2.2.1. Pre-PIT delay discounting task

The indifference values derived from the delay discounting task showed substantial individual differences, as commonly observed in intertemporal choice tasks (Scheres et al., Reference Scheres, de Water and Mies2013). Immediate medium rewards that were subjectively matched with the delayed large reward of 20 cents in 10 seconds ranged between 8 and 20 cents (M = 13.96, SD = 3.34, Md = 14.0, IQR = 4.0). Immediate small rewards that were subjectively matched with a delayed medium reward—the latter of which was identical in amount to the immediate medium reward, but had a 10-s delay—ranged between 1 and 16 cents (M = 9.50, SD = 4.12, Md = 9.0, IQR = 6.0).

2.2.2. Instrumental conditioning

With respect to the PIT results, we first examined whether participants learned to perform the correct instrumental go and no-go actions over the course of the instrumental conditioning phase. Figure 3A shows the average instrumental learning trajectory, separately for go (good mushrooms) and no-go (bad mushrooms) trials. Instrumental learning was assessed using a model with response accuracy (correct/incorrect) as dependent variable, and trial type (go/no-go trial), trial number (continuous predictor), and their interaction as predictors. This model showed a significant effect of trial number (b = 0.35, 95% CI [0.09, 0.59]), with accuracy improving across trials. Consistent with Figure 3A, which suggests a stronger learning effect for no-go trials compared to go trials, we found a significant interaction between trial number and trial type (b _{TrialNr*GovsNo-Go} = -0.40, 95% CI [-0.77, -0.03]), with accuracy improving significantly for no-go trials (b = 0.55, 95% CI [0.23, 0.85]) but not for go trials (b = 0.14, 95% CI [-0.18, 0.44]). This finding can be explained by a general tendency to give go responses at the start of the instrumental phase (a go bias), when participants were still unaware which mushrooms had to be collected or left behind. As the task progressed, participants learned to leave bad mushrooms behind, thus improving accuracy for the no-go trials, while accuracy was already high at the start for go trials and remained so over the course of the task. Figure 3A indeed shows that accuracy on both go and no-go trials converged to satisfactory levels toward the end of the instrumental phase, and there was no significant difference in accuracy between trial types during the last 10 trials of this phase (estimated M _{p_correct} go trials = 0.81; estimated M _{p_correct} no-go trials = 0.76; b _GovsNo-Go = 0.30, 95% CI [-0.75, 1.35]). Please note that average accuracy was likely restricted around 75% because correct feedback was provided with a 75% probability (a phenomenon known as probability matching; Herrnstein, Reference Herrnstein1961; Vulkan, Reference Vulkan2000). Thus, it can be concluded that on average, participants learned to perform the more rewarded action over the course of the instrumental conditioning phase for both go and no-go trials. We did observe inter-individual differences in instrumental accuracy during the final 10 trials. As reported in detail in Supplementary material S5, we tested whether instrumental accuracy moderated the hypothesized transfer effects, hereby exploring the idea that external, task-irrelevant Pavlovian cues may exert stronger transfer effects on participants who are more uncertain about the appropriate instrumental response. However, we found no evidence for such moderation effects.

Figure 3 Results of the PIT task in Experiment 1. Panel A, C: Observed trial-by-trial probability (± 95% CI) of giving the correct instrumental response for go and no-go trials during the instrumental conditioning phase (A) and the transfer phase (C). Panel B: Post-PIT liking ratings of the Pavlovian cues (colored squares) as a function of the amount and delay associated with the cues. Panel D: Probability of giving a go response, p(go), aggregated over go and no-go trials, as a function of the amount and delay associated with Pavlovian cues presented in the background. See Supplementary Figure S6.1 for the effects of amount and delay separated by trial type (go and no-go trials). Panels B and D display estimated marginal means and 95% CIs.

