数学
统计
普罗比特
估计
Probit模型
计量经济学
最大似然
有序概率单位
随机效应模型
多项式概率
医学
荟萃分析
管理
内科学
经济
作者
Ruggero Bellio,Sujit K. Ghosh,Art B. Owen,C Varin
出处
期刊:Biometrika
[Oxford University Press]
日期:2025-01-01
卷期号:112 (3)
被引量:1
标识
DOI:10.1093/biomet/asaf037
摘要
Summary Estimation of crossed random effects models commonly incurs computational costs that grow faster than linearly in the sample size $ N $, often as fast as $ \Omega(N^{3/2}) $, making them unsuitable for large datasets. For non-Gaussian responses, integrating out the random effects to obtain a marginal likelihood poses significant challenges, especially for high-dimensional integrals for which the Laplace approximation may not be accurate. In this article we develop a composite likelihood approach to probit models that replaces the crossed random effects model with some hierarchical models that require only one-dimensional integrals. We show how to consistently estimate the crossed effects model parameters from the hierarchical model fits. We find that the computation scales linearly in the sample size. The method is illustrated by applying it to approximately five million observations from Stitch Fix, where the crossed effects formulation would require an integral of dimension larger than $ 700\,000 $.
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