1. The CD/CV hypothesis is unlikely to fit SZ

First, we can see that the common disease/common variant (CD/CV) hypothesis [35], [36] is unlikely to fit SZ. The standard version of the criterion B implies that the OR of every risk allele with a population frequency between 0.05 and 0.95 is less than 1.04 (Table 4). The weaker version implies that the OR of every risk allele with a population frequency between 0.04 and 0.945 is less than 1.50 (Table 5). Therefore, given the standard range of mutation rate (), the effect size and the population frequency of a nuclear risk variant for SZ cannot simultaneously satisfy the expectations in the CD/CV hypothesis, in which common alleles at a handful of loci are assumed to interact to cause a common disease.

2. Nuclear risk variant for SZ of moderate effects, if present, should be either rare or very common

As previously mentioned, the persistence criteria argue against the CD/CV hypothesis. However, it does not necessarily mean that only the multiple rare variant model [37], [38] fits SZ. The standard version of the criterion B implies that the frequency of a pathogenic variant of a moderate effect () in the ncDNA, if present, should be either very low in the affected population () or very high in the normal population () (Table 5). The weaker version implies that the frequency of a nuclear susceptibility variant of a moderate effect should be either low () or high () (Table 5). Thus we can see that given the standard range of mutation rate nuclear genes of moderate effects for SZ, if present, are limited to either ‘rare variants’ or ‘very common variants’.

‘Very common variants’ for a deleterious disease might seem at odds; how could variants associated with a deleterious disease ever have become so common in spite of the enormous cost the species should pay for?

Given a much smaller effective population size in ancient times, ‘ancestral heterozygote advantage’ and genetic drift, coupled with less pronounced reproductive disadvantage of the ancestral patients, could provide an explanation. Although the ancestral patients might also show a reduced reproductive fitness, the reproductive disadvantage could have been less pronounced in ancient environments because many patients could have children before the onset of their illness; individuals in ancient times might have their first children at a lower age (15–20 years = adolescence) than individuals in modern times (25–30 years; see section 4 in Method). Advantages of the unaffected siblings such as everyday creativity could better work to increase their reproductive fitness in ancient times than today. In addition, the effective population size might be much smaller in ancient times. Thus, susceptibility genes could have been neutral or almost neutral (selection coefficient ;  =  the effective population size) in ancient times. Then, pathogenic but neutral or almost neutral genes in ancient environments could be fixed at a high frequency close to 1 by genetic drift (because the effective population size might be much smaller and the effects of genetic drift might be predominant in ancient times) and can be sustained by mutation-selection balance today.

For the past two years several large-scaled association studies including GWAS for SZ have been reported [31]–[34], [39]–[45]. These reports have essentially ruled out the likelihood of a few common variants conferring the majority of SZ heritability. On the other hand, several groups have shown that both de novo and inherited rare variants including copy number variants (CNV) with high odds ratios are associated with SZ [46]–[51]. Although the roles of these rare variants in the pathogenesis of SZ remain unclear, these reports seem to be in line with the predictions of the persistence criteria. However, no reports have identified ‘very common variants’ associated with SZ to date.

3. The largest GWAS to date lacks the power to identify a common variant of the average mutation rate

The persistence criteria predict that common pathogenic variants, if present, can have only tiny effects. Nevertheless, identification of common pathogenic variants would be much more difficult than previously thought. The persistence criteria imply that the sample size required in an association study for SZ with a given power depends on the mutation rate at the putative risk locus as well as the population frequency of the putative pathogenic variant. Thus we can see that an enormous sample size is required to identify a common pathogenic variant of a standard mutation rate (Table 6 and 7). For example, more than the half of all the SZ patients in the world (; we assume here a total human population of and a prevalence of 1%) and the same number of control subjects should be recruited to the association study to identify a common variant (population frequency: 0.1–0.9) at a putative risk locus of a mutation rate with a power 0.95 (Table 6). When the mutation rate is assumed to be average, more than one million case-control pairs are required to identify a common variant in a GWAS with a power 0.8 (Table 7).

