Drinking quantity

For drinking quantity, equating A across sex led to a significant reduction in model fit in both samples (χ ²_au = 5.47, p _au = 0.02; χ ²_us = 3.81, p _va = 0.05), with A for males being large and statistically significant, Am_au = 0.33 (95% CI [0.27, 0.46]) and Am_va = 0.36 (95% CI [0.27, 0.45]), and smaller and not significant in females, Af_au = 0.05 (95% CI [0.00, 0.18]) and Af_va = 0.07 (95% CI [0.00, 0.20]). D showed the opposite pattern of effects: large and significant in females, Df_au = 0.25 (95% CI [0.05, 0.35]) and Df_va = 0.21 (95% CI [0.08, 0.32]) and small and non-significant in males, Dm_au = 0.06 (95% CI [0.00, 0.29]) and Dm_va = 0.01 (95% CI [0.00, 0.19]). Importantly, dropping both A and D from the model substantially reduced model fit (χ ²_au = 61.23, p _au < .01; χ ²_va = 61.95, p _va < .01), implying genetic factors, broadly, have a very large impact on drinking quantity. The non-parental shared environment was significant and could be equated across sex in both samples (χ ²_au = 0.33, p _au = .57; χ ²_va = 0.43, p _va = .24; χ ²_au = 7.42, p _au = 0.02; χ ²_va = 25.46, p _va < .01). The non-parental shared environment had contributed a small amount to the variation in drinking quantity for each sex, Sm_au = 0.05 (95% CI [0.00, 0.14]), Sf_au = 0.09 (95% CI [0.03, 0.15]), Sm_va = 0.07 (95% CI [0.03, 0.15]), and Sf_va = 0.16 (95% CI [0.10, 0.20]). None of the other environmental variance components were significant in both samples. Notably, assortative mating was highly significant in both samples (χ ²_au = 600.82, p _au < .01; χ ²_va = 1,331.86, p _va < .01). Clearly, drinking quantity affects mate choice.

Drinking frequency

For drinking frequency, dropping A or D individually did not significantly reduce the fit of the model in both samples; however, dropping both A and D resulted in a substantial decrease in the model fit (χ ²_au = 61.95, p _au < .01; χ ²_va = 51.60, p _va < .01), implying that genetic factors strongly influence the frequency of alcohol consumption and underscoring the compensatory relationship between estimates of A and D. The S variance component consistently related to drinking frequency accounted for a small amount of variance in the Australian sample, Sm_au = 0.06 (95% CI [0.01, 0.15]) and Sf_au = 0.09 (95% CI [0.02, 0.16]), and a moderate amount of variance in the Virginia sample, Sm_va = 0.18 (95% CI [0.10, 0.29]) and Sm_va = 0.23 (95% CI [0.12, 0.29]). Again, the assortative mating parameter is highly significant for both samples, implying that how often an individual drinks alcohol is a major factor in mate choice.

Number of drinks in the past week

While both genetic factors contribute to the number of drinks consumed in the past week, the D appears to contribute more variance than the A. Specifically, in Australia, the contribution of the non-additive genetic factor is moderate for both sexes, Dm_au = 0.26 (95% CI [0.12, 0.41]) and Df_au = 0.30 (95% CI [0.19, 0.42]), and in Virginia, it is slightly smaller for males, Dm_va = 0.17 (95% CI [0.06, 0.25]), but not significant for females, Df_va = 0.03 (95% CI [0.00, 0.13]). In females, but not males, the environment also contributes to the variance in the number of drinks consumed in the last week, but in Australia, the environmental factors are seen in S, Sf_au = 0.17 (95% CI [0.02, 0.34]), while in Virginia they are seen in T, Tf_va = 0.25 (95% CI [0.18, 0.31]). As with the previous phenotypes, the parameter for assortative mating is highly significant.