2.2.3. Pavlovian conditioning

We assessed Pavlovian conditioning effects using a model with post-PIT liking ratings as dependent variable, and amount (small/medium/large), delay (immediate/delayed), and their interaction as predictors. Figure 3B displays the liking ratings as a function of amount and delay. Planned comparisons showed that all three levels of amount (hereafter referred to as large, medium, and small cues) differed significantly from each other in the expected direction: large cues (M _L = 65.90) were rated higher than medium (M _M = 50.90; b _LvsM = 15.10, 95% CI [6.58, 22.40]) and small cues (M _S = 40.80; b _LvsS = 25.10, 95% CI [13.97, 36.50]), and medium cues were rated higher than small cues (b _MvsS = 10.00, 95% CI [0.83, 19.70]). In contrast, we found no significant difference between cues associated with delayed (M _D = 49.20) and immediate rewards (M _I = 55.90; b _DvsI = -6.70, 95% CI [-14.10, 0.96]), hereafter referred to as delayed and immediate cues, although the ratings differed in the expected direction. There was no significant interaction between amount and delay (b _LvsM*DvsI = -0.58, 95% CI [-15.30, 15.30]; b _LvsS*DvsI = 3.12, 95% CI [-17.70, 23.10]; b _MvsS*DvsI = 3.70, 95% CI [-14.90, 24.20]). See Supplementary Table S7.1 for estimates of all planned comparisons. The Pavlovian conditioning procedure thus resulted in the hypothesized significant effect of reward amount, but not of reward delay, on the Pavlovian value assigned to cues.

Moreover, as predicted, the indifference pairs were reflected in the rating data, as there was no significant difference between ratings of cues associated with the delayed large (M _DL = 63.00) versus immediate medium (M _IM = 53.50) reward (indifference pair 1; b _DLvsIM = 9.51, 95% CI [-3.17; 22.61]), nor between ratings of the delayed medium (M _DM = 48.20) versus immediate small (M _IS = 45.30) reward (indifference pair 2; b _DMvsIS = 2.91, 95% CI [-9.40, 16.33]). It should be noted that although these results indicate no significant difference in liking ratings between these cues, this does not provide statistical support for equivalence of the liking ratings. We further explored this equivalence using non-preregistered Region of Practical Equivalence (ROPE) tests. The ROPE test forms a Bayesian analog to the frequentist equivalence test (Kruschke, Reference Kruschke2018; Lakens, Reference Lakens2017), as it involves defining a region of parameter values that we consider practically equivalent to the null value (e.g., practically equivalent to a difference in post-PIT liking ratings of 0). We subsequently evaluated how much of the posterior distribution of the effect of interest (i.e., the difference in post-PIT liking ratings between the two indifference pair cues) fell inside the ROPE. This allowed us to quantify the evidence for the null value, reflecting the certainty with which we can conclude that there is no meaningful difference. One way to evaluate this proportion is to accept the null value only if the 95% highest density interval (HDI) falls entirely within the ROPE (Kruschke, Reference Kruschke2018). A visual representation of this index can be found in Supplementary material S8. An alternative, more quantitative index implies evaluating the proportion of the whole posterior distribution that falls inside the ROPE, with a higher proportion indicating more support for equivalence (Makowski et al., Reference Makowski, Ben-Shachar, Chen and Lüdecke2019). As we consider such a quantitative index an informative metric, we report these results here (and in Supplementary material S8).

