A Thurstonian Model for Quantitative Genetic Analysis of Ranks: A Bayesian Approach

Daniel Gianola^*^,^,^,1 and Henner Simianer

^* Department of Animal Sciences, University of Wisconsin, Madison, Wisconsin 53706, Institute of Animal Breeding and Genetics, Georg-August-University, 37075 Göttingen, Germany and Department of Animal and Aquacultural Sciences, Norwegian University of Life Sciences, N-1432 Ås, Norway

^¹ Corresponding author: Department of Animal Sciences, University of Wisconsin, 1675 Observatory Dr., Madison, WI 53706.
E-mail: gianola{at}ansci.wisc.edu

A fully Bayesian method for quantitative genetic analysis ofdata consisting of ranks of, e.g., genotypes, scored at a seriesof events or experiments is presented. The model postulatesa latent structure, with an underlying variable realized foreach genotype or individual involved in the event. The rankobserved is assumed to reflect the order of the values of theunobserved variables, i.e., the classical Thurstonian modelof psychometrics. Parameters driving the Bayesian hierarchicalmodel include effects of covariates, additive genetic effects,permanent environmental deviations, and components of variance.A Markov chain Monte Carlo implementation based on the Gibbssampler is described, and procedures for inferring the probabilityof yet to be observed future rankings are outlined. Part ofthe model is rendered nonparametric by introducing a Dirichletprocess prior for the distribution of permanent environmentaleffects. This can lead to potential identification of clustersof such effects, which, in some competitions such as horse races,may reflect forms of undeclared preferential treatment.