2.1.1 Design, materials, and procedure

We set up an online study using the survey framework formr (http://www.formr.org; Reference Arslan, Tata and WaltherArslan, Tata & Walther, 2018), recruiting a sample via the survey panel Amazon Mechanical Turk (http://www.mturk.com/). We invited only US residents with an approval rating of 95 or higher. The study was preregistered on the Open Science Framework (OSF; https://osf.io/b7vzd/). After entering the study, participants received basic information about the study, gave consent to participate, and provided some demographic information. Afterwards, they participated in a variant of the coin-toss task (e.g., Reference Zettler, Hilbig, Moshagen and de VriesZettler, Hilbig, Moshagen & de Vries, 2015) in which participants were asked to flip a fair coin 15 times and to report the total number of “Heads” observed. Importantly, we manipulated the minimum number of (reported) “Heads” needed to receive a bonus incentive of $0.75 (next to the flat fee of $0.75) between subjects. Specifically, we realized eight conditions in which the number of (reported) “Heads” required to obtain the incentive ranged from at least 5 (p = 94.08%) to at least 12 times (p = 1.76%).Footnote ³ For an exact overview of the conditions, see Table 1. To allow feasibility of the study, no higher ps than 94.08% were chosen (otherwise, a very large number of people would have needed to be invited in order to investigate cheating, because so many people would have won truthfully). Importantly, participants were informed about p (“The probability to flip at least X “heads” in 15 throws is X.XX %. That means that out of 10,000 participants, X would win on average.”). After the coin-toss task, participants were asked a control question on how high p (in their condition) was (“How high was the probability to flip at least X “Heads” out of 15 throws?”), and were given three possible answers (one correct). In line with our preregistration, this item was used for exploratory analyses.

Table 1: Overview of the conditions. “Heads” is the minimum number of “heads” needed to win the incentive.

2.1.2 Analysis plan

The analysis proceeded by using the multinomial processing tree (MPT) framework (e.g., Reference Erdfelder, Auer, Hilbig, Aßfalg, Moshagen and NadarevicErdfelder et al., 2009) as implemented in multitree (Reference MoshagenMoshagen, 2010). The model accounts for the fact that a certain proportion of the observed “win” responses occurs because participants actually obtained the target outcome (and thus did not cheat) by relating the observed responses to two non-observed states, p as well as the proportion of dishonest individuals (d): where p _k is the baseline probability of winning in the k-th condition (which thus becomes a constant), d _k denotes the (estimated) proportion of dishonest individuals, and p(win)_k is the (observed) proportion of participants indicating to have won (for details, see Reference Moshagen and HilbigMoshagen & Hilbig, 2017). Note that the model is applied by aggregating the responses of the participants in each condition. This basic structure was applied to all conditions (with different constant p _k parameters representing the actual probability of observing a favorable outcome in the respective condition as well as different freely estimated d _k parameters representing the proportion of dishonest individuals in the respective condition), leading to a joint multinomial model. To test whether there is a difference in the probability of cheating across conditions, equality constraints on the d parameters are placed and the model test statistic (G-squared) was evaluated for significance.

2.1.3 Participants

In order to determine an appropriate sample size for our study, an a-priori power analysis was conducted using multitree (Reference MoshagenMoshagen, 2010). We assumed the proportion of dishonest individuals (see Reference Moshagen and HilbigMoshagen & Hilbig, 2017) to range from 11.65% to 57.96% in the 8 experimental conditions, based on pilot data and assuming dishonesty to decrease linearly with the probability of observing a favorable outcome. Details of the pilot study can be found in the supplemental material (https://osf.io/b7vzd/). The chosen values correspond to an effect size of Cohen’s ω = 0.15 which is considered as a small to medium sized effect (Cohen, 1988). Participants were randomly assigned to the conditions using predefined allocation ratios, 1/(1−p _i), to ensure that a larger sample is available in conditions in which the probability of observing a favorable outcome is high (so that only a small fraction of the participants is actually in the position that cheating is necessary to obtain the incentive), thereby realizing an approximately equal standard error for each condition (Reference Moshagen and HilbigMoshagen & Hilbig, 2017). Given α = .05, this resulted in a required total sample size of N = 821 for a power of 1−β = .80 to detect differences across conditions. Considering slight oversampling (10%) and ensuring that every condition has a minimum of 60 participants (with largely balanced gender and age distributions), we planned to collect data from 1,054 participants. Due to slight oversampling on Amazon Mechanical Turk, the final sample size was N = 1,058.Footnote ⁴ Participants were relatively heterogeneous with respect to gender (49.24% female, 50.38% male, 0.37% other) and age (M = 37.17, SD = 11.80 years).

