English

Does SLOPE outperform bridge regression?

Machine Learning 2021-09-24 v3 Machine Learning Statistics Theory Statistics Theory

Abstract

A recently proposed SLOPE estimator (arXiv:1407.3824) has been shown to adaptively achieve the minimax 2\ell_2 estimation rate under high-dimensional sparse linear regression models (arXiv:1503.08393). Such minimax optimality holds in the regime where the sparsity level kk, sample size nn, and dimension pp satisfy k/p0k/p \rightarrow 0, klogp/n0k\log p/n \rightarrow 0. In this paper, we characterize the estimation error of SLOPE under the complementary regime where both kk and nn scale linearly with pp, and provide new insights into the performance of SLOPE estimators. We first derive a concentration inequality for the finite sample mean square error (MSE) of SLOPE. The quantity that MSE concentrates around takes a complicated and implicit form. With delicate analysis of the quantity, we prove that among all SLOPE estimators, LASSO is optimal for estimating kk-sparse parameter vectors that do not have tied non-zero components in the low noise scenario. On the other hand, in the large noise scenario, the family of SLOPE estimators are sub-optimal compared with bridge regression such as the Ridge estimator.

Keywords

Cite

@article{arxiv.1909.09345,
  title  = {Does SLOPE outperform bridge regression?},
  author = {Shuaiwen Wang and Haolei Weng and Arian Maleki},
  journal= {arXiv preprint arXiv:1909.09345},
  year   = {2021}
}

Comments

50 pages, 18 figures

R2 v1 2026-06-23T11:21:01.337Z