Fig 3. Choice preference across different relative extrinsic reward probabilities.

A. Experiment 2 task design where extrinsic reward probably is always at P = 0.75 for the highly rewarded target in free options but varied from 0.75 to 0.95 across 3 blocks for forced options. B. Subject preference for free option during 1^st-stage. Colored points indicate individual subject mean choice preference per block, plotted against the average rewards obtained in forced option. Black diamonds indicate the average of subject means per block. Line indicates the estimated choice preference from a GAMM, with 95% CI. C. Dynamics of free option preferences across test phase blocks when extrinsic reward probabilities of forced options were set at 0.75 (left), 0.85 (middle) and 0.95 (right). Each point represents the average free option preference as a function of trial within a block. Diamonds: as in B. Lines indicate the estimated choice preference from a GAMM, with 95% CI. D to E. Dynamics of the selection of the most rewarded 2^nd-stage targets in free option when extrinsic reward probabilities of forced options are set at 0.75 (left), 0.85 (middle) and 0.95 (right) during the training (D) and test (E) phases. Triangles represent the final average selection at the end of the training phases. Lines: as in C.

https://doi.org/10.1371/journal.pcbi.1010551.g003

As in experiment 1, we found that subjects preferred choice when the extrinsic reward probabilities of the free and forced options were equal (block 1: 68% 1^st-stage choice in favor of free; Fig 3B, dark green). Increasing the reward probability associated with the forced option significantly reduced choice preference (χ² = 11.8, p < 0.001, Fig 3B) to 49% (block 2) and 39% where the preference for free versus forced choice was reversed (block 3; see Fig C(A) in S1 Text for individual subject data). We estimated the population average preference reversal point at P_forced = 0.88, indicating that indifference was obtained on average when the value of the forced option was 17% greater than that of the free. We found that subjects’ preference remained constant across trials when reward probabilities were equal (p > 0.1 for nonlinear smooth by trial; Fig 3C, left panel). Although reduced overall, the selection of the free option also did not vary significantly across trials in blocks 2 and 3 (p > 0.1 for nonlinear smooths by trial, respectively). Furthermore, as in experiment 1, subjects acquired preference for the most rewarded 2^nd-stage targets during the learning phase (Fig 3D) and continued to express this preference during the test phase in all three blocks (Fig 3E). Thus, the decrease in choice preference was not related to failure to learn the reward contingencies during the training phase. Finally, RTs decreased as a function of P_forced increased (estimated trend = -0.367, 95% CI = [-0.694, -0.024], p = 0.020; Fig B(B) in S1 Text).

Although decreasing the relative value of the free option reduced choice preference, most subjects did not switch exclusively to the forced option. Even in block 3, where the forced option was set to be rewarded most frequently (P_forced = 0.95 versus P_free = 0.75), 32/36 subjects selected the free option in a non-zero proportion of trials. Since exclusive selection of the forced option would maximize extrinsic reward intake, continued free selection indicates a persistent appetency for choice opportunities despite their diminished relative extrinsic value.

We also asked subjects in experiment 2 to estimate the extrinsic reward probabilities associated with each 2^nd-stage fractal image. They did so by placing a cursor on a visual scale from 0 to 100 after completing the test phase of each condition. We found that the subjects were relatively accurate at estimating the reward probabilities for fractals in both free and forced trials (Fig 4A), with mild underestimation (overestimation) at higher (lower) reward probabilities (estimated trend forced = 0.749, 95% CI = [0.683, 0.816], t = 22.2, p < 0.001; estimated trend free = 0.735, 95% CI = [0.640, 0.831], t = 15.2, p < 0.001), which did not differ significantly between these trial types (estimated trend difference = 0.014, 95% CI = [-0.102, 0.130], t = 0.237, p = 0.812). This suggests that preference for the free option was not due to differential distortion in estimating the frequency of rewards (Fig 4B). In addition, subjects did not overestimate the worst reward probability sufficiently to explain their preference. Note that by design such an overestimated probability must be greater than or equal to the best outcome reward probability in order to exceed or equal the expected value of the forced option. Say, for a true best outcome reward probability P = 0.75, the expected value for the forced option is 0.75 since the computer always selects the best target, and a subject would have to believe that the worst outcome probability in the free option is ≥ 0.75. This is not the case, and the average estimate for the worst rewarded fractal (mean = 0.35) is significantly below the 0.75 needed to match the expected value of the forced option (t = -20.1, p < 0.001). Finally, we also asked subjects to estimate the reward probability for the 2^nd-stage fractals that were never chosen by the computer in the forced option (Fig 4A, putative programmed reward probabilities = 0.25, 0.15, 0.05). These probability estimations were not based on direct experience, and subjects appear to have inferred that it was 1-P from their experience in free trials, or alternatively this may be the consequence of a kind of counterfactual prior belief [35].

