English

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 dd-dimensional, 11-Lipschitz convex function over the unit ball must either use Ω(d2δ)\Omega(d^{2-\delta}) bits of memory or make Ω(d1+δ/6o(1))\Omega(d^{1+\delta/6-o(1)}) queries, for any constant δ(0,1)\delta\in (0,1) and when the precision ϵ\epsilon is quasipolynomially small in dd. Our result implies that cutting plane methods, which use O~(d2)\tilde{O}(d^2) bits of memory and O~(d)\tilde{O}(d) queries, are Pareto-optimal among randomized first-order algorithms, and quadratic memory is required to achieve optimal query complexity for convex optimization.

Keywords

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}
}
R2 v1 2026-06-28T11:11:12.434Z