On the absolute constants in the Berry-Esseen type inequalities for identically distributed summands

Abstract

By a modification of the method that was applied in (Korolev and Shevtsova, 2010), here the inequalities n≤0.3328(β3+0.429)/n and n≤0.33554(β3+0.415)/n are proved for the uniform distance n between the standard normal distribution function and the distribution function of the normalized sum of an arbitrary number n≥1 of independent identically distributed random variables with zero mean, unit variance and finite third absolute moment β3. The first of these two inequalities improves one that was proved in (Korolev and Shevtsova, 2010), and as well sharpens the best known upper estimate for the absolute constant C0 in the classical Berry--Esseen inequality to be C0<0.4756, since 0.3328(β3+0.429)≤0.3328·1.429β3<0.4756β3 by virtue of the condition β3≥1. The second of these inequalities is also a structural improvement of the classical Berry--Esseen inequality, and as well sharpens the upper estimate for C0 still more to be C0<0.4748.