Provably Accelerated Decentralized Gradient Method Over Unbalanced Directed Graphs
Abstract
We consider the decentralized optimization problem, where a network of agents aims to collaboratively minimize the average of their individual smooth and convex objective functions through peer-to-peer communication in a directed graph. To tackle this problem, we propose two accelerated gradient tracking methods, namely APD and APD-SC, for non-strongly convex and strongly convex objective functions, respectively. We show that APD and APD-SC converge at the rates and , respectively, up to constant factors depending only on the mixing matrix. APD and APD-SC are the first decentralized methods over unbalanced directed graphs that achieve the same provable acceleration as centralized methods. Numerical experiments demonstrate the effectiveness of both methods.
Cite
@article{arxiv.2107.12065,
title = {Provably Accelerated Decentralized Gradient Method Over Unbalanced Directed Graphs},
author = {Zhuoqing Song and Lei Shi and Shi Pu and Ming Yan},
journal= {arXiv preprint arXiv:2107.12065},
year = {2023}
}
Comments
SIAM Journal on Optimization, in press