Our reasons for using the ROPE to quantify the evidence for the null value, instead of, for instance, the more commonly reported Bayes factors, are twofold. First, the ROPE test uses the posterior distribution to evaluate the evidence for a parameter value (i.e., the null value), which is generally robust to the choice of prior distribution (Kruschke, Reference Kruschke2013; Wagenmakers et al., Reference Wagenmakers, Lodewyckx, Kuriyal and Grasman2010). Bayes factors, in contrast, do not rely on the posterior distribution, but reflect the ratio of the marginal likelihoods of the null and alternative model. These marginal likelihoods are extremely sensitive to the choice of prior distribution, and using a weakly informative prior to convey a state of minimal prior knowledge will result in Bayes factors, but not posterior distributions, that are biased toward the null model (Kruschke and Liddell, Reference Kruschke and Liddell2018; Rouder et al., Reference Rouder, Morey, Speckman and Province2012; Schad et al., Reference Schad, Nicenboim, Bürkner, Betancourt and Vasishth2022; Tendeiro and Kiers, Reference Tendeiro and Kiers2019; Wagenmakers et al., Reference Wagenmakers, Lodewyckx, Kuriyal and Grasman2010). Since we did not have a strong theory regarding our prior distributions, we favored an approach that was more robust to the choice of prior distribution, and that allowed for the use of a weakly informative prior (as recommended by e.g., Kruschke and Liddell, Reference Kruschke and Liddell2018; Liao et al., Reference Liao, Midya and Berg2021; Makowski et al., Reference Makowski, Ben-Shachar, Chen and Lüdecke2019). Second, by visualizing the posterior distribution in relation to the ROPE, the ROPE test has been argued to convey information about the uncertainty of the parameter estimate (reflected by the width of the posterior distribution) in a more explicit and transparent manner compared to Bayes factors (Kruschke, Reference Kruschke2013).

We acknowledge that although the ROPE test is robust to the choice of prior distribution, it does strongly depend on the choice of ROPE limits. Evaluating the ROPE limits on the raw response scale (e.g., the probability of go responses or the post-PIT liking ratings) facilitated a careful consideration of these limits. For the preregistered ROPE test on go-responding that we report in the pooled data analyses, we used a conventional ROPE radius of Cohen’s d = 0.10, following Kruschke (Reference Kruschke2018). This ROPE radius translates to a ROPE of 1 ± 0.119 in odds ratios or 0.5 ± 0.045 on the probability scale, which we considered to be appropriate. In contrast, for the liking ratings, this conventional ROPE radius resulted in extremely narrow ROPEs, translating to an unstandardized difference in ratings of 2-3 points on a scale from 0 to 100.Footnote ⁴ As participants were unable to see the exact value of their rating, and because the observed ratings covered the entire scale (and were thus not restricted to a small proportion of the scale), we deemed this radius to be an overly strict equivalence criterion. Therefore, for the liking ratings, we slightly increased the ROPE width by using a Cohen’s d value of 0.15, resulting in ROPEs of 0 ± 4-5 points on the rating scale. To communicate the sensitivity of our results to the choice of ROPE limits, we show in Supplementary material S8 how the proportion of the posterior distribution that fell inside the ROPE varies as a function of varying ROPE radii. With a ROPE radius of Cohen’s d = 0.15, 18% of the posterior distribution of the first indifference pair, and 47% of the posterior distribution of the second indifference pair fell inside the ROPE. Thus, we did not find strong support for the equivalence in post-PIT liking ratings of either of the two indifference pairs, although more support was found for the equivalence of the second indifference pair.

