{"scopus_import":"1","publisher":"Nature Publishing Group","date_created":"2018-12-11T12:04:18Z","user_id":"ea97e931-d5af-11eb-85d4-e6957dddbf17","oa_version":"None","status":"public","quality_controlled":"1","title":"Estimating multilocus linkage disequilibria","date_updated":"2023-05-02T12:04:03Z","pmid":1,"article_processing_charge":"No","month":"03","day":"01","type":"journal_article","main_file_link":[{"url":"https://www.nature.com/articles/6886830"}],"abstract":[{"text":"The state of a diploid population segregating for two alleles at each of n loci is described by 22(n) genotype frequencies, or equivalently, by allele frequencies and by multilocus moments or cumulants of various orders. These measures of linkage disequilibrium cannot usually be determined, both because one cannot tell whether a gene came from the maternal or paternal gamete, and because such a large number of parameters cannot be estimated even from large samples. Simplifying assumptions must therefore be made. This paper sets out methods for estimating multilocus genotype frequencies which are appropriate for unlinked neutral loci, and for populations that are ultimately derived by mixing of two source populations. In such a hybrid population, all multilocus associations depend primarily on the number of loci involved that derive from the maternal genome, and the number derived from the paternal genome Allele frequencies may differ across loci, and the contribution of each locus to multilocus associations may be scaled by the difference in allele frequency between source populations for that locus (δp ≤ 1). For example, the cumulant describing the association between genes i, j, k from the maternal genome, and genes i, l from the paternal genome is K(tJ,k,iλ*), = δp(i)/2 δp(J) δp(k) δp(l) κ3,2. The state of the population is described by n allele frequencies; n divergences, δp; and by a symmetric matrix of cumulants, κ(J,K) (J = 0 ,..., n, K = 0 ,..., n). Expressions for these cumulants under short- and long-range migration are given. Two methods for estimating the cumulants are described: a simple method based on multivariate moments, and a maximum likelihood procedure, which uses the Metropolis algorithm. Both methods perform well when tested against simulations with two or four loci.","lang":"eng"}],"issue":"3","date_published":"2000-03-01T00:00:00Z","extern":"1","publication_status":"published","year":"2000","publist_id":"2759","volume":84,"intvolume":" 84","acknowledgement":"This work was supported by grant MMI09726 from the BBSRC/EPSRC, and by the Darwin Trust of Edinburgh. I am grateful to W. G. Hill, L. Kruuk and M. Orive, and to the referees, for their helpful comments on the manuscript.","publication_identifier":{"issn":["0018-067X"]},"external_id":{"pmid":["10762407"]},"publication":"Heredity","author":[{"orcid":"0000-0002-8548-5240","id":"4880FE40-F248-11E8-B48F-1D18A9856A87","full_name":"Barton, Nicholas H","first_name":"Nicholas H","last_name":"Barton"}],"page":"373 - 389","doi":"10.1046/j.1365-2540.2000.00683.x","_id":"3624","language":[{"iso":"eng"}],"citation":{"ieee":"N. H. Barton, “Estimating multilocus linkage disequilibria,” Heredity, vol. 84, no. 3. Nature Publishing Group, pp. 373–389, 2000.","mla":"Barton, Nicholas H. “Estimating Multilocus Linkage Disequilibria.” Heredity, vol. 84, no. 3, Nature Publishing Group, 2000, pp. 373–89, doi:10.1046/j.1365-2540.2000.00683.x.","short":"N.H. Barton, Heredity 84 (2000) 373–389.","apa":"Barton, N. H. (2000). Estimating multilocus linkage disequilibria. Heredity. Nature Publishing Group. https://doi.org/10.1046/j.1365-2540.2000.00683.x","chicago":"Barton, Nicholas H. “Estimating Multilocus Linkage Disequilibria.” Heredity. Nature Publishing Group, 2000. https://doi.org/10.1046/j.1365-2540.2000.00683.x.","ista":"Barton NH. 2000. Estimating multilocus linkage disequilibria. Heredity. 84(3), 373–389.","ama":"Barton NH. Estimating multilocus linkage disequilibria. Heredity. 2000;84(3):373-389. doi:10.1046/j.1365-2540.2000.00683.x"},"article_type":"original"}