Age at first drink

The age when people first drank alcohol followed a substantially different pattern of transmission from the other phenotypes. Genetic factors did not contribute to the variance in age of onset in either sample for either sex (χ ²_au = 0.72, p _au = .95; χ ²_va = 0.04, p _va = 1.00). Instead, T and S were the primary contributors to the phenotypic variance. The environmental parameters, however, were not consistently significant across sexes and samples. In Australia, S was larger for females, Sf_au = 0.23 (95% CI [0.10, 0.36]), than for males, Sm_au = 0.13 (95% CI [0.03, 0.21]), while T was larger for males, Tm_au = 0.22 (95% CI [0.10, 0.33]), than for females, Tf_au = 0.14 (95% CI [0.04, 0.26]). Alternatively, in Virginia, S was not significant for either sex (χ ²_va = 4.01, p _va = .14), but T was significant for females, Tf_va = 0.29 (95% CI [0.05, 0.43]). Despite this inconsistency, the joint hypothesis test of all the environmental parameters suggests that environmental factors are strongly related to the age people start drinking (χ ²_au = 2,910.26, p _au < .01; χ ²_va = 15.98, p _va = .04). Notably, a large proportion of the variance is due to unshared environmental factors. As with the previous phenotypes, the age at first drink was significantly correlated between spouses.

Comparing the ET and twin-only designs

Table 3 provides the standardized variance components for the ET and twin-only designs for each of the four phenotypes. To compare the ET with the twin-only design, the sum of the genetic variance components from the ET model (A, D, and A via assortment) was compared with the A component of the twin model and the sum of the systematic environmental components of the ET model (S, T, cultural transmission, and cultural transmission via assortment) was compared with the C component of the twin model. The E components were directly compared between the ET and the twin models. Because the ET model uses data from all available relatives, while the twin model only uses data from the twins, the models are not nested. Our test of the difference between the ET and twin-only models, therefore, is whether the sum of the relevant variance components from the ET model falls within the 95% confidence interval of the corresponding statistic in the twin model.

A brief look at Table 3 shows a high level of consistency between the ET and the twin-only models. Across the four phenotypes in both sexes in the two samples, there are 48 comparisons between the classical twin model and the ET model (four phenotypes × two samples × two sexes × three variance components—A, C, and E). A total of 13 of these 48 comparisons were significantly different between the models: the A component was significant in three comparisons, the C component was significant in seven comparisons, and the E was significant in three comparisons. Because we are examining standardized proportions of variance, however, if one of the variance components increases, then the other two correspondingly decrease.

It is instructive to examine the specific instances where the ET and twin models diverge. The first discrepancy occurred for drinking frequency in the Virginia males. Here, the genetic components from the ET model were significantly lower than A from the twin model, while the environmental components were significantly higher than C from the twin model. For drinking frequency in the Virginia females, the E component from the ET model was significantly larger than the E component from the twin model, with no differences in the A or C components. It is important to note that for drinking frequency in the Virginia sample, the cousin correlations (as can be seen in Figure 2) are a higher than would be expected, which influences the estimates of both the broad genetic factors and environmental factors.

There is also a discrepancy between the ET and twin models for age of first drink in the Australian sample. For males, the systematic environmental components in the ET model are higher than the C estimate from the twin, while the E estimate in the ET model is lower than the twin estimate. By contrast, for females, the systematic environmental components in the ET model are lower than the C estimate from the twin model. In this case, the MZ male correlations are substantially lower than we expected, as can be seen in Figure 2, though the correlations are consistent for MZ males across samples. Because of this, utilizing the genetic and environmental contributions from other family members likely provides a more realistic estimate of the environmental factors than we observe from the twin-only model.

In total, 7 of the 13 observed discrepancies between the ET and twin model are found for the number of drinks in the past week. Due to the question wording, we expected this variable to have a reasonable amount of measurement error, as is indicated by relatively large E components and correspondingly lower correlations between relatives. Again, most of the discrepancies between the ET and twin models were a function of differences in the environmental variance components. Furthermore, the distribution number of drinks consumed in the past week was skewed, and while this did not affect the broad conclusions about the mode of transmission, it could affect hypothesis testing between the ET and twin-only designs.