2.2.4. Transfer test

To test our main transfer hypotheses, we ran a model with response (go/no-go) as dependent variable, and amount (small/medium/large), delay (immediate/delayed), trial type (go/no-go), and their interactions as predictors. Unsurprisingly, we found a significant effect of trial type, such that the probability of giving a go response was higher in go (M _GoTrials = 0.83) than in no-go trials (M _No-GoTrials = 0.17; b _GovsNo-Go = 3.18, 95% CI [1.69, 4.50]). Figure 3D displays the probability of go responses as a function of amount and delay. In line with our hypothesis, the presence of large cues (M _L = 0.57) increased the probability of giving a go response compared to medium cues (M _M = 0.46; b _LvsM = 0.45, 95% CI [0.11, 0.78]). However, the difference between large and small cues (M _S = 0.47) and between medium and small cues was not significant (b _LvsS = 0.44, 95% CI [-0.07, 0.96]; b _MvsS = -0.01, 95% CI [-0.42, 0.43]). There was no significant interaction between amount and trial type, indicating that the effect of amount was not significantly different between go and no-go trials (b _{LvsM*GovsNo-Go} = -0.04, 95% CI [-0.62, 0.49]; b _{LvsS*GovsNo-Go} = 0.13, 95% CI [-0.62, 0.87]; b _{MvsS*GovsNo-Go} = 0.17, 95% CI [-0.54, 0.91]). In contrast to the transfer effect of amount, we found no significant difference in go-responding between delayed (M _D = 0.51) and immediate cues (M _I = 0.49; b _DvsI = 0.05, 95% CI [-0.41, 0.49]). This did not interact with trial type (b _{DvsI*GovsNo-Go} = 0.03, 95% CI [-0.60, 0.62]). Furthermore, there was no significant interaction between amount and delay (b _LvsM*DvsI = 0.06, 95% CI [-0.63, 0.69]; b _LvsS*DvsI = 0.07, 95% CI [-0.80, 1.04]; b _MvsS*DvsI = 0.01, 95% CI [-0.85, 0.91]). See Supplementary Table S7.4 for estimates of all planned comparisons (varying over levels of amount, delay, and trial type).

Finally, we found no significant difference between cues associated with members of an indifference pair (IP1: b _DLvsIM = 0.51, 95% CI [-0.11, 1.15]; IP2: b _DMvsIS = 0.02, 95% CI [-0.62, 0.68]). Again, we performed a ROPE test to further investigate the equivalence in go-responding between indifference pair cues. Following the preregistered ROPE test reported in the pooled data analyses, we used a ROPE radius based on a Cohen’s d value of 0.10, resulting in a ROPE of 1 ± 0.119 in odds ratios, and 0.5 ± 0.045 on the probability scale. As reported in detail in Supplementary material S8 and in line with the Pavlovian conditioning results, neither pair showed strong support for equivalence, although we found more support for the second indifference pair, with 11% and 45% of the posteriors of indifference pair 1 and 2, respectively, falling inside the ROPE.

In summary, our transfer results follow the Pavlovian conditioning results reported above, as we found support for the predicted effect of reward amount (albeit for only one out of three planned comparisons) but not for reward delay, and we found no significant differences between indifference pair cues.

2.2.5. Secondary analyses

In addition to the analyses and results described above, which we used to test our main hypotheses, we performed several secondary analyses. These analyses involved examining the pre-PIT liking ratings of the cues, the instrumental accuracy at the start of the transfer phase (also see Figure 3C displaying this), the possible extinction of Pavlovian cue–outcome associations over the course of the transfer phase, and participants’ choice behavior in the post-PIT delay discounting task. None of the results of these analyses raised any major concerns for the interpretation of our primary results; they are described in detail in Supplementary materials S9–S11.

We do discuss here the results of the Pavlovian contingency test, which showed a discrepancy between awareness of the cue–amount contingencies and the cue–delay contingencies. That is, average performance on the questions that assessed cue–amount contingency awareness was 85.33% (SD = 24.20%), with six out of 50 participants scoring at or below chance level. In contrast, average performance on the questions that assessed cue–delay contingency awareness was only 72.33% (SD = 30.04%), with eighteen out of 50 participants scored at or below chance level. Excluding participants who scored at or below chance level on these questions from our main Pavlovian and transfer analyses resulted in findings that were largely consistent with the full sample results reported here, although the transfer effect of amount was non-significant; a detailed reported can be found in Supplementary material S12.

3.2.1. Pre-PIT delay discounting task

Immediate medium rewards that were subjectively matched with a delayed large reward of €20 in 50 days (indifference pair 1) ranged between €7 and €19 (M = 14.82, SD = 3.08, Md = 15.0, IQR = 4.0), and immediate small rewards that were subjectively matched with a delayed medium reward that was identical in amount to the individualized immediate medium reward (indifference pair 2) ranged between €2 and €18 (M = 11.19, SD = 4.16, Md = 12.0, IQR = 6.0).