Because the sample size of the largest GWAS and association studies to date is far less than 50,000 case-control pairs (Tables 10 and 11), those studies lack the power to identify a common pathogenic variant of the average mutation rate (Tables 8 and 9). The power of the GWAS to identify common variants of the highest mutation rate has merely reached to the level of ∼0.1 for the past two years (Tables 7 and 9).

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Table 10. Pooled sample sizes in association studies for top 30 genes at SZGene [30].

https://doi.org/10.1371/journal.pone.0007799.t010

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Table 11. Sample sizes of GWAS for SZ to date.

https://doi.org/10.1371/journal.pone.0007799.t011

4. Too strong association implies that the variants may not confer susceptibility

Since the criterion A demands a small upper limit of the case-control difference of the allele frequencies, too strong association imply that the allele may not confer susceptibility to SZ. Especially, common variants associated with SZ in an association study with a sample size smaller than the estimations in the Tables 6 and 7 are unlikely to contribute to risk of SZ.

Let us consider the cases of the SNPs in the Table 2. Among the 36 SNPs that have significant P values in the meta-analyses at SZGene, 9 SNPs can fulfill the weaker version of the criteria only if they have the highest mutation rate. However, the remaining 27 SNPs cannot meet the criteria unless they have exceptionally high mutation rates (). For example, the G-allele of rs1019385 (GRIN2B), which shows P = 0.0005 in the meta-analysis, cannot meet the criteria unless the mutation rate of the locus is higher than . However, this value may be too high as compared with the upper limit of mutation rates on autosomes and X chromosome (). Alternatively, this SNP must be a protective or resistance gene (i.e. a gene elevating the carrier's fitness by reducing the liability to the disease as well as the severity of the disease).

It should be noted that high mutation rates () have been reported on human Y chromosome [52]. Therefore, common variants on Y chromosome or on the pseudoautosomal regions of X chromosome where abundant mutation could be supplied by synapsis and crossing over with Y chromosome, could meet the persistence criteria. In this case, however, putative risk loci would be highly polymorphic because of abundant mutation supply. Common CNVs also could meet the criteria, if they have extremely high mutation rates ().

In the future, with expansion of the sample size and pooled data, GWAS and meta-analyses may identify many more variants associated with SZ. While some of them may fulfill the persistence criteria, the others do not. Then, associated variants that do not fulfill the persistence criteria should be either susceptibility genes of exceptionally high mutation rates or resistance genes of standard mutation rates. Thus, in the near future, we are to choose one of the alternative cases: (1) a case in which SZ should have many susceptibility genes with tiny effects of exceptionally high mutation rates, or (2) a case in which SZ should have many resistance genes of standard mutation rates on different chromosomes associated with SZ itself. This may be the most peculiar aspect of SZ genetics that the persistence criteria predict.

4. Alternative direction for searching for SZ genes

We have discussed the peculiarity of SZ genetics under the assumption that the risk loci are located in the ncDNA. Now we shall remember that there is another possibility for the location of the risk loci.

Another possibility is that a pathogenic gene is located in the mitochondrial DNA (mtDNA), which shows a higher mutation rate than the ncDNA: per locus per generation ( on average) [53].

Because mtDNAs are transmitted only through females, the mtDNA model could explain the persistence by a higher reproductive fitness of the unaffected female siblings of the patients (heterozygote advantage in this model) and/or a reduced male/female ratio in the offspring in the predisposed matrilineal pedigrees [54].

Interestingly, recent epidemiological studies have consistently shown that the reproductive fitness of the unaffected female siblings of the patients is slightly increased (1.02–1.08) [14], [16], [17], [29]. The epidemiological data by Haukka et al. [17] show that the slightly increased reproductive fitness of the unaffected female siblings of the patients (1.033), coupled with less pronounced reduced reproductive fitness of the female patients (0.46), is sufficient for the persistence of the disease in the mtDNA model.

