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贝叶斯多层网络恢复选择

Bayesian Multilevel Network Recovery Selection

Journal of Computational and Graphical Statistics · 2025
被引 0
ABS 3

中文导读

提出一种贝叶斯多层非参数核方法,结合新提出的多层Ising spike-slab先验,同时进行变量选择和网络恢复,适用于高维非加性模型下的多层结构数据,并通过模拟和遗传通路分析验证效果。

Abstract

Variable selection and network estimation have been popular tools for identifying key variables associated with a response variable of interest in settings involving non-negligible dependency structures among variables. However, the ability to identify relevant variables in a high-dimensional setting while accounting for conditional dependencies within a multilevel structure under a nonadditive model is still limited. Hence, in this article, we examine multilevel network recovery selection under a two-level structure in which higher-level variables contain lower-level variables nested within them. Due to the dependency structure, the variables work together to accomplish certain tasks at both levels. Our main interest is to simultaneously explore variable selection and identify dependency structures between higher- and lower-level variables under a nonadditive model framework. We develop a multi-level nonparametric kernel machine approach with a newly proposed multilevel Ising spike-slab prior, using Markov-chain Monte Carlo and variational Bayes inference to identify multi-level variables and jointly build the network. The variational inference approach is novel in using the sampled dependency structure as the observed variable rather than the response. In addition to the variable selection and network recovery capabilities, our approach can produce both mean and quantile estimations of the original response variable of interest. We demonstrate the advantages of our approach using simulation studies and a genetic pathway-based analysis. Supplementary materials for this article are available online.

变量选择网络估计多层模型贝叶斯方法机器学习