English

Moreau Envelope Based Difference-of-weakly-Convex Reformulation and Algorithm for Bilevel Programs

Optimization and Control 2024-01-23 v2 Machine Learning

Abstract

Bilevel programming has emerged as a valuable tool for hyperparameter selection, a central concern in machine learning. In a recent study by Ye et al. (2023), a value function-based difference of convex algorithm was introduced to address bilevel programs. This approach proves particularly powerful when dealing with scenarios where the lower-level problem exhibits convexity in both the upper-level and lower-level variables. Examples of such scenarios include support vector machines and 1\ell_1 and 2\ell_2 regularized regression. In this paper, we significantly expand the range of applications, now requiring convexity only in the lower-level variables of the lower-level program. We present an innovative single-level difference of weakly convex reformulation based on the Moreau envelope of the lower-level problem. We further develop a sequentially convergent Inexact Proximal Difference of Weakly Convex Algorithm (iP-DwCA). To evaluate the effectiveness of the proposed iP-DwCA, we conduct numerical experiments focused on tuning hyperparameters for kernel support vector machines on simulated data.

Keywords

Cite

@article{arxiv.2306.16761,
  title  = {Moreau Envelope Based Difference-of-weakly-Convex Reformulation and Algorithm for Bilevel Programs},
  author = {Lucy L. Gao and Jane J. Ye and Haian Yin and Shangzhi Zeng and Jin Zhang},
  journal= {arXiv preprint arXiv:2306.16761},
  year   = {2024}
}
R2 v1 2026-06-28T11:17:39.920Z