- Proceedings
- Open Access
Mapping a gene for rheumatoid arthritis on chromosome 18q21
- William Tapper^{1}Email author,
- Andrew Collins^{1} and
- Newton E Morton^{1}
https://doi.org/10.1186/1753-6561-1-S1-S18
© Tapper et al; licensee BioMed Central Ltd. 2007
- Published: 18 December 2007
Abstract
Although single chi-square analysis of the North American Rheumatoid Arthritis Consortium (NARAC) data identifies many single-nucleotide polymorphisms (SNPs) with p-values less than 0.05, none remain significant after Bonferroni correction. In contrast, CHROMSCAN evades heavy Bonferroni correction and auto-correlation between SNPs by using composite likelihood to model association across all markers in a region and permutation to assess significance. Analysis by CHROMSCAN identifies a 36-kb interval that includes the most significant SNP (msSNP) observed in a 10-Mb target suggested by linkage. Unexpectedly, stratification by gender and age of onset shows that association evidence comes almost entirely from females with age of onset less than 40. Combining evidence from a meta-analysis of linkage studies and three subsets of the NARAC data provides significant evidence for a determinant of rheumatoid arthritis in a 36-kb interval and illustrates the principle that estimates of location and its information are more powerful than estimates of p-values alone.
Keywords
- Association Mapping
- Causal Locus
- Exponential Decline
- Complex Inheritance
- North American Rheumatoid Arthritis Consortium
Background
Initially, linkage mapping dealt with rare and highly penetrant genes. Without cytogenetic assignment, the preferred strategy was segregation analysis to determine all relevant parameters except recombination, followed by linkage analysis to determine recombination frequency [1]. Complex inheritance with uncertain segregation parameters proved much more difficult, giving rise to many unconfirmed claims based on microsatellites and leading to meta-analysis without point locations [2]. The HapMap project provides dense SNPs that can be used to localize causal loci with or without pedigrees. This procedure, called association mapping, revolutionized identification of disease genes. Recent developments of linkage disequilibrium units (LDU), composite likelihood, control of auto-correlation, and meta-analysis are incorporated into the CHROMSCAN program [3, 4] to increase its precision for association mapping. Here we use these methods to establish the location and weight of evidence for a gene predisposing to rheumatoid arthritis.
Methods
Data preparation
The data, provided by NARAC (North American Rheumatoid Arthritis Consortium) consist of 2300 single-nucleotide polymorphisms (SNPs) in a 10-Mb region of 18q21 with linkage evidence in U.S. and French scans [5]. Illumina genotyped these markers in 460 cases and 460 controls, matched for age and gender, from New York. The genotypic data for controls were screened and 7 SNPs with ${\chi}_{1}^{2}$ > 10 for the Hardy-Weinberg test [6] were removed, leaving 2293 to be analyzed. CHROMSCAN requires SNPs to be located on both physical and LDU scales. Physical locations were taken from build 35 of the human genome sequence. Unlike physical maps, study-specific and various LDU maps are available, corresponding to the four HapMap samples separately and combined (CEU, CHB, JPT, YRI, and cosmopolitan). The LDU map with the highest SNP density and population attributes closest to the experimental data should be optimal. We therefore used LDU locations relative to the CEU HapMap data with a density of 1 SNP per 863 bp compared to 1 SNP per 4139 bp in the NARAC data. We also used the kilobase map to determine the robustness and power of LDU maps compared with physical maps.
LDU map construction
The theory for constructing LDU maps has been described [7]. Briefly, the LDU distance for the i^{th} SNP interval is given by ε_{ i }d_{ i }, where ε_{ i }describes the exponential decline of association with physical distance d_{ i }in kb. Values of ε_{ i }are estimated by composite likelihood that fits the Malecot model [8] to multiple pairwise diplotype data. The Malecot equation, given by $\rho =(1-L)M{e}^{-{\displaystyle \sum {\epsilon}_{i}{d}_{i}}}+L$, uses additional parameters to describes association at the last major bottleneck (M), and residual association at large distance (L) to predict rho (ρ), the probability of association.
