Literature DB >> 25324581

MINIMAX BOUNDS FOR SPARSE PCA WITH NOISY HIGH-DIMENSIONAL DATA.

Aharon Birnbaum1, Iain M Johnstone2, Boaz Nadler3, Debashis Paul4.   

Abstract

We study the problem of estimating the leading eigenvectors of a high-dimensional population covariance matrix based on independent Gaussian observations. We establish a lower bound on the minimax risk of estimators under the l2 loss, in the joint limit as dimension and sample size increase to infinity, under various models of sparsity for the population eigenvectors. The lower bound on the risk points to the existence of different regimes of sparsity of the eigenvectors. We also propose a new method for estimating the eigenvectors by a two-stage coordinate selection scheme.

Entities:  

Keywords:  Minimax risk; high-dimensional data; principal component analysis; sparsity; spiked covariance model

Year:  2013        PMID: 25324581      PMCID: PMC4196701          DOI: 10.1214/12-AOS1014

Source DB:  PubMed          Journal:  Ann Stat        ISSN: 0090-5364            Impact factor:   4.028


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