Memory-Query Tradeoffs for Randomized Convex Optimization
Data Structures and Algorithms
2023-06-23 v1 Artificial Intelligence
Machine Learning
Machine Learning
Abstract
We show that any randomized first-order algorithm which minimizes a -dimensional, -Lipschitz convex function over the unit ball must either use bits of memory or make queries, for any constant and when the precision is quasipolynomially small in . Our result implies that cutting plane methods, which use bits of memory and queries, are Pareto-optimal among randomized first-order algorithms, and quadratic memory is required to achieve optimal query complexity for convex optimization.
Cite
@article{arxiv.2306.12534,
title = {Memory-Query Tradeoffs for Randomized Convex Optimization},
author = {Xi Chen and Binghui Peng},
journal= {arXiv preprint arXiv:2306.12534},
year = {2023}
}