We study finite-sum distributed optimization problems involving a master node and n−1 local nodes under the popular δ-similarity and μ-strong convexity conditions. We propose two new algorithms, SVRS and AccSVRS, motivated by previous works. The non-accelerated SVRS method combines the techniques of gradient sliding and variance reduction and achieves a better communication complexity of O~(n+nδ/μ) compared to existing non-accelerated algorithms. Applying the framework proposed in Katyusha X, we also develop a directly accelerated version named AccSVRS with the O~(n+n3/4δ/μ) communication complexity. In contrast to existing results, our complexity bounds are entirely smoothness-free and exhibit superiority in ill-conditioned cases. Furthermore, we establish a nearly matched lower bound to verify the tightness of our AccSVRS method.
@article{arxiv.2304.07504,
title = {Stochastic Distributed Optimization under Average Second-order Similarity: Algorithms and Analysis},
author = {Dachao Lin and Yuze Han and Haishan Ye and Zhihua Zhang},
journal= {arXiv preprint arXiv:2304.07504},
year = {2023}
}