3.2.2. Instrumental conditioning

Figure 4A displays the average instrumental learning trajectory during the instrumental conditioning phase, separately for go (good mushrooms) and no-go (bad mushrooms) trials. Similar to Experiment 1, our instrumental learning model showed instrumental accuracy to improve over the course of the phase (b = 0.27, 95% CI [0.12, 0.40]). In addition, Figure 4A seems to show a similar initial go bias and subsequently improved no-go performance. Supporting this observation, we found the effect of trial number to be significant for no-go trials (b = 0.36, 95% CI [0.13, 0.57]), but not for go trials (b = 0.17, 95% CI [-0.04, 0.39]). However, in contrast to Experiment 1, this difference in improvement over time between go and no-go trials was not significant, as indicated by a non-significant interaction between trial number and trial type (b_{TrialNr*GovsNo-Go} = -0.19, 95% CI [-0.52, 0.14]). A potential explanation for this non-significant interaction is that accuracy on no-go trials improved relatively quickly, preventing a significant interaction when assessing accuracy across the entire phase. Consistent with Experiment 1, accuracy on both go and no-go trials converged to similar levels as the phase progressed. Correspondingly, there was no significant difference in accuracy between go and no-go trials during the last 10 trials (estimated M _{p_correct} go trials = 0.78; estimated M _{p_correct} no-go trials = 0.74; (b _GovsNo-Go = 0.23, 95% CI [-0.75, 1.19]). Also consistent with Experiment 1, we observed inter-individual differences in instrumental accuracy during the last 10 trials of the instrumental conditioning phase, but these did not moderate the transfer results (see Supplementary material S5 for a detailed report).

Figure 4 Results of the PIT task in Experiment 2. Panel A, C: Observed trial-by-trial probability (± 95% CI) of giving the correct instrumental response for go and no-go trials during the instrumental conditioning phase (A) and the transfer phase (C). Panel B: Post-PIT liking ratings of the Pavlovian cues (colored squares) as a function of the amount and delay associated with the cues. Panel D: Probability of giving a go response, p(go), aggregated over go and no-go trials, as a function of the amount and delay associated with Pavlovian cues presented in the background. See Supplementary Figure S6.2 for the effects of amount and delay separated by trial type (go and no-go trials). Panels B and D display estimated marginal means and 95% CIs.

3.2.3. Pavlovian conditioning

Figure 4B displays post-PIT liking ratings of the Pavlovian cues as a function of the reward amount and delay associated with the cues. As hypothesized, and in line with the results from Experiment 1, large cues (M _L = 68.80) were rated significantly higher than small cues (M _S = 50.00; b _LvsS = 18.81, 95% CI [11.06, 27.30]), and medium cues (M _M = 63.70) were rated higher than small cues (b _MvsS = 13.78, 95% CI [6.42, 22.00]). The difference between large and medium cues was, however, not significant (b _LvsM = 5.04, 95% CI [-1.20, 11.00]). In contrast to Experiment 1, we additionally found the hypothesized effect of delay, as immediate cues (M _I = 64.60) were rated significantly higher than delayed cues (M _D = 57.00; b _DvsI = -7.63, 95% CI [-13.00, -1.59]). There was no significant interaction between amount and delay (b _LvsM*DvsI = -3.39, 95% CI [-14.70, 8.51]; b _LvsS*DvsI = -2.28, 95% CI [-16.30, 13.62]; b _MvsS*DvsI = 1.11, 95% CI [-14.40, 17.25]). See Supplementary Table S7.2 for estimates of the amount effect at all levels of delay, and vice versa.

