English

Exploring the Generalization Capabilities of AID-based Bi-level Optimization

Machine Learning 2024-11-26 v1 Machine Learning

Abstract

Bi-level optimization has achieved considerable success in contemporary machine learning applications, especially for given proper hyperparameters. However, due to the two-level optimization structure, commonly, researchers focus on two types of bi-level optimization methods: approximate implicit differentiation (AID)-based and iterative differentiation (ITD)-based approaches. ITD-based methods can be readily transformed into single-level optimization problems, facilitating the study of their generalization capabilities. In contrast, AID-based methods cannot be easily transformed similarly but must stay in the two-level structure, leaving their generalization properties enigmatic. In this paper, although the outer-level function is nonconvex, we ascertain the uniform stability of AID-based methods, which achieves similar results to a single-level nonconvex problem. We conduct a convergence analysis for a carefully chosen step size to maintain stability. Combining the convergence and stability results, we give the generalization ability of AID-based bi-level optimization methods. Furthermore, we carry out an ablation study of the parameters and assess the performance of these methods on real-world tasks. Our experimental results corroborate the theoretical findings, demonstrating the effectiveness and potential applications of these methods.

Keywords

Cite

@article{arxiv.2411.16081,
  title  = {Exploring the Generalization Capabilities of AID-based Bi-level Optimization},
  author = {Congliang Chen and Li Shen and Zhiqiang Xu and Wei Liu and Zhi-Quan Luo and Peilin Zhao},
  journal= {arXiv preprint arXiv:2411.16081},
  year   = {2024}
}
R2 v1 2026-06-28T20:10:51.708Z