Computational Lower Bounds for Sparse PCA
Statistics Theory
2013-04-29 v2 Computational Complexity
Machine Learning
Statistics Theory
Abstract
In the context of sparse principal component detection, we bring evidence towards the existence of a statistical price to pay for computational efficiency. We measure the performance of a test by the smallest signal strength that it can detect and we propose a computationally efficient method based on semidefinite programming. We also prove that the statistical performance of this test cannot be strictly improved by any computationally efficient method. Our results can be viewed as complexity theoretic lower bounds conditionally on the assumptions that some instances of the planted clique problem cannot be solved in randomized polynomial time.
Cite
@article{arxiv.1304.0828,
title = {Computational Lower Bounds for Sparse PCA},
author = {Quentin Berthet and Philippe Rigollet},
journal= {arXiv preprint arXiv:1304.0828},
year = {2013}
}
Comments
Alternate title: "Complexity Theoretic Lower Bounds for Sparse Principal Component Detection"