Similar to Experiment 1, the indifference pairs were reflected in the post-PIT liking ratings, as we found no significant differences between liking ratings of cues associated with the delayed large (M _DL = 64.00) versus immediate medium (M _IM = 66.80) reward (indifference pair 1; b _DLvsIM = -2.79, 95% CI [-12.75; 6.06 ]), nor between ratings of the delayed medium (M _DM = 60.70) versus immediate small (M _IS = 53.60) reward (indifference pair 2; b _DMvsIS = 7.09, 95% CI [-2.32, 17.57]). A ROPE test showed moderate support for the subjective equivalence of cues associated with the first indifference pair, as 55% of the posterior distribution fell inside the ROPE, but weak support for the second pair, for which 24% of the posterior fell inside the ROPE (see Supplementary material S8 for details). This contrasts with Experiment 1, in which we observed stronger support for subjective equivalence of the second indifference pair.

3.2.4. Transfer test

First, we again observed a significant effect of trial type, with a higher probability of giving a go response in the go trials (M _GoTrials = 0.75) than no-go trials (M _No-GoTrials = 0.19; b _GovsNo-Go = 2.57, 95% CI [1.72, 3.41]). Figure 4D displays the probability of go responses as a function of the reward amount and delay associated with the Pavlovian cues presented in the background. Contrasting with our hypothesis and with the results of Experiment 1, we found no effect of amount, neither for large versus small (M _L = 0.46, M _S = 0.44; b _LvsS = 0.15, 95% CI [-0.24, 0.53]), large versus medium (M _M = 0.45; b _LvsM = 0.09, 95% CI [-0.17, 0.34]) nor medium versus small cues (b _MvsS = 0.06, 95% CI [-0.26, 0.39]). We found no significant interaction between amount and trial type (b _{LvsM*GovsNo-Go} = -0.09, 95% CI [-0.37, 0.53]; b _{LvsS*GovsNo-Go} = -0.07, 95% CI [-0.77, 0.60]; b _{MvsS*GovsNo-Go} = -0.15, 95% CI [-0.72, 0.42]).

Consistent with Experiment 1, we also found no significant effect of delay (M _D = 0.45, M _I = 0.45; b _DvsI = -0.003, 95% CI [-0.36, 0.31]). This did not interact with trial type (b _{DvsI*GovsNo-Go} = 0.03, 95% CI [-0.35, 0.43]). Moreover, there was no significant interaction between amount and delay (b _LvsM*DvsI = -0.13, 95% CI [-0.63, 0.44]; b _LvsS*DvsI = -0.02, 95% CI [-0.83, 0.77]; b _MvsS*DvsI = 0.10, 95% CI [-0.60, 0.84]). See Supplementary Table S7.5 for estimates of all planned comparisons (varying over levels of amount, delay, and trial type).

Finally, similar to Experiment 1, we found no significant difference between cues associated with members of an indifference pair (IP1: M _DL = 0.47, M _IM = 0.44, b _DLvsIM = 0.10, 95% CI [-0.37, 0.60]; IP2: M _DM = 0.46, M _IS = 0.44, b _DMvsIS = 0.09, 95% CI [-0.43, 0.58]). A ROPE test showed moderate support for the equivalence in go-responding of both indifference pairs, as 55% and 54% of the posteriors of pair 1 and 2, respectively, fell inside the ROPE (see Supplementary material S8 for details).

3.2.5. Secondary analyses

We performed the same set of secondary analyses as in Experiment 1, reported in detail in Supplementary materials S9–S11. For the sake of comparison with Experiment 1, we again discuss the results of the Pavlovian contingency test here. Average performance on the questions that assessed cue–amount contingency awareness was 87.09% (SD = 21.31%). Four out of 71 participants scored at or below chance level. Average performance on the questions that assessed cue–delay contingency awareness was 86.62% (SD = 18.61%). Nine out of 71 participants scored at or below chance level. Again, we reran our main Pavlovian and transfer models excluding participants who scored at or below chance level on the test. Results from these analyses were largely consistent with the full sample results reported here, except that excluding participants who scored at or below chance level for the cue–delay contingencies resulted in a non-significant Pavlovian conditioning effect of reward delay (see Supplementary material S12 for details).

