Sparse functional varying-coefficient mixture regression

IF 1.4 3区数学 Q2 STATISTICS & PROBABILITY

Journal of Multivariate Analysis Pub Date : 2024-11-15 DOI:10.1016/j.jmva.2024.105383

Qingzhi Zhong , Xinyuan Song

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引用次数: 0

Abstract

The functional varying-coefficient model (FVCM) provides a simple yet efficient method for function on scalar regression. However, classical FVCM typically assumes that varying associations between functional responses and scalar covariates are identical for all subjects and nonzero in the entire domain of functional measures. This study considers sparse functional varying-coefficient mixture regression, which allows heterogeneous regression associations and dependency structure among multiple functional responses and accommodates functional sparsity in varying coefficient functions. Moreover, we devise a computationally efficient EM algorithm with a double-sparse penalty for estimation. We show that the proposed estimator is consistent, can uncover sparse subregions, and simultaneously select the number of clusters with probability tending to one. Simulation studies and an application to the Alzheimer’s Disease Neuroimaging Initiative study confirm that the proposed method yields more interpretable results and a much lower classification error than existing methods.

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稀疏函数变化系数混合回归

功能变化系数模型（FVCM）为标量回归函数提供了一种简单而有效的方法。然而，经典的 FVCM 通常假定所有受试者的功能反应和标量协变量之间的变化关联是相同的，并且在整个功能测量域中都不为零。本研究考虑了稀疏功能变化系数混合回归，它允许多种功能反应之间存在异质回归关联和依赖结构，并适应变化系数函数中的功能稀疏性。此外，我们还设计了一种计算高效的 EM 算法，采用双稀疏惩罚进行估计。我们证明了所提出的估计方法是一致的，可以发现稀疏的子区域，并同时以趋近于 1 的概率选择簇的数量。模拟研究和阿尔茨海默病神经成像计划研究的应用证实，与现有方法相比，所提出的方法能产生更多可解释的结果，分类误差也更小。

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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来源期刊

Journal of Multivariate Analysis 数学-统计学与概率论

CiteScore

2.40

自引率

25.00%

发文量

108

审稿时长

74 days

期刊介绍： Founded in 1971, the Journal of Multivariate Analysis (JMVA) is the central venue for the publication of new, relevant methodology and particularly innovative applications pertaining to the analysis and interpretation of multidimensional data. The journal welcomes contributions to all aspects of multivariate data analysis and modeling, including cluster analysis, discriminant analysis, factor analysis, and multidimensional continuous or discrete distribution theory. Topics of current interest include, but are not limited to, inferential aspects of Copula modeling Functional data analysis Graphical modeling High-dimensional data analysis Image analysis Multivariate extreme-value theory Sparse modeling Spatial statistics.