Example 1.

The data for this example are shown in Table S1 (supplementary data). There are four binary sites and 30 haplotypes. The first haplotype, haplo1, is a singleton, the second is the most prevalent occurring 12 times while there are four copies of the third (haplotypes 3,4,16 and 18). We will use this data to exemplify the previous formulae and also our freeware implementation http://folk.uio.no/thoree/nhap/. There is too little data for this example to have any practical interest and in addition, the asymptotics are not likely to work. If examples of this magnitude are of practical interest, approaches following [10] may be better suited. The basic input data should be a matrix where lines correspond to haplotypes and columns to sites. The data in this example is in binary format but the sites could also be arbitrary integers, as is the case for the Y-chromosome data of supplementary Table S2. There are also other parameters, but the default values can and will be used for this example. This in particular implies that k = 10, i.e., haplotypes occurring less than 10 times (haplo2 in our data) are considered rare. There are 30 haplotypes, nine of which are unique. These nine unique haplotypes consist of D_rare = 8 rare haplotypes and D_abund = 1. There are 12 copies of the abundant haplotypes (the one occurring 12 times). Furthermore

Consider first the coverage estimate in (3), i.e., . If there is no cut-off, then n = 30. In our case the cut-off is 10 and the sample size corresponding to those haplotypes occurring 10 times at the most is 30−12 = 18. The coverage estimate therefore becomes 1−(5/18) = 0.72. The 95% confidence interval can be calculated from (4) as

The first abundance estimator, is given by (8) when there is a cut-off, i.e.,

It remains only to demonstrate the last two abundance estimates. For this purpose, we first find using (6). From this,

Finally, based on (7) and

In this example there are at most 2⁴ = 16 different haplotypes and we see that is close to this value. However, as mentioned previously, this example is too small to serve anything but illustration purposes.

Example 2.

The next example uses simulated data based on the coalescent, see [19] for a review. 5000 mtDNA profiles were simulated under varying assumptions using Marchini's R-package popgen (http://www.r-project.org/). The mutation rate (θ = 2Eμ; where μ is the mutation rate per gene per generation and E is the effective population size) was varied in the treesim function. We consider these 5000 profiles to be complete data, i.e., all individuals have been typed. Then, for various sample sizes (50, 100, 400 and 1600) the number of unique haplotypes was estimated using the estimators , and the resulting estimators were compared to the true value based on the 5000 profiles. The result of a single arbitrarily selected simulation is provided in Table 1. For instance, the last line of this table shows that the sample of 5000 contains  = 412 different haplotypes. The coverage is estimated at 0.87. The , and estimates are 349, 410 and 444 respectively. This reveals a general and expected feature summarized by , but these inequalities do not hold generally. For small sample sizes, all estimators underestimate and almost always underestimates. Table 2 compares accuracy using the root mean squared error based on 100 simulations.

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Table 1. Performance of different approaches to the estimation of the number of different haplotypes based on simulated data.

https://doi.org/10.1371/journal.pone.0003988.t001

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Table 2. Accuracy of estimators of the number of different haplotypes measured by the root of the mean squared error assessed by 100 simulations.

https://doi.org/10.1371/journal.pone.0003988.t002

Table S2 presents an example based on Y-chromosome data that shows that large data sets can be easily handled and sites need not be binary.

Example 3.

This example considers the ten databases of Table 3: Germany (n = 1314; [20], [21]), Iceland (n = 396; [22]), Mozambique (n = 306; [1]), Portugal (n = 540; [23], [24]), Basque (n = 171; [25], [26], [27]), Catalonia (n = 118; [28]), and Galicia (n = 135; [24], [29]). For instance, there are 1314 German samples and the coverage is estimated as explained above at 0.59. On the other hand, there are 396 Icelandic samples and the corresponding coverage is 0.77. So the Icelandic sample provides better coverage than the German sample despite being smaller (but not smaller compared to population size and perhaps population heterogeneity).