3.1.1 Design, materials, and procedure

Again, we set up an online study using the survey framework formr, recruiting a sample via the survey panel Amazon Mechanical Turk (http://www.mturk.com/. We invited only US residents with an approval rating of 95 or higher. Data were collected at two measurement occasions (T1 and T2) which were two days apart. This was done to avoid any direct influences of the completion of the personality questionnaire on the behavior in the cheating paradigm. At T1, participants received basic information about the study, gave consent to participate, provided some demographic information, and completed the HEXACO-60 (Reference Ashton and LeeAshton & Lee, 2009) as well as the Dispositional Greed Scale (DGS; Reference Seuntjens, Zeelenberg, van de Ven and BreugelmansSeuntjens, Zeelenberg, van de Ven & Breugelmans, 2015). Next to the five other basic personality dimensions of the HEXACO model (namely, Emotionality, Extraversion, Agreeableness vs. Anger, Conscientiousness, and Openness to Experience), the HEXACO-60 measures Honesty-Humility. Sample items for Honesty–Humility are “I wouldn’t pretend to like someone just to get that person to do favors for me”, or “I would never accept a bribe, even if it were very large.” The DGS measures dispositional greed and was added to this study from an exploratory point of view to test whether it predicts dishonest behavior (above Honesty-Humility). Sample items are “I always want more”, or “One can never have too much money.” Responses on both questionnaires were given on a five-point Likert Scale ranging from “strongly disagree” to “strongly agree,” and mean factor scores for each participant were computed (by averaging the Likert Scale responses for the 10 Honesty–Humility items and the 7 DGS items, respectively). In order to control for inattentive responding, we interspersed two attention check items in the questionnaires in which participants were asked to choose a certain response category.

At T2, participants worked on the same variant of the coin-toss task as in Study 1. We realized two conditions varying the probability of observing a favorable outcome, low (p = 1.76%) vs high (p = 69.64%). Those values were chosen as they are relatively low and high, and further yielded relatively low (d = .29) and high (d = .64) proportions of dishonest individuals in Study 1. As in Study 1, participants could earn a bonus incentive of $0.75 (next to a flat fee of $1.00; $0.50 for T1 and $0.50 for T2). Participants were informed about p (in their condition), and a corresponding control question was administered at the end of the study.

3.1.2 Analysis plan

The first hypothesis was tested in the MPT framework by restricting the d parameters to be equal across the probability and evaluating the change in the associated G ² statistic for significance.

To estimate the relation between the proportion of dishonest individuals and Honesty-Humility scores (Hypothesis 2), we applied the modified logistic regression model as proposed in Reference Moshagen and HilbigMoshagen and Hilbig (2017) using the RRreg package (Reference Heck, Thielmann, Moshagen and HilbigHeck & Moshagen, 2018). Given that the modified logistic regression model cannot account for varying baseline probabilities, H3 was again evaluated in the MPT framework by defining parameters reflecting the proportionate change in dishonesty depending on the probability condition (d _low/d _high) and testing whether the proportionate change is equal for individuals low and high in Honesty-Humility, thereby adopting a loglinear interaction conceptualization (Reference Kuhlmann, Erdfelder and MoshagenKuhlmann et al., 2019).

3.1.3 Participants

We based our sample size calculations on H3 predicting an interaction between the probability of observing a favorable outcome and Honesty-Humility, given that this hypothesis places the highest demands on an appropriate sample size. For the a-priori power analysis (conducted using multitree; Reference MoshagenMoshagen, 2010), we assumed in the low probability condition a proportion of dishonest individuals of d = .12 and d = .20 for individuals high and low in Honesty-Humility, respectively. In the high probability condition, we assumed d = .15 and d =.80 for individuals high and low in Honesty-Humility, respectively. This represents an interaction between the baseline probability p and Honesty-Humility such that the cheating rates of individuals low in Honesty-Humility are (proportionally) more strongly affected by baseline p than the cheating rates of individuals high in Honesty-Humility. The chosen values correspond to an effect size of Cohen’s ω = 0.07 which is considered smaller as a small effect (ω = 0.1, Cohen, 1988).

