1. L0 regularized logistic regression for large-scale data.
- Author
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Ming, Hao and Yang, Hu
- Subjects
- *
SELF-tuning controllers , *LOGISTIC regression analysis , *REGRESSION analysis , *ALGORITHMS - Abstract
In this paper, we investigate L 0 -regularized logistic regression models, and design two fast and efficient algorithms for high-dimensional correlated data and massive data, respectively. Our first algorithm, the Variable Sorted Active Set (VSAS) algorithm, is based on the local quadratic approximation of the KKT conditions for L 0 -penalized maximum log-likelihood function in high-dimensional correlated data. We establish an L ∞ error upper bound for the estimator obtained by the VSAS algorithm and prove its optimal convergence rate. Moreover, when the target signal exceeds the detectable level, the estimator obtained by the VSAS algorithm can achieve the oracle estimator with high probability. Our second algorithm, Communication Effective Variable Sorted Active Set (CEVSAS), aims to solve high-dimensional and large-sample L 0 -regularized logistic regression models by reduce computational and communication costs, while maintaining estimation efficiency. Finally, simulations and real data demonstrate the effectiveness of our proposed VSAS and CEVSAS algorithms. • We develop a fast VSAS algorithm for L 0 regularized logistic regression involving high-dimensional correlated data. • An L ∞ upper bound is established on the estimation error of the solution sequence generated by VSAS algorithm. • The CEVSAS altorithm is proposed to reduce computational costs and ensure higher estimation efficiency. • We propose two adaptive versions of the VSAS and CEVSAS algorithms for selecting the optimal tuning parameters. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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