4.1.1. Pavlovian conditioning—post-PIT liking ratings

Figure 5A displays post-PIT liking ratings of the Pavlovian cues as a function of the reward amount and delay associated with the cues. All three levels of amount differed significantly from each other: Large cues (M _L = 67.20) were rated significantly higher than medium cues (M _M = 57.30; b _LvsM = 9.99, 95% CI [5.76, 14.40]) and small cues (M _S = 45.30; b _LvsS = 21.95, 95% CI [15.91, 28.30]), and medium cues (M _M = 57.30) were rated higher than small cues (b _MvsS = 11.96, 95% CI [6.91, 17.20]). We found no significant interactions between amount and experiment (1/2), indicating that the patterns of results found in both experiments were not significantly different (b _LvsM*1vs2 = 9.89, 95% CI [-0.76, 20.90]; b _LvsS*1vs2 = 6.34, 95% CI[-8.07, 21.90]; b _MvsS*1vs2 = -3.55, 95% CI[-18.37, 11.20]). These results are in line with our hypotheses, and with the results found in experiments 1 and 2 (with the exception of the non-significant difference between large and medium cues in Experiment 2).

Figure 5 Pavlovian and transfer results in data pooled across experiments 1 and 2. Panel A: Post-PIT liking ratings of the Pavlovian cues (colored squares) as a function of the amount and delay associated with the cues, aggregated over Experiments 1 and 2. Panel B: Probability of making a go response, p(go), as a function of the amount and delay associated with Pavlovian cues presented in the background, aggregated over go and no-go trials and Experiments 1 and 2. See Supplementary Figure S6.3 for the effects of amount and delay separated for go and no-go trials. Panel A and B display estimated marginal means and 95% CIs. Panel C: Histogram of the posterior distribution of the transfer effect of delay, i.e., the probability of making a go response in the presence of a delayed versus immediate cue. Dashed vertical lines mark the ROPE limits around the null value (0.5 ± 0.045). The bold horizontal line marks the 95% highest density interval (HDI). Panel D: Proportion of the posterior distribution falling inside the ROPE as a function of the radius (half width) of the ROPE (on the probability scale). The dashed vertical line marks the ROPE radius at which the 95% HDI falls completely within the ROPE; the dashed horizontal line indicates the proportion of the whole posterior distribution that falls within the ROPE for this radius.

Consistent with Experiment 2, we found the hypothesized effect of delay, as immediate cues (M _I = 60.20) were rated significantly higher than delayed cues (M _D = 53.00; b _DvsI = -7.25, 95% CI [-12.90, -1.95]). The effect of delay was not significantly different between the two experiments, as reflected by a non-significant interaction (b _DvsI*1vs2 = 0.76, 95% CI [-7.12, 8.92]). This finding concords with the similarity of estimates across experiments 1 and 2 (see Figure 2).

There was no significant interaction between amount and delay (b _LvsM*DvsI = -2.40, 95% CI [-10.82, 5.78]; b _LvsS*DvsI = 0.06, 95% CI [-9.86, 10.24]; b _MvsS*DvsI = 2.46, 95% CI [-7.87, 13.22]). See Supplementary Table S7.3 for estimates of the amount effect on all levels of delay, and vice versa.

