广义矩阵分解回归:双向结构化数据的估计和推断。

IF 1.3 4区 数学 Q2 STATISTICS & PROBABILITY
Annals of Applied Statistics Pub Date : 2023-12-01 Epub Date: 2023-10-30 DOI:10.1214/23-aoas1746
Yue Wang, Ali Shojaie, Timothy Randolph, Parker Knight, Jing Ma
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引用次数: 0

摘要

受生态学、微生物学和神经科学新兴应用的启发,本文研究了双向结构数据的高维回归。为了估计高维系数向量,我们提出了广义矩阵分解回归(GMDR),以有效利用行列结构的辅助信息。GMDR 将主成分回归(PCR)扩展到了双向结构数据,但与 PCR 不同的是,GMDR 会选择对结果最具预测性的成分,从而实现更准确的预测。为了推断单个变量的回归系数,我们提出了广义矩阵分解推断法(GMDI),这是一种通用的高维推断框架,适用于包括所提出的 GMDR 估计器在内的一大系列估计器。GMDI 提供了更大的灵活性,可纳入相关的辅助行列结构。因此,GMDI 并不要求真正的回归系数是稀疏的,而是根据列结构来约束代表回归系数的坐标系。GMDI 还允许依赖和异方差观测。我们研究了 GMDI 在 I 类错误率和功率方面的理论特性,并在模拟研究和人类微生物组数据应用中证明了 GMDR 和 GMDI 的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
GENERALIZED MATRIX DECOMPOSITION REGRESSION: ESTIMATION AND INFERENCE FOR TWO-WAY STRUCTURED DATA.

Motivated by emerging applications in ecology, microbiology, and neuroscience, this paper studies high-dimensional regression with two-way structured data. To estimate the high-dimensional coefficient vector, we propose the generalized matrix decomposition regression (GMDR) to efficiently leverage auxiliary information on row and column structures. GMDR extends the principal component regression (PCR) to two-way structured data, but unlike PCR, GMDR selects the components that are most predictive of the outcome, leading to more accurate prediction. For inference on regression coefficients of individual variables, we propose the generalized matrix decomposition inference (GMDI), a general high-dimensional inferential framework for a large family of estimators that include the proposed GMDR estimator. GMDI provides more flexibility for incorporating relevant auxiliary row and column structures. As a result, GMDI does not require the true regression coefficients to be sparse, but constrains the coordinate system representing the regression coefficients according to the column structure. GMDI also allows dependent and heteroscedastic observations. We study the theoretical properties of GMDI in terms of both the type-I error rate and power and demonstrate the effectiveness of GMDR and GMDI in simulation studies and an application to human microbiome data.

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来源期刊
Annals of Applied Statistics
Annals of Applied Statistics 社会科学-统计学与概率论
CiteScore
3.10
自引率
5.60%
发文量
131
审稿时长
6-12 weeks
期刊介绍: Statistical research spans an enormous range from direct subject-matter collaborations to pure mathematical theory. The Annals of Applied Statistics, the newest journal from the IMS, is aimed at papers in the applied half of this range. Published quarterly in both print and electronic form, our goal is to provide a timely and unified forum for all areas of applied statistics.
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