Autism is a neurodevelopmental disorder typified by striking deficits in social communication and genetically by a mixture of de novo and inherited variation contributing to liability. Rare variants clearly have a role in liability, with the contribution of de novo variation being the most obvious and easy to characterize, but inherited rare variation also has a role11,12. The contribution from inherited common variation is less substantiated. A handful of genome-wide association studies (GWAS) have been conducted in which significant findings have been few and specific to a single GWAS13,14,15. The results mirror those from the early GWAS analyses for schizophrenia, which, in retrospect, were underpowered, as evidenced by replicable associations involving common variants found in studies of tens of thousands of subjects10. In another parallel with early GWAS for schizophrenia, one of the first rays of hope for understanding how common variants affect liability came from the use of genetic scores, which were built from a large number of common variants and were shown to predict liability reliably16. For autism, scores also predict risk13. Some of the SNPs conferring risk for schizophrenia appear to also confer risk for autism17, a result that complements those for copy number variants (CNVs)18,19.

A natural complement to genetic scores from common variants is the estimation of narrow-sense heritability from the same variants. Two recent studies estimate heritability attributable to common variation to be substantial9,10, yet one estimates heritability at roughly 50% (Fig. 1) and the other estimates heritability at 17%. As described in the reports9,10, there are several technical reasons for these differences, one being quite different study designs and another being differences in ascertainment. As we shall show here, 50% seems more realistic.

Figure 1: Results for PAGES (Population-Based Autism Genetics and Environment Study), the Swedish study of the heritability of autism. (a) Heritability estimate (95% confidence interval) compared across study designs and analytical methods. The horizontal reference (dashed) is the PAGES estimate of heritability from SNP genotypes. Twin studies: (1) Californian twins for strictly defined autism (95% confidence interval = 8–84%), the largest twin study thus far using diagnosis only20; (2) Swedish twins of 9–12 years of age (95% confidence interval = 29–91%)32 and (3) Swedish twins of 9–12 years of age characterized for a quantitative measure of autism (most extreme cutoff; 95% confidence interval = 44–74%)33. SNP-based estimates of heritability: (4) Swedish family study (95% confidence interval = 44–64%)21; (5) simplex cases versus population controls (95% confidence interval = 26–73%)9 and (6) multiplex autism cases versus population controls (95% confidence interval = 38–93%)9. SNP-based estimates from the PAGES study, assuming prevalence (K) = 0.3%: (7) heritability due to common variants using autism cases versus population controls (95% confidence interval = 31–69%) and (8) total narrow-sense heritability due to both common and rare variation using smoothed estimates of relatedness (95% confidence interval = 35–71%). (b) Heritability per chromosome versus chromosome length. (c) Prevalence by county for all 21 counties in Sweden tallied by birth year cohort. Each box plot has a lower tail that extends from the minimum county-level prevalence to the 25th percentile; a central box that begins at the 25th percentile and ends at the 75th percentile, with a line demarcating the median prevalence; and an upper tail that extends from the 75th percentile to either (i) the maximum county-level prevalence (in the absence of any outliers) or (ii) a value of the 75th percentile + 1.5 times the vertical distance covered by the box—in this case, any outliers that exceed this end of the tail are noted by circular points on the plot. (d) PAGES heritability versus the population prevalence of autism for two estimators of heritability: case-control contrast using SNP genotypes (green) and total heritability from smoothed relationships among subjects, based on SNP genotypes (blue). Beyond the analysis of the PAGES study, we applied meta-analysis of selected h2 estimates (Online Methods) to obtain h2 = 51.4% (s.e.m. = 5.2%), which corresponds to a 95% confidence interval of 41.0—61.8%. Contrasting this with the comprehensive estimate of h2 obtained from the Swedish family study (h2 = 54%, s.e.m. = 5%) produces an estimate of h2 due to rare variants of 2.6% (s.e.m. = 7.2%, 95% confidence interval = 0–17%). Hence, we conclude that common variants explain the bulk of the heritability for autism, at least 41% of the variability, and rare variants explain at most 17%, on the basis of the upper and lower bounds of the respective 95% confidence intervals. Full size image

In any case, neither of these values approaches those from early twin studies, which place autism heritability close to 100% (see Supplementary Table 1 for data and discussion). Still, results from early studies could be compatible with estimates from common variants (Fig. 2). The key issue is that early twin studies of autism assumed that the genetic covariance of monozygotic twins was determined solely by additive effects and that non-additive and de novo effects on monozygotic similarity could be ignored. These are dubious assumptions, creating ample room for the discrepancy observed between study designs. In contrast, a recent large study of twins places heritability at 38% (ref. 20) (Figs. 1a and 2) under the same assumptions.