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Table 3. Haplotype estimates from several population datasets.

https://doi.org/10.1371/journal.pone.0003988.t003

A useful result [11] is available along different lines. Assume we extend the sample by a fraction t. Then the expected number of new haplotypes iswhere, as previously, f_j is the number of haplotypes seen precisely j times. The formula is valid for t≤1 and t = 1 corresponds to a doubling. The above formula is studied in greater detail in [30].

Example 4.

Consider Table 3. There are 540 Portuguese samples of which 242 are unique. Doubling the database to 1080 corresponds to inserting t = 1 into the above formula. The expected number of new haplotypes becomesand so based on a sample of 1080 we would expect to see 242+129 = 371 different haplotypes. The above calculation excludes the most prevalent haplotype, the one occurring 113 times.

Estimation of unseen haplotype frequencies: general considerations.

We would like to make the database sufficiently large to include all haplotypes having frequency q or higher. The simplest mathematical solution can be provided in case no data have been collected and there is no prior information we can use. Although this is not the case (since data are actually available), Plaza et al. [31] went ahead with a simplistic solution in a case of a mtDNA study carried out in an Angolan sample; briefly, the authors aimed to provide an upper bound of Khoisan (historical) demographic influence in their typically bantu Angolan populations given the fact that no Khoisan specific lineages have been detected in their sample: “the probability of not finding a particular lineage that is present in a population at frequency of f in a sample of size n is given by α = (1−f)ⁿ”. For a given f, n can be determined to ensure that α exceeds a specified lower limit, say 0.95. According to [31]“…the maximum contribution of Khoisan lineages to Angolans is compatible with the observation that the absence of L0d and L0k in a sample of 44 Angolans would be less than 10.8% (for α = 0.95)”. This estimate is however too simplistic. For instance, any unseen lineage takes the same value, so we would obtain the same probability estimate for a Khoisan lineage as for e.g. an East Asian or European one in the Angolan population. This estimate is also strongly dependent on sample size. In general, there is no way to know how close this value is to the true one, but upper limits can still be useful.

Classical approaches to the estimation of unseen haplotype frequencies.

If a haplotype is never seen in the database, the classical frequentistic estimate will be 0 and will typically lead to unreasonable or impossible statistical analysis. For instance, in forensics, likelihood ratios may become infinite. For association studies, odds ratios may similarly be impossible to calculate. Different suggestions have been proposed in the literature to avoid such unfortunate consequences. If all haplotypes appear in the database, there are no unseen haplotypes and there is no problem. In practical cases, coverage is not complete and the ultimate goal is to provide an estimate as close as possible to the one we would observe in the hypothetical situation of complete coverage. A practical proposal is to let(8)where the haplotype is observed x_i times in a database of size n. The choice l = 1 amounts to adding the unseen haplotype to the database while l = 2 corresponds to adding both the defendant and culprit profile. This topic is discussed in Section 6.3.1 of [32] and in [33]. At any rate, the specific choice for l should be of minor importance. The frequencies must add up to unity as ensured by (8).

It is also possible to estimate the frequency of an unseen haplotype (or any haplotype for that matter) by simulating from the coalescent. The examples performed [34] indicate that the estimator (8) works well with l = 1. However, (8) tends to overestimate the true value for rare haplotypes by a relatively large amount since (8) corresponds to the case where the unseen haplotype appears as the next sample.

The problem of unseen haplotypes can be approached based on the above methods in a way which allows phylogeographic knowledge to be incorporated and this is discussed in the next section. Here, we mention briefly a simplistic approach: Assume the coverage is C and that there are u unknown haplotypes with unknown frequencies p₁,…,p_u. If these unknown frequencies are all the same, then their common estimate is . It may appear unreasonable to assign higher frequency to an unseen haplotype than one seen once and some modification may be required and seems reasonable.

Principal Component Analysis applied to the estimation of haplotype frequencies.