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Fig 4. Subject estimates of extrinsic reward probabilities in experiment 2.

A. Each circle (forced) or square (free) represents the average estimate of each 2^nd-stage images experienced or viewed by the subjects across the three blocks. The estimates for fractals in the free option were averaged across the blocks but were similar both for the poorly rewarded targets (0.39, 0.35 and 0.32 for P_forced = 0.75, 0.85 and 0.95 respectively) and the highly rewarded targets (0.73, 0.70 and 0.73 for P_forced = 0.75, 0.85 and 0.95 respectively)). Black lines with shading indicate the estimated trends from a GLMM, with 95% CI. B. Same as in A but only for the highly rewarded targets (i.e., the most selected, see Fig 3). Note that in contrast to A., the abscissa in B. refers to the maximal reward probability for the forced option. P_free did not vary significantly (estimated trend = -0.019, 95% CI = [-0.331, 0.293], p = 0.902), consistent with the maximal reward probability for the free option being constant at 0.75. Black lines with shading indicate the estimated trends from a GLMM, with 95% CI.

https://doi.org/10.1371/journal.pcbi.1010551.g004

Reinforcement-learning model of choice seeking

We next sought to explain individual variability in choice behavior using a value-based decision-making framework. We first used mixed logistic regression to examine whether rewards obtained from 2^nd-stage actions influenced 1^st-stage choices. We found that obtaining a reward on the previous trial significantly increased the odds that subjects repeated the 1^st-stage selection that ultimately led to that reward (odds ratio rewarded/unrewarded on previous trial: 1.72, 95% CI = [1.46, 2.03], p < 0.001). This suggest that subjects may continue to update their extrinsic reward expectations based on experience during the test phase. We therefore leveraged temporal-difference reinforcement learning (TDRL) models to characterize choice preference.

We fitted TDRL models to individual data using two distinct features to capture individual variability across different extrinsic reward contingencies. The first feature was a free choice bonus added to self-determined actions as an intrinsic reward. This can lead to overvaluation of the free option via standard TD learning. The second feature modifies the form of the future value estimate used in the TD value iteration, which in common TDRL variants is, or approximates, the best future action value (Q-learning or SARSA with softmax behavioral policy, respectively). We treated both Q-learning and SARSA together as optimistic algorithms since they are not highly discriminable with our data (Figs D-E in S1 Text). We compared this optimism with another TDRL variant that explicitly weights the best and worst future action values (Gaskett’s β-pessimistic model [36]), which could capture avoidance of choice opportunities through increased weighting of the worst possible future outcome (pessimistic risk attitude). For example, risk is maximal in the high reward probability block in experiment 1 since selection of one 2^nd-stage target led to a guaranteed reward (best possible outcome) whereas selection of the other target led to guaranteed non-reward (worst possible outcome).

We found that TDRL models captured choice preference across subjects and conditions (Fig 5A; see also Fig E in S1 Text). For 80% (33/41) of subjects in experiment 1 who preferred the free option on average (>50% across all trials), the best model incorporated overvaluation of rewards obtained from free actions (Fig 5B, Table A in S1 Text). Therefore, optimistic or pessimistic targets alone were insufficient to explain individual choice preference across different extrinsic reward contingencies. Since some subjects preferred the forced option for one or more experimental conditions (Fig A in S1 Text), we examined whether individual parameters from the fitted TDRL models were associated with choice preference. We did not find significant correlations of average choice preference with that 2^nd-stage learning rates (r = 0.140, t = 1.02, p = 0.311), softmax inverse temperatures (r = 0.033, t = 0.245, p = 0.807) or tendencies to repeat 1^st-stage choices (r = 0.200, t = 1.54, p = 0.128). We did find that the magnitude of the free choice bonus was significantly associated with increasing choice preference (r = 0.370, t = 2.94, p = 0.005, Fig 5C). We also found a significant correlation with the relative weighting between the worst and best possible outcomes in the β-pessimistic target (r = 0.340, t = 2.69, p = 0.009), with increasing weighting of the best outcome (β→1, see Material and Methods) being associated with increasing average choice preference. The pessimistic target best fitted about 28% (16 of 58) of the subjects in experiment 1, and most pessimistic subjects (14 of 16) were best fitted with a model including a free choice bonus to balance risk and decision attitudes across reward contingencies. In experiment 1, we introduced risk by varying the difference in extrinsic reward probability for the best and worst outcome following free selection. The majority of so-called ‘pessimistic subjects’ preferred choice when extrinsic reward probabilities were low, but their weighting of the worst possible outcome significantly decreased this preference as risk increased (Fig 5D, pink). Thus, the most pessimistic subjects avoided the free option despite rarely or never selecting the more poorly rewarded 2^nd-stage target during the test phase.

