An estimating equation approach to dimension reduction for longitudinal data

被引：8

作者：

Xu, Kelin ^{[1
]}

Guo, Wensheng ^{[2
]}

Xiong, Momiao ^{[3
]}

Zhu, Liping ^{[4
]}

Jin, Li ^{[1
]}

机构：

[1] Fudan Univ, Sch Life Sci, State Key Lab Genet Engn, 2005 Songhu Rd, Shanghai 200438, Peoples R China

[2] Univ Penn, Div Biostat, 423 Guardian Dr, Philadelphia, PA 19104 USA

[3] Univ Texas Houston, Hlth Sci Ctr, Ctr Human Genet, Div Biostat, 1200 Herman Pressler, Houston, TX 77030 USA

[4] Renmin Univ China, Inst Stat & Big Data, 59 Zhongguancun Ave, Beijing 100872, Peoples R China

来源：

BIOMETRIKA | 2016年 / 103卷 / 01期

基金：

中国国家自然科学基金; 美国国家科学基金会; 美国国家卫生研究院;

关键词：

Central mean subspace; Dimension reduction; Estimating equation; Longitudinal data; Semiparametric efficiency; Sliced inverse regression; SLICED INVERSE REGRESSION; PRINCIPAL HESSIAN DIRECTIONS; SINGLE-INDEX MODELS; HYPERTENSION; VISUALIZATION;

D O I：

10.1093/biomet/asv066

中图分类号：

Q [生物科学];

学科分类号：

07 ; 0710 ; 09 ;

摘要：

Sufficient dimension reduction has been extensively explored in the context of independent and identically distributed data. In this article we generalize sufficient dimension reduction to longitudinal data and propose an estimating equation approach to estimating the central mean subspace. The proposed method accounts for the covariance structure within each subject and improves estimation efficiency when the covariance structure is correctly specified. Even if the covariance structure is misspecified, our estimator remains consistent. In addition, our method relaxes distributional assumptions on the covariates and is doubly robust. To determine the structural dimension of the central mean subspace, we propose a Bayesian-type information criterion. We show that the estimated structural dimension is consistent and that the estimated basis directions are root consistent, asymptotically normal and locally efficient. Simulations and an analysis of the Framingham Heart Study data confirm the effectiveness of our approach.

引用

页码：189 / 203

页数：15

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