Space lower bounds for linear prediction in the streaming model
Machine Learning
2019-06-13 v3 Machine Learning
Abstract
We show that fundamental learning tasks, such as finding an approximate linear separator or linear regression, require memory at least \emph{quadratic} in the dimension, in a natural streaming setting. This implies that such problems cannot be solved (at least in this setting) by scalable memory-efficient streaming algorithms. Our results build on a memory lower bound for a simple linear-algebraic problem -- finding orthogonal vectors -- and utilize the estimates on the packing of the Grassmannian, the manifold of all linear subspaces of fixed dimension.
Cite
@article{arxiv.1902.03498,
title = {Space lower bounds for linear prediction in the streaming model},
author = {Yuval Dagan and Gil Kur and Ohad Shamir},
journal= {arXiv preprint arXiv:1902.03498},
year = {2019}
}
Comments
Added a minor correction in referencing the prior work