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Fig 5. Reinforcement learning models capture individual choice preference.

A. Free choice proportions predicted by the winning model plotted against observed free choice proportions for each condition for each subject in experiment 1. B. Obtained free choice proportion as a function of model error, averaged over all conditions. For subjects where the selected model did not include a free choice bonus, only one symbol (X) is plotted. For subjects where the best model included a free choice bonus, two symbols are plotted and connected by a line. Filled symbols represents the fit error with the selected model, and the open symbols represents the next best model that did not include a free choice bonus. C. Bonus coefficients increase as a function of subjects’ preference for free options irrespectively of the target policy they used when performing the task. Choice preference from low probability blocks (P = 0.5). Filled symbols indicate that the best model included a free choice bonus. Open symbols indicate that the best model did not include a free choice bonus, and the bonus value plotted is taken from the best model fit with an added free choice bonus. Line illustrates a generalized additive model smooth. D. Pessimistic subjects significantly decreased their free option preference as a function of extrinsic reward probabilities (estimated trend = -4.58, 95% CI = [-7.45, -1.71], p = 0.002). This decrease was significantly different from optimistic subjects (z = -4.81, p < 0.001), who increased their choice preference (estimated trend = 3.76, 95% CI = [1.94, 5.57], p < 0.001). Symbol legend from C applies to the small points representing individual means in D. Error bars represent 95% CI from bootstrapped individual means.

https://doi.org/10.1371/journal.pcbi.1010551.g005

We also fitted the TDRL variants to individual data from experiment 2 and found that a free choice bonus was also necessary to explain choice preference across extrinsic reward contingencies in that experiment. Five subjects (of 36) were best fitted using the β-pessimistic target (see Fig F in S1 Text) although this may be a conservative estimate since we did not vary risk in experiment 2.

An alternative model for choice preference is a 1^st-stage choice bias. While a bias towards the free option can generate choice preference, a key difference is that a free choice bonus can lead to altered action-value estimates since the inflated reward enters into subsequent value updates to modify Q-values. A bias, on the other hand, can generate free choice preference but will not enter directly into subsequent value updates (hence it will not directly affect action-value estimates). Our initial decision to implement a free choice outcome bonus was motivated by prior experiments showing that cues associated with reward contingencies learned in a free choice context were overvalued compared to cues associated with the same reward contingencies learned in a forced choice context [5,37]. We found that free choice outcome bonus fits our data better than a softmax bias (Fig G in S1 Text), suggesting that most subjects may update action-values following free and forced selections rather than applying a static bias.

Influence of action-outcome coherence on choice seeking

We next asked whether choice preference was related to personal control beliefs. To do so, we manipulated the coherence between an action and its consequence over the environment. In experiment 3, we tested the relationship between preference for choice opportunity and the physical coherence of the terminal action by directly manipulating the controllability of 2^nd-stage actions. We modified the two-stage task to introduce a mismatch between the subject’s selection of the 2^nd-stage target and the target ultimately displayed on the screen by the computer (Fig 6A and Materials and Methods section). We did this by manipulating the probability that a 2^nd-stage target selected by a subject would be swapped for the 2^nd-stage target that had not been selected. That is, on coherent trials, a subject selecting the fractal on the right side of the screen would receive visual feedback indicating that the right target had been selected. On incoherent trials, a subject selecting the fractal on the right side would receive feedback that the opposite fractal target had been selected (i.e., the left target).

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Fig 6. Choice proportion across different levels of action-outcome incoherence.

A. Experiment 3 task design using seven-state task design where we manipulated the incoherence. We added an additional state following the forced option in order to manipulate the incoherence in both free and forced options. Dashed arrows represent potential target swaps on incoherent trials, the probability of which varied from 0 to 0.3 across different blocks. At incoherence = 0, the 2^nd-stage target presented to the subject matched their selected target. In this task version an initial light red V-shape was associated with the target initially selected by the subject and was then changed to darker red either above the same target (i.e., overlap on coherent trials) or above the other target ultimately selected by the computer (i.e., incoherent trials). Extrinsic reward probabilities for all the 2^nd-stage targets were set at P = 0.75. B. Subject preference for free option during 1^st-stage. Colored points indicate individual subject mean choice preference per block, plotted against the incoherence level. Black diamonds indicate the average of subject means per block. Line indicates the estimated choice preference from a GAMM, with 95% CI. C. Dynamics of free option preference across test phase blocks for incoherence set at 0 (i.e., none, left), 0.15 (i.e., medium, middle) and 0.30 (i.e., high, right). Each point represents the average free option preference as a function of trial within a block. Diamonds: as in B. Lines indicate the estimated choice preference from a GAMM, with 95% CI. D, E. Dynamics of the selection of the two 2^nd-stage targets (equally rewarded) in free options across the blocks for incoherence levels set at 0 (left), 0.15 (middle) and 0.30 (right) during the training (D) and test (E) phases. Triangles represents the final average selection at the end of the training phases. Lines: as in C.