Estimation of haplotype frequencies depends heavily on the sample size, and ignoring phylogenetic or phylogeographic circumstances could lead to overestimation. For example, a typical sub-Saharan haplotype is probably rare in Andalucia (South Spain) in comparison with many other haplotypes that are probably relatively common in this region but that still remain unsampled due to the stochastic nature of the sampling process. Thus, based on the previous classical approach, we estimate the fraction of unseen haplotypes in a sample of 50 Andalucians as 0.66 (Table 3), but note that any unseen sample, either belonging to some typical European haplogroup or sub-Saharan one, will receive the same frequency, namely approximately 1%. For a European haplotype, this frequency could be realistic, but probably not for a typical Asian or sub-Saharan one.

In a typical forensic genetic context, a common scenario could be that of an immigrant suspect carrying a very rare haplotype with respect to the reference population where the crime was committed. The use of the local database, in which the haplotype carried by the suspect is very uncommon, will probably overestimate its frequency. It could be argued that the use of local databases is always conservative in this context, and this would benefit the suspect (benefiting therefore his/her innocent presumption). However, such a conservative interpretation could also be unfair if the suspect is responsible for the crime. ‘Extreme’ interpretations of the DNA test in forensic genetics are always undesirable, and here we just propose an alternative way that could contribute (among other medical and population genetics applications) to improve the evaluation of the DNA test, but not without warning potential users about the fact that there is probably not a single universal solution for routine casework, and that every single case will probably require particular treatment. Therefore, these estimates have to be taken with caution. Two intuitive considerations could help to interpret these estimates: i) a certain threshold for the fraction of unseen haplotypes (e.g. 10%) could be required beforehand in order to consider that the frequency estimate of a given haplotype is reliable, and ii) phylogenetic and phylogeographic information could be useful in order to evaluate how far the unseen haplotype is (in some sense) from the database. It would in fact be desirable to ‘weight’ the haplotype frequency estimate by incorporating phylogenetic considerations into a mathematical model, but the most intuitive way, namely, the use of genetic distances, is not straightforward for e.g. mtDNA data. In [35] a distance based on the minimal number of mutational steps was proposed for Y-chromosome data. We here propose a method based on Principal Component Analysis (PCA).

Assume the frequency of an unseen haplotype is(9)where K is a constant determined by the requirement that these frequencies should add up to 1-C, d_i is the distance, in some sense, from the haplotype to the ‘population’ and u is the number of unseen haplotypes. Some assumptions and modelling are required to calculate these distances and we will use PCA. We explained and exemplified PCA on similar data for different applications in [36] and we refer to that paper for background and more general references. We will use ordinary Euclidean distance in the PCA space, i.e.,(10)where n.c is the number of principal components; h_j and m_j are the j-th coordinate of the haplotype and the mean in PCA-space respectively. For the simple case when there are two principal components (n.c = 2) there is a simple geometrical interpretation corresponding to the usual distance measure. Our practical PCA implementation uses the prcomp function of R.

If the distances based on all unseen haplotypes are available (which is unlikely), K can be calculated asand the required frequency is readily available from (9). The problem is also solved if and thus K can be estimated by other means. Unfortunately, such solutions will normally not be available and in the example below we instead choose a pragmatic solution. Our basic assumption is that the naïve upper bound should not be exceeded. If the distance from the haplotype for which a frequency estimate is required is below the average of the internal PCA distances, d̅, we use this upper bound, i.e., 1/(1+n), and otherwise we use the following version of (9):(11)

The above equation has an intuitively appealing interpretation as the traditional estimate is corrected by a factor accounting for phylogeographical features through PCA-distances.

Example 5.