As in Study 1, participants were randomly assigned to the conditions using predefined allocation ratios, 1/(1−p _i). Given α = .05, this resulted in a required sample size of N = 1,480 for a power of 1−β = .80 to detect the aimed interaction effect. Initially, 2,526 participants completed T1. 70 participants failed to answer at least one of the attention checks correctly and were thus not invited for T2. To reach our required sample size, we opened a batch for 1,650 participants at T2. 1,661 participants completed the coin-toss task at T2. 66 of these failed to answer the control question regarding the objective baseline probability correctly, and were thus excluded. In turn, the final sample size consisted of 1,595 participants, and the sample was relatively heterogeneous with respect to gender (53.10% female, 46.46% male, 0.44% other) and age (M = 36.50, SD = 12.17 years).

4.1.1 Design, materials, and procedure

Again, we set up an online study using the survey framework formr, this time recruiting a sample via the survey panel Prolific (Reference Palan and SchitterPalan & Schitter, 2018). We invited only UK residents with a Prolific score of 95 or higher. The study was preregistered on the Open Science Framework (OSF; https://osf.io/b7vzd/). Data were collected at two measurement occasions (T1 and T2), seven days apart. This was done to avoid any direct influences of the completion of the personality questionnaire on the cheating paradigm. At T1, participants received basic information about the study, gave consent to participate, provided some demographic information, and completed the HEXACO-60 (Reference Ashton and LeeAshton & Lee, 2009), including one attention check item. At T2, participants worked on a variant of the mind game paradigm (e.g., Reference JiangJiang, 2013). In detail, participants were displayed a number of text strings with 10 characters length each (e.g., RCVfiPYbnY) and then were asked to write down one of them. Next, a randomly chosen text string was displayed and participants were asked whether the displayed text string matched the text string they wrote down beforehand. Importantly, in addition to their flat-fee for participation (T1 = £ 0.55, T2 = £ 0.40), participants received a bonus incentive of £ 0.40 when reporting that the target text string they wrote down and the displayed text string matched. Consequently, participants had the opportunity to cheat in order to obtain the bonus incentive by reporting that the text strings matched even if they did not. Importantly, unlike in the paradigms used in Study 1 and Study 2, the distance between the observed and the favorable outcome should not play a role in this paradigm (as there is no objective distance between text strings as compared to that there is an objective distance between the number of observed and the number of heads needed for the favorable outcome).

We varied the probability of observing a favorable outcome, namely, low (p = 2%) vs. high (p = 50%) for each participant. In detail, participants were displayed 50 text strings in the low probability condition (i.e., p = 2%) and two text strings in the high probability condition (i.e., p = 50%). p values were chosen to approximately reflect the conditions in Study 2, while allowing for simplicity of the cheating paradigm (i.e., p = 50% was implemented by displaying two strings only) and feasibility (e.g., overall expenses for paying participants) of the study.

4.1.2 Participants

An a priori power analysis was conducted using multitree (Reference MoshagenMoshagen, 2010). The approach was the same as for Study 2, but more conservative values for d were chosen, and it was aimed for a higher power. Specifically, in the low probability condition we assumed d = .105 for individuals with high Honesty-Humility scores and d = .20 for individuals with low Honesty-Humility scores. Further, in the high probability condition we assumed d = .15 for individuals with high Honesty-Humility scores and d = .80 for individuals with low Honesty-Humility scores. The above sketched setup corresponds to an effect size of Cohen’s ω = 0.06.

Quotas for each condition were then defined by 1:4 (C1:C4) to ensure that more participants were assigned to the condition (C1) in which cheating was more unlikely. Given α = .05, this resulted in a required sample size of N = 2,554 for a power of 1−β = .90 to detect such an interaction effect.Footnote ⁵ Aiming to oversample at the first measurement occasion, initially 3,070 participants completed T1. 32 participants did fail to answer at least one of the attention checks correctly and were thus not invited for T2. 2,813 participants completed the mind game task at T2. 165 of these failed to answer the control question regarding the objective baseline probability (in their condition) correctly. Thus, the final sample size consisted of 2,648 participants which were relatively heterogeneous with respect to gender (67.03% female, 32.66% male, 0.30% other) and age (M = 36.33, SD = 13.13 years).