https://doi.org/10.1371/journal.pcbi.1010551.g006

To ensure that all other factors were equalized between the two 1^st-stage choices, we implemented target swaps following both free and forced selections by adding an additional state to our task (Fig 6A). In one block of trials, the incoherence was set to 0 and every subject action in the 2^nd-stage led to a coherent selection of the second target. In the other blocks, we set incoherence to 0.15 or 0.3, resulting in lower controllability between target choice and target selection (e.g., 85% of the time, pressing the left key will select the left target, and in 15% the right target). We set all the extrinsic reward probabilities associated with the different fractal targets to P = 0.75. Since all 2^nd -stage actions had the same expected value, the experiment was objectively uncontrollable because the probability of reward was independent of all actions [18]. Moreover, equal reward probabilities ensured that outcome diversity [38,39], outcome entropy [40], and instrumental divergence [41] did not contribute to choice preference since these were all equal between the forced and free options.

The same group of participants who performed experiment 2 also performed experiment 3 (n = 36). We compared the two similar conditions (block 1 from experiment 3 with full coherence and block 1 from experiment 2 with equal extrinsic rewards), which differed in that choosing the forced option resulted in the obligatory selection of the same fractal (experiment 2) or one of two fractals randomly selected by the computer (experiment 3). We found that choice preference was similarly high (mean for experiment 3 = 69%, bootstrapped 95% CI = [58, 78], and for experiment 2 = 68%, 95% CI = [59, 76]) and did not differ significantly (mean difference (experiment 2 –experiment 3) = -0.013, bootstrapped 95% CI = [-0.106, 0.082], p = 0.792), indicating that subjects’ choice preference in experiment 2 was not related to lack of action variability following forced selection per se. Moreover, we found that choice preference in these two blocks was significantly correlated (Spearman’s r = 0.538, bootstrapped 95% CI = [0.186, 0.779], p = 0.003), highlighting a within-subject consistency in choice preference.

Increasing incoherence decreased 1^st-stage choice preference by 2.4 and 5.4 points in blocks 2 and 3 respectively compared to block 1 (full controllability; Fig 6B). This decrease was not significant (estimated trend = -1.55, 95% CI = [-4.45, 1.36], p = 0.298; see Fig C in S1 Text for individual subjects). Consistent with experiments 1 and 2, choice preference was expressed immediately after the training phase and remained constant throughout the different blocks (Fig 6C–6E). Increasing incoherence speeded 1^st-stage RTs for free compared to forced selection (median difference free–forced = -0.060, 95% CI = [-0.110, -0.016], p = 0.009), with an additive effect of faster 1^st-stage RTs with increasing incoherence (estimated trend = -0.279, 95% CI = [-0.570, 0], p = 0.040, Fig B(C) in S1 Text).

We found that choice preference depended on the choice made on the previous trial (Fig 7A), with a significant main effect of previous 1^st-stage choice (χ² = 451, p < 0.001) as well as a significant interaction between the previous 1^st-stage choice (free or forced) and the degree of incoherence (χ² = 11.5, p < 0.001). Specifically, the frequency of free selections after a forced selection decreased significantly with incoherence (estimated trend = -2.68, 95% CI = [-4.92, -0.435], z = -2.34, p = 0.019), whereas the frequency of repeating a previous free selection did not change significantly with incoherence (estimated slope = -0.078, 95% CI = [-2.23, 2.07], z = -0.071, p = 0.943). Thus, as incoherence increased, subjects tended to stay more with the forced option, while maintaining a preference to repeat free selections.

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Fig 7. Controllability alters sequential decisions at 1^st and 2^nd-stages.