Let us calculate , the cross-generational reduction of the frequency of females with the pathogenic mtDNA in the general population, using their epidemiological data (Table 12). At first we define several notations. : number of the normal female population in the first generation; : number of the female offspring of the normal female population; : number of the unaffected female siblings of the patients in the first generation; : number of the female offspring of the unaffected female siblings of the patients; : number of the female patients; : number of the female offspring of the female patients; r (0<r<1): proportion of the gene carriers in the normal female population in the first generation. Then number of the female gene carriers in the first generation is and , frequency of the female gene carriers in the first generation, is given by: . The expected number of the female gene carriers in the second generation is and , frequency of the female gene carriers in the second generation, is . Therefore it follows:

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Table 12. Epidemiological data by Haukka et al. [17].

https://doi.org/10.1371/journal.pone.0007799.t012

Thus we have: (Table 12). This implies that the gene loss can be balanced by de novo mutation in the mtDNA which occurs at a rate of per locus per generation ( on average) [53]. Therefore the mildly elevated reproductive fitness of the unaffected female siblings of the patients is sufficient to sustain the gene frequency in the mtDNA model.

In addition, in the mtDNA model, every nuclear resistance gene may aggregate by a positive selection in the predisposed matrilineal pedigrees that succeed to the same pathogenic mitochondrial genome, and may be associated with the disease [55].

Recently Marchbanks et al. [56] identified a heteroplasmic mtDNA sequence variant associated with oxidative stress in SZ. Munakata et al. [57] detected mtDNA 3243A>G mutation in the post-mortem brain of one patient with SZ. Martorell et al. [58] reported a heteroplasmic missense mtDNA variant in five of six mother-offspring schizophrenic patients pairs. Although these findings should be replicated in large-sampled studies, they may suggest another direction to search for the solution of the big conundrum that remains between the epidemiology and the molecular genetics of SZ.

1. Basic assumptions

To begin, we describe our basic assumptions. These assumptions represent limitations of our study.

Multifactorial threshold model.

We assume the multifactorial threshold model [1], in which quantitative traits such as liability to the disease are determined by multiple genetic and non-genetic factors including a stochastic and/or an epigenetic effect. Under this assumption, the relative fitness as a quantitative trait in the affected population is determined by multiple factors and approximately follows a gamma distribution with a mean (Figure 2). ( is the selection coefficient of SZ; the mean relative fitness in the normal population is defined as unity.)

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Figure 2. Distribution of the relative fitness in the affected population.

In the multifactorial threshold model, the relative fitness as a quantitative trait in the affected population is assumed to approximately follow a gamma distribution with the mean . The distribution curve in the affected subpopulation with an allele M shifts to the right only if M has a strong protective effect. Thus it can be assumed that the relative fitness in the affected subpopulation with a pathogenic allele M approximately follows a gamma distribution with a mean not greater than (i.e. ; ).

https://doi.org/10.1371/journal.pone.0007799.g002

The distribution curve of the fitness in the affected subpopulation with an allele M never shifts to the right unless M has a strong protective effect (i.e. an effect of elevating the affected carrier's fitness by reducing the severity of the disease). Since a pathogenic allele for a deleterious disease can be assumed not to elevate the affected carrier's fitness, the relative fitness in the affected subpopulation with the susceptibility allele M approximately follows a gamma distribution with a mean not greater than (i.e. ; ).

No special assumptions else are required on the allelic structure in each locus, penetrance of each susceptibility gene, and possible interactions among the loci. It should be noted that the nuclear single major gene locus model is included as a special case in the assumptions.

2. Notation

3. Deduction of the persistence criteria

Now we proceed to deduce the persistence criteria. From the assumptions it follows that , the population frequency of the pathogenic allele M in the next generation, is given by: . Therefore the reduction of the population frequency of the allele M per generation is: From (2), (3) and (4) it follows: .