Figure 2: Results regarding the genetic architecture of autism spectrum disorder. Variance in autism liability is determined by genetic and environmental factors. The genetic factors include additive effects (A), non-additive effects (D; dominant, recessive, epistatic) and de novo mutations (N). Environmental factors are split between common or shared environment (C) and stochastic or unique environment (E). (a) Early-autism twin studies estimate additive effects from the contrast of monozygotic (MZ) and dizygotic (DZ) correlations while assuming that non-additive effects and de novo mutations are zero. These are common assumptions for ACE (additive genetics, common environment, unique environment) heritability models but are unlikely to be appropriate for autism. (b) Applying the ACE model to the largest autism twin study thus far yields a lower estimate of additive heritability. (c) Heritability results using a more extensive set of family relationships and based on much of the population of Sweden. (d) Results from the PAGES study (see Fig. 1). (e) Contribution of the various factors to the variance in autism liability according to family relationship. De novo variation should not be shared in dizygotic twins, and, when it appears to be, it is almost surely inherited variation from a parent with gonadal mosaicism because the chance of the same mutation appearing de novo in the dizygotic twins is negligible. Most twin studies assume that common or shared environment is the same for monozygotic and dizygotic twins, although this approximation has been debated. Of note, the excess covariance of monozygotic twins relative to dizygotic twins is 1/2A + 3/4D + N as opposed to the 1/2A value assumed in the ACE model. Sibs, siblings. (f) Synthesis of results for the genetic architecture of autism (ASD). Full size image

To resolve this conundrum, we are evaluating a population sample by a variety of genetic analyses to estimate the relative contributions of rare, common, inherited and de novo variation to overall liability. We have ascertained subjects with strictly defined autism ('autistic disorder') from a Swedish epidemiological sample (Population-Based Autism Genetics and Environment Study, or PAGES).

Concurrently, a comprehensive study of autism in Sweden has been ongoing, and it recently reported the largest study of familial risk thus far21. This Swedish family study, a population-based cohort of all Swedish children born from 1982 to 2007 and a registry of all diagnoses before 2010, includes more than 1.6 million families with at least 2 children, yielding 5,799,875 cousin pairs, 2,642,064 full-sibling pairs, 432,281 maternal half-sibling pairs, 445,531 paternal half-sibling pairs and 37,570 twins. Of the 14,516 cases of broadly defined autism, 5,689 (39%) have a strict diagnosis. This massive homogeneous sample permits the precise estimation of relative recurrence risk for autism, given the diagnosis in relatives from monozygotic twins to first cousins and after modeling covariates such as sex, birth year, parental psychiatric history and parental age at birth. By analyzing these recurrence risk rates for additive and non-additive genetic effects and shared and non-shared environmental effects, the best model consists of only additive genetic and non-shared environmental effects and yields quite precise estimates of the narrow-sense heritability of autism (h2 = 54%, s.e.m. = 5%).

The Swedish family study provides a sound foundation from which to address other questions about the genetic architecture of autism using PAGES. There are no major differences in the population and samples underlying both studies. To estimate heritability for PAGES, controls were sampled from the Swedish population, and both cases and controls were genotyped on a common genotyping platform. After genotyping and quality control, we analyzed data from 531,906 SNPs characterized for 3,046 subjects, 466 with autism and 2,580 subjects10 not known to be affected.

We used the software package GCTA22 to estimate the heritability due to common variants, that is, SNP-based heritability. To ensure that all cases and controls were essentially unrelated (no pairs with kinship greater than 5th-degree relatives), 151 individuals were excluded. The resulting estimate of total variance in liability explained by measured SNPs was 49.4% (s.e.m. = 9.6%) (Fig. 1a). This heritability estimate compared remarkably well with findings based on independent data from population samples and similar methods9. The common variation imparting this heritability was distributed roughly uniformly across the chromosomes (Fig. 1b), an expectation of polygenic inheritance that is reflected in the significant correlation between heritability per chromosome and chromosome size (r = 0.49, P = 0.018). Prevalence of strictly defined autism, required to calculate heritability, was set to 0.3% (Fig. 1c and Supplementary Fig. 1) for these heritability calculations. The estimate is a lower bound for total narrow-sense heritability because it includes contributions from causal variants not tagged by the measured SNPs. Although synthetic association23—a pileup of rare risk variants in linkage disequilibrium with a common variant—could account for a small fraction of this heritability, this fraction cannot be large, as described below and previously24,25.

To obtain an estimate of the heritability due to both common and rare variation, we next included more closely related individuals. In a traditional analysis of heritability, for example, the Swedish family study, the relationship matrix is given. Instead, we estimated relationships from the SNPs genotyped for PAGES. Because estimates of relationship from SNP genotypes tend to be noisy, we used treelet covariance smoothing26 to improve estimates of pairwise relationship, especially for more distantly related individuals, and thereby refine estimates of heritability26. When we included relatives, albeit mostly distant (Supplementary Fig. 2), the estimated total heritability was 52.4% (s.e.m. = 9.5%). Although estimates were somewhat sensitive to prevalence, the differences between SNP-based heritability and heritabilities based on estimated relatedness were insensitive to prevalence (Fig. 1d): at any prevalence, the difference was approximately 3%. To evaluate how successful this approach would be at partitioning sources of heritability, we performed a simple simulation experiment that demonstrated that we could successfully partition heritability into the portions explained by common and rare variants (Online Methods).