A. First-stage free choice proportion after a free and forced trial as a function of incoherence. B. Second-stage stay probabilities for the different action-state-reward trial types. Each subpanel represents a putative strategy followed by the subject. C. Estimated 2^nd-stage stay probabilities. Error bars represent 95% CI. P-values are displayed for significant pairwise comparisons and adjusted for multiple comparisons. Statistics for significant comparisons are: Unrewarded&Coherent vs. Rewarded&Coherent (log odd ratio (OR) = -1.20, z = -5.4, p < 0.001), Unrewarded&Coherent vs. Unrewarded&Incoherent (log OR = -1.11, z = -3.62, p = 0.002), Unrewarded&Coherent vs. Rewarded&Incoherent (log OR = -0.843, z = -3.12, p = 0.010). Statistics for non-significant comparisons are: Rewarded&Coherent vs. Unrewarded&Incoherent (log OR = 0.083, z = 0.260, p = 0.994), Rewarded&Coherent vs. Rewarded&Incoherent (log OR = 0.354, z = 1.70, p = 0.323), Unrewarded&Incoherent vs. Rewarded&Incoherent (log OR = 0.271, z = 0.760, p = 0.872).

https://doi.org/10.1371/journal.pcbi.1010551.g007

The sustained repetition of free selections across the different levels of incoherence suggests that subjects may have been acting as if to maintain control over the task through self-determined 2^nd-stage choices. Although the task was objectively uncontrollable since all terminal action-target sequences were rewarded with the same probability, subjects may have developed structure beliefs based on local reward history and target swaps, which could be reflected in 2^nd-stage patterns of choice. Thus, subjects may have followed a strategy based on reward feedback by repeating only actions associated with a previous reward (illusory maximization of reward intake; Fig 7B, first panel). Alternatively, they could have followed a strategy based on action-outcome incoherence feedback and thus avoided trials associated with a previous target swap (illusory minimization of incoherent states; Fig 7B, second panel). However, subjects may have also employed another classic strategy known as “model-based” where agents use their (here illusory) understanding of the task structure built from all the information provided by the environment (Fig 7B, third panel) [42]. Under this strategy, subjects try to integrate both the reward and target-swap feedback to select the next target in order to maximize reward. For example, an incoherent but rewarded trial would lead to a behavioral switch if the subject has integrated the information provided by the environment (i.e., the target swap induced by the computer), signaling that the other target is actually rewarded (see second bar on third panel of Fig 7B). Finally, an alternative strategy could rely on maintaining control in situations where control is threatened by adverse events (e.g., action-outcome incoherence). Subjects would thus ignore any choice outcome from trials with reduced controllability (incoherent trials) and repeat their initial choice selection (Fig 7B, fourth panel).

We found a significant interaction between last reward and last target swap (χ² = 10.9, p = 0.001). Results of the stay behavior during 2^nd-stage choice following free selection suggests that subjects consider the source of reward when choosing between the different fractal targets (Fig 7C). Indeed, when their action was consistent with the state they were choosing (i.e., the coherent fractal target feedback), they took the reward outcome into account to adjust their behavior on the next trial, either by staying on the same target when the trial was rewarded or by switching more to the other one when no reward was delivered. However, subjects were insensitive to outcomes from incoherent trials as they maintained the same strategy (staying) during subsequent trials, regardless of whether they were previously rewarded or not. We suggest this strategy reflects an attempt to maintain a consistent level of control over the environment at the expense of the task goal of maximizing reward intake. Note that 2^nd-stage reaction times were not significantly modulated by the presence or absence of a target swap, suggesting that subjects were not confused following incoherent trials (see Fig H in S1 Text).

Ethics statement

The local ethics committee (Comité d’Evaluation Éthique de l’Inserm) approved the study (CEEI/IRB00003888). Participants gave written informed consent during inclusion in the study, which was carried out in accordance with the declaration of Helsinki (1964; revised 2013).

Participants

Ninety-four healthy individuals (mean age = 30 ±SD 7.32 years, 64 females) responded to posted advertisements and were recruited to participate in this study. Relevant inclusion criteria for all participants were being fluent in French, not treated for neuropsychiatric disorders, having no color vision deficiency and being aged between 18 and 45 years old. Out of these 94 subjects, 58 participated to experiment 1 and 36 to experiments 2–3. We gave subjects 40 euros for participating but they were informed that their basic compensation would be 30 euros and that an extra compensation of 10 euros would be added if they performed all trials correctly. We also asked subjects whether they were motivated by this extra-compensation and less than 12% reported not being motivated by it (11 out of 93 subjects who answered the question). The sample size was chosen based on previous reward-guided decision-making studies using similar two-armed bandit tasks and probabilistic choices [37,63,64].

