Sharper Analysis of Single-Loop Methods for Bilevel Optimization
Abstract
Bilevel optimization underpins many machine learning applications, including hyperparameter optimization, meta-learning, neural architecture search, and reinforcement learning. While hypergradient-based methods have advanced significantly, a gap persists between theoretical guarantees and practical single-loop implementations required for efficiency. We bridge this gap by establishing sharper convergence results for single-loop approximate implicit differentiation (AID) and iterative differentiation (ITD) methods, leveraging our proposed analytical framework, decoupled norm analysis (DNA). For AID, we improve the convergence rate from to , where is the condition number of the inner-level problem. For ITD, we prove that the asymptotic error is , exactly matching the known lower bound and improving upon the previous guarantee. Numerical experiments on synthetic and real tasks corroborate our theoretical findings.
Cite
@article{arxiv.2607.10263,
title = {Sharper Analysis of Single-Loop Methods for Bilevel Optimization},
author = {Yubo Zhou and Jun Shu and Luo Luo and Junmin Liu and Deyu Meng and Guang Dai and Haishan Ye},
journal= {arXiv preprint arXiv:2607.10263},
year = {2026}
}
Comments
26 pages,6 figures