A full proof of universal inequalities for the distribution function of the binomial law

· 2012 · math.PR · arXiv 1207.3838

1 Pith paper cite this work. Polarity classification is still indexing.

1 Pith paper citing it

open full Pith review browse 1 citing papers arXiv PDF

abstract

We present a new form and a short full proof of explicit two-sided estimates for the distribution function F_{n,p}(x) of the binomial law from the paper published by D.Alfers and H.Dinges in 1984. These inequalities are universal (valid for all binomial distribution and all values of argument) and exact (namely, the upper bound for F_{n,p}(k) is the lower bound for F_{n,p}(k+1)). By means of such estimates it is possible to bound any quantile of the binomial law by 2 subsequent integers.

representative citing papers

Notes on constants for maxima of Rademacher averages

math.PR · 2026-06-29 · unverdicted · novelty 4.0

Proves E[max_j | (1/n) sum_i ε_ij |] ≥ min{255/256, (1/sqrt(2 log 2)) sqrt(log(2p)/n)} with equality for (n,p)=(2,1) and (2,8).

citing papers explorer

Showing 1 of 1 citing paper.

Notes on constants for maxima of Rademacher averages math.PR · 2026-06-29 · unverdicted · none · ref 5 · internal anchor
Proves E[max_j | (1/n) sum_i ε_ij |] ≥ min{255/256, (1/sqrt(2 log 2)) sqrt(log(2p)/n)} with equality for (n,p)=(2,1) and (2,8).

A full proof of universal inequalities for the distribution function of the binomial law

fields

years

verdicts

representative citing papers

citing papers explorer