Finally, in line with Experiments 1 and 2 and as predicted, the indifference pairs were reflected in the post-PIT liking ratings, as we found no significant differences between liking ratings of cues associated with the delayed large (M _DL = 63.20) versus immediate medium (M _IM = 60.10) reward (indifference pair 1; b _DLvsIM = 3.16, 95% CI [-4.20; 10.89]), nor between ratings of the delayed medium (M _DM = 54.40) versus immediate small (M _IS = 49.30) reward (indifference pair 2; b _DMvsIS = 5.10, 95% CI [-2.92, 12.82]). These differences did not interact with experiment (IP1: b _LDvsMI*1vs2 = 11.77, 95% CI [-3.77, 27.67]; IP2: b _MDvsSI*1vs2 = -3.74, 95% CI [-21.43, 14.02]). A ROPE test showed moderate support for the subjective equivalence of cues associated with the first indifference pair, as 60% of the posterior distribution fell inside the ROPE, but weaker support for the equivalence of the second indifference pair, for which 37% of the posterior fell inside the ROPE (see Supplementary material S8 for details).

4.1.2. Transfer test

Our transfer model again showed a significant effect of trial type, such that the probability of giving a go response was higher in go than in no-go trials (M _GoTrials = 0.79, M _No-GoTrials = 0.18; b _GovsNo-Go = 2.84, 95% CI [2.04, 3.73]). Figure 5B displays the probability of go responses as a function of amount and delay. In line with Experiment 1, we found a significant transfer effect of amount, as the presence of large cues (M _L = 0.52) increased the probability of giving a go response compared to medium cues (M _M = 0.45; b _LvsM = 0.27, 95% CI [0.06, 0.48]). This finding in the pooled data supports the robustness of the transfer effect of amount. The difference between large and small cues (M _S = 0.45) and between medium and small cues was not significant (b _LvsS = 0.28, 95% CI [-0.05, 0.59]; b _MvsS = 0.01, 95% CI [-0.27, 0.27]). We found no significant interaction between amount and trial type (b _{LvsM*GovsNo-Go} = -0.02, 95% CI [-0.35, 0.38]; b _{LvsS*GovsNo-Go} = -0.04, 95% CI [-0.51, 0.55]; b _{MvsS*GovsNo-Go} = -0.02, 95% CI [-0.43, 0.46]), nor between amount and experiment (b _LvsM*1vs2 = 0.37, 95% CI [-0.04, 0.74]; b _LvsS*1vs2 = 0.27, 95% CI [-0.32, 0.86]; b _MvsS*1vs2 = -0.10, 95% CI [-0.59, 0.40]).

Furthermore, consistent with Experiments 1 and 2, we found no significant difference in go-responding between delayed (M = 0.48) and immediate (M = 0.47) cues (b _DvsI = 0.02, 95% CI [-0.25, 0.28]). This did not interact with trial type (b _{DvsI*GovsNo-Go} = 0.02, 95% CI [-0.31, 0.32]) or experiment (b _DvsI*1vs2 = 0.06, 95% CI [-0.54, 0.63]). Moreover, we found no significant interaction between amount and delay (b _LvsM*DvsI = -0.03, 95% CI [-0.43, 0.36]; b _LvsS*DvsI = 0.002, 95% CI [-0.52, 0.52]; b _MvsS*DvsI = -0.49, 95% CI [-0.49, 0.61]). See Supplementary Table S7.6 for estimates of all planned comparisons (varying over levels of amount, delay, and trial type).

Finally, in line with experiments 1 and 2, there was no significant difference between cues associated with members of an indifference pair (IP1: b _DLvsIM = 0.29, 95% CI [-0.07, 0.67]; IP2: b _DMvsIS = 0.03, 95% CI [-0.36, 0.41]). These differences did not interact with experiment (IP1: b _DLvsIM*1vs2 = 0.43, 95% CI [-0.40, 1.22]; IP2: b _DMvsIS*1vs2 = -0.08, 95% CI [-0.89, 0.79]). The ROPE test showed more support for the equivalence in go-responding of the second compared to the first indifference pair, with moderate support for equivalence in the second pair, as 68% of the posterior fell inside the ROPE, but weak support for the first pair, for which 25% of the posterior fell inside the ROPE (see Supplementary material S8 for details).