Multitrait Analysis of Quantitative Trait Loci Using Bayesian Composite Space Approach

Overview

Journal BMC Genet

Publisher Biomed Central

Specialties Biotechnology
Molecular Biology

Date 2008 Jul 19

PMID 18637203

Citations 2

Authors

Ming Fang

Dan Jiang

Li Jun Pu

Hui Jiang Gao

Peng Ji

Hong Yi Wang

Run Qing Yang

Affiliations

Soon will be listed here.

Abstract

Background: Multitrait analysis of quantitative trait loci can capture the maximum information of experiment. The maximum-likelihood approach and the least-square approach have been developed to jointly analyze multiple traits, but it is difficult for them to include multiple QTL simultaneously into one model.

Results: In this article, we have successfully extended Bayesian composite space approach, which is an efficient model selection method that can easily handle multiple QTL, to multitrait mapping of QTL. There are many statistical innovations of the proposed method compared with Bayesian single trait analysis. The first is that the parameters for all traits are updated jointly by vector or matrix; secondly, for QTL in the same interval that control different traits, the correlation between QTL genotypes is taken into account; thirdly, the information about the relationship of residual error between the traits is also made good use of. The superiority of the new method over separate analysis was demonstrated by both simulated and real data. The computing program was written in FORTRAN and it can be available for request.

Conclusion: The results suggest that the developed new method is more powerful than separate analysis.

Citing Articles

Multiple-trait genome-wide association study based on principal component analysis for residual covariance matrix.

Gao H, Zhang T, Wu Y, Jiang L, Zhan J, Li J Heredity (Edinb). 2014; 113(6):526-32.

PMID: 24984606 PMC: 4274615. DOI: 10.1038/hdy.2014.57.

An expectation and maximization algorithm for estimating Q X E interaction effects.

Zhao F, Xu S Theor Appl Genet. 2012; 124(8):1375-87.

PMID: 22297562 DOI: 10.1007/s00122-012-1794-x.

References

Xu S . Derivation of the shrinkage estimates of quantitative trait locus effects. Genetics. 2007; 177(2):1255-8. PMC: 2034631. DOI: 10.1534/genetics.107.077487. View

Yi N, George V, Allison D . Stochastic search variable selection for identifying multiple quantitative trait loci. Genetics. 2003; 164(3):1129-38. PMC: 1462611. DOI: 10.1093/genetics/164.3.1129. View

Knott S, Haley C . Multitrait least squares for quantitative trait loci detection. Genetics. 2000; 156(2):899-911. PMC: 1461263. DOI: 10.1093/genetics/156.2.899. View

Liu J, Liu Y, Liu X, Deng H . Bayesian mapping of quantitative trait loci for multiple complex traits with the use of variance components. Am J Hum Genet. 2007; 81(2):304-20. PMC: 1950806. DOI: 10.1086/519495. View

Yi N, Yandell B, Churchill G, Allison D, Eisen E, Pomp D . Bayesian model selection for genome-wide epistatic quantitative trait loci analysis. Genetics. 2005; 170(3):1333-44. PMC: 1451197. DOI: 10.1534/genetics.104.040386. View

Yi N, Xu S, Allison D . Bayesian model choice and search strategies for mapping interacting quantitative trait Loci. Genetics. 2003; 165(2):867-83. PMC: 1462771. DOI: 10.1093/genetics/165.2.867. View

Wang H, Zhang Y, Li X, Masinde G, Mohan S, Baylink D . Bayesian shrinkage estimation of quantitative trait loci parameters. Genetics. 2005; 170(1):465-80. PMC: 1449727. DOI: 10.1534/genetics.104.039354. View

Eaves L, Neale M, Maes H . Multivariate multipoint linkage analysis of quantitative trait loci. Behav Genet. 1996; 26(5):519-25. DOI: 10.1007/BF02359757. View

Jiang C, Zeng Z . Multiple trait analysis of genetic mapping for quantitative trait loci. Genetics. 1995; 140(3):1111-27. PMC: 1206666. DOI: 10.1093/genetics/140.3.1111. View

10.

Yi N, Xu S . Bayesian mapping of quantitative trait loci for complex binary traits. Genetics. 2000; 155(3):1391-403. PMC: 1461151. DOI: 10.1093/genetics/155.3.1391. View

11.

Yi N . A unified Markov chain Monte Carlo framework for mapping multiple quantitative trait loci. Genetics. 2004; 167(2):967-75. PMC: 1470906. DOI: 10.1534/genetics.104.026286. View

12.

Satagopan J, Yandell B, Newton M, Osborn T . A bayesian approach to detect quantitative trait loci using Markov chain Monte Carlo. Genetics. 1996; 144(2):805-16. PMC: 1207571. DOI: 10.1093/genetics/144.2.805. View

13.

Korol A, Ronin Y, Itskovich A, Peng J, Nevo E . Enhanced efficiency of quantitative trait loci mapping analysis based on multivariate complexes of quantitative traits. Genetics. 2001; 157(4):1789-803. PMC: 1461583. DOI: 10.1093/genetics/157.4.1789. View

14.

Yi N, Shriner D, Banerjee S, Mehta T, Pomp D, Yandell B . An efficient Bayesian model selection approach for interacting quantitative trait loci models with many effects. Genetics. 2007; 176(3):1865-77. PMC: 1931520. DOI: 10.1534/genetics.107.071365. View

15.

Xu C, Li Z, Xu S . Joint mapping of quantitative trait Loci for multiple binary characters. Genetics. 2004; 169(2):1045-59. PMC: 1449126. DOI: 10.1534/genetics.103.019406. View