English

Accelerated Distributed Nesterov Gradient Descent

Optimization and Control 2020-06-02 v4

Abstract

This paper considers the distributed optimization problem over a network, where the objective is to optimize a global function formed by a sum of local functions, using only local computation and communication. We develop an Accelerated Distributed Nesterov Gradient Descent (Acc-DNGD) method. When the objective function is convex and LL-smooth, we show that it achieves a O(1t1.4ϵ)O(\frac{1}{t^{1.4-\epsilon}}) convergence rate for all ϵ(0,1.4)\epsilon\in(0,1.4). We also show the convergence rate can be improved to O(1t2)O(\frac{1}{t^2}) if the objective function is a composition of a linear map and a strongly-convex and smooth function. When the objective function is μ\mu-strongly convex and LL-smooth, we show that it achieves a linear convergence rate of O([1C(μL)5/7]t)O([ 1 - C (\frac{\mu}{L})^{5/7} ]^t), where Lμ\frac{L}{\mu} is the condition number of the objective, and C>0C>0 is some constant that does not depend on Lμ\frac{L}{\mu}.

Keywords

Cite

@article{arxiv.1705.07176,
  title  = {Accelerated Distributed Nesterov Gradient Descent},
  author = {Guannan Qu and Na Li},
  journal= {arXiv preprint arXiv:1705.07176},
  year   = {2020}
}

Comments

55 pages, 8 figures

R2 v1 2026-06-22T19:53:05.571Z