English

Eigenvectors from Eigenvalues Sparse Principal Component Analysis (EESPCA)

Methodology 2022-05-12 v3 Quantitative Methods

Abstract

We present a novel technique for sparse principal component analysis. This method, named Eigenvectors from Eigenvalues Sparse Principal Component Analysis (EESPCA), is based on the formula for computing squared eigenvector loadings of a Hermitian matrix from the eigenvalues of the full matrix and associated sub-matrices. We explore two versions of the EESPCA method: a version that uses a fixed threshold for inducing sparsity and a version that selects the threshold via cross-validation. Relative to the state-of-the-art sparse PCA methods of Witten et al., Yuan & Zhang and Tan et al., the fixed threshold EESPCA technique offers an order-of-magnitude improvement in computational speed, does not require estimation of tuning parameters via cross-validation, and can more accurately identify true zero principal component loadings across a range of data matrix sizes and covariance structures. Importantly, the EESPCA method achieves these benefits while maintaining out-of-sample reconstruction error and PC estimation error close to the lowest error generated by all evaluated approaches. EESPCA is a practical and effective technique for sparse PCA with particular relevance to computationally demanding statistical problems such as the analysis of high-dimensional data sets or application of statistical techniques like resampling that involve the repeated calculation of sparse PCs.

Keywords

Cite

@article{arxiv.2006.01924,
  title  = {Eigenvectors from Eigenvalues Sparse Principal Component Analysis (EESPCA)},
  author = {H. Robert Frost},
  journal= {arXiv preprint arXiv:2006.01924},
  year   = {2022}
}
R2 v1 2026-06-23T16:00:34.806Z