English

Dimension reduction by random hyperplane tessellations

Probability 2013-09-27 v2 Functional Analysis

Abstract

Given a subset K of the unit Euclidean sphere, we estimate the minimal number m = m(K) of hyperplanes that generate a uniform tessellation of K, in the sense that the fraction of the hyperplanes separating any pair x, y in K is nearly proportional to the Euclidean distance between x and y. Random hyperplanes prove to be almost ideal for this problem; they achieve the almost optimal bound m = O(w(K)^2) where w(K) is the Gaussian mean width of K. Using the map that sends x in K to the sign vector with respect to the hyperplanes, we conclude that every bounded subset K of R^n embeds into the Hamming cube {-1, 1}^m with a small distortion in the Gromov-Haussdorf metric. Since for many sets K one has m = m(K) << n, this yields a new discrete mechanism of dimension reduction for sets in Euclidean spaces.

Keywords

Cite

@article{arxiv.1111.4452,
  title  = {Dimension reduction by random hyperplane tessellations},
  author = {Yaniv Plan and Roman Vershynin},
  journal= {arXiv preprint arXiv:1111.4452},
  year   = {2013}
}

Comments

17 pages, 3 figures, minor updates

R2 v1 2026-06-21T19:38:17.824Z