English

Goldstein Stationarity in Lipschitz Constrained Optimization

Optimization and Control 2024-08-16 v3

Abstract

We prove the first convergence guarantees for a subgradient method minimizing a generic Lipschitz function over generic Lipschitz inequality constraints. No smoothness or convexity (or weak convexity) assumptions are made. Instead, we utilize a sequence of recent advances in Lipschitz unconstrained minimization, which showed convergence rates of O(1/δϵ3)O(1/\delta\epsilon^3) towards reaching a "Goldstein" stationary point, that is, a point where an average of gradients sampled at most distance δ\delta away has size at most ϵ\epsilon. We generalize these prior techniques to handle functional constraints, proposing a subgradient-type method with similar O(1/δϵ3)O(1/\delta\epsilon^3) guarantees on reaching a Goldstein Fritz-John or Goldstein KKT stationary point, depending on whether a certain Goldstein-style generalization of constraint qualification holds.

Keywords

Cite

@article{arxiv.2310.03690,
  title  = {Goldstein Stationarity in Lipschitz Constrained Optimization},
  author = {Benjamin Grimmer and Zhichao Jia},
  journal= {arXiv preprint arXiv:2310.03690},
  year   = {2024}
}
R2 v1 2026-06-28T12:41:46.207Z