English

Decentralized Optimization over Time-Varying Row-Stochastic Digraphs

Optimization and Control 2026-02-24 v3

Abstract

Decentralized optimization over directed graphs is essential for applications such as robotic swarms, sensor networks, and distributed learning. In many practical scenarios, the underlying network takes the form of a Time-Varying Broadcast Network (TVBN), where only row-stochastic mixing matrices can be constructed due to the unavailability of out-degree information. Achieving exact convergence for decentralized optimization over TVBNs has remained a long-standing open problem, as the limiting distribution of time-varying row-stochastic mixing matrices depends on unpredictable future graph realizations, rendering standard bias-correction techniques infeasible. This paper develops the first decentralized optimization algorithm that achieves exact convergence using only time-varying row-stochastic matrices. We first propose PULM (Pull-with-Memory), a gossip protocol that achieves average consensus with exponential convergence by alternating between row-stochastic mixing and local adjustment steps. Building on PULM, we develop PULM-DGD, which converges to a stationary solution at a rate of O(ln(T)/T)\mathcal{O}(\ln(T)/T) for smooth nonconvex objectives, where TT denotes the communication round. Our results significantly broaden the applicability of decentralized optimization to highly dynamic communication environments.

Keywords

Cite

@article{arxiv.2512.24483,
  title  = {Decentralized Optimization over Time-Varying Row-Stochastic Digraphs},
  author = {Liyuan Liang and Yilong Song and Kun Yuan},
  journal= {arXiv preprint arXiv:2512.24483},
  year   = {2026}
}
R2 v1 2026-07-01T08:46:14.807Z