The first part of this example is based on simulated data. The data is simulated to share some features with the real data of the latter part of the example. Two populations are simulated, each with n (50,100 and 400) individuals. There are 100 sites that may vary, so a haplotype is a binary vector of length 100, e.g., (0,1,0,…,1). There are various ways such data can be simulated. In Example 2 we used the coalescent. Here a simpler approach is more convenient: 0 and 1 are simply simulated independently with probabilities 1-q and q. In this way it is easier to describe and characterise the data. We consider here three scenarios. For the first scenario there is a relatively small difference between the populations (q = 0.1 and 0.3 respectively) whereas the difference between the populations is larger for scenario 2 (q = 0.1 and 0.5) and scenario 3 (q = 0.1 and 0.9). The results of the simulations are summarised in Table 4. The naïve bound provides a comparison with what we consider to be the most usual alternative to the approach we have described, namely the estimate 1/(n+1). Next there is a need for unseen haplotypes, test data. For the columns ‘fraction1’ and ‘median1’ we have considered haplotypes in population 2 which are unseen in population 1. The estimate of the unseen frequency is calculated according to (11). The frequency of these estimates which are below the naïve bound is given in the column ‘fraction1’ whereas the median values of the frequency estimates are in the following. The next two columns contain similar information, but for a different test set. This time all singletons of population 1 are considered. The rationale is that singletons are likely candidates for unseen haplotypes; in a different sample of the same population these are likely candidates for not being sampled. To be specific, consider Table 4 and the case n = 50. The naïve bound is 1/51 = 0.0196. The ‘median1’ estimates are below this value and decreases as gradually more distant test sets are considered corresponding to Scenario 1–3. The singleton test leads to a lower fraction of haplotypes below the threshold 1/(n+1) and to higher frequency estimates (‘median2’); the reason is that these samples are closer to the population for which they are considered unseen. For the singleton test set there should be no systematic differences depending on scenario and only small stochastic differences are observed. The estimates are relatively stable for both test data (unseen and singletons) and increasingly stable as larger data sets are being used. The precise figures are by necessity somewhat speculative and there will also be some small difference depending on parameter settings

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Table 4. Summary of the results of the simulation part of Example 5.

https://doi.org/10.1371/journal.pone.0003988.t004

We next apply the methods to real data summarised in Table 3. For this purpose we used the Iberian database and the Mozambique haplotypes not seen in the Iberian database. We divided the Iberian database into two parts: Ib.singles (261 haplotypes occurring only once) and Ib.rest (the remaining 755 haplotypes). We performed PCA based on Ib.rest and the number of principal components was 18, following a requirement to explain 80% of the variance. The average distance based on the PCA-transformed Ib.rest haplotypes was d̅ = 0.22, where we used the distance defined in (10). There were 286 Mozambiquan haplotypes not seen in the Iberian database. For 238 of the 286 haplotypes (83.2%) the distance exceeded the average and we estimated the probabilities from (11). Figure 1 shows the distribution of the probabilities. In the upper panel, distances are based on the samples from Mozambique while the lower panel is based on singletons from the Iberian database. As expected, the probabilities were lower for the samples from Mozambique.

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Figure 1. Estimates of frequencies of unseen Iberian haplotypes.

The values were calculated following the PCA approach. The test set for the upper panel are those haplotypes of the Mozambique database which are unseen in the Iberian. The singletons in the Iberian database are used as the test set in the lower panel.

https://doi.org/10.1371/journal.pone.0003988.g001

Example 6.

For this example, we will use the 540 haplotypes in the Portuguese database (Table 3). This allows comparison with [37], as the data differs only slightly. We permutated the order of the haplotypes 100 times and each time we estimated the a and b of f(x) = ax/(b+x). The average estimate of a was 584.7 and this is a reasonable abundance estimate since it corresponds to the limit as x approaches infinity and because this value is also almost obtained for large, but finite values such as x = 100000. Our other estimates are and . The estimate for a depends crucially on the order of the haplotypes, and values between 441 and 857 were obtained for the simulations. The resulting function with extrapolation up to 3200 is shown in Figure 2.

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Figure 2. The saturation curve for the Portuguese database (see Table 3) based on the Michaelis-Menten function.

https://doi.org/10.1371/journal.pone.0003988.g002

There is also an extensive general literature related to the problem of detecting a new species. Several recent papers extend the so-called Starr estimator introduced in [38]. Some more specific calculations related to haplotypes are provided by C. Brenner http://dna-view.com/haplofreq.htm.