2 Sample and variables used in the study

The data were drawn from the module on National Identity of the 1998 International Social Survey Program (ISSP): Religion II. The survey contains questions about attitude and beliefs, specifically:

• • “How often do you attend religious services at a church?” This question has six options: (1) never; (2) once a year; (3) two or three times a year; (4) once a month; (5) two or three times a month; and (6) at least once a week.

• • “How often do you pray?” This question has eleven alternative categories: (1) never; (2) once a year; (3) twice a year; (4) a few times a year; (5) about once a month; (6) two or three times a month; (7) almost every week; (8) every week; (9) several times a week; (10) once a day; and (11) several times a day.

• • “Do you believe in life after death?”

• • “Do you believe in heaven?”

• • “Do you believe in hell?”

The last three questions have the same four options: (1) yes, definitely; (2) yes, probably; (3) no, probably not; and (4) no, definitely not.

The promise of an afterlife serves as an incentive for believers to engage in religious behavior. Those who definitely believe in heaven are confident that they will be highly rewarded, thus belief in heaven can be considered a positive incentive (with p=1). On the opposite side, those who definitely believe in hell are confident that they will be highly punished after death. Therefore, belief in hell can be considered a negative incentive (with p=1).

After excluding respondents who did not answer some of the questions, the final dataset was comprised of about 10,840 Catholic subjects. Table 1 shows their distribution of beliefs:

Table 1: Distributions of beliefs for Catholics (%)

Table 1 reveals that afterlife incentives are important (the largest category is shown in bold). As can be seen, individuals are concerned with what happens after death, although the people that believe in a reward (heaven) are much more numerous than those who believe in a punishment (hell). On average, subjects are optimistic regarding afterlife outcomes.

Concerning beliefs about heaven and hell, Table 2 shows the contingency table of the responses by 10,840 subjects.

Table 2: Contingency table of responses of 10,840 subjects

Since we focus only on people who definitely believe or definitely do not believe (that is, the subjects appearing in bold in Table 2), the sample is reduced to 5,013 subjects.

Hence, we define a 2x2 factors design according to the type of incentives affecting subjects. As shown in Table 2 (in bold), we have:

• • Respondents affected by both types of incentives: positive and negative. They definitely believe in heaven (positive) and hell (negative). [n=2,726]

• • Respondents with positive incentives only. They definitely believe in heaven, but do not believe in hell at all. [n=377]

• • Respondents with no incentives. They do not believe in heaven or hell at all. [n=1,899]

• • Respondents with negative incentives only. They definitely believe in hell, but do not believe in heaven at all. Due to the small size of this group, it has been dropped. [n=11]

Using a stochastic dominance approach and the Kolmogorov-Smirnov test, we compare individual religious performance (church attendance and prayer) according to the type of incentive affecting each person. Basically, we compare the respondents with both types of incentives versus respondents with only positive incentives versus respondents with no incentives.

3 Stochastic dominance

Stochastic dominance is an abbreviated term for first-order stochastic dominance, which refers to a set of relations that may hold between a pair of distributions (Levy, Reference Levy1998). Stochastic dominance is usually applied to the analysis of income distribution and income inequality (for example, Davidson, Reference Davidson, Durlauf and Blume2006, and Davidson & Duclos, Reference Davidson and Duclos2000). The concept can, however, be applied in many other domains. Concretely, we can study the effectiveness of several incentives on church attendance and prayer using the stochastic dominance relation between the distributions of these two variables generated by these incentives.

In order to determine whether a relation of stochastic dominance holds between two distributions, the distributions are first characterized by their Cumulative Distribution Functions (CDF). For instance, in the previous section we saw that the question about church attendance has 6 response levels ranging from “never (1)” to “at least once a week (6)”. For a given sample, the value of the CDF at level a is the proportion of subjects in the sample that do not go to church more than a.

Suppose we find the following “radical” situation. We have two different samples of subjects. The people in the first sample are not so religious (in terms of church attendance), while in the second sample, subjects attend church very frequently. The relative frequencies and CDFs for each level of church attendance for both samples are presented in Table 3.

