English

Primal-dual proximal bundle and conditional gradient methods for convex problems

Optimization and Control 2025-09-26 v4

Abstract

This paper studies the primal-dual convergence and iteration-complexity of proximal bundle methods for solving nonsmooth problems with convex structures. More specifically, we develop a family of primal-dual proximal bundle methods for solving convex nonsmooth composite optimization problems and establish the iteration-complexity in terms of a primal-dual gap. We also propose a class of proximal bundle methods for solving convex-concave nonsmooth composite saddle-point problems and establish the iteration-complexity to find an approximate saddle-point. This paper places special emphasis on the primal-dual perspective of the proximal bundle method. In particular, we discover an interesting duality between the conditional gradient method and the cutting-plane scheme used within the proximal bundle method. Leveraging this duality, we further develop novel variants of both the conditional gradient method and the cutting-plane scheme. Additionally, we report numerical experiments to demonstrate the effectiveness and efficiency of the proposed proximal bundle methods in comparison with the subgradient method for solving a regularized matrix game.

Keywords

Cite

@article{arxiv.2412.00585,
  title  = {Primal-dual proximal bundle and conditional gradient methods for convex problems},
  author = {Jiaming Liang},
  journal= {arXiv preprint arXiv:2412.00585},
  year   = {2025}
}

Comments

41 pages

R2 v1 2026-06-28T20:18:11.993Z