Understanding Riemannian Acceleration via a Proximal Extragradient Framework

COLT 2022 pp. 2924-2962

/colt/2022/jin2022colt-understanding/

Abstract

We contribute to advancing the understanding of Riemannian accelerated gradient methods. In particular, we revisit “\emph{Accelerated Hybrid Proximal Extragradient}” (A-HPE), a powerful framework for obtaining Euclidean accelerated methods \citep{monteiro2013accelerated}. Building on A-HPE, we then propose and analyze Riemannian A-HPE. The core of our analysis consists of two key components: (i) a set of new insights into Euclidean A-HPE itself; and (ii) a careful control of metric distortion caused by Riemannian geometry. We illustrate our framework by obtaining a few existing and new Riemannian accelerated gradient methods as special cases, while characterizing their acceleration as corollaries of our main results.

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Cite

Text

Jin and Sra. "Understanding Riemannian Acceleration via a Proximal Extragradient Framework." Conference on Learning Theory, 2022.

Markdown

[Jin and Sra. "Understanding Riemannian Acceleration via a Proximal Extragradient Framework." Conference on Learning Theory, 2022.](https://mlanthology.org/colt/2022/jin2022colt-understanding/)

BibTeX

@inproceedings{jin2022colt-understanding,
  title     = {{Understanding Riemannian Acceleration via a Proximal Extragradient Framework}},
  author    = {Jin, Jikai and Sra, Suvrit},
  booktitle = {Conference on Learning Theory},
  year      = {2022},
  pages     = {2924-2962},
  volume    = {178},
  url       = {https://mlanthology.org/colt/2022/jin2022colt-understanding/}
}