Ew inequalities for the binomial law and for the total variation distance between iid samples

Abstract

Two new inequalities are presented. The first one may be called a pre-limit form of the Moivre-Laplace theorem; for example, it permits for any quantile of any binomial law to find an interval of length 1 containing this quantile. The second inequality improves upper bound for the total variation distance between two samples from discrete distributions; it may be used to estimate the necessary sample size for testing two simple hypothesis. Proofs of these inequalities are short.