Association mapping
The CHROMSCAN program [3] uses a model similar to LDU maps except the exponential term is replaced by εΔ(S_{ i }- S) to estimate the location (S) of a disease gene, where S_{ i }is the location of the i^{ th }marker in kilobases or LDU. The Kronecker Δ is used for map direction and assures a correct sign, with Δ = 1 if S_{ i }≥ S or -1 if S_{ i }<S. To calculate the expected association with distance, z_{ i }, the model becomes ${z}_{i}=(1-L)M{e}^{-\epsilon \Delta ({S}_{i}-S)}+L$, where M is diminished by complex inheritance and L is the association at large distance. The observed association ${\stackrel{\u2322}{z}}_{i}$ is determined by a 2 × 2 table between affection status and the two alleles of each SNP to give $\left|\begin{array}{cc}a& b\\ c& d\end{array}\right|$ and ${\stackrel{\u2322}{z}}_{i}=\frac{(ad-bc)}{(a+b)(b+d)}$, where ad - bc ≥ 0 and b ≤ c is ensured by rearrangement of columns and rows [9]. Given the observed associations ${\widehat{z}}_{i}$, the Malecot parameters are estimated iteratively using composite likelihood, which evades a heavy Bonferroni correction by combining information over all loci within a region as $\Lambda ={{\displaystyle \sum {K}_{i}({\widehat{z}}_{i}-{z}_{i})}}^{2}$, where ${\widehat{z}}_{i}$ and z_{ i }are the observed and expected association values, respectively, at the i^{th} SNP. Their squared difference is weighted by information (K_{ i }) which is estimated as: ${K}_{i}={\chi}_{1}^{2}/{\widehat{z}}_{i}^{2}$, where ${\chi}_{1}^{2}$ is the Pearson ${\chi}_{1}^{2}$ from the 2 × 2 table.
Sub-hypotheses of the Malecot model are used to test for a causal polymorphism. Model A, which estimates none of the parameters and uses M = 0 with predicted L [10], is taken as the null hypothesis H_{0} in which there is no association between affection status and SNPs. Model D estimates M, S, and L. Therefore the Λ_{A} - Λ_{D} comparison tests for a disease determinant at location S. For both models, ε is fixed to 1 for the LDU map and to a value of ε determined from pairwise marker-by-marker association data for the kilobase map. In order to account for autocorrelation between SNPs as a result of LD, the significance of evidence is determined by a rank-based permutation test [3].
Three separate analyses of the data were performed by CHROMSCAN. The first is a preliminary screen of the entire 10-Mb bin, which is divided into 18 nonoverlapping regions, each with at least 30 SNPs and covering at least 10 LDUs. To determine accurate levels of significance, the number of permutation replicates must approach the actual level of significance so that interpolation of the variance under H_{1} is reliable. To minimize computation time, the initial analysis was restricted to 100 replicates. Significant regions identified by the initial screen were re-analyzed separately using 1000 and 5000 replicates in order to verify convergence. To demonstrate the power of LDU maps, this analysis was repeated using the kilobase map and two estimates of the exponential decline ε derived from the significant region and the 10-Mb region [11]. The risk for rheumatoid arthritis is elevated in females, especially with late onset (≥35–≤60) [12]. Our third analysis therefore stratified cases into three groups corresponding to males, females with onset ≤39, and females with onset ≥40. The partition of females around an onset age of 40 was chosen to give approximately equal numbers of 'early' and 'late' onset cases. Unaffected controls for the three groups were all males (with similar age and total number of individuals as affected males), and females divided by current age to give similar total numbers of individuals as cases, respectively. This analysis was restricted to significant regions from the initial screen and used 5000 replicates.
