Recht-R\'e Noncommutative Arithmetic-Geometric Mean Conjecture is False
Abstract
Stochastic optimization algorithms have become indispensable in modern machine learning. An unresolved foundational question in this area is the difference between with-replacement sampling and without-replacement sampling -- does the latter have superior convergence rate compared to the former? A groundbreaking result of Recht and R\'e reduces the problem to a noncommutative analogue of the arithmetic-geometric mean inequality where positive numbers are replaced by positive definite matrices. If this inequality holds for all , then without-replacement sampling indeed outperforms with-replacement sampling. The conjectured Recht-R\'e inequality has so far only been established for and a special case of . We will show that the Recht-R\'e conjecture is false for general . Our approach relies on the noncommutative Positivstellensatz, which allows us to reduce the conjectured inequality to a semidefinite program and the validity of the conjecture to certain bounds for the optimum values, which we show are false as soon as .
Cite
@article{arxiv.2006.01510,
title = {Recht-R\'e Noncommutative Arithmetic-Geometric Mean Conjecture is False},
author = {Zehua Lai and Lek-Heng Lim},
journal= {arXiv preprint arXiv:2006.01510},
year = {2020}
}
Comments
10 pages