General procedure

The paradigm was written in Matlab using the Psychophysics Toolbox extensions [65,66]. It was presented on a 24 inch screen (1920 x 1080 pixels, aspect ratio 16:9). Subjects seat ~57 cm from the center of the monitor. Our behavioral task design was designed as a value-based decision paradigm. All participants received written and oral instructions. They were told that the goal of the task was to gain the maximum number of rewards (a large green euro). They were informed about the differences between the different trial types and that the extrinsic reward contingencies experienced during the training phases remained identical during the test phases. After instructions, participants received a pre-training session of a dozen trials (pre-train and pre-test phases) in order to familiarize them with the task design and the keys they would have to press.

In our experiments, subjects performed repeated trials with a two-stage structure. In the 1^st-stage they made an initial decision about what could occur in the 2nd-stage. Selecting the free option led to a subsequent opportunity to choose and selecting the forced option led to an obligatory computer-selected action. In the 2^nd-stage, we presented subjects with two fractal images, one of them being more rewarded following free selection in experiment 1 (except for P = 0.5) and experiment 2. In experiments 1 and 2, the computer always selected the same fractal target following forced selection. In experiment 3 all fractal targets were equally rewarded and the computer randomly selected one of the two fractal targets following forced selection (50%). Following forced selection, the target to select with a key press was indicated by a grey V-shape above the target. Pressing the other key on this trial type did nothing and the computer waited for the correct key press to proceed further in the trial sequence. Either at the 1^st- or 2^nd-stage, after the subject’s selection of the target, a red V-shape appears immediately after above the target to indicate the one they had selected (in experiment 3 blocks this red V-shape remains 250ms on the screen and eventually jumped with the target, see below).

Experimental conditions

In experiment 1, fifty-eight subjects performed trials where the maximal reward probabilities were matched following free and forced selection. We varied the overall expected value across different blocks of trials, each of them being associated to different programmed extrinsic reward probabilities (P). Forty-eight subjects performed a version with 3 blocks (experiment 1a) with different extrinsic reward probabilities ranging from 0.5 to 1 (block 1: P_forced = P_free = 0.5; block 2: P_forced = 0.75, P_free|a1 = 0.75, P_free|a2 = 0.25; block 3: P_forced = 1, P_free| a1 = 1, P_free|a2 = 0; where a1 and a2 represent the two possible key presses associated with the fractal targets). Ten additional subjects performed the same task with 4 different blocks (experiment 1b) with extrinsic reward probabilities also ranging from 0.5 to 1 (P = 0.5 or 0.67 or 0.83 or 1 from block 1 to 4 respectively.) We used a GLMM to compare subjects who experienced four blocks (mean choice preference = 66%) to those that experienced three blocks (mean choice preference = 64%). There was no main effect for group (χ² = 0.093, p > 0.05), nor a significant interaction with reward probability (χ² = 1.28, p > 0.05). Therefore, we pooled data from these groups for analyses.

Experiment 2 was like experiment 1 (six states) except programmed extrinsic reward associated with the forced option were higher than the free option in two out of three blocks (P_forced = 0.75, 0.85 or 0.95). Reward probabilities following free selection did not change across the three blocks (P_free|a1 = 0.75, P_free|a2 = 0.25)

Experiment 3 consisted of a 7-state version of the two-stage task. Here, we manipulated the coherence between the subject selection of a 2^nd-stage (fractal) target and the target ultimately displayed on the screen by the computer. Irrespectively of the target finally selected by the computer or the subjects, the extrinsic reward probability associated to all the 2^nd-stage targets in free and forced trials was set at P = 0.75. Importantly, adding the 7^th state in this last task version allowed the computer to swap the fractal 2^nd-stage targets following both free and forced selection. Thus, subjects did not perceive the weak coherence as a feature specific to the free condition. To prevent incoherent trials to be perceived as an informatic malfunction, preceding experiment 3, subjects received the written information that their computer have been extensively tested to detect any malfunction during the task and that therefore it was perfectly functional. We also provide visual feedback to the subjects after their key press to inform them that they did correctly select one of the keys (e.g., the right keys) but the computer ultimately swapped the final target displayed on the screen (e.g., the left target). This was to ensure that target swaps would not be perceived as their own errors of selection.

We associated unique fractal targets with each action in the 2^nd-stage, and a new set was used for each block in all experiments. Colors of the 1^st-stage targets were different between experiments. Positive or negative reward feedback, as well as the side of the 1^st-stage and 2^nd-stage target positions, were pseudo-randomly interleaved on the right or left of screen center. Feedback was represented by the presentation (reward) or not (non-reward) of a large green euro image.

