Det-CGD: Compressed Gradient Descent with Matrix Stepsizes for Non-Convex Optimization
Abstract
This paper introduces a new method for minimizing matrix-smooth non-convex objectives through the use of novel Compressed Gradient Descent (CGD) algorithms enhanced with a matrix-valued stepsize. The proposed algorithms are theoretically analyzed first in the single-node and subsequently in the distributed settings. Our theoretical results reveal that the matrix stepsize in CGD can capture the objective's structure and lead to faster convergence compared to a scalar stepsize. As a byproduct of our general results, we emphasize the importance of selecting the compression mechanism and the matrix stepsize in a layer-wise manner, taking advantage of model structure. Moreover, we provide theoretical guarantees for free compression, by designing specific layer-wise compressors for the non-convex matrix smooth objectives. Our findings are supported with empirical evidence.
Cite
@article{arxiv.2305.12568,
title = {Det-CGD: Compressed Gradient Descent with Matrix Stepsizes for Non-Convex Optimization},
author = {Hanmin Li and Avetik Karagulyan and Peter Richtárik},
journal= {arXiv preprint arXiv:2305.12568},
year = {2024}
}
Comments
9 pages, 39 figures, published in ICLR 2024