中文

Relative Weak Convexity and Projected Subgradient Methods: Analysis and Convergence

最优化与控制 2026-06-29 v1

摘要

We introduce the class of relatively weakly convex functions, which extends the classical notion of weak convexity by measuring nonconvexity relative to a distance-generating function. We investigate the fundamental properties of this function class, establishing characterization results, calculus rules, and illustrative examples. We further analyze the associated optimization landscape and identify a neighborhood of the set of global minimizers that is free of saddle points. Motivated by this geometric structure, we propose the Projected SubGradient Algorithm (PSGA) with several step-size strategies. Under a sharpness error bound, we prove that, when initialized within this saddle-point-free neighborhood, the iterates generated by PSGA converge to a global minimizer for each of the proposed step-size strategies. Furthermore, linear convergence is established for the geometrically decaying step-size strategy.

引用

@article{arxiv.2606.30138,
  title  = {Relative Weak Convexity and Projected Subgradient Methods: Analysis and Convergence},
  author = {Morteza Rahimi and Masoud Ahookhosh},
  journal= {arXiv preprint arXiv:2606.30138},
  year   = {2026}
}

备注

20 pages, 4 figures