Previous work has shown that autism heritability could fluctuate substantially when the bulk of the sample comprised simplex families, which lower heritability, versus multiplex families, which increase heritability9. These observations are consistent with liability being a classical quantitative genetic trait. Because PAGES is population based, it has no obvious simplex/multiplex ascertainment bias. Still there could be sources of more subtle bias. On the basis of the conjecture that subjects with intellectual disability and autism have a greater fraction of liability determined by de novo variants, one obvious bias would be misclassification of individuals who are comorbid for intellectual disability and autism as having one or the other disorder. To evaluate this issue, we first determined the diagnostic classification of Swedes, according to governmental records. In this population, 43.6% of subjects with autism also had intellectual disability, a rate comparable to those in other populations (note that strictly defined autism had a higher rate of comorbidity with intellectual disability than broadly defined autism). Next, to determine whether IQ has a substantial impact on heritability, we contrasted two estimates based on data from the Autism Genome Project (AGP): using the full sample, heritability equaled 51.1% (s.e.m. = 4.8%; n = 2,097), whereas, for subjects with IQ > 80, heritability was slightly but not significantly larger (59.3%, s.e.m. = 7.8%; n = 871). Subjects in the sample met broad criteria for an autism diagnosis; for the subset of individuals given a strict diagnosis, heritability was 52.3% (s.e.m. = 6.2%; n = 1,242).

Next, we asked how much of the variance in liability for autism could be explained by de novo mutations, applying the standard liability model to reported rates for de novo CNVs and loss-of-function mutations in autistic subjects and their siblings from the Simons Simplex Collection (SSC). In this sample, structured to enrich for de novo CNVs and loss-of-function mutations, the contribution of these variants to the variance in liability was 2.6% (Supplementary Tables 2 and 3, and Supplementary Note). Yet, de novo events can have a large impact on liability, and 14% of subjects carried such mutations: roughly 80% of subjects who were carriers of a de novo CNV would not be affected if they were not carriers; likewise, for carriers of de novo loss-of-function mutations, 57% would not be affected (Supplementary Note).

The estimate of heritability could indirectly include dominant or non-additive effects but should not include the impact of recessive inheritance. A recent study estimated the contribution from rare, recessive variation to be about 3% (ref. 27), a contribution similar to that from the additive effects of rare variants. Rare hemizygous loss-of-function mutations accounted for another 2% of liability.

We conclude that inherited rare variation explains a smaller fraction of total heritability than common variation (Fig. 2). Although uncertainty is inherent in all of these estimates (Fig. 1), the results converge on a total heritability in the range of 50–60%, with common variants explaining the bulk of it. Our analyses illustrate an approach to identify the contribution of rare and common variation to the heritability of any phenotype28. Estimating the total contribution of genetic variation to variation in liability, which includes non-additive effects and de novo variation, is more challenging. If the only non-additive effects of genes were due solely to recessive inheritance, roughly 5% would be added to the total, but that estimate could be low on the basis of both theoretical and empirical grounds29,30. And, although 14% of affected subjects carry de novo CNV and loss-of-function mutations, the contribution of these mutations to the variance in liability is only 2.6%. Summing these estimates suggests that genetic variation accounts for roughly 60% of the variation in risk for autism in Sweden, implying that the majority of risk is due to genetic variation.

By contrast, a recent twin study found that shared twin environment accounts for the majority of the variation in risk, 55%, on the basis of a population sample of Californians from the United States. These different populations could have different genetic architecture or there could be an unknown sampling bias. Alternatively, the California study fits many parameters to a relatively small data set—concordance rates on 54 monozygotic pairs and 138 dizygotic pairs—from which the study selects the best model on the basis of statistical criteria. For small samples, however, the correct model, the one truly generating the data, can be quite different in structure from the selected model, and yet the two can have only small differences in likelihood. It is possible that the different conclusion of the California study in comparison to others of its design is due to a modest stochastic difference that altered model selection. In this regard, a cautionary note for all such studies, including ours, is worthwhile: although we assume here a simple model structure, ours is but one of many possible models that could underlie trait covariance (for example, see ref. 31). The assumed model can alter inference, sometimes substantially, and many of these models can fit the data almost equally well. Nonetheless, the finding that all Swedish studies, regardless of design, converge on similar estimates of heritability lends strong support for our conclusion that the bulk of risk for autism arises from genetic variation.