In experiment 1, when P<1, participants performed a minimum of 48 trials per block in the training phases (forced and free) and the test phases. For P = 1, participants performed a minimum of 24 trials for training phases (forced and free) and 48 trials for test phase. Subjects selected almost exclusively the correct 2^nd-stage target only after ~12 trials during training (Fig 2D, right panel) and maintained this performance level during testing (Fig 2E, right panel), thus, shortening the train phase for this deterministic condition did not affect subjects’ behavior and allowed us to reduce the overall duration of the session. The orders of the blocks were randomly interleaved. In experiments 2 and 3 they performed a minimum of 40 trials for each block. Here, subjects started by performing experiment 3 followed by experiment 2. This was to ensure that the value of free trials was not devalued by experiment 2 when performing experiment 3. In experiment 3, subjects always started by the block with no target swaps (incoherence = 0), and in experiment 2 by the block with equal extrinsic reward probability (equivalent to the block P = 0.75 of experiment 1). All the other blocks were randomly interleaved.

Trial structure

During the training phase, for each trial, subjects experienced the 1^st-stage where a fixation point appeared in the center of the screen for 500ms, followed by one of the first two targets of the different trial types (forced or free) for an additional 750ms, either to the left or right of the fixation point (~11° from the center of the screen on the horizontal axis, 3° wide). Immediately after, the first target was turned off and two fractal targets appeared at the same eccentricity than the first target to the left and right of the fixation point. The subjects could then choose by themselves or had to match the target (depending on the trial type) using a key press (left or right arrow keys for left and right targets, respectively). After their selection, a red V-shape appeared for about 1000ms above the selected target (trace epoch). Importantly, in experiment 3, the red V-shape that informed the subject about their 2^nd- stage target selection was initially light red and turned on for 250ms above the actual fractal target selected by the subjects. It was then changed to dark red for 750ms (i.e., same color than experiments 1 and 2). So, if the trial was incoherent, after 250ms, the light red V-shape jumped and reappeared in dark red simultaneously over the other target on the other side of the screen also for 750ms. Finally, the fixation point was turned off and the outcome was displayed during 750ms before the next trial. For the test phase, the timing was equivalent except for the decision epoch related to the first stage where participants could choose their favorite trial type (free and forced targets positioned randomly, left or right) after 500ms of fixation point presentation. When a selection was made, the first target remained for 500ms, associated to a red V-shape over the selected 1^st-stage target–indicating their choice. The second stage started with a 500ms epoch where only the fixation point was presented on the screen, followed by the fractal target presentation. During the first and second action epochs, no time pressure was imposed on subjects to make their choice, but if they pressed one of the keys during the first 100ms after target presentation (‘early press’), a large red cross was displayed in the center of the screen for 500ms and the trial was repeated.

Computational modelling

We fitted individual subject data with variants of temporal-difference reinforcement learning (TDRL) models. All models maintained a look-up table of state-action value estimates (Q(s, a)) for each unique target and each action across all conditions within a particular experiment. State-action values were updated at each stage (t∈{1,2}) within a trial according to the prediction error measuring the discrepancy between obtained and expected outcomes: where r_t+1∈{0,1} indicates whether the subject received an extrinsic reward, and Z(s_t+1, a_t+1) represents the current estimate of the state-action value. The latter could take three possible forms:

Although Q-learning and SARSA variants differ in whether they learn off- or on-policy, respectively, we treated both algorithms as optimistic. Q-learning is strictly optimistic by considering only the best future state-action value, whereas SARSA can be more or less optimistic depending on the sensitivity of the mapping from state-action value differences to behavioral policy. We compared Q-learning and SARSA with a third state-action value estimator that incorporates risk attitude through a weighted mixture of the best and worst future action values (Gaskett’s β-pessimistic model [36]). As β→1 the pessimistic estimate of the current state-action value converges to Q-learning.

The prediction error was then used to update all state-action values according to: where α∈[0,1] represents the learning rate.

We tested whether a free choice bonus could explain choice preference by modifying the obtained reward as follows: where ρ∈(−inf, +inf) is a scalar parameter added to any extrinsic reward following any action taken following selection of the free option.

Free actions at each stage were generated using a softmax policy as follows: where increasing the temperature, τ∈[0, +inf), produces a softer probability distribution over actions. The forced option, on the other hand, always led to the same fixed action. We used a softmax behavioral policy for all TDRL variants, and in the context of our task, the Q-learning and SARSA algorithms were often similar in explaining subject data, so we treated them together in the main text (Fig D in S1 Text).

We also tested the possibility that subjects exhibited tendencies to alternate or perseverate on free or forced selections. We implemented this using a stickiness parameter that modified the policy as follows: where the κ∈(−inf, +inf) parameter represents the subject’s tendance to perseverate, and C_t(a) is a binary indicator for when a is a 1^st-stage action and was the same as was chosen on the previous trial.