Thus we have the first criterion for a susceptibility gene (criterion A):

4. Numerical estimates of parameters in SZ genetics

It is now known that mutation rates on autosomes and X chromosomes almost always fall within the range of 10⁻⁶ to 10⁻⁴ per locus per generation (usually ; one generation  = 20 years) [59], [60]. Advancing parental ages could elevate the mutation rate [61]. Although it seems to increase as an exponential of the parental age in some loci, it can be approximated by a linear function of the parental age at least under 30 years for maternal age and under 40 years for paternal age [61]. On the other hand, large sampled cohort studies in Israel, Sweden and Denmark show that the mean age of parents in the general population is ∼28 years for mothers and ∼31 years for fathers; the mean age of both parents is <29.6 years [62], [63]. Therefore we can assume:

We can know the values of the parameters p and s from the epidemiological studies. Among the many epidemiological studies on the fertility of SZ, the cohort study by Haukka et al. [17] is the largest in sample size (N = 870,093) and the lowest in sampling bias. They comprised all births in Finland during 1950–1959 and followed up through the National Hospital Discharge Register for Hospitalizations between 1969 and 1992. Estimated values for p and s are and . Thus, we have: .

The estimated value of for SZ may be remarkably small. This sums up the epidemiological characteristics of SZ which discriminate it from other common diseases with genetic bases such as type 2 diabetes and most adult cancers. For those diseases would be much greater due to much smaller s values because most patients with those diseases manifest after the reproductive age (>40 years). On the other hand, SZ manifests typically in adolescence or early adulthood, and specific symptoms of the disease such as an autistic way of life and bizarre behaviors reduce the reproductive fitness of the patients as has been shown by most epidemiological studies.

It should be noted that contribution of advancing parental ages to pathogenic mutations seems not very large in SZ. That is because large sampled cohort studies have shown that the proportions of older parents both in the affected and the normal populations are equally small (<7.7% and <5.5% for fathers older than 45 years in the affected and the normal populations respectively; and <9.9% and <8.7% for mothers older than 35 years) [64], [65]. In addition, the differences in the mean ages of parents between the affected and the normal individuals are not very large (<1.7 years for fathers and <0.8 year for mothers) [62], [63] even if they are statistically significant.

Some researchers have proposed the hypothesis that SZ is associated with de novo mutations arising in paternal germ cells [62]–[66]. It is based on the observation (‘paternal age effect’) that the risk of SZ in the offspring seems to increase as paternal age advances from 20 years to over 50 years. However, the risk of SZ was also increased in the offspring of younger men (<21 years) [62], [63], [66] as well as in the offspring of younger women (<20 years) [63]. Therefore, major roles of paternally derived mutations in SZ seem to remain unsubstantiated. Indeed, no available data can exclude the possibility that the ‘paternal age effect’ on the risk of SZ may be due to putative maternal factors; while women in many countries today may be usually supposed to bear children after the age of 20 years or to marry much older men only when the men have socio-economic benefits, predisposed women might bear children before the age of 20 years or choose too young or too old men as fathers of their children even if the men have no socio-economic benefits.

5. Validity-testing of the candidate genes in the literature with the criteria

We tested whether the 111 SNPs of the top 30 genes listed in the meta-analyses at SZGene (http://www.schizophreniaforum.org/res/szgene/default.asp) [30] meet the persistence criteria. Since SZGene is being periodically up-dated, we used the version on 10^th August, 2009. Based on the genotype distributions in meta-analyses, allele frequencies and the case-control differences were calculated. We also tested the top 100 SNPs listed in a recent GWAS by Need et al. [33] as well as the common variants reported in the latest GWASs by Shi et al. [31], by Stefasson et al. [34], and by The International Schizophrenia Consortium [32].

6. Power and sample size estimation in case-control association studies for SZ

Let be the cumulative distribution function of the standard normal curve and let be its inverse function. The upper β point of the standard normal curve is given by and the two sided α point by . In a case-control association study of a single variant M with sample size 2N (N cases + N controls) at a significance level α, the power is given by , or , where x, , and d are defined by the equations: , , and . [67], [68]

Since the criterion A () warrants for 0.1<x<0.9, we have: , or . Thus we have: , and for 0.1<x<0.9.

We calculated the power of the association study for sample sizes N = 10000, 20000, 50000, 100000 under three levels of mutation rates. For the calculation of N required in the association study for a single allele, we assume: 0.05 and 0.95, 0.8, 0.1. For the calculation of N required in GWAS, we assume: and 0.95, 0.8, 0.1.