Hierarchical shrinkage priors and model fitting for high-dimensional generalized linear models.

Pub Date : 2012-11-26 DOI:10.1515/1544-6115.1803
Nengjun Yi, Shuangge Ma
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Abstract

Abstract Genetic and other scientific studies routinely generate very many predictor variables, which can be naturally grouped, with predictors in the same groups being highly correlated. It is desirable to incorporate the hierarchical structure of the predictor variables into generalized linear models for simultaneous variable selection and coefficient estimation. We propose two prior distributions: hierarchical Cauchy and double-exponential distributions, on coefficients in generalized linear models. The hierarchical priors include both variable-specific and group-specific tuning parameters, thereby not only adopting different shrinkage for different coefficients and different groups but also providing a way to pool the information within groups. We fit generalized linear models with the proposed hierarchical priors by incorporating flexible expectation-maximization (EM) algorithms into the standard iteratively weighted least squares as implemented in the general statistical package R. The methods are illustrated with data from an experiment to identify genetic polymorphisms for survival of mice following infection with Listeria monocytogenes. The performance of the proposed procedures is further assessed via simulation studies. The methods are implemented in a freely available R package BhGLM (http://www.ssg.uab.edu/bhglm/).

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高维广义线性模型的层次收缩先验和模型拟合。
摘要 基因研究和其他科学研究通常会产生非常多的预测变量,这些预测变量可以自然分组,同一组中的预测变量具有高度相关性。我们希望将预测变量的层次结构纳入广义线性模型,以便同时进行变量选择和系数估计。我们提出了广义线性模型中系数的两种先验分布:分层考奇分布和双指数分布。分层先验包括特定变量和特定组的调整参数,因此不仅对不同系数和不同组采用不同的收缩,而且还提供了一种在组内汇集信息的方法。我们将灵活的期望最大化(EM)算法结合到通用统计软件包 R 中实现的标准迭代加权最小二乘法中,用提出的分层先验来拟合广义线性模型。通过模拟研究进一步评估了建议程序的性能。这些方法在免费提供的 R 软件包 BhGLM (http://www.ssg.uab.edu/bhglm/) 中实现。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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