We independently combined the free parameters to produce a family of model fits for each subject. We allowed the learning rate (α) and softmax temperature (τ) to differ for each of the two stages in a trial. We therefore fitted a total of 48 models (3 estimates of current state-action value [SARSA, Q, β-pessimistic] × presence or absence of free choice bonus [ρ] × 2- vs 1-learning rate [α] × 2- vs 1-temperature [τ] × presence or absence of stickiness [κ]).

Parameter estimation and model comparison

We fitted model parameters using maximum a posteriori (MAP) estimation using the following priors:

We based hyperparameters for α and 1/τ on Daw and colleagues [42]. We used the same priors and hyperparameters for all models containing a particular parameter. We used limited-memory quasi-Newton algorithm (L-BFGS-B) to numerically compute MAP estimates, with α and β bounded between 0 and 1 and 1/τ bounded below at 0. For each model, we selected the best MAP estimate from 10 random parameter initializations.

For each model for each subject, we fitted a single set of parameters to both training and test data across conditions. Data from the training phase consisted of 2^nd-stage actions and rewards, but we also presented subjects, during the 1^st-stage stage, with the free or forced cues corresponding to the condition being trained. Therefore, we fitted the TDRL models assuming that the state-action values associated with the 1^st-stage fractals also underwent learning during the training phase, and that these backups continued into the test phase, where subjects actually made 1^st-stage decisions. That is, we initialized the state-action values during the test phase with the final state-action values during the training phase.

We treated initial state-action values as a hyperparameter. We set all initial Q-values equal to 0 or 0.5 to capture initial indifference between choice options (this decision rule considers only Q-value differences). Most subjects were best fit with initial Q-values = 0, although some subjects were better fit with initial Q-values = 0.5 (Fig I in S1 Text, Tables A-B in S1 Text). We therefore selected the best Q-value initialization for each subject.

We used Schwarz weights to compare models, which provides a measure of the strength of evidence in favor of one model over others and can be interpreted as the probability that a model is best in the Bayesian Information Criterion (BIC) sense [67]. We calculated weights for each model as: so that ∑w_i(BIC) = 1. We selected the model with the maximal Schwarz weight for each subject.

In order to verify that we could discriminate different state-action value estimates and how accurately we could estimate parameters, we performed model and parameter recovery analyses on simulated datasets (Fig D in S1 Text).

Note that the β-pessimist is identical to a Q-learner when β = 1. Since the β-pessimistic model includes an extra parameter, it is additionally penalized when it produces the same prediction as the Q-learner (i.e., when β = 1), and would not be selected unless there was sufficient evidence for weighting the worst possible outcome.

Statistical analyses

We performed all analyses using R version 4.0.5 [68] and the following open-source R packages: afex version 1.2–1 [69], brms version 2.18.0 [70], emmeans version 1.8.4–1 [71], lme4 version 1.1–31 [72], mgcv version 1.8–41 [73], tidyverse version 1.3.2 [74].

We used generalized linear mixed models (GLMM) to examine differences in choice behavior. When the model did not include relative trial-specific information (e.g., reward on the previous trial), we aggregated data to the block level. Otherwise, we used choice data at the trial level. We included random effects by subject for all models (random intercepts and random slopes for the variable manipulated in each experiment; maximal expected value, relative expected value, or incoherence for experiments 1, 2, and 3, respectively). We performed GLMM significance testing using likelihood-ratio tests. We used Wald tests for post-hoc comparisons, and we corrected for multiple comparisons using Tukey’s method. We used generalized additive mixed models (GAMM) to examine choice behavior as a function of trial within a block. We obtained smooth estimates of choice behavior using penalized regression splines, with penalization that allowed smooths to be reduced to zero effect [73]. We included separate smooths by block. We performed GAMM significance testing using approximate Wald-like tests [75].

We used Bayesian mixed models to analyze reaction time (RT) data because the right-skewed RT data was best fit by a shifted lognormal distribution, which is difficult to fit with standard GLMM software. For the RT analyses, we removed trials with RTs < 0.15 seconds and > 5 seconds (representing ~1% of the data). For each experiment we fit a model sampling four independent chains with 4000 iterations each for a total of 16000 posterior samples (the first 1000 samples of each chain discarded as warmup). Chain convergence was assessed using Gelman-Rubin statistics (R-hat < 1.01; [76]). We estimated 95% credible intervals using the highest posterior density, and obtained p-values by converting the probability of direction, which represents the closest statistical equivalent to a frequentist p-value [77].