English

Entropy-based Bounds on Dimension Reduction in L_1

Metric Geometry 2011-12-22 v3

Abstract

We show that for every large enough integer NN, there exists an NN-point subset of L1L_1 such that for every D>1D>1, embedding it into 1d\ell_1^d with distortion DD requires dimension dd at least NΩ(1/D2)N^{\Omega(1/D^2)}, and that for every \eps>0\eps>0 and large enough integer NN, there exists an NN-point subset of L1L_1 such that embedding it into 1d\ell_1^d with distortion 1+\eps1+\eps requires dimension dd at least N1O(1/log(1/\eps))N^{1-O(1/\log(1/\eps))}. These results were previously proven by Brinkman and Charikar [JACM, 2005] and by Andoni, Charikar, Neiman, and Nguyen [FOCS 2011]. We provide an alternative and arguably more intuitive proof based on an entropy argument.

Keywords

Cite

@article{arxiv.1108.1283,
  title  = {Entropy-based Bounds on Dimension Reduction in L_1},
  author = {Oded Regev},
  journal= {arXiv preprint arXiv:1108.1283},
  year   = {2011}
}
R2 v1 2026-06-21T18:46:56.107Z