English

One-pass additive-error subset selection for $\ell_{p}$ subspace approximation

Machine Learning 2022-04-27 v1 Computational Geometry Machine Learning

Abstract

We consider the problem of subset selection for p\ell_{p} subspace approximation, that is, to efficiently find a \emph{small} subset of data points such that solving the problem optimally for this subset gives a good approximation to solving the problem optimally for the original input. Previously known subset selection algorithms based on volume sampling and adaptive sampling \cite{DeshpandeV07}, for the general case of p[1,)p \in [1, \infty), require multiple passes over the data. In this paper, we give a one-pass subset selection with an additive approximation guarantee for p\ell_{p} subspace approximation, for any p[1,)p \in [1, \infty). Earlier subset selection algorithms that give a one-pass multiplicative (1+ϵ)(1+\epsilon) approximation work under the special cases. Cohen \textit{et al.} \cite{CohenMM17} gives a one-pass subset section that offers multiplicative (1+ϵ)(1+\epsilon) approximation guarantee for the special case of 2\ell_{2} subspace approximation. Mahabadi \textit{et al.} \cite{MahabadiRWZ20} gives a one-pass \emph{noisy} subset selection with (1+ϵ)(1+\epsilon) approximation guarantee for p\ell_{p} subspace approximation when p{1,2}p \in \{1, 2\}. Our subset selection algorithm gives a weaker, additive approximation guarantee, but it works for any p[1,)p \in [1, \infty).

Keywords

Cite

@article{arxiv.2204.12073,
  title  = {One-pass additive-error subset selection for $\ell_{p}$ subspace approximation},
  author = {Amit Deshpande and Rameshwar Pratap},
  journal= {arXiv preprint arXiv:2204.12073},
  year   = {2022}
}

Comments

arXiv admin note: text overlap with arXiv:2103.11107

R2 v1 2026-06-24T10:58:34.880Z