Table 3: Relative frequencies and CDFs for each level of church attendance for both samples

Clearly, the second sample contains subjects who engage in religious practices with greater frequency. Figure 1 shows the cumulative distribution functions of these two samples.

Figure 1: Cumulative distribution functions of religious frequency for two samples.

Let us now introduce the concept of stochastic dominance.

Definition 1

Suppose that we consider two distributions A and B, characterized respectively by the cumulative distribution functions F _A and F _B. Then distribution B dominates distribution A stochastically (at the first order) if, for any argument a, F _B(a)≤ F _A(a).

In our example, inequality is F ₂ (a)≤ F ₁ (a), for all a, that is, the distribution of church attendance in the second sample stochastically dominates (is always below) the distribution in sample 1. This means that the proportion of subjects in each level in F ₂ is always less than or equal to the proportion of subjects in each level in F ₁.

In other words, Sample 2 is formed by more religious people (in terms of church attendance) than Sample 1. For this reason we say that the second sample “dominates” the first one since Sample 2 has more subjects in the upper categories of the ordinal variable we are studying (church attendance)Footnote ².

With this type of data, where the distribution functions do not cross in any point, the criterion of first order dominance allow to compare the behavior of several sub-samples in an easy and graphical way. In addition, this method does not demand any hypothesis about the distribution shape, and it uses all the points of the distribution.

In the next section we use this approach to explore the effect of incentives on religious performance.

4 Incentives on religious performance

In Section 2 we selected 5,002 Catholic subjects who definitely believe or definitely do not believe in heaven and hell. The subjects have been divided into three samples according to what types of incentives (beliefs) affect them: people affected by both incentives (heaven and hell), people affected by the positive incentive only (heaven) and people with no incentives. In Tables 4 and 5, the CDFs of church attendance and prayer are given for the three samples:

Table 4: CDFs of attendance

Table 5: CDFs of prayer

Figures 2 and 3 show the cumulative distribution functions. In both figures, the “both incentives” distribution was found to stochastically dominate the “no incentives” and “positive incentives” distributions. Moreover, the “positive incentives” distribution stochastically dominates the “no incentives” distribution. At all attendance and prayer levels, the CDF values of “both incentives” are smaller than the CDF values of the other two samples. As we explained in Section 3, this means that there is a higher proportion of practicing subjects (church attendance and prayer) among people who are affected by negative and positive incentives than in the other groups.

Figure 2: CDFs for attendance

Figure 3: CDFs for prayer

The differences between distributions can be statistically corroborated using the Kolmogorov-Smirnov test.Footnote ³ In Table 6 we present the statistics and significance of this test to compare the distributions of church attendance and prayer among the three samples:

In sum, we find that:

1. 1. The effects of “both (positive and negative) incentives” are different from “positive incentives only”;

2. 2. The effects of “positive incentives only” are different from “no incentives”.

Furthermore, the positive incentives effect is large, whereas the negative incentives effect is smaller. We obtain this result by comparing the net effects of “both incentives” versus the net effect of “positive incentives only”. When we remove the “negative incentives” effect, that is, when we jump from the “both incentives” sample to the “positive incentives” sample, attendance and prayer distributions are closer than when we remove the “both incentives” effect, that is, when we jump from the “positive incentives” sample to the “no incentives” sample. This can be viewed graphically in Figures 2 and 3 and by numerically calculating the mean differences between the CDF values.

For attendance distribution, the Mean Differences (MD) are:Footnote ⁴

We observe that the distance between the “positive incentives” distribution and the “no incentives” distribution is larger than the distance between the “positive incentives” and “both incentives” distributions.

For prayer distribution, the mean differences are:

The “positive incentives” effect is stronger for prayer than for attendance distribution. When we only remove the “negative incentives” effect (jumping from the “both incentives” sample to the “positive incentives” sample), the behavior of the prayer distribution is similar in both samples (the MD between both CDFs is 7.93).

Table 6: Kolmogorov-Smirnov tests (p-values in parentheses). Positive incentives only