Modeling Preferences: A Bayesian Mixture of Finite Mixtures for Rankings and Ratings
提出一个联合统计模型(BTL-Binomial),同时分析排名和评分数据,通过贝叶斯有限混合方法捕捉评分者效应和偏好异质性,适用于学术评审等场景。
Rankings and ratings are commonly used to express preferences but provide distinct and complementary information.Rankings give ordinal and scale-free comparisons but lack granularity; ratings provide cardinal and granular assessments but may be highly subjective or inconsistent.Collecting and analyzing rankings and ratings jointly has not been performed until recently due to a lack of principled methods.In this work, we propose a flexible, joint statistical model for rankings and ratings-the Bradley-Terry-Luce-Binomial (BTL-Binomial).The model captures rater effects and preference heterogeneity, respectively, with judge-specific random effects and a latent class mixture framework where the number of classes is unknown a priori.We propose computationally-efficient estimation via a Bayesian mixture of finite mixtures (MFM) approach.Finally, we demonstrate statistical inference and decision-making based on rankings and ratings jointly through applications to real and simulated datasets in academic peer review.