English

Covering of high-dimensional cubes and quantization

Statistics Theory 2020-02-17 v1 Statistics Theory

Abstract

As the main problem, we consider covering of a dd-dimensional cube by nn balls with reasonably large dd (10 or more) and reasonably small nn, like n=100n=100 or n=1000n=1000. We do not require the full coverage but only 90\% or 95\% coverage. We establish that efficient covering schemes have several important properties which are not seen in small dimensions and in asymptotical considerations, for very large nn. One of these properties can be termed `do not try to cover the vertices' as the vertices of the cube and their close neighbourhoods are very hard to cover and for large dd there are far too many of them. We clearly demonstrate that, contrary to a common belief, placing balls at points which form a low-discrepancy sequence in the cube, makes for a very inefficient covering scheme. For a family of random coverings, we are able to provide very accurate approximations to the coverage probability. We then extend our results to the problems of coverage of a cube by smaller cubes and quantization, the latter being also referred to as facility location. Along with theoretical considerations and derivation of approximations, we discuss results of a large-scale numerical investigation.

Keywords

Cite

@article{arxiv.2002.06118,
  title  = {Covering of high-dimensional cubes and quantization},
  author = {Anatoly Zhigljavsky and Jack Noonan},
  journal= {arXiv preprint arXiv:2002.06118},
  year   = {2020}
}
R2 v1 2026-06-23T13:42:08.200Z