English

Distributed Online Stochastic Convex-Concave Optimization: Dynamic Regret Analyses under Single and Multiple Consensus Steps

Optimization and Control 2025-08-14 v1

Abstract

This paper considers the distributed online convex-concave optimization with constraint sets over a multiagent network, in which each agent autonomously generates a series of decision pairs through a designable mechanism to cooperatively minimize the global loss function. To this end, under no-Euclidean distance metrics, we propose a distributed online stochastic mirror descent convex-concave optimization algorithm with time-varying predictive mappings. Taking dynamic saddle point regret as a performance metric, it is proved that the proposed algorithm achieves the regret upper-bound in O(max{Tθ1,Tθ2(1+VT)})\mathcal{O}(\max \{T^{\theta_1}, T^{\theta_2} (1+V_T ) \}) for the general convex-concave loss function, where θ1,θ2(0,1)\theta_1, \theta_2 \in(0,1) are the tuning parameters, TT is the total iteration time, and VTV_T is the path-variation. Surely, this algorithm guarantees the sublinear convergence, provided that VTV_T is sublinear. Moreover, aiming to achieve better convergence, we further investigate a variant of this algorithm by employing the multiple consensus technique. The obtained results show that the appropriate setting can effectively tighten the regret bound to a certain extent. Finally, the efficacy of the proposed algorithms is validated and compared through the simulation example of a target tracking problem.

Keywords

Cite

@article{arxiv.2508.09411,
  title  = {Distributed Online Stochastic Convex-Concave Optimization: Dynamic Regret Analyses under Single and Multiple Consensus Steps},
  author = {Wentao Zhang and Baoyong Zhang and Deming Yuan and Shengyuan Xu and Vincent K. N. Lau},
  journal= {arXiv preprint arXiv:2508.09411},
  year   = {2025}
}
R2 v1 2026-07-01T04:47:22.443Z