English

A Perturbed Value-Function-Based Interior-Point Method for Perturbed Pessimistic Bilevel Problems

Optimization and Control 2024-01-09 v1

Abstract

Bilevel optimizaiton serves as a powerful tool for many machine learning applications. Perturbed pessimistic bilevel problem PBPϵ\epsilon, with ϵ\epsilon being an arbitrary positive number, is a variant of the bilevel problem to deal with the case where there are multiple solutions in the lower level problem. However, the provably convergent algorithms for PBPϵ\epsilon with a nonlinear lower level problem are lacking. To fill the gap, we consider in the paper the problem PBPϵ\epsilon with a nonlinear lower level problem. By introducing a log-barrier function to replace the inequality constraint associated with the value function of the lower level problem, and approximating this value function, an algorithm named Perturbed Value-Function-based Interior-point Method(PVFIM) is proposed. We present a stationary condition for PBPϵ\epsilon, which has not been given before, and we show that PVFIM can converge to a stationary point of PBPϵ\epsilon. Finally, experiments are presented to verify the theoretical results and to show the application of the algorithm to GAN.

Keywords

Cite

@article{arxiv.2401.03636,
  title  = {A Perturbed Value-Function-Based Interior-Point Method for Perturbed Pessimistic Bilevel Problems},
  author = {Haimei Huo and Risheng Liu and Zhixun Su},
  journal= {arXiv preprint arXiv:2401.03636},
  year   = {2024}
}
R2 v1 2026-06-28T14:10:50.059Z