English

Efficient quantization and weak covering of high dimensional cubes

Statistics Theory 2022-02-17 v2 Statistics Theory

Abstract

Let Zn={Z1,,Zn}\mathbb{Z}_n = \{Z_1, \ldots, Z_n\} be a design; that is, a collection of nn points Zj[1,1]dZ_j \in [-1,1]^d. We study the quality of quantization of [1,1]d[-1,1]^d by the points of Zn\mathbb{Z}_n and the problem of quality of coverage of [1,1]d[-1,1]^d by Bd(Zn,r){\cal B}_d(\mathbb{Z}_n,r), the union of balls centred at ZjZnZ_j \in \mathbb{Z}_n. We concentrate on the cases where the dimension dd is not small (d5d\geq 5) and nn is not too large, n2dn \leq 2^d. We define the design Dn,δ{\mathbb{D}_{n,\delta}} as a 2d12^{d-1} design defined on vertices of the cube [δ,δ]d[-\delta,\delta]^d, 0δ10\leq \delta\leq 1. For this design, we derive a closed-form expression for the quantization error and very accurate approximations for {the coverage area} vol([1,1]dBd(Zn,r))([-1,1]^d \cap {\cal B}_d(\mathbb{Z}_n,r)). We provide results of a large-scale numerical investigation confirming the accuracy of the developed approximations and the efficiency of the designs Dn,δ{\mathbb{D}_{n,\delta}}.

Keywords

Cite

@article{arxiv.2005.07938,
  title  = {Efficient quantization and weak covering of high dimensional cubes},
  author = {Jack Noonan and Anatoly Zhigljavsky},
  journal= {arXiv preprint arXiv:2005.07938},
  year   = {2022}
}
R2 v1 2026-06-23T15:35:26.824Z