Despite these somewhat minor differences, we conclude that the consistency between the estimates in the twin-only design and the sum of the parameters from the ET design is very high, often within a few percentage points. If the twin-only estimates are interpreted as the broad-sense heritability and environmental variance components, there is minimal deviation from the ET results. The ET model, however, provides enhanced specificity regarding the specific genetic or environmental variance components. In contrast with expectation regarding the confluence of A and D, the observed deviations between the twin and ET models seem to focus on the environmental variance components, especially in the models for the number of drinks that the respondent consumed in the last week. Importantly, the differences between the ET and twin models do not appear to be systematic. Sometimes the ET parameter is higher than the corresponding twin estimate, while at other times it is lower. If the bias in the twin models was consistently higher (or lower) than the ET model, it would be cause for concern. In the current analyses, this is not the case, and we are not overly concerned.

Comparing the Australia and Virginia samples

The pattern of results was remarkably consistent across the two countries. The analyses focus on parameters that were significant in both samples, that is, the strongest and most replicable results. It is possible that in doing so we are overlooking findings that are specific to one sample and overemphasizing the similarity. In this section, we focus on these differences but reiterate that the differences between samples are minor.

As would be expected, the differences between the samples seem to focus on the environmental variance components. Specifically, for drinking quantity, the S and T parameters are larger for the Virginian females, Sf_va = 0.16 (95% CI [0.10, 0.20]) and Tf_va = 0.08 (95% CI [0.01, 0.17]), than for the Australian females, Sf_au = 0.09 (95% CI [0.03, 0.15]) and Tf_au = 0.02 (95% CI [0.00, 0.07]). For drinking frequency, for both sexes, the S parameters are larger in the Virginia sample, Sm_va = 0.18 (95% CI [0.10, 0.29]) and Sm_va = 0.23 (95% CI [0.12, 0.29]), relative to the Australia sample, Sm_au = 0.06 (95% CI [0.01, 0.15]) and Sf_au = 0.09 (95% CI [0.02, 0.16]). Inversely, for age at first drink, the environmental factors, T for males and S for females, are larger in the Australia sample, Tm_au = 0.22 (95% CI [0.10, 0.33]) and Sf_au = 0.23 (0.10, 0.36]), relative to the Virginia sample, Tm_va = 0.00 (95% CI [0.00, 0.11]) and Sf_va = 0.03 (95% CI [0.00, 0.16]).

There was one situation where the genetic factors seemed to differ across the samples. Specifically, for the number of drinks consumed in the past week, the Australian females had a larger non-additive genetic variance component, Df_au = 0.30 (95% CI [0.19, 0.43]), than their Virginia counterparts, Df_au = 0.02 ((95% CI [0.00, 0.13]).

Cultural transmission

One of the (more interesting) factors that can be estimated in the ET model that cannot be estimated with twins alone is cultural transmission from parents to children. For three traits, cultural transmission significantly contributes to variance in the offspring's drinking behaviors: drinking quantity, drinking frequency, and the number of drinks in the last week. The pattern of results that emerges is quite interesting from a socialization perspective. For drinking quantity in both samples and drinking frequency in Virginia, the mother-to-daughter transmission appears to be driving cultural transmission. Alternatively, for the number of drinks consumed in the past week, within-sex (father-to-son and mother-to-daughter) transmission appears to be important. In toto, it appears that insofar as these are environmental effects, children model their normal drinking behaviors on their same-sex parent, particularly females, notwithstanding differences due to genetic segregation.

Gene-environment covariation

With the ET model, it is possible to estimate passive gene-environment covariation. In four models, gene-environment covariation is significant: drinking quantity and frequency in the Virginia females and the number of drinks in the past week for the Virginia males and the Australian females (which is in the opposite direction). This significant, passive gene-environment covariation implies that parental drinking behavior (which is a function of the parental genotype) creates an environment that is conducive to corresponding drinking behaviors in their offspring. Parents who have a higher genetic load for drinking create environments that encourage higher levels of drinking in the subsequent generation. While these effects are intriguing, it is important not to overemphasize these effects, as they are small, inconsistent, and have very large confidence intervals.