Results
Association mapping
Regions screened with 100 replicates
Region | No. SNPs | First kb | Last kb | ${\chi}_{1}^{2}$ for msSNP | Composite likelihood | ||
---|---|---|---|---|---|---|---|
${\chi}_{1}^{2}$ | LOD_{1} | p-Values | |||||
1 | 256 | 48896 | 49928 | 6.58 | 0.05948 | 0.01291 | 0.80701 |
2 | 238 | 49935 | 51009 | 11.18 | 0.00691 | 0.00150 | 0.93358 |
3 | 197 | 51010 | 51919 | 10.83 | 2.22538 | 0.48323 | 0.13584 |
4 | 132 | 51926 | 52398 | 4.42 | 0.05000 | 0.01086 | 0.82274 |
5 | 241 | 52398 | 53262 | 5.90 | 0.00011 | 0.00002 | 0.99158 |
6 | 113 | 53262 | 53596 | 12.25 | 6.22830 | 1.35246 | 0.01259 |
7 | 74 | 53599 | 53919 | 6.84 | 2.95054 | 0.64070 | 0.08592 |
8 | 38 | 53920 | 54006 | 1.75 | 0.78229 | 0.16987 | 0.37637 |
9 | 103 | 54008 | 54448 | 6.64 | 1.71241 | 0.37185 | 0.19074 |
10 | 49 | 54496 | 54974 | 5.23 | 0.50780 | 0.11027 | 0.47592 |
11 | 70 | 54977 | 55285 | 12.06 | 0.34910 | 0.07581 | 0.55438 |
12 | 60 | 55286 | 55381 | 10.89 | 0.00011 | 0.00002 | 0.99147 |
13 | 89 | 55382 | 55634 | 4.24 | 0.13215 | 0.02870 | 0.71588 |
14 | 29 | 55641 | 55838 | 2.42 | 0.05010 | 0.01088 | 0.82258 |
15 | 134 | 55839 | 56399 | 5.66 | 0.97584 | 0.21190 | 0.32321 |
16 | 209 | 56408 | 57248 | 3.87 | 0.00166 | 0.00036 | 0.96744 |
17 | 55 | 57253 | 57545 | 9.51 | 1.51557 | 0.32910 | 0.21834 |
18 | 200 | 57548 | 58415 | 3.86 | 1.58390 | 0.34394 | 0.20826 |
Intensive screening of region 6
No. replicates | Map^{a} | ε | S | K | SE | ${\chi}_{1}^{2}$ | LOD_{1} | p | |
---|---|---|---|---|---|---|---|---|---|
kb | LDU | ||||||||
100 | LDU | 1.000 | 53308.370 | 1195.126 | 41.233 | 0.1557 | 6.2283 | 1.3525 | 0.0126 |
1000 | LDU | 1.000 | 53308.370 | 1195.126 | 44.329 | 0.1502 | 9.6876 | 2.1036 | 0.0019 |
5000 | LDU | 1.000 | 53308.370 | 1195.126 | 36.611 | 0.1589 | 8.3245 | 1.8076 | 0.0039 |
1000 | kb | 0.021 | 53306.868 | 1195.126 | 0.0195 | 7.1529 | 7.2178 | 1.5673 | 0.0072 |
1000 | kb | 0.031 | 53307.748 | 1195.126 | 0.0367 | 5.2220 | 7.2910 | 1.5832 | 0.0069 |
The CHROMSCAN analysis of region 6 was repeated using the kilobase map so that its performance can be compared with the LDU map. Using a kilobase map requires specification of the exponential decline ε [11]. Two values of ε, corresponding to the 10 Mb interval (0.021) or region 6 alone (0.031), were investigated. Despite the large difference between ε values for the kilobase map, the significance level and location were almost identical. However, the ratios of ${\chi}_{1}^{2}$ indicate that the kilobase maps have a relative efficiency of 75% compared with an LDU map at 1000 replicates (Table 2).
