Affiliation:
1. Institute of Mathematics of the Czech Academy of Sciences Praha 1 Czech Republic
Abstract
AbstractLet be a random variable and define its concentration function by
For a sum of independent real‐valued random variables, the Kolmogorov–Rogozin inequality states that
In this paper, we give an optimal bound for in terms of , which settles a question posed by Leader and Radcliffe in 1994. Moreover, we show that the extremal distributions are mixtures of two uniform distributions each lying on an arithmetic progression.
Funder
Grantová Agentura České Republiky