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JMLR
2012
2012
Minimax Rates of Estimation for Sparse PCA in High Dimensions
We study sparse principal components analysis in the high-dimensional setting, where p (the number of variables) can be much larger than n (the number of observations). We prove optimal, non-asymptotic lower and upper bounds on the minimax estimation error for the leading eigenvector when it belongs to an q ball for q ∈ [0, 1]. Our bounds are sharp in p and n for all q ∈ [0, 1] over a wide class of distributions. The upper bound is obtained by analyzing the performance of qconstrained PCA. In particular, our results provide convergence rates for 1-constrained PCA.
Real-time TrafficConvergence Rates | JMLR 2012 | Minimax Estimation | Principal Components Analysis | Programming Languages |
Related Content
| Added | 27 Sep 2012 |
| Updated | 27 Sep 2012 |
| Type | Journal |
| Year | 2012 |
| Where | JMLR |
| Authors | Vincent Q. Vu, Jing Lei |
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