English

On normal approximations to symmetric hypergeometric laws

Probability 2014-05-01 v1

Abstract

The Kolmogorov distances between a symmetric hypergeometric law with standard deviation σ\sigma and its usual normal approximations are computed and shown to be less than 1/(8πσ)1/(\sqrt{8\pi}\,\sigma), with the order 1/σ1/\sigma and the constant 1/8π1/\sqrt{8\pi} being optimal. The results of Hipp and Mattner (2007) for symmetric binomial laws are obtained as special cases. Connections to Berry-Esseen type results in more general situations concerning sums of simple random samples or Bernoulli convolutions are explained. Auxiliary results of independent interest include rather sharp normal distribution function inequalities, a simple identifiability result for hypergeometric laws, and some remarks related to L\'evy's concentration-variance inequality.

Keywords

Cite

@article{arxiv.1404.7657,
  title  = {On normal approximations to symmetric hypergeometric laws},
  author = {Lutz Mattner and Jona Schulz},
  journal= {arXiv preprint arXiv:1404.7657},
  year   = {2014}
}
R2 v1 2026-06-22T04:02:50.509Z