Stratification by gender and age of onset (5000 replicates)
Sex | Age of onset | Case/Control | S | K | SE | ${\chi}_{1}^{2}$ | LOD_{1} | p | ||
---|---|---|---|---|---|---|---|---|---|---|
kb | LDU | |||||||||
M | - | 95 | 95 | 53308.370 | 1195.126 | 3.13 | 0.57 | 0.0299 | 0.007 | 0.8624 |
F | ≤39 | 193 | 192 | 53308.370 | 1195.126 | 47.3 | 0.15 | 11.844 | 2.575 | 0.0006 |
F | ≥40 | 170 | 173 | 53262.482 | 1194.474 | 0.04 | 5.18 | 0.0183 | 0.004 | 0.8589 |
Linkage
Choi et al. [13] reported a meta-analysis of four linkage studies with microsatellites in a 10-Mb bin of chromosome 18. The results from this study were reported as p-values without estimates of location or standard errors. Without this information, the power for meta-analysis is reduced because the sum of two ${\chi}_{1}^{2}$ values must be converted back to ${\chi}_{1}^{2}$ and LOD_{1} instead of weighting estimates of location by their information. Perhaps because of this inefficiency, the combined LOD_{1} from this meta-analysis is 1.542, well below the conventional value of 3 for asserting significance. The corresponding p-value in large-sample theory is 0.007714, providing strong but inconclusive evidence for localization in the 18q21 region. Despite its limitations, linkage contributes evidence that should not be ignored.
Joint significance of linkage and association
Meta-analysis of association (5000 replicates) and linkage
Study | Source | ${\chi}_{1}^{2}$ | LOD_{1} | p |
---|---|---|---|---|
1 | Choi et al. [13] | 7.101 | 1.542 | 0.007714 |
2 | Association (region 6) | 8.3245 | 1.808 | 0.003916 |
Pooled 1 and 2 | 12.326 | 2.676 | 0.000447 | |
Association (stratified) using P | 7.0896 | 1.539 | 0.007762 | |
Association (stratified) using S, K | 11.875 | 2.579 | 0.000569 | |
Pooled with 1 | 15.662 | 3.401 | 0.000076 | |
Association (stratified) using S, K and adjusted | 6.5944 | 1.432 | 0.010242 | |
Pooled with 1 | 10.718 | 2.327 | 0.001062 |
Discussion
This application demonstrates that CHROMSCAN is a powerful approach for gene mapping in complex inheritance, which is applicable to meta-analysis. Obvious extensions include identification of a causal locus and more precise definition of the phenotype associated with it. The 95% confidence interval, given by S ± 1.96 (SE), covers 36 kb between 53296 and 53332 kb and includes the msSNP rs3745064. Although no described genes are within this region, it does include four human mRNAs from GenBank: CR590917, AK021217, AK124558, and BC01314, all to the left of point estimate (S). Of these, CR590917 appears to be the most interesting because it is expressed within T cells and could therefore conceivably affect risk for rheumatoid arthritis. Finally, geneid [14] and Genscan [15] predict a similar gene, which is the closest annotated sequence to the point estimate (S). However, nothing is known about the function of this gene and its reliability is questionable. The fascinating directions revealed by these findings have yet to be explored. Ultimately, interaction with other contributing loci and environmental factors will be recognized and, more importantly, locus-specific treatment will be found.
Recent papers testify to growing interest in meta-analysis, looking backward to linkage rather than forward to association mapping. Rank permutation provides a valid significance test, but the genome search meta-analysis (GSMA) that uses regional assignment with arbitrary weights cannot give a reliable estimate of effect and therefore has low power for estimating point location and detecting heterogeneity [16, 17]. Most of the few papers on association mapping assume family data rarely feasible for diseases of late onset and are restricted to single markers without composite likelihood to estimate both location S and its information K. One manuscript presented in GAW15 that used meta-analysis without those estimates failed to detect the strong signal on chromosome 18q demonstrated by composite likelihood [18].
Declarations
Acknowledgements
This article has been published as part of BMC Proceedings Volume 1 Supplement 1, 2007: Genetic Analysis Workshop 15: Gene Expression Analysis and Approaches to Detecting Multiple Functional Loci. The full contents of the supplement are available online at http://0-www.biomedcentral.com.brum.beds.ac.uk/1753-6561/1?issue=S1.
Authors’ Affiliations
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